https://launchpad.net/ubuntu/+source/z3/4.8.4-1build1/+build/17760547 RUN: /usr/share/launchpad-buildd/bin/builder-prep Kernel version: Linux lcy01-amd64-030 4.4.0-161-generic #189-Ubuntu SMP Tue Aug 27 08:10:16 UTC 2019 x86_64 Buildd toolchain package versions: launchpad-buildd_177 python-lpbuildd_177 sbuild_0.67.0-2ubuntu7.1 bzr-builder_0.7.3+bzr174~ppa13~ubuntu14.10.1 bzr_2.7.0-2ubuntu3.1 git-build-recipe_0.3.6~git201906051340.ff11471~ubuntu16.04.1 git_1:2.7.4-0ubuntu1.6 dpkg-dev_1.18.4ubuntu1.6 python-debian_0.1.27ubuntu2. Syncing the system clock with the buildd NTP service... 13 Sep 08:28:57 ntpdate[1919]: adjust time server 10.211.37.1 offset 0.000620 sec RUN: /usr/share/launchpad-buildd/bin/in-target unpack-chroot --backend=chroot --series=eoan --arch=i386 PACKAGEBUILD-17760547 --image-type chroot /home/buildd/filecache-default/442b74e4150fa0b6767fc85e504511ba1474049c Creating target for build PACKAGEBUILD-17760547 RUN: /usr/share/launchpad-buildd/bin/in-target mount-chroot --backend=chroot --series=eoan --arch=i386 PACKAGEBUILD-17760547 Starting target for build PACKAGEBUILD-17760547 RUN: /usr/share/launchpad-buildd/bin/in-target override-sources-list --backend=chroot --series=eoan --arch=i386 PACKAGEBUILD-17760547 'deb http://ftpmaster.internal/ubuntu eoan main universe' 'deb http://ftpmaster.internal/ubuntu eoan-security main universe' 'deb http://ftpmaster.internal/ubuntu eoan-updates main universe' 'deb http://ftpmaster.internal/ubuntu eoan-proposed main universe' Overriding sources.list in build-PACKAGEBUILD-17760547 RUN: /usr/share/launchpad-buildd/bin/in-target update-debian-chroot --backend=chroot --series=eoan --arch=i386 PACKAGEBUILD-17760547 Updating target for build PACKAGEBUILD-17760547 Get:1 http://ftpmaster.internal/ubuntu eoan InRelease [255 kB] Get:2 http://ftpmaster.internal/ubuntu eoan-security InRelease [79.7 kB] Get:3 http://ftpmaster.internal/ubuntu eoan-updates InRelease [79.7 kB] Get:4 http://ftpmaster.internal/ubuntu eoan-proposed InRelease [107 kB] Get:5 http://ftpmaster.internal/ubuntu eoan/main i386 Packages [957 kB] Get:6 http://ftpmaster.internal/ubuntu eoan/main Translation-en [505 kB] Get:7 http://ftpmaster.internal/ubuntu eoan/universe i386 Packages [8791 kB] Get:8 http://ftpmaster.internal/ubuntu eoan/universe Translation-en [5221 kB] Get:9 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 Packages [34.6 kB] Get:10 http://ftpmaster.internal/ubuntu eoan-proposed/main Translation-en [18.4 kB] Get:11 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 Packages [154 kB] Get:12 http://ftpmaster.internal/ubuntu eoan-proposed/universe Translation-en [83.1 kB] Fetched 16.3 MB in 4s (3634 kB/s) Reading package lists... Reading package lists... Building dependency tree... Reading state information... Calculating upgrade... The following NEW packages will be installed: logsave The following packages will be upgraded: binutils binutils-common binutils-i686-linux-gnu build-essential coreutils cpp cpp-9 dpkg dpkg-dev e2fsprogs g++ g++-9 gcc gcc-9 gcc-9-base libapparmor1 libasan5 libatomic1 libbinutils libc-bin libc-dev-bin libc6 libc6-dev libcc1-0 libcom-err2 libdevmapper1.02.1 libdpkg-perl libext2fs2 libgcc-9-dev libgcc1 libgnutls30 libgomp1 libip4tc2 libisl21 libitm1 libperl5.28 libquadmath0 libsqlite3-0 libss2 libstdc++-9-dev libstdc++6 libubsan1 linux-libc-dev login passwd perl perl-base perl-modules-5.28 48 upgraded, 1 newly installed, 0 to remove and 0 not upgraded. Need to get 59.4 MB of archives. After this operation, 1107 kB of additional disk space will be used. Get:1 http://ftpmaster.internal/ubuntu eoan/main i386 coreutils i386 8.30-3ubuntu2 [1327 kB] Get:2 http://ftpmaster.internal/ubuntu eoan/main i386 dpkg i386 1.19.7ubuntu2 [1152 kB] Get:3 http://ftpmaster.internal/ubuntu eoan/main i386 login i386 1:4.5-1.1ubuntu4 [265 kB] Get:4 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 libperl5.28 i386 5.28.1-6build1 [3444 kB] Get:5 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 perl i386 5.28.1-6build1 [204 kB] Get:6 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 perl-base i386 5.28.1-6build1 [1602 kB] Get:7 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 perl-modules-5.28 all 5.28.1-6build1 [2812 kB] Get:8 http://ftpmaster.internal/ubuntu eoan/main i386 libc6-dev i386 2.30-0ubuntu1 [2340 kB] Get:9 http://ftpmaster.internal/ubuntu eoan/main i386 libc-dev-bin i386 2.30-0ubuntu1 [72.7 kB] Get:10 http://ftpmaster.internal/ubuntu eoan/main i386 linux-libc-dev i386 5.3.0-10.11 [1062 kB] Get:11 http://ftpmaster.internal/ubuntu eoan/main i386 libc6 i386 2.30-0ubuntu1 [2576 kB] Get:12 http://ftpmaster.internal/ubuntu eoan/main i386 libc-bin i386 2.30-0ubuntu1 [609 kB] Get:13 http://ftpmaster.internal/ubuntu eoan/main i386 libcc1-0 i386 9.2.1-8ubuntu1 [50.0 kB] Get:14 http://ftpmaster.internal/ubuntu eoan/main i386 binutils-i686-linux-gnu i386 2.32.51.20190905-0ubuntu1 [1772 kB] Get:15 http://ftpmaster.internal/ubuntu eoan/main i386 libbinutils i386 2.32.51.20190905-0ubuntu1 [511 kB] Get:16 http://ftpmaster.internal/ubuntu eoan/main i386 binutils-common i386 2.32.51.20190905-0ubuntu1 [203 kB] Get:17 http://ftpmaster.internal/ubuntu eoan/main i386 binutils i386 2.32.51.20190905-0ubuntu1 [3428 B] Get:18 http://ftpmaster.internal/ubuntu eoan/main i386 gcc-9-base i386 9.2.1-8ubuntu1 [19.2 kB] Get:19 http://ftpmaster.internal/ubuntu eoan/main i386 libgcc1 i386 1:9.2.1-8ubuntu1 [48.2 kB] Get:20 http://ftpmaster.internal/ubuntu eoan/main i386 libgomp1 i386 9.2.1-8ubuntu1 [95.0 kB] Get:21 http://ftpmaster.internal/ubuntu eoan/main i386 libitm1 i386 9.2.1-8ubuntu1 [31.0 kB] Get:22 http://ftpmaster.internal/ubuntu eoan/main i386 libatomic1 i386 9.2.1-8ubuntu1 [9828 B] Get:23 http://ftpmaster.internal/ubuntu eoan/main i386 libasan5 i386 9.2.1-8ubuntu1 [410 kB] Get:24 http://ftpmaster.internal/ubuntu eoan/main i386 libubsan1 i386 9.2.1-8ubuntu1 [149 kB] Get:25 http://ftpmaster.internal/ubuntu eoan/main i386 libquadmath0 i386 9.2.1-8ubuntu1 [230 kB] Get:26 http://ftpmaster.internal/ubuntu eoan/main i386 g++-9 i386 9.2.1-8ubuntu1 [10.2 MB] Get:27 http://ftpmaster.internal/ubuntu eoan/main i386 libstdc++-9-dev i386 9.2.1-8ubuntu1 [1751 kB] Get:28 http://ftpmaster.internal/ubuntu eoan/main i386 libgcc-9-dev i386 9.2.1-8ubuntu1 [2363 kB] Get:29 http://ftpmaster.internal/ubuntu eoan/main i386 gcc-9 i386 9.2.1-8ubuntu1 [9789 kB] Get:30 http://ftpmaster.internal/ubuntu eoan/main i386 cpp-9 i386 9.2.1-8ubuntu1 [8986 kB] Get:31 http://ftpmaster.internal/ubuntu eoan/main i386 libstdc++6 i386 9.2.1-8ubuntu1 [548 kB] Get:32 http://ftpmaster.internal/ubuntu eoan/main i386 libisl21 i386 0.21-2 [659 kB] Get:33 http://ftpmaster.internal/ubuntu eoan/main i386 libext2fs2 i386 1.45.3-4ubuntu1 [208 kB] Get:34 http://ftpmaster.internal/ubuntu eoan/main i386 e2fsprogs i386 1.45.3-4ubuntu1 [566 kB] Get:35 http://ftpmaster.internal/ubuntu eoan/main i386 logsave i386 1.45.3-4ubuntu1 [9840 B] Get:36 http://ftpmaster.internal/ubuntu eoan/main i386 passwd i386 1:4.5-1.1ubuntu4 [821 kB] Get:37 http://ftpmaster.internal/ubuntu eoan/main i386 libgnutls30 i386 3.6.9-4build1 [799 kB] Get:38 http://ftpmaster.internal/ubuntu eoan/main i386 libcom-err2 i386 1.45.3-4ubuntu1 [9464 B] Get:39 http://ftpmaster.internal/ubuntu eoan/main i386 libss2 i386 1.45.3-4ubuntu1 [11.7 kB] Get:40 http://ftpmaster.internal/ubuntu eoan/main i386 libapparmor1 i386 2.13.3-5ubuntu1 [37.5 kB] Get:41 http://ftpmaster.internal/ubuntu eoan/main i386 libdevmapper1.02.1 i386 2:1.02.155-2ubuntu6 [126 kB] Get:42 http://ftpmaster.internal/ubuntu eoan/main i386 libsqlite3-0 i386 3.29.0-2 [572 kB] Get:43 http://ftpmaster.internal/ubuntu eoan/main i386 g++ i386 4:9.2.1-3.1ubuntu1 [1616 B] Get:44 http://ftpmaster.internal/ubuntu eoan/main i386 gcc i386 4:9.2.1-3.1ubuntu1 [5268 B] Get:45 http://ftpmaster.internal/ubuntu eoan/main i386 cpp i386 4:9.2.1-3.1ubuntu1 [27.6 kB] Get:46 http://ftpmaster.internal/ubuntu eoan/main i386 dpkg-dev all 1.19.7ubuntu2 [679 kB] Get:47 http://ftpmaster.internal/ubuntu eoan/main i386 libdpkg-perl all 1.19.7ubuntu2 [230 kB] Get:48 http://ftpmaster.internal/ubuntu eoan/main i386 build-essential i386 12.7ubuntu1 [4644 B] Get:49 http://ftpmaster.internal/ubuntu eoan-proposed/main i386 libip4tc2 i386 1.8.3-2ubuntu3 [21.4 kB] debconf: delaying package configuration, since apt-utils is not installed Fetched 59.4 MB in 12s (5116 kB/s) (Reading database ... 12724 files and directories currently installed.) Preparing to unpack .../coreutils_8.30-3ubuntu2_i386.deb ... Unpacking coreutils (8.30-3ubuntu2) over (8.30-3ubuntu1) ... Setting up coreutils (8.30-3ubuntu2) ... (Reading database ... 12724 files and directories currently installed.) Preparing to unpack .../dpkg_1.19.7ubuntu2_i386.deb ... Unpacking dpkg (1.19.7ubuntu2) over (1.19.7ubuntu1) ... Setting up dpkg (1.19.7ubuntu2) ... (Reading database ... 12724 files and directories currently installed.) Preparing to unpack .../login_1%3a4.5-1.1ubuntu4_i386.deb ... Unpacking login (1:4.5-1.1ubuntu4) over (1:4.5-1.1ubuntu3) ... Setting up login (1:4.5-1.1ubuntu4) ... (Reading database ... 12724 files and directories currently installed.) Preparing to unpack .../libperl5.28_5.28.1-6build1_i386.deb ... Unpacking libperl5.28:i386 (5.28.1-6build1) over (5.28.1-6) ... Preparing to unpack .../perl_5.28.1-6build1_i386.deb ... Unpacking perl (5.28.1-6build1) over (5.28.1-6) ... Preparing to unpack .../perl-base_5.28.1-6build1_i386.deb ... 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Setting up libbinutils:i386 (2.32.51.20190905-0ubuntu1) ... Setting up libc-dev-bin (2.30-0ubuntu1) ... Setting up libcc1-0:i386 (9.2.1-8ubuntu1) ... Setting up libitm1:i386 (9.2.1-8ubuntu1) ... Setting up binutils-i686-linux-gnu (2.32.51.20190905-0ubuntu1) ... Setting up e2fsprogs (1.45.3-4ubuntu1) ... Installing new version of config file /etc/cron.d/e2scrub_all ... Installing new version of config file /etc/e2scrub.conf ... Setting up binutils (2.32.51.20190905-0ubuntu1) ... Setting up libgcc-9-dev:i386 (9.2.1-8ubuntu1) ... Setting up perl (5.28.1-6build1) ... Setting up libdpkg-perl (1.19.7ubuntu2) ... Setting up cpp (4:9.2.1-3.1ubuntu1) ... Setting up libc6-dev:i386 (2.30-0ubuntu1) ... Setting up gcc-9 (9.2.1-8ubuntu1) ... Setting up libstdc++-9-dev:i386 (9.2.1-8ubuntu1) ... Setting up gcc (4:9.2.1-3.1ubuntu1) ... Setting up dpkg-dev (1.19.7ubuntu2) ... Setting up g++-9 (9.2.1-8ubuntu1) ... Setting up g++ (4:9.2.1-3.1ubuntu1) ... Setting up build-essential (12.7ubuntu1) ... Processing triggers for libc-bin (2.30-0ubuntu1) ... RUN: /usr/share/launchpad-buildd/bin/sbuild-package PACKAGEBUILD-17760547 i386 eoan-proposed -c chroot:build-PACKAGEBUILD-17760547 --arch=i386 --dist=eoan-proposed --nolog z3_4.8.4-1build1.dsc Initiating build PACKAGEBUILD-17760547 with 4 jobs across 4 processor cores. Kernel reported to sbuild: 4.4.0-161-generic #189-Ubuntu SMP Tue Aug 27 08:10:16 UTC 2019 i686 sbuild (Debian sbuild) 0.67.0 (26 Dec 2015) on lcy01-amd64-030.buildd +==============================================================================+ | z3 4.8.4-1build1 (i386) 13 Sep 2019 08:29 | +==============================================================================+ Package: z3 Version: 4.8.4-1build1 Source Version: 4.8.4-1build1 Distribution: eoan-proposed Machine Architecture: amd64 Host Architecture: i386 Build Architecture: i386 I: NOTICE: Log filtering will replace 'build/z3-0vx22a/z3-4.8.4' with '<>' I: NOTICE: Log filtering will replace 'build/z3-0vx22a' with '<>' I: NOTICE: Log filtering will replace 'home/buildd/build-PACKAGEBUILD-17760547/chroot-autobuild' with '<>' +------------------------------------------------------------------------------+ | Fetch source files | +------------------------------------------------------------------------------+ Local sources ------------- z3_4.8.4-1build1.dsc exists in .; copying to chroot Check architectures ------------------- Check dependencies ------------------ Merged Build-Depends: build-essential, fakeroot Filtered Build-Depends: build-essential, fakeroot dpkg-deb: building package 'sbuild-build-depends-core-dummy' in '/<>/resolver-X8jCjq/apt_archive/sbuild-build-depends-core-dummy.deb'. Ign:1 copy:/<>/resolver-X8jCjq/apt_archive ./ InRelease Get:2 copy:/<>/resolver-X8jCjq/apt_archive ./ Release [2119 B] Ign:3 copy:/<>/resolver-X8jCjq/apt_archive ./ Release.gpg Get:4 copy:/<>/resolver-X8jCjq/apt_archive ./ Sources [214 B] Get:5 copy:/<>/resolver-X8jCjq/apt_archive ./ Packages [526 B] Fetched 2859 B in 0s (213 kB/s) Reading package lists... Reading package lists... +------------------------------------------------------------------------------+ | Install core build dependencies (apt-based resolver) | +------------------------------------------------------------------------------+ Installing build dependencies Reading package lists... Building dependency tree... Reading state information... The following NEW packages will be installed: sbuild-build-depends-core-dummy 0 upgraded, 1 newly installed, 0 to remove and 0 not upgraded. Need to get 852 B of archives. After this operation, 0 B of additional disk space will be used. Get:1 copy:/<>/resolver-X8jCjq/apt_archive ./ sbuild-build-depends-core-dummy 0.invalid.0 [852 B] debconf: delaying package configuration, since apt-utils is not installed Fetched 852 B in 0s (0 B/s) Selecting previously unselected package sbuild-build-depends-core-dummy. (Reading database ... 12737 files and directories currently installed.) Preparing to unpack .../sbuild-build-depends-core-dummy_0.invalid.0_i386.deb ... Unpacking sbuild-build-depends-core-dummy (0.invalid.0) ... Setting up sbuild-build-depends-core-dummy (0.invalid.0) ... Merged Build-Depends: debhelper-compat (= 12), dh-python, python, javahelper, default-jdk, ocaml-nox, dh-ocaml, libnum-ocaml-dev, mono-mcs, cli-common-dev, libmono-system-numerics4.0-cil Filtered Build-Depends: debhelper-compat (= 12), dh-python, python, javahelper, default-jdk, ocaml-nox, dh-ocaml, libnum-ocaml-dev, mono-mcs, cli-common-dev, libmono-system-numerics4.0-cil dpkg-deb: building package 'sbuild-build-depends-z3-dummy' in '/<>/resolver-041FrI/apt_archive/sbuild-build-depends-z3-dummy.deb'. Ign:1 copy:/<>/resolver-041FrI/apt_archive ./ InRelease Get:2 copy:/<>/resolver-041FrI/apt_archive ./ Release [2119 B] Ign:3 copy:/<>/resolver-041FrI/apt_archive ./ Release.gpg Get:4 copy:/<>/resolver-041FrI/apt_archive ./ Sources [364 B] Get:5 copy:/<>/resolver-041FrI/apt_archive ./ Packages [605 B] Fetched 3088 B in 0s (210 kB/s) Reading package lists... Reading package lists... +------------------------------------------------------------------------------+ | Install z3 build dependencies (apt-based resolver) | +------------------------------------------------------------------------------+ Installing build dependencies Reading package lists... Building dependency tree... Reading state information... The following additional packages will be installed: autoconf automake autopoint autotools-dev bsdmainutils ca-certificates-java cli-common cli-common-dev dctrl-tools debhelper default-jdk default-jdk-headless default-jre default-jre-headless devscripts dh-autoreconf dh-ocaml dh-python dh-strip-nondeterminism dirmngr dwz file fontconfig-config fonts-dejavu-core gettext gettext-base gnupg gnupg-l10n gnupg-utils gpg-wks-client gpg-wks-server gpgsm groff-base intltool-debian java-common javahelper libarchive-zip-perl libasn1-8-heimdal libasound2 libasound2-data libavahi-client3 libavahi-common-data libavahi-common3 libb-hooks-op-check-perl libbsd0 libcairo2 libclass-method-modifiers-perl libcroco3 libcups2 libdbus-1-3 libdevel-callchecker-perl libdevel-globaldestruction-perl libdrm-amdgpu1 libdrm-common libdrm-intel1 libdrm-nouveau2 libdrm-radeon1 libdrm2 libdynaloader-functions-perl libedit2 libelf1 libencode-locale-perl libexif12 libexpat1 libfile-homedir-perl libfile-listing-perl libfile-stripnondeterminism-perl libfile-which-perl libfontconfig1 libfreetype6 libgdiplus libgif7 libgl1 libgl1-mesa-dri libglapi-mesa libglib2.0-0 libglvnd0 libglx-mesa0 libglx0 libgssapi-krb5-2 libgssapi3-heimdal libhcrypto4-heimdal libheimbase1-heimdal libheimntlm0-heimdal libhtml-parser-perl libhtml-tagset-perl libhtml-tree-perl libhttp-cookies-perl libhttp-date-perl libhttp-message-perl libhttp-negotiate-perl libhx509-5-heimdal libicu63 libimport-into-perl libio-html-perl libio-pty-perl libio-socket-ssl-perl libipc-run-perl libjbig0 libjpeg-turbo8 libjpeg8 libk5crypto3 libkeyutils1 libkrb5-26-heimdal libkrb5-3 libkrb5support0 libksba8 liblcms2-2 libldap-2.4-2 libldap-common libllvm8 liblwp-mediatypes-perl liblwp-protocol-https-perl libmagic-mgc libmagic1 libmodule-runtime-perl libmono-2.0-dev libmono-accessibility4.0-cil libmono-cairo4.0-cil libmono-cecil-private-cil libmono-cil-dev libmono-codecontracts4.0-cil libmono-compilerservices-symbolwriter4.0-cil libmono-corlib4.5-cil libmono-cscompmgd0.0-cil libmono-csharp4.0c-cil libmono-custommarshalers4.0-cil libmono-data-tds4.0-cil libmono-db2-1.0-cil libmono-debugger-soft4.0a-cil libmono-http4.0-cil libmono-i18n-cjk4.0-cil libmono-i18n-mideast4.0-cil libmono-i18n-other4.0-cil libmono-i18n-rare4.0-cil libmono-i18n-west4.0-cil libmono-i18n4.0-all libmono-i18n4.0-cil libmono-ldap4.0-cil libmono-management4.0-cil libmono-messaging-rabbitmq4.0-cil libmono-messaging4.0-cil libmono-microsoft-build-engine4.0-cil libmono-microsoft-build-framework4.0-cil libmono-microsoft-build-tasks-v4.0-4.0-cil libmono-microsoft-build-utilities-v4.0-4.0-cil libmono-microsoft-build4.0-cil libmono-microsoft-csharp4.0-cil libmono-microsoft-visualc10.0-cil libmono-microsoft-web-infrastructure1.0-cil libmono-oracle4.0-cil libmono-parallel4.0-cil libmono-peapi4.0a-cil libmono-posix4.0-cil libmono-rabbitmq4.0-cil libmono-relaxng4.0-cil libmono-security4.0-cil libmono-sharpzip4.84-cil libmono-simd4.0-cil libmono-smdiagnostics0.0-cil libmono-sqlite4.0-cil libmono-system-componentmodel-composition4.0-cil libmono-system-componentmodel-dataannotations4.0-cil libmono-system-configuration-install4.0-cil libmono-system-configuration4.0-cil libmono-system-core4.0-cil libmono-system-data-datasetextensions4.0-cil libmono-system-data-entity4.0-cil libmono-system-data-linq4.0-cil libmono-system-data-services-client4.0-cil libmono-system-data-services4.0-cil libmono-system-data4.0-cil libmono-system-deployment4.0-cil libmono-system-design4.0-cil libmono-system-drawing-design4.0-cil libmono-system-drawing4.0-cil libmono-system-dynamic4.0-cil libmono-system-enterpriseservices4.0-cil libmono-system-identitymodel-selectors4.0-cil libmono-system-identitymodel4.0-cil libmono-system-io-compression-filesystem4.0-cil libmono-system-io-compression4.0-cil libmono-system-json-microsoft4.0-cil libmono-system-json4.0-cil libmono-system-ldap-protocols4.0-cil libmono-system-ldap4.0-cil libmono-system-management4.0-cil libmono-system-messaging4.0-cil libmono-system-net-http-formatting4.0-cil libmono-system-net-http-webrequest4.0-cil libmono-system-net-http4.0-cil libmono-system-net4.0-cil libmono-system-numerics-vectors4.0-cil libmono-system-numerics4.0-cil libmono-system-reactive-core2.2-cil libmono-system-reactive-debugger2.2-cil libmono-system-reactive-experimental2.2-cil libmono-system-reactive-interfaces2.2-cil libmono-system-reactive-linq2.2-cil libmono-system-reactive-observable-aliases0.0-cil libmono-system-reactive-platformservices2.2-cil libmono-system-reactive-providers2.2-cil libmono-system-reactive-runtime-remoting2.2-cil libmono-system-reactive-windows-forms2.2-cil libmono-system-reactive-windows-threading2.2-cil libmono-system-reflection-context4.0-cil libmono-system-runtime-caching4.0-cil libmono-system-runtime-durableinstancing4.0-cil libmono-system-runtime-serialization-formatters-soap4.0-cil libmono-system-runtime-serialization4.0-cil libmono-system-runtime4.0-cil libmono-system-security4.0-cil libmono-system-servicemodel-activation4.0-cil libmono-system-servicemodel-discovery4.0-cil libmono-system-servicemodel-internals0.0-cil libmono-system-servicemodel-routing4.0-cil libmono-system-servicemodel-web4.0-cil libmono-system-servicemodel4.0a-cil libmono-system-serviceprocess4.0-cil libmono-system-threading-tasks-dataflow4.0-cil libmono-system-transactions4.0-cil libmono-system-web-abstractions4.0-cil libmono-system-web-applicationservices4.0-cil libmono-system-web-dynamicdata4.0-cil libmono-system-web-extensions-design4.0-cil libmono-system-web-extensions4.0-cil libmono-system-web-http-selfhost4.0-cil libmono-system-web-http-webhost4.0-cil libmono-system-web-http4.0-cil libmono-system-web-mobile4.0-cil libmono-system-web-mvc3.0-cil libmono-system-web-razor2.0-cil libmono-system-web-regularexpressions4.0-cil libmono-system-web-routing4.0-cil libmono-system-web-services4.0-cil libmono-system-web-webpages-deployment2.0-cil libmono-system-web-webpages-razor2.0-cil libmono-system-web-webpages2.0-cil libmono-system-web4.0-cil libmono-system-windows-forms-datavisualization4.0a-cil libmono-system-windows-forms4.0-cil libmono-system-windows4.0-cil libmono-system-workflow-activities4.0-cil libmono-system-workflow-componentmodel4.0-cil libmono-system-workflow-runtime4.0-cil libmono-system-xaml4.0-cil libmono-system-xml-linq4.0-cil libmono-system-xml-serialization4.0-cil libmono-system-xml4.0-cil libmono-system4.0-cil libmono-tasklets4.0-cil libmono-webbrowser4.0-cil libmono-webmatrix-data4.0-cil libmono-windowsbase4.0-cil libmono-xbuild-tasks4.0-cil libmonoboehm-2.0-1 libmonosgen-2.0-1 libmonosgen-2.0-dev libmoo-perl libmpdec2 libncurses-dev libncurses5-dev libnet-http-perl libnet-ssleay-perl libnspr4 libnss3 libnunit-cil-dev libnunit-console-runner2.6.3-cil libnunit-core-interfaces2.6.3-cil libnunit-core2.6.3-cil libnunit-framework2.6.3-cil libnunit-mocks2.6.3-cil libnunit-util2.6.3-cil libparams-classify-perl libpciaccess0 libpcsclite1 libpipeline1 libpixman-1-0 libpython-stdlib libpython2-stdlib libpython2.7-minimal libpython2.7-stdlib libpython3-stdlib libpython3.7-minimal libpython3.7-stdlib libroken18-heimdal librole-tiny-perl libsasl2-2 libsasl2-modules-db libsensors-config libsensors5 libsigsegv2 libstrictures-perl libstring-shellquote-perl libsub-exporter-progressive-perl libsub-override-perl libsub-quote-perl libtiff5 libtimedate-perl libtool libtry-tiny-perl libuchardet0 liburi-perl libwebp6 libwind0-heimdal libwww-perl libwww-robotrules-perl libx11-6 libx11-data libx11-xcb1 libxau6 libxcb-dri2-0 libxcb-dri3-0 libxcb-glx0 libxcb-present0 libxcb-render0 libxcb-shm0 libxcb-sync1 libxcb1 libxdamage1 libxdmcp6 libxext6 libxfixes3 libxi6 libxml-dom-perl libxml-parser-perl libxml-perl libxml-regexp-perl libxml2 libxrender1 libxshmfence1 libxtst6 libxxf86vm1 m4 man-db mime-support mono-4.0-gac mono-devel mono-gac mono-mcs mono-runtime mono-runtime-common mono-runtime-sgen mono-utils mono-xbuild netbase ocaml-base-nox ocaml-compiler-libs ocaml-interp ocaml-nox openjdk-11-jdk openjdk-11-jdk-headless openjdk-11-jre openjdk-11-jre-headless patchutils perl-openssl-defaults pkg-config po-debconf python python-minimal python2 python2-minimal python2.7 python2.7-minimal python3 python3-distutils python3-lib2to3 python3-minimal python3.7 python3.7-minimal ucf wdiff x11-common Suggested packages: autoconf-archive gnu-standards autoconf-doc wamerican | wordlist whois vacation debtags dh-make adequate autopkgtest bls-standalone bsd-mailx | mailx check-all-the-things cvs-buildpackage devscripts-el diffoscope disorderfs dose-extra duck faketime gnuplot how-can-i-help libauthen-sasl-perl libdbd-pg-perl libfile-desktopentry-perl libnet-smtps-perl libterm-size-perl libyaml-syck-perl mozilla-devscripts mutt piuparts postgresql-client quilt ratt reprotest ssh-client svn-buildpackage w3m debian-keyring equivs libsoap-lite-perl git dbus-user-session libpam-systemd pinentry-gnome3 tor gettext-doc libasprintf-dev libgettextpo-dev parcimonie xloadimage groff libasound2-plugins alsa-utils cups-common krb5-doc krb5-user libdata-dump-perl liblcms2-utils libcrypt-ssleay-perl libgnomeui-0 libgtk2.0-0 librsvg2-2 shared-mime-info libgamin0 ncurses-doc libnunit-doc monodoc-nunit-manual libscalar-number-perl pciutils pcscd lm-sensors libbareword-filehandles-perl libindirect-perl libmultidimensional-perl libtool-doc gfortran | fortran95-compiler gcj-jdk libauthen-ntlm-perl m4-doc apparmor less www-browser xdg-utils | libgnome2-0 | konqueror ocaml-doc tuareg-mode | ocaml-mode openjdk-11-demo openjdk-11-source visualvm libnss-mdns fonts-dejavu-extra fonts-ipafont-gothic fonts-ipafont-mincho fonts-wqy-microhei | fonts-wqy-zenhei fonts-indic libmail-box-perl python-doc python-tk python2-doc python2.7-doc binfmt-support python3-doc python3-tk python3-venv python3.7-venv python3.7-doc wdiff-doc Recommended packages: at dput | dupload libdistro-info-perl libgit-wrapper-perl libgitlab-api-v4-perl liblist-compare-perl licensecheck lintian python3-apt python3-debian python3-magic python3-requests python3-unidiff python3-xdg strace unzip wget | curl curl | wget | lynx dbus libarchive-cpio-perl libglib2.0-data shared-mime-info xdg-user-dirs libhtml-format-perl krb5-locales ca-certificates-mono libmono-btls-interface4.0-cil libgluezilla libclass-xsaccessor-perl libsub-name-perl libsasl2-modules libltdl-dev libdata-dump-perl libhtml-form-perl libhttp-daemon-perl libmailtools-perl mono-csharp-shell binfmt-support ledit | readline-editor libxt-dev libatk-wrapper-java-jni fonts-dejavu-extra libmail-sendmail-perl The following NEW packages will be installed: autoconf automake autopoint autotools-dev bsdmainutils ca-certificates-java cli-common cli-common-dev dctrl-tools debhelper default-jdk default-jdk-headless default-jre default-jre-headless devscripts dh-autoreconf dh-ocaml dh-python dh-strip-nondeterminism dirmngr dwz file fontconfig-config fonts-dejavu-core gettext gettext-base gnupg gnupg-l10n gnupg-utils gpg-wks-client gpg-wks-server gpgsm groff-base intltool-debian java-common javahelper libarchive-zip-perl libasn1-8-heimdal libasound2 libasound2-data libavahi-client3 libavahi-common-data libavahi-common3 libb-hooks-op-check-perl libbsd0 libcairo2 libclass-method-modifiers-perl libcroco3 libcups2 libdbus-1-3 libdevel-callchecker-perl libdevel-globaldestruction-perl libdrm-amdgpu1 libdrm-common libdrm-intel1 libdrm-nouveau2 libdrm-radeon1 libdrm2 libdynaloader-functions-perl libedit2 libelf1 libencode-locale-perl libexif12 libexpat1 libfile-homedir-perl libfile-listing-perl libfile-stripnondeterminism-perl libfile-which-perl libfontconfig1 libfreetype6 libgdiplus libgif7 libgl1 libgl1-mesa-dri libglapi-mesa libglib2.0-0 libglvnd0 libglx-mesa0 libglx0 libgssapi-krb5-2 libgssapi3-heimdal libhcrypto4-heimdal libheimbase1-heimdal libheimntlm0-heimdal libhtml-parser-perl libhtml-tagset-perl libhtml-tree-perl libhttp-cookies-perl libhttp-date-perl libhttp-message-perl libhttp-negotiate-perl libhx509-5-heimdal libicu63 libimport-into-perl libio-html-perl libio-pty-perl libio-socket-ssl-perl libipc-run-perl libjbig0 libjpeg-turbo8 libjpeg8 libk5crypto3 libkeyutils1 libkrb5-26-heimdal libkrb5-3 libkrb5support0 libksba8 liblcms2-2 libldap-2.4-2 libldap-common libllvm8 liblwp-mediatypes-perl liblwp-protocol-https-perl libmagic-mgc libmagic1 libmodule-runtime-perl libmono-2.0-dev libmono-accessibility4.0-cil libmono-cairo4.0-cil libmono-cecil-private-cil libmono-cil-dev libmono-codecontracts4.0-cil libmono-compilerservices-symbolwriter4.0-cil libmono-corlib4.5-cil libmono-cscompmgd0.0-cil libmono-csharp4.0c-cil libmono-custommarshalers4.0-cil libmono-data-tds4.0-cil libmono-db2-1.0-cil libmono-debugger-soft4.0a-cil libmono-http4.0-cil libmono-i18n-cjk4.0-cil libmono-i18n-mideast4.0-cil libmono-i18n-other4.0-cil libmono-i18n-rare4.0-cil libmono-i18n-west4.0-cil libmono-i18n4.0-all libmono-i18n4.0-cil libmono-ldap4.0-cil libmono-management4.0-cil libmono-messaging-rabbitmq4.0-cil libmono-messaging4.0-cil libmono-microsoft-build-engine4.0-cil libmono-microsoft-build-framework4.0-cil libmono-microsoft-build-tasks-v4.0-4.0-cil libmono-microsoft-build-utilities-v4.0-4.0-cil libmono-microsoft-build4.0-cil libmono-microsoft-csharp4.0-cil libmono-microsoft-visualc10.0-cil libmono-microsoft-web-infrastructure1.0-cil libmono-oracle4.0-cil libmono-parallel4.0-cil libmono-peapi4.0a-cil libmono-posix4.0-cil libmono-rabbitmq4.0-cil libmono-relaxng4.0-cil libmono-security4.0-cil libmono-sharpzip4.84-cil libmono-simd4.0-cil libmono-smdiagnostics0.0-cil libmono-sqlite4.0-cil libmono-system-componentmodel-composition4.0-cil libmono-system-componentmodel-dataannotations4.0-cil libmono-system-configuration-install4.0-cil libmono-system-configuration4.0-cil libmono-system-core4.0-cil libmono-system-data-datasetextensions4.0-cil libmono-system-data-entity4.0-cil libmono-system-data-linq4.0-cil libmono-system-data-services-client4.0-cil libmono-system-data-services4.0-cil libmono-system-data4.0-cil libmono-system-deployment4.0-cil libmono-system-design4.0-cil libmono-system-drawing-design4.0-cil libmono-system-drawing4.0-cil libmono-system-dynamic4.0-cil libmono-system-enterpriseservices4.0-cil libmono-system-identitymodel-selectors4.0-cil libmono-system-identitymodel4.0-cil libmono-system-io-compression-filesystem4.0-cil libmono-system-io-compression4.0-cil libmono-system-json-microsoft4.0-cil libmono-system-json4.0-cil libmono-system-ldap-protocols4.0-cil libmono-system-ldap4.0-cil libmono-system-management4.0-cil libmono-system-messaging4.0-cil libmono-system-net-http-formatting4.0-cil libmono-system-net-http-webrequest4.0-cil libmono-system-net-http4.0-cil libmono-system-net4.0-cil libmono-system-numerics-vectors4.0-cil libmono-system-numerics4.0-cil libmono-system-reactive-core2.2-cil libmono-system-reactive-debugger2.2-cil libmono-system-reactive-experimental2.2-cil libmono-system-reactive-interfaces2.2-cil libmono-system-reactive-linq2.2-cil libmono-system-reactive-observable-aliases0.0-cil libmono-system-reactive-platformservices2.2-cil libmono-system-reactive-providers2.2-cil libmono-system-reactive-runtime-remoting2.2-cil libmono-system-reactive-windows-forms2.2-cil libmono-system-reactive-windows-threading2.2-cil libmono-system-reflection-context4.0-cil libmono-system-runtime-caching4.0-cil libmono-system-runtime-durableinstancing4.0-cil libmono-system-runtime-serialization-formatters-soap4.0-cil libmono-system-runtime-serialization4.0-cil libmono-system-runtime4.0-cil libmono-system-security4.0-cil libmono-system-servicemodel-activation4.0-cil libmono-system-servicemodel-discovery4.0-cil libmono-system-servicemodel-internals0.0-cil libmono-system-servicemodel-routing4.0-cil libmono-system-servicemodel-web4.0-cil libmono-system-servicemodel4.0a-cil libmono-system-serviceprocess4.0-cil libmono-system-threading-tasks-dataflow4.0-cil libmono-system-transactions4.0-cil libmono-system-web-abstractions4.0-cil libmono-system-web-applicationservices4.0-cil libmono-system-web-dynamicdata4.0-cil libmono-system-web-extensions-design4.0-cil libmono-system-web-extensions4.0-cil libmono-system-web-http-selfhost4.0-cil libmono-system-web-http-webhost4.0-cil libmono-system-web-http4.0-cil libmono-system-web-mobile4.0-cil libmono-system-web-mvc3.0-cil libmono-system-web-razor2.0-cil libmono-system-web-regularexpressions4.0-cil libmono-system-web-routing4.0-cil libmono-system-web-services4.0-cil libmono-system-web-webpages-deployment2.0-cil libmono-system-web-webpages-razor2.0-cil libmono-system-web-webpages2.0-cil libmono-system-web4.0-cil libmono-system-windows-forms-datavisualization4.0a-cil libmono-system-windows-forms4.0-cil libmono-system-windows4.0-cil libmono-system-workflow-activities4.0-cil libmono-system-workflow-componentmodel4.0-cil libmono-system-workflow-runtime4.0-cil libmono-system-xaml4.0-cil libmono-system-xml-linq4.0-cil libmono-system-xml-serialization4.0-cil libmono-system-xml4.0-cil libmono-system4.0-cil libmono-tasklets4.0-cil libmono-webbrowser4.0-cil libmono-webmatrix-data4.0-cil libmono-windowsbase4.0-cil libmono-xbuild-tasks4.0-cil libmonoboehm-2.0-1 libmonosgen-2.0-1 libmonosgen-2.0-dev libmoo-perl libmpdec2 libncurses-dev libncurses5-dev libnet-http-perl libnet-ssleay-perl libnspr4 libnss3 libnunit-cil-dev libnunit-console-runner2.6.3-cil libnunit-core-interfaces2.6.3-cil libnunit-core2.6.3-cil libnunit-framework2.6.3-cil libnunit-mocks2.6.3-cil libnunit-util2.6.3-cil libparams-classify-perl libpciaccess0 libpcsclite1 libpipeline1 libpixman-1-0 libpython-stdlib libpython2-stdlib libpython2.7-minimal libpython2.7-stdlib libpython3-stdlib libpython3.7-minimal libpython3.7-stdlib libroken18-heimdal librole-tiny-perl libsasl2-2 libsasl2-modules-db libsensors-config libsensors5 libsigsegv2 libstrictures-perl libstring-shellquote-perl libsub-exporter-progressive-perl libsub-override-perl libsub-quote-perl libtiff5 libtimedate-perl libtool libtry-tiny-perl libuchardet0 liburi-perl libwebp6 libwind0-heimdal libwww-perl libwww-robotrules-perl libx11-6 libx11-data libx11-xcb1 libxau6 libxcb-dri2-0 libxcb-dri3-0 libxcb-glx0 libxcb-present0 libxcb-render0 libxcb-shm0 libxcb-sync1 libxcb1 libxdamage1 libxdmcp6 libxext6 libxfixes3 libxi6 libxml-dom-perl libxml-parser-perl libxml-perl libxml-regexp-perl libxml2 libxrender1 libxshmfence1 libxtst6 libxxf86vm1 m4 man-db mime-support mono-4.0-gac mono-devel mono-gac mono-mcs mono-runtime mono-runtime-common mono-runtime-sgen mono-utils mono-xbuild netbase ocaml-base-nox ocaml-compiler-libs ocaml-interp ocaml-nox openjdk-11-jdk openjdk-11-jdk-headless openjdk-11-jre openjdk-11-jre-headless patchutils perl-openssl-defaults pkg-config po-debconf python python-minimal python2 python2-minimal python2.7 python2.7-minimal python3 python3-distutils python3-lib2to3 python3-minimal python3.7 python3.7-minimal sbuild-build-depends-z3-dummy ucf wdiff x11-common 0 upgraded, 374 newly installed, 0 to remove and 0 not upgraded. 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Get:1 copy:/<>/resolver-041FrI/apt_archive ./ sbuild-build-depends-z3-dummy 0.invalid.0 [940 B] Get:2 http://ftpmaster.internal/ubuntu eoan/main i386 libpython3.7-minimal i386 3.7.4-4 [547 kB] Get:3 http://ftpmaster.internal/ubuntu eoan/main i386 libexpat1 i386 2.2.7-2 [74.4 kB] Get:4 http://ftpmaster.internal/ubuntu eoan/main i386 python3.7-minimal i386 3.7.4-4 [1735 kB] Get:5 http://ftpmaster.internal/ubuntu eoan/main i386 python3-minimal i386 3.7.3-1 [23.4 kB] Get:6 http://ftpmaster.internal/ubuntu eoan/main i386 mime-support all 3.63ubuntu1 [30.8 kB] Get:7 http://ftpmaster.internal/ubuntu eoan/main i386 libmpdec2 i386 2.4.2-2 [80.0 kB] Get:8 http://ftpmaster.internal/ubuntu eoan/main i386 libpython3.7-stdlib i386 3.7.4-4 [1748 kB] Get:9 http://ftpmaster.internal/ubuntu eoan/main i386 python3.7 i386 3.7.4-4 [294 kB] Get:10 http://ftpmaster.internal/ubuntu eoan/main i386 libpython3-stdlib i386 3.7.3-1 [6976 B] Get:11 http://ftpmaster.internal/ubuntu eoan/main i386 python3 i386 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http://ftpmaster.internal/ubuntu eoan/main i386 libxi6 i386 2:1.7.10-0ubuntu1 [31.7 kB] Get:77 http://ftpmaster.internal/ubuntu eoan/main i386 libxrender1 i386 1:0.9.10-1 [19.9 kB] Get:78 http://ftpmaster.internal/ubuntu eoan/main i386 x11-common all 1:7.7+19ubuntu12 [22.4 kB] Get:79 http://ftpmaster.internal/ubuntu eoan/main i386 libxtst6 i386 2:1.2.3-1 [13.4 kB] Get:80 http://ftpmaster.internal/ubuntu eoan/main i386 openjdk-11-jre-headless i386 11.0.5+6-1ubuntu2 [36.9 MB] Get:81 http://ftpmaster.internal/ubuntu eoan/main i386 default-jre-headless i386 2:1.11-72 [3192 B] Get:82 http://ftpmaster.internal/ubuntu eoan/main i386 ca-certificates-java all 20190405ubuntu1 [12.2 kB] Get:83 http://ftpmaster.internal/ubuntu eoan/universe i386 cli-common all 0.10 [171 kB] Get:84 http://ftpmaster.internal/ubuntu eoan/main i386 libtool all 2.4.6-11 [194 kB] Get:85 http://ftpmaster.internal/ubuntu eoan/main i386 dh-autoreconf all 19 [16.1 kB] Get:86 http://ftpmaster.internal/ubuntu eoan/main i386 libarchive-zip-perl all 1.65-1 [83.6 kB] Get:87 http://ftpmaster.internal/ubuntu eoan/main i386 libsub-override-perl all 0.09-2 [9532 B] Get:88 http://ftpmaster.internal/ubuntu eoan/main i386 libfile-stripnondeterminism-perl all 1.6.0-1 [16.2 kB] Get:89 http://ftpmaster.internal/ubuntu eoan/main i386 dh-strip-nondeterminism all 1.6.0-1 [5208 B] Get:90 http://ftpmaster.internal/ubuntu eoan/main i386 dwz i386 0.13-1 [84.1 kB] Get:91 http://ftpmaster.internal/ubuntu eoan/main i386 libcroco3 i386 0.6.13-1 [88.7 kB] Get:92 http://ftpmaster.internal/ubuntu eoan/main i386 gettext i386 0.19.8.1-9 [905 kB] Get:93 http://ftpmaster.internal/ubuntu eoan/main i386 intltool-debian all 0.35.0+20060710.5 [24.9 kB] Get:94 http://ftpmaster.internal/ubuntu eoan/main i386 po-debconf all 1.0.21 [233 kB] Get:95 http://ftpmaster.internal/ubuntu eoan/main i386 debhelper all 12.4ubuntu1 [910 kB] Get:96 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmonoboehm-2.0-1 i386 5.18.0.240+dfsg-5 [1653 kB] Get:97 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-core4.0-cil all 5.18.0.240+dfsg-5 [296 kB] Get:98 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-numerics4.0-cil all 5.18.0.240+dfsg-5 [48.6 kB] Get:99 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-xml4.0-cil all 5.18.0.240+dfsg-5 [816 kB] Get:100 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-security4.0-cil all 5.18.0.240+dfsg-5 [108 kB] Get:101 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-configuration4.0-cil all 5.18.0.240+dfsg-5 [54.9 kB] Get:102 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system4.0-cil all 5.18.0.240+dfsg-5 [790 kB] Get:103 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-security4.0-cil all 5.18.0.240+dfsg-5 [120 kB] Get:104 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 mono-4.0-gac all 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libmono-system-identitymodel4.0-cil all 5.18.0.240+dfsg-5 [54.2 kB] Get:138 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-io-compression4.0-cil all 5.18.0.240+dfsg-5 [52.0 kB] Get:139 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-io-compression-filesystem4.0-cil all 5.18.0.240+dfsg-5 [18.3 kB] Get:140 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-net-http4.0-cil all 5.18.0.240+dfsg-5 [53.0 kB] Get:141 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-runtime-serialization-formatters-soap4.0-cil all 5.18.0.240+dfsg-5 [26.9 kB] Get:142 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-sqlite4.0-cil all 5.18.0.240+dfsg-5 [58.1 kB] Get:143 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-accessibility4.0-cil all 5.18.0.240+dfsg-5 [15.8 kB] Get:144 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-posix4.0-cil all 5.18.0.240+dfsg-5 [82.2 kB] Get:145 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-webbrowser4.0-cil all 5.18.0.240+dfsg-5 [58.3 kB] Get:146 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n4.0-cil all 5.18.0.240+dfsg-5 [22.9 kB] Get:147 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n-west4.0-cil all 5.18.0.240+dfsg-5 [26.0 kB] Get:148 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-windows-forms4.0-cil all 5.18.0.240+dfsg-5 [808 kB] Get:149 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-design4.0-cil all 5.18.0.240+dfsg-5 [104 kB] Get:150 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-ldap4.0-cil all 5.18.0.240+dfsg-5 [92.9 kB] Get:151 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-ldap4.0-cil all 5.18.0.240+dfsg-5 [41.5 kB] Get:152 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-services4.0-cil all 5.18.0.240+dfsg-5 [168 kB] Get:153 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web4.0-cil all 5.18.0.240+dfsg-5 [756 kB] Get:154 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-runtime4.0-cil all 5.18.0.240+dfsg-5 [56.0 kB] Get:155 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-identitymodel-selectors4.0-cil all 5.18.0.240+dfsg-5 [17.3 kB] Get:156 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-messaging4.0-cil all 5.18.0.240+dfsg-5 [23.5 kB] Get:157 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-messaging4.0-cil all 5.18.0.240+dfsg-5 [35.7 kB] Get:158 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-servicemodel-activation4.0-cil all 5.18.0.240+dfsg-5 [16.1 kB] Get:159 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-servicemodel4.0a-cil all 5.18.0.240+dfsg-5 [378 kB] Get:160 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-serviceprocess4.0-cil all 5.18.0.240+dfsg-5 [28.7 kB] Get:161 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-xml-linq4.0-cil all 5.18.0.240+dfsg-5 [57.3 kB] Get:162 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-csharp4.0-cil all 5.18.0.240+dfsg-5 [116 kB] Get:163 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 mono-mcs all 5.18.0.240+dfsg-5 [536 kB] Get:164 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-build-framework4.0-cil all 5.18.0.240+dfsg-5 [22.2 kB] Get:165 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-build-utilities-v4.0-4.0-cil all 5.18.0.240+dfsg-5 [32.3 kB] Get:166 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-build-engine4.0-cil all 5.18.0.240+dfsg-5 [90.8 kB] Get:167 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-xbuild-tasks4.0-cil all 5.18.0.240+dfsg-5 [25.9 kB] Get:168 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-build-tasks-v4.0-4.0-cil all 5.18.0.240+dfsg-5 [69.4 kB] Get:169 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 mono-xbuild all 5.18.0.240+dfsg-5 [454 kB] Get:170 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-cairo4.0-cil all 5.18.0.240+dfsg-5 [31.7 kB] Get:171 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-cscompmgd0.0-cil all 5.18.0.240+dfsg-5 [18.5 kB] Get:172 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-csharp4.0c-cil all 5.18.0.240+dfsg-5 [403 kB] Get:173 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-custommarshalers4.0-cil all 5.18.0.240+dfsg-5 [16.4 kB] Get:174 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-data-tds4.0-cil all 5.18.0.240+dfsg-5 [46.0 kB] Get:175 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-db2-1.0-cil all 5.18.0.240+dfsg-5 [36.9 kB] Get:176 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-debugger-soft4.0a-cil all 5.18.0.240+dfsg-5 [66.5 kB] Get:177 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-sharpzip4.84-cil all 5.18.0.240+dfsg-5 [61.0 kB] Get:178 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-http4.0-cil all 5.18.0.240+dfsg-5 [22.8 kB] Get:179 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n-cjk4.0-cil all 5.18.0.240+dfsg-5 [240 kB] Get:180 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n-mideast4.0-cil all 5.18.0.240+dfsg-5 [20.0 kB] Get:181 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n-other4.0-cil all 5.18.0.240+dfsg-5 [21.3 kB] Get:182 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n-rare4.0-cil all 5.18.0.240+dfsg-5 [37.7 kB] Get:183 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-i18n4.0-all all 5.18.0.240+dfsg-5 [12.5 kB] Get:184 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-management4.0-cil all 5.18.0.240+dfsg-5 [16.8 kB] Get:185 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-rabbitmq4.0-cil all 5.18.0.240+dfsg-5 [93.1 kB] Get:186 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-messaging-rabbitmq4.0-cil all 5.18.0.240+dfsg-5 [24.4 kB] Get:187 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-build4.0-cil all 5.18.0.240+dfsg-5 [100 kB] Get:188 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-visualc10.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:189 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-microsoft-web-infrastructure1.0-cil all 5.18.0.240+dfsg-5 [17.7 kB] Get:190 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-oracle4.0-cil all 5.18.0.240+dfsg-5 [64.8 kB] Get:191 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-parallel4.0-cil all 5.18.0.240+dfsg-5 [23.3 kB] Get:192 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-simd4.0-cil all 5.18.0.240+dfsg-5 [27.5 kB] Get:193 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-smdiagnostics0.0-cil all 5.18.0.240+dfsg-5 [27.9 kB] Get:194 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-data-datasetextensions4.0-cil all 5.18.0.240+dfsg-5 [22.5 kB] Get:195 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-data-entity4.0-cil all 5.18.0.240+dfsg-5 [838 kB] Get:196 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-data-services-client4.0-cil all 5.18.0.240+dfsg-5 [140 kB] Get:197 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-extensions4.0-cil all 5.18.0.240+dfsg-5 [163 kB] Get:198 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-servicemodel-web4.0-cil all 5.18.0.240+dfsg-5 [40.5 kB] Get:199 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-data-services4.0-cil all 5.18.0.240+dfsg-5 [27.7 kB] Get:200 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-deployment4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:201 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-drawing-design4.0-cil all 5.18.0.240+dfsg-5 [22.4 kB] Get:202 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-dynamic4.0-cil all 5.18.0.240+dfsg-5 [44.4 kB] Get:203 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-json4.0-cil all 5.18.0.240+dfsg-5 [23.0 kB] Get:204 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-json-microsoft4.0-cil all 5.18.0.240+dfsg-5 [32.1 kB] Get:205 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-ldap-protocols4.0-cil all 5.18.0.240+dfsg-5 [30.9 kB] Get:206 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-management4.0-cil all 5.18.0.240+dfsg-5 [26.8 kB] Get:207 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-net4.0-cil all 5.18.0.240+dfsg-5 [16.0 kB] Get:208 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-net-http-formatting4.0-cil all 5.18.0.240+dfsg-5 [173 kB] Get:209 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-net-http-webrequest4.0-cil all 5.18.0.240+dfsg-5 [15.7 kB] Get:210 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-numerics-vectors4.0-cil all 5.18.0.240+dfsg-5 [15.5 kB] Get:211 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-interfaces2.2-cil all 5.18.0.240+dfsg-5 [15.4 kB] Get:212 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-core2.2-cil all 5.18.0.240+dfsg-5 [46.6 kB] Get:213 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-linq2.2-cil all 5.18.0.240+dfsg-5 [158 kB] Get:214 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-debugger2.2-cil all 5.18.0.240+dfsg-5 [14.4 kB] Get:215 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-experimental2.2-cil all 5.18.0.240+dfsg-5 [22.7 kB] Get:216 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-providers2.2-cil all 5.18.0.240+dfsg-5 [51.4 kB] Get:217 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-observable-aliases0.0-cil all 5.18.0.240+dfsg-5 [15.3 kB] Get:218 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-platformservices2.2-cil all 5.18.0.240+dfsg-5 [21.9 kB] Get:219 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-runtime-remoting2.2-cil all 5.18.0.240+dfsg-5 [16.3 kB] Get:220 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-windows-forms2.2-cil all 5.18.0.240+dfsg-5 [16.3 kB] Get:221 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-xaml4.0-cil all 5.18.0.240+dfsg-5 [74.5 kB] Get:222 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-windowsbase4.0-cil all 5.18.0.240+dfsg-5 [64.7 kB] Get:223 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reactive-windows-threading2.2-cil all 5.18.0.240+dfsg-5 [17.6 kB] Get:224 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-reflection-context4.0-cil all 5.18.0.240+dfsg-5 [15.8 kB] Get:225 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-runtime-caching4.0-cil all 5.18.0.240+dfsg-5 [38.9 kB] Get:226 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-runtime-durableinstancing4.0-cil all 5.18.0.240+dfsg-5 [46.7 kB] Get:227 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-servicemodel-discovery4.0-cil all 5.18.0.240+dfsg-5 [53.2 kB] Get:228 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-servicemodel-routing4.0-cil all 5.18.0.240+dfsg-5 [23.5 kB] Get:229 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-threading-tasks-dataflow4.0-cil all 5.18.0.240+dfsg-5 [69.7 kB] Get:230 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-abstractions4.0-cil all 5.18.0.240+dfsg-5 [15.6 kB] Get:231 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-dynamicdata4.0-cil all 5.18.0.240+dfsg-5 [37.1 kB] Get:232 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-extensions-design4.0-cil all 5.18.0.240+dfsg-5 [16.6 kB] Get:233 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-http4.0-cil all 5.18.0.240+dfsg-5 [122 kB] Get:234 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-http-selfhost4.0-cil all 5.18.0.240+dfsg-5 [44.5 kB] Get:235 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-http-webhost4.0-cil all 5.18.0.240+dfsg-5 [34.8 kB] Get:236 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-mobile4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:237 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-razor2.0-cil all 5.18.0.240+dfsg-5 [96.1 kB] Get:238 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-webpages-deployment2.0-cil all 5.18.0.240+dfsg-5 [26.4 kB] Get:239 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-webpages2.0-cil all 5.18.0.240+dfsg-5 [79.3 kB] Get:240 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-webpages-razor2.0-cil all 5.18.0.240+dfsg-5 [25.8 kB] Get:241 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-mvc3.0-cil all 5.18.0.240+dfsg-5 [142 kB] Get:242 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-regularexpressions4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:243 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-web-routing4.0-cil all 5.18.0.240+dfsg-5 [15.5 kB] Get:244 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-windows4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:245 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-windows-forms-datavisualization4.0a-cil all 5.18.0.240+dfsg-5 [49.6 kB] Get:246 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-workflow-activities4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:247 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-workflow-componentmodel4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:248 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-workflow-runtime4.0-cil all 5.18.0.240+dfsg-5 [15.2 kB] Get:249 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-system-xml-serialization4.0-cil all 5.18.0.240+dfsg-5 [15.1 kB] Get:250 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-tasklets4.0-cil all 5.18.0.240+dfsg-5 [15.5 kB] Get:251 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-webmatrix-data4.0-cil all 5.18.0.240+dfsg-5 [18.4 kB] Get:252 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-core-interfaces2.6.3-cil all 2.6.4+dfsg-1 [23.3 kB] Get:253 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-core2.6.3-cil all 2.6.4+dfsg-1 [52.7 kB] Get:254 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-util2.6.3-cil all 2.6.4+dfsg-1 [48.4 kB] Get:255 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-console-runner2.6.3-cil all 2.6.4+dfsg-1 [13.5 kB] Get:256 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-framework2.6.3-cil all 2.6.4+dfsg-1 [46.4 kB] Get:257 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-mocks2.6.3-cil all 2.6.4+dfsg-1 [10.5 kB] Get:258 http://ftpmaster.internal/ubuntu eoan/universe i386 libnunit-cil-dev all 2.6.4+dfsg-1 [4924 B] Get:259 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-cil-dev all 5.18.0.240+dfsg-5 [15.0 kB] Get:260 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmonosgen-2.0-1 i386 5.18.0.240+dfsg-5 [1736 kB] Get:261 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmonosgen-2.0-dev i386 5.18.0.240+dfsg-5 [2051 kB] Get:262 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 libmono-2.0-dev i386 5.18.0.240+dfsg-5 [47.6 kB] Get:263 http://ftpmaster.internal/ubuntu eoan/main i386 pkg-config i386 0.29.1-0ubuntu3 [46.4 kB] Get:264 http://ftpmaster.internal/ubuntu eoan-proposed/universe i386 mono-devel all 5.18.0.240+dfsg-5 [21.5 MB] Get:265 http://ftpmaster.internal/ubuntu eoan/main i386 libencode-locale-perl all 1.05-1 [12.3 kB] Get:266 http://ftpmaster.internal/ubuntu eoan/main i386 libtimedate-perl all 2.3000-2 [37.5 kB] Get:267 http://ftpmaster.internal/ubuntu eoan/main i386 libhttp-date-perl all 6.02-1 [10.4 kB] Get:268 http://ftpmaster.internal/ubuntu eoan/main i386 libfile-listing-perl all 6.04-1 [9774 B] Get:269 http://ftpmaster.internal/ubuntu eoan/main i386 libhtml-tagset-perl all 3.20-3 [12.1 kB] Get:270 http://ftpmaster.internal/ubuntu eoan/main i386 liburi-perl all 1.76-1 [77.3 kB] Get:271 http://ftpmaster.internal/ubuntu eoan/main i386 libhtml-parser-perl i386 3.72-3build2 [87.4 kB] Get:272 http://ftpmaster.internal/ubuntu eoan/main i386 libhtml-tree-perl all 5.07-2 [200 kB] Get:273 http://ftpmaster.internal/ubuntu eoan/main i386 libio-html-perl all 1.001-1 [14.9 kB] Get:274 http://ftpmaster.internal/ubuntu eoan/main i386 liblwp-mediatypes-perl all 6.04-1 [19.5 kB] Get:275 http://ftpmaster.internal/ubuntu eoan/main i386 libhttp-message-perl all 6.18-1 [75.3 kB] Get:276 http://ftpmaster.internal/ubuntu eoan/main i386 libhttp-cookies-perl all 6.04-1 [17.2 kB] Get:277 http://ftpmaster.internal/ubuntu eoan/main i386 libhttp-negotiate-perl all 6.01-1 [12.5 kB] Get:278 http://ftpmaster.internal/ubuntu eoan/main i386 perl-openssl-defaults i386 3build1 [7008 B] Get:279 http://ftpmaster.internal/ubuntu eoan/main i386 libnet-ssleay-perl i386 1.88-0ubuntu1 [300 kB] Get:280 http://ftpmaster.internal/ubuntu eoan/main i386 libio-socket-ssl-perl all 2.066-0ubuntu4 [177 kB] Get:281 http://ftpmaster.internal/ubuntu eoan/main i386 libnet-http-perl all 6.19-1 [22.8 kB] Get:282 http://ftpmaster.internal/ubuntu eoan/main i386 liblwp-protocol-https-perl all 6.07-2ubuntu2 [8560 B] Get:283 http://ftpmaster.internal/ubuntu eoan/main i386 libtry-tiny-perl all 0.30-1 [20.5 kB] Get:284 http://ftpmaster.internal/ubuntu eoan/main i386 libwww-robotrules-perl all 6.02-1 [12.6 kB] Get:285 http://ftpmaster.internal/ubuntu eoan/main i386 libwww-perl all 6.39-1 [139 kB] Get:286 http://ftpmaster.internal/ubuntu eoan/main i386 libxml-parser-perl i386 2.44-4 [203 kB] Get:287 http://ftpmaster.internal/ubuntu eoan/universe i386 libxml-perl all 0.08-3 [90.5 kB] Get:288 http://ftpmaster.internal/ubuntu eoan/universe i386 libxml-regexp-perl all 0.04-1 [8072 B] Get:289 http://ftpmaster.internal/ubuntu eoan/universe i386 libxml-dom-perl all 1.44-2 [169 kB] Get:290 http://ftpmaster.internal/ubuntu eoan/universe i386 cli-common-dev all 0.10 [39.5 kB] Get:291 http://ftpmaster.internal/ubuntu eoan/main i386 dctrl-tools i386 2.24-3 [63.0 kB] Get:292 http://ftpmaster.internal/ubuntu eoan/main i386 libglvnd0 i386 1.1.1-0ubuntu1 [40.0 kB] Get:293 http://ftpmaster.internal/ubuntu eoan/main i386 libglapi-mesa i386 19.1.6-1ubuntu1 [25.5 kB] Get:294 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2.4.97-1ubuntu1 [20.4 kB] Get:305 http://ftpmaster.internal/ubuntu eoan/main i386 libpciaccess0 i386 0.16-0ubuntu1 [20.0 kB] Get:306 http://ftpmaster.internal/ubuntu eoan/main i386 libdrm-intel1 i386 2.4.97-1ubuntu1 [63.1 kB] Get:307 http://ftpmaster.internal/ubuntu eoan/main i386 libdrm-nouveau2 i386 2.4.97-1ubuntu1 [18.2 kB] Get:308 http://ftpmaster.internal/ubuntu eoan/main i386 libdrm-radeon1 i386 2.4.97-1ubuntu1 [22.9 kB] Get:309 http://ftpmaster.internal/ubuntu eoan/main i386 libllvm8 i386 1:8.0.1-3build1 [13.6 MB] Get:310 http://ftpmaster.internal/ubuntu eoan/main i386 libsensors-config all 1:3.5.0-3ubuntu1 [6168 B] Get:311 http://ftpmaster.internal/ubuntu eoan/main i386 libsensors5 i386 1:3.5.0-3ubuntu1 [28.0 kB] Get:312 http://ftpmaster.internal/ubuntu eoan/main i386 libgl1-mesa-dri i386 19.1.6-1ubuntu1 [8828 kB] Get:313 http://ftpmaster.internal/ubuntu eoan/main i386 libglx-mesa0 i386 19.1.6-1ubuntu1 [148 kB] Get:314 http://ftpmaster.internal/ubuntu eoan/main i386 libglx0 i386 1.1.1-0ubuntu1 [29.4 kB] Get:315 http://ftpmaster.internal/ubuntu eoan/main i386 libgl1 i386 1.1.1-0ubuntu1 [80.4 kB] Get:316 http://ftpmaster.internal/ubuntu eoan/main i386 openjdk-11-jre i386 11.0.5+6-1ubuntu2 [35.3 kB] Get:317 http://ftpmaster.internal/ubuntu eoan/main i386 default-jre i386 2:1.11-72 [1084 B] Get:318 http://ftpmaster.internal/ubuntu eoan/main i386 openjdk-11-jdk-headless i386 11.0.5+6-1ubuntu2 [282 MB] Get:319 http://ftpmaster.internal/ubuntu eoan/main i386 default-jdk-headless i386 2:1.11-72 [1140 B] Get:320 http://ftpmaster.internal/ubuntu eoan/main i386 openjdk-11-jdk i386 11.0.5+6-1ubuntu2 [2183 kB] Get:321 http://ftpmaster.internal/ubuntu eoan/main i386 default-jdk i386 2:1.11-72 [1096 B] Get:322 http://ftpmaster.internal/ubuntu eoan/main i386 libksba8 i386 1.3.5-2 [99.9 kB] Get:323 http://ftpmaster.internal/ubuntu eoan/main i386 libroken18-heimdal i386 7.5.0+dfsg-3build1 [45.4 kB] Get:324 http://ftpmaster.internal/ubuntu eoan/main i386 libasn1-8-heimdal i386 7.5.0+dfsg-3build1 [187 kB] Get:325 http://ftpmaster.internal/ubuntu eoan/main i386 libheimbase1-heimdal i386 7.5.0+dfsg-3build1 [32.5 kB] Get:326 http://ftpmaster.internal/ubuntu eoan/main i386 libhcrypto4-heimdal i386 7.5.0+dfsg-3build1 [94.6 kB] Get:327 http://ftpmaster.internal/ubuntu eoan/main i386 libwind0-heimdal i386 7.5.0+dfsg-3build1 [48.3 kB] Get:328 http://ftpmaster.internal/ubuntu eoan/main i386 libhx509-5-heimdal i386 7.5.0+dfsg-3build1 [117 kB] Get:329 http://ftpmaster.internal/ubuntu eoan/main i386 libkrb5-26-heimdal i386 7.5.0+dfsg-3build1 [232 kB] Get:330 http://ftpmaster.internal/ubuntu eoan/main i386 libheimntlm0-heimdal i386 7.5.0+dfsg-3build1 [16.4 kB] Get:331 http://ftpmaster.internal/ubuntu eoan/main i386 libgssapi3-heimdal i386 7.5.0+dfsg-3build1 [108 kB] Get:332 http://ftpmaster.internal/ubuntu eoan/main i386 libsasl2-modules-db i386 2.1.27+dfsg-1build3 [15.7 kB] Get:333 http://ftpmaster.internal/ubuntu eoan/main i386 libsasl2-2 i386 2.1.27+dfsg-1build3 [53.0 kB] Get:334 http://ftpmaster.internal/ubuntu eoan/main i386 libldap-common all 2.4.48+dfsg-1ubuntu1 [17.3 kB] Get:335 http://ftpmaster.internal/ubuntu eoan/main i386 libldap-2.4-2 i386 2.4.48+dfsg-1ubuntu1 [168 kB] Get:336 http://ftpmaster.internal/ubuntu eoan/main i386 dirmngr i386 2.2.12-1ubuntu3 [350 kB] Get:337 http://ftpmaster.internal/ubuntu eoan/main i386 gnupg-l10n all 2.2.12-1ubuntu3 [48.9 kB] Get:338 http://ftpmaster.internal/ubuntu eoan/main i386 gnupg-utils i386 2.2.12-1ubuntu3 [518 kB] Get:339 http://ftpmaster.internal/ubuntu eoan/main i386 gpg-wks-client i386 2.2.12-1ubuntu3 [107 kB] Get:340 http://ftpmaster.internal/ubuntu eoan/main i386 gpg-wks-server i386 2.2.12-1ubuntu3 [98.8 kB] Get:341 http://ftpmaster.internal/ubuntu eoan/main i386 gpgsm i386 2.2.12-1ubuntu3 [235 kB] Get:342 http://ftpmaster.internal/ubuntu eoan/main i386 gnupg all 2.2.12-1ubuntu3 [252 kB] Get:343 http://ftpmaster.internal/ubuntu eoan/main i386 libfile-which-perl all 1.23-1 [13.8 kB] Get:344 http://ftpmaster.internal/ubuntu eoan/main i386 libfile-homedir-perl all 1.004-1 [37.3 kB] Get:345 http://ftpmaster.internal/ubuntu eoan/main i386 libio-pty-perl i386 1:1.08-1.1build6 [30.6 kB] Get:346 http://ftpmaster.internal/ubuntu eoan/main i386 libipc-run-perl all 20180523.0-1 [89.7 kB] Get:347 http://ftpmaster.internal/ubuntu eoan/main i386 libclass-method-modifiers-perl all 2.13-1 [16.2 kB] Get:348 http://ftpmaster.internal/ubuntu eoan/main i386 libsub-exporter-progressive-perl all 0.001013-1 [6784 B] Get:349 http://ftpmaster.internal/ubuntu eoan/main i386 libdevel-globaldestruction-perl all 0.14-1 [6752 B] Get:350 http://ftpmaster.internal/ubuntu eoan/main i386 libb-hooks-op-check-perl i386 0.22-1build1 [10.2 kB] Get:351 http://ftpmaster.internal/ubuntu eoan/main i386 libdynaloader-functions-perl all 0.003-1 [11.9 kB] Get:352 http://ftpmaster.internal/ubuntu eoan/main i386 libdevel-callchecker-perl i386 0.008-1 [14.3 kB] Get:353 http://ftpmaster.internal/ubuntu eoan/main i386 libparams-classify-perl i386 0.015-1build1 [21.5 kB] Get:354 http://ftpmaster.internal/ubuntu eoan/main i386 libmodule-runtime-perl all 0.016-1 [16.2 kB] Get:355 http://ftpmaster.internal/ubuntu eoan/main i386 libimport-into-perl all 1.002005-1 [11.0 kB] Get:356 http://ftpmaster.internal/ubuntu eoan/main i386 librole-tiny-perl all 2.000006-1 [15.9 kB] Get:357 http://ftpmaster.internal/ubuntu eoan/main i386 libstrictures-perl all 2.000006-1 [16.3 kB] Get:358 http://ftpmaster.internal/ubuntu eoan/main i386 libsub-quote-perl all 2.006003-1 [18.6 kB] Get:359 http://ftpmaster.internal/ubuntu eoan/main i386 libmoo-perl all 2.003004-2 [45.6 kB] Get:360 http://ftpmaster.internal/ubuntu eoan/main i386 libstring-shellquote-perl all 1.04-1 [12.0 kB] Get:361 http://ftpmaster.internal/ubuntu eoan/main i386 patchutils i386 0.3.4-2 [71.1 kB] Get:362 http://ftpmaster.internal/ubuntu eoan/main i386 wdiff i386 1.2.2-2build1 [30.8 kB] Get:363 http://ftpmaster.internal/ubuntu eoan/main i386 devscripts i386 2.19.6 [938 kB] Get:364 http://ftpmaster.internal/ubuntu eoan/main i386 python3-lib2to3 all 3.7.4-3 [75.6 kB] Get:365 http://ftpmaster.internal/ubuntu eoan/main i386 python3-distutils all 3.7.4-3 [142 kB] Get:366 http://ftpmaster.internal/ubuntu eoan/main i386 dh-python all 4.20190722ubuntu1 [94.2 kB] Get:367 http://ftpmaster.internal/ubuntu eoan/universe i386 javahelper all 0.72.9 [86.2 kB] Get:368 http://ftpmaster.internal/ubuntu eoan/main i386 libncurses-dev i386 6.1+20190803-1ubuntu1 [365 kB] Get:369 http://ftpmaster.internal/ubuntu eoan/main i386 libncurses5-dev i386 6.1+20190803-1ubuntu1 [992 B] Get:370 http://ftpmaster.internal/ubuntu eoan/universe i386 ocaml-base-nox i386 4.05.0-12ubuntu3 [510 kB] Get:371 http://ftpmaster.internal/ubuntu eoan/universe i386 ocaml-interp i386 4.05.0-12ubuntu3 [3465 kB] Get:372 http://ftpmaster.internal/ubuntu eoan/universe i386 ocaml-nox i386 4.05.0-12ubuntu3 [26.3 MB] Get:373 http://ftpmaster.internal/ubuntu eoan/universe i386 ocaml-compiler-libs i386 4.05.0-12ubuntu3 [18.9 MB] Get:374 http://ftpmaster.internal/ubuntu eoan/universe i386 dh-ocaml all 1.1.0 [79.6 kB] debconf: delaying package configuration, since apt-utils is not installed Fetched 482 MB in 27s (18.2 MB/s) Selecting previously unselected package libpython3.7-minimal:i386. (Reading database ... 12737 files and directories currently installed.) Preparing to unpack .../libpython3.7-minimal_3.7.4-4_i386.deb ... Unpacking libpython3.7-minimal:i386 (3.7.4-4) ... Selecting previously unselected package libexpat1:i386. Preparing to unpack .../libexpat1_2.2.7-2_i386.deb ... Unpacking libexpat1:i386 (2.2.7-2) ... Selecting previously unselected package python3.7-minimal. Preparing to unpack .../python3.7-minimal_3.7.4-4_i386.deb ... Unpacking python3.7-minimal (3.7.4-4) ... Setting up libpython3.7-minimal:i386 (3.7.4-4) ... Setting up libexpat1:i386 (2.2.7-2) ... Setting up python3.7-minimal (3.7.4-4) ... Selecting previously unselected package python3-minimal. (Reading database ... 12986 files and directories currently installed.) Preparing to unpack .../0-python3-minimal_3.7.3-1_i386.deb ... Unpacking python3-minimal (3.7.3-1) ... Selecting previously unselected package mime-support. Preparing to unpack .../1-mime-support_3.63ubuntu1_all.deb ... 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Selecting previously unselected package libmono-compilerservices-symbolwriter4.0-cil. Preparing to unpack .../086-libmono-compilerservices-symbolwriter4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-compilerservices-symbolwriter4.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-peapi4.0a-cil. Preparing to unpack .../087-libmono-peapi4.0a-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-peapi4.0a-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-relaxng4.0-cil. Preparing to unpack .../088-libmono-relaxng4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-relaxng4.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-componentmodel-composition4.0-cil. Preparing to unpack .../089-libmono-system-componentmodel-composition4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-componentmodel-composition4.0-cil (5.18.0.240+dfsg-5) ... 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Selecting previously unselected package libmono-system-web-applicationservices4.0-cil. Preparing to unpack .../109-libmono-system-web-applicationservices4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-web-applicationservices4.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-identitymodel4.0-cil. Preparing to unpack .../110-libmono-system-identitymodel4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-identitymodel4.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-io-compression4.0-cil. Preparing to unpack .../111-libmono-system-io-compression4.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-io-compression4.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-io-compression-filesystem4.0-cil. Preparing to unpack .../112-libmono-system-io-compression-filesystem4.0-cil_5.18.0.240+dfsg-5_all.deb ... 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Selecting previously unselected package libmono-system-reactive-providers2.2-cil. Preparing to unpack .../189-libmono-system-reactive-providers2.2-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-reactive-providers2.2-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-reactive-observable-aliases0.0-cil. Preparing to unpack .../190-libmono-system-reactive-observable-aliases0.0-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-reactive-observable-aliases0.0-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-reactive-platformservices2.2-cil. Preparing to unpack .../191-libmono-system-reactive-platformservices2.2-cil_5.18.0.240+dfsg-5_all.deb ... Unpacking libmono-system-reactive-platformservices2.2-cil (5.18.0.240+dfsg-5) ... Selecting previously unselected package libmono-system-reactive-runtime-remoting2.2-cil. 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Setting up librole-tiny-perl (2.000006-1) ... Setting up libsub-override-perl (0.09-2) ... Setting up libdevel-globaldestruction-perl (0.14-1) ... Setting up netbase (5.6) ... Setting up libstrictures-perl (2.000006-1) ... Setting up libsub-quote-perl (2.006003-1) ... Setting up libkrb5-3:i386 (1.17-6) ... Setting up ocaml-base-nox (4.05.0-12ubuntu3) ... Setting up libmpdec2:i386 (2.4.2-2) ... Setting up libfile-homedir-perl (1.004-1) ... Setting up libbsd0:i386 (0.10.0-1) ... Setting up libdrm-common (2.4.97-1ubuntu1) ... Setting up libelf1:i386 (0.176-1.1) ... Setting up libxml2:i386 (2.9.4+dfsg1-7ubuntu3) ... Setting up liburi-perl (1.76-1) ... Setting up dctrl-tools (2.24-3) ... Setting up libheimbase1-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up gnupg-utils (2.2.12-1ubuntu3) ... Setting up libnet-ssleay-perl (1.88-0ubuntu1) ... Setting up libjpeg8:i386 (8c-2ubuntu8) ... Setting up libfile-stripnondeterminism-perl (1.6.0-1) ... Setting up libhttp-date-perl (6.02-1) ... Setting up libxdmcp6:i386 (1:1.1.3-0ubuntu1) ... Setting up libpython3.7-stdlib:i386 (3.7.4-4) ... Setting up libxcb1:i386 (1.13.1-2) ... Setting up libfile-listing-perl (6.04-1) ... Setting up libmonosgen-2.0-dev (5.18.0.240+dfsg-5) ... Setting up python2.7 (2.7.16-4) ... Setting up libtool (2.4.6-11) ... Setting up libpython2-stdlib:i386 (2.7.16-1) ... Setting up libxcb-render0:i386 (1.13.1-2) ... Setting up fontconfig-config (2.13.1-2ubuntu2) ... Setting up libxcb-glx0:i386 (1.13.1-2) ... Setting up libasn1-8-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up libedit2:i386 (3.1-20190324-1) ... Setting up libavahi-common3:i386 (0.7-4ubuntu5) ... Setting up libnet-http-perl (6.19-1) ... Setting up m4 (1.4.18-2) ... Setting up libnss3:i386 (2:3.45-1ubuntu2) ... Setting up libxcb-shm0:i386 (1.13.1-2) ... Setting up libdevel-callchecker-perl (0.008-1) ... Setting up libhcrypto4-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up python2 (2.7.16-1) ... Setting up libxcb-present0:i386 (1.13.1-2) ... Setting up libpython-stdlib:i386 (2.7.16-1) ... Setting up libwind0-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up libxcb-sync1:i386 (1.13.1-2) ... Setting up bsdmainutils (11.1.2ubuntu2) ... update-alternatives: using /usr/bin/bsd-write to provide /usr/bin/write (write) in auto mode update-alternatives: using /usr/bin/bsd-from to provide /usr/bin/from (from) in auto mode Setting up libgssapi-krb5-2:i386 (1.17-6) ... Setting up libcroco3:i386 (0.6.13-1) ... Setting up autoconf (2.69-11) ... Setting up libxcb-dri2-0:i386 (1.13.1-2) ... Setting up libwww-robotrules-perl (6.02-1) ... Setting up libdrm2:i386 (2.4.97-1ubuntu1) ... Setting up dwz (0.13-1) ... Setting up groff-base (1.22.4-3) ... Setting up libhtml-parser-perl (3.72-3build2) ... Setting up libx11-6:i386 (2:1.6.7-1) ... Setting up libtiff5:i386 (4.0.10+git190818-1) ... Setting up libfontconfig1:i386 (2.13.1-2ubuntu2) ... Setting up python (2.7.16-1) ... Setting up libavahi-client3:i386 (0.7-4ubuntu5) ... Setting up libmono-2.0-dev (5.18.0.240+dfsg-5) ... Setting up libio-socket-ssl-perl (2.066-0ubuntu4) ... Setting up libpython3-stdlib:i386 (3.7.3-1) ... Setting up libhttp-message-perl (6.18-1) ... Setting up libdrm-amdgpu1:i386 (2.4.97-1ubuntu1) ... Setting up automake (1:1.16.1-4ubuntu3) ... update-alternatives: using /usr/bin/automake-1.16 to provide /usr/bin/automake (automake) in auto mode Setting up libllvm8:i386 (1:8.0.1-3build1) ... Setting up libxcb-dri3-0:i386 (1.13.1-2) ... Setting up python3.7 (3.7.4-4) ... Setting up libhttp-negotiate-perl (6.01-1) ... Setting up libdrm-nouveau2:i386 (2.4.97-1ubuntu1) ... Setting up gettext (0.19.8.1-9) ... Setting up libxdamage1:i386 (1:1.1.5-1) ... Setting up libxrender1:i386 (1:0.9.10-1) ... Setting up libhttp-cookies-perl (6.04-1) ... Setting up libdrm-radeon1:i386 (2.4.97-1ubuntu1) ... Setting up libhx509-5-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up libhtml-tree-perl (5.07-2) ... Setting up libparams-classify-perl (0.015-1build1) ... Setting up libdrm-intel1:i386 (2.4.97-1ubuntu1) ... Setting up libgl1-mesa-dri:i386 (19.1.6-1ubuntu1) ... Setting up libxext6:i386 (2:1.3.4-0ubuntu1) ... Setting up python3 (3.7.3-1) ... Setting up man-db (2.8.7-3) ... Not building database; man-db/auto-update is not 'true'. Created symlink /etc/systemd/system/timers.target.wants/man-db.timer → /lib/systemd/system/man-db.timer. Setting up libcairo2:i386 (1.16.0-4) ... Setting up libxxf86vm1:i386 (1:1.1.4-1build1) ... Setting up intltool-debian (0.35.0+20060710.5) ... Setting up libmodule-runtime-perl (0.016-1) ... Setting up libxfixes3:i386 (1:5.0.3-1) ... Setting up libcups2:i386 (2.2.12-2ubuntu1) ... Setting up python3-lib2to3 (3.7.4-3) ... Setting up libkrb5-26-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up python3-distutils (3.7.4-3) ... Setting up dh-python (4.20190722ubuntu1) ... Setting up libglx-mesa0:i386 (19.1.6-1ubuntu1) ... Setting up libxi6:i386 (2:1.7.10-0ubuntu1) ... Setting up libglx0:i386 (1.1.1-0ubuntu1) ... Setting up libimport-into-perl (1.002005-1) ... Setting up libxtst6:i386 (2:1.2.3-1) ... Setting up libmoo-perl (2.003004-2) ... Setting up po-debconf (1.0.21) ... Setting up libgdiplus (4.2-2) ... Setting up libheimntlm0-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up libgl1:i386 (1.1.1-0ubuntu1) ... Setting up libgssapi3-heimdal:i386 (7.5.0+dfsg-3build1) ... Setting up libldap-2.4-2:i386 (2.4.48+dfsg-1ubuntu1) ... Setting up dirmngr (2.2.12-1ubuntu3) ... Setting up gpg-wks-client (2.2.12-1ubuntu3) ... Setting up gnupg (2.2.12-1ubuntu3) ... Setting up ca-certificates-java (20190405ubuntu1) ... head: cannot open '/etc/ssl/certs/java/cacerts' for reading: No such file or directory Adding debian:DigiCert_Global_Root_G3.pem Adding debian:Buypass_Class_3_Root_CA.pem Adding debian:Security_Communication_RootCA2.pem Adding debian:D-TRUST_Root_Class_3_CA_2_2009.pem Adding debian:Certplus_Class_2_Primary_CA.pem Adding debian:OISTE_WISeKey_Global_Root_GA_CA.pem Adding debian:GeoTrust_Universal_CA_2.pem Adding debian:TrustCor_ECA-1.pem Adding debian:Staat_der_Nederlanden_Root_CA_-_G2.pem Adding debian:thawte_Primary_Root_CA_-_G3.pem Adding debian:Hellenic_Academic_and_Research_Institutions_RootCA_2015.pem Adding debian:GeoTrust_Primary_Certification_Authority.pem Adding debian:Security_Communication_Root_CA.pem Adding debian:GlobalSign_ECC_Root_CA_-_R4.pem Adding debian:Certum_Trusted_Network_CA_2.pem Adding debian:TeliaSonera_Root_CA_v1.pem Adding debian:ACCVRAIZ1.pem Adding debian:QuoVadis_Root_CA_3_G3.pem Adding debian:Network_Solutions_Certificate_Authority.pem Adding debian:DigiCert_Assured_ID_Root_G2.pem Adding debian:Amazon_Root_CA_3.pem Adding debian:QuoVadis_Root_CA_1_G3.pem Adding debian:DigiCert_Assured_ID_Root_G3.pem Adding debian:LuxTrust_Global_Root_2.pem Adding debian:DigiCert_Assured_ID_Root_CA.pem Adding debian:Starfield_Services_Root_Certificate_Authority_-_G2.pem Adding debian:Amazon_Root_CA_1.pem Adding debian:Cybertrust_Global_Root.pem Adding debian:GeoTrust_Global_CA.pem Adding debian:DigiCert_Global_Root_CA.pem Adding debian:Verisign_Class_3_Public_Primary_Certification_Authority_-_G3.pem Adding debian:Certum_Trusted_Network_CA.pem Adding debian:AddTrust_External_Root.pem Adding debian:VeriSign_Class_3_Public_Primary_Certification_Authority_-_G5.pem Adding debian:GeoTrust_Primary_Certification_Authority_-_G3.pem Adding debian:DST_Root_CA_X3.pem Adding debian:TrustCor_RootCert_CA-2.pem Adding debian:SwissSign_Gold_CA_-_G2.pem Adding debian:TUBITAK_Kamu_SM_SSL_Kok_Sertifikasi_-_Surum_1.pem Adding debian:USERTrust_RSA_Certification_Authority.pem Adding debian:DigiCert_Trusted_Root_G4.pem Adding debian:DigiCert_Global_Root_G2.pem Adding debian:Staat_der_Nederlanden_EV_Root_CA.pem Adding debian:Starfield_Class_2_CA.pem Adding debian:Taiwan_GRCA.pem Adding debian:TWCA_Root_Certification_Authority.pem Adding debian:GeoTrust_Primary_Certification_Authority_-_G2.pem Adding debian:T-TeleSec_GlobalRoot_Class_2.pem Adding debian:QuoVadis_Root_CA_2_G3.pem Adding debian:VeriSign_Class_3_Public_Primary_Certification_Authority_-_G4.pem Adding debian:SwissSign_Silver_CA_-_G2.pem Adding debian:SSL.com_Root_Certification_Authority_ECC.pem Adding debian:NetLock_Arany_=Class_Gold=_Főtanúsítvány.pem Adding debian:Go_Daddy_Class_2_CA.pem Adding debian:Entrust_Root_Certification_Authority_-_EC1.pem Adding debian:Baltimore_CyberTrust_Root.pem Adding debian:GlobalSign_ECC_Root_CA_-_R5.pem Adding debian:Atos_TrustedRoot_2011.pem Adding debian:Entrust_Root_Certification_Authority.pem Adding debian:Izenpe.com.pem Adding debian:EE_Certification_Centre_Root_CA.pem Adding debian:AffirmTrust_Networking.pem Adding debian:AffirmTrust_Premium_ECC.pem Adding debian:GlobalSign_Root_CA_-_R2.pem Adding debian:E-Tugra_Certification_Authority.pem Adding debian:Autoridad_de_Certificacion_Firmaprofesional_CIF_A62634068.pem Adding debian:AffirmTrust_Premium.pem Adding debian:Entrust.net_Premium_2048_Secure_Server_CA.pem Adding debian:COMODO_ECC_Certification_Authority.pem Adding debian:SecureTrust_CA.pem Adding debian:Go_Daddy_Root_Certificate_Authority_-_G2.pem Adding debian:SSL.com_Root_Certification_Authority_RSA.pem Adding debian:CA_Disig_Root_R2.pem Adding debian:COMODO_Certification_Authority.pem Adding debian:AC_RAIZ_FNMT-RCM.pem Adding debian:Certigna.pem Adding debian:Buypass_Class_2_Root_CA.pem Adding debian:GlobalSign_Root_CA_-_R6.pem Adding debian:Starfield_Root_Certificate_Authority_-_G2.pem Adding debian:AffirmTrust_Commercial.pem Adding debian:USERTrust_ECC_Certification_Authority.pem Adding debian:Amazon_Root_CA_2.pem Adding debian:GlobalSign_Root_CA_-_R3.pem Adding debian:COMODO_RSA_Certification_Authority.pem Adding debian:SSL.com_EV_Root_Certification_Authority_ECC.pem Adding debian:SecureSign_RootCA11.pem Adding debian:Sonera_Class_2_Root_CA.pem Adding debian:certSIGN_ROOT_CA.pem Adding debian:T-TeleSec_GlobalRoot_Class_3.pem Adding debian:Certinomis_-_Root_CA.pem Adding debian:SZAFIR_ROOT_CA2.pem Adding debian:TrustCor_RootCert_CA-1.pem Adding debian:TWCA_Global_Root_CA.pem Adding debian:OISTE_WISeKey_Global_Root_GB_CA.pem Adding debian:Comodo_AAA_Services_root.pem Adding debian:Chambers_of_Commerce_Root_-_2008.pem Adding debian:SSL.com_EV_Root_Certification_Authority_RSA_R2.pem Adding debian:QuoVadis_Root_CA_3.pem Adding debian:D-TRUST_Root_Class_3_CA_2_EV_2009.pem Adding debian:Hellenic_Academic_and_Research_Institutions_RootCA_2011.pem Adding debian:Hongkong_Post_Root_CA_1.pem Adding debian:Trustis_FPS_Root_CA.pem Adding debian:QuoVadis_Root_CA_2.pem Adding debian:ePKI_Root_Certification_Authority.pem Adding debian:DigiCert_High_Assurance_EV_Root_CA.pem Adding debian:GeoTrust_Universal_CA.pem Adding debian:thawte_Primary_Root_CA_-_G2.pem Adding debian:VeriSign_Universal_Root_Certification_Authority.pem Adding debian:Hellenic_Academic_and_Research_Institutions_ECC_RootCA_2015.pem Adding debian:IdenTrust_Public_Sector_Root_CA_1.pem Adding debian:thawte_Primary_Root_CA.pem Adding debian:XRamp_Global_CA_Root.pem Adding debian:Secure_Global_CA.pem Adding debian:GlobalSign_Root_CA.pem Adding debian:OISTE_WISeKey_Global_Root_GC_CA.pem Adding debian:Global_Chambersign_Root_-_2008.pem Adding debian:GDCA_TrustAUTH_R5_ROOT.pem Adding debian:Amazon_Root_CA_4.pem Adding debian:EC-ACC.pem Adding debian:CFCA_EV_ROOT.pem Adding debian:Deutsche_Telekom_Root_CA_2.pem Adding debian:Microsec_e-Szigno_Root_CA_2009.pem Adding debian:QuoVadis_Root_CA.pem Adding debian:ISRG_Root_X1.pem Adding debian:Entrust_Root_Certification_Authority_-_G2.pem Adding debian:Staat_der_Nederlanden_Root_CA_-_G3.pem Adding debian:Actalis_Authentication_Root_CA.pem Adding debian:IdenTrust_Commercial_Root_CA_1.pem done. 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Setting up libmono-system-web-webpages-deployment2.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-web-http-webhost4.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-web-extensions4.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-servicemodel-web4.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-http4.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-web-routing4.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-web-dynamicdata4.0-cil (5.18.0.240+dfsg-5) ... Setting up libnunit-util2.6.3-cil (2.6.4+dfsg-1) ... * Installing 1 assembly from libnunit-util2.6.3-cil into Mono Setting up libmono-system-web-webpages2.0-cil (5.18.0.240+dfsg-5) ... Setting up libnunit-console-runner2.6.3-cil (2.6.4+dfsg-1) ... * Installing 1 assembly from libnunit-console-runner2.6.3-cil into Mono Setting up libmono-system-data-services4.0-cil (5.18.0.240+dfsg-5) ... Setting up libnunit-cil-dev (2.6.4+dfsg-1) ... Setting up libmono-system-web-webpages-razor2.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-system-web-mvc3.0-cil (5.18.0.240+dfsg-5) ... Setting up libmono-cil-dev (5.18.0.240+dfsg-5) ... Setting up mono-devel (5.18.0.240+dfsg-5) ... update-alternatives: using /usr/bin/mono-csc to provide /usr/bin/cli-csc (c-sharp-compiler) in auto mode update-alternatives: using /usr/bin/resgen to provide /usr/bin/cli-resgen (resource-file-generator) in auto mode update-alternatives: using /usr/bin/al to provide /usr/bin/cli-al (assembly-linker) in auto mode update-alternatives: using /usr/bin/sn to provide /usr/bin/cli-sn (strong-name-tool) in auto mode Setting up cli-common-dev (0.10) ... Processing triggers for libc-bin (2.30-0ubuntu1) ... Processing triggers for systemd (241-7ubuntu1) ... Processing triggers for ca-certificates (20190110) ... Updating certificates in /etc/ssl/certs... 0 added, 0 removed; done. Running hooks in /etc/ca-certificates/update.d... done. done. Setting up openjdk-11-jre-headless:i386 (11.0.5+6-1ubuntu2) ... update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/rmid to provide /usr/bin/rmid (rmid) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/java to provide /usr/bin/java (java) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/keytool to provide /usr/bin/keytool (keytool) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jjs to provide /usr/bin/jjs (jjs) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/pack200 to provide /usr/bin/pack200 (pack200) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/rmiregistry to provide /usr/bin/rmiregistry (rmiregistry) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/unpack200 to provide /usr/bin/unpack200 (unpack200) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/lib/jexec to provide /usr/bin/jexec (jexec) in auto mode OpenJDK Client VM warning: Ignoring option PermSize; support was removed in 8.0 Setting up openjdk-11-jre:i386 (11.0.5+6-1ubuntu2) ... Setting up openjdk-11-jdk-headless:i386 (11.0.5+6-1ubuntu2) ... update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jar to provide /usr/bin/jar (jar) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jarsigner to provide /usr/bin/jarsigner (jarsigner) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/javac to provide /usr/bin/javac (javac) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/javadoc to provide /usr/bin/javadoc (javadoc) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/javap to provide /usr/bin/javap (javap) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jcmd to provide /usr/bin/jcmd (jcmd) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jdb to provide /usr/bin/jdb (jdb) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jdeprscan to provide /usr/bin/jdeprscan (jdeprscan) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jdeps to provide /usr/bin/jdeps (jdeps) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jimage to provide /usr/bin/jimage (jimage) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jinfo to provide /usr/bin/jinfo (jinfo) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jlink to provide /usr/bin/jlink (jlink) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jmap to provide /usr/bin/jmap (jmap) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jmod to provide /usr/bin/jmod (jmod) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jps to provide /usr/bin/jps (jps) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jrunscript to provide /usr/bin/jrunscript (jrunscript) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jshell to provide /usr/bin/jshell (jshell) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jstack to provide /usr/bin/jstack (jstack) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jstat to provide /usr/bin/jstat (jstat) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jstatd to provide /usr/bin/jstatd (jstatd) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/rmic to provide /usr/bin/rmic (rmic) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/serialver to provide /usr/bin/serialver (serialver) in auto mode update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jhsdb to provide /usr/bin/jhsdb (jhsdb) in auto mode Setting up default-jre (2:1.11-72) ... Setting up default-jdk-headless (2:1.11-72) ... Setting up openjdk-11-jdk:i386 (11.0.5+6-1ubuntu2) ... update-alternatives: using /usr/lib/jvm/java-11-openjdk-i386/bin/jconsole to provide /usr/bin/jconsole (jconsole) in auto mode Setting up default-jdk (2:1.11-72) ... Setting up sbuild-build-depends-z3-dummy (0.invalid.0) ... +------------------------------------------------------------------------------+ | Build environment | +------------------------------------------------------------------------------+ Kernel: Linux 4.4.0-161-generic amd64 (i686) Toolchain package versions: binutils_2.32.51.20190905-0ubuntu1 dpkg-dev_1.19.7ubuntu2 g++-9_9.2.1-8ubuntu1 gcc-9_9.2.1-8ubuntu1 libc6-dev_2.30-0ubuntu1 libstdc++-9-dev_9.2.1-8ubuntu1 libstdc++6_9.2.1-8ubuntu1 linux-libc-dev_5.3.0-10.11 Package versions: adduser_3.118ubuntu1 advancecomp_2.1-2.1 apt_1.9.3 autoconf_2.69-11 automake_1:1.16.1-4ubuntu3 autopoint_0.19.8.1-9 autotools-dev_20180224.1 base-files_10.2ubuntu6 base-passwd_3.5.46 bash_5.0-4ubuntu1 binutils_2.32.51.20190905-0ubuntu1 binutils-common_2.32.51.20190905-0ubuntu1 binutils-i686-linux-gnu_2.32.51.20190905-0ubuntu1 bsdmainutils_11.1.2ubuntu2 bsdutils_1:2.34-0.1ubuntu2 build-essential_12.7ubuntu1 bzip2_1.0.6-9.2 ca-certificates_20190110 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libmono-microsoft-build-engine4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-build-framework4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-build-tasks-v4.0-4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-build-utilities-v4.0-4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-build4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-csharp4.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-visualc10.0-cil_5.18.0.240+dfsg-5 libmono-microsoft-web-infrastructure1.0-cil_5.18.0.240+dfsg-5 libmono-oracle4.0-cil_5.18.0.240+dfsg-5 libmono-parallel4.0-cil_5.18.0.240+dfsg-5 libmono-peapi4.0a-cil_5.18.0.240+dfsg-5 libmono-posix4.0-cil_5.18.0.240+dfsg-5 libmono-rabbitmq4.0-cil_5.18.0.240+dfsg-5 libmono-relaxng4.0-cil_5.18.0.240+dfsg-5 libmono-security4.0-cil_5.18.0.240+dfsg-5 libmono-sharpzip4.84-cil_5.18.0.240+dfsg-5 libmono-simd4.0-cil_5.18.0.240+dfsg-5 libmono-smdiagnostics0.0-cil_5.18.0.240+dfsg-5 libmono-sqlite4.0-cil_5.18.0.240+dfsg-5 libmono-system-componentmodel-composition4.0-cil_5.18.0.240+dfsg-5 libmono-system-componentmodel-dataannotations4.0-cil_5.18.0.240+dfsg-5 libmono-system-configuration-install4.0-cil_5.18.0.240+dfsg-5 libmono-system-configuration4.0-cil_5.18.0.240+dfsg-5 libmono-system-core4.0-cil_5.18.0.240+dfsg-5 libmono-system-data-datasetextensions4.0-cil_5.18.0.240+dfsg-5 libmono-system-data-entity4.0-cil_5.18.0.240+dfsg-5 libmono-system-data-linq4.0-cil_5.18.0.240+dfsg-5 libmono-system-data-services-client4.0-cil_5.18.0.240+dfsg-5 libmono-system-data-services4.0-cil_5.18.0.240+dfsg-5 libmono-system-data4.0-cil_5.18.0.240+dfsg-5 libmono-system-deployment4.0-cil_5.18.0.240+dfsg-5 libmono-system-design4.0-cil_5.18.0.240+dfsg-5 libmono-system-drawing-design4.0-cil_5.18.0.240+dfsg-5 libmono-system-drawing4.0-cil_5.18.0.240+dfsg-5 libmono-system-dynamic4.0-cil_5.18.0.240+dfsg-5 libmono-system-enterpriseservices4.0-cil_5.18.0.240+dfsg-5 libmono-system-identitymodel-selectors4.0-cil_5.18.0.240+dfsg-5 libmono-system-identitymodel4.0-cil_5.18.0.240+dfsg-5 libmono-system-io-compression-filesystem4.0-cil_5.18.0.240+dfsg-5 libmono-system-io-compression4.0-cil_5.18.0.240+dfsg-5 libmono-system-json-microsoft4.0-cil_5.18.0.240+dfsg-5 libmono-system-json4.0-cil_5.18.0.240+dfsg-5 libmono-system-ldap-protocols4.0-cil_5.18.0.240+dfsg-5 libmono-system-ldap4.0-cil_5.18.0.240+dfsg-5 libmono-system-management4.0-cil_5.18.0.240+dfsg-5 libmono-system-messaging4.0-cil_5.18.0.240+dfsg-5 libmono-system-net-http-formatting4.0-cil_5.18.0.240+dfsg-5 libmono-system-net-http-webrequest4.0-cil_5.18.0.240+dfsg-5 libmono-system-net-http4.0-cil_5.18.0.240+dfsg-5 libmono-system-net4.0-cil_5.18.0.240+dfsg-5 libmono-system-numerics-vectors4.0-cil_5.18.0.240+dfsg-5 libmono-system-numerics4.0-cil_5.18.0.240+dfsg-5 libmono-system-reactive-core2.2-cil_5.18.0.240+dfsg-5 libmono-system-reactive-debugger2.2-cil_5.18.0.240+dfsg-5 libmono-system-reactive-experimental2.2-cil_5.18.0.240+dfsg-5 libmono-system-reactive-interfaces2.2-cil_5.18.0.240+dfsg-5 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libmono-system-servicemodel-internals0.0-cil_5.18.0.240+dfsg-5 libmono-system-servicemodel-routing4.0-cil_5.18.0.240+dfsg-5 libmono-system-servicemodel-web4.0-cil_5.18.0.240+dfsg-5 libmono-system-servicemodel4.0a-cil_5.18.0.240+dfsg-5 libmono-system-serviceprocess4.0-cil_5.18.0.240+dfsg-5 libmono-system-threading-tasks-dataflow4.0-cil_5.18.0.240+dfsg-5 libmono-system-transactions4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-abstractions4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-applicationservices4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-dynamicdata4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-extensions-design4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-extensions4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-http-selfhost4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-http-webhost4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-http4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-mobile4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-mvc3.0-cil_5.18.0.240+dfsg-5 libmono-system-web-razor2.0-cil_5.18.0.240+dfsg-5 libmono-system-web-regularexpressions4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-routing4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-services4.0-cil_5.18.0.240+dfsg-5 libmono-system-web-webpages-deployment2.0-cil_5.18.0.240+dfsg-5 libmono-system-web-webpages-razor2.0-cil_5.18.0.240+dfsg-5 libmono-system-web-webpages2.0-cil_5.18.0.240+dfsg-5 libmono-system-web4.0-cil_5.18.0.240+dfsg-5 libmono-system-windows-forms-datavisualization4.0a-cil_5.18.0.240+dfsg-5 libmono-system-windows-forms4.0-cil_5.18.0.240+dfsg-5 libmono-system-windows4.0-cil_5.18.0.240+dfsg-5 libmono-system-workflow-activities4.0-cil_5.18.0.240+dfsg-5 libmono-system-workflow-componentmodel4.0-cil_5.18.0.240+dfsg-5 libmono-system-workflow-runtime4.0-cil_5.18.0.240+dfsg-5 libmono-system-xaml4.0-cil_5.18.0.240+dfsg-5 libmono-system-xml-linq4.0-cil_5.18.0.240+dfsg-5 libmono-system-xml-serialization4.0-cil_5.18.0.240+dfsg-5 libmono-system-xml4.0-cil_5.18.0.240+dfsg-5 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libxcb1_1.13.1-2 libxdamage1_1:1.1.5-1 libxdmcp6_1:1.1.3-0ubuntu1 libxext6_2:1.3.4-0ubuntu1 libxfixes3_1:5.0.3-1 libxi6_2:1.7.10-0ubuntu1 libxml-dom-perl_1.44-2 libxml-parser-perl_2.44-4 libxml-perl_0.08-3 libxml-regexp-perl_0.04-1 libxml2_2.9.4+dfsg1-7ubuntu3 libxrender1_1:0.9.10-1 libxshmfence1_1.3-1 libxtst6_2:1.2.3-1 libxxf86vm1_1:1.1.4-1build1 libzstd1_1.4.3+dfsg-1 linux-libc-dev_5.3.0-10.11 lockfile-progs_0.1.18 login_1:4.5-1.1ubuntu4 logsave_1.45.3-4ubuntu1 lsb-base_11.0.1ubuntu1 m4_1.4.18-2 make_4.2.1-1.2 man-db_2.8.7-3 mawk_1.3.3-17ubuntu3 mime-support_3.63ubuntu1 mono-4.0-gac_5.18.0.240+dfsg-5 mono-devel_5.18.0.240+dfsg-5 mono-gac_5.18.0.240+dfsg-5 mono-mcs_5.18.0.240+dfsg-5 mono-runtime_5.18.0.240+dfsg-5 mono-runtime-common_5.18.0.240+dfsg-5 mono-runtime-sgen_5.18.0.240+dfsg-5 mono-utils_5.18.0.240+dfsg-5 mono-xbuild_5.18.0.240+dfsg-5 mount_2.34-0.1ubuntu2 ncurses-base_6.1+20190803-1ubuntu1 ncurses-bin_6.1+20190803-1ubuntu1 netbase_5.6 ocaml-base-nox_4.05.0-12ubuntu3 ocaml-compiler-libs_4.05.0-12ubuntu3 ocaml-interp_4.05.0-12ubuntu3 ocaml-nox_4.05.0-12ubuntu3 openjdk-11-jdk_11.0.5+6-1ubuntu2 openjdk-11-jdk-headless_11.0.5+6-1ubuntu2 openjdk-11-jre_11.0.5+6-1ubuntu2 openjdk-11-jre-headless_11.0.5+6-1ubuntu2 openssl_1.1.1c-1ubuntu4 optipng_0.7.7-1 passwd_1:4.5-1.1ubuntu4 patch_2.7.6-6 patchutils_0.3.4-2 perl_5.28.1-6build1 perl-base_5.28.1-6build1 perl-modules-5.28_5.28.1-6build1 perl-openssl-defaults_3build1 pinentry-curses_1.1.0-3 pkg-config_0.29.1-0ubuntu3 pkgbinarymangler_144 po-debconf_1.0.21 policyrcd-script-zg2_0.1-3 procps_2:3.3.15-2ubuntu3 python_2.7.16-1 python-minimal_2.7.16-1 python2_2.7.16-1 python2-minimal_2.7.16-1 python2.7_2.7.16-4 python2.7-minimal_2.7.16-4 python3_3.7.3-1 python3-distutils_3.7.4-3 python3-lib2to3_3.7.4-3 python3-minimal_3.7.3-1 python3.7_3.7.4-4 python3.7-minimal_3.7.4-4 readline-common_8.0-3 sbuild-build-depends-core-dummy_0.invalid.0 sbuild-build-depends-z3-dummy_0.invalid.0 sed_4.7-1 sensible-utils_0.0.12 systemd_241-7ubuntu1 systemd-sysv_241-7ubuntu1 sysvinit-utils_2.95-5ubuntu2 tar_1.30+dfsg-6 tzdata_2019b-2 ubuntu-keyring_2018.09.18.1 ucf_3.0038+nmu1 util-linux_2.34-0.1ubuntu2 wdiff_1.2.2-2build1 x11-common_1:7.7+19ubuntu12 xz-utils_5.2.4-1 zlib1g_1:1.2.11.dfsg-1ubuntu3 +------------------------------------------------------------------------------+ | Build | +------------------------------------------------------------------------------+ Unpack source ------------- gpgv: Signature made Fri Sep 13 08:27:10 2019 UTC gpgv: using RSA key 92978A6E195E4921825F7FF0F34F09744E9F5DD9 gpgv: Can't check signature: No public key dpkg-source: warning: failed to verify signature on ./z3_4.8.4-1build1.dsc dpkg-source: info: extracting z3 in z3-4.8.4 dpkg-source: info: unpacking z3_4.8.4.orig.tar.gz dpkg-source: info: unpacking z3_4.8.4-1build1.debian.tar.xz dpkg-source: info: using patch list from debian/patches/series dpkg-source: info: applying 00-avoid-ocamlopt.patch dpkg-source: info: applying 01-intrinsics.patch dpkg-source: info: applying 02-hardening.patch dpkg-source: info: applying 03-kfreebsd.patch dpkg-source: info: applying 04-soname.patch Check disc space ---------------- Sufficient free space for build User Environment ---------------- APT_CONFIG=/var/lib/sbuild/apt.conf DEB_BUILD_OPTIONS=parallel=4 HOME=/sbuild-nonexistent LANG=C.UTF-8 LC_ALL=C.UTF-8 LOGNAME=buildd PATH=/usr/local/sbin:/usr/local/bin:/usr/sbin:/usr/bin:/sbin:/bin:/usr/games SCHROOT_ALIAS_NAME=build-PACKAGEBUILD-17760547 SCHROOT_CHROOT_NAME=build-PACKAGEBUILD-17760547 SCHROOT_COMMAND=env SCHROOT_GID=2501 SCHROOT_GROUP=buildd SCHROOT_SESSION_ID=build-PACKAGEBUILD-17760547 SCHROOT_UID=2001 SCHROOT_USER=buildd SHELL=/bin/sh TERM=unknown USER=buildd V=1 dpkg-buildpackage ----------------- dpkg-buildpackage: info: source package z3 dpkg-buildpackage: info: source version 4.8.4-1build1 dpkg-buildpackage: info: source distribution eoan dpkg-source --before-build . dpkg-buildpackage: info: host architecture i386 fakeroot debian/rules clean if [ yes = yes ]; then \ if [ yes = yes ]; then \ dh clean --parallel --with python2,javahelper,ocaml,cli; \ else \ dh clean --parallel --with python2,javahelper,ocaml; \ fi; \ else \ dh clean --parallel --with python2,ocaml; \ fi jh_clean dh_ocamlclean debian/rules override_dh_clean make[1]: Entering directory '/<>' dh_clean sed -i 's/^DOTNET_ENABLED=.*/DOTNET_ENABLED=False/' scripts/mk_util.py rm -f Makefile scripts/*.pyc rm -f -r build rm -f src/api/python/*.pyc rm -f \ src/api/api_commands.cpp \ src/api/api_log_macros.cpp \ src/api/api_log_macros.h \ src/api/dll/gparams_register_modules.cpp \ src/api/dll/install_tactic.cpp \ src/api/dll/mem_initializer.cpp \ src/api/dotnet/Enumerations.cs \ src/api/dotnet/Native.cs \ src/api/dotnet/Properties/AssemblyInfo.cs \ src/api/python/z3consts.py \ src/api/python/z3core.py \ src/api/java/Native.cpp \ src/api/java/Native.java \ src/api/java/enumerations/Z3_ast_kind.java \ src/api/java/enumerations/Z3_ast_print_mode.java \ src/api/java/enumerations/Z3_decl_kind.java \ src/api/java/enumerations/Z3_error_code.java \ src/api/java/enumerations/Z3_goal_prec.java \ src/api/java/enumerations/Z3_lbool.java \ src/api/java/enumerations/Z3_param_kind.java \ src/api/java/enumerations/Z3_parameter_kind.java \ src/api/java/enumerations/Z3_sort_kind.java \ src/api/java/enumerations/Z3_symbol_kind.java \ src/api/ml/z3native.ml \ src/api/ml/z3native.mli \ src/api/ml/z3native_stubs.c \ src/api/ml/z3enums.ml \ src/api/ml/z3enums.mli \ src/ast/fpa/fpa2bv_rewriter_params.hpp \ src/ast/normal_forms/nnf_params.hpp \ src/ast/pattern/database.h \ src/ast/pattern/pattern_inference_params_helper.hpp \ src/ast/pp_params.hpp \ src/ast/rewriter/arith_rewriter_params.hpp \ src/ast/rewriter/array_rewriter_params.hpp \ src/ast/rewriter/bool_rewriter_params.hpp \ src/ast/rewriter/bv_rewriter_params.hpp \ src/ast/rewriter/fpa_rewriter_params.hpp \ src/ast/rewriter/poly_rewriter_params.hpp \ src/ast/rewriter/rewriter_params.hpp \ src/ast/simplifier/arith_simplifier_params_helper.hpp \ src/ast/simplifier/array_simplifier_params_helper.hpp \ src/ast/simplifier/bv_simplifier_params_helper.hpp \ src/interp/interp_params.hpp \ src/math/polynomial/algebraic_params.hpp \ src/math/realclosure/rcf_params.hpp \ src/model/model_evaluator_params.hpp \ src/model/model_params.hpp \ src/muz/base/fixedpoint_params.hpp \ src/nlsat/nlsat_params.hpp \ src/parsers/util/parser_params.hpp \ src/sat/sat_asymm_branch_params.hpp \ src/sat/sat_params.hpp \ src/sat/sat_scc_params.hpp \ src/sat/sat_simplifier_params.hpp \ src/shell/gparams_register_modules.cpp \ src/shell/install_tactic.cpp \ src/shell/mem_initializer.cpp \ src/smt/params/smt_params_helper.hpp \ src/solver/combined_solver_params.hpp \ src/tactic/sls/sls_params.hpp \ src/test/gparams_register_modules.cpp \ src/test/install_tactic.cpp \ src/test/mem_initializer.cpp \ src/util/version.h \ src/opt/opt_params.hpp make[1]: Leaving directory '/<>' debian/rules build-arch if [ yes = yes ]; then \ if [ yes = yes ]; then \ dh build-arch --parallel --with python2,javahelper,ocaml,cli; \ else \ dh build-arch --parallel --with python2,javahelper,ocaml; \ fi; \ else \ dh build-arch --parallel --with python2,ocaml; \ fi dh_update_autotools_config -a -O--parallel dh_autoreconf -a -O--parallel dh_ocamlinit -a -O--parallel debian/rules override_dh_auto_configure make[1]: Entering directory '/<>' if [ yes = yes ]; then \ sed -i 's/^DOTNET_ENABLED=.*/DOTNET_ENABLED=True/' scripts/mk_util.py; \ else \ sed -i 's/^DOTNET_ENABLED=.*/DOTNET_ENABLED=False/' scripts/mk_util.py; \ fi if [ yes = yes ]; then \ python scripts/mk_make.py --java --ml --prefix=/<>/debian/tmp/usr; \ else \ python scripts/mk_make.py --ml --prefix=/<>/debian/tmp/usr; \ fi opt = --java, arg = opt = --ml, arg = opt = --prefix, arg = /<>/debian/tmp/usr New component: 'util' New component: 'polynomial' New component: 'sat' New component: 'nlsat' New component: 'lp' New component: 'hilbert' New component: 'simplex' New component: 'automata' New component: 'interval' New component: 'realclosure' New component: 'subpaving' New component: 'ast' New component: 'rewriter' New component: 'macros' New component: 'normal_forms' New component: 'model' New component: 'tactic' New component: 'substitution' New component: 'parser_util' New component: 'grobner' New component: 'euclid' New component: 'core_tactics' New component: 'proofs' New component: 'solver' New component: 'sat_tactic' New component: 'arith_tactics' New component: 'nlsat_tactic' New component: 'subpaving_tactic' New component: 'aig_tactic' New component: 'ackermannization' New component: 'cmd_context' New component: 'smt2parser' New component: 'fpa' New component: 'pattern' New component: 'bit_blaster' New component: 'smt_params' New component: 'proto_model' New component: 'smt' New component: 'bv_tactics' New component: 'fuzzing' New component: 'smt_tactic' New component: 'sls_tactic' New component: 'qe' New component: 'sat_solver' New component: 'fd_solver' New component: 'muz' New component: 'dataflow' New component: 'transforms' New component: 'rel' New component: 'spacer' New component: 'clp' New component: 'tab' New component: 'ddnf' New component: 'bmc' New component: 'fp' New component: 'ufbv_tactic' New component: 'smtlogic_tactics' New component: 'fpa_tactics' New component: 'portfolio' New component: 'opt' New component: 'api' New component: 'extra_cmds' New component: 'shell' New component: 'test' New component: 'api_dll' New component: 'dotnet' New component: 'dotnetcore' New component: 'java' New component: 'ml' New component: 'cpp' Python bindings directory was detected. New component: 'python' New component: 'python_install' New component: 'js' New component: 'cpp_example' New component: 'z3_tptp' New component: 'c_example' New component: 'maxsat' New component: 'dotnet_example' New component: 'java_example' New component: 'py_example' Generating src/util/z3_version.h from src/util/z3_version.h.in Generated 'src/util/z3_version.h' Generating src/api/dotnet/Properties/AssemblyInfo.cs from src/api/dotnet/Properties/AssemblyInfo.cs.in Generating src/api/dotnet/Properties/AssemblyInfo.cs from src/api/dotnet/Properties/AssemblyInfo.cs.in Generated 'src/ast/pp_params.hpp' Generated 'src/ast/pattern/pattern_inference_params_helper.hpp' Generated 'src/ast/normal_forms/nnf_params.hpp' Generated 'src/ast/rewriter/poly_rewriter_params.hpp' Generated 'src/ast/rewriter/rewriter_params.hpp' Generated 'src/ast/rewriter/bool_rewriter_params.hpp' Generated 'src/ast/rewriter/array_rewriter_params.hpp' Generated 'src/ast/rewriter/arith_rewriter_params.hpp' Generated 'src/ast/rewriter/bv_rewriter_params.hpp' Generated 'src/ast/rewriter/fpa_rewriter_params.hpp' Generated 'src/ast/fpa/fpa2bv_rewriter_params.hpp' Generated 'src/smt/params/smt_params_helper.hpp' Generated 'src/sat/sat_asymm_branch_params.hpp' Generated 'src/sat/sat_scc_params.hpp' Generated 'src/sat/sat_params.hpp' Generated 'src/sat/sat_simplifier_params.hpp' Generated 'src/muz/base/fp_params.hpp' Generated 'src/opt/opt_params.hpp' Generated 'src/util/lp/lp_params.hpp' Generated 'src/ackermannization/ackermannization_params.hpp' Generated 'src/ackermannization/ackermannize_bv_tactic_params.hpp' Generated 'src/solver/parallel_params.hpp' Generated 'src/solver/combined_solver_params.hpp' Generated 'src/tactic/smtlogics/qfufbv_tactic_params.hpp' Generated 'src/tactic/sls/sls_params.hpp' Generated 'src/math/realclosure/rcf_params.hpp' Generated 'src/math/polynomial/algebraic_params.hpp' Generated 'src/nlsat/nlsat_params.hpp' Generated 'src/model/model_evaluator_params.hpp' Generated 'src/model/model_params.hpp' Generated 'src/parsers/util/parser_params.hpp' Generated 'src/ast/pattern/database.h' Component api Component portfolio Component smtlogic_tactics Component ackermannization Component model Component rewriter Component ast Component util Component polynomial Component automata Component solver Component tactic Component proofs Component sat_solver Component core_tactics Component macros Component normal_forms Component aig_tactic Component bv_tactics Component bit_blaster Component arith_tactics Component sat Component sat_tactic Component nlsat_tactic Component nlsat Component smt_tactic Component smt Component cmd_context Component proto_model Component smt_params Component pattern Component smt2parser Component parser_util Component substitution Component grobner Component euclid Component simplex Component fpa Component lp Component fp Component muz Component qe Component clp Component transforms Component hilbert Component dataflow Component tab Component rel Component bmc Component fd_solver Component ddnf Component spacer Component ufbv_tactic Component fpa_tactics Component sls_tactic Component subpaving_tactic Component subpaving Component interval Component realclosure Component opt Component extra_cmds Component shell Generated 'src/shell/install_tactic.cpp' Component api Component portfolio Component smtlogic_tactics Component ackermannization Component model Component rewriter Component ast Component util Component polynomial Component automata Component solver Component tactic Component proofs Component sat_solver Component core_tactics Component macros Component normal_forms Component aig_tactic Component bv_tactics Component bit_blaster Component arith_tactics Component sat Component sat_tactic Component nlsat_tactic Component nlsat Component smt_tactic Component smt Component cmd_context Component proto_model Component smt_params Component pattern Component smt2parser Component parser_util Component substitution Component grobner Component euclid Component simplex Component fpa Component lp Component fp Component muz Component qe Component clp Component transforms Component hilbert Component dataflow Component tab Component rel Component bmc Component fd_solver Component ddnf Component spacer Component ufbv_tactic Component fpa_tactics Component sls_tactic Component subpaving_tactic Component subpaving Component interval Component realclosure Component opt Component fuzzing Component test Generated 'src/test/install_tactic.cpp' Component api Component portfolio Component smtlogic_tactics Component ackermannization Component model Component rewriter Component ast Component util Component polynomial Component automata Component solver Component tactic Component proofs Component sat_solver Component core_tactics Component macros Component normal_forms Component aig_tactic Component bv_tactics Component bit_blaster Component arith_tactics Component sat Component sat_tactic Component nlsat_tactic Component nlsat Component smt_tactic Component smt Component cmd_context Component proto_model Component smt_params Component pattern Component smt2parser Component parser_util Component substitution Component grobner Component euclid Component simplex Component fpa Component lp Component fp Component muz Component qe Component clp Component transforms Component hilbert Component dataflow Component tab Component rel Component bmc Component fd_solver Component ddnf Component spacer Component ufbv_tactic Component fpa_tactics Component sls_tactic Component subpaving_tactic Component subpaving Component interval Component realclosure Component opt Component extra_cmds Component api_dll Generated 'src/api/dll/install_tactic.cpp' Generated 'src/shell/mem_initializer.cpp' Generated 'src/test/mem_initializer.cpp' Generated 'src/api/dll/mem_initializer.cpp' Generated 'src/shell/gparams_register_modules.cpp' Generated 'src/test/gparams_register_modules.cpp' Generated 'src/api/dll/gparams_register_modules.cpp' Generated 'src/api/python/z3/z3consts.py Finding javac ... Finding jar ... Testing /usr/bin/javac... Finding jni.h... Generated 'src/api/java/enumerations/Z3_lbool.java' Generated 'src/api/java/enumerations/Z3_symbol_kind.java' Generated 'src/api/java/enumerations/Z3_parameter_kind.java' Generated 'src/api/java/enumerations/Z3_sort_kind.java' Generated 'src/api/java/enumerations/Z3_ast_kind.java' Generated 'src/api/java/enumerations/Z3_decl_kind.java' Generated 'src/api/java/enumerations/Z3_param_kind.java' Generated 'src/api/java/enumerations/Z3_ast_print_mode.java' Generated 'src/api/java/enumerations/Z3_error_code.java' Generated 'src/api/java/enumerations/Z3_goal_prec.java' Generated 'src/api/api_log_macros.h' Generated 'src/api/api_log_macros.cpp' Generated 'src/api/api_commands.cpp' Generated 'src/api/python/z3/z3core.py' Generated 'src/api/dotnet/Native.cs' Generated 'src/api/java/Native.java' Generated "src/api/ml/z3native.ml" Generated "src/api/ml/z3native_stubs.c" Listing src/api/python/z3 ... Compiling src/api/python/z3/__init__.py ... Compiling src/api/python/z3/z3.py ... Compiling src/api/python/z3/z3consts.py ... Compiling src/api/python/z3/z3core.py ... Compiling src/api/python/z3/z3num.py ... Compiling src/api/python/z3/z3poly.py ... Compiling src/api/python/z3/z3printer.py ... Compiling src/api/python/z3/z3rcf.py ... Compiling src/api/python/z3/z3types.py ... Compiling src/api/python/z3/z3util.py ... Generated python bytecode Copied '__init__.py' Copied 'z3rcf.py' Copied 'z3consts.py' Copied 'z3printer.py' Copied 'z3util.py' Copied 'z3num.py' Copied 'z3poly.py' Copied 'z3types.py' Copied 'z3core.py' Copied 'z3.py' Copied 'z3util.pyc' Copied 'z3core.pyc' Copied 'z3rcf.pyc' Copied '__init__.pyc' Copied 'z3poly.pyc' Copied 'z3num.pyc' Copied 'z3consts.pyc' Copied 'z3printer.pyc' Copied 'z3types.pyc' Copied 'z3.pyc' Testing ocamlc... Finding OCAML_LIB... OCAML_LIB=/usr/lib/ocaml Testing ocamlfind... Generated "src/api/ml/z3enums.ml" Testing csc... Testing mcs... Testing gacutil... Generated 'src/api/dotnet/Enumerations.cs Testing ar... Testing g++... Testing gcc... Testing floating point support... Testing OpenMP... Host platform: Linux C++ Compiler: g++ C Compiler : gcc Archive Tool: ar Arithmetic: internal OpenMP: True Prefix: /<>/debian/tmp/usr 64-bit: False FP math: SSE2-GCC Python pkg dir: /usr/lib/python2.7/dist-packages Python version: 2.7 JNI Bindings: /usr/lib/jvm/java-11-openjdk-i386/include Java Compiler: /usr/bin/javac OCaml Compiler: ocamlc OCaml Find tool: OCaml Native: true OCaml Library: /usr/lib/ocaml C# Compiler: mcs GAC utility: gacutil Writing build/Makefile Microsoft.Z3.dll will be signed using key '/<>/src/api/dotnet/Microsoft.Z3.snk'. Generating build/api/dotnet/Microsoft.Z3.Sharp.pc from src/api/dotnet/Microsoft.Z3.Sharp.pc.in Generating build/api/ml/META from src/api/ml/META.in Copied Z3Py example 'all_interval_series.py' to 'build/python' Copied Z3Py example 'mini_ic3.py' to 'build/python' Copied Z3Py example 'visitor.py' to 'build/python' Copied Z3Py example 'parallel.py' to 'build/python' Copied Z3Py example 'rc2.py' to 'build/python' Copied Z3Py example 'socrates.py' to 'build/python' Copied Z3Py example 'example.py' to 'build/python' WARNING: Could not find ocamlfind utility. OCaml bindings will not be installed Makefile was successfully generated. compilation mode: Release Type 'cd build; make' to build Z3 sed -i 's/^SLINK_FLAGS=/SLINK_FLAGS=$(LDFLAGS) -fPIC /' build/config.mk echo 'libz3$(SO_EXT): SLINK_FLAGS += -Wl,-soname,libz3.so.4' >> build/Makefile printf '%%:\n\t$(MAKE) -C build $@\n' > Makefile printf '\nall:\n\t$(MAKE) -C build $@\n' >> Makefile ln -s libz3.so build/libz3.dll # from T2 README, with fixes printf '\n \n\n' > build/Microsoft.Z3.dll.config make[1]: Leaving directory '/<>' jh_linkjars -a -O--parallel dh_auto_build -a -O--parallel make -j4 make[1]: Entering directory '/<>' make -C build all make[2]: Entering directory '/<>/build' src/smt/smt_statistics.cpp src/util/common_msgs.cpp src/util/luby.cpp src/util/approx_nat.cpp src/api/dll/dll.cpp ocamlc -i -I api/ml -c ../src/api/ml/z3enums.ml > api/ml/z3enums.mli src/util/approx_set.cpp ocamlc -I api/ml -o api/ml/z3enums.cmi -c api/ml/z3enums.mli ocamlc -I api/ml -o api/ml/z3enums.cmo -c ../src/api/ml/z3enums.ml src/util/page.cpp src/util/cooperate.cpp src/util/timeit.cpp src/util/z3_exception.cpp src/util/memory_manager.cpp ocamlc -i -I api/ml -c ../src/api/ml/z3native.ml > api/ml/z3native.mli ocamlc -I api/ml -o api/ml/z3native.cmi -c api/ml/z3native.mli ocamlc -I api/ml -o api/ml/z3native.cmo -c ../src/api/ml/z3native.ml src/api/api_log.cpp src/api/api_commands.cpp ../src/api/api_log.cpp:52:149: warning: macro "__DATE__" might prevent reproducible builds [-Wdate-time] 52 | *g_z3_log << "V \"" << Z3_MAJOR_VERSION << "." << Z3_MINOR_VERSION << "." << Z3_BUILD_NUMBER << "." << Z3_REVISION_NUMBER << " " << __DATE__ << "\"\n"; | ^~~~~~~~ src/util/mpn.cpp src/util/timer.cpp src/util/lbool.cpp src/util/scoped_timer.cpp src/util/util.cpp src/util/stack.cpp src/util/timeout.cpp src/util/scoped_ctrl_c.cpp src/util/bit_util.cpp cp ../src/api/ml/z3.mli api/ml/z3.mli ocamlc -I api/ml -o api/ml/z3.cmi -c api/ml/z3.mli ocamlc -I api/ml -o api/ml/z3.cmo -c ../src/api/ml/z3.ml src/shell/z3_log_frontend.cpp src/solver/smt_logics.cpp src/util/hash.cpp src/util/fixed_bit_vector.cpp true -I api/ml -o api/ml/z3enums.cmx -c ../src/api/ml/z3enums.ml true -I api/ml -o api/ml/z3native.cmx -c ../src/api/ml/z3native.ml true -I api/ml -o api/ml/z3.cmx -c ../src/api/ml/z3.ml src/api/api_log_macros.cpp src/util/warning.cpp src/util/smt2_util.cpp src/util/cmd_context_types.cpp src/util/permutation.cpp src/util/small_object_allocator.cpp src/util/min_cut.cpp src/util/prime_generator.cpp src/api/z3_replayer.cpp src/ast/pattern/pattern_inference_params.cpp src/math/automata/automaton.cpp src/sat/sat_clause.cpp src/sat/sat_bdd.cpp src/sat/sat_clause_set.cpp src/sat/sat_clause_use_list.cpp src/sat/sat_watched.cpp src/sat/sat_config.cpp src/util/trace.cpp src/util/debug.cpp src/util/env_params.cpp src/util/gparams.cpp src/util/rlimit.cpp src/util/region.cpp src/util/bit_vector.cpp src/util/symbol.cpp src/util/statistics.cpp src/smt/params/preprocessor_params.cpp src/smt/params/theory_pb_params.cpp src/smt/params/theory_str_params.cpp src/smt/params/theory_bv_params.cpp src/smt/params/dyn_ack_params.cpp src/smt/params/theory_array_params.cpp src/smt/params/theory_arith_params.cpp src/smt/params/qi_params.cpp src/smt/params/theory_seq_params.cpp src/util/mpz.cpp src/math/euclid/euclidean_solver.cpp src/math/realclosure/mpz_matrix.cpp src/math/interval/interval_mpq.cpp src/sat/sat_elim_eqs.cpp src/sat/dimacs.cpp src/sat/sat_simplifier.cpp src/sat/sat_solver.cpp src/sat/sat_big.cpp src/sat/sat_parallel.cpp src/sat/sat_cleaner.cpp src/sat/sat_lookahead.cpp src/sat/sat_mus.cpp src/sat/sat_probing.cpp src/sat/sat_integrity_checker.cpp src/sat/sat_drat.cpp src/sat/sat_iff3_finder.cpp src/sat/sat_unit_walk.cpp src/sat/sat_elim_vars.cpp src/sat/sat_asymm_branch.cpp src/sat/sat_model_converter.cpp src/sat/sat_scc.cpp src/util/mpq_inf.cpp src/util/mpq.cpp src/util/mpff.cpp src/util/mpfx.cpp src/shell/mem_initializer.cpp src/shell/dimacs_frontend.cpp src/smt/old_interval.cpp src/tactic/arith/linear_equation.cpp src/math/realclosure/realclosure.cpp src/sat/sat_local_search.cpp src/sat/ba_solver.cpp src/util/rational.cpp src/util/inf_rational.cpp src/util/mpf.cpp src/util/hwf.cpp src/util/mpbq.cpp src/util/params.cpp src/util/sexpr.cpp src/util/inf_int_rational.cpp src/util/s_integer.cpp src/api/dll/mem_initializer.cpp src/muz/spacer/spacer_matrix.cpp src/muz/rel/tbv.cpp src/muz/base/bind_variables.cpp src/smt/smt_quantifier_stat.cpp src/smt/proto_model/value_factory.cpp src/smt/params/smt_params.cpp src/tactic/arith/bound_propagator.cpp src/ast/num_occurs.cpp src/ast/ast_util.cpp src/ast/act_cache.cpp src/ast/for_each_ast.cpp src/ast/has_free_vars.cpp src/ast/used_vars.cpp src/ast/expr_map.cpp src/ast/ast_lt.cpp src/math/subpaving/subpaving.cpp src/math/subpaving/subpaving_mpq.cpp src/math/subpaving/subpaving_mpf.cpp src/math/subpaving/subpaving_mpff.cpp src/math/subpaving/subpaving_mpfx.cpp src/math/subpaving/subpaving_hwf.cpp src/math/simplex/simplex.cpp src/math/hilbert/hilbert_basis.cpp src/util/lp/lp_utils.cpp src/util/inf_s_integer.cpp src/api/dll/gparams_register_modules.cpp src/shell/gparams_register_modules.cpp src/smt/smt_value_sort.cpp src/smt/arith_eq_solver.cpp src/smt/uses_theory.cpp src/cmd_context/tactic_manager.cpp src/ackermannization/ackr_helper.cpp src/math/subpaving/tactic/expr2subpaving.cpp src/parsers/util/scanner.cpp src/parsers/util/cost_parser.cpp src/parsers/util/simple_parser.cpp src/ast/rewriter/mk_extract_proc.cpp src/ast/rewriter/distribute_forall.cpp src/ast/rewriter/dl_rewriter.cpp src/ast/rewriter/ast_counter.cpp src/ast/rewriter/datatype_rewriter.cpp src/ast/for_each_expr.cpp src/ast/pp.cpp src/ast/fpa_decl_plugin.cpp src/ast/reg_decl_plugins.cpp src/ast/expr_stat.cpp src/ast/csp_decl_plugin.cpp src/ast/func_decl_dependencies.cpp src/ast/format.cpp src/ast/ast_ll_pp.cpp src/ast/expr_functors.cpp src/ast/occurs.cpp src/ast/macro_substitution.cpp src/ast/ast_smt_pp.cpp src/math/simplex/model_based_opt.cpp src/math/polynomial/polynomial_cache.cpp src/shell/main.cpp src/qe/qe_solve_plugin.cpp src/smt/cost_evaluator.cpp src/smt/smt_literal.cpp src/smt/fingerprints.cpp src/smt/elim_term_ite.cpp src/smt/cached_var_subst.cpp src/smt/smt_farkas_util.cpp src/smt/proto_model/numeral_factory.cpp src/ast/pattern/pattern_inference.cpp src/ast/fpa/fpa2bv_rewriter.cpp src/ast/fpa/fpa2bv_converter.cpp src/ast/fpa/bv2fpa_converter.cpp src/cmd_context/pdecl.cpp src/cmd_context/check_logic.cpp src/tactic/arith/bv2real_rewriter.cpp src/ast/proofs/proof_checker.cpp src/ast/proofs/proof_utils.cpp src/math/grobner/grobner.cpp src/parsers/util/pattern_validation.cpp src/tactic/replace_proof_converter.cpp src/tactic/equiv_proof_converter.cpp src/model/model_pp.cpp src/model/model_v2_pp.cpp src/model/model_core.cpp src/model/func_interp.cpp src/ast/normal_forms/pull_quant.cpp src/ast/normal_forms/defined_names.cpp src/ast/normal_forms/nnf.cpp src/ast/normal_forms/name_exprs.cpp src/ast/rewriter/seq_rewriter.cpp src/ast/rewriter/pb_rewriter.cpp src/ast/rewriter/factor_equivs.cpp src/ast/rewriter/arith_rewriter.cpp src/ast/rewriter/maximize_ac_sharing.cpp src/ast/rewriter/der.cpp src/ast/rewriter/array_rewriter.cpp src/ast/rewriter/quant_hoist.cpp src/ast/rewriter/fpa_rewriter.cpp src/ast/rewriter/elim_bounds.cpp src/ast/rewriter/bv_trailing.cpp src/ast/rewriter/label_rewriter.cpp src/ast/rewriter/bv_elim.cpp src/ast/rewriter/bv_bounds.cpp src/ast/rewriter/var_subst.cpp src/ast/rewriter/inj_axiom.cpp src/ast/rewriter/factor_rewriter.cpp src/ast/rewriter/bool_rewriter.cpp src/ast/rewriter/expr_replacer.cpp src/ast/rewriter/pb2bv_rewriter.cpp src/ast/rewriter/push_app_ite.cpp src/ast/rewriter/rewriter.cpp src/ast/rewriter/enum2bv_rewriter.cpp src/ast/rewriter/expr_safe_replace.cpp src/ast/expr_substitution.cpp src/ast/bv_decl_plugin.cpp src/ast/ast.cpp src/ast/static_features.cpp src/ast/ast_translation.cpp src/ast/expr_abstract.cpp src/ast/well_sorted.cpp src/ast/expr2var.cpp src/ast/ast_pp_dot.cpp src/ast/arith_decl_plugin.cpp src/ast/decl_collector.cpp src/ast/array_decl_plugin.cpp src/ast/pb_decl_plugin.cpp src/ast/seq_decl_plugin.cpp src/ast/dl_decl_plugin.cpp src/ast/ast_smt2_pp.cpp src/ast/datatype_decl_plugin.cpp src/ast/shared_occs.cpp src/ast/recfun_decl_plugin.cpp src/ast/expr2polynomial.cpp src/util/lp/binary_heap_priority_queue.cpp src/util/lp/lp_settings.cpp src/nlsat/nlsat_types.cpp src/nlsat/nlsat_interval_set.cpp src/math/polynomial/rpolynomial.cpp src/math/polynomial/algebraic_numbers.cpp src/math/polynomial/polynomial.cpp src/muz/spacer/spacer_mev_array.cpp src/muz/spacer/spacer_antiunify.cpp src/qe/qe_bool_plugin.cpp src/qe/qe_array_plugin.cpp src/qe/qe_datatype_plugin.cpp src/qe/qe_term_graph.cpp src/qe/qe_bv_plugin.cpp src/qe/qe_dl_plugin.cpp src/qe/nlarith_util.cpp src/smt/watch_list.cpp src/smt/theory_opt.cpp src/smt/smt_cg_table.cpp src/smt/smt_almost_cg_table.cpp src/smt/smt_clause.cpp src/smt/proto_model/datatype_factory.cpp src/smt/proto_model/proto_model.cpp src/smt/proto_model/struct_factory.cpp src/smt/proto_model/array_factory.cpp src/ast/rewriter/bit_blaster/bit_blaster.cpp src/ast/rewriter/bit_blaster/bit_blaster_rewriter.cpp src/ast/substitution/substitution.cpp src/ast/substitution/unifier.cpp src/ast/substitution/substitution_tree.cpp src/ast/substitution/matcher.cpp src/model/model2expr.cpp src/model/model_implicant.cpp src/model/model_smt2_pp.cpp src/model/model_evaluator.cpp src/model/model.cpp src/ast/rewriter/th_rewriter.cpp src/ast/rewriter/bv_rewriter.cpp src/ast/rewriter/mk_simplified_app.cpp src/ast/ast_printer.cpp src/ast/ast_pp_util.cpp src/util/lp/binary_heap_upair_queue.cpp src/util/lp/indexed_vector.cpp src/util/lp/dense_matrix.cpp src/nlsat/nlsat_clause.cpp src/math/polynomial/sexpr2upolynomial.cpp src/math/polynomial/upolynomial.cpp src/math/polynomial/upolynomial_factorization.cpp src/opt/pb_sls.cpp src/tactic/ufbv/ufbv_rewriter.cpp src/muz/spacer/spacer_sym_mux.cpp src/muz/spacer/spacer_iuc_proof.cpp src/muz/spacer/spacer_sem_matcher.cpp src/muz/spacer/spacer_mbc.cpp src/muz/spacer/spacer_unsat_core_learner.cpp src/muz/spacer/spacer_qe_project.cpp src/muz/rel/doc.cpp src/muz/base/dl_boogie_proof.cpp src/qe/qe_arith_plugin.cpp src/qe/qe_arith.cpp src/qe/qe_arrays.cpp src/tactic/bv/bit_blaster_model_converter.cpp src/smt/expr_context_simplifier.cpp src/ackermannization/lackr_model_constructor.cpp src/ackermannization/ackermannize_bv_model_converter.cpp src/ackermannization/ackr_model_converter.cpp src/solver/check_sat_result.cpp src/tactic/horn_subsume_model_converter.cpp src/tactic/generic_model_converter.cpp src/tactic/model_converter.cpp src/ast/macros/macro_util.cpp src/ast/rewriter/bit2int.cpp src/nlsat/nlsat_solver.cpp src/nlsat/nlsat_evaluator.cpp src/nlsat/nlsat_explain.cpp src/opt/opt_pareto.cpp src/tactic/portfolio/solver2lookahead.cpp src/tactic/fpa/fpa2bv_model_converter.cpp src/tactic/smtlogics/qfufbv_ackr_model_converter.cpp src/muz/spacer/spacer_proof_utils.cpp src/muz/spacer/spacer_farkas_learner.cpp src/muz/spacer/spacer_unsat_core_plugin.cpp src/muz/base/hnf.cpp src/qe/qe_mbi.cpp src/qe/qe_mbp.cpp src/qe/qe_datatypes.cpp src/tactic/bv/bvarray2uf_rewriter.cpp src/smt/smt_implied_equalities.cpp src/smt/smt_solver.cpp src/cmd_context/context_params.cpp src/ackermannization/lackr_model_converter_lazy.cpp src/tactic/aig/aig.cpp src/tactic/arith/probe_arith.cpp src/tactic/arith/pb2bv_model_converter.cpp src/tactic/arith/bound_manager.cpp src/tactic/arith/bv2int_rewriter.cpp src/sat/tactic/atom2bool_var.cpp src/solver/combined_solver.cpp src/solver/solver_pool.cpp src/solver/mus.cpp src/solver/solver.cpp src/solver/solver_na2as.cpp src/tactic/core/collect_occs.cpp src/tactic/goal.cpp src/tactic/dependency_converter.cpp src/tactic/goal_shared_occs.cpp src/tactic/goal_util.cpp src/tactic/proof_converter.cpp src/tactic/probe.cpp src/tactic/goal_num_occurs.cpp src/ast/macros/quasi_macros.cpp src/ast/macros/macro_manager.cpp src/util/lp/matrix.cpp src/util/lp/permutation_matrix.cpp src/cmd_context/extra_cmds/subpaving_cmds.cpp src/cmd_context/extra_cmds/polynomial_cmds.cpp src/cmd_context/extra_cmds/dbg_cmds.cpp src/api/api_qe.cpp src/api/api_ast.cpp src/api/api_numeral.cpp src/api/api_model.cpp src/api/api_params.cpp src/api/api_pb.cpp src/api/api_polynomial.cpp src/api/api_datatype.cpp src/api/api_ast_vector.cpp src/api/api_stats.cpp src/api/api_config_params.cpp src/api/api_solver.cpp src/api/api_algebraic.cpp src/api/api_rcf.cpp src/api/api_context.cpp src/api/api_parsers.cpp src/api/api_seq.cpp src/api/api_goal.cpp src/api/api_arith.cpp src/api/api_ast_map.cpp src/api/api_fpa.cpp src/tactic/portfolio/default_tactic.cpp src/tactic/fpa/qffplra_tactic.cpp src/tactic/fpa/fpa2bv_tactic.cpp src/tactic/smtlogics/qflia_tactic.cpp src/tactic/smtlogics/qfauflia_tactic.cpp src/tactic/smtlogics/qflra_tactic.cpp src/tactic/smtlogics/quant_tactics.cpp src/tactic/smtlogics/qfnra_tactic.cpp src/tactic/smtlogics/qfaufbv_tactic.cpp src/tactic/smtlogics/nra_tactic.cpp src/tactic/smtlogics/qfidl_tactic.cpp src/tactic/smtlogics/qfuf_tactic.cpp src/tactic/smtlogics/qfnia_tactic.cpp src/tactic/ufbv/ufbv_rewriter_tactic.cpp src/tactic/ufbv/ufbv_tactic.cpp src/tactic/ufbv/macro_finder_tactic.cpp src/tactic/ufbv/quasi_macros_tactic.cpp src/muz/spacer/spacer_legacy_mbp.cpp src/muz/spacer/spacer_iuc_solver.cpp src/muz/spacer/spacer_prop_solver.cpp src/muz/spacer/spacer_legacy_mev.cpp src/muz/spacer/spacer_manager.cpp src/tactic/fd_solver/fd_solver.cpp src/tactic/fd_solver/bounded_int2bv_solver.cpp src/tactic/fd_solver/pb2bv_solver.cpp src/tactic/fd_solver/enum2bv_solver.cpp src/sat/sat_solver/inc_sat_solver.cpp src/qe/nlqsat.cpp src/qe/qe_lite.cpp src/qe/qe_tactic.cpp src/qe/qe_sat_tactic.cpp src/qe/qe_cmd.cpp src/qe/qsat.cpp src/tactic/sls/sls_engine.cpp src/tactic/sls/sls_tactic.cpp src/smt/tactic/ctx_solver_simplify_tactic.cpp src/smt/tactic/smt_tactic.cpp src/tactic/bv/bv_bound_chk_tactic.cpp src/tactic/bv/dt2bv_tactic.cpp src/tactic/bv/elim_small_bv_tactic.cpp src/tactic/bv/max_bv_sharing_tactic.cpp src/tactic/bv/bv1_blaster_tactic.cpp src/tactic/bv/bv_size_reduction_tactic.cpp src/tactic/bv/bvarray2uf_tactic.cpp src/tactic/bv/bv_bounds_tactic.cpp src/tactic/bv/bit_blaster_tactic.cpp src/smt/smt2_extra_cmds.cpp src/ast/pattern/expr_pattern_match.cpp src/parsers/smt2/marshal.cpp src/cmd_context/cmd_context_to_goal.cpp src/cmd_context/parametric_cmd.cpp src/cmd_context/eval_cmd.cpp src/cmd_context/tactic_cmds.cpp src/cmd_context/simplify_cmd.cpp src/cmd_context/basic_cmds.cpp src/cmd_context/cmd_util.cpp src/cmd_context/cmd_context.cpp src/cmd_context/echo_tactic.cpp src/ackermannization/ackr_bound_probe.cpp src/ackermannization/lackr.cpp src/tactic/aig/aig_tactic.cpp src/math/subpaving/tactic/subpaving_tactic.cpp src/nlsat/tactic/goal2nlsat.cpp src/nlsat/tactic/qfnra_nlsat_tactic.cpp src/nlsat/tactic/nlsat_tactic.cpp src/tactic/arith/pb2bv_tactic.cpp src/tactic/arith/fm_tactic.cpp src/tactic/arith/add_bounds_tactic.cpp src/tactic/arith/factor_tactic.cpp src/tactic/arith/diff_neq_tactic.cpp src/tactic/arith/degree_shift_tactic.cpp src/tactic/arith/card2bv_tactic.cpp src/tactic/arith/recover_01_tactic.cpp src/tactic/arith/normalize_bounds_tactic.cpp src/tactic/arith/nla2bv_tactic.cpp src/tactic/arith/eq2bv_tactic.cpp src/tactic/arith/fix_dl_var_tactic.cpp src/tactic/arith/purify_arith_tactic.cpp src/tactic/arith/propagate_ineqs_tactic.cpp src/tactic/arith/lia2pb_tactic.cpp src/tactic/arith/lia2card_tactic.cpp src/tactic/arith/arith_bounds_tactic.cpp src/sat/tactic/goal2sat.cpp src/sat/tactic/sat_tactic.cpp src/solver/tactic2solver.cpp src/solver/parallel_tactic.cpp src/solver/solver2tactic.cpp src/tactic/core/propagate_values_tactic.cpp src/tactic/core/elim_term_ite_tactic.cpp src/tactic/core/cofactor_term_ite_tactic.cpp src/tactic/core/solve_eqs_tactic.cpp src/tactic/core/simplify_tactic.cpp src/tactic/core/cofactor_elim_term_ite.cpp src/tactic/core/symmetry_reduce_tactic.cpp src/tactic/core/reduce_invertible_tactic.cpp src/tactic/core/nnf_tactic.cpp src/tactic/core/split_clause_tactic.cpp src/tactic/core/collect_statistics_tactic.cpp src/tactic/core/occf_tactic.cpp src/tactic/core/reduce_args_tactic.cpp src/tactic/core/pb_preprocess_tactic.cpp src/tactic/core/blast_term_ite_tactic.cpp src/tactic/core/elim_uncnstr_tactic.cpp src/tactic/core/tseitin_cnf_tactic.cpp src/tactic/core/der_tactic.cpp src/tactic/core/injectivity_tactic.cpp src/tactic/core/ctx_simplify_tactic.cpp src/tactic/core/dom_simplify_tactic.cpp src/tactic/core/distribute_forall_tactic.cpp src/tactic/tactical.cpp src/tactic/sine_filter.cpp src/tactic/tactic.cpp src/ast/macros/macro_finder.cpp src/util/lp/scaler.cpp src/util/lp/eta_matrix.cpp src/api/api_bv.cpp src/api/api_quant.cpp src/api/api_array.cpp src/api/api_tactic.cpp src/tactic/portfolio/smt_strategic_solver.cpp src/tactic/fpa/qffp_tactic.cpp src/tactic/smtlogics/qfufbv_tactic.cpp src/tactic/smtlogics/qfbv_tactic.cpp src/muz/spacer/spacer_util.cpp src/tactic/sls/bvsls_opt_engine.cpp src/smt/asserted_formulas.cpp src/parsers/smt2/smt2parser.cpp src/parsers/smt2/smt2scanner.cpp src/ackermannization/ackermannize_bv_tactic.cpp src/api/dll/install_tactic.cpp src/shell/install_tactic.cpp src/muz/spacer/spacer_json.cpp src/muz/spacer/spacer_generalizers.cpp src/qe/qe.cpp src/smt/tactic/unit_subsumption_tactic.cpp src/smt/smt_justification.cpp src/smt/mam.cpp src/smt/theory_datatype.cpp src/smt/theory_bv.cpp src/smt/theory_dl.cpp src/smt/smt_quick_checker.cpp src/smt/theory_fpa.cpp src/smt/smt_consequences.cpp src/smt/theory_dummy.cpp src/smt/smt_checker.cpp src/smt/theory_wmaxsat.cpp src/smt/theory_pb.cpp src/smt/smt_conflict_resolution.cpp src/smt/smt_enode.cpp src/smt/smt_context_stat.cpp src/smt/smt_theory.cpp src/smt/smt_model_checker.cpp src/smt/smt_for_each_relevant_expr.cpp src/smt/smt_relevancy.cpp src/smt/smt_model_generator.cpp src/smt/arith_eq_adapter.cpp src/smt/smt_quantifier.cpp src/smt/smt_context_pp.cpp src/smt/smt_internalizer.cpp src/smt/qi_queue.cpp src/smt/smt_context_inv.cpp src/smt/smt_kernel.cpp src/smt/smt_model_finder.cpp src/smt/theory_array.cpp src/smt/dyn_ack.cpp src/smt/theory_array_full.cpp src/smt/smt_arith_value.cpp src/smt/smt_case_split_queue.cpp src/smt/smt_context.cpp src/smt/theory_array_base.cpp src/util/lp/square_sparse_matrix.cpp src/util/lp/row_eta_matrix.cpp src/util/lp/square_dense_submatrix.cpp src/opt/optsmt.cpp src/muz/fp/datalog_parser.cpp src/muz/ddnf/ddnf.cpp src/muz/clp/clp_context.cpp src/muz/spacer/spacer_callback.cpp src/muz/spacer/spacer_sat_answer.cpp src/muz/spacer/spacer_pdr.cpp src/muz/spacer/spacer_quant_generalizer.cpp src/muz/transforms/dl_mk_bit_blast.cpp src/muz/transforms/dl_mk_magic_symbolic.cpp src/muz/transforms/dl_mk_array_eq_rewrite.cpp src/muz/transforms/dl_mk_unbound_compressor.cpp src/muz/transforms/dl_mk_karr_invariants.cpp src/muz/transforms/dl_mk_magic_sets.cpp src/muz/transforms/dl_mk_array_instantiation.cpp src/muz/transforms/dl_mk_backwards.cpp src/muz/transforms/dl_mk_filter_rules.cpp src/muz/transforms/dl_mk_quantifier_abstraction.cpp src/muz/transforms/dl_mk_loop_counter.cpp src/muz/transforms/dl_mk_separate_negated_tails.cpp src/muz/transforms/dl_mk_scale.cpp src/muz/transforms/dl_mk_quantifier_instantiation.cpp src/muz/transforms/dl_mk_coi_filter.cpp src/muz/transforms/dl_mk_array_blast.cpp src/muz/dataflow/dataflow.cpp src/muz/base/dl_context.cpp src/muz/base/dl_rule.cpp src/muz/base/dl_costs.cpp src/muz/base/dl_rule_transformer.cpp src/muz/base/dl_util.cpp src/muz/base/dl_rule_set.cpp src/muz/base/dl_rule_subsumption_index.cpp src/muz/base/rule_properties.cpp src/smt/theory_recfun.cpp src/smt/theory_utvpi.cpp src/smt/theory_diff_logic.cpp src/smt/theory_jobscheduler.cpp src/smt/theory_str.cpp src/smt/theory_seq.cpp src/smt/smt_setup.cpp src/util/lp/lu.cpp src/shell/opt_frontend.cpp src/opt/maxres.cpp src/opt/opt_solver.cpp src/opt/opt_context.cpp src/opt/opt_parse.cpp src/opt/sortmax.cpp src/opt/wmax.cpp src/opt/maxsmt.cpp src/muz/fp/horn_tactic.cpp src/muz/tab/tab_context.cpp src/muz/spacer/spacer_legacy_frames.cpp src/muz/spacer/spacer_context.cpp src/muz/rel/dl_external_relation.cpp src/muz/transforms/dl_mk_elim_term_ite.cpp src/muz/transforms/dl_mk_subsumption_checker.cpp src/muz/transforms/dl_transforms.cpp src/muz/transforms/dl_mk_coalesce.cpp src/muz/transforms/dl_mk_rule_inliner.cpp src/muz/transforms/dl_mk_interp_tail_simplifier.cpp src/muz/transforms/dl_mk_slice.cpp src/muz/transforms/dl_mk_unfold.cpp src/smt/theory_arith.cpp src/smt/theory_dense_diff_logic.cpp src/util/lp/core_solver_pretty_printer.cpp src/util/lp/lp_core_solver_base.cpp src/api/api_opt.cpp src/api/api_datalog.cpp src/opt/opt_cmds.cpp src/muz/fp/dl_register_engine.cpp src/muz/bmc/dl_bmc_engine.cpp src/muz/spacer/spacer_dl_interface.cpp src/muz/rel/dl_mk_simple_joins.cpp src/muz/rel/dl_mk_similarity_compressor.cpp src/muz/rel/dl_table_relation.cpp src/muz/rel/dl_base.cpp In member function ‘virtual datalog::relation_transformer_fn* datalog::table_relation_plugin::mk_select_equal_and_project_fn(const datalog::relation_base&, app* const&, unsigned int)’: cc1plus: warning: ‘void* __builtin_memset(void*, int, unsigned int)’ specified bound 4294967292 exceeds maximum object size 2147483647 [-Wstringop-overflow=] src/muz/rel/dl_sparse_table.cpp src/muz/rel/dl_check_table.cpp src/muz/rel/dl_table.cpp src/muz/rel/check_relation.cpp src/muz/rel/dl_sieve_relation.cpp src/muz/rel/dl_product_relation.cpp src/muz/rel/dl_instruction.cpp src/muz/rel/dl_lazy_table.cpp src/muz/rel/udoc_relation.cpp src/muz/transforms/dl_mk_synchronize.cpp src/util/lp/lp_solver.cpp src/util/lp/lp_dual_core_solver.cpp src/shell/smtlib_frontend.cpp src/muz/fp/dl_cmds.cpp src/muz/rel/dl_compiler.cpp src/muz/rel/karr_relation.cpp In member function ‘void datalog::compiler::make_select_equal_and_project(datalog::compiler::reg_idx, datalog::relation_element, unsigned int, datalog::compiler::reg_idx&, bool, datalog::instruction_block&)’: cc1plus: warning: ‘void* __builtin_memset(void*, int, unsigned int)’ specified bound 4294967292 exceeds maximum object size 2147483647 [-Wstringop-overflow=] src/muz/rel/dl_relation_manager.cpp src/muz/rel/dl_finite_product_relation.cpp src/muz/rel/aig_exporter.cpp src/muz/rel/dl_interval_relation.cpp src/muz/rel/rel_context.cpp src/muz/rel/dl_mk_explanations.cpp src/muz/rel/dl_bound_relation.cpp src/smt/theory_lra.cpp src/util/lp/lp_bound_propagator.cpp src/util/lp/static_matrix.cpp src/util/lp/lp_primal_core_solver.cpp src/util/lp/int_solver.cpp src/util/lp/gomory.cpp src/util/lp/nra_solver.cpp src/util/lp/lp_dual_simplex.cpp src/util/lp/lar_core_solver.cpp src/util/lp/lar_solver.cpp src/shell/datalog_frontend.cpp src/util/lp/lp_primal_simplex.cpp src/util/lp/random_updater.cpp src/shell/lp_frontend.cpp g++ -o z3 shell/install_tactic.o shell/z3_log_frontend.o shell/smtlib_frontend.o shell/datalog_frontend.o shell/main.o shell/lp_frontend.o shell/mem_initializer.o shell/dimacs_frontend.o shell/opt_frontend.o shell/gparams_register_modules.o cmd_context/extra_cmds/extra_cmds.a api/api.a opt/opt.a tactic/portfolio/portfolio.a tactic/fpa/fpa_tactics.a tactic/smtlogics/smtlogic_tactics.a tactic/ufbv/ufbv_tactic.a muz/fp/fp.a muz/bmc/bmc.a muz/ddnf/ddnf.a muz/tab/tab.a muz/clp/clp.a muz/spacer/spacer.a muz/rel/rel.a muz/transforms/transforms.a muz/dataflow/dataflow.a muz/base/muz.a tactic/fd_solver/fd_solver.a sat/sat_solver/sat_solver.a qe/qe.a tactic/sls/sls_tactic.a smt/tactic/smt_tactic.a tactic/bv/bv_tactics.a smt/smt.a smt/proto_model/proto_model.a smt/params/smt_params.a ast/rewriter/bit_blaster/bit_blaster.a ast/pattern/pattern.a ast/fpa/fpa.a parsers/smt2/smt2parser.a cmd_context/cmd_context.a ackermannization/ackermannization.a tactic/aig/aig_tactic.a math/subpaving/tactic/subpaving_tactic.a nlsat/tactic/nlsat_tactic.a tactic/arith/arith_tactics.a sat/tactic/sat_tactic.a solver/solver.a ast/proofs/proofs.a tactic/core/core_tactics.a math/euclid/euclid.a math/grobner/grobner.a parsers/util/parser_util.a ast/substitution/substitution.a tactic/tactic.a model/model.a ast/normal_forms/normal_forms.a ast/macros/macros.a ast/rewriter/rewriter.a ast/ast.a math/subpaving/subpaving.a math/realclosure/realclosure.a math/interval/interval.a math/automata/automata.a math/simplex/simplex.a math/hilbert/hilbert.a util/lp/lp.a nlsat/nlsat.a sat/sat.a math/polynomial/polynomial.a util/util.a -lpthread -Wl,-Bsymbolic-functions -Wl,-z,relro -Wl,-z,now -fopenmp -lrt g++ -o libz3.so -Wl,-Bsymbolic-functions -Wl,-z,relro -Wl,-z,now -fPIC -shared -Wl,-soname,libz3.so.4 api/dll/install_tactic.o api/dll/mem_initializer.o api/dll/dll.o api/dll/gparams_register_modules.o api/api_bv.o api/api_quant.o api/api_array.o api/api_tactic.o api/api_qe.o api/api_ast.o api/api_numeral.o api/api_model.o api/api_params.o api/api_pb.o api/z3_replayer.o api/api_polynomial.o api/api_opt.o api/api_datatype.o api/api_ast_vector.o api/api_stats.o api/api_config_params.o api/api_datalog.o api/api_solver.o api/api_log_macros.o api/api_algebraic.o api/api_rcf.o api/api_log.o api/api_context.o api/api_parsers.o api/api_seq.o api/api_goal.o api/api_commands.o api/api_arith.o api/api_ast_map.o api/api_fpa.o cmd_context/extra_cmds/extra_cmds.a opt/opt.a tactic/portfolio/portfolio.a tactic/fpa/fpa_tactics.a tactic/smtlogics/smtlogic_tactics.a tactic/ufbv/ufbv_tactic.a muz/fp/fp.a muz/bmc/bmc.a muz/ddnf/ddnf.a muz/tab/tab.a muz/clp/clp.a muz/spacer/spacer.a muz/rel/rel.a muz/transforms/transforms.a muz/dataflow/dataflow.a muz/base/muz.a tactic/fd_solver/fd_solver.a sat/sat_solver/sat_solver.a qe/qe.a tactic/sls/sls_tactic.a smt/tactic/smt_tactic.a tactic/bv/bv_tactics.a smt/smt.a smt/proto_model/proto_model.a smt/params/smt_params.a ast/rewriter/bit_blaster/bit_blaster.a ast/pattern/pattern.a ast/fpa/fpa.a parsers/smt2/smt2parser.a cmd_context/cmd_context.a ackermannization/ackermannization.a tactic/aig/aig_tactic.a math/subpaving/tactic/subpaving_tactic.a nlsat/tactic/nlsat_tactic.a tactic/arith/arith_tactics.a sat/tactic/sat_tactic.a solver/solver.a ast/proofs/proofs.a tactic/core/core_tactics.a math/euclid/euclid.a math/grobner/grobner.a parsers/util/parser_util.a ast/substitution/substitution.a tactic/tactic.a model/model.a ast/normal_forms/normal_forms.a ast/macros/macros.a ast/rewriter/rewriter.a ast/ast.a math/subpaving/subpaving.a math/realclosure/realclosure.a math/interval/interval.a math/automata/automata.a math/simplex/simplex.a math/hilbert/hilbert.a util/lp/lp.a nlsat/nlsat.a sat/sat.a math/polynomial/polynomial.a util/util.a -fopenmp -lrt -Wl,-soname,libz3.so.4 ln -f -s ../libz3.so python g++ -Wdate-time -D_FORTIFY_SOURCE=2 -D_MP_INTERNAL -DNDEBUG -D_EXTERNAL_RELEASE -g -O2 -fdebug-prefix-map=/<>=. -fstack-protector-strong -Wformat -Werror=format-security -std=c++11 -fvisibility=hidden -c -mfpmath=sse -msse -msse2 -fopenmp -O3 -D_LINUX_ -o api/java/Native.o -I"/usr/lib/jvm/java-11-openjdk-i386/include" -I"/usr/lib/jvm/java-11-openjdk-i386/include/linux" -I../src/api ../src/api/java/Native.cpp ocamlc -ccopt "-Wdate-time -D_FORTIFY_SOURCE=2 -D_MP_INTERNAL -DNDEBUG -D_EXTERNAL_RELEASE -g -O2 -fdebug-prefix-map=/<>=. -fstack-protector-strong -Wformat -Werror=format-security -fvisibility=hidden -c -mfpmath=sse -msse -msse2 -fopenmp -O3 -D_LINUX_ -I /usr/lib/ocaml -I ../src/api -I ../src/api/ml -o api/ml/z3native_stubs.o" -c ../src/api/ml/z3native_stubs.c g++ -o libz3java.so -Wl,-Bsymbolic-functions -Wl,-z,relro -Wl,-z,now -fPIC -shared api/java/Native.o libz3.so "/usr/bin/javac" ../src/api/java/enumerations/*.java -d api/java/classes "/usr/bin/javac" -cp api/java/classes ../src/api/java/*.java -d api/java/classes "/usr/bin/jar" cfm com.microsoft.z3.jar ../src/api/java/manifest -C api/java/classes . ocamlmklib -o api/ml/z3ml -I api/ml api/ml/z3native_stubs.o api/ml/z3enums.cmo api/ml/z3native.cmo api/ml/z3.cmo -L. -lz3 -ldopt -Wl,-z,relro -ldopt -Wl,-z,now ocamlmklib -o api/ml/z3ml -I api/ml api/ml/z3native_stubs.o api/ml/z3enums.cmx api/ml/z3native.cmx api/ml/z3.cmx -L. -lz3 -ldopt -Wl,-z,relro -ldopt -Wl,-z,now File "_none_", line 1: Error: Cannot find file api/ml/z3enums.cmx make[2]: [Makefile:4416: api/ml/z3ml.cmxa] Error 2 (ignored) true -linkall -shared -o api/ml/z3ml.cmxs -I api/ml api/ml/z3ml.cmxa Z3 was successfully built. Z3Py scripts can already be executed in the 'build/python' directory. Z3Py scripts stored in arbitrary directories can be executed if the 'build/python' directory is added to the PYTHONPATH environment variable and the 'build' directory is added to the LD_LIBRARY_PATH environment variable. Use the following command to install Z3 at prefix /<>/debian/tmp/usr. sudo make install make[2]: Leaving directory '/<>/build' make[1]: Leaving directory '/<>' jh_build -a -O--parallel debian/rules override_dh_auto_test make[1]: Entering directory '/<>' /usr/bin/make test-z3 make[2]: Entering directory '/<>' /usr/bin/make -C build test-z3 make[3]: Entering directory '/<>/build' src/test/get_consequences.cpp src/test/dl_relation.cpp src/test/get_implied_equalities.cpp src/test/proof_checker.cpp src/test/expr_substitution.cpp src/test/mpz.cpp src/test/heap.cpp src/test/symbol_table.cpp src/test/diff_logic.cpp src/test/horn_subsume_model_converter.cpp src/test/uint_set.cpp src/test/theory_dl.cpp src/test/mpq.cpp src/test/rational.cpp src/test/solver_pool.cpp src/test/no_overflow.cpp src/test/ast.cpp src/test/bit_blaster.cpp src/test/expr_rand.cpp src/test/inf_rational.cpp src/test/model2expr.cpp src/test/install_tactic.cpp src/test/interval.cpp src/test/substitution.cpp src/test/for_each_file.cpp src/test/vector.cpp src/test/doc.cpp src/test/arith_rewriter.cpp src/test/sat_user_scope.cpp src/test/mpf.cpp src/test/datalog_parser.cpp src/test/dl_query.cpp src/test/upolynomial.cpp ../src/test/upolynomial.cpp: In function ‘void tst_fact()’: ../src/test/upolynomial.cpp:902:13: note: variable tracking size limit exceeded with ‘-fvar-tracking-assignments’, retrying without 902 | static void tst_fact() { | ^~~~~~~~ src/test/hwf.cpp src/test/permutation.cpp src/test/heap_trie.cpp src/test/sat_local_search.cpp src/test/algebraic.cpp src/test/theory_pb.cpp src/test/smt2print_parse.cpp src/test/dl_context.cpp src/test/karr.cpp src/test/ex.cpp src/test/hilbert_basis.cpp src/test/nlsat.cpp src/test/dl_table.cpp src/test/optional.cpp src/test/api_bug.cpp src/test/trigo.cpp src/test/small_object_allocator.cpp src/test/cube_clause.cpp src/test/sat_lookahead.cpp src/test/pb2bv.cpp src/test/stack.cpp src/test/bdd.cpp src/test/random.cpp src/test/memory.cpp src/test/prime_generator.cpp src/test/old_interval.cpp src/test/check_assumptions.cpp src/test/arith_simplifier_plugin.cpp src/test/sorting_network.cpp src/test/api.cpp src/test/main.cpp src/test/var_subst.cpp src/test/fixed_bit_vector.cpp src/test/model_evaluator.cpp src/test/model_retrieval.cpp src/test/region.cpp src/test/qe_arith.cpp src/test/bit_vector.cpp src/test/mpbq.cpp src/test/polynomial.cpp src/test/mem_initializer.cpp src/test/map.cpp src/test/symbol.cpp src/test/factor_rewriter.cpp src/test/escaped.cpp src/test/model_based_opt.cpp src/test/quant_elim.cpp src/test/mpff.cpp src/test/polynorm.cpp src/test/rcf.cpp src/test/chashtable.cpp src/test/nlarith_util.cpp src/test/total_order.cpp src/test/timeout.cpp src/test/ddnf.cpp src/test/simplifier.cpp src/test/dl_util.cpp src/test/mpfx.cpp src/test/hashtable.cpp src/test/buffer.cpp src/test/dl_product_relation.cpp src/test/quant_solve.cpp src/test/simple_parser.cpp src/test/string_buffer.cpp src/test/parray.cpp src/test/cnf_backbones.cpp src/test/bits.cpp src/test/ext_numeral.cpp src/test/tbv.cpp src/test/gparams_register_modules.cpp src/test/matcher.cpp src/test/smt_context.cpp src/test/object_allocator.cpp src/test/simplex.cpp src/test/f2n.cpp src/test/udoc_relation.cpp src/test/list.cpp src/test/fuzzing/expr_rand.cpp src/test/fuzzing/expr_delta.cpp g++ -o test-z3 test/get_consequences.o test/dl_relation.o test/get_implied_equalities.o test/proof_checker.o test/expr_substitution.o test/mpz.o test/heap.o test/symbol_table.o test/diff_logic.o test/horn_subsume_model_converter.o test/uint_set.o test/theory_dl.o test/mpq.o test/rational.o test/solver_pool.o test/no_overflow.o test/ast.o test/bit_blaster.o test/expr_rand.o test/inf_rational.o test/model2expr.o test/install_tactic.o test/interval.o test/substitution.o test/for_each_file.o test/vector.o test/doc.o test/arith_rewriter.o test/sat_user_scope.o test/mpf.o test/datalog_parser.o test/dl_query.o test/upolynomial.o test/hwf.o test/permutation.o test/heap_trie.o test/sat_local_search.o test/algebraic.o test/theory_pb.o test/smt2print_parse.o test/dl_context.o test/karr.o test/ex.o test/hilbert_basis.o test/nlsat.o test/dl_table.o test/optional.o test/api_bug.o test/trigo.o test/small_object_allocator.o test/cube_clause.o test/sat_lookahead.o test/pb2bv.o test/stack.o test/bdd.o test/random.o test/memory.o test/prime_generator.o test/old_interval.o test/check_assumptions.o test/arith_simplifier_plugin.o test/sorting_network.o test/api.o test/main.o test/var_subst.o test/fixed_bit_vector.o test/model_evaluator.o test/model_retrieval.o test/region.o test/qe_arith.o test/bit_vector.o test/mpbq.o test/polynomial.o test/mem_initializer.o test/map.o test/symbol.o test/factor_rewriter.o test/escaped.o test/model_based_opt.o test/quant_elim.o test/mpff.o test/polynorm.o test/rcf.o test/chashtable.o test/nlarith_util.o test/total_order.o test/timeout.o test/ddnf.o test/simplifier.o test/dl_util.o test/mpfx.o test/hashtable.o test/buffer.o test/dl_product_relation.o test/quant_solve.o test/simple_parser.o test/string_buffer.o test/parray.o test/cnf_backbones.o test/bits.o test/ext_numeral.o test/tbv.o test/gparams_register_modules.o test/matcher.o test/smt_context.o test/object_allocator.o test/simplex.o test/f2n.o test/udoc_relation.o test/list.o api/api.a opt/opt.a tactic/portfolio/portfolio.a tactic/fpa/fpa_tactics.a tactic/smtlogics/smtlogic_tactics.a tactic/ufbv/ufbv_tactic.a muz/fp/fp.a muz/bmc/bmc.a muz/ddnf/ddnf.a muz/tab/tab.a muz/clp/clp.a muz/spacer/spacer.a muz/rel/rel.a muz/transforms/transforms.a muz/dataflow/dataflow.a muz/base/muz.a tactic/fd_solver/fd_solver.a sat/sat_solver/sat_solver.a qe/qe.a tactic/sls/sls_tactic.a smt/tactic/smt_tactic.a test/fuzzing/fuzzing.a tactic/bv/bv_tactics.a smt/smt.a smt/proto_model/proto_model.a smt/params/smt_params.a ast/rewriter/bit_blaster/bit_blaster.a ast/pattern/pattern.a ast/fpa/fpa.a parsers/smt2/smt2parser.a cmd_context/cmd_context.a ackermannization/ackermannization.a tactic/aig/aig_tactic.a math/subpaving/tactic/subpaving_tactic.a nlsat/tactic/nlsat_tactic.a tactic/arith/arith_tactics.a sat/tactic/sat_tactic.a solver/solver.a ast/proofs/proofs.a tactic/core/core_tactics.a math/euclid/euclid.a math/grobner/grobner.a parsers/util/parser_util.a ast/substitution/substitution.a tactic/tactic.a model/model.a ast/normal_forms/normal_forms.a ast/macros/macros.a ast/rewriter/rewriter.a ast/ast.a math/subpaving/subpaving.a math/realclosure/realclosure.a math/interval/interval.a math/automata/automata.a math/simplex/simplex.a math/hilbert/hilbert.a util/lp/lp.a nlsat/nlsat.a sat/sat.a math/polynomial/polynomial.a util/util.a -lpthread -Wl,-Bsymbolic-functions -Wl,-z,relro -Wl,-z,now -fopenmp -lrt make[3]: Leaving directory '/<>/build' make[2]: Leaving directory '/<>' build/test-z3 -a PASS (test random :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test random :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test symbol_table :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test symbol_table :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test region :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test region :time 0.00 :before-memory 0.02 :after-memory 0.02) foo boo foo PASS (test symbol :time 0.00 :before-memory 0.02 :after-memory 0.02) foo boo foo PASS (test symbol :time 0.00 :before-memory 0.02 :after-memory 0.02) i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 PASS (test heap :time 0.02 :before-memory 0.02 :after-memory 0.02) i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 i: 0 i: 1000 i: 2000 i: 3000 i: 4000 i: 5000 i: 6000 i: 7000 i: 8000 i: 9000 i: 10000 i: 11000 i: 12000 i: 13000 i: 14000 i: 15000 i: 16000 i: 17000 i: 18000 i: 19000 i: 20000 i: 21000 i: 22000 i: 23000 i: 24000 i: 25000 i: 26000 i: 27000 i: 28000 i: 29000 i: 30000 i: 31000 i: 32000 i: 33000 i: 34000 i: 35000 i: 36000 i: 37000 i: 38000 i: 39000 i: 40000 i: 41000 i: 42000 i: 43000 i: 44000 i: 45000 i: 46000 i: 47000 i: 48000 i: 49000 i: 50000 i: 51000 i: 52000 i: 53000 i: 54000 i: 55000 i: 56000 i: 57000 i: 58000 i: 59000 i: 60000 i: 61000 i: 62000 i: 63000 i: 64000 i: 65000 i: 66000 i: 67000 i: 68000 i: 69000 i: 70000 i: 71000 i: 72000 i: 73000 i: 74000 i: 75000 i: 76000 i: 77000 i: 78000 i: 79000 i: 80000 i: 81000 i: 82000 i: 83000 i: 84000 i: 85000 i: 86000 i: 87000 i: 88000 i: 89000 i: 90000 i: 91000 i: 92000 i: 93000 i: 94000 i: 95000 i: 96000 i: 97000 i: 98000 i: 99000 PASS (test heap :time 0.02 :before-memory 0.02 :after-memory 0.02) PASS (test hashtable :time 0.00 :before-memory 0.02 :after-memory 0.02) PASS (test hashtable :time 0.00 :before-memory 0.02 :after-memory 0.02) sizeof(rational): 24 int64_max: 9223372036854775807, INT64_MAX: 9223372036854775807, int64_max.get_int64(): 9223372036854775807, int64_max.get_uint64(): 9223372036854775807 running tst6 running tst7 running tst8 running tst9 41000000000000 -7000000000000 -5 6000000000000 41000000000000 == 41000000000000 -41000000000000 -7000000000000 6 1000000000000 -41000000000000 == -41000000000000 -41000000000000 7000000000000 -6 1000000000000 -41000000000000 == -41000000000000 41000000000000 7000000000000 5 6000000000000 41000000000000 == 41000000000000 41 -7 -5 6 41 == 41 -41 -7 6 1 -41 == -41 -41 7 -6 1 -41 == -41 41 7 5 6 41 == 41 running rational_tester::tst1 (multiplication with big rationals :time 9.78 :before-memory 0.35 :after-memory 35.62) (multiplication with floats: :time 0.00 :before-memory 35.62 :after-memory 35.62) Testing multiplication performance using small ints (multiplication with rationals :time 0.02 :before-memory 56.58 :after-memory 56.58) (multiplication with floats: :time 0.00 :before-memory 56.58 :after-memory 56.58) Testing multiplication performance using small rationals (multiplication with rationals :time 0.27 :before-memory 56.58 :after-memory 56.58) (multiplication with floats: :time 0.00 :before-memory 56.58 :after-memory 56.58) PASS (test rational :time 10.75 :before-memory 0.02 :after-memory 4.52) sizeof(rational): 24 int64_max: 9223372036854775807, INT64_MAX: 9223372036854775807, int64_max.get_int64(): 9223372036854775807, int64_max.get_uint64(): 9223372036854775807 running tst6 running tst7 running tst8 running tst9 41000000000000 -7000000000000 -5 6000000000000 41000000000000 == 41000000000000 -41000000000000 -7000000000000 6 1000000000000 -41000000000000 == -41000000000000 -41000000000000 7000000000000 -6 1000000000000 -41000000000000 == -41000000000000 41000000000000 7000000000000 5 6000000000000 41000000000000 == 41000000000000 41 -7 -5 6 41 == 41 -41 -7 6 1 -41 == -41 -41 7 -6 1 -41 == -41 41 7 5 6 41 == 41 running rational_tester::tst1 (multiplication with big rationals :time 9.76 :before-memory 4.84 :after-memory 35.68) (multiplication with floats: :time 0.00 :before-memory 35.68 :after-memory 35.68) Testing multiplication performance using small ints (multiplication with rationals :time 0.02 :before-memory 56.65 :after-memory 56.65) (multiplication with floats: :time 0.00 :before-memory 56.65 :after-memory 56.65) Testing multiplication performance using small rationals (multiplication with rationals :time 0.27 :before-memory 56.65 :after-memory 56.65) (multiplication with floats: :time 0.00 :before-memory 56.65 :after-memory 56.65) PASS (test rational :time 10.75 :before-memory 4.52 :after-memory 4.59) PASS (test inf_rational :time 0.00 :before-memory 4.59 :after-memory 4.59) PASS (test inf_rational :time 0.00 :before-memory 4.59 :after-memory 4.59) PASS (test ast :time 0.00 :before-memory 4.59 :after-memory 4.59) PASS (test ast :time 0.00 :before-memory 4.59 :after-memory 4.59) PASS (test optional :time 0.00 :before-memory 4.59 :after-memory 4.59) PASS (test optional :time 0.00 :before-memory 4.59 :after-memory 4.59) b: 000001000001100000001000000000100001000000000000000000000000000000000000000001111000000000000000000010000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000000000000000000000000000000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 10000 0100001110 0100011110 ----- 10001 b1(size32): 00000000000000000000000100100011 ------ b1: 10100 ------ b1: 00100 PASS (test bit_vector :time 0.00 :before-memory 4.59 :after-memory 4.59) b: 000001000001100000001000000000100001000000000000000000000000000000000000000001111000000000000000000010000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000000000000000000000000000000000000 b: 0000010000011000000010000000001000010000000000000000000000000000000000000000011110000000000000000000100000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 b: 00000100000110000000100000000010000100000000000000000000000000000000000000000111100000000000000000001000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 10000 0100001110 0100011110 ----- 10001 b1(size32): 00000000000000000000000100100011 ------ b1: 10100 ------ b1: 00100 PASS (test bit_vector :time 0.00 :before-memory 4.59 :after-memory 4.59) 0000010000 0100001110 0100011110 PASS (test fixed_bit_vector :time 0.00 :before-memory 4.59 :after-memory 4.59) 0000010000 0100001110 0100011110 PASS (test fixed_bit_vector :time 0.00 :before-memory 4.59 :after-memory 4.59) [] [] [] 0000000000000000000000000000000 1111111111111111111111111111111 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 0000000000000000000000000011111 11111111111111111111111111x1011 -> 11111111111111111111111111x01 00000000000 11111111111 xxxxxxxxxxx 00000011111 111111x1011 -> 111111x01 000000000000000 111111111111111 xxxxxxxxxxxxxxx 000000000011111 1111111111x1011 -> 1111111111x01 0000000000000000 1111111111111111 xxxxxxxxxxxxxxxx 0000000000011111 11111111111x1011 -> 11111111111x01 00000000000000000 11111111111111111 xxxxxxxxxxxxxxxxx 00000000000011111 111111111111x1011 -> 111111111111x01 PASS (test tbv :time 0.00 :before-memory 4.59 :after-memory 4.59) [] [] [] 0000000000000000000000000000000 1111111111111111111111111111111 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 0000000000000000000000000011111 11111111111111111111111111x1011 -> 11111111111111111111111111x01 00000000000 11111111111 xxxxxxxxxxx 00000011111 111111x1011 -> 111111x01 000000000000000 111111111111111 xxxxxxxxxxxxxxx 000000000011111 1111111111x1011 -> 1111111111x01 0000000000000000 1111111111111111 xxxxxxxxxxxxxxxx 0000000000011111 11111111111x1011 -> 11111111111x01 00000000000000000 11111111111111111 xxxxxxxxxxxxxxxxx 00000000000011111 111111111111x1011 -> 111111111111x01 PASS (test tbv :time 0.00 :before-memory 4.59 :after-memory 4.59) xxxx \ {xxx0} xxx (or (and true (not (not true))) (and true (not (not false)))) true {xx10} {xxxx \ {x0x1, x1x0}} {x110} 11111 00000 xxxxx 01010 10100 00000 xxxxx 11111 \ {00000} -> 11111 11111 -> 111 x1x11 -> xx1 x1x11 \ {11111} -> xx1 \ {111} 1111111111 0000000000 xxxxxxxxxx 0000001010 0000010100 0000000000 xxxxxxxxxx 1111111111 \ { 0000000000} -> 1111111111 1111111111 -> 11111111 11111x1x11 -> 11111xx1 11111x1x11 \ { 1111111111} -> 11111xx1 \ {11111111} 1111111111111111111111111111111111111111111111111111111111111111111111 0000000000000000000000000000000000000000000000000000000000000000000000 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 0000000000000000000000000000000000000000000000000000000000000000001010 0000000000000000000000000000000000000000000000000000000000000000010100 0000000000000000000000000000000000000000000000000000000000000000000000 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 1111111111111111111111111111111111111111111111111111111111111111111111 \ { 0000000000000000000000000000000000000000000000000000000000000000000000} -> 1111111111111111111111111111111111111111111111111111111111111111111111 1111111111111111111111111111111111111111111111111111111111111111111111 -> 11111111111111111111111111111111111111111111111111111111111111111111 11111111111111111111111111111111111111111111111111111111111111111x1x11 -> 11111111111111111111111111111111111111111111111111111111111111111xx1 11111111111111111111111111111111111111111111111111111111111111111x1x11 \ { 1111111111111111111111111111111111111111111111111111111111111111111111} -> 11111111111111111111111111111111111111111111111111111111111111111xx1 \ { 11111111111111111111111111111111111111111111111111111111111111111111} PASS (test doc :time 7.93 :before-memory 4.59 :after-memory 4.64) xxxx \ {xxx0} xxx (or (and true (not (not true))) (and true (not (not false)))) true {xx10} {xxxx \ {x0x1, x1x0}} {x110} 11111 00000 xxxxx 01010 10100 00000 xxxxx 11111 \ {00000} -> 11111 11111 -> 111 x1x11 -> xx1 x1x11 \ {11111} -> xx1 \ {111} 1111111111 0000000000 xxxxxxxxxx 0000001010 0000010100 0000000000 xxxxxxxxxx 1111111111 \ { 0000000000} -> 1111111111 1111111111 -> 11111111 11111x1x11 -> 11111xx1 11111x1x11 \ { 1111111111} -> 11111xx1 \ {11111111} 1111111111111111111111111111111111111111111111111111111111111111111111 0000000000000000000000000000000000000000000000000000000000000000000000 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 0000000000000000000000000000000000000000000000000000000000000000001010 0000000000000000000000000000000000000000000000000000000000000000010100 0000000000000000000000000000000000000000000000000000000000000000000000 xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx 1111111111111111111111111111111111111111111111111111111111111111111111 \ { 0000000000000000000000000000000000000000000000000000000000000000000000} -> 1111111111111111111111111111111111111111111111111111111111111111111111 1111111111111111111111111111111111111111111111111111111111111111111111 -> 11111111111111111111111111111111111111111111111111111111111111111111 11111111111111111111111111111111111111111111111111111111111111111x1x11 -> 11111111111111111111111111111111111111111111111111111111111111111xx1 11111111111111111111111111111111111111111111111111111111111111111x1x11 \ { 1111111111111111111111111111111111111111111111111111111111111111111111} -> 11111111111111111111111111111111111111111111111111111111111111111xx1 \ { 11111111111111111111111111111111111111111111111111111111111111111111} PASS (test doc :time 7.95 :before-memory 4.64 :after-memory 4.64) {xxx \ {0x1}} {xxx \ {0x0, 1x1}} {0xxx \ {00xx, 0101, 0111}} {} {} {0x01 \ {0001, 0101, 0101}} {} {} {x1xx \ {01xx, 0101, x100}, x1x1 \ {x111, 1101}} {} {} {} {} {} {} {x1xx \ {x10x, 11x1, 0100}} {} {1xx1 \ {1001, 1x11, 1011}} {1xx0 \ {1000, 1x00, 1100}, 1xxx \ {11x1, 1x11, 1111}} {x1x1 \ {1101, 0111, x111, 11x1}} {xxx0 \ {x110, 0010, x000}} {} {} {xx00 \ {0000, x000}, 0x00 \ {0000, 0100, 0100}} {10xx \ {1001, 1000, 1010}} {0000 \ {0000}} {1x1x \ {1x10, 1x11}} {x11x \ {0111, x111}} {1x1x \ {1110, 1011, 1x10, 1x11, 111x}} {} {1x0x \ {1x01, 1000, 1000}} {} {0xx0 \ {0000, 00x0, 0100}} {} {} {x1x1 \ {0101, 11x1, 1111}, 0x11 \ {0011}} {10x0 \ {1000, 1010}} {} {xxxx \ {011x, 1x01}, 0xx1 \ {0x01, 00x1, 0011}, 1xxx \ {11xx, 11x0, 100x}} {x10x \ {110x, 0101, 0100}, 1x01 \ {1101}} {0x0x \ {0100, 0001, 010x, 000x}, 0101} {0xx0 \ {0000, 0110, 0x00}} {} {} {10xx \ {10x1, 10x0, 1000}} {1xx0 \ {1x10, 11x0, 1010}, xxx1 \ {x1x1, 0011, x101}} {x0x0 \ {x0x0}, x1x1 \ {x1x1}} {x1x1 \ {1101, x101}, 0x0x \ {0001, 0101, 010x}} {} {} {01xx \ {011x, 010x, 0110}, x000 \ {1000, 0000}} {xx1x \ {xx10, 101x, 101x}, 0x10 \ {0010, 0110, 0110}} {1x1x \ {1x1x}, 1010 \ {1010}} {x0x0 \ {x010, x000, 10x0}} {0xx1 \ {0101, 0111, 0011}, 0x00 \ {0000}} {0000 \ {0000}} {x1x0 \ {1100, 1110, 0110}} {100x \ {1001, 1000}} {0000 \ {0000}} {1xx1 \ {1111, 11x1, 1101}, x0xx \ {x001, x000, x0x0}} {0x00 \ {0000}, xx1x \ {001x, 1x11, 1x11}} {1111, 0000 \ {0000}, 1x1x \ {1110, 1011, 1x10}} {1x1x \ {1111, 101x, 1010}} {xx1x \ {111x, 001x, xx10}} {1x1x \ {1110, 1011, 101x, 1x11}} {} {0xx0 \ {0x00, 0110, 0100}} {} {0x1x \ {0111, 001x, 0x11}} {00x0 \ {0010, 0000}} {1010 \ {1010}} {100x \ {1000}, xx10 \ {0110, x010, 0x10}, xx0x \ {1101, 1100, 100x}} {0x0x \ {000x, 0001, 0100}} {0x0x \ {0100, 0001, 000x}} {x0xx \ {x001, 10x1, x01x}} {x0xx \ {1011, 0000}, 110x \ {1101, 1100, 1100}} {xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xx01, xx1x}, 0x0x \ {0100, 0001, 0x01, 010x, 000x, 000x}} {x001 \ {1001, 0001}} {xx0x \ {1100, 0x0x, x10x}, 000x \ {0001}} {0101 \ {0101}} {x001 \ {1001, 0001, 0001}} {10xx \ {1011, 1001, 10x0}} {0101 \ {0101}} {} {0x00 \ {0000, 0100}} {} {x1xx \ {01x1, 010x, x1x0}} {011x \ {0111, 0110}, x00x \ {x001, 1000}, xxxx \ {0000, 00xx, 0111}} {1x1x \ {1110, 1011, 1x10, 111x, 101x}, 0x0x \ {0100, 0001, 0x00, 010x}, xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xxx0}} {01xx \ {01x1, 0110}} {} {} {x111 \ {0111, 1111}, 101x \ {1010, 1011}} {} {} {x101 \ {1101}} {x1xx \ {1101, 01xx, x101}, 1x0x \ {1x01, 1x00}} {0101 \ {0101}} {001x \ {0010}, 1x1x \ {1111, 1010, 1x10}} {0x0x \ {0000, 0x01, 000x}, 10xx \ {100x, 10x0, 1011}} {1x1x \ {1110, 1011, 1x10, 101x, 111x}} {} {1x00 \ {1000}} {} {xx11 \ {0011, 1111, 1111}} {xxx1 \ {1101, 1111, 0111}} {1111} {00xx \ {00x0, 00x1, 0001}} {10x0 \ {1000}, x10x \ {0100, x101, x100}} {x0x0 \ {x0x0}, 0x0x \ { 0100, 0001, 0x00, 0x01, 0x01, 010x, 000x}} {xx01 \ {1001, 0x01, 0101}} {011x \ {0111, 0110}} {} {} {x1xx \ {x10x, 1101, 0111}, xx11 \ {0111, 1111, 1x11}} {} {xx00 \ {0000, 0x00, 0100}} {x11x \ {0111, 111x, x111}, x01x \ {x011, x010, x010}} {} {11x1 \ {1101}} {1x1x \ {1011, 1110, 1x10}} {1111} {0x00 \ {0000, 0100}} {0xxx \ {0x00, 0101, 0001}} {0000 \ {0000}} {x0x0 \ {10x0, 1000}, 0x0x \ {0x00, 0000, 010x}} {xxx1 \ {xx11, xx01, x0x1}, 0xx0 \ {0100, 01x0}} {x0x0 \ {1000, 0010}, 0101 \ {0101}, 0000 \ {0000}} {x1x0 \ {01x0, 0110}} {x010 \ {1010, 0010}} {1010 \ {1010}} {x1x0 \ {1110, 1100, x100}} {1xx1 \ {1011, 1111}} {} {0xx0 \ {0000, 0x00, 01x0}} {x0x1 \ {x001, 1001, 0011}, 01xx \ {0111, 0110, 010x}, 0xx1 \ {0101, 0111, 0111}} {x0x0 \ {1000, 0010, x000, 10x0, 00x0, x000}} {1x0x \ {1x00, 1100}, x0xx \ {x00x, 1000, x001}, 100x \ {1001, 1000}} {xx0x \ {xx01, 1100, 010x}} {0x0x \ {0100, 0001, 0x00, 010x}} {1x1x \ {111x, 1010}, x001 \ {1001, 0001}} {xx0x \ {0000, x000, 1101}} {0101 \ {0101}} {xx11 \ {0111, 0011, 0011}, 00x0 \ {0010, 0000}} {0xxx \ {0x1x, 011x, 011x}} {1111 \ {1111}, x0x0 \ {1000, 0010, x010, x000, 10x0}} {} {11x1 \ {1101, 1111}, xxx1 \ {0x11, xx11, 1x01}} {} {0xx1 \ {0x01, 00x1, 0111}, xx01 \ {1001, x001, x101}, 1xx0 \ {1x10, 1000, 1100}} {01xx \ {011x, 01x0, 01x1}} {x1x1 \ {x1x1}, 0101 \ {0101}, x0x0 \ {x0x0}} {x0xx \ {0000, 10x1, 10x1}} {x010 \ {1010, 0010}} {1010 \ {1010}} {xx00 \ {1000, 0x00, x000}, 00x0 \ {0000, 0010}} {x100 \ {0100, 1100, 1100}, xx00 \ {x100, x000, 1000}} {0000 \ {0000}} {x010 \ {1010, 0010, 0010}, 000x \ {0001}} {10xx \ {10x1, 101x}} {1010 \ {1010}, 0x0x \ {0100, 0001, 0x01, 010x}} {x1xx \ {11x1, x10x, 1100}, 0x11 \ {0111, 0011}} {} {} {0x10 \ {0110}} {} {} {} {xx11 \ {1x11, x011}, 111x \ {1110}} {} {xx1x \ {0x10, x011, 111x}} {0xx0 \ {0100, 01x0, 00x0}, 10xx \ {10x1, 1010}} {1010 \ {1010}, 1x1x \ {1110, 1011, 111x, 101x}} {} {011x \ {0111, 0110}, 01x1 \ {0111, 0101}} {} {x1x0 \ {1100, 01x0, 1110}, 1x0x \ {1000, 110x}} {10xx \ {1000, 100x, 1011}, 0xx0 \ {0100, 0x10, 0x00}, 00xx \ {001x, 00x1, 0011}} {x0x0 \ {1000, 0010, 00x0, 00x0, x000, x010}, x0x0 \ {1000, 0010, 10x0, x000, x010}, 0000 \ {0000}, 0x0x \ {0100, 0001, 010x, 0x00}} {11x0 \ {1110, 1100, 1100}} {1x1x \ {111x, 1x11, 1111}, x110 \ {0110, 1110, 1110}, 00xx \ {00x0, 000x, 0011}} {1010 \ {1010}, x0x0 \ {x0x0}} {0x11 \ {0111, 0011, 0011}, x1xx \ {110x, 111x, 0100}} {xxxx \ {110x, xx10, 11x0}} {1111 \ {1111}, xxxx \ {x1x0, x0x1, 1x0x, 0x1x, 10xx, xx00}} {} {xx0x \ {xx00, 0000, x001}, 0x01 \ {0101}, xx0x \ {xx01, 1001, x100}} {} {0xxx \ {0010, 0x00, 0xx0}} {xx00 \ {x100, 1x00, 1000}} {0000 \ {0000}} {xxx0 \ {1100, 0010, 1x10}, xx01 \ {1001, 0101}} {x010 \ {0010, 1010}} {1010 \ {1010}} {x111 \ {1111, 0111}, x00x \ {1001, 0001, 0001}} {010x \ {0100}} {0x0x \ {0100, 0001, 000x, 0x01, 0x01}} {xx11 \ {0011, x111, 0x11}, 1x00 \ {1000, 1100}} {1xx1 \ {1x01, 1101, 1101}, 010x \ {0101, 0100}} {1111, 0000 \ {0000}} {00xx \ {00x1, 001x, 0001}} {x11x \ {0111, 0110, 011x}} {1x1x \ {1x1x}} {0xxx \ {010x, 0x01}} {1x11 \ {1111, 1011, 1011}} {1111 \ {1111}} {x1x0 \ {0110, 0100}, x01x \ {x010, 001x, 0010}} {} {} {1xxx \ {1101, 10x0, 1x11}, x1x1 \ {01x1, 1111}} {00x1 \ {0001, 0011}} {x1x1 \ {1101, 0111, x111, 01x1, 11x1}} {0x01 \ {0001}, xxx1 \ {1x01, 0001, 10x1}} {1x1x \ {1x11, 1011, 1011}, 00xx \ {000x, 001x, 00x1}} {0101 \ {0101}, 1111 \ {1111}, x1x1 \ {x1x1}} {1xxx \ {1xx0, 111x, 1x1x}, x0x1 \ {0011, 10x1}, x01x \ {101x, 001x}} {10x0 \ {1010, 1000}, 11x1 \ {1111, 1101, 1101}} {x0x0 \ {x0x0}, x1x1 \ {1101, 0111, x111, 11x1, 01x1, 01x1}, 1010 \ {1010}, 1111 \ {1111}} {x01x \ {1010, x010, 0011}} {1x11 \ {1111, 1011}} {1111 \ {1111}} {} {010x \ {0100, 0101}, xx00 \ {x000, 0100}} {} {xxx0 \ {x100, x010, 1x00}, xxx1 \ {0001, 1011, 1x01}} {x010 \ {1010, 0010}, xx0x \ {x101, x10x, 1000}} {1010 \ {1010}, 0000, 0101} {x0xx \ {1000, 1010, 00x0}, xx00 \ {0100, 1x00, 0x00}} {01xx \ {0101, 01x0, 0100}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, 01xx, x0xx, 00xx, xx00, xx10}, 0000 \ {0000}} {x0x1 \ {0001, 1011}, 010x \ {0101}} {x110 \ {1110, 0110, 0110}, 0x00 \ {0000}, 10xx \ {1001, 101x, 1010}} {x1x1 \ {1101, 0111, 01x1, 11x1}, 0000, 0x0x \ {0100, 0001, 0x01, 010x}} {00xx \ {00x0, 000x, 0001}} {101x \ {1011, 1010, 1010}} {1x1x \ {1110, 1011, 1x10, 111x, 101x, 101x}} {01xx \ {0100, 0101}, 10xx \ {10x1, 1001, 1011}} {xx01 \ {1001, x001, 0001}, 0xx1 \ {0111, 0001, 0101}} {0101 \ {0101}, x1x1 \ {1101, 0111, x101, 01x1}} {11x1 \ {1111, 1101, 1101}, x0x1 \ {10x1, 00x1}} {xxxx \ {0x11, 0x1x, 00x0}, x111 \ {0111, 1111}, x10x \ {0101, 110x, 1101}} {x1x1 \ {1101, 0111, x111, x101, x101}, 1111 \ {1111}, 0101 \ {0101}} {000x \ {0001, 0000, 0000}, xx10 \ {0110, x010, 1x10}} {01xx \ {01x1, 011x, 0101}} {0x0x \ { 0100, 0001, 0x01, 0x00, 0x00, 010x, 010x}, 1010 \ {1010}} {10xx \ {101x, 10x0, 10x0}, 1x0x \ {1x01, 1000, 110x}} {x011 \ {0011, 1011}, xxx1 \ {1011, 0x01, 1x11}} {1111 \ {1111}, x1x1 \ {1101, 0111, x111}, 0101 \ {0101}} {xx01 \ {x001, 0001, 0001}, xxxx \ {x10x, 1011, 10x1}, xx00 \ {0x00, 1x00, x000}} {0xx0 \ {0x00, 0110, 0000}, x1x0 \ {x110, 0100, x100}} {x0x0 \ {1000, 0010, 00x0}, 0000 \ {0000}} {0xx0 \ {01x0, 0010, 0110}, 111x \ {1111, 1110, 1110}} {xx1x \ {001x, 0010, 011x}} {1010 \ {1010}, 1x1x \ {1110, 1011, 1x11, 1x10, 1x10}} {11xx \ {111x, 110x}} {x10x \ {x100, 1101, 0101}} {0x0x \ {0x0x}} {x10x \ {010x, 1100}} {} {} {10x1 \ {1001, 1011}, xx0x \ {0100, 000x, 1x0x}} {x00x \ {1001, 000x, 0000}} {0101 \ {0101}, 0x0x \ {0100, 0001, 010x, 0x00}} {x1x1 \ {1101, x101}} {001x \ {0011, 0010}} {1111 \ {1111}} {xx00 \ {0100, 1000, x000}} {0x10 \ {0010, 0110}, xx1x \ {0x10, x111, x110}} {} {x1x0 \ {0100, x100, 0110}, x0x1 \ {1011, 10x1, x011}} {0x1x \ {011x, 001x, 0x10}} {1010 \ {1010}, 1111 \ {1111}} {000x \ {0001, 0000, 0000}, 0x1x \ {001x, 0x10, 011x}} {01xx \ {01x1, 010x, 0110}} {0x0x \ {0x0x}, 1x1x \ {1x1x}} {0x0x \ {0100, 010x, 000x}} {x101 \ {0101}} {0101 \ {0101}} {x10x \ {x100, 0101, 1100}, 1x0x \ {1x01, 1100}, xx1x \ {111x, 1011, 0010}} {} {} {1xxx \ {101x, 10x1, 1110}} {1x00 \ {1100, 1000}} {0000 \ {0000}} {01xx \ {011x, 01x1}, x11x \ {0110, x110, 0111}} {x1xx \ {11xx, 01x1, 1101}, 01xx \ {01x0, 0100, 010x}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx1x, xxx1, x1xx, 01xx}, xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx1x, xxx1, x0xx, 00xx, 0xxx}, 1x1x \ {1110, 1011, 1x10, 111x}, 1x1x \ {1110, 1011, 1x10, 101x}} {011x \ {0111, 0110}} {x110 \ {1110, 0110}, xx00 \ {0x00, 1x00, x100}} {1010 \ {1010}} {10xx \ {1001, 1011, 101x}} {xxxx \ {x10x, 1000, 00xx}, 0x0x \ {0100, 0x01, 0000}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx01, xx11, xx1x, 00xx}, 0x0x \ {0100, 0001, 0x01, 010x, 000x}} {x10x \ {010x, x101, 0101}, 0x0x \ {000x, 0100, 0x01}, x0x0 \ {10x0}} {11xx \ {11x0}} {0x0x \ {0100, 0001, 0x01, 000x}, x0x0 \ {x0x0}} {} {00xx \ {000x, 00x1, 0011}, 0x1x \ {0110, 001x, 011x}} {} {xx01 \ {1x01, 1101, 1101}} {x11x \ {0111, 1111, 011x}, xx00 \ {x000, 1000, x100}, 0x10 \ {0110, 0010, 0010}} {} {0x0x \ {0100, 000x, 010x}, 1x0x \ {1101, 1x01, 1001}} {} {} {} {x001 \ {1001, 0001}} {} {xxx1 \ {0xx1, 0x11, x1x1}, x00x \ {1001, 000x, 000x}} {xx01 \ {0101, 1001, x101}, x01x \ {0010, 1010, 001x}} {0101, 1111} {xx01 \ {0x01, 1101}} {x11x \ {x111, 0110, x110}} {} {001x \ {0010}, 0xxx \ {011x, 0x00}} {} {} {x01x \ {x010, 101x, 101x}, 100x \ {1001, 1000, 1000}} {} {} {1x0x \ {1101, 110x, 110x}, x100 \ {0100}} {111x \ {1111, 1110}} {} {x1xx \ {01x0, 11x1, x11x}, 100x \ {1001, 1000}, x011 \ {1011, 0011}} {x1x0 \ {1100, 0100}} {x0x0 \ {1000, 0010, x010, 00x0}, 0000 \ {0000}} {x1x1 \ {1111, 0111, 01x1}, xxxx \ {0010, 00x1, 1010}} {} {} {xx00 \ {1000, 0000, 0100}} {} {} {11xx \ {1101, 11x1, 11x0}} {10x1 \ {1011, 1001, 1001}} {x1x1 \ {x1x1}} {01xx \ {01x0, 0100, 011x}} {1xx0 \ {1010, 1100, 11x0}, 01xx \ {0110, 010x, 0100}} {x0x0 \ {x0x0}, xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xxx0, xx00, xx1x, 10xx, 0xxx, 00xx}} {00x0 \ {0010, 0000, 0000}, 10x0 \ {1010}} {x110 \ {1110}, x010 \ {1010, 0010}} {1010 \ {1010}} {} {xxxx \ {000x, 010x, x11x}} {} {} {xxx0 \ {x010, x100, x0x0}} {} {x100 \ {0100}, x0xx \ {x000, 00x0}} {xxx0 \ {0110, x100, x0x0}} {0000 \ {0000}, x0x0 \ {1000, 0010, x000, 00x0}} {} {x0xx \ {1001, 0001, 0011}, x0xx \ {x000, 0000, x001}} {} {0xx0 \ {00x0, 0000, 01x0}, 1x01 \ {1001, 1101, 1101}} {1xxx \ {101x, 10x1, 1100}, 000x \ {0001, 0000, 0000}, 1x0x \ {1x01, 100x, 1001}} {x0x0 \ {x0x0}, 0000 \ {0000}, 0101 \ {0101}} {1xxx \ {1xx0, 10x0, 1001}, 0x10 \ {0110, 0010}} {x00x \ {1001, x001}} {0x0x \ {0100, 0001, 0x00, 010x}} {001x \ {0011, 0010, 0010}} {xxx0 \ {x000, 1010, 0000}, x0xx \ {000x, 00x0, 10x1}} {1010 \ {1010}, 1x1x \ {1110, 1011, 1x11, 1x10, 1x10}} {0x00 \ {0000, 0100}} {11x0 \ {1110, 1100, 1100}, 11x0 \ {1100, 1110, 1110}, 101x \ {1010, 1011, 1011}} {0000 \ {0000}} {} {} {} {00xx \ {000x, 001x, 00x1}} {} {} {x011 \ {1011, 0011}, x01x \ {0010, 001x, x010}} {} {} {010x \ {0101, 0100, 0100}, xxx0 \ {0110, 1xx0, 1100}, x00x \ {000x, 1001}} {01xx \ {0110, 0111, 0100}} {x0x0 \ {1000, 0010, 10x0, 00x0}, 0x0x \ {0100, 0001, 000x, 0x01}} {x0x0 \ {1000, 0010, x000}} {100x \ {1001}, 1xx0 \ {1000, 11x0, 1x10}} {0000 \ {0000}, x0x0 \ {1000, 0010, x000, 10x0, 00x0}} {1x10 \ {1010, 1110}} {} {} {x1xx \ {x10x, 11x1, 11x0}, 00x0 \ {0000}} {x1xx \ {0100, 0101, 111x}, 0xxx \ {0001, 0110, 0010}} {xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xx0x}, x0x0 \ {1000, 0010, x000}} {x0x1 \ {x001, 0001, 0011}} {101x \ {1010, 1011}} {1111 \ {1111}} {} {} {} {x1x0 \ {0110, 0100}} {x1x1 \ {0101, 1101, 1111}} {} {} {01xx \ {01x1, 011x, 0110}} {} {0xxx \ {0011, 0xx1, 0111}, xx11 \ {0011, x011}, x1xx \ {111x, x10x}} {000x \ {0000, 0001, 0001}, 0x10 \ {0110, 0010, 0010}} {0x0x \ {0100, 0001, 0x01, 000x, 010x, 010x}, 1010 \ {1010}} {x1x0 \ {0110, x100, 01x0}} {1x0x \ {1x01, 1001, 1x00}, x00x \ {0000, 0001, 100x}} {0000 \ {0000}} {} {x0x1 \ {10x1, 00x1, 00x1}} {} {} {x0x1 \ {0001, x011, 1011}, xxx1 \ {x011, 1xx1, 10x1}} {} {xx11 \ {1111, 1x11}} {11x1 \ {1111, 1101}} {1111 \ {1111}} {0xx1 \ {00x1, 01x1, 0x01}} {x1x0 \ {1110, 01x0, 1100}, xx0x \ {100x, 1000, 1100}} {0101 \ {0101}} {xx0x \ {110x, 000x, x001}, x11x \ {111x, x111, 0110}} {01x0 \ {0100, 0110}} {0000 \ {0000}, 1010 \ {1010}} {10xx \ {1001, 1010, 100x}} {x001 \ {1001, 0001}} {0101 \ {0101}} {0x00 \ {0100}} {xx0x \ {0000, 1x0x, xx01}} {0000} {1x0x \ {1100, 110x, 1x01}, x00x \ {1001, 0001, 0001}} {1x1x \ {1110, 101x, 1010}, xx01 \ {x001, 1101, 0x01}} {0101 \ {0101}} {} {} {} {x110 \ {0110, 1110}} {xx00 \ {0000, x100, x000}, xx00 \ {0000, x100}} {} {} {xx10 \ {0110, x110, x110}} {} {xx01 \ {0001, 1001}, 0xxx \ {0101, 0110, 0x1x}} {x01x \ {0011, 1011, x011}} {1x1x \ {1x1x}} {xxx1 \ {01x1, x011, 1011}, 1xx1 \ {1101, 1111, 1011}, 11xx \ {110x, 1110, 11x1}} {0x1x \ {011x, 0x11}} {1111 \ {1111}, 1x1x \ {1110, 1011, 1x10, 1x11, 111x}} {xxxx \ {x101, 0010, 110x}, 111x \ {1111, 1110}} {x0x0 \ {1000, 0010, 10x0}, x0x1 \ {1001, 0011}} {x0x0 \ {1000, 0010, 10x0}, x1x1 \ {1101, 0111}, 1010 \ {1010}, 1111 \ {1111}} {} {11x0 \ {1110, 1100}} {} {10xx \ {1001, 1011, 100x}} {00x1 \ {0001}, 11x1 \ {1111, 1101}} {x1x1 \ {1101, 0111, x101, x111, x101, 01x1}} {} {0xx1 \ {0011, 0111}} {} {11xx \ {1101, 11x0, 1110}} {x1xx \ {01x0, x10x, 110x}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx01, xxx0, xx10, 0xxx, 00xx}} {1xx1 \ {1101, 1111}} {} {} {x101 \ {0101, 1101}} {0xx1 \ {0x01, 0001, 0111}, xxxx \ {0111, 1xx1, 001x}, x10x \ {1100, 110x, 0101}} {0101 \ {0101}} {01xx \ {0101, 011x, 0100}, x0x0 \ {00x0, x000, x010}, 0xxx \ {010x, 00x0, 00x1}} {10x1 \ {1001, 1011}, xx10 \ {1x10, x110, 1110}} {x1x1 \ {1101, 0111, 01x1, 11x1, x101}, 1010} {010x \ {0101, 0100}} {x11x \ {1111, 0111, 111x}, 0x00 \ {0100}} {0000 \ {0000}} {x0x0 \ {x010}} {1x0x \ {100x, 110x}} {0000 \ {0000}} {xx10 \ {0x10, x110, 0010}, 01x0 \ {0100, 0110, 0110}} {1x0x \ {1101, 100x, 1001}, 0xxx \ {0100, 0x10, 0010}} {1010 \ {1010}, 0000 \ {0000}, x0x0 \ {1000, 0010, x000, x010, x010, 10x0}} {1x0x \ {1100, 110x, 1000}, 1xx0 \ {1x10, 1x00, 10x0}, 1x1x \ {101x, 1111, 1x10}} {1x10 \ {1010, 1110, 1110}} {1010 \ {1010}} {} {0x0x \ {0x01, 0001, 0x00}} {} {} {x11x \ {1110, 0110, x111}} {} {0x00 \ {0000, 0100, 0100}} {xxx1 \ {x011, 0101, 1x01}} {} {x1x1 \ {01x1, 0111, 1111}} {01xx \ {0110, 0101, 01x1}} {x1x1 \ {x1x1}} {1x1x \ {1010, 111x, 1x10}} {} {} {} {10x0 \ {1000, 1010, 1010}} {} {} {x0x1 \ {1001, x001}, x01x \ {x010, 1011}} {} {0x1x \ {011x, 001x}, x0xx \ {x00x, 0011, 1001}} {xx00 \ {1100, x100}} {0000 \ {0000}} {xx00 \ {0100, 1100, 1100}, x11x \ {x110, x111, 0111}} {0xx1 \ {00x1, 0011, 0x01}} {1111 \ {1111}} {x0x1 \ {0011, 1001, 00x1}, 0x0x \ {0000, 0101, 000x}} {x100 \ {0100}} {0000} {} {} {} {xx10 \ {0110, 0x10}} {x0xx \ {x000, 10x1, 0001}} {1010} {} {x0x1 \ {00x1, 1011, 1011}} {} {} {01xx \ {010x, 011x}} {} {} {x1xx \ {11xx, 01xx, 010x}, xxx1 \ {00x1, 1101, 0001}} {} {xxxx \ {00x1, 010x, x111}, x101 \ {0101, 1101}} {0xx0 \ {0110, 0000, 0010}, 1x01 \ {1101, 1001}, 0x0x \ {0101, 0100, 0000}} {x0x0 \ {1000, 0010, 10x0}, 0101 \ {0101}, 0x0x \ {0100, 0001, 000x}} {x01x \ {0011, 101x, 101x}} {x101 \ {1101, 0101, 0101}} {} {xx10 \ {1x10, x110, 0x10}} {1x01 \ {1001, 1101, 1101}, 1xx1 \ {11x1, 1x01, 1111}} {} {0xx0 \ {0x00, 0010, 0010}} {x0xx \ {00x1, 10x0, 00x0}} {x0x0 \ {x0x0}} {x001 \ {0001, 1001}, 1x00 \ {1000, 1100, 1100}} {10xx \ {101x, 1011, 100x}, 1xxx \ {1011, 1xx0, 1111}} {0101 \ {0101}, 0000 \ {0000}} {x0x0 \ {0000, x010, 1000}, xx0x \ {1x0x, 0001, 1101}, xxx0 \ {11x0, 0xx0, 1xx0}} {001x \ {0010, 0011}} {1010 \ {1010}} {xx1x \ {x110, 1x10, 101x}, xx01 \ {0001, 0101, 1x01}, 0xx0 \ {0x00, 0010, 0100}} {xxxx \ {1010, xxx1, 100x}, xxx1 \ {01x1, 0011, 00x1}} {1x1x \ {1110, 1011, 111x}, 1111, 0101 \ {0101}, x0x0 \ {1000, 0010, x000}} {xx1x \ {001x, 1x10, 111x}} {x101 \ {0101}, x1xx \ {11x1, 0101, x1x0}} {1x1x \ {1110, 1011, 101x}} {01xx \ {01x0, 01x1, 0110}} {} {} {xxxx \ {101x, 0xx1, xx0x}, xx0x \ {0001, 1101}} {0xx0 \ {0110, 00x0}, 1xx0 \ {11x0, 1010, 1100}} {x0x0 \ {1000, 0010, x000, 10x0}, 0000} {0xxx \ {01xx, 00x1, 00x0}, xxx1 \ {1101, 0101, 0x01}} {0xx1 \ {01x1, 0011, 0011}, x00x \ {100x, 1001, x000}, xxx0 \ {x0x0, 1100, 1110}} {0x0x \ {0100, 0001, 000x, 0x01, 0x00}, x0x0 \ {x0x0}, x1x1 \ {1101, 0111, 11x1, 11x1}, 0101} {xxxx \ {01xx, 0xx0, 1xxx}} {} {} {xxx0 \ {x010, 0100}} {11xx \ {1100, 11x1, 11x1}} {x0x0 \ {1000, 0010, 00x0}} {00x0 \ {0010, 0000}} {1x0x \ {110x, 1100, 1001}} {0000 \ {0000}} {xxx1 \ {xx11, 00x1, 1x01}} {} {} {xx10 \ {x010, x110, 0110}} {00x1 \ {0011, 0001}, xx0x \ {x101, 0x01, 0x0x}, x11x \ {0111, 111x}} {1010 \ {1010}} {} {xx0x \ {100x, 0x00, x000}} {} {} {} {} {x011 \ {1011, 0011, 0011}, x0x0 \ {00x0, 1000, 1010}} {} {} {} {0xx1 \ {0x01, 0011, 0x11}} {} {x010 \ {0010, 1010}, xxx0 \ {1010, xx00, 00x0}} {xx10 \ {0x10, x110, x010}} {1010 \ {1010}} {x01x \ {x010, 001x}} {xxx0 \ {0000, 01x0, 1x00}, xxx1 \ {0x11, 0111, 1xx1}} {1010 \ {1010}, 1111 \ {1111}} {100x \ {1001, 1000, 1000}} {0x1x \ {0111, 0010, 0011}, xxx1 \ {11x1, 1011, 0011}} {0101 \ {0101}} {1x0x \ {1101, 1x00, 1001}} {0xx0 \ {0010, 00x0, 0x00}, 1x00 \ {1100, 1000}} {0000 \ {0000}} {0xxx \ {01x0, 000x, 00x1}, xx1x \ {0111, 1011, 0x11}} {} {} {xx1x \ {1110, 1111}} {xx1x \ {111x, x010, x011}, xx1x \ {0x1x, 1010, 011x}} {1x1x \ {1110, 1011}} t1:{0111} t2:{1100, 1101} t:{1101} {x0000 \ {10000, 00000}} {0x01x \ {00010, 0x011, 0101x}} {} {00xx1 \ {00101, 000x1, 00111}, 1xx10 \ {10010, 11010}} {x0111 \ {10111}, 0101x \ {01011}} { x011100x11 \ { x011100011, x011100111, 1011100x11}, 0101100x11 \ { 0101100011, 0101100111, 0101100x11}, 010101xx10 \ { 0101010010, 0101011010}} {01x11 \ {01011, 01111}, 1x0xx \ {10011, 11011, 110x1}} {} {} {1x110 \ {10110}, 10x10 \ {10110, 10010}} {110xx \ {1101x, 110x1, 110x0}} { 110101x110 \ { 1101010110, 110101x110, 110101x110}, 1101010x10 \ { 1101010110, 1101010010, 1101010x10, 1101010x10}} {xx01x \ {01010, x101x, 0101x}, 0xx01 \ {01001, 01101}, xx110 \ {11110, 01110, 00110}} {0xx0x \ {0000x, 00x01, 0100x}} { 0xx010xx01 \ { 0xx0101001, 0xx0101101, 000010xx01, 00x010xx01, 010010xx01}} {x0100 \ {00100}, 0x11x \ {0011x, 0x110, 00111}, xx001 \ {11001, 01001}} {0x1x1 \ {001x1, 01111, 0x101}, x1xxx \ {11x1x, 01011, 11001}, 00xxx \ {000x0, 00xx0, 001x1}} { x1x00x0100 \ { x1x0000100}, 00x00x0100 \ { 00x0000100, 00000x0100, 00x00x0100}, 0x1110x111 \ { 0x11100111, 0x11100111, 001110x111, 011110x111}, x1x1x0x11x \ { x1x110x110, x1x100x111, x1x1x0011x, x1x1x0x110, x1x1x00111, 11x1x0x11x, 010110x11x}, 00x1x0x11x \ { 00x110x110, 00x100x111, 00x1x0011x, 00x1x0x110, 00x1x00111, 000100x11x, 00x100x11x, 001110x11x}, 0x101xx001 \ { 0x10111001, 0x10101001, 00101xx001, 0x101xx001}, x1x01xx001 \ { x1x0111001, x1x0101001, 11001xx001}, 00x01xx001 \ { 00x0111001, 00x0101001, 00101xx001}} {xxxx0 \ {x11x0, 0xx00, 111x0}} {xx00x \ {11001, x0000}} { xx000xxx00 \ { xx000x1100, xx0000xx00, xx00011100, x0000xxx00}} {xxx01 \ {00001, 01001, 11x01}} {xxxx1 \ {x1101, 10x01, 0x011}} { xxx01xxx01 \ { xxx0100001, xxx0101001, xxx0111x01, x1101xxx01, 10x01xxx01}} {} {xx001 \ {x1001, 0x001}} {} {xx1xx \ {xx101, 1x10x, 0111x}} {00xx1 \ {00001, 00111, 00011}} { 00xx1xx1x1 \ { 00x11xx101, 00x01xx111, 00xx1xx101, 00xx11x101, 00xx101111, 00001xx1x1, 00111xx1x1, 00011xx1x1}} {01x0x \ {01100, 01001, 01x01}, 0xxxx \ {00xx0, 0x0xx, 0xx00}} {xx00x \ {xx001, x000x, 0000x}} { xx00x01x0x \ { xx00101x00, xx00001x01, xx00x01100, xx00x01001, xx00x01x01, xx00101x0x, x000x01x0x, 0000x01x0x}, xx00x0xx0x \ { xx0010xx00, xx0000xx01, xx00x00x00, xx00x0x00x, xx00x0xx00, xx0010xx0x, x000x0xx0x, 0000x0xx0x}} {11x1x \ {11010, 11011, 11011}, 01xxx \ {01010, 010xx, 01x1x}} {} {} {1xx0x \ {1000x, 10x0x, 11101}, 1x1x1 \ {10111, 111x1, 11111}} {0xxxx \ {00111, 0x100, 01xx1}, xx01x \ {0x011, 11010, x101x}} { 0xx0x1xx0x \ { 0xx011xx00, 0xx001xx01, 0xx0x1000x, 0xx0x10x0x, 0xx0x11101, 0x1001xx0x, 01x011xx0x}, 0xxx11x1x1 \ { 0xx111x101, 0xx011x111, 0xxx110111, 0xxx1111x1, 0xxx111111, 001111x1x1, 01xx11x1x1}, xx0111x111 \ { xx01110111, xx01111111, xx01111111, 0x0111x111, x10111x111}} {110xx \ {11000, 110x1, 11010}} {x0111 \ {10111}, 11xxx \ {11110, 11x1x, 110x0}} { x011111011 \ { x011111011, 1011111011}, 11xxx110xx \ { 11xx1110x0, 11xx0110x1, 11x1x1100x, 11x0x1101x, 11xxx11000, 11xxx110x1, 11xxx11010, 11110110xx, 11x1x110xx, 110x0110xx}} {x0110 \ {10110, 00110, 00110}} {xx00x \ {x0000, 1x000, 0000x}, 1x0x1 \ {10011, 1x001, 1x001}} {} {0x11x \ {00110, 01111, 0x110}} {x01x0 \ {00100, 10100, x0100}} { x01100x110 \ { x011000110, x01100x110}} {0xxxx \ {00111, 00xxx, 0x1x1}, 00x10 \ {00110, 00010}} {x10xx \ {x10x0, 11000, 010x1}, x1xx0 \ {x11x0, x10x0, 011x0}} { x10xx0xxxx \ { x10x10xxx0, x10x00xxx1, x101x0xx0x, x100x0xx1x, x10xx00111, x10xx00xxx, x10xx0x1x1, x10x00xxxx, 110000xxxx, 010x10xxxx}, x1xx00xxx0 \ { x1x100xx00, x1x000xx10, x1xx000xx0, x11x00xxx0, x10x00xxx0, 011x00xxx0}, x101000x10 \ { x101000110, x101000010, x101000x10}, x1x1000x10 \ { x1x1000110, x1x1000010, x111000x10, x101000x10, 0111000x10}} {0xxx0 \ {01010, 00110, 01100}, xxx10 \ {01110, x0010, x1110}} {00xxx \ {00010, 0010x, 00111}, x11xx \ {1111x, x110x, 11100}} { 00xx00xxx0 \ { 00x100xx00, 00x000xx10, 00xx001010, 00xx000110, 00xx001100, 000100xxx0, 001000xxx0}, x11x00xxx0 \ { x11100xx00, x11000xx10, x11x001010, x11x000110, x11x001100, 111100xxx0, x11000xxx0, 111000xxx0}, 00x10xxx10 \ { 00x1001110, 00x10x0010, 00x10x1110, 00010xxx10}, x1110xxx10 \ { x111001110, x1110x0010, x1110x1110, 11110xxx10}} {0x0x0 \ {000x0, 01010, 01000}} {xx1xx \ {x1100, xx101, 0x1x1}, 0x01x \ {00011, 0x010}} { xx1x00x0x0 \ { xx1100x000, xx1000x010, xx1x0000x0, xx1x001010, xx1x001000, x11000x0x0}, 0x0100x010 \ { 0x01000010, 0x01001010, 0x0100x010}} {xx110 \ {01110, x0110, x0110}, 10x11 \ {10111, 10011}, 0x1xx \ {01111, 011xx, 01100}} {x100x \ {0100x, x1000, 11000}, x100x \ {0100x, 01000, x1000}} { x100x0x10x \ { x10010x100, x10000x101, x100x0110x, x100x01100, 0100x0x10x, x10000x10x, 110000x10x}} {100x1 \ {10011}, xx111 \ {00111, 01111, x1111}} {xxx0x \ {0xx0x, xx001, x000x}} { xxx0110001 \ { 0xx0110001, xx00110001, x000110001}} {000xx \ {00000, 000x0, 0000x}} {1100x \ {11001, 11000}, x011x \ {0011x, x0110, 00110}, xxx00 \ {1x000, x1100, 01x00}} { 1100x0000x \ { 1100100000, 1100000001, 1100x00000, 1100x00000, 1100x0000x, 110010000x, 110000000x}, x011x0001x \ { x011100010, x011000011, x011x00010, 0011x0001x, x01100001x, 001100001x}, xxx0000000 \ { xxx0000000, xxx0000000, xxx0000000, 1x00000000, x110000000, 01x0000000}} {0xxx1 \ {00x01, 0x1x1, 01x01}, x1x01 \ {01x01, 11101}} {xx110 \ {x1110, 11110, 1x110}, 01x00 \ {01100, 01000}} {} {} {x100x \ {1100x, x1001, 01001}, 00xx1 \ {00x01, 00001}, 111x0 \ {11100, 11110}} {} {1111x \ {11111}, x11x1 \ {11111, 011x1, 011x1}, 0x1xx \ {0x10x, 0x1x0, 001x0}} {0x111 \ {01111, 00111}, 0111x \ {01110}} { 0x11111111 \ { 0x11111111, 0111111111, 0011111111}, 0111x1111x \ { 0111111110, 0111011111, 0111x11111, 011101111x}, 0x111x1111 \ { 0x11111111, 0x11101111, 0x11101111, 01111x1111, 00111x1111}, 01111x1111 \ { 0111111111, 0111101111, 0111101111}, 0x1110x111 \ { 011110x111, 001110x111}, 0111x0x11x \ { 011110x110, 011100x111, 0111x0x110, 0111x00110, 011100x11x}} {11xxx \ {11xx1, 11111, 110x1}, 00x10 \ {00110, 00010}} {x0011 \ {00011, 10011}, 0001x \ {00010, 00011}} { x001111x11 \ { x001111x11, x001111111, x001111011, 0001111x11, 1001111x11}, 0001x11x1x \ { 0001111x10, 0001011x11, 0001x11x11, 0001x11111, 0001x11011, 0001011x1x, 0001111x1x}, 0001000x10 \ { 0001000110, 0001000010, 0001000x10}} {1xx00 \ {11x00, 11100, 1x100}, 0x10x \ {00100, 01101, 01100}} {1010x \ {10101, 10100}} { 101001xx00 \ { 1010011x00, 1010011100, 101001x100, 101001xx00}, 1010x0x10x \ { 101010x100, 101000x101, 1010x00100, 1010x01101, 1010x01100, 101010x10x, 101000x10x}} {0x0xx \ {010xx, 000xx, 01011}} {0110x \ {01100, 01101}} { 0110x0x00x \ { 011010x000, 011000x001, 0110x0100x, 0110x0000x, 011000x00x, 011010x00x}} {1x00x \ {1x001, 1100x, 10000}, 111xx \ {11110, 11101, 111x0}} {01xx0 \ {01x10, 01000, 01010}, x1x10 \ {11010, 01110, 11110}, x11x0 \ {01100, x1110, 011x0}} { 01x001x000 \ { 01x0011000, 01x0010000, 010001x000}, x11001x000 \ { x110011000, x110010000, 011001x000, 011001x000}, 01xx0111x0 \ { 01x1011100, 01x0011110, 01xx011110, 01xx0111x0, 01x10111x0, 01000111x0, 01010111x0}, x1x1011110 \ { x1x1011110, x1x1011110, 1101011110, 0111011110, 1111011110}, x11x0111x0 \ { x111011100, x110011110, x11x011110, x11x0111x0, 01100111x0, x1110111x0, 011x0111x0}} {xx1x0 \ {01110, x01x0, 101x0}, xx01x \ {1001x, 11010, x1010}} {0xxx1 \ {01001, 00x11, 00001}, x00x0 \ {000x0, x0010, x0010}} { x00x0xx1x0 \ { x0010xx100, x0000xx110, x00x001110, x00x0x01x0, x00x0101x0, 000x0xx1x0, x0010xx1x0, x0010xx1x0}, 0xx11xx011 \ { 0xx1110011, 00x11xx011}, x0010xx010 \ { x001010010, x001011010, x0010x1010, 00010xx010, x0010xx010, x0010xx010}} {} {x0x1x \ {1001x, 10011, 10111}} {} {00x11 \ {00111, 00011, 00011}, 1xx0x \ {10x0x, 10001, 1x10x}} {1xx01 \ {1x001, 10101, 11x01}, x1001 \ {11001, 01001}} { 1xx011xx01 \ { 1xx0110x01, 1xx0110001, 1xx011x101, 1x0011xx01, 101011xx01, 11x011xx01}, x10011xx01 \ { x100110x01, x100110001, x10011x101, 110011xx01, 010011xx01}} {xxxxx \ {1x001, xx011, 1x10x}, 000x1 \ {00011, 00001, 00001}, xx100 \ {10100, 1x100}} {1100x \ {11001, 11000, 11000}, 0x10x \ {01100, 01101}} { 1100xxxx0x \ { 11001xxx00, 11000xxx01, 1100x1x001, 1100x1x10x, 11001xxx0x, 11000xxx0x, 11000xxx0x}, 0x10xxxx0x \ { 0x101xxx00, 0x100xxx01, 0x10x1x001, 0x10x1x10x, 01100xxx0x, 01101xxx0x}, 1100100001 \ { 1100100001, 1100100001, 1100100001}, 0x10100001 \ { 0x10100001, 0x10100001, 0110100001}, 11000xx100 \ { 1100010100, 110001x100, 11000xx100, 11000xx100}, 0x100xx100 \ { 0x10010100, 0x1001x100, 01100xx100}} {xxx01 \ {10101, 1x001, 0x101}} {1xx10 \ {11110, 10x10}} {} {xxx0x \ {x1x00, 1x001, 01000}} {01xx0 \ {01000, 01110, 010x0}, 000xx \ {000x1, 00010, 00010}, 0x11x \ {0x111, 00111, 00111}} { 01x00xxx00 \ { 01x00x1x00, 01x0001000, 01000xxx00, 01000xxx00}, 0000xxxx0x \ { 00001xxx00, 00000xxx01, 0000xx1x00, 0000x1x001, 0000x01000, 00001xxx0x}} {} {xxxx1 \ {0x111, 101x1, 01xx1}, 10xxx \ {10101, 10xx0, 100x1}} {} {x1001 \ {01001, 11001}, 0xx10 \ {00x10, 01110, 0x010}} {xxxx1 \ {1xx01, 0xx01, 110x1}, 11xx1 \ {11x11, 111x1, 111x1}, x0x1x \ {1011x, 1001x, 0011x}} { xxx01x1001 \ { xxx0101001, xxx0111001, 1xx01x1001, 0xx01x1001, 11001x1001}, 11x01x1001 \ { 11x0101001, 11x0111001, 11101x1001, 11101x1001}, x0x100xx10 \ { x0x1000x10, x0x1001110, x0x100x010, 101100xx10, 100100xx10, 001100xx10}} {x0x11 \ {10111, x0011, 10x11}} {0xx11 \ {01011, 01111, 01111}, x0xx1 \ {00111, x0101, 00011}, 0x00x \ {0x001, 01001, 0x000}} { 0xx11x0x11 \ { 0xx1110111, 0xx11x0011, 0xx1110x11, 01011x0x11, 01111x0x11, 01111x0x11}, x0x11x0x11 \ { x0x1110111, x0x11x0011, x0x1110x11, 00111x0x11, 00011x0x11}} {11x1x \ {11011, 11x11}} {x0110 \ {10110}} { x011011x10 \ { 1011011x10}} {010xx \ {0101x, 01010, 010x1}, x1x11 \ {11x11, x1111}} {} {} {0xxx1 \ {0x101, 0x011, 010x1}, 00x1x \ {00x10, 00011}} {0x11x \ {0x110, 0x111, 01110}} { 0x1110xx11 \ { 0x1110x011, 0x11101011, 0x1110xx11}, 0x11x00x1x \ { 0x11100x10, 0x11000x11, 0x11x00x10, 0x11x00011, 0x11000x1x, 0x11100x1x, 0111000x1x}} {x0101 \ {00101, 10101, 10101}, 1x1xx \ {11111, 1110x, 111x0}} {} {} {1xxxx \ {11xxx, 1xx01, 11001}, 01x01 \ {01101, 01001, 01001}} {xx1x0 \ {0x1x0, x01x0, 001x0}, x1000 \ {11000}} { xx1x01xxx0 \ { xx1101xx00, xx1001xx10, xx1x011xx0, 0x1x01xxx0, x01x01xxx0, 001x01xxx0}, x10001xx00 \ { x100011x00, 110001xx00}} {x0111 \ {00111, 10111}, 1101x \ {11010, 11011}} {0xx00 \ {01100, 01000, 00100}} {} {} {x0x1x \ {0001x, 10x10, x0x11}} {} {} {} {} {11xx1 \ {11011, 110x1, 111x1}, xx00x \ {xx001, x000x}} {0x0xx \ {00001, 0001x, 000x1}} { 0x0x111xx1 \ { 0x01111x01, 0x00111x11, 0x0x111011, 0x0x1110x1, 0x0x1111x1, 0000111xx1, 0001111xx1, 000x111xx1}, 0x00xxx00x \ { 0x001xx000, 0x000xx001, 0x00xxx001, 0x00xx000x, 00001xx00x, 00001xx00x}} {xx010 \ {00010, 11010, x0010}} {0x11x \ {0x111, 01111}} { 0x110xx010 \ { 0x11000010, 0x11011010, 0x110x0010}} {000xx \ {000x0, 0000x, 000x1}} {0x11x \ {01111, 00110, 00111}, x11x1 \ {11101, 111x1}} { 0x11x0001x \ { 0x11100010, 0x11000011, 0x11x00010, 0x11x00011, 011110001x, 001100001x, 001110001x}, x11x1000x1 \ { x111100001, x110100011, x11x100001, x11x1000x1, 11101000x1, 111x1000x1}} {xxx10 \ {00010, 11110, 10x10}, 0x110 \ {01110, 00110}, 1x1x0 \ {111x0, 101x0}} {011xx \ {01111, 0110x}, 1xx00 \ {11x00, 10x00, 1x100}, 1x0x1 \ {10011, 110x1}} { 01110xxx10 \ { 0111000010, 0111011110, 0111010x10}, 011100x110 \ { 0111001110, 0111000110}, 011x01x1x0 \ { 011101x100, 011001x110, 011x0111x0, 011x0101x0, 011001x1x0}, 1xx001x100 \ { 1xx0011100, 1xx0010100, 11x001x100, 10x001x100, 1x1001x100}} {x11x1 \ {x1101, 11101, 011x1}, xx1x0 \ {01110, 1x1x0, xx110}} {x111x \ {01111, 01110, 11111}, 001x0 \ {00110, 00100, 00100}} { x1111x1111 \ { x111101111, 01111x1111, 11111x1111}, x1110xx110 \ { x111001110, x11101x110, x1110xx110, 01110xx110}, 001x0xx1x0 \ { 00110xx100, 00100xx110, 001x001110, 001x01x1x0, 001x0xx110, 00110xx1x0, 00100xx1x0, 00100xx1x0}} {1xxxx \ {1xx00, 1100x, 1x111}, 10x10 \ {10110, 10010, 10010}} {x001x \ {00010, 0001x}, 11xxx \ {11x00, 111xx, 1110x}} { x001x1xx1x \ { x00111xx10, x00101xx11, x001x1x111, 000101xx1x, 0001x1xx1x}, 11xxx1xxxx \ { 11xx11xxx0, 11xx01xxx1, 11x1x1xx0x, 11x0x1xx1x, 11xxx1xx00, 11xxx1100x, 11xxx1x111, 11x001xxxx, 111xx1xxxx, 1110x1xxxx}, x001010x10 \ { x001010110, x001010010, x001010010, 0001010x10, 0001010x10}, 11x1010x10 \ { 11x1010110, 11x1010010, 11x1010010, 1111010x10}} {00x1x \ {00010, 00110, 00x10}} {1x1x0 \ {1x100, 11110, 101x0}, 100x0 \ {10000}, x101x \ {x1010, 11010, 11010}} { 1x11000x10 \ { 1x11000010, 1x11000110, 1x11000x10, 1111000x10, 1011000x10}, 1001000x10 \ { 1001000010, 1001000110, 1001000x10}, x101x00x1x \ { x101100x10, x101000x11, x101x00010, x101x00110, x101x00x10, x101000x1x, 1101000x1x, 1101000x1x}} {00x1x \ {00x11, 00011, 00x10}} {1x0xx \ {11000, 100x0, 100xx}, 0x11x \ {0x111, 00110, 0111x}} { 1x01x00x1x \ { 1x01100x10, 1x01000x11, 1x01x00x11, 1x01x00011, 1x01x00x10, 1001000x1x, 1001x00x1x}, 0x11x00x1x \ { 0x11100x10, 0x11000x11, 0x11x00x11, 0x11x00011, 0x11x00x10, 0x11100x1x, 0011000x1x, 0111x00x1x}} {11xx0 \ {11000, 11100, 11x00}, 1x101 \ {10101, 11101, 11101}} {0xxx1 \ {01xx1, 0x011, 01011}, xxx11 \ {xx011, 0xx11, 01011}} { 0xx011x101 \ { 0xx0110101, 0xx0111101, 0xx0111101, 01x011x101}} {} {xx1x0 \ {x1100, 11100, 111x0}, xx110 \ {01110, 10110, 11110}} {} {} {xxxx0 \ {xx100, x0110, 11100}, 000x1 \ {00011}} {} {x0xx0 \ {00100, x0x10, 00110}, 1x10x \ {10101, 1x100, 1x100}} {00x10 \ {00110}} { 00x10x0x10 \ { 00x10x0x10, 00x1000110, 00110x0x10}} {011xx \ {0111x, 0110x, 0110x}} {xx1x1 \ {01101, 0x111, 10101}} { xx1x1011x1 \ { xx11101101, xx10101111, xx1x101111, xx1x101101, xx1x101101, 01101011x1, 0x111011x1, 10101011x1}} {xx11x \ {00111, 01111, 1111x}} {} {} {0x0x1 \ {000x1, 0x011, 01001}, 10x0x \ {10001, 1010x, 10100}, 1x001 \ {11001}} {x11x1 \ {x1111, 111x1, 011x1}} { x11x10x0x1 \ { x11110x001, x11010x011, x11x1000x1, x11x10x011, x11x101001, x11110x0x1, 111x10x0x1, 011x10x0x1}, x110110x01 \ { x110110001, x110110101, 1110110x01, 0110110x01}, x11011x001 \ { x110111001, 111011x001, 011011x001}} {x1x1x \ {1101x, 11110, 0111x}, xxxxx \ {0x101, x1x1x, 011x0}, 1xx01 \ {1x001, 10x01, 10x01}} {x1x01 \ {11101, 01001, 01001}} { x1x01xxx01 \ { x1x010x101, 11101xxx01, 01001xxx01, 01001xxx01}, x1x011xx01 \ { x1x011x001, x1x0110x01, x1x0110x01, 111011xx01, 010011xx01, 010011xx01}} {11xx0 \ {11110, 110x0}} {x0x1x \ {10x10, 00x10, 00x1x}} { x0x1011x10 \ { x0x1011110, x0x1011010, 10x1011x10, 00x1011x10, 00x1011x10}} {x1xxx \ {110xx, x1111, 01x11}} {0xx11 \ {0x011, 01x11, 01x11}, 00x1x \ {00x10, 00x11, 0001x}} { 0xx11x1x11 \ { 0xx1111011, 0xx11x1111, 0xx1101x11, 0x011x1x11, 01x11x1x11, 01x11x1x11}, 00x1xx1x1x \ { 00x11x1x10, 00x10x1x11, 00x1x1101x, 00x1xx1111, 00x1x01x11, 00x10x1x1x, 00x11x1x1x, 0001xx1x1x}} {01x01 \ {01001, 01101}, xxxx0 \ {xxx10, x00x0, x0010}} {x1xx1 \ {11101, 11x11, x1001}, xx1xx \ {x01x1, xx1x1, x111x}, xxx1x \ {0101x, 11010, x0110}} { x1x0101x01 \ { x1x0101001, x1x0101101, 1110101x01, x100101x01}, xx10101x01 \ { xx10101001, xx10101101, x010101x01, xx10101x01}, xx1x0xxxx0 \ { xx110xxx00, xx100xxx10, xx1x0xxx10, xx1x0x00x0, xx1x0x0010, x1110xxxx0}, xxx10xxx10 \ { xxx10xxx10, xxx10x0010, xxx10x0010, 01010xxx10, 11010xxx10, x0110xxx10}} {01x1x \ {01011, 0111x, 0111x}, 01x01 \ {01001, 01101}} {11x1x \ {11011, 11111}, 1x1x1 \ {11111, 111x1, 11101}} { 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01011, 11x1x0111x, 11x1x0111x, 1101101x1x, 1111101x1x}, 1x11101x11 \ { 1x11101011, 1x11101111, 1x11101111, 1111101x11, 1111101x11}, 1x10101x01 \ { 1x10101001, 1x10101101, 1110101x01, 1110101x01}} {0xxx0 \ {01110, 0x110}} {xxx0x \ {1110x, 0x000, x0x00}, 0xx0x \ {01x00, 01x0x}} { xxx000xx00 \ { 111000xx00, 0x0000xx00, x0x000xx00}, 0xx000xx00 \ { 01x000xx00, 01x000xx00}} {} {1101x \ {11010, 11011}} {} {x1x11 \ {11x11, x1011, 01x11}} {} {} {1xx00 \ {1x100, 1x000}} {x000x \ {00000, x0001}, 01xxx \ {01x0x, 01000, 01xx0}} { x00001xx00 \ { x00001x100, x00001x000, 000001xx00}, 01x001xx00 \ { 01x001x100, 01x001x000, 01x001xx00, 010001xx00, 01x001xx00}} {0x11x \ {01111, 00110, 00111}, 100xx \ {100x0, 100x1, 10001}} {} {} {010xx \ {01001, 01011, 01000}, 01xx0 \ {01110, 01100}, 111x0 \ {11100}} {} {} {xxx11 \ {10011, x0011, x0x11}, 1x00x \ {11000, 10001, 10001}, 0xxx0 \ {0x110, 01x00, 0xx00}} {} {} {xxx1x \ {xx111, 01011, 0001x}, 00x0x \ {0010x, 0000x, 00001}} {} {} {00x0x \ {00101, 00100}, x0100 \ {10100, 00100}} {0x00x \ {01001}} { 0x00x00x0x \ { 0x00100x00, 0x00000x01, 0x00x00101, 0x00x00100, 0100100x0x}, 0x000x0100 \ { 0x00010100, 0x00000100}} {00x1x \ {00110, 0001x}, 001xx \ {00110, 001x0, 0011x}} {xx001 \ {01001, x0001, 11001}} { xx00100101 \ { 0100100101, x000100101, 1100100101}} {x00xx \ {x00x1, 10000, 1001x}, 11x11 \ {11011, 11111}, x11xx \ {01101, 01111, x1101}} {} {} {xx0x1 \ {xx011, 00011, x0011}, xxxx0 \ {10110, 010x0, 010x0}, x10x0 \ {x1010, 110x0, 01010}} {0x10x \ {00101, 01100, 0010x}} { 0x101xx001 \ { 00101xx001, 00101xx001}, 0x100xxx00 \ { 0x10001000, 0x10001000, 01100xxx00, 00100xxx00}, 0x100x1000 \ { 0x10011000, 01100x1000, 00100x1000}} {} {0x1x1 \ {0x101, 01111, 01111}, x1x10 \ {x1110, 01110, 01110}, xx000 \ {11000, 00000}} {} {x10xx \ {x1000, 01011, 11010}, 1xx1x \ {1xx11, 10x1x, 10x11}} {xxx00 \ {01100, 01x00, 01x00}} { xxx00x1000 \ { xxx00x1000, 01100x1000, 01x00x1000, 01x00x1000}} {} {x11x1 \ {01111, 11101, 111x1}} {} {x1x1x \ {11x1x, x111x, 01011}, 1100x \ {11001, 11000}} {0x001 \ {01001, 00001}} { 0x00111001 \ { 0x00111001, 0100111001, 0000111001}} {1xx00 \ {11000, 10000}, x1x01 \ {x1001, 01x01, 01x01}} {x0x1x \ {x0011, 10x10, 00011}, x00x1 \ {x0001, 00011, 100x1}} { x0001x1x01 \ { x0001x1001, x000101x01, x000101x01, x0001x1x01, 10001x1x01}} {xxxx0 \ {01000, x1010, 11000}} {10x1x \ {10010, 1011x, 10x10}, xx0x0 \ {0x0x0, 0x000, xx010}, x0xxx \ {10101, 001xx, 00x00}} { 10x10xxx10 \ { 10x10x1010, 10010xxx10, 10110xxx10, 10x10xxx10}, xx0x0xxxx0 \ { xx010xxx00, xx000xxx10, xx0x001000, xx0x0x1010, xx0x011000, 0x0x0xxxx0, 0x000xxxx0, xx010xxxx0}, x0xx0xxxx0 \ { x0x10xxx00, x0x00xxx10, x0xx001000, x0xx0x1010, x0xx011000, 001x0xxxx0, 00x00xxxx0}} {x1100 \ {11100}} {x101x \ {x1010, 01011, x1011}, 00xx1 \ {00001, 00101}} {} {0x1x1 \ {001x1, 01111, 0x101}} {x0x0x \ {10001, 00100, x0100}, xx001 \ {x1001, 00001, 00001}} { x0x010x101 \ { x0x0100101, x0x010x101, 100010x101}, xx0010x101 \ { xx00100101, xx0010x101, x10010x101, 000010x101, 000010x101}} {1100x \ {11001, 11000}, x1x0x \ {x1001, 11101, 11001}} {x001x \ {10010, x0010}, xx001 \ {x0001, 01001, 11001}, 1110x \ {11101, 11100, 11100}} { xx00111001 \ { xx00111001, x000111001, 0100111001, 1100111001}, 1110x1100x \ { 1110111000, 1110011001, 1110x11001, 1110x11000, 111011100x, 111001100x, 111001100x}, xx001x1x01 \ { xx001x1001, xx00111101, xx00111001, x0001x1x01, 01001x1x01, 11001x1x01}, 1110xx1x0x \ { 11101x1x00, 11100x1x01, 1110xx1001, 1110x11101, 1110x11001, 11101x1x0x, 11100x1x0x, 11100x1x0x}} {xxx00 \ {x1100, 00000, 10x00}, 01xxx \ {01101, 010x0, 01x0x}} {01xxx \ {011x0, 01x0x}} { 01x00xxx00 \ { 01x00x1100, 01x0000000, 01x0010x00, 01100xxx00, 01x00xxx00}, 01xxx01xxx \ { 01xx101xx0, 01xx001xx1, 01x1x01x0x, 01x0x01x1x, 01xxx01101, 01xxx010x0, 01xxx01x0x, 011x001xxx, 01x0x01xxx}} {} {xx110 \ {11110, 01110, 00110}, 1xx00 \ {11x00, 10x00, 1x000}} {} {10xxx \ {1011x, 10x01, 101x1}, xx111 \ {01111, 0x111, x1111}} {x0xx1 \ {x01x1, 10111, 00111}, xx1x1 \ {10111, 10101, x11x1}} { x0xx110xx1 \ { x0x1110x01, x0x0110x11, x0xx110111, x0xx110x01, x0xx1101x1, x01x110xx1, 1011110xx1, 0011110xx1}, xx1x110xx1 \ { xx11110x01, xx10110x11, xx1x110111, xx1x110x01, xx1x1101x1, 1011110xx1, 1010110xx1, x11x110xx1}, x0x11xx111 \ { x0x1101111, x0x110x111, x0x11x1111, x0111xx111, 10111xx111, 00111xx111}, xx111xx111 \ { xx11101111, xx1110x111, xx111x1111, 10111xx111, x1111xx111}} {xx1xx \ {1011x, 00100, 00100}, x1x01 \ {01101}} {01x10 \ {01110}, xx011 \ {x0011, 01011}} { 01x10xx110 \ { 01x1010110, 01110xx110}, xx011xx111 \ { xx01110111, x0011xx111, 01011xx111}} {00xx0 \ {000x0, 00010, 00010}, 01xx1 \ {011x1, 01101, 01x11}} {1x01x \ {1101x, 1x010}, 0x1x0 \ {00100, 001x0, 01100}} { 1x01000x10 \ { 1x01000010, 1x01000010, 1x01000010, 1101000x10, 1x01000x10}, 0x1x000xx0 \ { 0x11000x00, 0x10000x10, 0x1x0000x0, 0x1x000010, 0x1x000010, 0010000xx0, 001x000xx0, 0110000xx0}, 1x01101x11 \ { 1x01101111, 1x01101x11, 1101101x11}} {1x01x \ {11010, 1x010, 11011}} {11xx1 \ {11111, 11101, 110x1}, 10x1x \ {1001x, 10010, 10x10}, x1x01 \ {01x01, x1101, x1001}} { 11x111x011 \ { 11x1111011, 111111x011, 110111x011}, 10x1x1x01x \ { 10x111x010, 10x101x011, 10x1x11010, 10x1x1x010, 10x1x11011, 1001x1x01x, 100101x01x, 10x101x01x}} {x0x11 \ {10011, 00x11, 10111}, xx1xx \ {x0101, x111x, 11100}, x0x0x \ {00001, x000x, 00x0x}} {1x111 \ {10111}, x1xxx \ {x1101, x1000, 01001}} { 1x111x0x11 \ { 1x11110011, 1x11100x11, 1x11110111, 10111x0x11}, x1x11x0x11 \ { x1x1110011, x1x1100x11, x1x1110111}, 1x111xx111 \ { 1x111x1111, 10111xx111}, x1xxxxx1xx \ { x1xx1xx1x0, x1xx0xx1x1, x1x1xxx10x, x1x0xxx11x, x1xxxx0101, x1xxxx111x, x1xxx11100, x1101xx1xx, x1000xx1xx, 01001xx1xx}, x1x0xx0x0x \ { x1x01x0x00, x1x00x0x01, x1x0x00001, x1x0xx000x, x1x0x00x0x, x1101x0x0x, x1000x0x0x, 01001x0x0x}} {x0xxx \ {x00xx, x0x11, 10010}} {xxx0x \ {0x10x, 11x01, 0x000}, xxx10 \ {x1x10, 1x010, xx110}} { xxx0xx0x0x \ { xxx01x0x00, xxx00x0x01, xxx0xx000x, 0x10xx0x0x, 11x01x0x0x, 0x000x0x0x}, xxx10x0x10 \ { xxx10x0010, xxx1010010, x1x10x0x10, 1x010x0x10, xx110x0x10}} {x1x10 \ {x1110, x1010}, xx100 \ {10100, 11100}} {} {} {x0111 \ {00111, 10111}, x1x00 \ {11x00, 11000, x1000}, xxxx1 \ {11101, 100x1, 1x001}} {x00x1 \ {00011, 000x1, 10001}, 1x01x \ {10011, 1x011, 11010}} { x0011x0111 \ { x001100111, x001110111, 00011x0111, 00011x0111}, 1x011x0111 \ { 1x01100111, 1x01110111, 10011x0111, 1x011x0111}, x00x1xxxx1 \ { x0011xxx01, x0001xxx11, x00x111101, x00x1100x1, x00x11x001, 00011xxxx1, 000x1xxxx1, 10001xxxx1}, 1x011xxx11 \ { 1x01110011, 10011xxx11, 1x011xxx11}} {x01xx \ {10100, 00110, 1011x}, x1111 \ {11111, 01111, 01111}} {000x0 \ {00010, 00000, 00000}, x111x \ {11110, 01111, x1110}, 1xx10 \ {11x10, 10110, 10010}} { 000x0x01x0 \ { 00010x0100, 00000x0110, 000x010100, 000x000110, 000x010110, 00010x01x0, 00000x01x0, 00000x01x0}, x111xx011x \ { x1111x0110, x1110x0111, x111x00110, x111x1011x, 11110x011x, 01111x011x, x1110x011x}, 1xx10x0110 \ { 1xx1000110, 1xx1010110, 11x10x0110, 10110x0110, 10010x0110}, x1111x1111 \ { x111111111, x111101111, x111101111, 01111x1111}} {0x0xx \ {0x01x, 000xx, 000x1}, 10x11 \ {10011, 10111}} {010xx \ {01001, 010x0, 010x1}} { 010xx0x0xx \ { 010x10x0x0, 010x00x0x1, 0101x0x00x, 0100x0x01x, 010xx0x01x, 010xx000xx, 010xx000x1, 010010x0xx, 010x00x0xx, 010x10x0xx}, 0101110x11 \ { 0101110011, 0101110111, 0101110x11}} {xx0xx \ {1x0xx, 10011, x10x0}, 10x1x \ {10011, 1001x, 10110}, 101x1 \ {10101}} {} {} {001xx \ {00100, 001x1, 00101}, 1xxx1 \ {10xx1, 1x001, 11111}} {0xx10 \ {01110, 01x10, 0x110}} { 0xx1000110 \ { 0111000110, 01x1000110, 0x11000110}} {} {1110x \ {11100}} {} {1001x \ {10010}, 0100x \ {01001, 01000, 01000}} {} {} {1x1x0 \ {10100, 10110, 11110}, 0010x \ {00100, 00101}} {x110x \ {01100, x1101, 01101}, x1x01 \ {x1101, 01001, 01x01}} { x11001x100 \ { x110010100, 011001x100}, x110x0010x \ { x110100100, x110000101, x110x00100, x110x00101, 011000010x, x11010010x, 011010010x}, x1x0100101 \ { x1x0100101, x110100101, 0100100101, 01x0100101}} {11x1x \ {11x10, 11x11, 11111}} {1xxx0 \ {1x0x0, 1x100, 100x0}} { 1xx1011x10 \ { 1xx1011x10, 1x01011x10, 1001011x10}} {01xx0 \ {01000, 01x10, 01x00}} {x011x \ {10111, x0111, x0110}} { x011001x10 \ { x011001x10, x011001x10}} {0x0x1 \ {01001, 010x1, 0x001}} {} {} {11x1x \ {11011, 1101x, 1101x}, 0001x \ {00011, 00010}, x0xx0 \ {x00x0, 10100, 00100}} {10x1x \ {10111, 10110}, 10xx1 \ {10x01, 100x1, 101x1}} { 10x1x11x1x \ { 10x1111x10, 10x1011x11, 10x1x11011, 10x1x1101x, 10x1x1101x, 1011111x1x, 1011011x1x}, 10x1111x11 \ { 10x1111011, 10x1111011, 10x1111011, 1001111x11, 1011111x11}, 10x1x0001x \ { 10x1100010, 10x1000011, 10x1x00011, 10x1x00010, 101110001x, 101100001x}, 10x1100011 \ { 10x1100011, 1001100011, 1011100011}, 10x10x0x10 \ { 10x10x0010, 10110x0x10}} {1x01x \ {10011, 11011, 11011}, x1101 \ {01101, 11101}} {x0xx0 \ {x0110, x0x00, 00100}} { x0x101x010 \ { x01101x010}} {xxxx1 \ {x1xx1, xx1x1, x1101}, 010x0 \ {01000}, x00x0 \ {10000, 000x0, 100x0}} {xx011 \ {x1011, x0011}} { xx011xxx11 \ { xx011x1x11, xx011xx111, x1011xxx11, x0011xxx11}} {xxx11 \ {xx011, 1x111, 00011}, 11x0x \ {11100, 11x01, 1100x}, xx0x0 \ {010x0, xx010, x10x0}} {x1x01 \ {x1101, 01x01, 01001}, xx010 \ {00010, x1010, 1x010}} { x1x0111x01 \ { x1x0111x01, x1x0111001, x110111x01, 01x0111x01, 0100111x01}, xx010xx010 \ { xx01001010, xx010xx010, xx010x1010, 00010xx010, x1010xx010, 1x010xx010}} {x0x00 \ {00000, 10x00}, 1110x \ {11100, 11101, 11101}, x01xx \ {001x0, 1011x, 00111}} {1x10x \ {11100, 11101, 10100}, 11xx0 \ {11000, 11x00}, x11x0 \ {111x0, 01100, x1100}} { 1x100x0x00 \ { 1x10000000, 1x10010x00, 11100x0x00, 10100x0x00}, 11x00x0x00 \ { 11x0000000, 11x0010x00, 11000x0x00, 11x00x0x00}, x1100x0x00 \ { x110000000, x110010x00, 11100x0x00, 01100x0x00, x1100x0x00}, 1x10x1110x \ { 1x10111100, 1x10011101, 1x10x11100, 1x10x11101, 1x10x11101, 111001110x, 111011110x, 101001110x}, 11x0011100 \ { 11x0011100, 1100011100, 11x0011100}, x110011100 \ { x110011100, 1110011100, 0110011100, x110011100}, 1x10xx010x \ { 1x101x0100, 1x100x0101, 1x10x00100, 11100x010x, 11101x010x, 10100x010x}, 11xx0x01x0 \ { 11x10x0100, 11x00x0110, 11xx0001x0, 11xx010110, 11000x01x0, 11x00x01x0}, x11x0x01x0 \ { x1110x0100, x1100x0110, x11x0001x0, x11x010110, 111x0x01x0, 01100x01x0, x1100x01x0}} {} {1xxxx \ {110x0, 11xx1, 111x1}, x11xx \ {11101, 1111x, 11100}} {} {} {1011x \ {10111}, x0xx1 \ {x0011, x0101, 00xx1}} {} {1001x \ {10011, 10010, 10010}} {0x0x1 \ {010x1, 01001, 000x1}} { 0x01110011 \ { 0x01110011, 0101110011, 0001110011}} {01xxx \ {0110x, 01101, 010x1}, x10xx \ {11010, 010x1, 01001}} {xx0xx \ {x00x1, 010x0, 11001}} { xx0xx01xxx \ { xx0x101xx0, xx0x001xx1, xx01x01x0x, xx00x01x1x, xx0xx0110x, xx0xx01101, xx0xx010x1, x00x101xxx, 010x001xxx, 1100101xxx}, xx0xxx10xx \ { xx0x1x10x0, xx0x0x10x1, xx01xx100x, xx00xx101x, xx0xx11010, xx0xx010x1, xx0xx01001, x00x1x10xx, 010x0x10xx, 11001x10xx}} {x0x0x \ {00x01, x010x, x0101}, xx0xx \ {xx0x1, 010xx, 11001}} {0x1x1 \ {011x1, 01101, 001x1}, 1x01x \ {1x010, 10010, 10010}} { 0x101x0x01 \ { 0x10100x01, 0x101x0101, 0x101x0101, 01101x0x01, 01101x0x01, 00101x0x01}, 0x1x1xx0x1 \ { 0x111xx001, 0x101xx011, 0x1x1xx0x1, 0x1x1010x1, 0x1x111001, 011x1xx0x1, 01101xx0x1, 001x1xx0x1}, 1x01xxx01x \ { 1x011xx010, 1x010xx011, 1x01xxx011, 1x01x0101x, 1x010xx01x, 10010xx01x, 10010xx01x}} {111x1 \ {11111, 11101}} {000xx \ {00000, 00010, 00010}} { 000x1111x1 \ { 0001111101, 0000111111, 000x111111, 000x111101}} {xx011 \ {0x011, x1011}, x0x0x \ {00x01, 10101, 1000x}} {xxx11 \ {x1011, 1x111, x1111}, xxx0x \ {0x001, 11x00, x0x0x}} { xxx11xx011 \ { xxx110x011, xxx11x1011, x1011xx011, 1x111xx011, x1111xx011}, xxx0xx0x0x \ { xxx01x0x00, xxx00x0x01, xxx0x00x01, xxx0x10101, xxx0x1000x, 0x001x0x0x, 11x00x0x0x, x0x0xx0x0x}} {} {0x01x \ {00010, 0101x, 0001x}} {} {x1xxx \ {01100, 11x11, x111x}, 0xx01 \ {01x01, 0x101}, 1xx1x \ {10011, 10x11, 1x011}} {x00xx \ {0000x, 10011, 000x0}, 11x1x \ {11011, 1111x, 11x10}} { x00xxx1xxx \ { x00x1x1xx0, x00x0x1xx1, x001xx1x0x, x000xx1x1x, x00xx01100, x00xx11x11, x00xxx111x, 0000xx1xxx, 10011x1xxx, 000x0x1xxx}, 11x1xx1x1x \ { 11x11x1x10, 11x10x1x11, 11x1x11x11, 11x1xx111x, 11011x1x1x, 1111xx1x1x, 11x10x1x1x}, x00010xx01 \ { x000101x01, x00010x101, 000010xx01}, x001x1xx1x \ { x00111xx10, x00101xx11, x001x10011, x001x10x11, x001x1x011, 100111xx1x, 000101xx1x}, 11x1x1xx1x \ { 11x111xx10, 11x101xx11, 11x1x10011, 11x1x10x11, 11x1x1x011, 110111xx1x, 1111x1xx1x, 11x101xx1x}} {xx11x \ {0x110, 00111, 01110}, 11x11 \ {11011, 11111, 11111}} {1x0x1 \ {11011, 10011, 1x011}, xx01x \ {0x01x, 10010, xx010}} { 1x011xx111 \ { 1x01100111, 11011xx111, 10011xx111, 1x011xx111}, xx01xxx11x \ { xx011xx110, xx010xx111, xx01x0x110, xx01x00111, xx01x01110, 0x01xxx11x, 10010xx11x, xx010xx11x}, 1x01111x11 \ { 1x01111011, 1x01111111, 1x01111111, 1101111x11, 1001111x11, 1x01111x11}, xx01111x11 \ { xx01111011, xx01111111, xx01111111, 0x01111x11}} {xx10x \ {x0101, 00101, xx101}, x01x1 \ {10101, 10111, 00111}} {xxx11 \ {1x011, 0x111, x1011}} { xxx11x0111 \ { xxx1110111, xxx1100111, 1x011x0111, 0x111x0111, x1011x0111}} {1001x \ {10011, 10010, 10010}, xx010 \ {1x010, 0x010}} {00x00 \ {00100}} {} {xxxx1 \ {00001, xx111, x1111}, 0x01x \ {0x011, 01011, 00010}} {1xx1x \ {11x11, 1x011, 10111}} { 1xx11xxx11 \ { 1xx11xx111, 1xx11x1111, 11x11xxx11, 1x011xxx11, 10111xxx11}, 1xx1x0x01x \ { 1xx110x010, 1xx100x011, 1xx1x0x011, 1xx1x01011, 1xx1x00010, 11x110x01x, 1x0110x01x, 101110x01x}} {} {1x0x1 \ {110x1, 100x1, 10001}} {} {0x001 \ {00001, 01001}} {xx0xx \ {11010, x10x1, x10xx}, 0xxxx \ {01x1x, 0x101, 010x0}} { xx0010x001 \ { xx00100001, xx00101001, x10010x001, x10010x001}, 0xx010x001 \ { 0xx0100001, 0xx0101001, 0x1010x001}} {x1xxx \ {11011, x1001, x111x}, xx001 \ {x0001, x1001, 11001}} {0111x \ {01111, 01110, 01110}, xx11x \ {x111x, 1111x, 11110}} { 0111xx1x1x \ { 01111x1x10, 01110x1x11, 0111x11011, 0111xx111x, 01111x1x1x, 01110x1x1x, 01110x1x1x}, xx11xx1x1x \ { xx111x1x10, xx110x1x11, xx11x11011, xx11xx111x, x111xx1x1x, 1111xx1x1x, 11110x1x1x}} {11x0x \ {11100, 1100x, 1110x}, x1000 \ {01000}, x1x01 \ {11001, x1101}} {xx111 \ {11111, 01111}} {} {x11xx \ {111x0, 1111x}} {x0x00 \ {x0000, 00x00, 00000}, 101x1 \ {10111}, 0x11x \ {01110, 00111}} { x0x00x1100 \ { x0x0011100, x0000x1100, 00x00x1100, 00000x1100}, 101x1x11x1 \ { 10111x1101, 10101x1111, 101x111111, 10111x11x1}, 0x11xx111x \ { 0x111x1110, 0x110x1111, 0x11x11110, 0x11x1111x, 01110x111x, 00111x111x}} {xx1x0 \ {10100, 00100, 10110}, x10x0 \ {01010, 010x0, 01000}} {xx00x \ {10000, 00001, xx001}} { xx000xx100 \ { xx00010100, xx00000100, 10000xx100}, xx000x1000 \ { xx00001000, xx00001000, 10000x1000}} {000x0 \ {00000}} {01x0x \ {01x00, 01000, 01100}, x1xx0 \ {11x00, 01x00, 11000}} { 01x0000000 \ { 01x0000000, 01x0000000, 0100000000, 0110000000}, x1xx0000x0 \ { x1x1000000, x1x0000010, x1xx000000, 11x00000x0, 01x00000x0, 11000000x0}} {xx0xx \ {10011, 11001, x001x}, 1xx10 \ {11010, 10110, 1x110}} {011x0 \ {01110}, x1xxx \ {010x1, 11010, x11x1}} { 011x0xx0x0 \ { 01110xx000, 01100xx010, 011x0x0010, 01110xx0x0}, x1xxxxx0xx \ { x1xx1xx0x0, x1xx0xx0x1, x1x1xxx00x, x1x0xxx01x, x1xxx10011, x1xxx11001, x1xxxx001x, 010x1xx0xx, 11010xx0xx, x11x1xx0xx}, 011101xx10 \ { 0111011010, 0111010110, 011101x110, 011101xx10}, x1x101xx10 \ { x1x1011010, x1x1010110, x1x101x110, 110101xx10}} {0xxxx \ {0110x, 01111, 00xx1}, 000x0 \ {00000, 00010, 00010}} {} {} {} {} {} {x0001 \ {00001}} {x11x1 \ {x1101, 01101, 01111}} { x1101x0001 \ { x110100001, x1101x0001, 01101x0001}} {x001x \ {1001x, x0010, 00011}, 001xx \ {00101, 00100}} {0x000 \ {01000, 00000}} { 0x00000100 \ { 0x00000100, 0100000100, 0000000100}} {1x010 \ {11010, 10010}, 1x0xx \ {1x000, 1x0x0, 10000}, 000xx \ {00011, 00010}} {11xxx \ {11111, 11x11, 11010}, 0x1x1 \ {0x111, 001x1, 00111}} { 11x101x010 \ { 11x1011010, 11x1010010, 110101x010}, 11xxx1x0xx \ { 11xx11x0x0, 11xx01x0x1, 11x1x1x00x, 11x0x1x01x, 11xxx1x000, 11xxx1x0x0, 11xxx10000, 111111x0xx, 11x111x0xx, 110101x0xx}, 0x1x11x0x1 \ { 0x1111x001, 0x1011x011, 0x1111x0x1, 001x11x0x1, 001111x0x1}, 11xxx000xx \ { 11xx1000x0, 11xx0000x1, 11x1x0000x, 11x0x0001x, 11xxx00011, 11xxx00010, 11111000xx, 11x11000xx, 11010000xx}, 0x1x1000x1 \ { 0x11100001, 0x10100011, 0x1x100011, 0x111000x1, 001x1000x1, 00111000x1}} {x11xx \ {111xx, 01111, x110x}, xx1x1 \ {x11x1, x1111, 0x111}} {x10xx \ {1101x, x10x0, 010xx}, 1010x \ {10100}} { x10xxx11xx \ { x10x1x11x0, x10x0x11x1, x101xx110x, x100xx111x, x10xx111xx, x10xx01111, x10xxx110x, 1101xx11xx, x10x0x11xx, 010xxx11xx}, 1010xx110x \ { 10101x1100, 10100x1101, 1010x1110x, 1010xx110x, 10100x110x}, x10x1xx1x1 \ { x1011xx101, x1001xx111, x10x1x11x1, x10x1x1111, x10x10x111, 11011xx1x1, 010x1xx1x1}, 10101xx101 \ { 10101x1101}} {x0101 \ {10101}} {} {} {0x1xx \ {01100, 00100, 0x1x0}, 00x11 \ {00111, 00011, 00011}} {xx010 \ {x0010}, 1xx00 \ {10x00, 1x000, 1x000}} { xx0100x110 \ { xx0100x110, x00100x110}, 1xx000x100 \ { 1xx0001100, 1xx0000100, 1xx000x100, 10x000x100, 1x0000x100, 1x0000x100}} {11xxx \ {11000, 11x10, 1111x}} {x0xx0 \ {10110, 10xx0, x0110}} { x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011000, x0xx011x10, x0xx011110, 1011011xx0, 10xx011xx0, x011011xx0}} {001x0 \ {00100, 00110, 00110}, x01x0 \ {10110, 10100, x0100}} {} {} {} {xxx01 \ {x0x01, 0x101, 11101}} {} {0xx0x \ {00001, 0000x, 0110x}, 1xx1x \ {11010, 10x10, 10011}} {xx0x1 \ {11011, x0011, x1011}, xx1xx \ {101xx, 1111x, x1110}} { xx0010xx01 \ { xx00100001, xx00100001, xx00101101}, xx10x0xx0x \ { xx1010xx00, xx1000xx01, xx10x00001, xx10x0000x, xx10x0110x, 1010x0xx0x}, xx0111xx11 \ { xx01110011, 110111xx11, x00111xx11, x10111xx11}, xx11x1xx1x \ { xx1111xx10, xx1101xx11, xx11x11010, xx11x10x10, xx11x10011, 1011x1xx1x, 1111x1xx1x, x11101xx1x}} {xxx01 \ {1xx01, 1x101, x1001}, x0xxx \ {1010x, x00x0, 00x11}} {00x11 \ {00011, 00111}} { 00x11x0x11 \ { 00x1100x11, 00011x0x11, 00111x0x11}} {x111x \ {1111x, 0111x}, 10xx0 \ {10010, 10000}} {11x0x \ {11001, 11x00, 11x01}} { 11x0010x00 \ { 11x0010000, 11x0010x00}} {xx0x0 \ {1x010, xx010, 0x0x0}, xx0xx \ {0001x, 0000x, 110x1}, 1x1x1 \ {10101, 111x1, 1x111}} {001xx \ {0011x, 001x0, 0010x}, 00x1x \ {0011x, 0001x, 00010}} { 001x0xx0x0 \ { 00110xx000, 00100xx010, 001x01x010, 001x0xx010, 001x00x0x0, 00110xx0x0, 001x0xx0x0, 00100xx0x0}, 00x10xx010 \ { 00x101x010, 00x10xx010, 00x100x010, 00110xx010, 00010xx010, 00010xx010}, 001xxxx0xx \ { 001x1xx0x0, 001x0xx0x1, 0011xxx00x, 0010xxx01x, 001xx0001x, 001xx0000x, 001xx110x1, 0011xxx0xx, 001x0xx0xx, 0010xxx0xx}, 00x1xxx01x \ { 00x11xx010, 00x10xx011, 00x1x0001x, 00x1x11011, 0011xxx01x, 0001xxx01x, 00010xx01x}, 001x11x1x1 \ { 001111x101, 001011x111, 001x110101, 001x1111x1, 001x11x111, 001111x1x1, 001011x1x1}, 00x111x111 \ { 00x1111111, 00x111x111, 001111x111, 000111x111}} {x01xx \ {00111, x01x1, 001x0}, 1x0xx \ {10000, 110xx, 1x001}} {1xx1x \ {10111, 1xx10, 11111}} { 1xx1xx011x \ { 1xx11x0110, 1xx10x0111, 1xx1x00111, 1xx1xx0111, 1xx1x00110, 10111x011x, 1xx10x011x, 11111x011x}, 1xx1x1x01x \ { 1xx111x010, 1xx101x011, 1xx1x1101x, 101111x01x, 1xx101x01x, 111111x01x}} {1x0xx \ {1x011, 10001, 1000x}} {} {} {10x1x \ {10011, 1011x, 10x11}} {} {} {xx0xx \ {0x00x, 11000, x0011}, 00x1x \ {00x11, 00110, 00111}} {010xx \ {010x1, 0100x, 01010}} { 010xxxx0xx \ { 010x1xx0x0, 010x0xx0x1, 0101xxx00x, 0100xxx01x, 010xx0x00x, 010xx11000, 010xxx0011, 010x1xx0xx, 0100xxx0xx, 01010xx0xx}, 0101x00x1x \ { 0101100x10, 0101000x11, 0101x00x11, 0101x00110, 0101x00111, 0101100x1x, 0101000x1x}} {10xx1 \ {10001, 10x11, 10x01}, 0xx00 \ {01100, 01x00, 01000}} {0xx01 \ {0x001, 0x101, 00x01}, 1xxx1 \ {10011, 111x1, 11x01}} { 0xx0110x01 \ { 0xx0110001, 0xx0110x01, 0x00110x01, 0x10110x01, 00x0110x01}, 1xxx110xx1 \ { 1xx1110x01, 1xx0110x11, 1xxx110001, 1xxx110x11, 1xxx110x01, 1001110xx1, 111x110xx1, 11x0110xx1}} {00xx1 \ {00x11, 001x1, 00101}} {xxxx1 \ {x1xx1, 10xx1, 11101}, 1xxxx \ {10x0x, 11xx0, 1101x}} { xxxx100xx1 \ { xxx1100x01, xxx0100x11, xxxx100x11, xxxx1001x1, xxxx100101, x1xx100xx1, 10xx100xx1, 1110100xx1}, 1xxx100xx1 \ { 1xx1100x01, 1xx0100x11, 1xxx100x11, 1xxx1001x1, 1xxx100101, 10x0100xx1, 1101100xx1}} {00x00 \ {00000, 00100, 00100}} {1x100 \ {11100, 10100}, 0x0x1 \ {00011, 010x1, 00001}, 0xxx1 \ {00001, 00011, 01x01}} { 1x10000x00 \ { 1x10000000, 1x10000100, 1x10000100, 1110000x00, 1010000x00}} {xx010 \ {10010}} {x000x \ {10001, 00001, 0000x}} {} {11x0x \ {11100, 11x01, 11001}, xx000 \ {x0000, x1000, 10000}} {xxx0x \ {0xx00, x010x, 0x001}, 001x1 \ {00111, 00101, 00101}} { xxx0x11x0x \ { xxx0111x00, xxx0011x01, xxx0x11100, xxx0x11x01, xxx0x11001, 0xx0011x0x, x010x11x0x, 0x00111x0x}, 0010111x01 \ { 0010111x01, 0010111001, 0010111x01, 0010111x01}, xxx00xx000 \ { xxx00x0000, xxx00x1000, xxx0010000, 0xx00xx000, x0100xx000}} {xxxx1 \ {0x0x1, xx011, 1x011}, 010xx \ {01000, 01010, 010x0}} {0x1x1 \ {01111, 0x111, 00111}} { 0x1x1xxxx1 \ { 0x111xxx01, 0x101xxx11, 0x1x10x0x1, 0x1x1xx011, 0x1x11x011, 01111xxxx1, 0x111xxxx1, 00111xxxx1}, 0x1x1010x1 \ { 0x11101001, 0x10101011, 01111010x1, 0x111010x1, 00111010x1}} {1x010 \ {11010, 10010, 10010}, xx0xx \ {x0011, 10011, 110x1}} {0011x \ {00110, 00111}} { 001101x010 \ { 0011011010, 0011010010, 0011010010, 001101x010}, 0011xxx01x \ { 00111xx010, 00110xx011, 0011xx0011, 0011x10011, 0011x11011, 00110xx01x, 00111xx01x}} {xx0xx \ {0x011, 0000x, 11000}, 001xx \ {0011x, 00101, 00100}, 11xx1 \ {11011, 11x01}} {01x01 \ {01101}, 1xxx0 \ {10x10, 1x1x0, 1x010}} { 01x01xx001 \ { 01x0100001, 01101xx001}, 1xxx0xx0x0 \ { 1xx10xx000, 1xx00xx010, 1xxx000000, 1xxx011000, 10x10xx0x0, 1x1x0xx0x0, 1x010xx0x0}, 01x0100101 \ { 01x0100101, 0110100101}, 1xxx0001x0 \ { 1xx1000100, 1xx0000110, 1xxx000110, 1xxx000100, 10x10001x0, 1x1x0001x0, 1x010001x0}, 01x0111x01 \ { 01x0111x01, 0110111x01}} {1x1xx \ {1x1x1, 1x111, 1011x}} {0xx1x \ {0011x, 0x01x, 00x11}} { 0xx1x1x11x \ { 0xx111x110, 0xx101x111, 0xx1x1x111, 0xx1x1x111, 0xx1x1011x, 0011x1x11x, 0x01x1x11x, 00x111x11x}} {x1xx0 \ {11xx0, x1010, 11110}} {} {} {} {x111x \ {01111, x1110, 11110}} {} {x0xx1 \ {00xx1, 00x01, 00x11}, x01x0 \ {101x0, 001x0}} {x1010 \ {11010}, x0x00 \ {10000, 10x00, 10100}} { x1010x0110 \ { x101010110, x101000110, 11010x0110}, x0x00x0100 \ { x0x0010100, x0x0000100, 10000x0100, 10x00x0100, 10100x0100}} {0x00x \ {0100x, 0x001, 00001}, xx0xx \ {01000, 0001x, xx00x}} {} {} {01x1x \ {01110, 0111x, 0101x}} {x011x \ {x0111, 10110, 0011x}} { x011x01x1x \ { x011101x10, x011001x11, x011x01110, x011x0111x, x011x0101x, x011101x1x, 1011001x1x, 0011x01x1x}} {11xxx \ {11101, 11011, 11x11}} {0x0xx \ {000x1, 0x00x}, xx1xx \ {11100, 00100, 1010x}, 0x00x \ {0000x, 00000, 00000}} { 0x0xx11xxx \ { 0x0x111xx0, 0x0x011xx1, 0x01x11x0x, 0x00x11x1x, 0x0xx11101, 0x0xx11011, 0x0xx11x11, 000x111xxx, 0x00x11xxx}, xx1xx11xxx \ { xx1x111xx0, xx1x011xx1, xx11x11x0x, xx10x11x1x, xx1xx11101, xx1xx11011, xx1xx11x11, 1110011xxx, 0010011xxx, 1010x11xxx}, 0x00x11x0x \ { 0x00111x00, 0x00011x01, 0x00x11101, 0000x11x0x, 0000011x0x, 0000011x0x}} {1xx01 \ {10001, 10x01, 1x001}} {00xxx \ {001x0, 00111, 00x00}} { 00x011xx01 \ { 00x0110001, 00x0110x01, 00x011x001}} {x0101 \ {10101, 00101}} {1x010 \ {11010, 10010, 10010}, xx1xx \ {xx110, 1110x, x01xx}, 1xx11 \ {1x111, 1x011, 1x011}} { xx101x0101 \ { xx10110101, xx10100101, 11101x0101, x0101x0101}} {x0110 \ {10110}} {1xx1x \ {11x11, 1011x, 1111x}, 1xx1x \ {1xx11, 11x10, 1111x}} { 1xx10x0110 \ { 1xx1010110, 10110x0110, 11110x0110}, 1xx10x0110 \ { 1xx1010110, 11x10x0110, 11110x0110}} {} {} {} {01x0x \ {01100, 01001, 01000}, 00x0x \ {00001, 00101}} {xx101 \ {1x101, 00101}} { xx10101x01 \ { xx10101001, 1x10101x01, 0010101x01}, xx10100x01 \ { xx10100001, xx10100101, 1x10100x01, 0010100x01}} {111x1 \ {11101, 11111}} {01x1x \ {0111x, 0101x, 01010}, x1x01 \ {01101}} { 01x1111111 \ { 01x1111111, 0111111111, 0101111111}, x1x0111101 \ { x1x0111101, 0110111101}} {xx110 \ {00110, x1110, 01110}, x10xx \ {01000, 01001, 110x0}} {1x01x \ {10011, 1001x, 1x011}, xx1x0 \ {1x100, 11100, 001x0}} { 1x010xx110 \ { 1x01000110, 1x010x1110, 1x01001110, 10010xx110}, xx110xx110 \ { xx11000110, xx110x1110, xx11001110, 00110xx110}, 1x01xx101x \ { 1x011x1010, 1x010x1011, 1x01x11010, 10011x101x, 1001xx101x, 1x011x101x}, xx1x0x10x0 \ { xx110x1000, xx100x1010, xx1x001000, xx1x0110x0, 1x100x10x0, 11100x10x0, 001x0x10x0}} {x1x11 \ {x1011, 11011, 01x11}, 1x01x \ {11010, 11011, 10011}} {xx1x0 \ {11100, 01100, 0x100}} { xx1101x010 \ { xx11011010}} {0000x \ {00000, 00001}} {1x110 \ {10110}, 000x1 \ {00001, 00011}, x1xx1 \ {11111, 01001, 01x01}} { 0000100001 \ { 0000100001, 0000100001}, x1x0100001 \ { x1x0100001, 0100100001, 01x0100001}} {1xx10 \ {10110, 11010, 10x10}, x1x01 \ {11001, x1101, 01101}} {x11x1 \ {111x1, 11111, x1101}, 1x11x \ {1x111, 10110}} { 1x1101xx10 \ { 1x11010110, 1x11011010, 1x11010x10, 101101xx10}, x1101x1x01 \ { x110111001, x1101x1101, x110101101, 11101x1x01, x1101x1x01}} {0x000 \ {00000, 01000, 01000}} {1x010 \ {11010, 10010}, xx111 \ {x1111, 0x111}} {} {0x1x1 \ {0x111, 01111, 00101}} {xx10x \ {01100, 11100, x0100}} { xx1010x101 \ { xx10100101}} {0xxx0 \ {01x10, 0xx00, 000x0}} {x1xx1 \ {01011, 11x01, 011x1}, 0x101 \ {00101, 01101}, 0xxxx \ {0xx1x, 0x0xx}} { 0xxx00xxx0 \ { 0xx100xx00, 0xx000xx10, 0xxx001x10, 0xxx00xx00, 0xxx0000x0, 0xx100xxx0, 0x0x00xxx0}} {x011x \ {10111, 10110, x0110}, 1x1xx \ {1x101, 101x1, 11100}} {0000x \ {00001, 00000}, x0x1x \ {00x11, 1001x, x011x}} { x0x1xx011x \ { x0x11x0110, x0x10x0111, x0x1x10111, x0x1x10110, x0x1xx0110, 00x11x011x, 1001xx011x, x011xx011x}, 0000x1x10x \ { 000011x100, 000001x101, 0000x1x101, 0000x10101, 0000x11100, 000011x10x, 000001x10x}, x0x1x1x11x \ { x0x111x110, x0x101x111, x0x1x10111, 00x111x11x, 1001x1x11x, x011x1x11x}} {1xx00 \ {10x00, 11x00, 10100}} {x0x10 \ {10010, 10110, 00x10}, 1xx0x \ {1x000, 11000, 1x100}, xx101 \ {11101, 1x101}} { 1xx001xx00 \ { 1xx0010x00, 1xx0011x00, 1xx0010100, 1x0001xx00, 110001xx00, 1x1001xx00}} {x00xx \ {10011, x0010, 1001x}, x10x1 \ {01001, x1001, 110x1}, 01xx1 \ {01111, 010x1, 01101}} {x0xxx \ {x0010, x01xx, 00100}, xxxx0 \ {00000, xxx00, 01x10}, 0x110 \ {01110, 00110}} { x0xxxx00xx \ { x0xx1x00x0, x0xx0x00x1, x0x1xx000x, x0x0xx001x, x0xxx10011, x0xxxx0010, x0xxx1001x, x0010x00xx, x01xxx00xx, 00100x00xx}, xxxx0x00x0 \ { xxx10x0000, xxx00x0010, xxxx0x0010, xxxx010010, 00000x00x0, xxx00x00x0, 01x10x00x0}, 0x110x0010 \ { 0x110x0010, 0x11010010, 01110x0010, 00110x0010}, x0xx1x10x1 \ { x0x11x1001, x0x01x1011, x0xx101001, x0xx1x1001, x0xx1110x1, x01x1x10x1}, x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101111, x0xx1010x1, x0xx101101, x01x101xx1}} {x110x \ {1110x, 01101, 01101}} {xx10x \ {1x100, xx101, x1101}} { xx10xx110x \ { xx101x1100, xx100x1101, xx10x1110x, xx10x01101, xx10x01101, 1x100x110x, xx101x110x, x1101x110x}} {xx010 \ {x0010, x1010, 00010}} {1xxx1 \ {11101, 11xx1, 101x1}, 1xx01 \ {10x01, 11x01, 11101}} {} {1x0x1 \ {1x011, 1x001, 1x001}, 1x1xx \ {1110x, 1x111, 1x101}, 001xx \ {00111, 001x0}} {x001x \ {10010, 0001x}, 1x110 \ {10110}} { x00111x011 \ { x00111x011, 000111x011}, x001x1x11x \ { x00111x110, x00101x111, x001x1x111, 100101x11x, 0001x1x11x}, 1x1101x110 \ { 101101x110}, x001x0011x \ { x001100110, x001000111, x001x00111, x001x00110, 100100011x, 0001x0011x}, 1x11000110 \ { 1x11000110, 1011000110}} {1001x \ {10010, 10011}, x0x0x \ {0000x, 00x0x}, x0000 \ {10000, 00000}} {0x100 \ {01100}} { 0x100x0x00 \ { 0x10000000, 0x10000x00, 01100x0x00}, 0x100x0000 \ { 0x10010000, 0x10000000, 01100x0000}} {xx0x1 \ {1x001, xx001, 01001}} {0x111 \ {01111, 00111, 00111}} { 0x111xx011 \ { 01111xx011, 00111xx011, 00111xx011}} {} {100xx \ {1001x, 1000x, 100x0}} {} {x0x1x \ {0001x, 00x10, 10011}, 1x0xx \ {110xx, 110x0, 1000x}} {011xx \ {01110, 0111x, 01101}, xx1x1 \ {xx111, 00101, 01101}} { 0111xx0x1x \ { 01111x0x10, 01110x0x11, 0111x0001x, 0111x00x10, 0111x10011, 01110x0x1x, 0111xx0x1x}, xx111x0x11 \ { xx11100011, xx11110011, xx111x0x11}, 011xx1x0xx \ { 011x11x0x0, 011x01x0x1, 0111x1x00x, 0110x1x01x, 011xx110xx, 011xx110x0, 011xx1000x, 011101x0xx, 0111x1x0xx, 011011x0xx}, xx1x11x0x1 \ { xx1111x001, xx1011x011, xx1x1110x1, xx1x110001, xx1111x0x1, 001011x0x1, 011011x0x1}} {x1x1x \ {x1x10, 11x10, x1010}, 0x11x \ {00111, 01110}} {} {} {01x1x \ {01x11, 01110, 01x10}, xxxx0 \ {0x0x0, 01xx0, x00x0}} {x000x \ {10000, 00000}, 1x100 \ {10100}} { x0000xxx00 \ { x00000x000, x000001x00, x0000x0000, 10000xxx00, 00000xxx00}, 1x100xxx00 \ { 1x1000x000, 1x10001x00, 1x100x0000, 10100xxx00}} {xxx0x \ {0x000, 00001, 00x00}, 0xx11 \ {00x11, 00011, 0x011}} {x1x11 \ {01x11, x1111}, 0x011 \ {00011}} { x1x110xx11 \ { x1x1100x11, x1x1100011, x1x110x011, 01x110xx11, x11110xx11}, 0x0110xx11 \ { 0x01100x11, 0x01100011, 0x0110x011, 000110xx11}} {x0x00 \ {x0000, 00000, 00100}, x10xx \ {x10x0, 010x1, 01010}} {xx101 \ {0x101, 11101, 01101}} { xx101x1001 \ { xx10101001, 0x101x1001, 11101x1001, 01101x1001}} {xxx00 \ {xx000, 10000, x0x00}, x0x01 \ {10001, x0001}, 0x1xx \ {01110, 001x1, 01111}} {1xx11 \ {10011, 11111, 11011}, 00x11 \ {00011}} { 1xx110x111 \ { 1xx1100111, 1xx1101111, 100110x111, 111110x111, 110110x111}, 00x110x111 \ { 00x1100111, 00x1101111, 000110x111}} {x1100 \ {11100, 01100}} {0x0xx \ {00011, 01000}} { 0x000x1100 \ { 0x00011100, 0x00001100, 01000x1100}} {x0x10 \ {00x10, x0110, x0010}, x1x10 \ {11110, 01010, 01x10}} {001x1 \ {00111}, 001xx \ {0010x, 00100, 0011x}, x1x0x \ {11000, 11100, 01101}} { 00110x0x10 \ { 0011000x10, 00110x0110, 00110x0010, 00110x0x10}, 00110x1x10 \ { 0011011110, 0011001010, 0011001x10, 00110x1x10}} {x1xx0 \ {01xx0, 11100, x1110}, x100x \ {01001, 1100x, x1000}} {xx010 \ {1x010, x0010}, xx1xx \ {x01x0, 011x0, x11xx}} { xx010x1x10 \ { xx01001x10, xx010x1110, 1x010x1x10, x0010x1x10}, xx1x0x1xx0 \ { xx110x1x00, xx100x1x10, xx1x001xx0, xx1x011100, xx1x0x1110, x01x0x1xx0, 011x0x1xx0, x11x0x1xx0}, xx10xx100x \ { xx101x1000, xx100x1001, xx10x01001, xx10x1100x, xx10xx1000, x0100x100x, 01100x100x, x110xx100x}} {0xxx0 \ {0x110, 00010, 01xx0}} {x110x \ {11101, 11100, x1100}, x1x01 \ {11x01, 11001, x1001}} { x11000xx00 \ { x110001x00, 111000xx00, x11000xx00}} {00x00 \ {00100, 00000, 00000}, 00xx1 \ {00x01, 00111, 00101}} {x111x \ {x1110, 11110, 01110}, x1001 \ {11001, 01001, 01001}, 1x100 \ {10100, 11100, 11100}} { 1x10000x00 \ { 1x10000100, 1x10000000, 1x10000000, 1010000x00, 1110000x00, 1110000x00}, x111100x11 \ { x111100111}, x100100x01 \ { x100100x01, x100100101, 1100100x01, 0100100x01, 0100100x01}} {} {1xx1x \ {11011, 11x1x, 10010}, x00xx \ {10001, 10010, 00011}, 0x0x0 \ {000x0, 010x0}} {} {0x1x0 \ {0x110, 001x0, 01100}, x1000 \ {11000, 01000}, x1x0x \ {11101, 01x00, x110x}} {xx0x0 \ {x1000, 1x000, 11010}, 1xx10 \ {11110, 1x110, 10x10}, x1x01 \ {11001, 01001, 01x01}} { xx0x00x1x0 \ { xx0100x100, xx0000x110, xx0x00x110, xx0x0001x0, xx0x001100, x10000x1x0, 1x0000x1x0, 110100x1x0}, 1xx100x110 \ { 1xx100x110, 1xx1000110, 111100x110, 1x1100x110, 10x100x110}, xx000x1000 \ { xx00011000, xx00001000, x1000x1000, 1x000x1000}, xx000x1x00 \ { xx00001x00, xx000x1100, x1000x1x00, 1x000x1x00}, x1x01x1x01 \ { x1x0111101, x1x01x1101, 11001x1x01, 01001x1x01, 01x01x1x01}} {x1010 \ {11010}, xx111 \ {00111, 1x111, 10111}} {x00xx \ {00000, 000x0, 0001x}, xx010 \ {00010, 0x010, x0010}} { x0010x1010 \ { x001011010, 00010x1010, 00010x1010}, xx010x1010 \ { xx01011010, 00010x1010, 0x010x1010, x0010x1010}, x0011xx111 \ { x001100111, x00111x111, x001110111, 00011xx111}} {1x1x0 \ {101x0, 10110, 1x100}} {xx0x0 \ {1x000, x00x0, 01000}} { xx0x01x1x0 \ { xx0101x100, xx0001x110, xx0x0101x0, xx0x010110, xx0x01x100, 1x0001x1x0, x00x01x1x0, 010001x1x0}} {} {xx111 \ {10111, x1111, 0x111}, xx001 \ {00001, 01001, x1001}} {} {11x1x \ {11x10, 11011, 11110}, 11xxx \ {110x1, 1110x, 11x1x}} {xx10x \ {1x100, 0010x, 1x101}, x1xx0 \ {11xx0, 11x10, x10x0}} { x1x1011x10 \ { x1x1011x10, x1x1011110, 11x1011x10, 11x1011x10, x101011x10}, xx10x11x0x \ { xx10111x00, xx10011x01, xx10x11001, xx10x1110x, 1x10011x0x, 0010x11x0x, 1x10111x0x}, x1xx011xx0 \ { x1x1011x00, x1x0011x10, x1xx011100, x1xx011x10, 11xx011xx0, 11x1011xx0, x10x011xx0}} {101xx \ {101x1, 10100, 101x0}, 0x101 \ {00101, 01101}} {x01xx \ {101x1, 1010x, 00110}, 110x1 \ {11001}} { x01xx101xx \ { x01x1101x0, x01x0101x1, x011x1010x, x010x1011x, x01xx101x1, x01xx10100, x01xx101x0, 101x1101xx, 1010x101xx, 00110101xx}, 110x1101x1 \ { 1101110101, 1100110111, 110x1101x1, 11001101x1}, x01010x101 \ { x010100101, x010101101, 101010x101, 101010x101}, 110010x101 \ { 1100100101, 1100101101, 110010x101}} {x1xxx \ {0111x, 11x01, 01x10}, 0100x \ {01001, 01000}} {x10xx \ {010x1, x1011, 01001}, 11xxx \ {11010, 1101x, 110x0}} { x10xxx1xxx \ { x10x1x1xx0, x10x0x1xx1, x101xx1x0x, x100xx1x1x, x10xx0111x, x10xx11x01, x10xx01x10, 010x1x1xxx, x1011x1xxx, 01001x1xxx}, 11xxxx1xxx \ { 11xx1x1xx0, 11xx0x1xx1, 11x1xx1x0x, 11x0xx1x1x, 11xxx0111x, 11xxx11x01, 11xxx01x10, 11010x1xxx, 1101xx1xxx, 110x0x1xxx}, x100x0100x \ { x100101000, x100001001, x100x01001, x100x01000, 010010100x, 010010100x}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01001, 11x0x01000, 110000100x}} {x010x \ {10100, 00100, 1010x}, x1010 \ {11010, 01010, 01010}, xxx11 \ {11011, 0x011, 01x11}} {1x11x \ {1x111, 10110}, x1101 \ {01101, 11101}, 0x1xx \ {001x0, 0x100, 00100}} { x1101x0101 \ { x110110101, 01101x0101, 11101x0101}, 0x10xx010x \ { 0x101x0100, 0x100x0101, 0x10x10100, 0x10x00100, 0x10x1010x, 00100x010x, 0x100x010x, 00100x010x}, 1x110x1010 \ { 1x11011010, 1x11001010, 1x11001010, 10110x1010}, 0x110x1010 \ { 0x11011010, 0x11001010, 0x11001010, 00110x1010}, 1x111xxx11 \ { 1x11111011, 1x1110x011, 1x11101x11, 1x111xxx11}, 0x111xxx11 \ { 0x11111011, 0x1110x011, 0x11101x11}} {xx1x1 \ {01111, 111x1, 11101}} {0001x \ {00011, 00010}, 1x1x0 \ {10100, 11110, 10110}, x0101 \ {00101}} { 00011xx111 \ { 0001101111, 0001111111, 00011xx111}, x0101xx101 \ { x010111101, x010111101, 00101xx101}} {} {xxx0x \ {11101, x0x01, 00x01}, 1x011 \ {11011, 10011}} {} {0xx01 \ {01101, 00x01}} {x001x \ {10010, x0010, 10011}, 1110x \ {11100, 11101}} { 111010xx01 \ { 1110101101, 1110100x01, 111010xx01}} {xx0x0 \ {x1000, 1x0x0, x10x0}, xxxx0 \ {11010, 0xx00, 01000}} {1xxx0 \ {1x100, 11100, 11110}, 0x00x \ {01001, 01000}, 10x10 \ {10110, 10010, 10010}} { 1xxx0xx0x0 \ { 1xx10xx000, 1xx00xx010, 1xxx0x1000, 1xxx01x0x0, 1xxx0x10x0, 1x100xx0x0, 11100xx0x0, 11110xx0x0}, 0x000xx000 \ { 0x000x1000, 0x0001x000, 0x000x1000, 01000xx000}, 10x10xx010 \ { 10x101x010, 10x10x1010, 10110xx010, 10010xx010, 10010xx010}, 1xxx0xxxx0 \ { 1xx10xxx00, 1xx00xxx10, 1xxx011010, 1xxx00xx00, 1xxx001000, 1x100xxxx0, 11100xxxx0, 11110xxxx0}, 0x000xxx00 \ { 0x0000xx00, 0x00001000, 01000xxx00}, 10x10xxx10 \ { 10x1011010, 10110xxx10, 10010xxx10, 10010xxx10}} {x101x \ {11011, x1010, 0101x}, 1xxx1 \ {10001, 10011, 11x01}} {1xx0x \ {10000, 1xx01, 10001}} { 1xx011xx01 \ { 1xx0110001, 1xx0111x01, 1xx011xx01, 100011xx01}} {xxxx1 \ {0x111, 111x1, x0001}, 0x110 \ {01110, 00110}, xx001 \ {10001, x0001, 11001}} {} {} {xx101 \ {x1101}, 1x0xx \ {10001, 1000x, 11000}} {111xx \ {11101, 1110x, 11100}} { 11101xx101 \ { 11101x1101, 11101xx101, 11101xx101}, 111xx1x0xx \ { 111x11x0x0, 111x01x0x1, 1111x1x00x, 1110x1x01x, 111xx10001, 111xx1000x, 111xx11000, 111011x0xx, 1110x1x0xx, 111001x0xx}} {x0x00 \ {10x00, x0100, 00000}, 1x0x1 \ {1x001, 11011, 100x1}, x0xxx \ {x00xx, 10x1x, 00xx0}} {} {} {xxx00 \ {x1100, 0x100, xx100}, x10xx \ {010xx, 110x1, 110xx}} {0xxxx \ {00x0x, 01x01}, 10xx1 \ {10111, 10x11, 10x01}, 01x0x \ {01100, 0100x, 01101}} { 0xx00xxx00 \ { 0xx00x1100, 0xx000x100, 0xx00xx100, 00x00xxx00}, 01x00xxx00 \ { 01x00x1100, 01x000x100, 01x00xx100, 01100xxx00, 01000xxx00}, 0xxxxx10xx \ { 0xxx1x10x0, 0xxx0x10x1, 0xx1xx100x, 0xx0xx101x, 0xxxx010xx, 0xxxx110x1, 0xxxx110xx, 00x0xx10xx, 01x01x10xx}, 10xx1x10x1 \ { 10x11x1001, 10x01x1011, 10xx1010x1, 10xx1110x1, 10xx1110x1, 10111x10x1, 10x11x10x1, 10x01x10x1}, 01x0xx100x \ { 01x01x1000, 01x00x1001, 01x0x0100x, 01x0x11001, 01x0x1100x, 01100x100x, 0100xx100x, 01101x100x}} {1x0x0 \ {100x0, 11010, 10010}} {xx11x \ {x1111, x111x, xx111}, 100xx \ {1000x, 10001, 10010}} { xx1101x010 \ { xx11010010, xx11011010, xx11010010, x11101x010}, 100x01x0x0 \ { 100101x000, 100001x010, 100x0100x0, 100x011010, 100x010010, 100001x0x0, 100101x0x0}} {x10x0 \ {x1000, 11010, 11000}, 10xx0 \ {100x0, 10x10, 10110}, 101x0 \ {10100, 10110, 10110}} {x0x00 \ {00x00, x0000, 10100}} { x0x00x1000 \ { x0x00x1000, x0x0011000, 00x00x1000, x0000x1000, 10100x1000}, x0x0010x00 \ { x0x0010000, 00x0010x00, x000010x00, 1010010x00}, x0x0010100 \ { x0x0010100, 00x0010100, x000010100, 1010010100}} {0101x \ {01010, 01011, 01011}, xxxx1 \ {01001, 00011, x1011}} {0x00x \ {00001, 00000, 00000}} { 0x001xxx01 \ { 0x00101001, 00001xxx01}} {x1011 \ {11011, 01011}, x001x \ {00010, 10011, 0001x}} {0x001 \ {00001}} {} {x0xx1 \ {10x11, 10111, x00x1}, 11x0x \ {11x00, 1110x, 11101}, xx100 \ {01100, x0100, x0100}} {} {} {0x1x0 \ {00100, 0x100, 0x100}} {x0x10 \ {10x10, 00x10, 00x10}, 0000x \ {00001, 00000}, 1xx0x \ {10x00, 1110x, 1100x}} { x0x100x110 \ { 10x100x110, 00x100x110, 00x100x110}, 000000x100 \ { 0000000100, 000000x100, 000000x100, 000000x100}, 1xx000x100 \ { 1xx0000100, 1xx000x100, 1xx000x100, 10x000x100, 111000x100, 110000x100}} {x1xxx \ {01xx1, 11x01, x101x}, x01xx \ {x0100, 101xx, 0011x}} {0x001 \ {01001, 00001}, 011xx \ {011x1, 01100}} { 0x001x1x01 \ { 0x00101x01, 0x00111x01, 01001x1x01, 00001x1x01}, 011xxx1xxx \ { 011x1x1xx0, 011x0x1xx1, 0111xx1x0x, 0110xx1x1x, 011xx01xx1, 011xx11x01, 011xxx101x, 011x1x1xxx, 01100x1xxx}, 0x001x0101 \ { 0x00110101, 01001x0101, 00001x0101}, 011xxx01xx \ { 011x1x01x0, 011x0x01x1, 0111xx010x, 0110xx011x, 011xxx0100, 011xx101xx, 011xx0011x, 011x1x01xx, 01100x01xx}} {1xxxx \ {1011x, 110x0, 1010x}, xx101 \ {00101, x0101, 11101}} {1111x \ {11111, 11110}, xx000 \ {x0000, 11000, 01000}} { 1111x1xx1x \ { 111111xx10, 111101xx11, 1111x1011x, 1111x11010, 111111xx1x, 111101xx1x}, xx0001xx00 \ { xx00011000, xx00010100, x00001xx00, 110001xx00, 010001xx00}} {x1x00 \ {x1100, 11100, 01100}, xx0x0 \ {1x000, xx000, x0010}} {xx01x \ {00011, 00010, x0010}} { xx010xx010 \ { xx010x0010, 00010xx010, x0010xx010}} {11xxx \ {1100x, 11x0x, 11x01}} {} {} {xx111 \ {10111, 11111, 01111}, 1xxx0 \ {10x00, 100x0, 11000}} {x10x0 \ {x1010, 11010, 01000}, 10xx1 \ {100x1, 10001}} { 10x11xx111 \ { 10x1110111, 10x1111111, 10x1101111, 10011xx111}, x10x01xxx0 \ { x10101xx00, x10001xx10, x10x010x00, x10x0100x0, x10x011000, x10101xxx0, 110101xxx0, 010001xxx0}} {x11x0 \ {01110, 11110, 11100}, x1xx1 \ {01001, x1x11, x1001}} {10x1x \ {1011x, 10x10, 10110}, x11xx \ {x110x, 111xx, 011xx}} { 10x10x1110 \ { 10x1001110, 10x1011110, 10110x1110, 10x10x1110, 10110x1110}, x11x0x11x0 \ { x1110x1100, x1100x1110, x11x001110, x11x011110, x11x011100, x1100x11x0, 111x0x11x0, 011x0x11x0}, 10x11x1x11 \ { 10x11x1x11, 10111x1x11}, x11x1x1xx1 \ { x1111x1x01, x1101x1x11, x11x101001, x11x1x1x11, x11x1x1001, x1101x1xx1, 111x1x1xx1, 011x1x1xx1}} {xx110 \ {00110, x0110, 1x110}, 1x01x \ {1x010, 10011}} {00x0x \ {0000x, 00001, 00x01}} {} {xx1x1 \ {x1111, 10111, x0101}, 100x0 \ {10000, 10010}} {x1x1x \ {01x10, x1010, x111x}, 1x00x \ {1000x, 1x001, 10001}, 0x00x \ {0x001, 0100x, 00001}} { x1x11xx111 \ { x1x11x1111, x1x1110111, x1111xx111}, 1x001xx101 \ { 1x001x0101, 10001xx101, 1x001xx101, 10001xx101}, 0x001xx101 \ { 0x001x0101, 0x001xx101, 01001xx101, 00001xx101}, x1x1010010 \ { x1x1010010, 01x1010010, x101010010, x111010010}, 1x00010000 \ { 1x00010000, 1000010000}, 0x00010000 \ { 0x00010000, 0100010000}} {x10x1 \ {01001, x1011, 11011}, 01x11 \ {01011, 01111}} {xx100 \ {x1100, 11100}, xx00x \ {0100x, 00000, 1x000}} { xx001x1001 \ { xx00101001, 01001x1001}} {x0x11 \ {x0111, 10111, 00x11}} {xx1xx \ {011x0, 001x0, 1111x}, xxxx1 \ {0x111, 110x1, x10x1}} { xx111x0x11 \ { xx111x0111, xx11110111, xx11100x11, 11111x0x11}, xxx11x0x11 \ { xxx11x0111, xxx1110111, xxx1100x11, 0x111x0x11, 11011x0x11, x1011x0x11}} {xxxx0 \ {01100, xx010, 1x010}} {} {} {} {1x1x0 \ {11110, 111x0, 111x0}, 01xxx \ {01x1x, 01xx1, 011x0}} {} {110x0 \ {11000}, x0100 \ {00100}} {} {} {x1x0x \ {01101, 11101, x1101}} {xxxxx \ {1xx11, 011x1, 01xx0}, 01x01 \ {01001}, x011x \ {10111, x0110, 00111}} { xxx0xx1x0x \ { xxx01x1x00, xxx00x1x01, xxx0x01101, xxx0x11101, xxx0xx1101, 01101x1x0x, 01x00x1x0x}, 01x01x1x01 \ { 01x0101101, 01x0111101, 01x01x1101, 01001x1x01}} {xx0xx \ {x1010, xx00x, 1x011}} {01x0x \ {01000, 01001, 01x00}} { 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0xxx00x, 01000xx00x, 01001xx00x, 01x00xx00x}} {1x0xx \ {1101x, 1x010, 11011}} {010xx \ {0101x, 01000, 010x0}, 101x1 \ {10111, 10101}} { 010xx1x0xx \ { 010x11x0x0, 010x01x0x1, 0101x1x00x, 0100x1x01x, 010xx1101x, 010xx1x010, 010xx11011, 0101x1x0xx, 010001x0xx, 010x01x0xx}, 101x11x0x1 \ { 101111x001, 101011x011, 101x111011, 101x111011, 101111x0x1, 101011x0x1}} {10x01 \ {10101, 10001}, xx011 \ {01011, 10011}, xx0x1 \ {1x0x1, xx001, x1001}} {0xx00 \ {01100, 01x00, 0x000}, 0x10x \ {00101, 0010x, 01100}} { 0x10110x01 \ { 0x10110101, 0x10110001, 0010110x01, 0010110x01}, 0x101xx001 \ { 0x1011x001, 0x101xx001, 0x101x1001, 00101xx001, 00101xx001}} {0xx11 \ {00011, 0x011, 0x011}, 11x1x \ {11010, 1111x, 11110}, x0x1x \ {10111, x0011, x001x}} {0xx11 \ {01x11, 00011, 00111}, 1x00x \ {1x000, 1x001, 10001}} { 0xx110xx11 \ { 0xx1100011, 0xx110x011, 0xx110x011, 01x110xx11, 000110xx11, 001110xx11}, 0xx1111x11 \ { 0xx1111111, 01x1111x11, 0001111x11, 0011111x11}, 0xx11x0x11 \ { 0xx1110111, 0xx11x0011, 0xx11x0011, 01x11x0x11, 00011x0x11, 00111x0x11}} {x001x \ {0001x, x0010, 10010}, 1xxxx \ {1x11x, 11111, 110xx}} {x1x11 \ {x1111, 11011, 11x11}, xxxx1 \ {001x1, x0001, x1x01}} { x1x11x0011 \ { x1x1100011, x1111x0011, 11011x0011, 11x11x0011}, xxx11x0011 \ { xxx1100011, 00111x0011}, x1x111xx11 \ { x1x111x111, x1x1111111, x1x1111011, x11111xx11, 110111xx11, 11x111xx11}, xxxx11xxx1 \ { xxx111xx01, xxx011xx11, xxxx11x111, xxxx111111, xxxx1110x1, 001x11xxx1, x00011xxx1, x1x011xxx1}} {xx1xx \ {111xx, 10111, 0111x}, xxxx1 \ {01001, 10x01, 00x01}} {} {} {0x01x \ {00011, 0001x, 0101x}, x011x \ {0011x, 10111}, x11x0 \ {011x0, 11110, 11100}} {110x0 \ {11010, 11000}, 10xx1 \ {101x1, 10011}} { 110100x010 \ { 1101000010, 1101001010, 110100x010}, 10x110x011 \ { 10x1100011, 10x1100011, 10x1101011, 101110x011, 100110x011}, 11010x0110 \ { 1101000110, 11010x0110}, 10x11x0111 \ { 10x1100111, 10x1110111, 10111x0111, 10011x0111}, 110x0x11x0 \ { 11010x1100, 11000x1110, 110x0011x0, 110x011110, 110x011100, 11010x11x0, 11000x11x0}} {11x10 \ {11110, 11010}, x1x1x \ {11111, 01x1x, 01111}} {000xx \ {00010, 0001x, 000x0}} { 0001011x10 \ { 0001011110, 0001011010, 0001011x10, 0001011x10, 0001011x10}, 0001xx1x1x \ { 00011x1x10, 00010x1x11, 0001x11111, 0001x01x1x, 0001x01111, 00010x1x1x, 0001xx1x1x, 00010x1x1x}} {} {x1x1x \ {01011, 1101x, 01111}, xx10x \ {11100, 1110x, x0101}} {} {x1010 \ {11010}, x110x \ {11100, x1100, 11101}} {x001x \ {10011, 0001x, 00010}, x10x1 \ {11001, 110x1, 11011}} { x0010x1010 \ { x001011010, 00010x1010, 00010x1010}, x1001x1101 \ { x100111101, 11001x1101, 11001x1101}} {xxx0x \ {1100x, 0x10x, 0xx01}} {111x0 \ {11100, 11110}} { 11100xxx00 \ { 1110011000, 111000x100, 11100xxx00}} {011xx \ {0111x, 0110x, 01110}, xxx10 \ {1x110, x1010, 01110}, 0x0x0 \ {00010, 01010}} {x1100 \ {01100}, x1xxx \ {01100, 11x1x, x1xx1}} { x110001100 \ { x110001100, 0110001100}, x1xxx011xx \ { x1xx1011x0, x1xx0011x1, x1x1x0110x, x1x0x0111x, x1xxx0111x, x1xxx0110x, x1xxx01110, 01100011xx, 11x1x011xx, x1xx1011xx}, x1x10xxx10 \ { x1x101x110, x1x10x1010, x1x1001110, 11x10xxx10}, x11000x000 \ { 011000x000}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx000010, x1xx001010, 011000x0x0, 11x100x0x0}} {01xxx \ {0110x, 01x0x, 01111}} {0x1x0 \ {01100, 0x100, 001x0}, 0x0x0 \ {00000, 000x0}, 1xx11 \ {10x11, 1x111, 10011}} { 0x1x001xx0 \ { 0x11001x00, 0x10001x10, 0x1x001100, 0x1x001x00, 0110001xx0, 0x10001xx0, 001x001xx0}, 0x0x001xx0 \ { 0x01001x00, 0x00001x10, 0x0x001100, 0x0x001x00, 0000001xx0, 000x001xx0}, 1xx1101x11 \ { 1xx1101111, 10x1101x11, 1x11101x11, 1001101x11}} {x101x \ {01011, 1101x, 0101x}, x0xx1 \ {00101, 000x1, 10x01}} {1xx0x \ {10100, 1x100, 1000x}} { 1xx01x0x01 \ { 1xx0100101, 1xx0100001, 1xx0110x01, 10001x0x01}} {x111x \ {0111x, 11110, 01111}, x0xx1 \ {x00x1, x0x01, 10001}, x0100 \ {00100, 10100}} {x01xx \ {x011x, x0110, 10100}, 0001x \ {00010, 00011}} { x011xx111x \ { x0111x1110, x0110x1111, x011x0111x, x011x11110, x011x01111, x011xx111x, x0110x111x}, 0001xx111x \ { 00011x1110, 00010x1111, 0001x0111x, 0001x11110, 0001x01111, 00010x111x, 00011x111x}, x01x1x0xx1 \ { x0111x0x01, x0101x0x11, x01x1x00x1, x01x1x0x01, x01x110001, x0111x0xx1}, 00011x0x11 \ { 00011x0011, 00011x0x11}, x0100x0100 \ { x010000100, x010010100, 10100x0100}} {x0xx0 \ {100x0, 00x10, 00x10}} {xxxx1 \ {x0xx1, x1001, 011x1}, x1100 \ {11100, 01100}, x0000 \ {00000}} { x1100x0x00 \ { x110010000, 11100x0x00, 01100x0x00}, x0000x0x00 \ { x000010000, 00000x0x00}} {1xx0x \ {10101, 11101, 1x10x}, x11xx \ {11111, 0110x, 111x0}, 0x10x \ {0x101, 00100, 00100}} {000xx \ {0000x, 00001, 00011}, x00x1 \ {00011, 000x1, x0001}} { 0000x1xx0x \ { 000011xx00, 000001xx01, 0000x10101, 0000x11101, 0000x1x10x, 0000x1xx0x, 000011xx0x}, x00011xx01 \ { x000110101, x000111101, x00011x101, 000011xx01, x00011xx01}, 000xxx11xx \ { 000x1x11x0, 000x0x11x1, 0001xx110x, 0000xx111x, 000xx11111, 000xx0110x, 000xx111x0, 0000xx11xx, 00001x11xx, 00011x11xx}, x00x1x11x1 \ { x0011x1101, x0001x1111, x00x111111, x00x101101, 00011x11x1, 000x1x11x1, x0001x11x1}, 0000x0x10x \ { 000010x100, 000000x101, 0000x0x101, 0000x00100, 0000x00100, 0000x0x10x, 000010x10x}, x00010x101 \ { x00010x101, 000010x101, x00010x101}} {1x1xx \ {1010x, 1x110, 10100}, x11x1 \ {01101, x1101, 011x1}} {00xx1 \ {00101, 00001, 00x11}} { 00xx11x1x1 \ { 00x111x101, 00x011x111, 00xx110101, 001011x1x1, 000011x1x1, 00x111x1x1}, 00xx1x11x1 \ { 00x11x1101, 00x01x1111, 00xx101101, 00xx1x1101, 00xx1011x1, 00101x11x1, 00001x11x1, 00x11x11x1}} {0xx0x \ {00101, 0x101, 0xx00}} {xxx1x \ {x1111, 00011}} {} {xx0x0 \ {10000, 1x010, 1x0x0}} {x0x00 \ {10x00, x0000, 10000}} { x0x00xx000 \ { x0x0010000, x0x001x000, 10x00xx000, x0000xx000, 10000xx000}} {01x0x \ {0110x, 01000, 01101}} {x011x \ {00110, 10111, 1011x}, xx1x1 \ {001x1, xx111, x01x1}} { xx10101x01 \ { xx10101101, xx10101101, 0010101x01, x010101x01}} {} {x0xx1 \ {10101, 00011, 00xx1}, 0xx1x \ {0001x, 0xx10, 0x110}} {} {01xx1 \ {01001, 01111, 01011}} {x00x1 \ {x0011, 00001, 000x1}, 0x1x1 \ {0x101, 01101}} { x00x101xx1 \ { x001101x01, x000101x11, x00x101001, x00x101111, x00x101011, x001101xx1, 0000101xx1, 000x101xx1}, 0x1x101xx1 \ { 0x11101x01, 0x10101x11, 0x1x101001, 0x1x101111, 0x1x101011, 0x10101xx1, 0110101xx1}} {x0xx1 \ {10001, 10101, 101x1}, 000xx \ {00001, 00000}} {x1x1x \ {11111, 01x1x, 01x1x}, x00xx \ {1001x, x0010, x0010}, 1xx01 \ {1x001, 10101}} { x1x11x0x11 \ { x1x1110111, 11111x0x11, 01x11x0x11, 01x11x0x11}, x00x1x0xx1 \ { x0011x0x01, x0001x0x11, x00x110001, x00x110101, x00x1101x1, 10011x0xx1}, 1xx01x0x01 \ { 1xx0110001, 1xx0110101, 1xx0110101, 1x001x0x01, 10101x0x01}, x1x1x0001x \ { x1x1100010, x1x1000011, 111110001x, 01x1x0001x, 01x1x0001x}, x00xx000xx \ { x00x1000x0, x00x0000x1, x001x0000x, x000x0001x, x00xx00001, x00xx00000, 1001x000xx, x0010000xx, x0010000xx}, 1xx0100001 \ { 1xx0100001, 1x00100001, 1010100001}} {1xxx1 \ {1x1x1, 11011}, x1xx0 \ {01x10, 11100, 111x0}} {0x101 \ {00101}} { 0x1011xx01 \ { 0x1011x101, 001011xx01}} {1010x \ {10101, 10100, 10100}, x0x01 \ {10101, 00x01}} {xxxxx \ {001x0, 11100, 1xx10}, xx0x1 \ {1x001, 01011, 00011}} { xxx0x1010x \ { xxx0110100, xxx0010101, xxx0x10101, xxx0x10100, xxx0x10100, 001001010x, 111001010x}, xx00110101 \ { xx00110101, 1x00110101}, xxx01x0x01 \ { xxx0110101, xxx0100x01}, xx001x0x01 \ { xx00110101, xx00100x01, 1x001x0x01}} {1xx00 \ {10100, 1x000, 11100}, 11xxx \ {11x11, 111x0, 11100}} {xx011 \ {00011, 01011, x0011}, xx1x1 \ {x11x1, 10111, 11101}} { xx01111x11 \ { xx01111x11, 0001111x11, 0101111x11, x001111x11}, xx1x111xx1 \ { xx11111x01, xx10111x11, xx1x111x11, x11x111xx1, 1011111xx1, 1110111xx1}} {} {0x100 \ {01100}, 10xx0 \ {101x0, 10x10}, 00xx1 \ {00111, 00x11, 00001}} {} {x00xx \ {100x0, x0000, x001x}, 11x00 \ {11000}} {x10x0 \ {01010, 010x0, x1010}} { x10x0x00x0 \ { x1010x0000, x1000x0010, x10x0100x0, x10x0x0000, x10x0x0010, 01010x00x0, 010x0x00x0, x1010x00x0}, x100011x00 \ { x100011000, 0100011x00}} {x11x0 \ {11110, 011x0}} {} {} {0xx11 \ {0x111, 00011, 00x11}, x1000 \ {01000, 11000}} {001x1 \ {00111, 00101}, xx111 \ {0x111, x1111}} { 001110xx11 \ { 001110x111, 0011100011, 0011100x11, 001110xx11}, xx1110xx11 \ { xx1110x111, xx11100011, xx11100x11, 0x1110xx11, x11110xx11}} {0x1xx \ {0x110, 01101}, x1x1x \ {11x1x, 01x11, 11011}} {x01x0 \ {10110, 00100, 101x0}, xx1x0 \ {1x1x0, 111x0, 1x110}} { x01x00x1x0 \ { x01100x100, x01000x110, x01x00x110, 101100x1x0, 001000x1x0, 101x00x1x0}, xx1x00x1x0 \ { xx1100x100, xx1000x110, xx1x00x110, 1x1x00x1x0, 111x00x1x0, 1x1100x1x0}, x0110x1x10 \ { x011011x10, 10110x1x10, 10110x1x10}, xx110x1x10 \ { xx11011x10, 1x110x1x10, 11110x1x10, 1x110x1x10}} {xxx10 \ {11x10, 00110, xx010}, 10x00 \ {10000}} {xx111 \ {x0111, 01111, 00111}} {} {x11x0 \ {011x0, 11100, x1110}, x01xx \ {001x0, 10100, x0100}, 000xx \ {000x1, 0000x, 00000}} {x100x \ {0100x, 01001}, 11x1x \ {11111, 11011, 11010}} { x1000x1100 \ { x100001100, x100011100, 01000x1100}, 11x10x1110 \ { 11x1001110, 11x10x1110, 11010x1110}, x100xx010x \ { x1001x0100, x1000x0101, x100x00100, x100x10100, x100xx0100, 0100xx010x, 01001x010x}, 11x1xx011x \ { 11x11x0110, 11x10x0111, 11x1x00110, 11111x011x, 11011x011x, 11010x011x}, x100x0000x \ { x100100000, x100000001, x100x00001, x100x0000x, x100x00000, 0100x0000x, 010010000x}, 11x1x0001x \ { 11x1100010, 11x1000011, 11x1x00011, 111110001x, 110110001x, 110100001x}} {x0xx0 \ {000x0, 00x10, x0x10}, 1xx01 \ {1x001, 11x01, 1x101}} {} {} {xx01x \ {00010, 1001x, xx011}} {} {} {xx000 \ {x1000, 1x000, 00000}, x1xxx \ {0100x, 11x11, 11101}, 0x1xx \ {001x0, 0x110, 0x1x0}} {xxx01 \ {10101, 00x01}} { xxx01x1x01 \ { xxx0101001, xxx0111101, 10101x1x01, 00x01x1x01}, xxx010x101 \ { 101010x101, 00x010x101}} {x1xx1 \ {x1x11, x1101, 01x01}, 0x0xx \ {010x0, 0x01x, 00000}} {0xxx0 \ {0x0x0, 011x0, 0xx00}} { 0xxx00x0x0 \ { 0xx100x000, 0xx000x010, 0xxx0010x0, 0xxx00x010, 0xxx000000, 0x0x00x0x0, 011x00x0x0, 0xx000x0x0}} {11x01 \ {11101, 11001}} {0x0x0 \ {00000, 0x000, 000x0}} {} {1x10x \ {1x101, 1110x, 1110x}} {0x1x0 \ {00100, 0x100, 0x110}} { 0x1001x100 \ { 0x10011100, 0x10011100, 001001x100, 0x1001x100}} {00x0x \ {00100, 00x00}} {1100x \ {11001, 11000, 11000}} { 1100x00x0x \ { 1100100x00, 1100000x01, 1100x00100, 1100x00x00, 1100100x0x, 1100000x0x, 1100000x0x}} {000x0 \ {00000, 00010, 00010}} {xx10x \ {xx101, 10101, 1x101}} { xx10000000 \ { xx10000000}} {0x0x0 \ {000x0, 0x000, 00010}} {x1x10 \ {11x10, 11110, 11110}, 01xxx \ {0101x, 010x0, 01101}} { x1x100x010 \ { x1x1000010, x1x1000010, 11x100x010, 111100x010, 111100x010}, 01xx00x0x0 \ { 01x100x000, 01x000x010, 01xx0000x0, 01xx00x000, 01xx000010, 010100x0x0, 010x00x0x0}} {00xx0 \ {00010, 000x0, 00100}, xx000 \ {00000}} {00xx0 \ {001x0, 00x10, 00x10}, 0xx1x \ {01x11, 0111x, 01011}} { 00xx000xx0 \ { 00x1000x00, 00x0000x10, 00xx000010, 00xx0000x0, 00xx000100, 001x000xx0, 00x1000xx0, 00x1000xx0}, 0xx1000x10 \ { 0xx1000010, 0xx1000010, 0111000x10}, 00x00xx000 \ { 00x0000000, 00100xx000}} {1111x \ {11111, 11110, 11110}, 0x1x1 \ {011x1, 001x1, 01111}, 110x1 \ {11001, 11011}} {001xx \ {001x1, 00111, 001x0}} { 0011x1111x \ { 0011111110, 0011011111, 0011x11111, 0011x11110, 0011x11110, 001111111x, 001111111x, 001101111x}, 001x10x1x1 \ { 001110x101, 001010x111, 001x1011x1, 001x1001x1, 001x101111, 001x10x1x1, 001110x1x1}, 001x1110x1 \ { 0011111001, 0010111011, 001x111001, 001x111011, 001x1110x1, 00111110x1}} {x1001 \ {11001, 01001}, 010x1 \ {01001}} {xx1xx \ {01110, 01101, xx1x1}} { xx101x1001 \ { xx10111001, xx10101001, 01101x1001, xx101x1001}, xx1x1010x1 \ { xx11101001, xx10101011, xx1x101001, 01101010x1, xx1x1010x1}} {1x11x \ {11111, 11110, 1111x}, 11x11 \ {11011, 11111}} {01xx1 \ {01011, 010x1}, 1xx0x \ {1xx00, 10100, 1x10x}} { 01x111x111 \ { 01x1111111, 01x1111111, 010111x111, 010111x111}, 01x1111x11 \ { 01x1111011, 01x1111111, 0101111x11, 0101111x11}} {} {x00xx \ {x0000, 1001x, 1001x}} {} {xx111 \ {10111, 00111}, xxx0x \ {0x00x, x0x00, 11x0x}, 11x11 \ {11011}} {00x0x \ {00100, 00x01, 00000}, x10x0 \ {x1010, 11000, 11010}, 010x0 \ {01000, 01010}} { 00x0xxxx0x \ { 00x01xxx00, 00x00xxx01, 00x0x0x00x, 00x0xx0x00, 00x0x11x0x, 00100xxx0x, 00x01xxx0x, 00000xxx0x}, x1000xxx00 \ { x10000x000, x1000x0x00, x100011x00, 11000xxx00}, 01000xxx00 \ { 010000x000, 01000x0x00, 0100011x00, 01000xxx00}} {xx01x \ {0001x, 1x010, xx010}} {1xxx1 \ {10x01, 11001, 110x1}, 1xx1x \ {10011, 10010, 1x011}} { 1xx11xx011 \ { 1xx1100011, 11011xx011}, 1xx1xxx01x \ { 1xx11xx010, 1xx10xx011, 1xx1x0001x, 1xx1x1x010, 1xx1xxx010, 10011xx01x, 10010xx01x, 1x011xx01x}} {10x10 \ {10110, 10010}, 00x1x \ {00010, 00011, 00110}, 10x11 \ {10011, 10111, 10111}} {} {} {x1x10 \ {11110, 01x10, x1110}, xx0xx \ {010x0, 0001x, x001x}} {x111x \ {01111, x1111, 1111x}, x1x10 \ {01010, 11010}, x0101 \ {00101}} { x1110x1x10 \ { x111011110, x111001x10, x1110x1110, 11110x1x10}, x1x10x1x10 \ { x1x1011110, x1x1001x10, x1x10x1110, 01010x1x10, 11010x1x10}, x111xxx01x \ { x1111xx010, x1110xx011, x111x01010, x111x0001x, x111xx001x, 01111xx01x, x1111xx01x, 1111xxx01x}, x1x10xx010 \ { x1x1001010, x1x1000010, x1x10x0010, 01010xx010, 11010xx010}, x0101xx001 \ { 00101xx001}} {1xx11 \ {1x111, 10011}, 000x0 \ {00000}} {xx1xx \ {0x10x, xx11x, 0111x}, 1x0x0 \ {11010, 110x0, 100x0}} { xx1111xx11 \ { xx1111x111, xx11110011, xx1111xx11, 011111xx11}, xx1x0000x0 \ { xx11000000, xx10000010, xx1x000000, 0x100000x0, xx110000x0, 01110000x0}, 1x0x0000x0 \ { 1x01000000, 1x00000010, 1x0x000000, 11010000x0, 110x0000x0, 100x0000x0}} {10xx1 \ {10001, 100x1, 10111}, x11xx \ {x11x1, 01100, 11100}} {1xx11 \ {1x011, 10x11, 11x11}, x11x1 \ {11111, 111x1, x1111}, xxx01 \ {xx001, 0x001, 0x001}} { 1xx1110x11 \ { 1xx1110011, 1xx1110111, 1x01110x11, 10x1110x11, 11x1110x11}, x11x110xx1 \ { x111110x01, x110110x11, x11x110001, x11x1100x1, x11x110111, 1111110xx1, 111x110xx1, x111110xx1}, xxx0110x01 \ { xxx0110001, xxx0110001, xx00110x01, 0x00110x01, 0x00110x01}, 1xx11x1111 \ { 1xx11x1111, 1x011x1111, 10x11x1111, 11x11x1111}, x11x1x11x1 \ { x1111x1101, x1101x1111, x11x1x11x1, 11111x11x1, 111x1x11x1, x1111x11x1}, xxx01x1101 \ { xxx01x1101, xx001x1101, 0x001x1101, 0x001x1101}} {0xxx1 \ {000x1, 0xx01, 01x11}, 0x00x \ {01000, 0100x}, x111x \ {01111, x1110, 0111x}} {} {} {x1x01 \ {11x01, 01001, 01x01}, 0x0x0 \ {000x0, 0x010, 01000}} {00xxx \ {00100, 0010x, 000x0}, 011xx \ {0110x, 01110, 01100}, x10xx \ {01010, 11011, 110xx}} { 00x01x1x01 \ { 00x0111x01, 00x0101001, 00x0101x01, 00101x1x01}, 01101x1x01 \ { 0110111x01, 0110101001, 0110101x01, 01101x1x01}, x1001x1x01 \ { x100111x01, x100101001, x100101x01, 11001x1x01}, 00xx00x0x0 \ { 00x100x000, 00x000x010, 00xx0000x0, 00xx00x010, 00xx001000, 001000x0x0, 001000x0x0, 000x00x0x0}, 011x00x0x0 \ { 011100x000, 011000x010, 011x0000x0, 011x00x010, 011x001000, 011000x0x0, 011100x0x0, 011000x0x0}, x10x00x0x0 \ { x10100x000, x10000x010, x10x0000x0, x10x00x010, x10x001000, 010100x0x0, 110x00x0x0}} {010xx \ {01010, 01000, 01011}} {xx011 \ {x0011, 01011, 10011}, 0xx11 \ {0x111, 01011, 00111}, 11xxx \ {11x1x, 1101x, 11101}} { xx01101011 \ { xx01101011, x001101011, 0101101011, 1001101011}, 0xx1101011 \ { 0xx1101011, 0x11101011, 0101101011, 0011101011}, 11xxx010xx \ { 11xx1010x0, 11xx0010x1, 11x1x0100x, 11x0x0101x, 11xxx01010, 11xxx01000, 11xxx01011, 11x1x010xx, 1101x010xx, 11101010xx}} {010x0 \ {01000, 01010}, x10xx \ {01011, 010xx, 1100x}, xx11x \ {xx110, 1x11x, 0x110}} {1x10x \ {11101, 1010x}} { 1x10001000 \ { 1x10001000, 1010001000}, 1x10xx100x \ { 1x101x1000, 1x100x1001, 1x10x0100x, 1x10x1100x, 11101x100x, 1010xx100x}} {11xx1 \ {110x1, 111x1, 11101}, 0xxxx \ {01x0x, 001xx, 0101x}} {10xx1 \ {10x11, 101x1, 10111}} { 10xx111xx1 \ { 10x1111x01, 10x0111x11, 10xx1110x1, 10xx1111x1, 10xx111101, 10x1111xx1, 101x111xx1, 1011111xx1}, 10xx10xxx1 \ { 10x110xx01, 10x010xx11, 10xx101x01, 10xx1001x1, 10xx101011, 10x110xxx1, 101x10xxx1, 101110xxx1}} {1xxxx \ {10x11, 1x011, 1011x}, 1x1x0 \ {11110, 11100}} {0x1xx \ {0x100, 01100, 0111x}} { 0x1xx1xxxx \ { 0x1x11xxx0, 0x1x01xxx1, 0x11x1xx0x, 0x10x1xx1x, 0x1xx10x11, 0x1xx1x011, 0x1xx1011x, 0x1001xxxx, 011001xxxx, 0111x1xxxx}, 0x1x01x1x0 \ { 0x1101x100, 0x1001x110, 0x1x011110, 0x1x011100, 0x1001x1x0, 011001x1x0, 011101x1x0}} {1x11x \ {1x111, 1x110, 1x110}} {} {} {xx0x1 \ {1x011, 01001, xx001}, 01x10 \ {01010}} {1111x \ {11111, 11110}} { 11111xx011 \ { 111111x011, 11111xx011}, 1111001x10 \ { 1111001010, 1111001x10}} {x110x \ {1110x, 0110x}, x1xxx \ {x10x0, 01x1x, 11011}, 0x010 \ {01010, 00010}} {x10x1 \ {11001, x1011, x1011}} { x1001x1101 \ { x100111101, x100101101, 11001x1101}, x10x1x1xx1 \ { x1011x1x01, x1001x1x11, x10x101x11, x10x111011, 11001x1xx1, x1011x1xx1, x1011x1xx1}} {x01xx \ {x0100, x0101, 00101}} {11x1x \ {1111x, 11x10}} { 11x1xx011x \ { 11x11x0110, 11x10x0111, 1111xx011x, 11x10x011x}} {x1xx1 \ {011x1, x1x11, 01101}} {0x110 \ {00110, 01110}, xx100 \ {01100, 10100}, 10xx1 \ {10001, 10011, 10111}} { 10xx1x1xx1 \ { 10x11x1x01, 10x01x1x11, 10xx1011x1, 10xx1x1x11, 10xx101101, 10001x1xx1, 10011x1xx1, 10111x1xx1}} {} {001xx \ {00110, 0010x, 00101}} {} {1x00x \ {1x000, 11001, 10001}, 1x111 \ {11111, 10111}} {xxxx1 \ {0x111, 11x01, x1x01}, 101x1 \ {10111, 10101}, x00xx \ {000x0, x0001, 0001x}} { xxx011x001 \ { xxx0111001, xxx0110001, 11x011x001, x1x011x001}, 101011x001 \ { 1010111001, 1010110001, 101011x001}, x000x1x00x \ { x00011x000, x00001x001, x000x1x000, x000x11001, x000x10001, 000001x00x, x00011x00x}, xxx111x111 \ { xxx1111111, xxx1110111, 0x1111x111}, 101111x111 \ { 1011111111, 1011110111, 101111x111}, x00111x111 \ { x001111111, x001110111, 000111x111}} {} {1x11x \ {1111x, 1x111, 1011x}, xx10x \ {0x10x, 11101, 11100}} {} {x0xx1 \ {x0x01, 100x1, 00x01}, x11xx \ {x1101, 0111x, 11100}} {01x10 \ {01110, 01010}, 1xxxx \ {10100, 10x10, 10000}} { 1xxx1x0xx1 \ { 1xx11x0x01, 1xx01x0x11, 1xxx1x0x01, 1xxx1100x1, 1xxx100x01}, 01x10x1110 \ { 01x1001110, 01110x1110, 01010x1110}, 1xxxxx11xx \ { 1xxx1x11x0, 1xxx0x11x1, 1xx1xx110x, 1xx0xx111x, 1xxxxx1101, 1xxxx0111x, 1xxxx11100, 10100x11xx, 10x10x11xx, 10000x11xx}} {00xx0 \ {00100, 001x0, 000x0}} {x10xx \ {110xx, 11011, x1011}, 000x0 \ {00000, 00010, 00010}} { x10x000xx0 \ { x101000x00, x100000x10, x10x000100, x10x0001x0, x10x0000x0, 110x000xx0}, 000x000xx0 \ { 0001000x00, 0000000x10, 000x000100, 000x0001x0, 000x0000x0, 0000000xx0, 0001000xx0, 0001000xx0}} {0xxx1 \ {0xx11, 0x0x1, 0x1x1}} {x101x \ {x1010, 1101x, 0101x}, x1xx1 \ {x11x1, 11001, 11x01}} { x10110xx11 \ { x10110xx11, x10110x011, x10110x111, 110110xx11, 010110xx11}, x1xx10xxx1 \ { x1x110xx01, x1x010xx11, x1xx10xx11, x1xx10x0x1, x1xx10x1x1, x11x10xxx1, 110010xxx1, 11x010xxx1}} {x0100 \ {00100, 10100, 10100}} {} {} {0x10x \ {0x100, 00100, 00100}, xx010 \ {11010, 00010, x1010}, x0x10 \ {x0010, 00110, x0110}} {xxx01 \ {01x01, 10101, 11101}, 0xx10 \ {0x110, 00010, 01110}} { xxx010x101 \ { 01x010x101, 101010x101, 111010x101}, 0xx10xx010 \ { 0xx1011010, 0xx1000010, 0xx10x1010, 0x110xx010, 00010xx010, 01110xx010}, 0xx10x0x10 \ { 0xx10x0010, 0xx1000110, 0xx10x0110, 0x110x0x10, 00010x0x10, 01110x0x10}} {x0100 \ {00100, 10100}, x1001 \ {01001}} {} {} {x10x0 \ {x1010, 11010, 01010}} {00xx1 \ {00101, 001x1}} {} {00x1x \ {00x11, 00010, 00111}, x1xx1 \ {x1001, x1111, 01xx1}, 101xx \ {101x1, 101x0, 10100}} {} {} {xxxxx \ {10110, xxx0x, x11x1}, x0x01 \ {10101, 10001, 00001}} {0x0xx \ {01011, 00011, 010xx}, 01x0x \ {01001, 0100x, 01101}, xx0x1 \ {11011, 0x0x1, 1x011}} { 0x0xxxxxxx \ { 0x0x1xxxx0, 0x0x0xxxx1, 0x01xxxx0x, 0x00xxxx1x, 0x0xx10110, 0x0xxxxx0x, 0x0xxx11x1, 01011xxxxx, 00011xxxxx, 010xxxxxxx}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xxxx0x, 01x0xx1101, 01001xxx0x, 0100xxxx0x, 01101xxx0x}, xx0x1xxxx1 \ { xx011xxx01, xx001xxx11, xx0x1xxx01, xx0x1x11x1, 11011xxxx1, 0x0x1xxxx1, 1x011xxxx1}, 0x001x0x01 \ { 0x00110101, 0x00110001, 0x00100001, 01001x0x01}, 01x01x0x01 \ { 01x0110101, 01x0110001, 01x0100001, 01001x0x01, 01001x0x01, 01101x0x01}, xx001x0x01 \ { xx00110101, xx00110001, xx00100001, 0x001x0x01}} {xxxx0 \ {x0010, 0xxx0, 000x0}, xx1xx \ {00101, 0111x, 10101}} {x0101 \ {00101, 10101}} { x0101xx101 \ { x010100101, x010110101, 00101xx101, 10101xx101}} {10xx1 \ {100x1, 10001, 10001}} {} {} {0x111 \ {01111, 00111}, 00x1x \ {00111, 00x11, 00110}, xx1x1 \ {01111, xx111, 0x111}} {1011x \ {10111, 10110}, xx1x1 \ {011x1, 11101, 10111}, x0x1x \ {10x1x, x0111, x011x}} { 101110x111 \ { 1011101111, 1011100111, 101110x111}, xx1110x111 \ { xx11101111, xx11100111, 011110x111, 101110x111}, x0x110x111 \ { x0x1101111, x0x1100111, 10x110x111, x01110x111, x01110x111}, 1011x00x1x \ { 1011100x10, 1011000x11, 1011x00111, 1011x00x11, 1011x00110, 1011100x1x, 1011000x1x}, xx11100x11 \ { xx11100111, xx11100x11, 0111100x11, 1011100x11}, x0x1x00x1x \ { x0x1100x10, x0x1000x11, x0x1x00111, x0x1x00x11, x0x1x00110, 10x1x00x1x, x011100x1x, x011x00x1x}, 10111xx111 \ { 1011101111, 10111xx111, 101110x111, 10111xx111}, xx1x1xx1x1 \ { xx111xx101, xx101xx111, xx1x101111, xx1x1xx111, xx1x10x111, 011x1xx1x1, 11101xx1x1, 10111xx1x1}, x0x11xx111 \ { x0x1101111, x0x11xx111, x0x110x111, 10x11xx111, x0111xx111, x0111xx111}} {0110x \ {01101, 01100}} {xx0x1 \ {00011, 100x1, 110x1}, 01xx1 \ {011x1, 01001, 010x1}} { xx00101101 \ { xx00101101, 1000101101, 1100101101}, 01x0101101 \ { 01x0101101, 0110101101, 0100101101, 0100101101}} {111x0 \ {11100, 11110}, xx101 \ {0x101, 00101, 11101}} {xxx01 \ {10101, 10x01, 0x101}} { xxx01xx101 \ { xxx010x101, xxx0100101, xxx0111101, 10101xx101, 10x01xx101, 0x101xx101}} {} {0xx0x \ {0xx01, 00001}} {} {1xx1x \ {11110, 1xx11, 1111x}, 00x10 \ {00010}, 0x1x0 \ {011x0, 00100, 00100}} {x0011 \ {00011, 10011}, xxx0x \ {00x01, 0110x, 0100x}} { x00111xx11 \ { x00111xx11, x001111111, 000111xx11, 100111xx11}, xxx000x100 \ { xxx0001100, xxx0000100, xxx0000100, 011000x100, 010000x100}} {01x11 \ {01111}} {0x0xx \ {00001, 000x1, 010x1}} { 0x01101x11 \ { 0x01101111, 0001101x11, 0101101x11}} {10x00 \ {10000, 10100, 10100}, 00x00 \ {00100, 00000}, x10xx \ {0101x, 11001, 010x0}} {01x1x \ {01x11, 0111x, 01111}, 100x0 \ {10000, 10010}} { 1000010x00 \ { 1000010000, 1000010100, 1000010100, 1000010x00}, 1000000x00 \ { 1000000100, 1000000000, 1000000x00}, 01x1xx101x \ { 01x11x1010, 01x10x1011, 01x1x0101x, 01x1x01010, 01x11x101x, 0111xx101x, 01111x101x}, 100x0x10x0 \ { 10010x1000, 10000x1010, 100x001010, 100x0010x0, 10000x10x0, 10010x10x0}} {01x00 \ {01100, 01000}, x1x0x \ {11101, 11x00, 01000}} {01xx0 \ {010x0, 01110, 01x00}} { 01x0001x00 \ { 01x0001100, 01x0001000, 0100001x00, 01x0001x00}, 01x00x1x00 \ { 01x0011x00, 01x0001000, 01000x1x00, 01x00x1x00}} {x11xx \ {011x1, x111x, x110x}, 01x11 \ {01111, 01011, 01011}} {000x1 \ {00011, 00001, 00001}} { 000x1x11x1 \ { 00011x1101, 00001x1111, 000x1011x1, 000x1x1111, 000x1x1101, 00011x11x1, 00001x11x1, 00001x11x1}, 0001101x11 \ { 0001101111, 0001101011, 0001101011, 0001101x11}} {1xx01 \ {11x01, 10x01, 10101}, 1x1x0 \ {1x100, 11100, 1x110}} {} {} {xxx11 \ {10111, xx111}, 1x101 \ {11101, 10101, 10101}} {x1x0x \ {x1x01, x110x, 11x00}} { x1x011x101 \ { x1x0111101, x1x0110101, x1x0110101, x1x011x101, x11011x101}} {010xx \ {010x1, 0101x, 01000}} {0xx1x \ {01111, 01x10, 01x11}} { 0xx1x0101x \ { 0xx1101010, 0xx1001011, 0xx1x01011, 0xx1x0101x, 011110101x, 01x100101x, 01x110101x}} {} {1xx1x \ {10x11, 1x010, 10011}, x1xx0 \ {01100, x1x00, 11xx0}} {} {00x1x \ {00x10, 00111, 00011}} {x010x \ {00101, 0010x, 10101}} {} {1x1x0 \ {1x100, 101x0, 111x0}, 1xx11 \ {11x11, 1x011, 10111}} {0xx00 \ {0x000, 01000, 01000}, 1x101 \ {11101}} { 0xx001x100 \ { 0xx001x100, 0xx0010100, 0xx0011100, 0x0001x100, 010001x100, 010001x100}} {1x11x \ {1x111, 10111, 1011x}, 0xxxx \ {00x0x, 0xx00, 00x10}} {x1x11 \ {01x11, 11011, 11011}, xx0xx \ {010xx, xx001, x101x}} { x1x111x111 \ { x1x111x111, x1x1110111, x1x1110111, 01x111x111, 110111x111, 110111x111}, xx01x1x11x \ { xx0111x110, xx0101x111, xx01x1x111, xx01x10111, xx01x1011x, 0101x1x11x, x101x1x11x}, x1x110xx11 \ { 01x110xx11, 110110xx11, 110110xx11}, xx0xx0xxxx \ { xx0x10xxx0, xx0x00xxx1, xx01x0xx0x, xx00x0xx1x, xx0xx00x0x, xx0xx0xx00, xx0xx00x10, 010xx0xxxx, xx0010xxxx, x101x0xxxx}} {xx110 \ {0x110, 1x110}, 10x10 \ {10010, 10110, 10110}} {} {} {1xx11 \ {11011, 11111, 10x11}, x0111 \ {10111, 00111, 00111}} {0xxxx \ {0x01x, 01101, 00x00}, 0x0x1 \ {010x1, 00011, 01011}, x1xxx \ {01110, 110x1, 11110}} { 0xx111xx11 \ { 0xx1111011, 0xx1111111, 0xx1110x11, 0x0111xx11}, 0x0111xx11 \ { 0x01111011, 0x01111111, 0x01110x11, 010111xx11, 000111xx11, 010111xx11}, x1x111xx11 \ { x1x1111011, x1x1111111, x1x1110x11, 110111xx11}, 0xx11x0111 \ { 0xx1110111, 0xx1100111, 0xx1100111, 0x011x0111}, 0x011x0111 \ { 0x01110111, 0x01100111, 0x01100111, 01011x0111, 00011x0111, 01011x0111}, x1x11x0111 \ { x1x1110111, x1x1100111, x1x1100111, 11011x0111}} {1x1x1 \ {111x1, 11101, 11111}, 1100x \ {11001}, 0001x \ {00011, 00010, 00010}} {10xx0 \ {10010, 100x0, 10x10}, xx01x \ {00010, xx011, xx011}} { xx0111x111 \ { xx01111111, xx01111111, xx0111x111, xx0111x111}, 10x0011000 \ { 1000011000}, 10x1000010 \ { 10x1000010, 10x1000010, 1001000010, 1001000010, 10x1000010}, xx01x0001x \ { xx01100010, xx01000011, xx01x00011, xx01x00010, xx01x00010, 000100001x, xx0110001x, xx0110001x}} {x01x1 \ {x0111, 10101, x0101}} {0xx00 \ {01100, 01000, 01x00}, x100x \ {01001, x1001, 01000}, 0xxx0 \ {001x0, 0x0x0, 00110}} { x1001x0101 \ { x100110101, x1001x0101, 01001x0101, x1001x0101}} {xx001 \ {00001, 1x001}, x0x1x \ {00011, 10x1x, 10x10}, xx100 \ {1x100, 11100, 0x100}} {x1001 \ {01001}, x00xx \ {10011, 00010, 0000x}} { x1001xx001 \ { x100100001, x10011x001, 01001xx001}, x0001xx001 \ { x000100001, x00011x001, 00001xx001}, x001xx0x1x \ { x0011x0x10, x0010x0x11, x001x00011, x001x10x1x, x001x10x10, 10011x0x1x, 00010x0x1x}, x0000xx100 \ { x00001x100, x000011100, x00000x100, 00000xx100}} {01xx1 \ {01011, 01111, 01x11}} {1xx0x \ {11x0x, 1xx01}, x101x \ {x1011, 1101x, 1101x}} { 1xx0101x01 \ { 11x0101x01, 1xx0101x01}, x101101x11 \ { x101101011, x101101111, x101101x11, x101101x11, 1101101x11, 1101101x11}} {xxx0x \ {00101, 1x100, xx001}} {} {} {00xx0 \ {00100, 00110, 00010}, xxx1x \ {1xx1x, 11010, 00110}} {1x01x \ {1x011, 1x010, 10010}, xx0x0 \ {01000, x0010, 1x000}} { 1x01000x10 \ { 1x01000110, 1x01000010, 1x01000x10, 1001000x10}, xx0x000xx0 \ { xx01000x00, xx00000x10, xx0x000100, xx0x000110, xx0x000010, 0100000xx0, x001000xx0, 1x00000xx0}, 1x01xxxx1x \ { 1x011xxx10, 1x010xxx11, 1x01x1xx1x, 1x01x11010, 1x01x00110, 1x011xxx1x, 1x010xxx1x, 10010xxx1x}, xx010xxx10 \ { xx0101xx10, xx01011010, xx01000110, x0010xxx10}} {xxx10 \ {0x110, 1x010, x1010}, 0x01x \ {00010, 01011, 0001x}} {00xxx \ {000x0, 0001x, 001xx}} { 00x10xxx10 \ { 00x100x110, 00x101x010, 00x10x1010, 00010xxx10, 00010xxx10, 00110xxx10}, 00x1x0x01x \ { 00x110x010, 00x100x011, 00x1x00010, 00x1x01011, 00x1x0001x, 000100x01x, 0001x0x01x, 0011x0x01x}} {10x10 \ {10010, 10110, 10110}} {1xx1x \ {1xx10, 10x11, 1x01x}, 1xx0x \ {11000, 1x00x, 11001}, x1011 \ {01011}} { 1xx1010x10 \ { 1xx1010010, 1xx1010110, 1xx1010110, 1xx1010x10, 1x01010x10}} {0111x \ {01110, 01111}, xx1x0 \ {00100, 1x100, 1x110}} {} {} {0x011 \ {01011}} {xx100 \ {00100, 0x100, x0100}} {} {1xx01 \ {11x01, 10101, 10101}, xx00x \ {01001, x1000, 0100x}, xxx1x \ {x0011, 1011x, 10111}} {1xx0x \ {1x101, 10000, 1x001}} { 1xx011xx01 \ { 1xx0111x01, 1xx0110101, 1xx0110101, 1x1011xx01, 1x0011xx01}, 1xx0xxx00x \ { 1xx01xx000, 1xx00xx001, 1xx0x01001, 1xx0xx1000, 1xx0x0100x, 1x101xx00x, 10000xx00x, 1x001xx00x}} {0xxx1 \ {01111, 00x11, 010x1}} {} {} {x0100 \ {10100, 00100}} {x11x1 \ {111x1, x1101}, x1x00 \ {x1000, 11000, 01x00}} { x1x00x0100 \ { x1x0010100, x1x0000100, x1000x0100, 11000x0100, 01x00x0100}} {x1100 \ {11100, 01100, 01100}, x0x0x \ {10x00, x0100, 10x01}, 1xxx0 \ {110x0, 111x0, 1x110}} {01xx1 \ {01011, 01101}, 0xx01 \ {01x01, 00x01, 00x01}} { 01x01x0x01 \ { 01x0110x01, 01101x0x01}, 0xx01x0x01 \ { 0xx0110x01, 01x01x0x01, 00x01x0x01, 00x01x0x01}} {x001x \ {x0010, 00010, 1001x}, x0001 \ {10001, 00001}} {011xx \ {011x0, 01111}, 11xxx \ {11x01, 110xx, 11xx1}} { 0111xx001x \ { 01111x0010, 01110x0011, 0111xx0010, 0111x00010, 0111x1001x, 01110x001x, 01111x001x}, 11x1xx001x \ { 11x11x0010, 11x10x0011, 11x1xx0010, 11x1x00010, 11x1x1001x, 1101xx001x, 11x11x001x}, 01101x0001 \ { 0110110001, 0110100001}, 11x01x0001 \ { 11x0110001, 11x0100001, 11x01x0001, 11001x0001, 11x01x0001}} {11x01 \ {11101, 11001, 11001}} {x1xxx \ {01xx0, 11x10, 01010}} { x1x0111x01 \ { x1x0111101, x1x0111001, x1x0111001}} {x1x10 \ {11110, x1110, 01x10}} {0x11x \ {0x111, 00111, 0111x}} { 0x110x1x10 \ { 0x11011110, 0x110x1110, 0x11001x10, 01110x1x10}} {10x1x \ {10011, 10111, 1001x}} {x10x0 \ {01010, 01000, 110x0}, xx1x1 \ {01101, x0101, 11111}} { x101010x10 \ { x101010010, 0101010x10, 1101010x10}, xx11110x11 \ { xx11110011, xx11110111, xx11110011, 1111110x11}} {0110x \ {01100, 01101, 01101}, 11x01 \ {11001, 11101}} {xx01x \ {x101x, 10010, 01010}, 1x01x \ {11010, 1x010, 10011}, x1xxx \ {110x0, 11011, x11xx}} { x1x0x0110x \ { x1x0101100, x1x0001101, x1x0x01100, x1x0x01101, x1x0x01101, 110000110x, x110x0110x}, x1x0111x01 \ { x1x0111001, x1x0111101, x110111x01}} {x00xx \ {10001, x001x, 00011}, x1000 \ {11000, 01000, 01000}, 0x1x0 \ {01110, 0x110, 0x110}} {0xx1x \ {0x110, 0x010, 0001x}, 0101x \ {01010, 01011}} { 0xx1xx001x \ { 0xx11x0010, 0xx10x0011, 0xx1xx001x, 0xx1x00011, 0x110x001x, 0x010x001x, 0001xx001x}, 0101xx001x \ { 01011x0010, 01010x0011, 0101xx001x, 0101x00011, 01010x001x, 01011x001x}, 0xx100x110 \ { 0xx1001110, 0xx100x110, 0xx100x110, 0x1100x110, 0x0100x110, 000100x110}, 010100x110 \ { 0101001110, 010100x110, 010100x110, 010100x110}} {} {} {} {x1x11 \ {01x11, 11011, 11111}} {} {} {} {10xxx \ {10x00, 101x0, 1010x}, xx100 \ {00100, 10100, 01100}} {} {00xx1 \ {00x11, 00111, 00111}, 11x00 \ {11100}} {11xxx \ {110x0, 11110, 11x11}, x0x1x \ {x0111, 00011}} { 11xx100xx1 \ { 11x1100x01, 11x0100x11, 11xx100x11, 11xx100111, 11xx100111, 11x1100xx1}, x0x1100x11 \ { x0x1100x11, x0x1100111, x0x1100111, x011100x11, 0001100x11}, 11x0011x00 \ { 11x0011100, 1100011x00}} {1xx0x \ {11001, 11000, 10x00}, x00x0 \ {00000, x0010, 10000}} {1x1x1 \ {11111, 1x101, 10111}} { 1x1011xx01 \ { 1x10111001, 1x1011xx01}} {xxx0x \ {x0x01, 01101, 1000x}, xxx11 \ {x1111, x0x11, xx111}, 11xx0 \ {11x00, 111x0, 11x10}} {xxx0x \ {1x101, 10001, 0x001}, 0x01x \ {01010, 01011}, 1110x \ {11101, 11100}} { xxx0xxxx0x \ { xxx01xxx00, xxx00xxx01, xxx0xx0x01, xxx0x01101, xxx0x1000x, 1x101xxx0x, 10001xxx0x, 0x001xxx0x}, 1110xxxx0x \ { 11101xxx00, 11100xxx01, 1110xx0x01, 1110x01101, 1110x1000x, 11101xxx0x, 11100xxx0x}, 0x011xxx11 \ { 0x011x1111, 0x011x0x11, 0x011xx111, 01011xxx11}, xxx0011x00 \ { xxx0011x00, xxx0011100}, 0x01011x10 \ { 0x01011110, 0x01011x10, 0101011x10}, 1110011x00 \ { 1110011x00, 1110011100, 1110011x00}} {xx001 \ {x1001, 00001, 01001}, 11xx1 \ {11x01, 11x11}} {0000x \ {00001, 00000}} { 00001xx001 \ { 00001x1001, 0000100001, 0000101001, 00001xx001}, 0000111x01 \ { 0000111x01, 0000111x01}} {x000x \ {x0000, 00001, 00000}, xx110 \ {01110, 0x110, x1110}} {x10x0 \ {11010, 01010, 11000}} { x1000x0000 \ { x1000x0000, x100000000, 11000x0000}, x1010xx110 \ { x101001110, x10100x110, x1010x1110, 11010xx110, 01010xx110}} {xx110 \ {1x110, 00110}} {xx0xx \ {11000, xx01x, 00010}} { xx010xx110 \ { xx0101x110, xx01000110, xx010xx110, 00010xx110}} {x0x10 \ {x0110, 00110, 00x10}, x0xxx \ {00x1x, 00101, 100x1}} {x0xxx \ {00110, 10101, x00xx}, x1110 \ {01110}} { x0x10x0x10 \ { x0x10x0110, x0x1000110, x0x1000x10, 00110x0x10, x0010x0x10}, x0xxxx0xxx \ { x0xx1x0xx0, x0xx0x0xx1, x0x1xx0x0x, x0x0xx0x1x, x0xxx00x1x, x0xxx00101, x0xxx100x1, 00110x0xxx, 10101x0xxx, x00xxx0xxx}, x1110x0x10 \ { x111000x10, 01110x0x10}} {x1110 \ {11110, 01110}} {x11x0 \ {011x0, 11110, 11100}} { x1110x1110 \ { x111011110, x111001110, 01110x1110, 11110x1110}} {100x1 \ {10001}, 0xxxx \ {01x01, 00x10, 0xxx1}} {0x0x0 \ {00010, 0x010, 0x000}, 1xx0x \ {10001, 10101, 10000}} { 1xx0110001 \ { 1xx0110001, 1000110001, 1010110001}, 0x0x00xxx0 \ { 0x0100xx00, 0x0000xx10, 0x0x000x10, 000100xxx0, 0x0100xxx0, 0x0000xxx0}, 1xx0x0xx0x \ { 1xx010xx00, 1xx000xx01, 1xx0x01x01, 1xx0x0xx01, 100010xx0x, 101010xx0x, 100000xx0x}} {00x00 \ {00000, 00100}, 00x00 \ {00000, 00100}, 1xxx0 \ {10x10, 10000, 11x10}} {01x1x \ {01010, 01x11, 01x11}} { 01x101xx10 \ { 01x1010x10, 01x1011x10, 010101xx10}} {00x0x \ {0000x, 00000, 00101}, x1101 \ {11101, 01101}} {0x110 \ {01110, 00110, 00110}, 1x100 \ {11100, 10100}} { 1x10000x00 \ { 1x10000000, 1x10000000, 1110000x00, 1010000x00}} {1x0xx \ {1x001, 1100x, 11011}, x0x10 \ {10x10, 00110, x0110}} {1101x \ {11010, 11011, 11011}, 00xxx \ {0000x, 00101, 00100}, x11x0 \ {01100, x1100, 111x0}} { 1101x1x01x \ { 110111x010, 110101x011, 1101x11011, 110101x01x, 110111x01x, 110111x01x}, 00xxx1x0xx \ { 00xx11x0x0, 00xx01x0x1, 00x1x1x00x, 00x0x1x01x, 00xxx1x001, 00xxx1100x, 00xxx11011, 0000x1x0xx, 001011x0xx, 001001x0xx}, x11x01x0x0 \ { x11101x000, x11001x010, x11x011000, 011001x0x0, x11001x0x0, 111x01x0x0}, 11010x0x10 \ { 1101010x10, 1101000110, 11010x0110, 11010x0x10}, 00x10x0x10 \ { 00x1010x10, 00x1000110, 00x10x0110}, x1110x0x10 \ { x111010x10, x111000110, x1110x0110, 11110x0x10}} {xx111 \ {x1111, x0111, 01111}, 1xxxx \ {10111, 100x0, 11x00}} {xx001 \ {00001, x1001, 01001}, 0x10x \ {00100, 0x100, 00101}} { xx0011xx01 \ { 000011xx01, x10011xx01, 010011xx01}, 0x10x1xx0x \ { 0x1011xx00, 0x1001xx01, 0x10x10000, 0x10x11x00, 001001xx0x, 0x1001xx0x, 001011xx0x}} {0xx11 \ {01011, 01111, 01x11}} {x111x \ {x1111, 11111, 11110}} { x11110xx11 \ { x111101011, x111101111, x111101x11, x11110xx11, 111110xx11}} {x11x0 \ {011x0, 01110, x1110}, 01xx1 \ {01x01, 01011}} {0xxxx \ {00001, 011x1, 0x011}, 1x0x0 \ {10010, 1x000, 110x0}} { 0xxx0x11x0 \ { 0xx10x1100, 0xx00x1110, 0xxx0011x0, 0xxx001110, 0xxx0x1110}, 1x0x0x11x0 \ { 1x010x1100, 1x000x1110, 1x0x0011x0, 1x0x001110, 1x0x0x1110, 10010x11x0, 1x000x11x0, 110x0x11x0}, 0xxx101xx1 \ { 0xx1101x01, 0xx0101x11, 0xxx101x01, 0xxx101011, 0000101xx1, 011x101xx1, 0x01101xx1}} {1x0xx \ {1x010, 11001, 10010}, 0x1x0 \ {0x110, 01110}} {} {} {10x1x \ {10x11, 10010, 10010}} {110x0 \ {11010, 11000}} { 1101010x10 \ { 1101010010, 1101010010, 1101010x10}} {01x1x \ {01x11, 01x10, 0101x}, 10xx1 \ {10001, 101x1}} {xxx00 \ {10x00, 00000, 01000}, 110xx \ {1100x, 11001}} { 1101x01x1x \ { 1101101x10, 1101001x11, 1101x01x11, 1101x01x10, 1101x0101x}, 110x110xx1 \ { 1101110x01, 1100110x11, 110x110001, 110x1101x1, 1100110xx1, 1100110xx1}} {} {xx01x \ {11011, 1x010, 1x010}, 01x0x \ {01x00, 01000, 01x01}} {} {01x0x \ {01000, 01x01, 0100x}} {01x10 \ {01010, 01110, 01110}, 1x1x1 \ {111x1, 1x101}} { 1x10101x01 \ { 1x10101x01, 1x10101001, 1110101x01, 1x10101x01}} {000xx \ {0000x, 00001, 000x0}} {xx111 \ {0x111, 01111, 10111}, x1x1x \ {01011, 01x11, 11011}} { xx11100011 \ { 0x11100011, 0111100011, 1011100011}, x1x1x0001x \ { x1x1100010, x1x1000011, x1x1x00010, 010110001x, 01x110001x, 110110001x}} {xx11x \ {00111, x1111, x0111}, x10xx \ {x10x0, 01001, 0101x}} {x111x \ {11110, x1111, 01111}} { x111xxx11x \ { x1111xx110, x1110xx111, x111x00111, x111xx1111, x111xx0111, 11110xx11x, x1111xx11x, 01111xx11x}, x111xx101x \ { x1111x1010, x1110x1011, x111xx1010, x111x0101x, 11110x101x, x1111x101x, 01111x101x}} {} {x1110 \ {01110, 11110, 11110}, x000x \ {10001, 1000x, 0000x}} {} {x0xx0 \ {100x0, x0x10, x0110}, 0x0xx \ {0101x, 00010, 0x011}} {x00x1 \ {000x1, x0001, x0001}, 0x1xx \ {0x1x1, 0x11x, 0x1x0}, 10xxx \ {101x1, 10000, 10x01}} { 0x1x0x0xx0 \ { 0x110x0x00, 0x100x0x10, 0x1x0100x0, 0x1x0x0x10, 0x1x0x0110, 0x110x0xx0, 0x1x0x0xx0}, 10xx0x0xx0 \ { 10x10x0x00, 10x00x0x10, 10xx0100x0, 10xx0x0x10, 10xx0x0110, 10000x0xx0}, x00x10x0x1 \ { x00110x001, x00010x011, x00x101011, x00x10x011, 000x10x0x1, x00010x0x1, x00010x0x1}, 0x1xx0x0xx \ { 0x1x10x0x0, 0x1x00x0x1, 0x11x0x00x, 0x10x0x01x, 0x1xx0101x, 0x1xx00010, 0x1xx0x011, 0x1x10x0xx, 0x11x0x0xx, 0x1x00x0xx}, 10xxx0x0xx \ { 10xx10x0x0, 10xx00x0x1, 10x1x0x00x, 10x0x0x01x, 10xxx0101x, 10xxx00010, 10xxx0x011, 101x10x0xx, 100000x0xx, 10x010x0xx}} {x000x \ {10001, 00000, 1000x}} {} {} {0xxx0 \ {00x00, 00xx0, 0x0x0}} {x1x0x \ {11x0x, 11101, x100x}, xxxxx \ {1xxx0, 0x101, 11000}, xxx10 \ {01010, 1xx10, 11x10}} { x1x000xx00 \ { x1x0000x00, x1x0000x00, x1x000x000, 11x000xx00, x10000xx00}, xxxx00xxx0 \ { xxx100xx00, xxx000xx10, xxxx000x00, xxxx000xx0, xxxx00x0x0, 1xxx00xxx0, 110000xxx0}, xxx100xx10 \ { xxx1000x10, xxx100x010, 010100xx10, 1xx100xx10, 11x100xx10}} {x0xx0 \ {00110, 101x0, x0010}, 1xx10 \ {11010, 10x10, 10010}} {0x10x \ {01100, 0110x, 00100}, 0x11x \ {00111, 00110, 0x111}} { 0x100x0x00 \ { 0x10010100, 01100x0x00, 01100x0x00, 00100x0x00}, 0x110x0x10 \ { 0x11000110, 0x11010110, 0x110x0010, 00110x0x10}, 0x1101xx10 \ { 0x11011010, 0x11010x10, 0x11010010, 001101xx10}} {x1x10 \ {11x10, 11110, x1010}, x10xx \ {010xx, x100x, 01001}} {} {} {0x1xx \ {001xx, 01100}, x110x \ {x1100, 1110x, 0110x}} {10x00 \ {10100}} { 10x000x100 \ { 10x0000100, 10x0001100, 101000x100}, 10x00x1100 \ { 10x00x1100, 10x0011100, 10x0001100, 10100x1100}} {x00xx \ {100x0, 00001, 10000}} {xx00x \ {11001, 00000, xx000}} { xx00xx000x \ { xx001x0000, xx000x0001, xx00x10000, xx00x00001, xx00x10000, 11001x000x, 00000x000x, xx000x000x}} {x00xx \ {x00x0, x001x}, 0010x \ {00101, 00100}, 011xx \ {011x0, 01100, 01100}} {01xxx \ {0111x, 0110x, 011x0}, x001x \ {10011, 00010}, xxx0x \ {00100, 01x01, 11x0x}} { 01xxxx00xx \ { 01xx1x00x0, 01xx0x00x1, 01x1xx000x, 01x0xx001x, 01xxxx00x0, 01xxxx001x, 0111xx00xx, 0110xx00xx, 011x0x00xx}, x001xx001x \ { x0011x0010, x0010x0011, x001xx0010, x001xx001x, 10011x001x, 00010x001x}, xxx0xx000x \ { xxx01x0000, xxx00x0001, xxx0xx0000, 00100x000x, 01x01x000x, 11x0xx000x}, 01x0x0010x \ { 01x0100100, 01x0000101, 01x0x00101, 01x0x00100, 0110x0010x, 011000010x}, xxx0x0010x \ { xxx0100100, xxx0000101, xxx0x00101, xxx0x00100, 001000010x, 01x010010x, 11x0x0010x}, 01xxx011xx \ { 01xx1011x0, 01xx0011x1, 01x1x0110x, 01x0x0111x, 01xxx011x0, 01xxx01100, 01xxx01100, 0111x011xx, 0110x011xx, 011x0011xx}, x001x0111x \ { x001101110, x001001111, x001x01110, 100110111x, 000100111x}, xxx0x0110x \ { xxx0101100, xxx0001101, xxx0x01100, xxx0x01100, xxx0x01100, 001000110x, 01x010110x, 11x0x0110x}} {10xx1 \ {10111, 10001, 101x1}, 0111x \ {01110, 01111, 01111}, 010xx \ {010x1, 01000, 01011}} {1xx1x \ {11x10, 1x110}} { 1xx1110x11 \ { 1xx1110111, 1xx1110111}, 1xx1x0111x \ { 1xx1101110, 1xx1001111, 1xx1x01110, 1xx1x01111, 1xx1x01111, 11x100111x, 1x1100111x}, 1xx1x0101x \ { 1xx1101010, 1xx1001011, 1xx1x01011, 1xx1x01011, 11x100101x, 1x1100101x}} {x1xxx \ {x111x, 11000, 0111x}} {0xx1x \ {0x111, 00111, 00010}} { 0xx1xx1x1x \ { 0xx11x1x10, 0xx10x1x11, 0xx1xx111x, 0xx1x0111x, 0x111x1x1x, 00111x1x1x, 00010x1x1x}} {00xxx \ {001x0, 0010x, 00x11}} {} {} {1x11x \ {1x111, 1x110, 1111x}} {0x0xx \ {0x00x, 0x0x1, 0100x}, x1000 \ {01000, 11000}} { 0x01x1x11x \ { 0x0111x110, 0x0101x111, 0x01x1x111, 0x01x1x110, 0x01x1111x, 0x0111x11x}} {111xx \ {11101, 11110, 11111}, xxx10 \ {01x10, 11010, 01110}} {x1x10 \ {01x10, x1110, 01110}} { x1x1011110 \ { x1x1011110, 01x1011110, x111011110, 0111011110}, x1x10xxx10 \ { x1x1001x10, x1x1011010, x1x1001110, 01x10xxx10, x1110xxx10, 01110xxx10}} {x0xx1 \ {x01x1, 10011}, x00x1 \ {10001, x0001}} {100xx \ {1000x, 10010, 10011}} { 100x1x0xx1 \ { 10011x0x01, 10001x0x11, 100x1x01x1, 100x110011, 10001x0xx1, 10011x0xx1}, 100x1x00x1 \ { 10011x0001, 10001x0011, 100x110001, 100x1x0001, 10001x00x1, 10011x00x1}} {} {} {} {11xxx \ {11101, 11x11, 11x10}} {xxx1x \ {0011x, 11x10, x0x1x}} { xxx1x11x1x \ { xxx1111x10, xxx1011x11, xxx1x11x11, xxx1x11x10, 0011x11x1x, 11x1011x1x, x0x1x11x1x}} {xxx1x \ {xxx11, 01x1x, 11x10}} {xxxx0 \ {10x10, 01x10, x11x0}, xx011 \ {x0011, 01011, x1011}} { xxx10xxx10 \ { xxx1001x10, xxx1011x10, 10x10xxx10, 01x10xxx10, x1110xxx10}, xx011xxx11 \ { xx011xxx11, xx01101x11, x0011xxx11, 01011xxx11, x1011xxx11}} {x101x \ {01011, 1101x, 0101x}, 0x11x \ {0x111, 0011x, 01111}} {011x1 \ {01101, 01111}} { 01111x1011 \ { 0111101011, 0111111011, 0111101011, 01111x1011}, 011110x111 \ { 011110x111, 0111100111, 0111101111, 011110x111}} {} {1xxxx \ {110x0, 11011, 1001x}, x0001 \ {00001, 10001, 10001}} {} {11xxx \ {1111x, 11x1x, 110xx}, 1x11x \ {10111, 1111x}, 1xx10 \ {11x10, 1x010}} {} {} {010xx \ {01000, 010x1}} {0x01x \ {0x010, 0101x}} { 0x01x0101x \ { 0x01101010, 0x01001011, 0x01x01011, 0x0100101x, 0101x0101x}} {x1x0x \ {x100x, 01x0x, 01101}} {0xxx0 \ {0x010, 001x0, 00000}, 101x0 \ {10110}} { 0xx00x1x00 \ { 0xx00x1000, 0xx0001x00, 00100x1x00, 00000x1x00}, 10100x1x00 \ { 10100x1000, 1010001x00}} {0x1x0 \ {001x0, 0x110, 01100}} {0x0x1 \ {01011, 000x1, 010x1}} {} {xx010 \ {0x010, 11010, 01010}, x1101 \ {11101, 01101}} {x1x1x \ {x1010, 0111x, 01x1x}} { x1x10xx010 \ { x1x100x010, x1x1011010, x1x1001010, x1010xx010, 01110xx010, 01x10xx010}} {x10xx \ {11001, 0101x, 010xx}, x100x \ {0100x, 11000, 11000}} {1x01x \ {1x011, 11011, 10011}, 111x1 \ {11111}} { 1x01xx101x \ { 1x011x1010, 1x010x1011, 1x01x0101x, 1x01x0101x, 1x011x101x, 11011x101x, 10011x101x}, 111x1x10x1 \ { 11111x1001, 11101x1011, 111x111001, 111x101011, 111x1010x1, 11111x10x1}, 11101x1001 \ { 1110101001}} {xx100 \ {x1100, x0100, x0100}} {x11x1 \ {111x1, 011x1}, 1111x \ {11110, 11111}, 01x1x \ {0101x, 01111}} {} {00xx0 \ {00x10, 00x00, 00110}, xxx11 \ {x0011, x1011, xx011}} {0xx00 \ {00x00, 0x000, 0x100}, 1x10x \ {10101, 11101, 11101}} { 0xx0000x00 \ { 0xx0000x00, 00x0000x00, 0x00000x00, 0x10000x00}, 1x10000x00 \ { 1x10000x00}} {1xx10 \ {10x10, 10110, 10110}, 1xx00 \ {11100, 1x000, 1x100}} {xx01x \ {00010, 11011, x001x}} { xx0101xx10 \ { xx01010x10, xx01010110, xx01010110, 000101xx10, x00101xx10}} {} {1x00x \ {1x001, 11000, 11001}} {} {x0x0x \ {10101, 1000x, x0001}} {1xxx1 \ {11111, 11001, 101x1}} { 1xx01x0x01 \ { 1xx0110101, 1xx0110001, 1xx01x0001, 11001x0x01, 10101x0x01}} {11x0x \ {11x00, 1100x, 11100}} {xx110 \ {11110, 01110, 01110}} {} {x010x \ {10101, 0010x, x0101}, x1x0x \ {x1001, 01100, x1x01}} {1010x \ {10100}, 000x1 \ {00011, 00001}} { 1010xx010x \ { 10101x0100, 10100x0101, 1010x10101, 1010x0010x, 1010xx0101, 10100x010x}, 00001x0101 \ { 0000110101, 0000100101, 00001x0101, 00001x0101}, 1010xx1x0x \ { 10101x1x00, 10100x1x01, 1010xx1001, 1010x01100, 1010xx1x01, 10100x1x0x}, 00001x1x01 \ { 00001x1001, 00001x1x01, 00001x1x01}} {xx011 \ {0x011, 00011, 1x011}} {0011x \ {00111}, 00xxx \ {00110, 00x0x, 00011}, x0x0x \ {00101, 10000, 10101}} { 00111xx011 \ { 001110x011, 0011100011, 001111x011, 00111xx011}, 00x11xx011 \ { 00x110x011, 00x1100011, 00x111x011, 00011xx011}} {1x11x \ {1x111, 11110}, xx01x \ {1x010, 0001x, 11010}, x0x10 \ {00x10, 10110}} {xx1x1 \ {x0111, 0x1x1, 10111}, xx0x1 \ {11011, 1x001, 01011}} { xx1111x111 \ { xx1111x111, x01111x111, 0x1111x111, 101111x111}, xx0111x111 \ { xx0111x111, 110111x111, 010111x111}, xx111xx011 \ { xx11100011, x0111xx011, 0x111xx011, 10111xx011}, xx011xx011 \ { xx01100011, 11011xx011, 01011xx011}} {xx0x0 \ {100x0, 11010, 0x010}} {1x00x \ {1x000, 1000x, 11000}, 110x1 \ {11001}, 01xx1 \ {01001, 011x1, 01101}} { 1x000xx000 \ { 1x00010000, 1x000xx000, 10000xx000, 11000xx000}} {1x1x1 \ {101x1, 11101, 11101}} {x0x11 \ {10011, 00x11, 10111}, 10xxx \ {10xx0, 10110, 10010}} { x0x111x111 \ { x0x1110111, 100111x111, 00x111x111, 101111x111}, 10xx11x1x1 \ { 10x111x101, 10x011x111, 10xx1101x1, 10xx111101, 10xx111101}} {0xx00 \ {0x000, 00100, 01x00}, 0x00x \ {0x001, 01000, 01000}} {10xxx \ {10001, 10x01, 10x00}} { 10x000xx00 \ { 10x000x000, 10x0000100, 10x0001x00, 10x000xx00}, 10x0x0x00x \ { 10x010x000, 10x000x001, 10x0x0x001, 10x0x01000, 10x0x01000, 100010x00x, 10x010x00x, 10x000x00x}} {011xx \ {0111x, 011x1, 011x0}, 11xx0 \ {11010, 110x0, 11x10}} {111xx \ {11100, 111x1}, 01xx0 \ {01x10, 011x0}, 0x1x0 \ {0x100, 00100, 01110}} { 111xx011xx \ { 111x1011x0, 111x0011x1, 1111x0110x, 1110x0111x, 111xx0111x, 111xx011x1, 111xx011x0, 11100011xx, 111x1011xx}, 01xx0011x0 \ { 01x1001100, 01x0001110, 01xx001110, 01xx0011x0, 01x10011x0, 011x0011x0}, 0x1x0011x0 \ { 0x11001100, 0x10001110, 0x1x001110, 0x1x0011x0, 0x100011x0, 00100011x0, 01110011x0}, 111x011xx0 \ { 1111011x00, 1110011x10, 111x011010, 111x0110x0, 111x011x10, 1110011xx0}, 01xx011xx0 \ { 01x1011x00, 01x0011x10, 01xx011010, 01xx0110x0, 01xx011x10, 01x1011xx0, 011x011xx0}, 0x1x011xx0 \ { 0x11011x00, 0x10011x10, 0x1x011010, 0x1x0110x0, 0x1x011x10, 0x10011xx0, 0010011xx0, 0111011xx0}} {xx100 \ {x1100, 1x100, 11100}} {x0x0x \ {00001, 00x01, 00x0x}} { x0x00xx100 \ { x0x00x1100, x0x001x100, x0x0011100, 00x00xx100}} {} {x11xx \ {x111x, x110x, 1111x}} {} {xx0xx \ {xx01x, 10010, xx00x}, xx0xx \ {1x0x1, 01001, x00x0}} {01xxx \ {01111, 010x1, 011x0}} { 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxxxx01x, 01xxx10010, 01xxxxx00x, 01111xx0xx, 010x1xx0xx, 011x0xx0xx}, 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxx1x0x1, 01xxx01001, 01xxxx00x0, 01111xx0xx, 010x1xx0xx, 011x0xx0xx}} {1xxxx \ {1x00x, 1001x, 1000x}, 01xx1 \ {01001, 01011, 01x11}, 0xx0x \ {00x01, 0x00x, 01100}} {0xx00 \ {01x00, 01100, 00000}, x0xx0 \ {10100, 00x10, x0010}, x1100 \ {01100, 11100, 11100}} { 0xx001xx00 \ { 0xx001x000, 0xx0010000, 01x001xx00, 011001xx00, 000001xx00}, x0xx01xxx0 \ { x0x101xx00, x0x001xx10, x0xx01x000, x0xx010010, x0xx010000, 101001xxx0, 00x101xxx0, x00101xxx0}, x11001xx00 \ { x11001x000, x110010000, 011001xx00, 111001xx00, 111001xx00}, 0xx000xx00 \ { 0xx000x000, 0xx0001100, 01x000xx00, 011000xx00, 000000xx00}, x0x000xx00 \ { x0x000x000, x0x0001100, 101000xx00}, x11000xx00 \ { x11000x000, x110001100, 011000xx00, 111000xx00, 111000xx00}} {xx01x \ {1101x, 0x01x, x0010}, 1001x \ {10010, 10011}} {10xxx \ {10010, 100x0, 10011}} { 10x1xxx01x \ { 10x11xx010, 10x10xx011, 10x1x1101x, 10x1x0x01x, 10x1xx0010, 10010xx01x, 10010xx01x, 10011xx01x}, 10x1x1001x \ { 10x1110010, 10x1010011, 10x1x10010, 10x1x10011, 100101001x, 100101001x, 100111001x}} {10x01 \ {10101}} {1xx1x \ {11011, 10111, 11x10}} {} {x0100 \ {10100}} {x10xx \ {x10x0, 010x0, x1011}} { x1000x0100 \ { x100010100, x1000x0100, 01000x0100}} {x0xx0 \ {10x10, x0x10, 10xx0}} {0x1x1 \ {01101, 0x111}, x01x0 \ {10100, 00110, 00110}} { x01x0x0xx0 \ { x0110x0x00, x0100x0x10, x01x010x10, x01x0x0x10, x01x010xx0, 10100x0xx0, 00110x0xx0, 00110x0xx0}} {1x1x0 \ {10100, 11110, 11100}, 111xx \ {11100, 11101, 1110x}} {x01xx \ {00110, 001xx, 10100}} { x01x01x1x0 \ { x01101x100, x01001x110, x01x010100, x01x011110, x01x011100, 001101x1x0, 001x01x1x0, 101001x1x0}, x01xx111xx \ { x01x1111x0, x01x0111x1, x011x1110x, x010x1111x, x01xx11100, x01xx11101, x01xx1110x, 00110111xx, 001xx111xx, 10100111xx}} {0xx11 \ {0x011, 01111, 00x11}, x11xx \ {x1100, 111x1, 01101}} {1100x \ {11000}, xx0x1 \ {xx001, 1x001, x0011}} { xx0110xx11 \ { xx0110x011, xx01101111, xx01100x11, x00110xx11}, 1100xx110x \ { 11001x1100, 11000x1101, 1100xx1100, 1100x11101, 1100x01101, 11000x110x}, xx0x1x11x1 \ { xx011x1101, xx001x1111, xx0x1111x1, xx0x101101, xx001x11x1, 1x001x11x1, x0011x11x1}} {001xx \ {001x0, 00100, 00111}, 1xxxx \ {111x1, 10xx1, 11111}, 0x010 \ {01010, 00010, 00010}} {1xx00 \ {1x000, 11100, 10x00}} { 1xx0000100 \ { 1xx0000100, 1xx0000100, 1x00000100, 1110000100, 10x0000100}, 1xx001xx00 \ { 1x0001xx00, 111001xx00, 10x001xx00}} {} {} {} {xx0x0 \ {x1010, 0x010, 00010}} {1x0xx \ {10010, 11011, 1x011}} { 1x0x0xx0x0 \ { 1x010xx000, 1x000xx010, 1x0x0x1010, 1x0x00x010, 1x0x000010, 10010xx0x0}} {11xxx \ {1100x, 11001, 11001}, 1x011 \ {11011, 10011}, 00x0x \ {0010x, 00000, 00101}} {1x0xx \ {10000, 11010}} { 1x0xx11xxx \ { 1x0x111xx0, 1x0x011xx1, 1x01x11x0x, 1x00x11x1x, 1x0xx1100x, 1x0xx11001, 1x0xx11001, 1000011xxx, 1101011xxx}, 1x0111x011 \ { 1x01111011, 1x01110011}, 1x00x00x0x \ { 1x00100x00, 1x00000x01, 1x00x0010x, 1x00x00000, 1x00x00101, 1000000x0x}} {x1111 \ {11111, 01111, 01111}, 11xx1 \ {11101, 11001}} {x1xxx \ {11100, x100x, 11xx1}} { x1x11x1111 \ { x1x1111111, x1x1101111, x1x1101111, 11x11x1111}, x1xx111xx1 \ { x1x1111x01, x1x0111x11, x1xx111101, x1xx111001, x100111xx1, 11xx111xx1}} {x0xx1 \ {x0011, 00x01, 00x01}} {} {} {000x1 \ {00011}, 01x0x \ {0100x, 01001, 0110x}} {01x11 \ {01011, 01111, 01111}, xx111 \ {11111, x0111, 01111}} { 01x1100011 \ { 01x1100011, 0101100011, 0111100011, 0111100011}, xx11100011 \ { xx11100011, 1111100011, x011100011, 0111100011}} {11xx0 \ {11x10, 11x00, 110x0}} {x1x1x \ {x1110, 0111x, x111x}, 10x0x \ {1000x, 10000, 10000}} { x1x1011x10 \ { x1x1011x10, x1x1011010, x111011x10, 0111011x10, x111011x10}, 10x0011x00 \ { 10x0011x00, 10x0011000, 1000011x00, 1000011x00, 1000011x00}} {xx0x1 \ {01001, x0011, xx001}} {0011x \ {00111, 00110, 00110}, 1xxx0 \ {10xx0, 10100, 10x00}} { 00111xx011 \ { 00111x0011, 00111xx011}} {xx0x0 \ {100x0, 1x000, x00x0}, x1000 \ {01000, 11000, 11000}} {} {} {xx001 \ {0x001, x1001, 11001}} {1x11x \ {1x111, 10110}} {} {010xx \ {01011, 01001, 01010}, 1xx01 \ {10001, 11x01, 11x01}} {x10xx \ {x1011, x101x}} { x10xx010xx \ { x10x1010x0, x10x0010x1, x101x0100x, x100x0101x, x10xx01011, x10xx01001, x10xx01010, x1011010xx, x101x010xx}, x10011xx01 \ { x100110001, x100111x01, x100111x01}} {} {1x0x0 \ {11010, 11000, 110x0}} {} {} {0xx0x \ {01x0x, 00x0x, 01000}, x1000 \ {11000, 01000}} {} {} {10x00 \ {10100, 10000}} {} {} {x11xx \ {1111x, 111xx, 111xx}} {} {xxxxx \ {0xx0x, x0101, 0xxx0}, 01xxx \ {01111, 011x0, 01x01}} {x110x \ {01100, 1110x}, 10x1x \ {10111, 10x10}} { x110xxxx0x \ { x1101xxx00, x1100xxx01, x110x0xx0x, x110xx0101, x110x0xx00, 01100xxx0x, 1110xxxx0x}, 10x1xxxx1x \ { 10x11xxx10, 10x10xxx11, 10x1x0xx10, 10111xxx1x, 10x10xxx1x}, x110x01x0x \ { x110101x00, x110001x01, x110x01100, x110x01x01, 0110001x0x, 1110x01x0x}, 10x1x01x1x \ { 10x1101x10, 10x1001x11, 10x1x01111, 10x1x01110, 1011101x1x, 10x1001x1x}} {} {1x1x0 \ {111x0, 10100, 1x100}, 000x1 \ {00001, 00011, 00011}} {} {xx11x \ {xx111, 1x111, 11110}} {x1x10 \ {01110, x1110}, 0001x \ {00010, 00011}} { x1x10xx110 \ { x1x1011110, 01110xx110, x1110xx110}, 0001xxx11x \ { 00011xx110, 00010xx111, 0001xxx111, 0001x1x111, 0001x11110, 00010xx11x, 00011xx11x}} {} {xx1x0 \ {101x0, 0x1x0, 111x0}} {} {0x010 \ {01010, 00010}, x110x \ {0110x, 01101}} {0x1xx \ {00101, 0x111, 0x100}, x0x1x \ {x0x10, x0010, 10111}} { 0x1100x010 \ { 0x11001010, 0x11000010}, x0x100x010 \ { x0x1001010, x0x1000010, x0x100x010, x00100x010}, 0x10xx110x \ { 0x101x1100, 0x100x1101, 0x10x0110x, 0x10x01101, 00101x110x, 0x100x110x}} {0101x \ {01010, 01011, 01011}} {xx01x \ {01011, 0001x, 1001x}, xxxx1 \ {x10x1, 1x0x1, xx001}, 00xxx \ {000x0, 00011, 000x1}} { xx01x0101x \ { xx01101010, xx01001011, xx01x01010, xx01x01011, xx01x01011, 010110101x, 0001x0101x, 1001x0101x}, xxx1101011 \ { xxx1101011, xxx1101011, x101101011, 1x01101011}, 00x1x0101x \ { 00x1101010, 00x1001011, 00x1x01010, 00x1x01011, 00x1x01011, 000100101x, 000110101x, 000110101x}} {x0x01 \ {00001, 10001, 10101}, x1010 \ {11010, 01010}} {x0x1x \ {10x1x, 10010}, 010x0 \ {01010, 01000}, xxx00 \ {x0000, x0x00, 00100}} { x0x10x1010 \ { x0x1011010, x0x1001010, 10x10x1010, 10010x1010}, 01010x1010 \ { 0101011010, 0101001010, 01010x1010}} {x0x0x \ {0010x, x000x, x0000}, 0xxxx \ {0xxx0, 0x0x0, 0011x}} {101xx \ {101x0, 10110, 10100}} { 1010xx0x0x \ { 10101x0x00, 10100x0x01, 1010x0010x, 1010xx000x, 1010xx0000, 10100x0x0x, 10100x0x0x}, 101xx0xxxx \ { 101x10xxx0, 101x00xxx1, 1011x0xx0x, 1010x0xx1x, 101xx0xxx0, 101xx0x0x0, 101xx0011x, 101x00xxxx, 101100xxxx, 101000xxxx}} {1xx00 \ {11x00, 1x000, 10000}, 0xx1x \ {0x011, 0x110, 00111}} {xx010 \ {1x010, 00010, 0x010}, 1xxx0 \ {10010, 10110, 110x0}} { 1xx001xx00 \ { 1xx0011x00, 1xx001x000, 1xx0010000, 110001xx00}, xx0100xx10 \ { xx0100x110, 1x0100xx10, 000100xx10, 0x0100xx10}, 1xx100xx10 \ { 1xx100x110, 100100xx10, 101100xx10, 110100xx10}} {x00xx \ {1000x, 10001, 00000}, x0x1x \ {1001x, 10110}, 1xx10 \ {11010, 11x10}} {1xx10 \ {10x10, 10010}} { 1xx10x0010 \ { 10x10x0010, 10010x0010}, 1xx10x0x10 \ { 1xx1010010, 1xx1010110, 10x10x0x10, 10010x0x10}, 1xx101xx10 \ { 1xx1011010, 1xx1011x10, 10x101xx10, 100101xx10}} {0x010 \ {00010, 01010}} {x100x \ {01000, 11000, 11000}, x100x \ {11000, 01001}} {} {} {1x1x1 \ {10111, 11111}} {} {10x11 \ {10111, 10011}} {1000x \ {10001, 10000}} {} {x00xx \ {10011, x00x0, 100x1}, xxxx1 \ {0x0x1, x1001, xx111}} {xx010 \ {x0010, 1x010, 1x010}, xxx01 \ {11101, 11x01, 10001}} { xx010x0010 \ { xx010x0010, x0010x0010, 1x010x0010, 1x010x0010}, xxx01x0001 \ { xxx0110001, 11101x0001, 11x01x0001, 10001x0001}, xxx01xxx01 \ { xxx010x001, xxx01x1001, 11101xxx01, 11x01xxx01, 10001xxx01}} {1x0xx \ {1000x, 10011, 110x1}, xx011 \ {x0011, 00011, 1x011}} {0x1xx \ {001x1, 00110, 0x1x0}} { 0x1xx1x0xx \ { 0x1x11x0x0, 0x1x01x0x1, 0x11x1x00x, 0x10x1x01x, 0x1xx1000x, 0x1xx10011, 0x1xx110x1, 001x11x0xx, 001101x0xx, 0x1x01x0xx}, 0x111xx011 \ { 0x111x0011, 0x11100011, 0x1111x011, 00111xx011}} {xx101 \ {11101, 0x101, x0101}} {x1xxx \ {11x0x, 0110x, 11xx0}, 10xxx \ {10xx1, 100x1, 10xx0}} { x1x01xx101 \ { x1x0111101, x1x010x101, x1x01x0101, 11x01xx101, 01101xx101}, 10x01xx101 \ { 10x0111101, 10x010x101, 10x01x0101, 10x01xx101, 10001xx101}} {01x0x \ {0100x, 01001}} {} {} {0x11x \ {0x111, 00111, 00111}} {x01x0 \ {x0100, 00100, 001x0}} { x01100x110 \ { 001100x110}} {10xx0 \ {10x10, 100x0, 10000}, xx0x1 \ {x0001, xx011, 1x011}} {x1x0x \ {x1x01, 1100x, 11x01}, x1xxx \ {01x01, 01xx0, 01x10}, x1101 \ {01101, 11101}} { x1x0010x00 \ { x1x0010000, x1x0010000, 1100010x00}, x1xx010xx0 \ { x1x1010x00, x1x0010x10, x1xx010x10, x1xx0100x0, x1xx010000, 01xx010xx0, 01x1010xx0}, x1x01xx001 \ { x1x01x0001, x1x01xx001, 11001xx001, 11x01xx001}, x1xx1xx0x1 \ { x1x11xx001, x1x01xx011, x1xx1x0001, x1xx1xx011, x1xx11x011, 01x01xx0x1}, x1101xx001 \ { x1101x0001, 01101xx001, 11101xx001}} {x0001 \ {10001, 00001, 00001}} {x10xx \ {110x1, 0100x, 110xx}, x1xx0 \ {110x0, 11x10, x10x0}, 0x010 \ {00010, 01010}} { x1001x0001 \ { x100110001, x100100001, x100100001, 11001x0001, 01001x0001, 11001x0001}} {00xxx \ {00001, 00x0x, 00x0x}, 00xx0 \ {00x00, 00010}, x0x10 \ {10010, 00110, 00110}} {0x0xx \ {0100x, 0x01x, 0x00x}, 0x00x \ {0100x, 00000}} { 0x0xx00xxx \ { 0x0x100xx0, 0x0x000xx1, 0x01x00x0x, 0x00x00x1x, 0x0xx00001, 0x0xx00x0x, 0x0xx00x0x, 0100x00xxx, 0x01x00xxx, 0x00x00xxx}, 0x00x00x0x \ { 0x00100x00, 0x00000x01, 0x00x00001, 0x00x00x0x, 0x00x00x0x, 0100x00x0x, 0000000x0x}, 0x0x000xx0 \ { 0x01000x00, 0x00000x10, 0x0x000x00, 0x0x000010, 0100000xx0, 0x01000xx0, 0x00000xx0}, 0x00000x00 \ { 0x00000x00, 0100000x00, 0000000x00}, 0x010x0x10 \ { 0x01010010, 0x01000110, 0x01000110, 0x010x0x10}} {x10xx \ {x1011, 110x0, 01010}} {xxx0x \ {11001, 0x101, 1110x}, x0010 \ {00010}, 0xxx0 \ {0x100, 011x0, 0x0x0}} { xxx0xx100x \ { xxx01x1000, xxx00x1001, xxx0x11000, 11001x100x, 0x101x100x, 1110xx100x}, x0010x1010 \ { x001011010, x001001010, 00010x1010}, 0xxx0x10x0 \ { 0xx10x1000, 0xx00x1010, 0xxx0110x0, 0xxx001010, 0x100x10x0, 011x0x10x0, 0x0x0x10x0}} {00x10 \ {00010}} {0xx11 \ {01x11, 01111, 01111}, 0xx1x \ {01x11, 0111x, 00110}, 011x0 \ {01100}} { 0xx1000x10 \ { 0xx1000010, 0111000x10, 0011000x10}, 0111000x10 \ { 0111000010}} {x0x1x \ {0011x, x0110, 10x1x}} {x01xx \ {x0100, 00101, 10100}} { x011xx0x1x \ { x0111x0x10, x0110x0x11, x011x0011x, x011xx0110, x011x10x1x}} {x0x00 \ {10000, x0100, 10x00}, 001xx \ {001x1, 00100}} {00x0x \ {0010x}, xx111 \ {x1111}} { 00x00x0x00 \ { 00x0010000, 00x00x0100, 00x0010x00, 00100x0x00}, 00x0x0010x \ { 00x0100100, 00x0000101, 00x0x00101, 00x0x00100, 0010x0010x}, xx11100111 \ { xx11100111, x111100111}} {xx01x \ {0x011, 0x010, 11010}} {0xx1x \ {0001x, 0011x, 00111}} { 0xx1xxx01x \ { 0xx11xx010, 0xx10xx011, 0xx1x0x011, 0xx1x0x010, 0xx1x11010, 0001xxx01x, 0011xxx01x, 00111xx01x}} {0x01x \ {01011, 00010}, xx100 \ {1x100, x1100}} {x1x00 \ {01100, x1100, 11x00}} { x1x00xx100 \ { x1x001x100, x1x00x1100, 01100xx100, x1100xx100, 11x00xx100}} {1x0xx \ {110x0, 1001x, 1x011}} {1xx00 \ {10000, 11x00, 1x100}, 0x10x \ {00101, 0110x, 0x101}, 1xxx1 \ {1x111, 10011, 1xx01}} { 1xx001x000 \ { 1xx0011000, 100001x000, 11x001x000, 1x1001x000}, 0x10x1x00x \ { 0x1011x000, 0x1001x001, 0x10x11000, 001011x00x, 0110x1x00x, 0x1011x00x}, 1xxx11x0x1 \ { 1xx111x001, 1xx011x011, 1xxx110011, 1xxx11x011, 1x1111x0x1, 100111x0x1, 1xx011x0x1}} {x01x1 \ {001x1, 10101, 101x1}} {xxxx1 \ {xx111, 1x0x1, x01x1}} { xxxx1x01x1 \ { xxx11x0101, xxx01x0111, xxxx1001x1, xxxx110101, xxxx1101x1, xx111x01x1, 1x0x1x01x1, x01x1x01x1}} {x1xx1 \ {11111, x1111, 11011}} {0101x \ {01010, 01011}, xx010 \ {11010, 01010, 00010}} { 01011x1x11 \ { 0101111111, 01011x1111, 0101111011, 01011x1x11}} {x110x \ {x1101, 0110x, x1100}, 0x0x0 \ {01000, 010x0, 0x010}} {1x0x0 \ {100x0, 110x0, 10010}} { 1x000x1100 \ { 1x00001100, 1x000x1100, 10000x1100, 11000x1100}, 1x0x00x0x0 \ { 1x0100x000, 1x0000x010, 1x0x001000, 1x0x0010x0, 1x0x00x010, 100x00x0x0, 110x00x0x0, 100100x0x0}} {01x1x \ {01x11, 0101x, 01x10}} {11x1x \ {11x10, 11x11}, 110x1 \ {11001}} { 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01x11, 11x1x0101x, 11x1x01x10, 11x1001x1x, 11x1101x1x}, 1101101x11 \ { 1101101x11, 1101101011}} {x10x0 \ {x1000, 11010, x1010}, x010x \ {x0100, 00100, x0101}} {xx011 \ {01011, 0x011}} {} {x0x10 \ {00x10, 10x10, 10010}} {xxx1x \ {x0111, 11111, x001x}, xx0x1 \ {11001, 110x1, xx001}, x001x \ {10011, 00010}} { xxx10x0x10 \ { xxx1000x10, xxx1010x10, xxx1010010, x0010x0x10}, x0010x0x10 \ { x001000x10, x001010x10, x001010010, 00010x0x10}} {0x110 \ {00110, 01110}, x11x0 \ {01110, 01100, x1100}} {00xx1 \ {000x1, 00x11, 001x1}, 100x0 \ {10010, 10000}} { 100100x110 \ { 1001000110, 1001001110, 100100x110}, 100x0x11x0 \ { 10010x1100, 10000x1110, 100x001110, 100x001100, 100x0x1100, 10010x11x0, 10000x11x0}} {1x10x \ {11100, 11101}, 0x1x0 \ {001x0, 0x100, 0x100}} {} {} {xx0x1 \ {xx011, xx001, 110x1}, x1010 \ {01010, 11010}} {x11xx \ {1111x, 11101, 11100}} { x11x1xx0x1 \ { x1111xx001, x1101xx011, x11x1xx011, x11x1xx001, x11x1110x1, 11111xx0x1, 11101xx0x1}, x1110x1010 \ { x111001010, x111011010, 11110x1010}} {x000x \ {00001, 10001}, 10xx1 \ {10x01, 10001, 10x11}} {x10x0 \ {01000, 01010, 11000}, 0x110 \ {01110, 00110}} { x1000x0000 \ { 01000x0000, 11000x0000}} {110xx \ {110x1, 11010}} {0x110 \ {01110, 00110, 00110}, x1100 \ {11100, 01100}} { 0x11011010 \ { 0x11011010, 0111011010, 0011011010, 0011011010}, x110011000 \ { 1110011000, 0110011000}} {1xx1x \ {11111, 1101x, 1x011}} {} {} {1011x \ {10111}} {0x1xx \ {011xx, 0011x}} { 0x11x1011x \ { 0x11110110, 0x11010111, 0x11x10111, 0111x1011x, 0011x1011x}} {110x1 \ {11011, 11001, 11001}} {1xxx0 \ {10x00, 10000, 1xx00}} {} {x0x1x \ {00110, x0x10, x001x}} {110xx \ {11010, 110x1, 1100x}, 1x11x \ {1x110, 1011x, 1011x}} { 1101xx0x1x \ { 11011x0x10, 11010x0x11, 1101x00110, 1101xx0x10, 1101xx001x, 11010x0x1x, 11011x0x1x}, 1x11xx0x1x \ { 1x111x0x10, 1x110x0x11, 1x11x00110, 1x11xx0x10, 1x11xx001x, 1x110x0x1x, 1011xx0x1x, 1011xx0x1x}} {xx1x0 \ {0x1x0, 111x0, x0110}, 0x1x0 \ {001x0, 011x0, 01110}} {x1111 \ {11111, 01111, 01111}} {} {} {100x0 \ {10010, 10000, 10000}, x110x \ {01100, 01101, x1100}} {} {10xx1 \ {10101, 10011, 100x1}, 1x01x \ {10011, 1x010, 10010}} {x0x10 \ {00x10, 10110, x0010}} { x0x101x010 \ { x0x101x010, x0x1010010, 00x101x010, 101101x010, x00101x010}} {x0xx1 \ {x0x01, 00011, 001x1}} {x0x00 \ {10100, 00000, 00x00}} {} {0xxx1 \ {01x01, 010x1, 01011}} {1x10x \ {1010x, 1x101, 11100}} { 1x1010xx01 \ { 1x10101x01, 1x10101001, 101010xx01, 1x1010xx01}} {x0xx0 \ {00100, 00xx0, 00000}} {00x1x \ {00010, 0001x, 00x11}} { 00x10x0x10 \ { 00x1000x10, 00010x0x10, 00010x0x10}} {10xx0 \ {10110, 10x10, 10000}, x01x1 \ {001x1, 00111, 00111}} {} {} {0x11x \ {00111}, 11xx0 \ {11000, 110x0, 11110}, xx100 \ {10100, 00100, 1x100}} {} {} {x111x \ {0111x, x1110}, 00xx1 \ {00x11, 00111}, 1x001 \ {10001}} {x00xx \ {000xx, x00x1, x0001}} { x001xx111x \ { x0011x1110, x0010x1111, x001x0111x, x001xx1110, 0001xx111x, x0011x111x}, x00x100xx1 \ { x001100x01, x000100x11, x00x100x11, x00x100111, 000x100xx1, x00x100xx1, x000100xx1}, x00011x001 \ { x000110001, 000011x001, x00011x001, x00011x001}} {xx0xx \ {xx000, 1x0x1, x0011}} {xx000 \ {01000, 1x000, x0000}, x000x \ {1000x, 00001}} { xx000xx000 \ { xx000xx000, 01000xx000, 1x000xx000, x0000xx000}, x000xxx00x \ { x0001xx000, x0000xx001, x000xxx000, x000x1x001, 1000xxx00x, 00001xx00x}} {x10x0 \ {01000, 010x0}} {x1101 \ {11101, 01101}} {} {} {xx100 \ {01100, 00100, x0100}} {} {1x011 \ {10011, 11011, 11011}} {1x1x1 \ {1x101, 11101}, 10xx1 \ {10011, 10001}} { 1x1111x011 \ { 1x11110011, 1x11111011, 1x11111011}, 10x111x011 \ { 10x1110011, 10x1111011, 10x1111011, 100111x011}} {x1xxx \ {x1111, 11x10, 111x0}, 101x1 \ {10111, 10101}} {x111x \ {1111x, x1111, x1110}} { x111xx1x1x \ { x1111x1x10, x1110x1x11, x111xx1111, x111x11x10, x111x11110, 1111xx1x1x, x1111x1x1x, x1110x1x1x}, x111110111 \ { x111110111, 1111110111, x111110111}} {0xxx1 \ {0x111, 01001, 01011}} {xx001 \ {0x001, x0001}, x011x \ {0011x, x0110, 00110}} { xx0010xx01 \ { xx00101001, 0x0010xx01, x00010xx01}, x01110xx11 \ { x01110x111, x011101011, 001110xx11}} {1x10x \ {1110x, 1010x, 1010x}} {x1xxx \ {01x01, 11x0x, x110x}, 110xx \ {1101x, 11000, 110x0}} { x1x0x1x10x \ { x1x011x100, x1x001x101, x1x0x1110x, x1x0x1010x, x1x0x1010x, 01x011x10x, 11x0x1x10x, x110x1x10x}, 1100x1x10x \ { 110011x100, 110001x101, 1100x1110x, 1100x1010x, 1100x1010x, 110001x10x, 110001x10x}} {x1110 \ {01110, 11110, 11110}} {11x10 \ {11010, 11110, 11110}} { 11x10x1110 \ { 11x1001110, 11x1011110, 11x1011110, 11010x1110, 11110x1110, 11110x1110}} {1011x \ {10111}, x1xx0 \ {01010, x1110, x11x0}, 1xx01 \ {10101, 11001, 10x01}} {} {} {010xx \ {010x1, 01011, 010x0}, x1x01 \ {x1101, 11101}} {x10x0 \ {x1010, 11000, 11010}} { x10x0010x0 \ { x101001000, x100001010, x10x0010x0, x1010010x0, 11000010x0, 11010010x0}} {x1111 \ {11111, 01111, 01111}} {00x10 \ {00010, 00110, 00110}, xx010 \ {00010, x0010, 11010}} {} {x1x10 \ {01110, 11110}} {xx1xx \ {111xx, x010x, 1x100}, 0x1x1 \ {00111, 001x1, 001x1}, 1xx1x \ {1x010, 10010, 1001x}} { xx110x1x10 \ { xx11001110, xx11011110, 11110x1x10}, 1xx10x1x10 \ { 1xx1001110, 1xx1011110, 1x010x1x10, 10010x1x10, 10010x1x10}} {xx111 \ {1x111, 01111, x0111}} {x0xx0 \ {00xx0, 10110, x0x00}, 0x0xx \ {00001, 0100x, 01001}} { 0x011xx111 \ { 0x0111x111, 0x01101111, 0x011x0111}} {1xx00 \ {11x00, 10x00}, 11xx0 \ {11x00, 11100}} {1x111 \ {10111, 11111}, 10xx0 \ {10000, 10100, 10010}} { 10x001xx00 \ { 10x0011x00, 10x0010x00, 100001xx00, 101001xx00}, 10xx011xx0 \ { 10x1011x00, 10x0011x10, 10xx011x00, 10xx011100, 1000011xx0, 1010011xx0, 1001011xx0}} {01xx1 \ {01001, 01101, 01x11}, 1xxx0 \ {11x00, 1xx00, 10x10}} {0100x \ {01000, 01001}} { 0100101x01 \ { 0100101001, 0100101101, 0100101x01}, 010001xx00 \ { 0100011x00, 010001xx00, 010001xx00}} {0x01x \ {0x011, 01011}} {01xx1 \ {010x1, 01x01, 01x11}} { 01x110x011 \ { 01x110x011, 01x1101011, 010110x011, 01x110x011}} {1x1x1 \ {10101, 1x101}, 010xx \ {010x0, 01000, 01000}} {x01x1 \ {x0101, 00111}, 11x0x \ {11100, 11x01, 1100x}, 1x10x \ {1110x, 1x101, 11101}} { x01x11x1x1 \ { x01111x101, x01011x111, x01x110101, x01x11x101, x01011x1x1, 001111x1x1}, 11x011x101 \ { 11x0110101, 11x011x101, 11x011x101, 110011x101}, 1x1011x101 \ { 1x10110101, 1x1011x101, 111011x101, 1x1011x101, 111011x101}, x01x1010x1 \ { x011101001, x010101011, x0101010x1, 00111010x1}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01000, 11x0x01000, 11x0x01000, 111000100x, 11x010100x, 1100x0100x}, 1x10x0100x \ { 1x10101000, 1x10001001, 1x10x01000, 1x10x01000, 1x10x01000, 1110x0100x, 1x1010100x, 111010100x}} {} {x0111 \ {00111}} {} {xx011 \ {11011, 01011, 0x011}, 001x1 \ {00111}} {x1x01 \ {11001, 01x01, 11101}, 10xx1 \ {10001, 10111, 10x01}} { 10x11xx011 \ { 10x1111011, 10x1101011, 10x110x011, 10111xx011}, x1x0100101 \ { 1100100101, 01x0100101, 1110100101}, 10xx1001x1 \ { 10x1100101, 10x0100111, 10xx100111, 10001001x1, 10111001x1, 10x01001x1}} {} {xxxxx \ {011x1, x0x0x, 00x00}, x11x1 \ {01111}, 000x0 \ {00000}} {} {xx011 \ {00011, 11011, 01011}, x01xx \ {x01x1, x01x0, 101x0}} {} {} {x0xx0 \ {x0100, 00xx0}, x11x0 \ {01110, 011x0, 011x0}} {x0x10 \ {00010, 00110, x0110}, x1011 \ {11011, 01011, 01011}, 1111x \ {11110, 11111, 11111}} { x0x10x0x10 \ { x0x1000x10, 00010x0x10, 00110x0x10, x0110x0x10}, 11110x0x10 \ { 1111000x10, 11110x0x10}, x0x10x1110 \ { x0x1001110, x0x1001110, x0x1001110, 00010x1110, 00110x1110, x0110x1110}, 11110x1110 \ { 1111001110, 1111001110, 1111001110, 11110x1110}} {1xx1x \ {10x1x, 10x11, 1111x}, 0xx01 \ {01x01, 00101, 00001}} {xxxx1 \ {10xx1, 1x0x1, x1x01}, x10xx \ {x100x, x10x1, 01011}, x0101 \ {10101, 00101}} { xxx111xx11 \ { xxx1110x11, xxx1110x11, xxx1111111, 10x111xx11, 1x0111xx11}, x101x1xx1x \ { x10111xx10, x10101xx11, x101x10x1x, x101x10x11, x101x1111x, x10111xx1x, 010111xx1x}, xxx010xx01 \ { xxx0101x01, xxx0100101, xxx0100001, 10x010xx01, 1x0010xx01, x1x010xx01}, x10010xx01 \ { x100101x01, x100100101, x100100001, x10010xx01, x10010xx01}, x01010xx01 \ { x010101x01, x010100101, x010100001, 101010xx01, 001010xx01}} {000xx \ {00011, 0000x, 00001}} {1xxxx \ {1x110, 10x0x, 1xx01}, x11xx \ {111xx, 0110x, 11100}, 10xxx \ {1000x, 10000, 101xx}} { 1xxxx000xx \ { 1xxx1000x0, 1xxx0000x1, 1xx1x0000x, 1xx0x0001x, 1xxxx00011, 1xxxx0000x, 1xxxx00001, 1x110000xx, 10x0x000xx, 1xx01000xx}, x11xx000xx \ { x11x1000x0, x11x0000x1, x111x0000x, x110x0001x, x11xx00011, x11xx0000x, x11xx00001, 111xx000xx, 0110x000xx, 11100000xx}, 10xxx000xx \ { 10xx1000x0, 10xx0000x1, 10x1x0000x, 10x0x0001x, 10xxx00011, 10xxx0000x, 10xxx00001, 1000x000xx, 10000000xx, 101xx000xx}} {} {x010x \ {10100, 00101, 0010x}} {} {xxxx0 \ {100x0, 011x0, 11000}} {xx0x0 \ {xx000, 1x010}, 0xxx1 \ {0xx01, 00xx1, 001x1}, 0x01x \ {0101x, 01010}} { xx0x0xxxx0 \ { xx010xxx00, xx000xxx10, xx0x0100x0, xx0x0011x0, xx0x011000, xx000xxxx0, 1x010xxxx0}, 0x010xxx10 \ { 0x01010010, 0x01001110, 01010xxx10, 01010xxx10}} {1x111 \ {11111, 10111}} {0x01x \ {01010, 01011}, 100xx \ {10010, 100x0, 1001x}, x11x0 \ {11110, 01110}} { 0x0111x111 \ { 0x01111111, 0x01110111, 010111x111}, 100111x111 \ { 1001111111, 1001110111, 100111x111}} {x11x1 \ {111x1, 11101, 01101}} {} {} {0x1x0 \ {011x0, 0x100, 0x100}, 1xxx0 \ {1x100, 1x0x0}} {xx101 \ {1x101, 11101}, 1xx00 \ {10x00, 1x000, 11x00}, x110x \ {0110x, 01101, 11100}} { 1xx000x100 \ { 1xx0001100, 1xx000x100, 1xx000x100, 10x000x100, 1x0000x100, 11x000x100}, x11000x100 \ { x110001100, x11000x100, x11000x100, 011000x100, 111000x100}, 1xx001xx00 \ { 1xx001x100, 1xx001x000, 10x001xx00, 1x0001xx00, 11x001xx00}, x11001xx00 \ { x11001x100, x11001x000, 011001xx00, 111001xx00}} {x0xx1 \ {x01x1, 00001, 00xx1}, 101xx \ {1010x, 101x0, 10111}} {11x1x \ {1101x, 11111, 11011}, x11x1 \ {x1101, x1111}} { 11x11x0x11 \ { 11x11x0111, 11x1100x11, 11011x0x11, 11111x0x11, 11011x0x11}, x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x1x01x1, x11x100001, x11x100xx1, x1101x0xx1, x1111x0xx1}, 11x1x1011x \ { 11x1110110, 11x1010111, 11x1x10110, 11x1x10111, 1101x1011x, 111111011x, 110111011x}, x11x1101x1 \ { x111110101, x110110111, x11x110101, x11x110111, x1101101x1, x1111101x1}} {x0xx0 \ {000x0, 001x0, 00010}, x011x \ {00110, 1011x, 1011x}} {} {} {x1100 \ {11100}, xx110 \ {x1110, 1x110}} {x1xx0 \ {01010, 11010, x1110}, x111x \ {11110, x1111}} { x1x00x1100 \ { x1x0011100}, x1x10xx110 \ { x1x10x1110, x1x101x110, 01010xx110, 11010xx110, x1110xx110}, x1110xx110 \ { x1110x1110, x11101x110, 11110xx110}} {1x1x1 \ {10101, 11101, 101x1}} {xx111 \ {0x111, 10111}, 0xxx1 \ {0x111, 001x1, 01101}, xxx01 \ {01x01, 0xx01, 11001}} { xx1111x111 \ { xx11110111, 0x1111x111, 101111x111}, 0xxx11x1x1 \ { 0xx111x101, 0xx011x111, 0xxx110101, 0xxx111101, 0xxx1101x1, 0x1111x1x1, 001x11x1x1, 011011x1x1}, xxx011x101 \ { xxx0110101, xxx0111101, xxx0110101, 01x011x101, 0xx011x101, 110011x101}} {xxx10 \ {xx010, x1110, 11010}} {xx1x0 \ {00110, x0110, x1110}} { xx110xxx10 \ { xx110xx010, xx110x1110, xx11011010, 00110xxx10, x0110xxx10, x1110xxx10}} {xxx01 \ {11001, 00x01, 10001}} {00xxx \ {00x01, 0000x, 001x0}} { 00x01xxx01 \ { 00x0111001, 00x0100x01, 00x0110001, 00x01xxx01, 00001xxx01}} {x00x0 \ {00000, x0010, 00010}, xx110 \ {10110, 1x110, 00110}, 10xx0 \ {10100, 10x00, 10010}} {} {} {10xx1 \ {10001, 10101, 10101}, 10x1x \ {10011, 10111, 10x10}, 10x1x \ {10010, 1011x}} {01xx0 \ {011x0, 01x10}, 0x000 \ {00000, 01000, 01000}} { 01x1010x10 \ { 01x1010x10, 0111010x10, 01x1010x10}} {11xx0 \ {11x10, 11100, 11010}} {} {} {} {x0x01 \ {x0101, 00101, 10x01}, 11x1x \ {11011, 1101x, 11110}, 01xx1 \ {01011, 01111, 010x1}} {} {xx10x \ {1010x, 10100, 11100}, 101x0 \ {10110, 10100}, xx100 \ {10100, x1100, 00100}} {xxxx1 \ {110x1, x1111, x1011}, xx100 \ {00100, x1100, x0100}} { xxx01xx101 \ { xxx0110101, 11001xx101}, xx100xx100 \ { xx10010100, xx10010100, xx10011100, 00100xx100, x1100xx100, x0100xx100}, xx10010100 \ { xx10010100, 0010010100, x110010100, x010010100}} {0xxx1 \ {010x1, 00xx1, 01x11}} {x111x \ {11110, x1111, 01110}} { x11110xx11 \ { x111101011, x111100x11, x111101x11, x11110xx11}} {x001x \ {00011, 10011, x0011}} {} {} {1001x \ {10011, 10010}, 01xxx \ {0101x, 011xx, 01x00}} {x11x0 \ {01100, x1100, 01110}, x11x1 \ {011x1, 111x1, 111x1}} { x111010010 \ { x111010010, 0111010010}, x111110011 \ { x111110011, 0111110011, 1111110011, 1111110011}, x11x001xx0 \ { x111001x00, x110001x10, x11x001010, x11x0011x0, x11x001x00, 0110001xx0, x110001xx0, 0111001xx0}, x11x101xx1 \ { x111101x01, x110101x11, x11x101011, x11x1011x1, 011x101xx1, 111x101xx1, 111x101xx1}} {01x1x \ {01011, 01x11}, 1x00x \ {1x001, 1x000, 10001}} {000x1 \ {00011}} { 0001101x11 \ { 0001101011, 0001101x11, 0001101x11}, 000011x001 \ { 000011x001, 0000110001}} {00x1x \ {00011, 00110}, 0xx01 \ {0x001, 01101, 01101}} {x011x \ {00110, x0110}} { x011x00x1x \ { x011100x10, x011000x11, x011x00011, x011x00110, 0011000x1x, x011000x1x}} {110xx \ {11010, 110x1, 110x0}, 10xx0 \ {10000, 10110, 101x0}} {0x1x0 \ {01110, 011x0}} { 0x1x0110x0 \ { 0x11011000, 0x10011010, 0x1x011010, 0x1x0110x0, 01110110x0, 011x0110x0}, 0x1x010xx0 \ { 0x11010x00, 0x10010x10, 0x1x010000, 0x1x010110, 0x1x0101x0, 0111010xx0, 011x010xx0}} {11x0x \ {11100, 1110x, 11001}, 10xx0 \ {101x0, 10110, 10100}, 000xx \ {000x0, 00010, 00000}} {x0xx0 \ {00110, x00x0, x0x00}} { x0x0011x00 \ { x0x0011100, x0x0011100, x000011x00, x0x0011x00}, x0xx010xx0 \ { x0x1010x00, x0x0010x10, x0xx0101x0, x0xx010110, x0xx010100, 0011010xx0, x00x010xx0, x0x0010xx0}, x0xx0000x0 \ { x0x1000000, x0x0000010, x0xx0000x0, x0xx000010, x0xx000000, 00110000x0, x00x0000x0, x0x00000x0}} {x00x0 \ {100x0, 10000}, 0x0x1 \ {00001}} {xx0xx \ {000xx, xx010, 1x010}, x00xx \ {x0000, x00x0, 00011}} { xx0x0x00x0 \ { xx010x0000, xx000x0010, xx0x0100x0, xx0x010000, 000x0x00x0, xx010x00x0, 1x010x00x0}, x00x0x00x0 \ { x0010x0000, x0000x0010, x00x0100x0, x00x010000, x0000x00x0, x00x0x00x0}, xx0x10x0x1 \ { xx0110x001, xx0010x011, xx0x100001, 000x10x0x1}, x00x10x0x1 \ { x00110x001, x00010x011, x00x100001, 000110x0x1}} {xxx01 \ {01001, 00001, 10001}} {x01xx \ {10100, 0010x, 001x0}, x101x \ {x1010, 01010, 11011}} { x0101xxx01 \ { x010101001, x010100001, x010110001, 00101xxx01}} {100x1 \ {10001}} {0x1x0 \ {001x0, 01100, 0x100}, x10x1 \ {11001, x1001, x1011}} { x10x1100x1 \ { x101110001, x100110011, x10x110001, 11001100x1, x1001100x1, x1011100x1}} {xx101 \ {1x101, 01101, x1101}, 0xx11 \ {00011, 01111}} {00xx1 \ {00111, 00x11}, 011x1 \ {01111}} { 00x01xx101 \ { 00x011x101, 00x0101101, 00x01x1101}, 01101xx101 \ { 011011x101, 0110101101, 01101x1101}, 00x110xx11 \ { 00x1100011, 00x1101111, 001110xx11, 00x110xx11}, 011110xx11 \ { 0111100011, 0111101111, 011110xx11}} {} {1x100 \ {10100, 11100}, xx01x \ {11011, 10010, xx011}} {} {0001x \ {00011, 00010}} {00xxx \ {00010, 0011x, 0011x}, xx1x1 \ {1x111, xx111, 1x1x1}} { 00x1x0001x \ { 00x1100010, 00x1000011, 00x1x00011, 00x1x00010, 000100001x, 0011x0001x, 0011x0001x}, xx11100011 \ { xx11100011, 1x11100011, xx11100011, 1x11100011}} {xx100 \ {11100, x0100, 0x100}, 00xxx \ {00100, 00000}} {xxx11 \ {x1x11, x1111, 0xx11}, x110x \ {01101, x1101, 0110x}} { x1100xx100 \ { x110011100, x1100x0100, x11000x100, 01100xx100}, xxx1100x11 \ { x1x1100x11, x111100x11, 0xx1100x11}, x110x00x0x \ { x110100x00, x110000x01, x110x00100, x110x00000, 0110100x0x, x110100x0x, 0110x00x0x}} {x11x0 \ {01100, 111x0}, x1111 \ {11111, 01111}, xxx00 \ {1xx00, 01100}} {1xx01 \ {10001, 11101, 1x101}} {} {x0100 \ {10100, 00100, 00100}} {000x0 \ {00000, 00010}} { 00000x0100 \ { 0000010100, 0000000100, 0000000100, 00000x0100}} {0x0x1 \ {000x1, 0x011, 010x1}} {1x0x1 \ {100x1, 11011, 1x011}, xx10x \ {x0101, x1100, 11101}} { 1x0x10x0x1 \ { 1x0110x001, 1x0010x011, 1x0x1000x1, 1x0x10x011, 1x0x1010x1, 100x10x0x1, 110110x0x1, 1x0110x0x1}, xx1010x001 \ { xx10100001, xx10101001, x01010x001, 111010x001}} {} {0x11x \ {0011x, 00110, 00111}, 001x0 \ {00110, 00100, 00100}} {} {} {xxx10 \ {01010, 1xx10}, 0x11x \ {0011x, 00111, 0111x}} {} {} {1101x \ {11011}, 1xx10 \ {1x010, 1x110, 11010}} {} {} {xxx11 \ {1xx11, 0x011, xx011}, 10x0x \ {1000x, 10100, 10001}, 00x1x \ {00x11, 00011, 00010}} {} {1x01x \ {11010, 1x011}, 1x0xx \ {1x001, 1x010, 1x0x1}} {} {} {xx00x \ {0x000, 0x00x, 00000}} {xx010 \ {00010, 0x010, 0x010}, 011xx \ {0110x, 01111, 0111x}} { 0110xxx00x \ { 01101xx000, 01100xx001, 0110x0x000, 0110x0x00x, 0110x00000, 0110xxx00x}} {xx1x1 \ {x1101, 1x111, 0x101}, xxx00 \ {x1000, x1100, 01x00}} {1xx01 \ {11x01, 1x101, 11001}, 0x010 \ {01010, 00010}, 10x0x \ {10100, 10x01}} { 1xx01xx101 \ { 1xx01x1101, 1xx010x101, 11x01xx101, 1x101xx101, 11001xx101}, 10x01xx101 \ { 10x01x1101, 10x010x101, 10x01xx101}, 10x00xxx00 \ { 10x00x1000, 10x00x1100, 10x0001x00, 10100xxx00}} {0xx00 \ {01000, 00100, 0x100}} {x1x01 \ {x1101, 01x01}} {} {1xx00 \ {10100, 11100, 10x00}, xx01x \ {1001x, x0011, 00010}} {01xx0 \ {01100, 01010, 01x00}, 11x1x \ {1111x, 11011, 11010}} { 01x001xx00 \ { 01x0010100, 01x0011100, 01x0010x00, 011001xx00, 01x001xx00}, 01x10xx010 \ { 01x1010010, 01x1000010, 01010xx010}, 11x1xxx01x \ { 11x11xx010, 11x10xx011, 11x1x1001x, 11x1xx0011, 11x1x00010, 1111xxx01x, 11011xx01x, 11010xx01x}} {010x0 \ {01000, 01010, 01010}, xx10x \ {1010x, 0x10x, x110x}, x11xx \ {x110x, x11x0, x1110}} {x1xx0 \ {011x0, 01010, 01010}} { x1xx0010x0 \ { x1x1001000, x1x0001010, x1xx001000, x1xx001010, x1xx001010, 011x0010x0, 01010010x0, 01010010x0}, x1x00xx100 \ { x1x0010100, x1x000x100, x1x00x1100, 01100xx100}, x1xx0x11x0 \ { x1x10x1100, x1x00x1110, x1xx0x1100, x1xx0x11x0, x1xx0x1110, 011x0x11x0, 01010x11x0, 01010x11x0}} {x10x0 \ {010x0, 110x0, 11000}, x0x1x \ {00x10, x001x, 00011}} {xx0x0 \ {x10x0, xx000, 1x010}} { xx0x0x10x0 \ { xx010x1000, xx000x1010, xx0x0010x0, xx0x0110x0, xx0x011000, x10x0x10x0, xx000x10x0, 1x010x10x0}, xx010x0x10 \ { xx01000x10, xx010x0010, x1010x0x10, 1x010x0x10}} {xxx11 \ {01011, 10x11, 1x111}, 10xx1 \ {10x11, 101x1}, x00x1 \ {10011, 00011}} {1x11x \ {10111, 1x111, 10110}, 1xx11 \ {10111, 11111, 1x111}} { 1x111xxx11 \ { 1x11101011, 1x11110x11, 1x1111x111, 10111xxx11, 1x111xxx11}, 1xx11xxx11 \ { 1xx1101011, 1xx1110x11, 1xx111x111, 10111xxx11, 11111xxx11, 1x111xxx11}, 1x11110x11 \ { 1x11110x11, 1x11110111, 1011110x11, 1x11110x11}, 1xx1110x11 \ { 1xx1110x11, 1xx1110111, 1011110x11, 1111110x11, 1x11110x11}, 1x111x0011 \ { 1x11110011, 1x11100011, 10111x0011, 1x111x0011}, 1xx11x0011 \ { 1xx1110011, 1xx1100011, 10111x0011, 11111x0011, 1x111x0011}} {xx1x0 \ {1x110, x0100, xx100}} {xx0x0 \ {x00x0, x1010, 110x0}} { xx0x0xx1x0 \ { xx010xx100, xx000xx110, xx0x01x110, xx0x0x0100, xx0x0xx100, x00x0xx1x0, x1010xx1x0, 110x0xx1x0}} {1xxx1 \ {10x11, 10111, 10x01}, 1110x \ {11101, 11100, 11100}} {xx010 \ {x1010, 01010}} {} {} {11x01 \ {11101, 11001, 11001}} {} {1xx0x \ {1x00x, 1110x, 11000}} {} {} {xx10x \ {x110x, 00100, 0010x}, 11x0x \ {11000, 11100, 1100x}} {01xxx \ {010xx, 01010, 0111x}} { 01x0xxx10x \ { 01x01xx100, 01x00xx101, 01x0xx110x, 01x0x00100, 01x0x0010x, 0100xxx10x}, 01x0x11x0x \ { 01x0111x00, 01x0011x01, 01x0x11000, 01x0x11100, 01x0x1100x, 0100x11x0x}} {} {0x0x0 \ {0x000, 00000, 010x0}, x0x00 \ {00x00, 10x00, 10x00}, xxxx0 \ {x0x10, 01110, 100x0}} {} {01x00 \ {01100}} {xxx1x \ {x1x1x, xxx11, 00x10}} {} {0x1xx \ {0x11x, 0x110, 0x111}, 1xxx1 \ {11x11, 11x01, 10101}} {10xxx \ {10111, 10x00, 10x01}, x10xx \ {1100x, x1011, 010xx}, 011x1 \ {01101}} { 10xxx0x1xx \ { 10xx10x1x0, 10xx00x1x1, 10x1x0x10x, 10x0x0x11x, 10xxx0x11x, 10xxx0x110, 10xxx0x111, 101110x1xx, 10x000x1xx, 10x010x1xx}, x10xx0x1xx \ { x10x10x1x0, x10x00x1x1, x101x0x10x, x100x0x11x, x10xx0x11x, x10xx0x110, x10xx0x111, 1100x0x1xx, x10110x1xx, 010xx0x1xx}, 011x10x1x1 \ { 011110x101, 011010x111, 011x10x111, 011x10x111, 011010x1x1}, 10xx11xxx1 \ { 10x111xx01, 10x011xx11, 10xx111x11, 10xx111x01, 10xx110101, 101111xxx1, 10x011xxx1}, x10x11xxx1 \ { x10111xx01, x10011xx11, x10x111x11, x10x111x01, x10x110101, 110011xxx1, x10111xxx1, 010x11xxx1}, 011x11xxx1 \ { 011111xx01, 011011xx11, 011x111x11, 011x111x01, 011x110101, 011011xxx1}} {x1111 \ {11111, 01111}, 1x101 \ {10101}} {1xx11 \ {10x11, 10011, 1x011}, x11x1 \ {01111, 111x1, 11101}, 10x0x \ {1010x, 10000, 10x01}} { 1xx11x1111 \ { 1xx1111111, 1xx1101111, 10x11x1111, 10011x1111, 1x011x1111}, x1111x1111 \ { x111111111, x111101111, 01111x1111, 11111x1111}, x11011x101 \ { x110110101, 111011x101, 111011x101}, 10x011x101 \ { 10x0110101, 101011x101, 10x011x101}} {0xx0x \ {01101, 01x0x, 01x00}} {x00x1 \ {00001, 000x1, x0011}, x01x0 \ {00100, x0110}} { x00010xx01 \ { x000101101, x000101x01, 000010xx01, 000010xx01}, x01000xx00 \ { x010001x00, x010001x00, 001000xx00}} {1x1xx \ {111x0, 10101, 11111}} {x1xx1 \ {011x1, 01x11, x1x01}, x1x1x \ {01110, 11111, 0101x}, 1xxxx \ {1001x, 10010, 11x01}} { x1xx11x1x1 \ { x1x111x101, x1x011x111, x1xx110101, x1xx111111, 011x11x1x1, 01x111x1x1, x1x011x1x1}, x1x1x1x11x \ { x1x111x110, x1x101x111, x1x1x11110, x1x1x11111, 011101x11x, 111111x11x, 0101x1x11x}, 1xxxx1x1xx \ { 1xxx11x1x0, 1xxx01x1x1, 1xx1x1x10x, 1xx0x1x11x, 1xxxx111x0, 1xxxx10101, 1xxxx11111, 1001x1x1xx, 100101x1xx, 11x011x1xx}} {1xxx1 \ {10111, 1x101, 1xx01}} {110x1 \ {11011}, x0x01 \ {10101, 00001, 00001}} { 110x11xxx1 \ { 110111xx01, 110011xx11, 110x110111, 110x11x101, 110x11xx01, 110111xxx1}, x0x011xx01 \ { x0x011x101, x0x011xx01, 101011xx01, 000011xx01, 000011xx01}} {} {0x100 \ {01100}, xx11x \ {11110, 0x110, xx111}} {} {x110x \ {01100, x1101, 1110x}} {xxx0x \ {0010x, 0x001, 01100}} { xxx0xx110x \ { xxx01x1100, xxx00x1101, xxx0x01100, xxx0xx1101, xxx0x1110x, 0010xx110x, 0x001x110x, 01100x110x}} {xxx0x \ {0x101, 11x01, x0x0x}, 1xx00 \ {11000, 10000, 1x100}, x1010 \ {11010}} {} {} {} {10x0x \ {10100, 1000x, 10x01}} {} {10x0x \ {10100, 1010x}} {x1xx1 \ {x1x11, 01111, x1111}, 00x11 \ {00011}} { x1x0110x01 \ { x1x0110101}} {0xxx1 \ {01x01, 000x1, 01x11}, xx11x \ {x1110, 10111, 1x11x}} {1x11x \ {1x111, 11110, 1111x}, 110x0 \ {11010}} { 1x1110xx11 \ { 1x11100011, 1x11101x11, 1x1110xx11, 111110xx11}, 1x11xxx11x \ { 1x111xx110, 1x110xx111, 1x11xx1110, 1x11x10111, 1x11x1x11x, 1x111xx11x, 11110xx11x, 1111xxx11x}, 11010xx110 \ { 11010x1110, 110101x110, 11010xx110}} {xx0x0 \ {01010, 110x0, 000x0}, x1x0x \ {01x01, 01x00, x1000}, 10xx1 \ {10001, 10101, 10101}} {001x0 \ {00110, 00100}} { 001x0xx0x0 \ { 00110xx000, 00100xx010, 001x001010, 001x0110x0, 001x0000x0, 00110xx0x0, 00100xx0x0}, 00100x1x00 \ { 0010001x00, 00100x1000, 00100x1x00}} {} {00xx1 \ {00001, 00x01, 00101}, x0xx1 \ {00xx1, x0x01}} {} {x11x1 \ {01101, 11111}} {10xx1 \ {10101, 10x01, 10001}, 101x1 \ {10111, 10101}, x0x11 \ {x0111, x0011, x0011}} { 10xx1x11x1 \ { 10x11x1101, 10x01x1111, 10xx101101, 10xx111111, 10101x11x1, 10x01x11x1, 10001x11x1}, 101x1x11x1 \ { 10111x1101, 10101x1111, 101x101101, 101x111111, 10111x11x1, 10101x11x1}, x0x11x1111 \ { x0x1111111, x0111x1111, x0011x1111, x0011x1111}} {1x1xx \ {111xx, 101x0, 1x11x}, x101x \ {0101x, x1010, 11010}, 0xxx0 \ {0xx10, 00000, 00x00}} {10x11 \ {10011}, x010x \ {10100, 0010x}, 00xxx \ {00x01, 00xx1, 00101}} { 10x111x111 \ { 10x1111111, 10x111x111, 100111x111}, x010x1x10x \ { x01011x100, x01001x101, x010x1110x, x010x10100, 101001x10x, 0010x1x10x}, 00xxx1x1xx \ { 00xx11x1x0, 00xx01x1x1, 00x1x1x10x, 00x0x1x11x, 00xxx111xx, 00xxx101x0, 00xxx1x11x, 00x011x1xx, 00xx11x1xx, 001011x1xx}, 10x11x1011 \ { 10x1101011, 10011x1011}, 00x1xx101x \ { 00x11x1010, 00x10x1011, 00x1x0101x, 00x1xx1010, 00x1x11010, 00x11x101x}, x01000xx00 \ { x010000000, x010000x00, 101000xx00, 001000xx00}, 00xx00xxx0 \ { 00x100xx00, 00x000xx10, 00xx00xx10, 00xx000000, 00xx000x00}} {xxx1x \ {01x11, 00010, x0x1x}} {x1110 \ {01110, 11110}} { x1110xxx10 \ { x111000010, x1110x0x10, 01110xxx10, 11110xxx10}} {x0x10 \ {10110, 00010, 10010}, x001x \ {x0010, 00011, 10010}, 0xx1x \ {0011x, 0xx10, 00010}} {11x0x \ {11x00, 11100}, 01x1x \ {01011, 01010, 0111x}} { 01x10x0x10 \ { 01x1010110, 01x1000010, 01x1010010, 01010x0x10, 01110x0x10}, 01x1xx001x \ { 01x11x0010, 01x10x0011, 01x1xx0010, 01x1x00011, 01x1x10010, 01011x001x, 01010x001x, 0111xx001x}, 01x1x0xx1x \ { 01x110xx10, 01x100xx11, 01x1x0011x, 01x1x0xx10, 01x1x00010, 010110xx1x, 010100xx1x, 0111x0xx1x}} {} {x0x01 \ {10x01, 00x01, x0101}, 01xx0 \ {01000, 010x0, 01110}} {} {0x1x0 \ {01100, 00100, 01110}, xxx11 \ {01111, x1x11, 0x011}} {} {} {} {} {} {0xx1x \ {01010, 0xx11, 01110}, 0x1xx \ {01110, 001x0, 0x110}} {010x0 \ {01010}} { 010100xx10 \ { 0101001010, 0101001110, 010100xx10}, 010x00x1x0 \ { 010100x100, 010000x110, 010x001110, 010x0001x0, 010x00x110, 010100x1x0}} {11xxx \ {111x1, 11101}} {} {} {xx000 \ {01000, x0000, 10000}} {x000x \ {00001, x0001, x0001}} { x0000xx000 \ { x000001000, x0000x0000, x000010000}} {00x1x \ {0001x, 00x11, 0011x}, xxx10 \ {0xx10, 0x010, 1xx10}} {0xxx1 \ {010x1, 01111, 00xx1}, 1xx01 \ {11x01, 10101, 10001}, 00x1x \ {00111, 0001x, 00x10}} { 0xx1100x11 \ { 0xx1100011, 0xx1100x11, 0xx1100111, 0101100x11, 0111100x11, 00x1100x11}, 00x1x00x1x \ { 00x1100x10, 00x1000x11, 00x1x0001x, 00x1x00x11, 00x1x0011x, 0011100x1x, 0001x00x1x, 00x1000x1x}, 00x10xxx10 \ { 00x100xx10, 00x100x010, 00x101xx10, 00010xxx10, 00x10xxx10}} {1x1xx \ {10101, 1011x, 1x1x0}, 001xx \ {0010x, 0011x, 001x0}} {01xxx \ {010x1, 011x1}, 10x11 \ {10011, 10111, 10111}} { 01xxx1x1xx \ { 01xx11x1x0, 01xx01x1x1, 01x1x1x10x, 01x0x1x11x, 01xxx10101, 01xxx1011x, 01xxx1x1x0, 010x11x1xx, 011x11x1xx}, 10x111x111 \ { 10x1110111, 100111x111, 101111x111, 101111x111}, 01xxx001xx \ { 01xx1001x0, 01xx0001x1, 01x1x0010x, 01x0x0011x, 01xxx0010x, 01xxx0011x, 01xxx001x0, 010x1001xx, 011x1001xx}, 10x1100111 \ { 10x1100111, 1001100111, 1011100111, 1011100111}} {010xx \ {01011, 01010, 0100x}, x1xx0 \ {11010, 01010, x1000}, 1x110 \ {11110, 10110}} {} {} {0x100 \ {01100}, 0x100 \ {01100, 00100}, 00x11 \ {00111, 00011}} {101xx \ {10110, 10100, 10111}, xxx0x \ {1x101, x1001, x010x}, x10x0 \ {01000, 110x0, 010x0}} { 101000x100 \ { 1010001100, 101000x100}, xxx000x100 \ { xxx0001100, x01000x100}, x10000x100 \ { x100001100, 010000x100, 110000x100, 010000x100}, 1011100x11 \ { 1011100111, 1011100011, 1011100x11}} {} {0xx00 \ {00x00, 00100}, x01x1 \ {101x1, 10101, 001x1}} {} {1xx11 \ {11011, 10x11, 11111}} {10x01 \ {10101, 10001}, xxx1x \ {10110, 00x11, 1x111}} { xxx111xx11 \ { xxx1111011, xxx1110x11, xxx1111111, 00x111xx11, 1x1111xx11}} {0x000 \ {01000, 00000}, 0x1x0 \ {0x110, 0x100, 01100}} {} {} {xx0x1 \ {00011, 11011, 000x1}} {xxx10 \ {11010, 0xx10, 0xx10}, 1x0x1 \ {11011, 110x1, 10001}, 0011x \ {00110, 00111}} { 1x0x1xx0x1 \ { 1x011xx001, 1x001xx011, 1x0x100011, 1x0x111011, 1x0x1000x1, 11011xx0x1, 110x1xx0x1, 10001xx0x1}, 00111xx011 \ { 0011100011, 0011111011, 0011100011, 00111xx011}} {x0xxx \ {10011, x001x, x00x0}} {1x010 \ {11010, 10010, 10010}, x1x1x \ {11010, x1110, x1110}} { 1x010x0x10 \ { 1x010x0010, 1x010x0010, 11010x0x10, 10010x0x10, 10010x0x10}, x1x1xx0x1x \ { x1x11x0x10, x1x10x0x11, x1x1x10011, x1x1xx001x, x1x1xx0010, 11010x0x1x, x1110x0x1x, x1110x0x1x}} {10xx1 \ {100x1, 10101, 10001}, 11x0x \ {11001, 11000, 1110x}, x111x \ {x1111, 11110}} {0x1x0 \ {01100, 0x110, 011x0}, x10x1 \ {11011, 010x1, x1001}} { x10x110xx1 \ { x101110x01, x100110x11, x10x1100x1, x10x110101, x10x110001, 1101110xx1, 010x110xx1, x100110xx1}, 0x10011x00 \ { 0x10011000, 0x10011100, 0110011x00, 0110011x00}, x100111x01 \ { x100111001, x100111101, 0100111x01, x100111x01}, 0x110x1110 \ { 0x11011110, 0x110x1110, 01110x1110}, x1011x1111 \ { x1011x1111, 11011x1111, 01011x1111}} {1x1xx \ {111xx, 1x1x1, 10111}} {xxxxx \ {x0x10, 001x0, x01x0}} { xxxxx1x1xx \ { xxxx11x1x0, xxxx01x1x1, xxx1x1x10x, xxx0x1x11x, xxxxx111xx, xxxxx1x1x1, xxxxx10111, x0x101x1xx, 001x01x1xx, x01x01x1xx}} {0xx10 \ {01010, 0x110}} {xxxxx \ {01x0x, 111x0, 11000}} { xxx100xx10 \ { xxx1001010, xxx100x110, 111100xx10}} {100xx \ {10011, 1001x, 100x1}, x01x0 \ {x0100, 001x0, 00100}} {1x10x \ {11100, 10100, 1010x}, x111x \ {x1111, 1111x, 01110}, x1x11 \ {01011, x1011, 11011}} { 1x10x1000x \ { 1x10110000, 1x10010001, 1x10x10001, 111001000x, 101001000x, 1010x1000x}, x111x1001x \ { x111110010, x111010011, x111x10011, x111x1001x, x111x10011, x11111001x, 1111x1001x, 011101001x}, x1x1110011 \ { x1x1110011, x1x1110011, x1x1110011, 0101110011, x101110011, 1101110011}, 1x100x0100 \ { 1x100x0100, 1x10000100, 1x10000100, 11100x0100, 10100x0100, 10100x0100}, x1110x0110 \ { x111000110, 11110x0110, 01110x0110}} {xxx1x \ {11x1x, 00x11, 0x110}, 100xx \ {10010, 10001, 10000}} {xxxx0 \ {11100, 11x00, 01xx0}, xxx0x \ {01x00, 1010x, x1000}} { xxx10xxx10 \ { xxx1011x10, xxx100x110, 01x10xxx10}, xxxx0100x0 \ { xxx1010000, xxx0010010, xxxx010010, xxxx010000, 11100100x0, 11x00100x0, 01xx0100x0}, xxx0x1000x \ { xxx0110000, xxx0010001, xxx0x10001, xxx0x10000, 01x001000x, 1010x1000x, x10001000x}} {} {1x10x \ {11100, 1010x, 1010x}, 10x11 \ {10111}} {} {x01x1 \ {x0111, 101x1, 10101}, 1xxx0 \ {1x000, 1xx00, 11xx0}} {0xxx0 \ {011x0, 0x0x0, 00000}} { 0xxx01xxx0 \ { 0xx101xx00, 0xx001xx10, 0xxx01x000, 0xxx01xx00, 0xxx011xx0, 011x01xxx0, 0x0x01xxx0, 000001xxx0}} {0011x \ {00111, 00110}, 11x0x \ {1100x, 11x00, 11x00}} {1110x \ {11100, 11101, 11101}, 1x0xx \ {110x1, 1x000, 1x000}} { 1x01x0011x \ { 1x01100110, 1x01000111, 1x01x00111, 1x01x00110, 110110011x}, 1110x11x0x \ { 1110111x00, 1110011x01, 1110x1100x, 1110x11x00, 1110x11x00, 1110011x0x, 1110111x0x, 1110111x0x}, 1x00x11x0x \ { 1x00111x00, 1x00011x01, 1x00x1100x, 1x00x11x00, 1x00x11x00, 1100111x0x, 1x00011x0x, 1x00011x0x}} {1xx0x \ {11101, 10000, 10000}, 00x01 \ {00001, 00101}} {0x11x \ {0x110, 0111x, 00110}} {} {} {x111x \ {01111, 11111}, 0x0x0 \ {000x0, 010x0, 01000}, xx110 \ {0x110, 11110, 00110}} {} {01x0x \ {0100x, 01101, 01101}} {101x0 \ {10110, 10100}} { 1010001x00 \ { 1010001000, 1010001x00}} {xx0xx \ {x100x, x1010, 0x000}} {1xx1x \ {10x10, 11010, 1xx10}, 11x00 \ {11100, 11000, 11000}, 0x01x \ {01011, 00010, 01010}} { 1xx1xxx01x \ { 1xx11xx010, 1xx10xx011, 1xx1xx1010, 10x10xx01x, 11010xx01x, 1xx10xx01x}, 11x00xx000 \ { 11x00x1000, 11x000x000, 11100xx000, 11000xx000, 11000xx000}, 0x01xxx01x \ { 0x011xx010, 0x010xx011, 0x01xx1010, 01011xx01x, 00010xx01x, 01010xx01x}} {x100x \ {01000, x1000, 01001}, x0x11 \ {00011, x0111}} {0111x \ {01111, 01110, 01110}, 0x01x \ {01010, 0001x, 0101x}} { 01111x0x11 \ { 0111100011, 01111x0111, 01111x0x11}, 0x011x0x11 \ { 0x01100011, 0x011x0111, 00011x0x11, 01011x0x11}} {x1x1x \ {01x1x, 0111x, 1101x}} {} {} {0xxx0 \ {0x0x0, 01010, 0x010}} {xxx01 \ {10x01, 1x101, 0xx01}, 00x1x \ {00110, 00011, 0011x}} { 00x100xx10 \ { 00x100x010, 00x1001010, 00x100x010, 001100xx10, 001100xx10}} {0xxx0 \ {0x000, 000x0, 00xx0}, xx1xx \ {1x10x, 01111, 01111}} {x1xx0 \ {110x0, x10x0, x1000}, x0xx0 \ {00100, 00000, 00110}} { x1xx00xxx0 \ { x1x100xx00, x1x000xx10, x1xx00x000, x1xx0000x0, x1xx000xx0, 110x00xxx0, x10x00xxx0, x10000xxx0}, x0xx00xxx0 \ { x0x100xx00, x0x000xx10, x0xx00x000, x0xx0000x0, x0xx000xx0, 001000xxx0, 000000xxx0, 001100xxx0}, x1xx0xx1x0 \ { x1x10xx100, x1x00xx110, x1xx01x100, 110x0xx1x0, x10x0xx1x0, x1000xx1x0}, x0xx0xx1x0 \ { x0x10xx100, x0x00xx110, x0xx01x100, 00100xx1x0, 00000xx1x0, 00110xx1x0}} {x0x0x \ {10101, 10x00, 00x00}, x1011 \ {11011, 01011}} {11x00 \ {11000}, x11x0 \ {x1100, 01100, 01110}, 1x100 \ {10100}} { 11x00x0x00 \ { 11x0010x00, 11x0000x00, 11000x0x00}, x1100x0x00 \ { x110010x00, x110000x00, x1100x0x00, 01100x0x00}, 1x100x0x00 \ { 1x10010x00, 1x10000x00, 10100x0x00}} {001xx \ {00101, 001x0, 00111}} {01x0x \ {01000, 0110x, 01x01}, 100x0 \ {10000}} { 01x0x0010x \ { 01x0100100, 01x0000101, 01x0x00101, 01x0x00100, 010000010x, 0110x0010x, 01x010010x}, 100x0001x0 \ { 1001000100, 1000000110, 100x0001x0, 10000001x0}} {110xx \ {110x1, 1101x}, 00xx1 \ {00001, 00x11}} {11xxx \ {11101, 11110, 111x0}, x01x1 \ {10101, 001x1, 101x1}} { 11xxx110xx \ { 11xx1110x0, 11xx0110x1, 11x1x1100x, 11x0x1101x, 11xxx110x1, 11xxx1101x, 11101110xx, 11110110xx, 111x0110xx}, x01x1110x1 \ { x011111001, x010111011, x01x1110x1, x01x111011, 10101110x1, 001x1110x1, 101x1110x1}, 11xx100xx1 \ { 11x1100x01, 11x0100x11, 11xx100001, 11xx100x11, 1110100xx1}, x01x100xx1 \ { x011100x01, x010100x11, x01x100001, x01x100x11, 1010100xx1, 001x100xx1, 101x100xx1}} {x01x0 \ {00100, 00110, 10110}} {x11x0 \ {x1110, 01110}} { x11x0x01x0 \ { x1110x0100, x1100x0110, x11x000100, x11x000110, x11x010110, x1110x01x0, 01110x01x0}} {xx10x \ {11100, 10100, 1110x}, 1110x \ {11100, 11101}, 1110x \ {11101, 11100, 11100}} {x1x10 \ {11x10, 11010, x1110}} {} {0x010 \ {00010}, 1x0x1 \ {10001, 110x1, 11011}} {x101x \ {x1011, 01011, 11011}, x110x \ {1110x, 01101}} { x10100x010 \ { x101000010}, x10111x011 \ { x101111011, x101111011, x10111x011, 010111x011, 110111x011}, x11011x001 \ { x110110001, x110111001, 111011x001, 011011x001}} {01x1x \ {0111x, 01010, 01110}} {} {} {00xxx \ {00x1x, 0000x}} {x00x1 \ {00011, 00001}, x00x1 \ {000x1, 10011, 00001}} { x00x100xx1 \ { x001100x01, x000100x11, x00x100x11, x00x100001, 0001100xx1, 0000100xx1}} {1x101 \ {10101, 11101}} {10xx1 \ {10111, 10001, 101x1}} { 10x011x101 \ { 10x0110101, 10x0111101, 100011x101, 101011x101}} {1x1xx \ {11100, 111xx, 10111}} {xx0x1 \ {x0001, 110x1, x10x1}, 1x110 \ {11110}} { xx0x11x1x1 \ { xx0111x101, xx0011x111, xx0x1111x1, xx0x110111, x00011x1x1, 110x11x1x1, x10x11x1x1}, 1x1101x110 \ { 1x11011110, 111101x110}} {xx0xx \ {110xx, x000x, 01010}} {1x10x \ {1x101, 1010x, 1x100}} { 1x10xxx00x \ { 1x101xx000, 1x100xx001, 1x10x1100x, 1x10xx000x, 1x101xx00x, 1010xxx00x, 1x100xx00x}} {x111x \ {0111x, x1111, 01111}} {xx1x0 \ {10100, 11100, 111x0}, xx0xx \ {010x1, 1001x, 10010}} { xx110x1110 \ { xx11001110, 11110x1110}, xx01xx111x \ { xx011x1110, xx010x1111, xx01x0111x, xx01xx1111, xx01x01111, 01011x111x, 1001xx111x, 10010x111x}} {1x10x \ {1110x, 1x100, 1010x}, xx0xx \ {01000, x10x0, x0011}} {} {} {110x1 \ {11001, 11011, 11011}, 0xx10 \ {00110, 01110, 00x10}, 0x1x0 \ {011x0, 001x0, 00100}} {1xx00 \ {10100, 11100, 11000}, xx10x \ {0x10x}} { xx10111001 \ { xx10111001, 0x10111001}, 1xx000x100 \ { 1xx0001100, 1xx0000100, 1xx0000100, 101000x100, 111000x100, 110000x100}, xx1000x100 \ { xx10001100, xx10000100, xx10000100, 0x1000x100}} {xx011 \ {01011, x0011, 10011}} {1xx11 \ {10x11, 11011, 11011}} { 1xx11xx011 \ { 1xx1101011, 1xx11x0011, 1xx1110011, 10x11xx011, 11011xx011, 11011xx011}} {xx110 \ {x0110, 01110, 11110}} {00x01 \ {00101, 00001}} {} {x0xxx \ {10011, 001xx, 00xx0}} {1xx0x \ {1000x, 1x000, 11x0x}} { 1xx0xx0x0x \ { 1xx01x0x00, 1xx00x0x01, 1xx0x0010x, 1xx0x00x00, 1000xx0x0x, 1x000x0x0x, 11x0xx0x0x}} {10xx1 \ {10101, 101x1}, 1010x \ {10100, 10101, 10101}} {10xx0 \ {10x00, 10010, 10110}} { 10x0010100 \ { 10x0010100, 10x0010100}} {xxx1x \ {0xx1x, 10x1x, x0x1x}, 1xxx1 \ {1x111, 11x11, 11xx1}} {01x1x \ {01110, 0111x, 01010}} { 01x1xxxx1x \ { 01x11xxx10, 01x10xxx11, 01x1x0xx1x, 01x1x10x1x, 01x1xx0x1x, 01110xxx1x, 0111xxxx1x, 01010xxx1x}, 01x111xx11 \ { 01x111x111, 01x1111x11, 01x1111x11, 011111xx11}} {xx110 \ {x1110, 1x110, 00110}, 10xx0 \ {100x0, 10100, 10110}} {x01xx \ {10111, 00101, x0110}} { x0110xx110 \ { x0110x1110, x01101x110, x011000110, x0110xx110}, x01x010xx0 \ { x011010x00, x010010x10, x01x0100x0, x01x010100, x01x010110, x011010xx0}} {0x10x \ {00101, 01101, 00100}, x011x \ {00111, x0110, 1011x}} {0xxx0 \ {01000, 01xx0, 0x000}} { 0xx000x100 \ { 0xx0000100, 010000x100, 01x000x100, 0x0000x100}, 0xx10x0110 \ { 0xx10x0110, 0xx1010110, 01x10x0110}} {xxx11 \ {00011, x0111, 1xx11}} {x1x00 \ {01000}, x1xx1 \ {x10x1, 01111}} { x1x11xxx11 \ { x1x1100011, x1x11x0111, x1x111xx11, x1011xxx11, 01111xxx11}} {} {111xx \ {111x1, 11111, 11110}} {} {xx0x1 \ {010x1, 11001, 000x1}, x11x0 \ {111x0, 11100, 01110}} {00x1x \ {00x10, 00110, 00011}, 0xxx1 \ {01xx1, 0x111, 00001}} { 00x11xx011 \ { 00x1101011, 00x1100011, 00011xx011}, 0xxx1xx0x1 \ { 0xx11xx001, 0xx01xx011, 0xxx1010x1, 0xxx111001, 0xxx1000x1, 01xx1xx0x1, 0x111xx0x1, 00001xx0x1}, 00x10x1110 \ { 00x1011110, 00x1001110, 00x10x1110, 00110x1110}} {x1x01 \ {11101, 11001, x1001}, 1xxx0 \ {10100, 11xx0}} {00xxx \ {000xx, 00xx1}, x100x \ {01000, x1001}} { 00x01x1x01 \ { 00x0111101, 00x0111001, 00x01x1001, 00001x1x01, 00x01x1x01}, x1001x1x01 \ { x100111101, x100111001, x1001x1001, x1001x1x01}, 00xx01xxx0 \ { 00x101xx00, 00x001xx10, 00xx010100, 00xx011xx0, 000x01xxx0}, x10001xx00 \ { x100010100, x100011x00, 010001xx00}} {xx01x \ {00010, x001x, 11011}} {10xx1 \ {101x1, 10101, 10111}, 1x11x \ {11111, 10111}} { 10x11xx011 \ { 10x11x0011, 10x1111011, 10111xx011, 10111xx011}, 1x11xxx01x \ { 1x111xx010, 1x110xx011, 1x11x00010, 1x11xx001x, 1x11x11011, 11111xx01x, 10111xx01x}} {01x1x \ {0101x, 01010, 01111}, 10x0x \ {10000, 10101, 10001}} {} {} {} {xx01x \ {00010, 11010, 1x011}} {} {x1001 \ {11001, 01001}, xx100 \ {11100, 0x100, 01100}} {x010x \ {10100, x0100, 10101}} { x0101x1001 \ { x010111001, x010101001, 10101x1001}, x0100xx100 \ { x010011100, x01000x100, x010001100, 10100xx100, x0100xx100}} {} {x110x \ {01101, 0110x, 01100}, 11x0x \ {11101, 1100x}, xx10x \ {x010x, 1x100, x0100}} {} {0011x \ {00111}, x1x0x \ {01x0x, 01001, 01000}} {110x0 \ {11010, 11000, 11000}, x1xx1 \ {11xx1, 01x01, 11001}, x1x01 \ {01001, x1101}} { 1101000110 \ { 1101000110}, x1x1100111 \ { x1x1100111, 11x1100111}, 11000x1x00 \ { 1100001x00, 1100001000, 11000x1x00, 11000x1x00}, x1x01x1x01 \ { x1x0101x01, x1x0101001, 11x01x1x01, 01x01x1x01, 11001x1x01}, x1x01x1x01 \ { x1x0101x01, x1x0101001, 01001x1x01, x1101x1x01}} {x0xx1 \ {00x11, 00xx1, 10101}, 1xx11 \ {11011, 11x11, 11x11}} {} {} {110xx \ {11000, 1101x}} {xx1xx \ {001x1, 0x11x, 1x100}, 0x1xx \ {0x111, 0x10x, 01100}, 00xx1 \ {00x11, 00111, 00011}} { xx1xx110xx \ { xx1x1110x0, xx1x0110x1, xx11x1100x, xx10x1101x, xx1xx11000, xx1xx1101x, 001x1110xx, 0x11x110xx, 1x100110xx}, 0x1xx110xx \ { 0x1x1110x0, 0x1x0110x1, 0x11x1100x, 0x10x1101x, 0x1xx11000, 0x1xx1101x, 0x111110xx, 0x10x110xx, 01100110xx}, 00xx1110x1 \ { 00x1111001, 00x0111011, 00xx111011, 00x11110x1, 00111110x1, 00011110x1}} {x1x0x \ {11x01, x1000, x110x}, x010x \ {10100, x0100, 00101}, 01xxx \ {01011, 01x11, 0111x}} {101xx \ {101x1, 1010x, 10110}, 11x1x \ {1101x, 11011}} { 1010xx1x0x \ { 10101x1x00, 10100x1x01, 1010x11x01, 1010xx1000, 1010xx110x, 10101x1x0x, 1010xx1x0x}, 1010xx010x \ { 10101x0100, 10100x0101, 1010x10100, 1010xx0100, 1010x00101, 10101x010x, 1010xx010x}, 101xx01xxx \ { 101x101xx0, 101x001xx1, 1011x01x0x, 1010x01x1x, 101xx01011, 101xx01x11, 101xx0111x, 101x101xxx, 1010x01xxx, 1011001xxx}, 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01011, 11x1x01x11, 11x1x0111x, 1101x01x1x, 1101101x1x}} {10x00 \ {10100, 10000}} {x01xx \ {10101, 00111, 0011x}} { x010010x00 \ { x010010100, x010010000}} {10xxx \ {10111, 10001, 10x10}} {x1111 \ {01111, 11111}} { x111110x11 \ { x111110111, 0111110x11, 1111110x11}} {1x000 \ {11000, 10000, 10000}} {00x0x \ {0010x, 0000x, 0000x}} { 00x001x000 \ { 00x0011000, 00x0010000, 00x0010000, 001001x000, 000001x000, 000001x000}} {} {xxx1x \ {01011, x0x11, 1x01x}, 0x10x \ {0110x, 0x100, 0010x}, 1x01x \ {1101x, 11010}} {} {x0x00 \ {00100, 10x00, x0000}, x01x1 \ {00101, 10101, 00111}} {00x0x \ {0000x, 0010x}, 1x0x1 \ {10001, 1x001}} { 00x00x0x00 \ { 00x0000100, 00x0010x00, 00x00x0000, 00000x0x00, 00100x0x00}, 00x01x0101 \ { 00x0100101, 00x0110101, 00001x0101, 00101x0101}, 1x0x1x01x1 \ { 1x011x0101, 1x001x0111, 1x0x100101, 1x0x110101, 1x0x100111, 10001x01x1, 1x001x01x1}} {00xx1 \ {000x1, 00001}} {x1100 \ {11100}} {} {1x10x \ {1x100, 10100, 1x101}, x1xx0 \ {01x10, x10x0, x1000}} {xx00x \ {0100x, xx001, x100x}} { xx00x1x10x \ { xx0011x100, xx0001x101, xx00x1x100, xx00x10100, xx00x1x101, 0100x1x10x, xx0011x10x, x100x1x10x}, xx000x1x00 \ { xx000x1000, xx000x1000, 01000x1x00, x1000x1x00}} {} {00x0x \ {00100, 00x00, 00x00}, x0x11 \ {x0011, 00111, 10011}} {} {x001x \ {00010, 10010, 00011}} {xxxxx \ {x0010, 11x11, 1xx00}, xxx10 \ {1x010, x1110, 00110}} { xxx1xx001x \ { xxx11x0010, xxx10x0011, xxx1x00010, xxx1x10010, xxx1x00011, x0010x001x, 11x11x001x}, xxx10x0010 \ { xxx1000010, xxx1010010, 1x010x0010, x1110x0010, 00110x0010}} {xxx00 \ {x0x00, x1100, x1000}} {xx1x1 \ {11101, 00111, 101x1}, x1x11 \ {11x11, 01x11}} {} {0110x \ {01100, 01101}} {} {} {0x101 \ {01101}, 10x01 \ {10001, 10101}} {01x1x \ {0111x, 01x11, 01111}} {} {xx0x1 \ {000x1, 10011}, 111xx \ {11101, 11111, 1111x}, x0x00 \ {00100, 10x00, 00000}} {00x1x \ {00111, 0011x}} { 00x11xx011 \ { 00x1100011, 00x1110011, 00111xx011, 00111xx011}, 00x1x1111x \ { 00x1111110, 00x1011111, 00x1x11111, 00x1x1111x, 001111111x, 0011x1111x}} {x1x10 \ {x1110, 11110, x1010}, x11x0 \ {01100, 01110}} {0xx10 \ {0x110, 00x10, 00x10}} { 0xx10x1x10 \ { 0xx10x1110, 0xx1011110, 0xx10x1010, 0x110x1x10, 00x10x1x10, 00x10x1x10}, 0xx10x1110 \ { 0xx1001110, 0x110x1110, 00x10x1110, 00x10x1110}} {x110x \ {11100, x1100, x1101}} {1xx1x \ {10010, 1x011, 1x01x}} {} {0100x \ {01000, 01001, 01001}, 1x0xx \ {1000x, 1101x, 110x1}} {x110x \ {11101, 0110x}, 11xxx \ {11x10, 11x11, 11011}} { x110x0100x \ { x110101000, x110001001, x110x01000, x110x01001, x110x01001, 111010100x, 0110x0100x}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01000, 11x0x01001, 11x0x01001}, x110x1x00x \ { x11011x000, x11001x001, x110x1000x, x110x11001, 111011x00x, 0110x1x00x}, 11xxx1x0xx \ { 11xx11x0x0, 11xx01x0x1, 11x1x1x00x, 11x0x1x01x, 11xxx1000x, 11xxx1101x, 11xxx110x1, 11x101x0xx, 11x111x0xx, 110111x0xx}} {01xxx \ {01010, 01x0x, 01111}} {x00x1 \ {00011, 100x1, 00001}} { x00x101xx1 \ { x001101x01, x000101x11, x00x101x01, x00x101111, 0001101xx1, 100x101xx1, 0000101xx1}} {1x0x1 \ {10001, 1x011, 100x1}, x0110 \ {10110, 00110, 00110}} {1xxxx \ {11100, 101xx, 101xx}, x1xx1 \ {111x1, 11001, 010x1}} { 1xxx11x0x1 \ { 1xx111x001, 1xx011x011, 1xxx110001, 1xxx11x011, 1xxx1100x1, 101x11x0x1, 101x11x0x1}, x1xx11x0x1 \ { x1x111x001, x1x011x011, x1xx110001, x1xx11x011, x1xx1100x1, 111x11x0x1, 110011x0x1, 010x11x0x1}, 1xx10x0110 \ { 1xx1010110, 1xx1000110, 1xx1000110, 10110x0110, 10110x0110}} {xx111 \ {01111, 10111, 10111}, 0xx10 \ {00x10, 00010, 01110}, x0x0x \ {1010x, 10001, x000x}} {101xx \ {1011x, 101x0, 10110}, x111x \ {11111, 01111, 01111}, x11x1 \ {x1111, x1101, x1101}} { 10111xx111 \ { 1011101111, 1011110111, 1011110111, 10111xx111}, x1111xx111 \ { x111101111, x111110111, x111110111, 11111xx111, 01111xx111, 01111xx111}, 101100xx10 \ { 1011000x10, 1011000010, 1011001110, 101100xx10, 101100xx10, 101100xx10}, x11100xx10 \ { x111000x10, x111000010, x111001110}, 1010xx0x0x \ { 10101x0x00, 10100x0x01, 1010x1010x, 1010x10001, 1010xx000x, 10100x0x0x}, x1101x0x01 \ { x110110101, x110110001, x1101x0001, x1101x0x01, x1101x0x01}} {} {x0xx1 \ {100x1, 000x1, 00x01}, 100xx \ {100x0, 10001, 100x1}} {} {x11xx \ {x111x, 011x0, x11x1}, 1xxxx \ {11xxx, 1111x, 11111}, 00xx0 \ {00010, 00100, 00110}} {01xxx \ {011x0, 01101, 010x1}, 11xx0 \ {11000, 11010}} { 01xxxx11xx \ { 01xx1x11x0, 01xx0x11x1, 01x1xx110x, 01x0xx111x, 01xxxx111x, 01xxx011x0, 01xxxx11x1, 011x0x11xx, 01101x11xx, 010x1x11xx}, 11xx0x11x0 \ { 11x10x1100, 11x00x1110, 11xx0x1110, 11xx0011x0, 11000x11x0, 11010x11x0}, 01xxx1xxxx \ { 01xx11xxx0, 01xx01xxx1, 01x1x1xx0x, 01x0x1xx1x, 01xxx11xxx, 01xxx1111x, 01xxx11111, 011x01xxxx, 011011xxxx, 010x11xxxx}, 11xx01xxx0 \ { 11x101xx00, 11x001xx10, 11xx011xx0, 11xx011110, 110001xxx0, 110101xxx0}, 01xx000xx0 \ { 01x1000x00, 01x0000x10, 01xx000010, 01xx000100, 01xx000110, 011x000xx0}, 11xx000xx0 \ { 11x1000x00, 11x0000x10, 11xx000010, 11xx000100, 11xx000110, 1100000xx0, 1101000xx0}} {xxx01 \ {0x101, x0x01, 00001}, x01x0 \ {00100, 101x0}} {xxx1x \ {x1x10, 01111, x0x10}} { xxx10x0110 \ { xxx1010110, x1x10x0110, x0x10x0110}} {x1xx0 \ {01x10, 11x10, x1x00}, x11x1 \ {011x1, 11101, 11101}} {x010x \ {00101, x0101}, 01xxx \ {01011, 01x10, 0101x}, x00x1 \ {00001, 10011, 000x1}} { x0100x1x00 \ { x0100x1x00}, 01xx0x1xx0 \ { 01x10x1x00, 01x00x1x10, 01xx001x10, 01xx011x10, 01xx0x1x00, 01x10x1xx0, 01010x1xx0}, x0101x1101 \ { x010101101, x010111101, x010111101, 00101x1101, x0101x1101}, 01xx1x11x1 \ { 01x11x1101, 01x01x1111, 01xx1011x1, 01xx111101, 01xx111101, 01011x11x1, 01011x11x1}, x00x1x11x1 \ { x0011x1101, x0001x1111, x00x1011x1, x00x111101, x00x111101, 00001x11x1, 10011x11x1, 000x1x11x1}} {} {x1x1x \ {x1110, 01010, 1101x}} {} {xx0x0 \ {x10x0, 10000, 01010}, 1x1x1 \ {11101, 11111, 10101}} {x0xx0 \ {x0x00, 00x10}} { x0xx0xx0x0 \ { x0x10xx000, x0x00xx010, x0xx0x10x0, x0xx010000, x0xx001010, x0x00xx0x0, 00x10xx0x0}} {} {xx0xx \ {x00x1, 11010, x1000}} {} {001xx \ {00100, 0010x, 0011x}, 01x0x \ {01100, 01x00, 01x00}} {xx0xx \ {00001, 11011, 00010}} { xx0xx001xx \ { xx0x1001x0, xx0x0001x1, xx01x0010x, xx00x0011x, xx0xx00100, xx0xx0010x, xx0xx0011x, 00001001xx, 11011001xx, 00010001xx}, xx00x01x0x \ { xx00101x00, xx00001x01, xx00x01100, xx00x01x00, xx00x01x00, 0000101x0x}} {110x0 \ {11010, 11000}, x100x \ {01001, 1100x, 0100x}} {1x001 \ {10001, 11001, 11001}, 1011x \ {10111, 10110, 10110}} { 1011011010 \ { 1011011010, 1011011010, 1011011010}, 1x001x1001 \ { 1x00101001, 1x00111001, 1x00101001, 10001x1001, 11001x1001, 11001x1001}} {xx0x0 \ {x1000, 11010, 01010}} {1x0xx \ {1x0x1, 1001x, 10000}, 011x1 \ {01101}, xx10x \ {xx101, 0110x, x010x}} { 1x0x0xx0x0 \ { 1x010xx000, 1x000xx010, 1x0x0x1000, 1x0x011010, 1x0x001010, 10010xx0x0, 10000xx0x0}, xx100xx000 \ { xx100x1000, 01100xx000, x0100xx000}} {x01x0 \ {x0110, 00100}} {0x0xx \ {00000, 010x0, 01001}, 01x11 \ {01111, 01011}, 01xx0 \ {01100, 01010, 01010}} { 0x0x0x01x0 \ { 0x010x0100, 0x000x0110, 0x0x0x0110, 0x0x000100, 00000x01x0, 010x0x01x0}, 01xx0x01x0 \ { 01x10x0100, 01x00x0110, 01xx0x0110, 01xx000100, 01100x01x0, 01010x01x0, 01010x01x0}} {1xx10 \ {10x10, 10110, 10110}, xxx1x \ {1001x, 0011x, x1010}, 1xx10 \ {10110, 1x110, 11010}} {0x10x \ {01101, 00100, 01100}} {} {0x1x0 \ {01110, 011x0, 0x110}, x100x \ {11000, 0100x, 01001}, x11xx \ {011x0, 11111, x11x1}} {011x0 \ {01110}, x1xxx \ {11x10, 01100, 110x0}} { 011x00x1x0 \ { 011100x100, 011000x110, 011x001110, 011x0011x0, 011x00x110, 011100x1x0}, x1xx00x1x0 \ { x1x100x100, x1x000x110, x1xx001110, x1xx0011x0, x1xx00x110, 11x100x1x0, 011000x1x0, 110x00x1x0}, 01100x1000 \ { 0110011000, 0110001000}, x1x0xx100x \ { x1x01x1000, x1x00x1001, x1x0x11000, x1x0x0100x, x1x0x01001, 01100x100x, 11000x100x}, 011x0x11x0 \ { 01110x1100, 01100x1110, 011x0011x0, 01110x11x0}, x1xxxx11xx \ { x1xx1x11x0, x1xx0x11x1, x1x1xx110x, x1x0xx111x, x1xxx011x0, x1xxx11111, x1xxxx11x1, 11x10x11xx, 01100x11xx, 110x0x11xx}} {0x10x \ {0010x, 01101, 00101}, x1000 \ {11000, 01000}} {11xxx \ {11000, 11010, 11x00}, xx001 \ {00001, 1x001}} { 11x0x0x10x \ { 11x010x100, 11x000x101, 11x0x0010x, 11x0x01101, 11x0x00101, 110000x10x, 11x000x10x}, xx0010x101 \ { xx00100101, xx00101101, xx00100101, 000010x101, 1x0010x101}, 11x00x1000 \ { 11x0011000, 11x0001000, 11000x1000, 11x00x1000}} {10x0x \ {10101, 10000}, 0xx0x \ {00x01, 01x00, 01100}} {xx011 \ {01011, x1011}, x011x \ {x0110, 1011x, 10110}} {} {x0xx1 \ {10011, x01x1, 10101}, x1xxx \ {x10x1, 11011, 110x0}} {xx0x0 \ {01010, 1x000, x1010}, 0xxx0 \ {01110, 00000, 001x0}, 10xx1 \ {10111, 101x1, 10101}} { 10xx1x0xx1 \ { 10x11x0x01, 10x01x0x11, 10xx110011, 10xx1x01x1, 10xx110101, 10111x0xx1, 101x1x0xx1, 10101x0xx1}, xx0x0x1xx0 \ { xx010x1x00, xx000x1x10, xx0x0110x0, 01010x1xx0, 1x000x1xx0, x1010x1xx0}, 0xxx0x1xx0 \ { 0xx10x1x00, 0xx00x1x10, 0xxx0110x0, 01110x1xx0, 00000x1xx0, 001x0x1xx0}, 10xx1x1xx1 \ { 10x11x1x01, 10x01x1x11, 10xx1x10x1, 10xx111011, 10111x1xx1, 101x1x1xx1, 10101x1xx1}} {x0x00 \ {10x00, 00x00, x0000}, 0xx00 \ {00000, 01000, 00100}} {1000x \ {10001, 10000}} { 10000x0x00 \ { 1000010x00, 1000000x00, 10000x0000, 10000x0x00}, 100000xx00 \ { 1000000000, 1000001000, 1000000100, 100000xx00}} {x101x \ {01010, 11011, 11011}, 10xxx \ {1001x, 100xx, 10000}} {111xx \ {11110, 11111, 1111x}, 011xx \ {01110, 01101, 011x1}} { 1111xx101x \ { 11111x1010, 11110x1011, 1111x01010, 1111x11011, 1111x11011, 11110x101x, 11111x101x, 1111xx101x}, 0111xx101x \ { 01111x1010, 01110x1011, 0111x01010, 0111x11011, 0111x11011, 01110x101x, 01111x101x}, 111xx10xxx \ { 111x110xx0, 111x010xx1, 1111x10x0x, 1110x10x1x, 111xx1001x, 111xx100xx, 111xx10000, 1111010xxx, 1111110xxx, 1111x10xxx}, 011xx10xxx \ { 011x110xx0, 011x010xx1, 0111x10x0x, 0110x10x1x, 011xx1001x, 011xx100xx, 011xx10000, 0111010xxx, 0110110xxx, 011x110xxx}} {x1x11 \ {01011, 01x11}, xxx01 \ {01x01, 00101, x0x01}} {xx111 \ {10111, x1111, x1111}, x1xx1 \ {01x11, 11x11, x1x11}} { xx111x1x11 \ { xx11101011, xx11101x11, 10111x1x11, x1111x1x11, x1111x1x11}, x1x11x1x11 \ { x1x1101011, x1x1101x11, 01x11x1x11, 11x11x1x11, x1x11x1x11}, x1x01xxx01 \ { x1x0101x01, x1x0100101, x1x01x0x01}} {} {x11xx \ {1110x, x11x0, 111x1}, 00x0x \ {00x01, 0010x, 00100}} {} {1xxx1 \ {1x001, 1xx01, 11x11}, x1xxx \ {01001, x100x, 11001}} {xxx10 \ {x0010, x0x10, xx010}, 1xx10 \ {10110, 11110, 11110}} { xxx10x1x10 \ { x0010x1x10, x0x10x1x10, xx010x1x10}, 1xx10x1x10 \ { 10110x1x10, 11110x1x10, 11110x1x10}} {x11x0 \ {01100, 011x0, 11110}, 0100x \ {01000, 01001}} {010x0 \ {01000, 01010, 01010}, 0xx01 \ {0x001, 00101}} { 010x0x11x0 \ { 01010x1100, 01000x1110, 010x001100, 010x0011x0, 010x011110, 01000x11x0, 01010x11x0, 01010x11x0}, 0100001000 \ { 0100001000, 0100001000}, 0xx0101001 \ { 0xx0101001, 0x00101001, 0010101001}} {1x000 \ {10000, 11000}, x0x10 \ {00110, 10110}, 01xx0 \ {01000, 01010}} {} {} {0xx1x \ {0001x, 00x10, 0x01x}, 1x1x1 \ {10111, 101x1, 10101}} {x0xxx \ {10xx1, x0001, 101x1}, 00x1x \ {00x11, 00011, 00011}} { x0x1x0xx1x \ { x0x110xx10, x0x100xx11, x0x1x0001x, x0x1x00x10, x0x1x0x01x, 10x110xx1x, 101110xx1x}, 00x1x0xx1x \ { 00x110xx10, 00x100xx11, 00x1x0001x, 00x1x00x10, 00x1x0x01x, 00x110xx1x, 000110xx1x, 000110xx1x}, x0xx11x1x1 \ { x0x111x101, x0x011x111, x0xx110111, x0xx1101x1, x0xx110101, 10xx11x1x1, x00011x1x1, 101x11x1x1}, 00x111x111 \ { 00x1110111, 00x1110111, 00x111x111, 000111x111, 000111x111}} {x10x0 \ {11000, 010x0, 01000}, x11x0 \ {x1110, 01110, 11100}, x001x \ {x0011, 00011, 10010}} {0x011 \ {01011}} { 0x011x0011 \ { 0x011x0011, 0x01100011, 01011x0011}} {111x1 \ {11111}} {x111x \ {0111x, x1110, 11111}, 1xx10 \ {11010, 10x10, 1x110}} { x111111111 \ { x111111111, 0111111111, 1111111111}} {110x0 \ {11010, 11000}} {x10xx \ {110x1, 010x0, x1000}} { x10x0110x0 \ { x101011000, x100011010, x10x011010, x10x011000, 010x0110x0, x1000110x0}} {x11xx \ {x1100, x1101}, x0xx1 \ {10001, 101x1, x0x11}, 11x0x \ {1110x, 11100, 11100}} {x0xxx \ {00xx0, 000x0, 101x1}} { x0xxxx11xx \ { x0xx1x11x0, x0xx0x11x1, x0x1xx110x, x0x0xx111x, x0xxxx1100, x0xxxx1101, 00xx0x11xx, 000x0x11xx, 101x1x11xx}, x0xx1x0xx1 \ { x0x11x0x01, x0x01x0x11, x0xx110001, x0xx1101x1, x0xx1x0x11, 101x1x0xx1}, x0x0x11x0x \ { x0x0111x00, x0x0011x01, x0x0x1110x, x0x0x11100, x0x0x11100, 00x0011x0x, 0000011x0x, 1010111x0x}} {1000x \ {10001, 10000}} {} {} {xx001 \ {x1001, 01001, 00001}, x1x11 \ {11x11, 01111}, 0xx00 \ {00000, 0x000, 00100}} {x01xx \ {x0111, 00101, 10111}, 110xx \ {11001, 11011, 1101x}} { x0101xx001 \ { x0101x1001, x010101001, x010100001, 00101xx001}, 11001xx001 \ { 11001x1001, 1100101001, 1100100001, 11001xx001}, x0111x1x11 \ { x011111x11, x011101111, x0111x1x11, 10111x1x11}, 11011x1x11 \ { 1101111x11, 1101101111, 11011x1x11, 11011x1x11}, x01000xx00 \ { x010000000, x01000x000, x010000100}, 110000xx00 \ { 1100000000, 110000x000, 1100000100}} {0xxx1 \ {010x1, 00x01, 000x1}, x0xxx \ {x0x00, 00101, 10x11}} {00x00 \ {00100, 00000}, x11xx \ {11101, 011x1, 011xx}} { x11x10xxx1 \ { x11110xx01, x11010xx11, x11x1010x1, x11x100x01, x11x1000x1, 111010xxx1, 011x10xxx1, 011x10xxx1}, 00x00x0x00 \ { 00x00x0x00, 00100x0x00, 00000x0x00}, x11xxx0xxx \ { x11x1x0xx0, x11x0x0xx1, x111xx0x0x, x110xx0x1x, x11xxx0x00, x11xx00101, x11xx10x11, 11101x0xxx, 011x1x0xxx, 011xxx0xxx}} {0xx01 \ {00001, 01001, 01001}, 10xx0 \ {10110, 10100}} {11x01 \ {11001, 11101, 11101}} { 11x010xx01 \ { 11x0100001, 11x0101001, 11x0101001, 110010xx01, 111010xx01, 111010xx01}} {xxx1x \ {00x11, 1111x, 0001x}, xx0xx \ {x1001, 010x0, xx011}} {} {} {xx1xx \ {00100, 011xx, x1101}, x1xxx \ {01xx0, 010x1, x11x1}, xxx10 \ {10010, 10110, 01010}} {x01x1 \ {x0111, 101x1, 10111}} { x01x1xx1x1 \ { x0111xx101, x0101xx111, x01x1011x1, x01x1x1101, x0111xx1x1, 101x1xx1x1, 10111xx1x1}, x01x1x1xx1 \ { x0111x1x01, x0101x1x11, x01x1010x1, x01x1x11x1, x0111x1xx1, 101x1x1xx1, 10111x1xx1}} {11xx0 \ {110x0, 11000, 11x00}} {x01xx \ {101x1, 0010x, 00101}} { x01x011xx0 \ { x011011x00, x010011x10, x01x0110x0, x01x011000, x01x011x00, 0010011xx0}} {0xx11 \ {01x11, 00x11, 00x11}, 011xx \ {01100, 011x0, 011x1}, 10xx1 \ {101x1, 10x01, 10101}} {xx1x1 \ {111x1, 0x1x1, 0x1x1}, 0x1x0 \ {01100, 0x110}} { xx1110xx11 \ { xx11101x11, xx11100x11, xx11100x11, 111110xx11, 0x1110xx11, 0x1110xx11}, xx1x1011x1 \ { xx11101101, xx10101111, xx1x1011x1, 111x1011x1, 0x1x1011x1, 0x1x1011x1}, 0x1x0011x0 \ { 0x11001100, 0x10001110, 0x1x001100, 0x1x0011x0, 01100011x0, 0x110011x0}, xx1x110xx1 \ { xx11110x01, xx10110x11, xx1x1101x1, xx1x110x01, xx1x110101, 111x110xx1, 0x1x110xx1, 0x1x110xx1}} {x1x00 \ {x1000, 11x00, x1100}} {xx011 \ {0x011, x1011}, x11xx \ {01110, 01111, 111xx}} { x1100x1x00 \ { x1100x1000, x110011x00, x1100x1100, 11100x1x00}} {11xx0 \ {11x10, 11110, 11010}, 1x1x0 \ {10110, 1x100, 1x100}} {x0x0x \ {00001, x000x, 00101}, xx1x1 \ {11111, xx111, 011x1}} { x0x0011x00 \ { x000011x00}, x0x001x100 \ { x0x001x100, x0x001x100, x00001x100}} {0xxx0 \ {0x010, 01010, 00110}} {x101x \ {11010, 01011, 01010}} { x10100xx10 \ { x10100x010, x101001010, x101000110, 110100xx10, 010100xx10}} {1x00x \ {1100x, 10000, 11000}, 00x10 \ {00010, 00110}} {xx1xx \ {x0101, 011xx, 101x1}, 101xx \ {10111, 10101, 101x1}, xx100 \ {01100, 1x100, 1x100}} { xx10x1x00x \ { xx1011x000, xx1001x001, xx10x1100x, xx10x10000, xx10x11000, x01011x00x, 0110x1x00x, 101011x00x}, 1010x1x00x \ { 101011x000, 101001x001, 1010x1100x, 1010x10000, 1010x11000, 101011x00x, 101011x00x}, xx1001x000 \ { xx10011000, xx10010000, xx10011000, 011001x000, 1x1001x000, 1x1001x000}, xx11000x10 \ { xx11000010, xx11000110, 0111000x10}, 1011000x10 \ { 1011000010, 1011000110}} {10xx1 \ {10011, 10111, 10001}} {010x1 \ {01001, 01011}, 111x0 \ {11100, 11110}} { 010x110xx1 \ { 0101110x01, 0100110x11, 010x110011, 010x110111, 010x110001, 0100110xx1, 0101110xx1}} {1x1x1 \ {11111, 10111, 101x1}} {1x11x \ {1011x, 10110, 1111x}} { 1x1111x111 \ { 1x11111111, 1x11110111, 1x11110111, 101111x111, 111111x111}} {x00x0 \ {00010, 10010, 100x0}} {x00x1 \ {00011, 10011}, 00x0x \ {00000, 00x01, 00001}} { 00x00x0000 \ { 00x0010000, 00000x0000}} {x10x0 \ {11000, 11010, 01000}} {1xxx1 \ {11111, 10101, 11x01}} {} {} {0xx0x \ {00101, 0xx01, 00000}, 0x0x0 \ {0x010, 000x0, 00000}} {} {0xx01 \ {00101, 00001, 00x01}, 01x11 \ {01111, 01011}} {} {} {x1xx1 \ {x1x01, 01011, x11x1}} {0x1x0 \ {0x100, 01110, 01110}, x00x0 \ {10010, 100x0, 100x0}} {} {0xx10 \ {0x010, 00110, 01010}, 10x11 \ {10011, 10111}} {} {} {xx011 \ {1x011, x0011}, 010x1 \ {01001, 01011}} {xx0xx \ {100xx, 1x011, xx0x0}} { xx011xx011 \ { xx0111x011, xx011x0011, 10011xx011, 1x011xx011}, xx0x1010x1 \ { xx01101001, xx00101011, xx0x101001, xx0x101011, 100x1010x1, 1x011010x1}} {} {xxxx0 \ {xx100, xx010, 10x10}} {} {xxxx0 \ {1x100, x1x10, x1110}} {x010x \ {x0101, 10100}, x0011 \ {10011, 00011}, x11x0 \ {01100, 11100, x1100}} { x0100xxx00 \ { x01001x100, 10100xxx00}, x11x0xxxx0 \ { x1110xxx00, x1100xxx10, x11x01x100, x11x0x1x10, x11x0x1110, 01100xxxx0, 11100xxxx0, x1100xxxx0}} {x0x00 \ {x0000, 00x00, 00000}, 0x1xx \ {0x100, 0111x, 011x0}} {1x1x1 \ {11101, 11111}, x1x10 \ {11010, 01x10, 01010}, x0x01 \ {00101, x0101}} { 1x1x10x1x1 \ { 1x1110x101, 1x1010x111, 1x1x101111, 111010x1x1, 111110x1x1}, x1x100x110 \ { x1x1001110, x1x1001110, 110100x110, 01x100x110, 010100x110}, x0x010x101 \ { 001010x101, x01010x101}} {0x01x \ {00010, 0001x, 0001x}} {0x0x1 \ {0x001, 010x1, 0x011}} { 0x0110x011 \ { 0x01100011, 0x01100011, 010110x011, 0x0110x011}} {} {} {} {00xxx \ {000x1, 00101}, 01x0x \ {0110x, 01100}} {01x10 \ {01010, 01110}, 1x00x \ {11001, 1100x, 10000}} { 01x1000x10 \ { 0101000x10, 0111000x10}, 1x00x00x0x \ { 1x00100x00, 1x00000x01, 1x00x00001, 1x00x00101, 1100100x0x, 1100x00x0x, 1000000x0x}, 1x00x01x0x \ { 1x00101x00, 1x00001x01, 1x00x0110x, 1x00x01100, 1100101x0x, 1100x01x0x, 1000001x0x}} {0x11x \ {0x111, 00111, 0x110}, 1xxx0 \ {10x10, 10x00, 1x0x0}, 0xxx1 \ {01001, 00x11, 0xx11}} {1xx10 \ {10010, 1x110, 10x10}, 111xx \ {111x0, 11110, 111x1}} { 1xx100x110 \ { 1xx100x110, 100100x110, 1x1100x110, 10x100x110}, 1111x0x11x \ { 111110x110, 111100x111, 1111x0x111, 1111x00111, 1111x0x110, 111100x11x, 111100x11x, 111110x11x}, 1xx101xx10 \ { 1xx1010x10, 1xx101x010, 100101xx10, 1x1101xx10, 10x101xx10}, 111x01xxx0 \ { 111101xx00, 111001xx10, 111x010x10, 111x010x00, 111x01x0x0, 111x01xxx0, 111101xxx0}, 111x10xxx1 \ { 111110xx01, 111010xx11, 111x101001, 111x100x11, 111x10xx11, 111x10xxx1}} {x1x00 \ {01x00, 11x00, x1000}} {01xxx \ {0111x, 011x1, 01x0x}} { 01x00x1x00 \ { 01x0001x00, 01x0011x00, 01x00x1000, 01x00x1x00}} {010xx \ {01000, 0101x, 01011}} {1x110 \ {11110, 10110}, 0011x \ {00111, 00110}} { 1x11001010 \ { 1x11001010, 1111001010, 1011001010}, 0011x0101x \ { 0011101010, 0011001011, 0011x0101x, 0011x01011, 001110101x, 001100101x}} {x01x0 \ {x0110, x0100}, 1x101 \ {10101}} {x0x1x \ {x001x, 10x11, 00111}} { x0x10x0110 \ { x0x10x0110, x0010x0110}} {101x1 \ {10101, 10111, 10111}, 0010x \ {00101, 00100, 00100}} {0x1x1 \ {01101, 00111}, xxx00 \ {xx100, 11000, 10000}} { 0x1x1101x1 \ { 0x11110101, 0x10110111, 0x1x110101, 0x1x110111, 0x1x110111, 01101101x1, 00111101x1}, 0x10100101 \ { 0x10100101, 0110100101}, xxx0000100 \ { xxx0000100, xxx0000100, xx10000100, 1100000100, 1000000100}} {} {01x10 \ {01110, 01010}} {} {11xxx \ {11x1x, 11001, 11x01}, 011x0 \ {01110, 01100}} {0xx10 \ {00010, 01x10, 00110}} { 0xx1011x10 \ { 0xx1011x10, 0001011x10, 01x1011x10, 0011011x10}, 0xx1001110 \ { 0xx1001110, 0001001110, 01x1001110, 0011001110}} {1x10x \ {11100, 1010x, 1x101}, 1xx1x \ {10011, 1xx10, 1101x}} {10x10 \ {10110}, 01xxx \ {010xx, 01010, 01xx1}, xx1xx \ {0x1xx, x01xx, xx11x}} { 01x0x1x10x \ { 01x011x100, 01x001x101, 01x0x11100, 01x0x1010x, 01x0x1x101, 0100x1x10x, 01x011x10x}, xx10x1x10x \ { xx1011x100, xx1001x101, xx10x11100, xx10x1010x, xx10x1x101, 0x10x1x10x, x010x1x10x}, 10x101xx10 \ { 10x101xx10, 10x1011010, 101101xx10}, 01x1x1xx1x \ { 01x111xx10, 01x101xx11, 01x1x10011, 01x1x1xx10, 01x1x1101x, 0101x1xx1x, 010101xx1x, 01x111xx1x}, xx11x1xx1x \ { xx1111xx10, xx1101xx11, xx11x10011, xx11x1xx10, xx11x1101x, 0x11x1xx1x, x011x1xx1x, xx11x1xx1x}} {01x0x \ {01101, 0110x, 01x01}, 00x10 \ {00010, 00110, 00110}} {001x1 \ {00101, 00111}, x0xx1 \ {00x01, x0011, 10x01}} { 0010101x01 \ { 0010101101, 0010101101, 0010101x01, 0010101x01}, x0x0101x01 \ { x0x0101101, x0x0101101, x0x0101x01, 00x0101x01, 10x0101x01}} {xx101 \ {01101, x1101, x0101}, 101x0 \ {10110, 10100}, 11x00 \ {11000}} {} {} {10x11 \ {10111, 10011, 10011}, xx001 \ {x0001, 01001, 01001}} {} {} {0xx0x \ {01x01, 0x10x}} {} {} {10xx0 \ {10100, 10110, 10010}, xx0xx \ {000x1, 10001, x00xx}} {} {} {0xxx0 \ {01x10, 00100, 0xx10}, 0110x \ {01100, 01101}} {01x1x \ {0101x, 01110, 01x11}, 1x01x \ {1x011, 1001x, 1001x}} { 01x100xx10 \ { 01x1001x10, 01x100xx10, 010100xx10, 011100xx10}, 1x0100xx10 \ { 1x01001x10, 1x0100xx10, 100100xx10, 100100xx10}} {0x0xx \ {010x0, 010x1, 01001}, 0x0xx \ {0x0x1, 01000, 0100x}, 11x10 \ {11110, 11010}} {011x0 \ {01100}, 110x0 \ {11000}} { 011x00x0x0 \ { 011100x000, 011000x010, 011x001000, 011x001000, 011000x0x0}, 110x00x0x0 \ { 110100x000, 110000x010, 110x001000, 110x001000, 110000x0x0}, 0111011x10 \ { 0111011110, 0111011010}, 1101011x10 \ { 1101011110, 1101011010}} {x11x0 \ {011x0, x1110, 111x0}, 0xx01 \ {00001, 01101, 00101}} {x000x \ {10000, 10001, 00001}} { x0000x1100 \ { x000001100, x000011100, 10000x1100}, x00010xx01 \ { x000100001, x000101101, x000100101, 100010xx01, 000010xx01}} {10xxx \ {10001, 10x0x, 10100}, xx0x1 \ {0x0x1, xx001, x0011}} {0xx1x \ {0x11x, 0x010, 0111x}, 000xx \ {0000x, 00001, 0001x}} { 0xx1x10x1x \ { 0xx1110x10, 0xx1010x11, 0x11x10x1x, 0x01010x1x, 0111x10x1x}, 000xx10xxx \ { 000x110xx0, 000x010xx1, 0001x10x0x, 0000x10x1x, 000xx10001, 000xx10x0x, 000xx10100, 0000x10xxx, 0000110xxx, 0001x10xxx}, 0xx11xx011 \ { 0xx110x011, 0xx11x0011, 0x111xx011, 01111xx011}, 000x1xx0x1 \ { 00011xx001, 00001xx011, 000x10x0x1, 000x1xx001, 000x1x0011, 00001xx0x1, 00001xx0x1, 00011xx0x1}} {x00xx \ {1000x, x001x, 100xx}, xxx10 \ {01x10, 10x10, 00x10}} {01xxx \ {01010, 01101, 01110}, x100x \ {01001, 01000, 11001}} { 01xxxx00xx \ { 01xx1x00x0, 01xx0x00x1, 01x1xx000x, 01x0xx001x, 01xxx1000x, 01xxxx001x, 01xxx100xx, 01010x00xx, 01101x00xx, 01110x00xx}, x100xx000x \ { x1001x0000, x1000x0001, x100x1000x, x100x1000x, 01001x000x, 01000x000x, 11001x000x}, 01x10xxx10 \ { 01x1001x10, 01x1010x10, 01x1000x10, 01010xxx10, 01110xxx10}} {00x10 \ {00110, 00010}} {00xxx \ {00101, 0010x, 001x0}} { 00x1000x10 \ { 00x1000110, 00x1000010, 0011000x10}} {111xx \ {111x0, 11100}} {x101x \ {x1011, 01011}, x11xx \ {x11x0, 11100, x110x}} { x101x1111x \ { x101111110, x101011111, x101x11110, x10111111x, 010111111x}, x11xx111xx \ { x11x1111x0, x11x0111x1, x111x1110x, x110x1111x, x11xx111x0, x11xx11100, x11x0111xx, 11100111xx, x110x111xx}} {x00xx \ {10000, x0011, x00x0}, xx1x0 \ {0x1x0, xx110, xx100}} {10x1x \ {10110, 10x11}, x110x \ {x1101, 0110x, 1110x}} { 10x1xx001x \ { 10x11x0010, 10x10x0011, 10x1xx0011, 10x1xx0010, 10110x001x, 10x11x001x}, x110xx000x \ { x1101x0000, x1100x0001, x110x10000, x110xx0000, x1101x000x, 0110xx000x, 1110xx000x}, 10x10xx110 \ { 10x100x110, 10x10xx110, 10110xx110}, x1100xx100 \ { x11000x100, x1100xx100, 01100xx100, 11100xx100}} {x011x \ {10110, 00111, x0111}} {0x1x1 \ {001x1, 00101, 011x1}, 000x1 \ {00001}} { 0x111x0111 \ { 0x11100111, 0x111x0111, 00111x0111, 01111x0111}, 00011x0111 \ { 0001100111, 00011x0111}} {xxxxx \ {10101, x1xx1, xx1xx}, 0xx10 \ {0x110, 01110, 01010}} {10x01 \ {10101}, x1x0x \ {x1100, 1110x, x110x}} { 10x01xxx01 \ { 10x0110101, 10x01x1x01, 10x01xx101, 10101xxx01}, x1x0xxxx0x \ { x1x01xxx00, x1x00xxx01, x1x0x10101, x1x0xx1x01, x1x0xxx10x, x1100xxx0x, 1110xxxx0x, x110xxxx0x}} {1x1x1 \ {11111, 11101, 10111}} {x110x \ {0110x, 11101}} { x11011x101 \ { x110111101, 011011x101, 111011x101}} {} {xx001 \ {1x001, 11001, 11001}} {} {00x0x \ {00x00, 00x01, 0010x}, 0110x \ {01101}, x01x0 \ {x0110, 10110, 10110}} {} {} {1x0xx \ {100x1, 1x000}} {xxx01 \ {11001, 10x01, 01101}, x0x0x \ {10000, 00101, x0101}, 0x10x \ {00100, 0010x, 0010x}} { xxx011x001 \ { xxx0110001, 110011x001, 10x011x001, 011011x001}, x0x0x1x00x \ { x0x011x000, x0x001x001, x0x0x10001, x0x0x1x000, 100001x00x, 001011x00x, x01011x00x}, 0x10x1x00x \ { 0x1011x000, 0x1001x001, 0x10x10001, 0x10x1x000, 001001x00x, 0010x1x00x, 0010x1x00x}} {xx10x \ {x110x, 10101, 11100}} {1011x \ {10111, 10110, 10110}, x0xxx \ {x0100, 00100, 00001}} { x0x0xxx10x \ { x0x01xx100, x0x00xx101, x0x0xx110x, x0x0x10101, x0x0x11100, x0100xx10x, 00100xx10x, 00001xx10x}} {x1x11 \ {x1011, 11011, 11x11}, xx10x \ {1110x, 1x100, 0x100}} {xxx1x \ {x1110, 00111, 01x1x}} { xxx11x1x11 \ { xxx11x1011, xxx1111011, xxx1111x11, 00111x1x11, 01x11x1x11}} {x0x11 \ {10011, x0111, 00x11}} {xxxx1 \ {0x101, 000x1, 00101}} { xxx11x0x11 \ { xxx1110011, xxx11x0111, xxx1100x11, 00011x0x11}} {01xxx \ {011x0, 01x00, 01x01}, x1xxx \ {11101, 11011, x1x11}} {xx111 \ {x1111, 1x111, x0111}, x0xx1 \ {10001, 10111, 001x1}} { xx11101x11 \ { x111101x11, 1x11101x11, x011101x11}, x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101x01, 1000101xx1, 1011101xx1, 001x101xx1}, xx111x1x11 \ { xx11111011, xx111x1x11, x1111x1x11, 1x111x1x11, x0111x1x11}, x0xx1x1xx1 \ { x0x11x1x01, x0x01x1x11, x0xx111101, x0xx111011, x0xx1x1x11, 10001x1xx1, 10111x1xx1, 001x1x1xx1}} {xx001 \ {1x001, 0x001, 10001}, 011xx \ {0110x, 01101, 0111x}} {100xx \ {10001, 100x1}} { 10001xx001 \ { 100011x001, 100010x001, 1000110001, 10001xx001, 10001xx001}, 100xx011xx \ { 100x1011x0, 100x0011x1, 1001x0110x, 1000x0111x, 100xx0110x, 100xx01101, 100xx0111x, 10001011xx, 100x1011xx}} {01xx1 \ {01111, 01001}} {x0xx1 \ {00001, x00x1, x0001}} { x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101111, x0xx101001, 0000101xx1, x00x101xx1, x000101xx1}} {x110x \ {1110x, 01101, x1101}, x11x0 \ {11100, 011x0}} {x011x \ {00110, 0011x, 1011x}, 01xxx \ {010x1, 01100}} { 01x0xx110x \ { 01x01x1100, 01x00x1101, 01x0x1110x, 01x0x01101, 01x0xx1101, 01001x110x, 01100x110x}, x0110x1110 \ { x011001110, 00110x1110, 00110x1110, 10110x1110}, 01xx0x11x0 \ { 01x10x1100, 01x00x1110, 01xx011100, 01xx0011x0, 01100x11x0}} {11xx1 \ {11101, 11111, 111x1}} {1x001 \ {11001, 10001}, xxxx0 \ {101x0, 0xx10, 1x100}, 1xxx1 \ {10xx1, 10101, 1xx01}} { 1x00111x01 \ { 1x00111101, 1x00111101, 1100111x01, 1000111x01}, 1xxx111xx1 \ { 1xx1111x01, 1xx0111x11, 1xxx111101, 1xxx111111, 1xxx1111x1, 10xx111xx1, 1010111xx1, 1xx0111xx1}} {x011x \ {x0111, 1011x, 00110}} {x0010 \ {10010, 00010, 00010}, 00x1x \ {00010, 00011, 00110}} { x0010x0110 \ { x001010110, x001000110, 10010x0110, 00010x0110, 00010x0110}, 00x1xx011x \ { 00x11x0110, 00x10x0111, 00x1xx0111, 00x1x1011x, 00x1x00110, 00010x011x, 00011x011x, 00110x011x}} {x010x \ {00100, x0100, 10100}, 01x10 \ {01110, 01010}} {0xx0x \ {0xx01, 0000x, 0x100}} { 0xx0xx010x \ { 0xx01x0100, 0xx00x0101, 0xx0x00100, 0xx0xx0100, 0xx0x10100, 0xx01x010x, 0000xx010x, 0x100x010x}} {011xx \ {011x0, 01101, 0111x}, xx1xx \ {x110x, x01x0, 0111x}} {00x01 \ {00101, 00001}, 0xxx1 \ {00111, 00001, 00011}} { 00x0101101 \ { 00x0101101, 0010101101, 0000101101}, 0xxx1011x1 \ { 0xx1101101, 0xx0101111, 0xxx101101, 0xxx101111, 00111011x1, 00001011x1, 00011011x1}, 00x01xx101 \ { 00x01x1101, 00101xx101, 00001xx101}, 0xxx1xx1x1 \ { 0xx11xx101, 0xx01xx111, 0xxx1x1101, 0xxx101111, 00111xx1x1, 00001xx1x1, 00011xx1x1}} {111xx \ {111x1, 1111x, 1111x}, x011x \ {x0111, 00110}} {xx11x \ {xx110, x1111, 01111}, x10xx \ {01001, 1101x, 11010}} { xx11x1111x \ { xx11111110, xx11011111, xx11x11111, xx11x1111x, xx11x1111x, xx1101111x, x11111111x, 011111111x}, x10xx111xx \ { x10x1111x0, x10x0111x1, x101x1110x, x100x1111x, x10xx111x1, x10xx1111x, x10xx1111x, 01001111xx, 1101x111xx, 11010111xx}, xx11xx011x \ { xx111x0110, xx110x0111, xx11xx0111, xx11x00110, xx110x011x, x1111x011x, 01111x011x}, x101xx011x \ { x1011x0110, x1010x0111, x101xx0111, x101x00110, 1101xx011x, 11010x011x}} {x1xx1 \ {010x1, 11x01, x1111}} {0x10x \ {0x101, 00101, 00100}} { 0x101x1x01 \ { 0x10101001, 0x10111x01, 0x101x1x01, 00101x1x01}} {} {11x1x \ {11010, 11x10, 1111x}} {} {1001x \ {10011, 10010}} {x000x \ {10000, x0000, 1000x}, 1x001 \ {10001, 11001}, 0xxxx \ {0000x, 0x10x, 0x0xx}} { 0xx1x1001x \ { 0xx1110010, 0xx1010011, 0xx1x10011, 0xx1x10010, 0x01x1001x}} {xx0xx \ {x0001, 0x01x, x000x}, xx00x \ {x1000, x100x, 1x001}, xx1x0 \ {11110, 01100, 11100}} {xx101 \ {1x101, 01101, 0x101}, 01xxx \ {011x1, 01001, 0101x}} { xx101xx001 \ { xx101x0001, xx101x0001, 1x101xx001, 01101xx001, 0x101xx001}, 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxxx0001, 01xxx0x01x, 01xxxx000x, 011x1xx0xx, 01001xx0xx, 0101xxx0xx}, xx101xx001 \ { xx101x1001, xx1011x001, 1x101xx001, 01101xx001, 0x101xx001}, 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0xx1000, 01x0xx100x, 01x0x1x001, 01101xx00x, 01001xx00x}, 01xx0xx1x0 \ { 01x10xx100, 01x00xx110, 01xx011110, 01xx001100, 01xx011100, 01010xx1x0}} {1xxx0 \ {10010, 10000, 110x0}, 0x001 \ {01001, 00001}} {x1x11 \ {01011, 11x11, 11x11}} {} {111xx \ {11110, 11100, 11111}, x110x \ {01100, 1110x, x1100}} {} {} {1x0x1 \ {10001, 110x1, 110x1}} {10xx0 \ {100x0, 10x10}, xx11x \ {1x110, 0111x, 11110}, 01x00 \ {01100, 01000, 01000}} { xx1111x011 \ { xx11111011, xx11111011, 011111x011}} {1001x \ {10010, 10011}} {} {} {101x0 \ {10100, 10110}, 1x1x1 \ {11111, 10101, 10111}} {1x0xx \ {1x000, 1001x, 1000x}} { 1x0x0101x0 \ { 1x01010100, 1x00010110, 1x0x010100, 1x0x010110, 1x000101x0, 10010101x0, 10000101x0}, 1x0x11x1x1 \ { 1x0111x101, 1x0011x111, 1x0x111111, 1x0x110101, 1x0x110111, 100111x1x1, 100011x1x1}} {x11x0 \ {11110, 111x0, x1100}, xx0xx \ {1000x, 0x00x, 00001}, 1xxxx \ {1x11x, 101xx, 10000}} {1xx01 \ {10x01, 11x01, 10101}, 0x1xx \ {0110x, 001xx, 0x101}, x101x \ {11010, x1011, 01011}} { 0x1x0x11x0 \ { 0x110x1100, 0x100x1110, 0x1x011110, 0x1x0111x0, 0x1x0x1100, 01100x11x0, 001x0x11x0}, x1010x1110 \ { x101011110, x101011110, 11010x1110}, 1xx01xx001 \ { 1xx0110001, 1xx010x001, 1xx0100001, 10x01xx001, 11x01xx001, 10101xx001}, 0x1xxxx0xx \ { 0x1x1xx0x0, 0x1x0xx0x1, 0x11xxx00x, 0x10xxx01x, 0x1xx1000x, 0x1xx0x00x, 0x1xx00001, 0110xxx0xx, 001xxxx0xx, 0x101xx0xx}, x101xxx01x \ { x1011xx010, x1010xx011, 11010xx01x, x1011xx01x, 01011xx01x}, 1xx011xx01 \ { 1xx0110101, 10x011xx01, 11x011xx01, 101011xx01}, 0x1xx1xxxx \ { 0x1x11xxx0, 0x1x01xxx1, 0x11x1xx0x, 0x10x1xx1x, 0x1xx1x11x, 0x1xx101xx, 0x1xx10000, 0110x1xxxx, 001xx1xxxx, 0x1011xxxx}, x101x1xx1x \ { x10111xx10, x10101xx11, x101x1x11x, x101x1011x, 110101xx1x, x10111xx1x, 010111xx1x}} {0111x \ {01111, 01110}} {0x00x \ {00000, 0x001, 0100x}, x1x0x \ {01101, 01001, x100x}, x0xxx \ {00100, 001x1, 00x01}} { x0x1x0111x \ { x0x1101110, x0x1001111, x0x1x01111, x0x1x01110, 001110111x}} {x11x0 \ {011x0, 11100}, xxx0x \ {xx001, x000x, xxx00}, x1x1x \ {x1111, 1101x, x1110}} {01x0x \ {0100x, 01001, 01101}} { 01x00x1100 \ { 01x0001100, 01x0011100, 01000x1100}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xxx001, 01x0xx000x, 01x0xxxx00, 0100xxxx0x, 01001xxx0x, 01101xxx0x}} {} {xx1xx \ {0x101, 101xx, 0x110}, 0xx00 \ {0x100, 01000, 01000}} {} {} {00x1x \ {00010, 0011x, 00110}, x0x1x \ {x0110, 10111, 10x10}} {} {} {10xxx \ {10001, 10011, 10xx0}, x1xxx \ {1101x, x1001, 11xx0}, x1xx1 \ {01111, 11101, 11x11}} {} {x1x11 \ {11x11, 11011, 11111}, xxx10 \ {x0110, 00x10, 11x10}} {xx100 \ {11100, x1100, 1x100}, 1x01x \ {11011, 10010, 1001x}} { 1x011x1x11 \ { 1x01111x11, 1x01111011, 1x01111111, 11011x1x11, 10011x1x11}, 1x010xxx10 \ { 1x010x0110, 1x01000x10, 1x01011x10, 10010xxx10, 10010xxx10}} {10xx1 \ {10011, 10001, 10x01}} {01x1x \ {0101x, 01110}} { 01x1110x11 \ { 01x1110011, 0101110x11}} {xx010 \ {1x010, 10010, 11010}, xx10x \ {11101, 0x100, 11100}} {x0x10 \ {x0010, x0110, 00110}, 00xx1 \ {00101, 001x1, 000x1}} { x0x10xx010 \ { x0x101x010, x0x1010010, x0x1011010, x0010xx010, x0110xx010, 00110xx010}, 00x01xx101 \ { 00x0111101, 00101xx101, 00101xx101, 00001xx101}} {x1xxx \ {01000, x1xx1, 01x00}, 00x01 \ {00001, 00101}} {x110x \ {11100, 11101, x1100}, 1xx1x \ {11x11, 1x010, 1x011}} { x110xx1x0x \ { x1101x1x00, x1100x1x01, x110x01000, x110xx1x01, x110x01x00, 11100x1x0x, 11101x1x0x, x1100x1x0x}, 1xx1xx1x1x \ { 1xx11x1x10, 1xx10x1x11, 1xx1xx1x11, 11x11x1x1x, 1x010x1x1x, 1x011x1x1x}, x110100x01 \ { x110100001, x110100101, 1110100x01}} {1x00x \ {11000, 10001, 11001}, 10xx1 \ {101x1, 10111}, 10x1x \ {10x10, 10x11, 10111}} {00xx0 \ {001x0, 00000, 00110}} { 00x001x000 \ { 00x0011000, 001001x000, 000001x000}, 00x1010x10 \ { 00x1010x10, 0011010x10, 0011010x10}} {x0x1x \ {00x10, 00x1x}, 11x1x \ {1111x}} {01xx0 \ {01x00, 010x0}, xx111 \ {11111, 0x111, 1x111}} { 01x10x0x10 \ { 01x1000x10, 01x1000x10, 01010x0x10}, xx111x0x11 \ { xx11100x11, 11111x0x11, 0x111x0x11, 1x111x0x11}, 01x1011x10 \ { 01x1011110, 0101011x10}, xx11111x11 \ { xx11111111, 1111111x11, 0x11111x11, 1x11111x11}} {x1xx1 \ {010x1, 01011, x1x01}} {0x0x0 \ {0x010, 01000, 0x000}, 011xx \ {01100, 01110, 01110}} { 011x1x1xx1 \ { 01111x1x01, 01101x1x11, 011x1010x1, 011x101011, 011x1x1x01}} {0xx10 \ {00110, 01110, 0x010}, 01x0x \ {0100x, 01000, 01000}} {xx1xx \ {x010x, 0110x, 101xx}, 00xx1 \ {00x01, 00011}} { xx1100xx10 \ { xx11000110, xx11001110, xx1100x010, 101100xx10}, xx10x01x0x \ { xx10101x00, xx10001x01, xx10x0100x, xx10x01000, xx10x01000, x010x01x0x, 0110x01x0x, 1010x01x0x}, 00x0101x01 \ { 00x0101001, 00x0101x01}} {x0x1x \ {00x11, 10011, 00x10}, x1xxx \ {x1100, 11011, x1x01}} {010xx \ {010x0, 01010, 01011}, xx100 \ {00100, 1x100, 11100}} { 0101xx0x1x \ { 01011x0x10, 01010x0x11, 0101x00x11, 0101x10011, 0101x00x10, 01010x0x1x, 01010x0x1x, 01011x0x1x}, 010xxx1xxx \ { 010x1x1xx0, 010x0x1xx1, 0101xx1x0x, 0100xx1x1x, 010xxx1100, 010xx11011, 010xxx1x01, 010x0x1xxx, 01010x1xxx, 01011x1xxx}, xx100x1x00 \ { xx100x1100, 00100x1x00, 1x100x1x00, 11100x1x00}} {1x0x0 \ {100x0, 11010, 11000}, 00x0x \ {00101, 00x00, 0010x}, x1x11 \ {01111, 01011, 01011}} {0111x \ {01110, 01111}} { 011101x010 \ { 0111010010, 0111011010, 011101x010}, 01111x1x11 \ { 0111101111, 0111101011, 0111101011, 01111x1x11}} {xx1x1 \ {x1101, x01x1, 00101}} {0011x \ {00110, 00111}} { 00111xx111 \ { 00111x0111, 00111xx111}} {} {x1x0x \ {x1101, x100x, 11x01}} {} {xx011 \ {x0011, 10011, 0x011}, xx00x \ {1x000, 01000, 01000}} {} {} {1x001 \ {11001, 10001}, 10xx0 \ {10x00, 10100, 100x0}} {1x011 \ {11011, 10011, 10011}} {} {xxx1x \ {x1x11, xx11x, 1011x}, x1x11 \ {11111, 11011, 01111}} {x01x0 \ {x0100, x0110, 10110}} { x0110xxx10 \ { x0110xx110, x011010110, x0110xxx10, 10110xxx10}} {x0xx0 \ {10000, 00100, x0x00}} {00xx1 \ {00001, 001x1, 00011}, 1101x \ {11010}, 01x0x \ {01001, 01x01, 0100x}} { 11010x0x10 \ { 11010x0x10}, 01x00x0x00 \ { 01x0010000, 01x0000100, 01x00x0x00, 01000x0x00}} {x1x10 \ {11x10, x1110, 01x10}, 110xx \ {1101x, 11000, 11010}} {1011x \ {10110}} { 10110x1x10 \ { 1011011x10, 10110x1110, 1011001x10, 10110x1x10}, 1011x1101x \ { 1011111010, 1011011011, 1011x1101x, 1011x11010, 101101101x}} {1xxx1 \ {11111, 1x011, 10xx1}, 110xx \ {11000, 1101x, 110x1}} {1xx0x \ {11x00, 10x0x, 10x01}} { 1xx011xx01 \ { 1xx0110x01, 10x011xx01, 10x011xx01}, 1xx0x1100x \ { 1xx0111000, 1xx0011001, 1xx0x11000, 1xx0x11001, 11x001100x, 10x0x1100x, 10x011100x}} {x1xxx \ {11x10, 11100, 010xx}} {} {} {01x00 \ {01100, 01000}} {1xx1x \ {11x10, 11010, 1x111}, 10x10 \ {10110}} {} {} {0x010 \ {01010}, xx101 \ {11101, 00101, 01101}} {} {000xx \ {000x0, 0001x, 00011}} {x11xx \ {x1110, 111xx, x11x0}, x101x \ {x1011, 11011}} { x11xx000xx \ { x11x1000x0, x11x0000x1, x111x0000x, x110x0001x, x11xx000x0, x11xx0001x, x11xx00011, x1110000xx, 111xx000xx, x11x0000xx}, x101x0001x \ { x101100010, x101000011, x101x00010, x101x0001x, x101x00011, x10110001x, 110110001x}} {01x1x \ {0111x, 01011}} {0xxx0 \ {00100, 01110, 0x010}, xx000 \ {0x000, 10000, 10000}} { 0xx1001x10 \ { 0xx1001110, 0111001x10, 0x01001x10}} {x100x \ {01000, 0100x, 11001}} {11xx1 \ {11111, 111x1}, x1xx0 \ {11x00, 11100, x1110}} { 11x01x1001 \ { 11x0101001, 11x0111001, 11101x1001}, x1x00x1000 \ { x1x0001000, x1x0001000, 11x00x1000, 11100x1000}} {x1xxx \ {11xxx, 1101x, 0111x}, 1xxx1 \ {1x0x1, 10001, 11x01}} {x00x1 \ {000x1, 00001, x0001}, xx11x \ {x111x, 0x11x, 0x111}} { x00x1x1xx1 \ { x0011x1x01, x0001x1x11, x00x111xx1, x00x111011, x00x101111, 000x1x1xx1, 00001x1xx1, x0001x1xx1}, xx11xx1x1x \ { xx111x1x10, xx110x1x11, xx11x11x1x, xx11x1101x, xx11x0111x, x111xx1x1x, 0x11xx1x1x, 0x111x1x1x}, x00x11xxx1 \ { x00111xx01, x00011xx11, x00x11x0x1, x00x110001, x00x111x01, 000x11xxx1, 000011xxx1, x00011xxx1}, xx1111xx11 \ { xx1111x011, x11111xx11, 0x1111xx11, 0x1111xx11}} {11xx0 \ {11x10, 11110}, x0010 \ {00010, 10010}} {x0xx0 \ {x0000, x0100, 10110}, x0xx0 \ {10000, x0100, 10x00}} { x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011x10, x0xx011110, x000011xx0, x010011xx0, 1011011xx0}, x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011x10, x0xx011110, 1000011xx0, x010011xx0, 10x0011xx0}, x0x10x0010 \ { x0x1000010, x0x1010010}} {x110x \ {x1100, 11100, 0110x}, xxx01 \ {xx101, 00001, 1xx01}} {xx101 \ {x0101, x1101, 11101}, x101x \ {11010, x1010}} { xx101x1101 \ { xx10101101, x0101x1101, x1101x1101, 11101x1101}, xx101xxx01 \ { xx101xx101, xx10100001, xx1011xx01, x0101xxx01, x1101xxx01, 11101xxx01}} {x000x \ {x0001, 1000x, 0000x}, x0xxx \ {00101, 00x0x, x000x}} {10xx0 \ {10010, 101x0, 101x0}} { 10x00x0000 \ { 10x0010000, 10x0000000, 10100x0000, 10100x0000}, 10xx0x0xx0 \ { 10x10x0x00, 10x00x0x10, 10xx000x00, 10xx0x0000, 10010x0xx0, 101x0x0xx0, 101x0x0xx0}} {01xxx \ {01x00, 01x0x, 01000}, x11xx \ {01101, 0111x, 1110x}} {1xxx1 \ {10x01, 100x1, 1x101}} { 1xxx101xx1 \ { 1xx1101x01, 1xx0101x11, 1xxx101x01, 10x0101xx1, 100x101xx1, 1x10101xx1}, 1xxx1x11x1 \ { 1xx11x1101, 1xx01x1111, 1xxx101101, 1xxx101111, 1xxx111101, 10x01x11x1, 100x1x11x1, 1x101x11x1}} {} {x001x \ {00010, 10011, 0001x}, 0x0x1 \ {0x011, 0x001, 01001}} {} {01xx1 \ {011x1, 010x1}, 0xxx0 \ {01110, 00100, 01000}} {} {} {1xxx0 \ {100x0, 10010, 110x0}} {x0110 \ {00110}} { x01101xx10 \ { x011010010, x011010010, x011011010, 001101xx10}} {10x1x \ {10x11, 10011, 10111}, 0xx0x \ {0xx01, 0x001, 0x000}} {x0x11 \ {10x11, 10011, x0011}} { x0x1110x11 \ { x0x1110x11, x0x1110011, x0x1110111, 10x1110x11, 1001110x11, x001110x11}} {10x00 \ {10000, 10100}, 11xxx \ {11001, 11111, 111xx}} {1x1x1 \ {11111, 11101, 10101}} { 1x1x111xx1 \ { 1x11111x01, 1x10111x11, 1x1x111001, 1x1x111111, 1x1x1111x1, 1111111xx1, 1110111xx1, 1010111xx1}} {0x01x \ {00011, 0101x, 0101x}, 0xx01 \ {01001, 0x001}} {10xxx \ {10111, 100xx, 10x01}} { 10x1x0x01x \ { 10x110x010, 10x100x011, 10x1x00011, 10x1x0101x, 10x1x0101x, 101110x01x, 1001x0x01x}, 10x010xx01 \ { 10x0101001, 10x010x001, 100010xx01, 10x010xx01}} {} {11xxx \ {11110, 1110x, 11x1x}, x101x \ {x1011, 0101x, 11011}, 01x1x \ {01x10, 0101x, 0111x}} {} {01x0x \ {0100x, 01101, 01101}} {11xx0 \ {11100, 11010, 11110}, xx1x0 \ {00100, 00110, 00110}, 110xx \ {11010, 110x1, 1101x}} { 11x0001x00 \ { 11x0001000, 1110001x00}, xx10001x00 \ { xx10001000, 0010001x00}, 1100x01x0x \ { 1100101x00, 1100001x01, 1100x0100x, 1100x01101, 1100x01101, 1100101x0x}} {1001x \ {10010, 10011}, x110x \ {01100, x1101}, xx1xx \ {0x10x, 1x11x, 0x101}} {} {} {xx10x \ {00100, 10101, xx101}} {1x01x \ {1x011, 1001x}} {} {xx0x0 \ {01010, 010x0, xx010}} {1x1x0 \ {1x100, 111x0}} { 1x1x0xx0x0 \ { 1x110xx000, 1x100xx010, 1x1x001010, 1x1x0010x0, 1x1x0xx010, 1x100xx0x0, 111x0xx0x0}} {00xx0 \ {000x0}} {} {} {} {xxx11 \ {01111, 10111, 11x11}, x00x1 \ {000x1, 10001, 00011}, x0xx0 \ {00000, x0x10, 10x00}} {} {} {xxx01 \ {0x001, x1x01, 11x01}, 11x0x \ {11000, 11101, 11x00}} {} {1x001 \ {10001, 11001}, 011x1 \ {01111}} {} {} {01x0x \ {01x01, 01000}} {xxx10 \ {xx110, 01010, 01010}} {} {0x000 \ {01000, 00000}} {0x1x0 \ {00100, 01110, 00110}, xx11x \ {x1111, 10110, 0x111}} { 0x1000x000 \ { 0x10001000, 0x10000000, 001000x000}} {11x0x \ {1110x, 11101, 11000}, 0xx11 \ {01x11, 0x111}} {10x00 \ {10100}, x0xx0 \ {00x00, x0110, 00000}} { 10x0011x00 \ { 10x0011100, 10x0011000, 1010011x00}, x0x0011x00 \ { x0x0011100, x0x0011000, 00x0011x00, 0000011x00}} {} {x1x10 \ {11x10, x1110}, 0xx01 \ {00101, 0x101, 01001}, x001x \ {10010, 1001x, x0010}} {} {0xx1x \ {00010, 01x10, 0xx10}, 00xx1 \ {00101, 001x1, 00x01}} {x1x01 \ {11101, 11001, x1001}, xx1xx \ {111x0, 01111, 0x100}} { xx11x0xx1x \ { xx1110xx10, xx1100xx11, xx11x00010, xx11x01x10, xx11x0xx10, 111100xx1x, 011110xx1x}, x1x0100x01 \ { x1x0100101, x1x0100101, x1x0100x01, 1110100x01, 1100100x01, x100100x01}, xx1x100xx1 \ { xx11100x01, xx10100x11, xx1x100101, xx1x1001x1, xx1x100x01, 0111100xx1}} {xxxxx \ {x1xxx, 1x111, 010x1}, xx0xx \ {11010, 1x01x, 0x0xx}, 01xx1 \ {01101, 01011, 01x01}} {10x0x \ {10001, 1010x}, 01x0x \ {01100, 01101}} { 10x0xxxx0x \ { 10x01xxx00, 10x00xxx01, 10x0xx1x0x, 10x0x01001, 10001xxx0x, 1010xxxx0x}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xx1x0x, 01x0x01001, 01100xxx0x, 01101xxx0x}, 10x0xxx00x \ { 10x01xx000, 10x00xx001, 10x0x0x00x, 10001xx00x, 1010xxx00x}, 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0x0x00x, 01100xx00x, 01101xx00x}, 10x0101x01 \ { 10x0101101, 10x0101x01, 1000101x01, 1010101x01}, 01x0101x01 \ { 01x0101101, 01x0101x01, 0110101x01}} {} {} {} {} {10x10 \ {10110, 10010, 10010}, x10xx \ {110xx, x1000, 11011}} {} {00x1x \ {00x10, 0011x, 00011}, 01x01 \ {01001, 01101}, xxxx0 \ {11010, 01x00, 1xx00}} {xx11x \ {1x110, 0x11x, x0110}, x1x10 \ {11010, x1010, x1010}} { xx11x00x1x \ { xx11100x10, xx11000x11, xx11x00x10, xx11x0011x, xx11x00011, 1x11000x1x, 0x11x00x1x, x011000x1x}, x1x1000x10 \ { x1x1000x10, x1x1000110, 1101000x10, x101000x10, x101000x10}, xx110xxx10 \ { xx11011010, 1x110xxx10, 0x110xxx10, x0110xxx10}, x1x10xxx10 \ { x1x1011010, 11010xxx10, x1010xxx10, x1010xxx10}} {x10x1 \ {01011, 01001, 010x1}, xx110 \ {00110, x1110, 11110}} {x0x0x \ {00001, 00x0x, 0010x}, xxx11 \ {1xx11, x1111}} { x0x01x1001 \ { x0x0101001, x0x0101001, 00001x1001, 00x01x1001, 00101x1001}, xxx11x1011 \ { xxx1101011, xxx1101011, 1xx11x1011, x1111x1011}} {x001x \ {1001x, 00011}, 1x0x0 \ {11010, 10010, 10010}} {x1xxx \ {01110, 010x0, 01x0x}, 00x01 \ {00101, 00001}, 0xx01 \ {00001}} { x1x1xx001x \ { x1x11x0010, x1x10x0011, x1x1x1001x, x1x1x00011, 01110x001x, 01010x001x}, x1xx01x0x0 \ { x1x101x000, x1x001x010, x1xx011010, x1xx010010, x1xx010010, 011101x0x0, 010x01x0x0, 01x001x0x0}} {xx110 \ {11110, x0110}, x101x \ {0101x, x1011, 1101x}} {xx00x \ {1x000, 11001, 10001}} {} {110xx \ {11000, 110x0}, 1xxx0 \ {1x110, 1x100, 1x0x0}} {0x0x0 \ {0x000, 01010, 010x0}, xx010 \ {1x010, 11010}} { 0x0x0110x0 \ { 0x01011000, 0x00011010, 0x0x011000, 0x0x0110x0, 0x000110x0, 01010110x0, 010x0110x0}, xx01011010 \ { xx01011010, 1x01011010, 1101011010}, 0x0x01xxx0 \ { 0x0101xx00, 0x0001xx10, 0x0x01x110, 0x0x01x100, 0x0x01x0x0, 0x0001xxx0, 010101xxx0, 010x01xxx0}, xx0101xx10 \ { xx0101x110, xx0101x010, 1x0101xx10, 110101xx10}} {x0010 \ {10010}, 011xx \ {01110, 011x1, 011x1}} {} {} {xx100 \ {11100, x0100, 10100}} {1xx01 \ {11x01, 11001, 1x101}, x0000 \ {10000}} { x0000xx100 \ { x000011100, x0000x0100, x000010100, 10000xx100}} {01xx1 \ {01101, 01111, 01111}, 0x0xx \ {00010, 010x0, 00001}, 10x0x \ {10x01, 1000x, 1000x}} {xxx00 \ {01x00, 11100, 01000}, 1xxxx \ {1xx01, 1xxx0, 1x101}} { 1xxx101xx1 \ { 1xx1101x01, 1xx0101x11, 1xxx101101, 1xxx101111, 1xxx101111, 1xx0101xx1, 1x10101xx1}, xxx000x000 \ { xxx0001000, 01x000x000, 111000x000, 010000x000}, 1xxxx0x0xx \ { 1xxx10x0x0, 1xxx00x0x1, 1xx1x0x00x, 1xx0x0x01x, 1xxxx00010, 1xxxx010x0, 1xxxx00001, 1xx010x0xx, 1xxx00x0xx, 1x1010x0xx}, xxx0010x00 \ { xxx0010000, xxx0010000, 01x0010x00, 1110010x00, 0100010x00}, 1xx0x10x0x \ { 1xx0110x00, 1xx0010x01, 1xx0x10x01, 1xx0x1000x, 1xx0x1000x, 1xx0110x0x, 1xx0010x0x, 1x10110x0x}} {1xxxx \ {10001, 11001, 1x101}} {0x100 \ {01100}} { 0x1001xx00 \ { 011001xx00}} {00xx1 \ {000x1, 00001, 00111}} {} {} {x1x00 \ {01000, 11100, 11000}} {0x1x0 \ {01110, 011x0}} { 0x100x1x00 \ { 0x10001000, 0x10011100, 0x10011000, 01100x1x00}} {0xx10 \ {01010, 00010, 00x10}, 1x00x \ {1100x, 10000, 1000x}} {xxxx1 \ {00011, 010x1, 1x1x1}} { xxx011x001 \ { xxx0111001, xxx0110001, 010011x001, 1x1011x001}} {xxxxx \ {x1xx0, 11x01, xx1x0}} {111xx \ {1110x, 111x0, 111x0}} { 111xxxxxxx \ { 111x1xxxx0, 111x0xxxx1, 1111xxxx0x, 1110xxxx1x, 111xxx1xx0, 111xx11x01, 111xxxx1x0, 1110xxxxxx, 111x0xxxxx, 111x0xxxxx}} {xx00x \ {1x000, 0x000, 1000x}} {xx10x \ {0110x, x110x, 00101}, xxxxx \ {x11x0, 0x111, xx1xx}} { xx10xxx00x \ { xx101xx000, xx100xx001, xx10x1x000, xx10x0x000, xx10x1000x, 0110xxx00x, x110xxx00x, 00101xx00x}, xxx0xxx00x \ { xxx01xx000, xxx00xx001, xxx0x1x000, xxx0x0x000, xxx0x1000x, x1100xx00x, xx10xxx00x}} {1x011 \ {11011, 10011}, 1x0xx \ {110x1, 1x00x, 1x011}} {x1xxx \ {x1111, x1xx0, 01110}} { x1x111x011 \ { x1x1111011, x1x1110011, x11111x011}, x1xxx1x0xx \ { x1xx11x0x0, x1xx01x0x1, x1x1x1x00x, x1x0x1x01x, x1xxx110x1, x1xxx1x00x, x1xxx1x011, x11111x0xx, x1xx01x0xx, 011101x0xx}} {x00x0 \ {00000, x0010}, 0xxx1 \ {00x11, 00011, 01011}} {x100x \ {1100x, 0100x, x1000}} { x1000x0000 \ { x100000000, 11000x0000, 01000x0000, x1000x0000}, x10010xx01 \ { 110010xx01, 010010xx01}} {x011x \ {10111, 0011x, 10110}, xx100 \ {1x100, x1100, 11100}} {x0100 \ {10100, 00100, 00100}} { x0100xx100 \ { x01001x100, x0100x1100, x010011100, 10100xx100, 00100xx100, 00100xx100}} {1x010 \ {11010, 10010, 10010}, xxxxx \ {0x0xx, x1xx1, x0001}} {xxx01 \ {00x01, x0x01, x1x01}} { xxx01xxx01 \ { xxx010x001, xxx01x1x01, xxx01x0001, 00x01xxx01, x0x01xxx01, x1x01xxx01}} {} {1xx0x \ {1x10x, 11000, 1xx00}, x0x00 \ {10x00, x0000}} {} {xxx01 \ {0xx01, 00101, 01101}} {xx0x0 \ {x1010, 10000, 1x000}, 0x11x \ {0x110, 01111, 01111}} {} {11x10 \ {11010, 11110}, 0010x \ {00101, 00100, 00100}, 11x11 \ {11011}} {xxx10 \ {10x10, 0xx10, 11010}, x11xx \ {01110, x11x1, 1111x}, xx1xx \ {1x11x, 1x101, x0100}} { xxx1011x10 \ { xxx1011010, xxx1011110, 10x1011x10, 0xx1011x10, 1101011x10}, x111011x10 \ { x111011010, x111011110, 0111011x10, 1111011x10}, xx11011x10 \ { xx11011010, xx11011110, 1x11011x10}, x110x0010x \ { x110100100, x110000101, x110x00101, x110x00100, x110x00100, x11010010x}, xx10x0010x \ { xx10100100, xx10000101, xx10x00101, xx10x00100, xx10x00100, 1x1010010x, x01000010x}, x111111x11 \ { x111111011, x111111x11, 1111111x11}, xx11111x11 \ { xx11111011, 1x11111x11}} {1xx10 \ {1x110, 11110, 11x10}, xx10x \ {x0101, 01101, 0010x}} {01xxx \ {01x0x, 01100, 0101x}} { 01x101xx10 \ { 01x101x110, 01x1011110, 01x1011x10, 010101xx10}, 01x0xxx10x \ { 01x01xx100, 01x00xx101, 01x0xx0101, 01x0x01101, 01x0x0010x, 01x0xxx10x, 01100xx10x}} {} {10xxx \ {10001, 100x1}} {} {11x1x \ {11111, 11011, 11010}, xx000 \ {00000, 10000}} {xx101 \ {00101, 11101}, 0x100 \ {00100}, x0x1x \ {0011x, x001x, x0010}} { x0x1x11x1x \ { x0x1111x10, x0x1011x11, x0x1x11111, x0x1x11011, x0x1x11010, 0011x11x1x, x001x11x1x, x001011x1x}, 0x100xx000 \ { 0x10000000, 0x10010000, 00100xx000}} {xxx00 \ {01100, 00x00, 00000}} {x10x1 \ {11001, x1001, 11011}} {} {000xx \ {0000x, 000x1, 000x0}, 11xxx \ {1100x, 11001, 11x00}} {1xxxx \ {10xxx, 110x0, 111x0}} { 1xxxx000xx \ { 1xxx1000x0, 1xxx0000x1, 1xx1x0000x, 1xx0x0001x, 1xxxx0000x, 1xxxx000x1, 1xxxx000x0, 10xxx000xx, 110x0000xx, 111x0000xx}, 1xxxx11xxx \ { 1xxx111xx0, 1xxx011xx1, 1xx1x11x0x, 1xx0x11x1x, 1xxxx1100x, 1xxxx11001, 1xxxx11x00, 10xxx11xxx, 110x011xxx, 111x011xxx}} {0x10x \ {01100, 00101, 0x101}, 1xx10 \ {11110, 1x010, 1x010}} {1x11x \ {1111x, 10111, 10110}} { 1x1101xx10 \ { 1x11011110, 1x1101x010, 1x1101x010, 111101xx10, 101101xx10}} {0xx0x \ {01100, 00x01, 00x00}, x01xx \ {10101, 10110, 1010x}} {011xx \ {0111x, 0110x, 011x1}} { 0110x0xx0x \ { 011010xx00, 011000xx01, 0110x01100, 0110x00x01, 0110x00x00, 0110x0xx0x, 011010xx0x}, 011xxx01xx \ { 011x1x01x0, 011x0x01x1, 0111xx010x, 0110xx011x, 011xx10101, 011xx10110, 011xx1010x, 0111xx01xx, 0110xx01xx, 011x1x01xx}} {001x0 \ {00100, 00110}, 1x0xx \ {10011, 11000, 1000x}} {x011x \ {0011x, 00111}} { x011000110 \ { x011000110, 0011000110}, x011x1x01x \ { x01111x010, x01101x011, x011x10011, 0011x1x01x, 001111x01x}} {01xxx \ {01xx1, 01110, 01110}, 0xxx1 \ {01x01, 000x1, 001x1}} {00xx1 \ {001x1, 00001}} { 00xx101xx1 \ { 00x1101x01, 00x0101x11, 00xx101xx1, 001x101xx1, 0000101xx1}, 00xx10xxx1 \ { 00x110xx01, 00x010xx11, 00xx101x01, 00xx1000x1, 00xx1001x1, 001x10xxx1, 000010xxx1}} {0x10x \ {0110x, 00100, 00101}} {1x00x \ {10000, 11000, 10001}, x1x0x \ {01101, 11000, 01x0x}} { 1x00x0x10x \ { 1x0010x100, 1x0000x101, 1x00x0110x, 1x00x00100, 1x00x00101, 100000x10x, 110000x10x, 100010x10x}, x1x0x0x10x \ { x1x010x100, x1x000x101, x1x0x0110x, x1x0x00100, x1x0x00101, 011010x10x, 110000x10x, 01x0x0x10x}} {xxxx0 \ {0xx10, 01x00, x0xx0}, x1x0x \ {01101, 11001, 01000}} {0xx10 \ {01010, 01110, 00110}, xx110 \ {01110, 11110, 10110}} { 0xx10xxx10 \ { 0xx100xx10, 0xx10x0x10, 01010xxx10, 01110xxx10, 00110xxx10}, xx110xxx10 \ { xx1100xx10, xx110x0x10, 01110xxx10, 11110xxx10, 10110xxx10}} {xxxxx \ {1xxxx, x0111, 0x0x1}, 0x01x \ {0001x, 01010, 01010}} {x0x11 \ {10x11, 00111, 10011}} { x0x11xxx11 \ { x0x111xx11, x0x11x0111, x0x110x011, 10x11xxx11, 00111xxx11, 10011xxx11}, x0x110x011 \ { x0x1100011, 10x110x011, 001110x011, 100110x011}} {11xx1 \ {11x11, 110x1}} {00x1x \ {00x10, 0011x, 00111}} { 00x1111x11 \ { 00x1111x11, 00x1111011, 0011111x11, 0011111x11}} {110x1 \ {11011}, 001x0 \ {00110, 00100, 00100}} {xx01x \ {x1010, x101x, xx010}, 1x01x \ {1x011, 1x010, 10010}, xxx0x \ {11001, 01000, 01x00}} { xx01111011 \ { xx01111011, x101111011}, 1x01111011 \ { 1x01111011, 1x01111011}, xxx0111001 \ { 1100111001}, xx01000110 \ { xx01000110, x101000110, x101000110, xx01000110}, 1x01000110 \ { 1x01000110, 1x01000110, 1001000110}, xxx0000100 \ { xxx0000100, xxx0000100, 0100000100, 01x0000100}} {x1xx0 \ {11x00, 01x00}, xx101 \ {0x101, 10101, 00101}} {001x0 \ {00100, 00110, 00110}, x1x10 \ {01010, 11110}} { 001x0x1xx0 \ { 00110x1x00, 00100x1x10, 001x011x00, 001x001x00, 00100x1xx0, 00110x1xx0, 00110x1xx0}, x1x10x1x10 \ { 01010x1x10, 11110x1x10}} {x1x01 \ {11x01, 11001, 11001}, 11xx0 \ {11x00, 11000, 110x0}, xx10x \ {11101, 01100, 00100}} {xxxx1 \ {1x1x1, 011x1, xxx11}, x11x1 \ {11101, 01101, 11111}} { xxx01x1x01 \ { xxx0111x01, xxx0111001, xxx0111001, 1x101x1x01, 01101x1x01}, x1101x1x01 \ { x110111x01, x110111001, x110111001, 11101x1x01, 01101x1x01}, xxx01xx101 \ { xxx0111101, 1x101xx101, 01101xx101}, x1101xx101 \ { x110111101, 11101xx101, 01101xx101}} {xx1x0 \ {111x0, 1x100, 0x1x0}, 1x0xx \ {1100x, 1x0x0, 11011}, xxxx1 \ {01011, 10111, 01xx1}} {1xxxx \ {1x1xx, 1111x, 10x00}} { 1xxx0xx1x0 \ { 1xx10xx100, 1xx00xx110, 1xxx0111x0, 1xxx01x100, 1xxx00x1x0, 1x1x0xx1x0, 11110xx1x0, 10x00xx1x0}, 1xxxx1x0xx \ { 1xxx11x0x0, 1xxx01x0x1, 1xx1x1x00x, 1xx0x1x01x, 1xxxx1100x, 1xxxx1x0x0, 1xxxx11011, 1x1xx1x0xx, 1111x1x0xx, 10x001x0xx}, 1xxx1xxxx1 \ { 1xx11xxx01, 1xx01xxx11, 1xxx101011, 1xxx110111, 1xxx101xx1, 1x1x1xxxx1, 11111xxxx1}} {xx011 \ {01011, x1011, 00011}, x01xx \ {001xx, 0011x, 1010x}} {x11xx \ {x11x1, 111xx, 011x0}, x0x1x \ {10x11, 10010}} { x1111xx011 \ { x111101011, x1111x1011, x111100011, x1111xx011, 11111xx011}, x0x11xx011 \ { x0x1101011, x0x11x1011, x0x1100011, 10x11xx011}, x11xxx01xx \ { x11x1x01x0, x11x0x01x1, x111xx010x, x110xx011x, x11xx001xx, x11xx0011x, x11xx1010x, x11x1x01xx, 111xxx01xx, 011x0x01xx}, x0x1xx011x \ { x0x11x0110, x0x10x0111, x0x1x0011x, x0x1x0011x, 10x11x011x, 10010x011x}} {x000x \ {0000x, 00001, x0000}, 0000x \ {00000}} {00x1x \ {00011, 00111}} {} {x111x \ {11111}} {011xx \ {011x0, 0111x, 0111x}, x1xx1 \ {x1x11, x1111, 11111}} { 0111xx111x \ { 01111x1110, 01110x1111, 0111x11111, 01110x111x, 0111xx111x, 0111xx111x}, x1x11x1111 \ { x1x1111111, x1x11x1111, x1111x1111, 11111x1111}} {1xx1x \ {11x1x, 10111}, x011x \ {0011x, 1011x, 10111}, x110x \ {x1100, x1101, 01100}} {0xx11 \ {01x11, 01111, 00111}, x1001 \ {11001, 01001}} { 0xx111xx11 \ { 0xx1111x11, 0xx1110111, 01x111xx11, 011111xx11, 001111xx11}, 0xx11x0111 \ { 0xx1100111, 0xx1110111, 0xx1110111, 01x11x0111, 01111x0111, 00111x0111}, x1001x1101 \ { x1001x1101, 11001x1101, 01001x1101}} {1x10x \ {10101, 10100, 11100}, 00xx0 \ {00100, 00x00, 00x00}} {xx110 \ {11110, 1x110, 00110}, 0x0xx \ {01000, 010xx, 010x1}, x01x0 \ {001x0, 101x0}} { 0x00x1x10x \ { 0x0011x100, 0x0001x101, 0x00x10101, 0x00x10100, 0x00x11100, 010001x10x, 0100x1x10x, 010011x10x}, x01001x100 \ { x010010100, x010011100, 001001x100, 101001x100}, xx11000x10 \ { 1111000x10, 1x11000x10, 0011000x10}, 0x0x000xx0 \ { 0x01000x00, 0x00000x10, 0x0x000100, 0x0x000x00, 0x0x000x00, 0100000xx0, 010x000xx0}, x01x000xx0 \ { x011000x00, x010000x10, x01x000100, x01x000x00, x01x000x00, 001x000xx0, 101x000xx0}} {xxx10 \ {11x10, 10110, x0010}} {01x00 \ {01000}} {} {} {xx111 \ {x1111, 1x111, 11111}} {} {x0101 \ {00101, 10101}, x1x01 \ {01101, x1101, x1101}} {xxx1x \ {1xx1x, xxx10, x0x1x}, 0xx10 \ {01110, 00110, 00110}} {} {0x11x \ {0111x, 0x111, 0011x}, 0xx0x \ {0010x, 00000, 01100}} {} {} {1xxx1 \ {10x11, 1xx11, 100x1}, x0011 \ {10011, 00011}} {} {} {} {01x11 \ {01111, 01011}, 0x11x \ {0111x}} {} {1xx10 \ {1x010, 1x110, 10010}, xx00x \ {0x00x, 10000, 0x000}} {x1x0x \ {01000, x1001, x100x}} { x1x0xxx00x \ { x1x01xx000, x1x00xx001, x1x0x0x00x, x1x0x10000, x1x0x0x000, 01000xx00x, x1001xx00x, x100xxx00x}} {0xx11 \ {00111, 01011, 01x11}, 0x1xx \ {00110, 00100, 001x1}} {01xx1 \ {01111, 01011, 01x11}, xxx10 \ {11x10, 0x110, x1110}} { 01x110xx11 \ { 01x1100111, 01x1101011, 01x1101x11, 011110xx11, 010110xx11, 01x110xx11}, 01xx10x1x1 \ { 01x110x101, 01x010x111, 01xx1001x1, 011110x1x1, 010110x1x1, 01x110x1x1}, xxx100x110 \ { xxx1000110, 11x100x110, 0x1100x110, x11100x110}} {1x000 \ {11000, 10000, 10000}, 00xxx \ {00100, 0000x}} {xxx1x \ {x0011, 10x11, x001x}, x1xx1 \ {x1111, x11x1, 01101}} { xxx1x00x1x \ { xxx1100x10, xxx1000x11, x001100x1x, 10x1100x1x, x001x00x1x}, x1xx100xx1 \ { x1x1100x01, x1x0100x11, x1xx100001, x111100xx1, x11x100xx1, 0110100xx1}} {1100x \ {11001, 11000}, 0x1x1 \ {01111, 001x1, 00111}} {xx01x \ {x101x, 11011, x0010}, xx1x0 \ {1x110, 0x110}} { xx10011000 \ { xx10011000}, xx0110x111 \ { xx01101111, xx01100111, xx01100111, x10110x111, 110110x111}} {1110x \ {11101, 11100, 11100}} {010x1 \ {01011, 01001}, 1xx1x \ {11110, 11011, 1x110}} { 0100111101 \ { 0100111101, 0100111101}} {10x01 \ {10001}} {x00xx \ {x0010, 000xx, 10011}, x1x00 \ {11100, 01x00}} { x000110x01 \ { x000110001, 0000110x01}} {001x0 \ {00100, 00110}} {11xxx \ {11100, 1101x}, xx101 \ {x1101, 1x101, 10101}, 10x10 \ {10110}} { 11xx0001x0 \ { 11x1000100, 11x0000110, 11xx000100, 11xx000110, 11100001x0, 11010001x0}, 10x1000110 \ { 10x1000110, 1011000110}} {} {01x01 \ {01001}} {} {x0xx1 \ {x01x1, x0001, 00xx1}, xx1x1 \ {00111, 10111, 1x1x1}} {x11xx \ {x1111, 0111x, 0110x}, 11x0x \ {1100x, 11101}} { x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x1x01x1, x11x1x0001, x11x100xx1, x1111x0xx1, 01111x0xx1, 01101x0xx1}, 11x01x0x01 \ { 11x01x0101, 11x01x0001, 11x0100x01, 11001x0x01, 11101x0x01}, x11x1xx1x1 \ { x1111xx101, x1101xx111, x11x100111, x11x110111, x11x11x1x1, x1111xx1x1, 01111xx1x1, 01101xx1x1}, 11x01xx101 \ { 11x011x101, 11001xx101, 11101xx101}} {00xx1 \ {00001, 00x01, 00111}} {100xx \ {10010, 1000x, 10000}, 0xx00 \ {00000, 00100, 01000}, xxxx1 \ {x1x01, 00101, 11xx1}} { 100x100xx1 \ { 1001100x01, 1000100x11, 100x100001, 100x100x01, 100x100111, 1000100xx1}, xxxx100xx1 \ { xxx1100x01, xxx0100x11, xxxx100001, xxxx100x01, xxxx100111, x1x0100xx1, 0010100xx1, 11xx100xx1}} {x00xx \ {x0010, 1001x, x0000}, 010x1 \ {01011, 01001}} {x0x1x \ {10x1x, x0010, x001x}, 0111x \ {01110, 01111}} { x0x1xx001x \ { x0x11x0010, x0x10x0011, x0x1xx0010, x0x1x1001x, 10x1xx001x, x0010x001x, x001xx001x}, 0111xx001x \ { 01111x0010, 01110x0011, 0111xx0010, 0111x1001x, 01110x001x, 01111x001x}, x0x1101011 \ { x0x1101011, 10x1101011, x001101011}, 0111101011 \ { 0111101011, 0111101011}} {1xxx1 \ {10101, 100x1, 11xx1}, x0101 \ {10101, 00101}} {0x00x \ {01000, 0x001, 0100x}} { 0x0011xx01 \ { 0x00110101, 0x00110001, 0x00111x01, 0x0011xx01, 010011xx01}, 0x001x0101 \ { 0x00110101, 0x00100101, 0x001x0101, 01001x0101}} {10x0x \ {10x01, 10001}} {0x1x1 \ {01101, 0x101, 0x101}} { 0x10110x01 \ { 0x10110x01, 0x10110001, 0110110x01, 0x10110x01, 0x10110x01}} {11xx1 \ {11001, 11011}, xx0x0 \ {1x0x0, x0010, x00x0}} {1xx01 \ {11x01, 10x01, 10101}, x0xxx \ {10101, x000x, 10xx1}, xx10x \ {01100, 01101, 0110x}} { 1xx0111x01 \ { 1xx0111001, 11x0111x01, 10x0111x01, 1010111x01}, x0xx111xx1 \ { x0x1111x01, x0x0111x11, x0xx111001, x0xx111011, 1010111xx1, x000111xx1, 10xx111xx1}, xx10111x01 \ { xx10111001, 0110111x01, 0110111x01}, x0xx0xx0x0 \ { x0x10xx000, x0x00xx010, x0xx01x0x0, x0xx0x0010, x0xx0x00x0, x0000xx0x0}, xx100xx000 \ { xx1001x000, xx100x0000, 01100xx000, 01100xx000}} {xxx1x \ {00110, xx111, x001x}} {00x11 \ {00111, 00011}, 0xxx0 \ {01x10, 00100}, x010x \ {10101, x0100, 00100}} { 00x11xxx11 \ { 00x11xx111, 00x11x0011, 00111xxx11, 00011xxx11}, 0xx10xxx10 \ { 0xx1000110, 0xx10x0010, 01x10xxx10}} {0xxx0 \ {00000, 0x110, 00110}} {x11x0 \ {x1110, 01110, x1100}, x00x1 \ {00001, 10001}} { x11x00xxx0 \ { x11100xx00, x11000xx10, x11x000000, x11x00x110, x11x000110, x11100xxx0, 011100xxx0, x11000xxx0}} {} {0x1x0 \ {011x0, 01110, 00100}} {} {1x0x1 \ {110x1, 100x1, 10001}} {00x10 \ {00010, 00110}, x10xx \ {x1011, 11001, 01010}} { x10x11x0x1 \ { x10111x001, x10011x011, x10x1110x1, x10x1100x1, x10x110001, x10111x0x1, 110011x0x1}} {111x0 \ {11100}, 0x1xx \ {0010x, 01101, 011x0}} {xx0x0 \ {x0000, 0x010, x1000}} { xx0x0111x0 \ { xx01011100, xx00011110, xx0x011100, x0000111x0, 0x010111x0, x1000111x0}, xx0x00x1x0 \ { xx0100x100, xx0000x110, xx0x000100, xx0x0011x0, x00000x1x0, 0x0100x1x0, x10000x1x0}} {x0x1x \ {x0111, 0001x, 1011x}, 111x0 \ {11110, 11100, 11100}} {} {} {x0x00 \ {00x00, x0000, x0100}, 0x101 \ {01101}} {1xxxx \ {10x11, 1x101, 10x1x}, 0x1x0 \ {011x0, 0x110}} { 1xx00x0x00 \ { 1xx0000x00, 1xx00x0000, 1xx00x0100}, 0x100x0x00 \ { 0x10000x00, 0x100x0000, 0x100x0100, 01100x0x00}, 1xx010x101 \ { 1xx0101101, 1x1010x101}} {xx110 \ {10110, 01110, 0x110}} {1111x \ {11110, 11111}} { 11110xx110 \ { 1111010110, 1111001110, 111100x110, 11110xx110}} {x10xx \ {110xx, 1100x, 110x0}, xx0xx \ {x00x1, xx010, x10x1}} {0011x \ {00111}, xx0x0 \ {100x0, 01000, 1x010}, 0xx0x \ {0x101, 01100, 00001}} { 0011xx101x \ { 00111x1010, 00110x1011, 0011x1101x, 0011x11010, 00111x101x}, xx0x0x10x0 \ { xx010x1000, xx000x1010, xx0x0110x0, xx0x011000, xx0x0110x0, 100x0x10x0, 01000x10x0, 1x010x10x0}, 0xx0xx100x \ { 0xx01x1000, 0xx00x1001, 0xx0x1100x, 0xx0x1100x, 0xx0x11000, 0x101x100x, 01100x100x, 00001x100x}, 0011xxx01x \ { 00111xx010, 00110xx011, 0011xx0011, 0011xxx010, 0011xx1011, 00111xx01x}, xx0x0xx0x0 \ { xx010xx000, xx000xx010, xx0x0xx010, 100x0xx0x0, 01000xx0x0, 1x010xx0x0}, 0xx0xxx00x \ { 0xx01xx000, 0xx00xx001, 0xx0xx0001, 0xx0xx1001, 0x101xx00x, 01100xx00x, 00001xx00x}} {x1x10 \ {01110, 11110, x1010}, x1xxx \ {1111x, x1xx0, x1011}} {x1011 \ {11011, 01011}, 10x0x \ {1000x, 10001, 10x00}, 10x1x \ {10x11, 10x10, 10111}} { 10x10x1x10 \ { 10x1001110, 10x1011110, 10x10x1010, 10x10x1x10}, x1011x1x11 \ { x101111111, x1011x1011, 11011x1x11, 01011x1x11}, 10x0xx1x0x \ { 10x01x1x00, 10x00x1x01, 10x0xx1x00, 1000xx1x0x, 10001x1x0x, 10x00x1x0x}, 10x1xx1x1x \ { 10x11x1x10, 10x10x1x11, 10x1x1111x, 10x1xx1x10, 10x1xx1011, 10x11x1x1x, 10x10x1x1x, 10111x1x1x}} {0110x \ {01100, 01101}, x1x00 \ {x1100, 01000}} {00xx0 \ {001x0, 00010, 00x00}, 00xx1 \ {00x11, 00111, 00001}} { 00x0001100 \ { 00x0001100, 0010001100, 00x0001100}, 00x0101101 \ { 00x0101101, 0000101101}, 00x00x1x00 \ { 00x00x1100, 00x0001000, 00100x1x00, 00x00x1x00}} {x11xx \ {1110x, 111xx, x11x0}, 1x1x1 \ {11101, 11111, 10111}} {x011x \ {00110, 0011x, x0111}, 011x1 \ {01101}} { x011xx111x \ { x0111x1110, x0110x1111, x011x1111x, x011xx1110, 00110x111x, 0011xx111x, x0111x111x}, 011x1x11x1 \ { 01111x1101, 01101x1111, 011x111101, 011x1111x1, 01101x11x1}, x01111x111 \ { x011111111, x011110111, 001111x111, x01111x111}, 011x11x1x1 \ { 011111x101, 011011x111, 011x111101, 011x111111, 011x110111, 011011x1x1}} {1x0x1 \ {11001, 1x011, 1x011}, x001x \ {10010, 0001x}} {0001x \ {00011, 00010}, 00x10 \ {00010, 00110}} { 000111x011 \ { 000111x011, 000111x011, 000111x011}, 0001xx001x \ { 00011x0010, 00010x0011, 0001x10010, 0001x0001x, 00011x001x, 00010x001x}, 00x10x0010 \ { 00x1010010, 00x1000010, 00010x0010, 00110x0010}} {01x01 \ {01001, 01101}} {01x0x \ {01101, 0100x}} { 01x0101x01 \ { 01x0101001, 01x0101101, 0110101x01, 0100101x01}} {xx11x \ {x1111, 1x11x, x0111}, x00x1 \ {x0001, 10011, 00001}, x10xx \ {0100x, x100x, x1010}} {xx0xx \ {10010, 0x00x, x100x}, 0x00x \ {0x000, 0x001, 01000}, 11xx0 \ {11010, 111x0, 11110}} { xx01xxx11x \ { xx011xx110, xx010xx111, xx01xx1111, xx01x1x11x, xx01xx0111, 10010xx11x}, 11x10xx110 \ { 11x101x110, 11010xx110, 11110xx110, 11110xx110}, xx0x1x00x1 \ { xx011x0001, xx001x0011, xx0x1x0001, xx0x110011, xx0x100001, 0x001x00x1, x1001x00x1}, 0x001x0001 \ { 0x001x0001, 0x00100001, 0x001x0001}, xx0xxx10xx \ { xx0x1x10x0, xx0x0x10x1, xx01xx100x, xx00xx101x, xx0xx0100x, xx0xxx100x, xx0xxx1010, 10010x10xx, 0x00xx10xx, x100xx10xx}, 0x00xx100x \ { 0x001x1000, 0x000x1001, 0x00x0100x, 0x00xx100x, 0x000x100x, 0x001x100x, 01000x100x}, 11xx0x10x0 \ { 11x10x1000, 11x00x1010, 11xx001000, 11xx0x1000, 11xx0x1010, 11010x10x0, 111x0x10x0, 11110x10x0}} {} {100xx \ {10011, 10001, 1001x}} {} {10x1x \ {10010, 10x11, 10011}, 010x1 \ {01011, 01001}} {10x10 \ {10110, 10010}} { 10x1010x10 \ { 10x1010010, 1011010x10, 1001010x10}} {} {0x0x0 \ {00010, 01000, 010x0}} {} {x1001 \ {01001, 11001, 11001}, xx001 \ {01001, x0001, 1x001}} {0x01x \ {0x011, 01010}} {} {x1x1x \ {1111x, 11110, 01011}} {0x1x0 \ {01100, 01110, 011x0}, x0xxx \ {x00x1, 10010, 000xx}} { 0x110x1x10 \ { 0x11011110, 0x11011110, 01110x1x10, 01110x1x10}, x0x1xx1x1x \ { x0x11x1x10, x0x10x1x11, x0x1x1111x, x0x1x11110, x0x1x01011, x0011x1x1x, 10010x1x1x, 0001xx1x1x}} {xx0x0 \ {0x0x0, 01000, xx010}} {1x001 \ {11001, 10001, 10001}} {} {x000x \ {x0000, x0001, x0001}, 1x0x1 \ {10001, 11001, 1x001}} {0xx01 \ {01x01, 00001, 01101}, x1xx0 \ {11x10, 01100, x11x0}, xx10x \ {0x101, 1x10x, 11101}} { 0xx01x0001 \ { 0xx01x0001, 0xx01x0001, 01x01x0001, 00001x0001, 01101x0001}, x1x00x0000 \ { x1x00x0000, 01100x0000, x1100x0000}, xx10xx000x \ { xx101x0000, xx100x0001, xx10xx0000, xx10xx0001, xx10xx0001, 0x101x000x, 1x10xx000x, 11101x000x}, 0xx011x001 \ { 0xx0110001, 0xx0111001, 0xx011x001, 01x011x001, 000011x001, 011011x001}, xx1011x001 \ { xx10110001, xx10111001, xx1011x001, 0x1011x001, 1x1011x001, 111011x001}} {00xx0 \ {00110, 00x00}} {00xx0 \ {001x0, 00100, 000x0}, 1010x \ {10100, 10101}, x10xx \ {x1000, x10x0, 110x0}} { 00xx000xx0 \ { 00x1000x00, 00x0000x10, 00xx000110, 00xx000x00, 001x000xx0, 0010000xx0, 000x000xx0}, 1010000x00 \ { 1010000x00, 1010000x00}, x10x000xx0 \ { x101000x00, x100000x10, x10x000110, x10x000x00, x100000xx0, x10x000xx0, 110x000xx0}} {x00xx \ {1000x, 100x0, 0001x}, x1xx1 \ {111x1, x1011, 11xx1}, 00xx1 \ {00101, 000x1, 001x1}} {0x10x \ {0110x, 0010x, 00100}, x0101 \ {10101, 00101}, x10xx \ {11011, 11010, x10x0}} { 0x10xx000x \ { 0x101x0000, 0x100x0001, 0x10x1000x, 0x10x10000, 0110xx000x, 0010xx000x, 00100x000x}, x0101x0001 \ { x010110001, 10101x0001, 00101x0001}, x10xxx00xx \ { x10x1x00x0, x10x0x00x1, x101xx000x, x100xx001x, x10xx1000x, x10xx100x0, x10xx0001x, 11011x00xx, 11010x00xx, x10x0x00xx}, 0x101x1x01 \ { 0x10111101, 0x10111x01, 01101x1x01, 00101x1x01}, x0101x1x01 \ { x010111101, x010111x01, 10101x1x01, 00101x1x01}, x10x1x1xx1 \ { x1011x1x01, x1001x1x11, x10x1111x1, x10x1x1011, x10x111xx1, 11011x1xx1}, 0x10100x01 \ { 0x10100101, 0x10100001, 0x10100101, 0110100x01, 0010100x01}, x010100x01 \ { x010100101, x010100001, x010100101, 1010100x01, 0010100x01}, x10x100xx1 \ { x101100x01, x100100x11, x10x100101, x10x1000x1, x10x1001x1, 1101100xx1}} {} {x0x10 \ {00110, x0110}, 0xx11 \ {00011, 01x11}} {} {} {x10x1 \ {01001, x1011, 01011}, 0xx01 \ {0x001, 00101, 01101}} {} {1x110 \ {10110, 11110, 11110}} {x11x1 \ {11101, x1101, x1101}} {} {1x11x \ {11110, 10111, 11111}} {1xxx0 \ {1x000, 10x00, 110x0}} { 1xx101x110 \ { 1xx1011110, 110101x110}} {} {x0xx1 \ {10101, 100x1, x0101}, 1x0xx \ {1001x, 11010}} {} {xxxx1 \ {01101, 01001, xx0x1}, 00x10 \ {00110, 00010, 00010}} {0xx10 \ {00010, 01x10, 01010}, 1x010 \ {11010, 10010}} { 0xx1000x10 \ { 0xx1000110, 0xx1000010, 0xx1000010, 0001000x10, 01x1000x10, 0101000x10}, 1x01000x10 \ { 1x01000110, 1x01000010, 1x01000010, 1101000x10, 1001000x10}} {01x1x \ {01x11, 01011}} {00xx1 \ {001x1, 00101, 00111}, x101x \ {11010, 11011}} { 00x1101x11 \ { 00x1101x11, 00x1101011, 0011101x11, 0011101x11}, x101x01x1x \ { x101101x10, x101001x11, x101x01x11, x101x01011, 1101001x1x, 1101101x1x}} {} {} {} {} {x000x \ {10001, 1000x, 10000}} {} {00xxx \ {00111, 00011, 00x1x}, 010x1 \ {01001, 01011}} {xxx11 \ {x1111, x0x11, 0x011}, 1x0x1 \ {100x1, 110x1, 10001}} { xxx1100x11 \ { xxx1100111, xxx1100011, xxx1100x11, x111100x11, x0x1100x11, 0x01100x11}, 1x0x100xx1 \ { 1x01100x01, 1x00100x11, 1x0x100111, 1x0x100011, 1x0x100x11, 100x100xx1, 110x100xx1, 1000100xx1}, xxx1101011 \ { xxx1101011, x111101011, x0x1101011, 0x01101011}, 1x0x1010x1 \ { 1x01101001, 1x00101011, 1x0x101001, 1x0x101011, 100x1010x1, 110x1010x1, 10001010x1}} {x0x1x \ {00110, 1011x, x0011}} {} {} {01x1x \ {01x10, 01111, 01111}, x0x01 \ {10001, 10101, x0101}} {x110x \ {11101, 01100}, xxx01 \ {11001, 0x101, 01101}} { x1101x0x01 \ { x110110001, x110110101, x1101x0101, 11101x0x01}, xxx01x0x01 \ { xxx0110001, xxx0110101, xxx01x0101, 11001x0x01, 0x101x0x01, 01101x0x01}} {1xx0x \ {1x000, 11100, 10000}, 1x01x \ {10011, 1001x}} {x11xx \ {111xx, x110x, x11x0}} { x110x1xx0x \ { x11011xx00, x11001xx01, x110x1x000, x110x11100, x110x10000, 1110x1xx0x, x110x1xx0x, x11001xx0x}, x111x1x01x \ { x11111x010, x11101x011, x111x10011, x111x1001x, 1111x1x01x, x11101x01x}} {} {} {} {xx010 \ {11010, 0x010}} {xxx10 \ {10110, 10x10, x1010}, 1x011 \ {11011, 10011}} { xxx10xx010 \ { xxx1011010, xxx100x010, 10110xx010, 10x10xx010, x1010xx010}} {0x0xx \ {0101x, 01011, 010x0}, 1x001 \ {10001, 11001, 11001}} {xx0x1 \ {x10x1, 010x1, 01001}} { xx0x10x0x1 \ { xx0110x001, xx0010x011, xx0x101011, xx0x101011, x10x10x0x1, 010x10x0x1, 010010x0x1}, xx0011x001 \ { xx00110001, xx00111001, xx00111001, x10011x001, 010011x001, 010011x001}} {x0010 \ {10010, 00010}, 10x00 \ {10100, 10000}} {x1x1x \ {0111x, 01011}, x1xx0 \ {x11x0, 01000, 01110}} { x1x10x0010 \ { x1x1010010, x1x1000010, 01110x0010}, x1x0010x00 \ { x1x0010100, x1x0010000, x110010x00, 0100010x00}} {x11x1 \ {111x1, 011x1, 11101}, x0x01 \ {10101, 10x01, x0001}} {xx10x \ {x010x, x1101, 1x10x}, x11x0 \ {011x0, 11100}} { xx101x1101 \ { xx10111101, xx10101101, xx10111101, x0101x1101, x1101x1101, 1x101x1101}, xx101x0x01 \ { xx10110101, xx10110x01, xx101x0001, x0101x0x01, x1101x0x01, 1x101x0x01}} {x1x11 \ {11111, x1111, 11x11}, x1x01 \ {01101, x1101, 01x01}} {10xx1 \ {10011, 10001, 101x1}} { 10x11x1x11 \ { 10x1111111, 10x11x1111, 10x1111x11, 10011x1x11, 10111x1x11}, 10x01x1x01 \ { 10x0101101, 10x01x1101, 10x0101x01, 10001x1x01, 10101x1x01}} {xxxx1 \ {0x1x1, 0xxx1, xx0x1}, 1xxxx \ {11xxx, 1x101, 110xx}, 10xx1 \ {10x11, 101x1, 101x1}} {1101x \ {11011, 11010, 11010}} { 11011xxx11 \ { 110110x111, 110110xx11, 11011xx011, 11011xxx11}, 1101x1xx1x \ { 110111xx10, 110101xx11, 1101x11x1x, 1101x1101x, 110111xx1x, 110101xx1x, 110101xx1x}, 1101110x11 \ { 1101110x11, 1101110111, 1101110111, 1101110x11}} {xxxx0 \ {xxx00, 00010, 01110}, 0x0x0 \ {01000, 00010, 010x0}} {x1xx0 \ {x1100, 01100, 11x00}, x1010 \ {11010}} { x1xx0xxxx0 \ { x1x10xxx00, x1x00xxx10, x1xx0xxx00, x1xx000010, x1xx001110, x1100xxxx0, 01100xxxx0, 11x00xxxx0}, x1010xxx10 \ { x101000010, x101001110, 11010xxx10}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx001000, x1xx000010, x1xx0010x0, x11000x0x0, 011000x0x0, 11x000x0x0}, x10100x010 \ { x101000010, x101001010, 110100x010}} {} {x0100 \ {00100}, 00xxx \ {00011, 0011x, 000x1}} {} {x10xx \ {010xx, 11010, x1010}, xx100 \ {x0100, 01100}} {x000x \ {00001, 1000x}, x10x0 \ {11010, x1010, 01010}, xx11x \ {1x11x, 0x110, 1x110}} { x000xx100x \ { x0001x1000, x0000x1001, x000x0100x, 00001x100x, 1000xx100x}, x10x0x10x0 \ { x1010x1000, x1000x1010, x10x0010x0, x10x011010, x10x0x1010, 11010x10x0, x1010x10x0, 01010x10x0}, xx11xx101x \ { xx111x1010, xx110x1011, xx11x0101x, xx11x11010, xx11xx1010, 1x11xx101x, 0x110x101x, 1x110x101x}, x0000xx100 \ { x0000x0100, x000001100, 10000xx100}, x1000xx100 \ { x1000x0100, x100001100}} {10xx1 \ {10101, 10x01, 10001}} {x0xx0 \ {x0110, x0000, 10100}} {} {11xxx \ {1110x, 11111, 11100}, 1011x \ {10111, 10110}} {0x101 \ {00101, 01101}, 10x1x \ {10110, 10010, 10x10}} { 0x10111x01 \ { 0x10111101, 0010111x01, 0110111x01}, 10x1x11x1x \ { 10x1111x10, 10x1011x11, 10x1x11111, 1011011x1x, 1001011x1x, 10x1011x1x}, 10x1x1011x \ { 10x1110110, 10x1010111, 10x1x10111, 10x1x10110, 101101011x, 100101011x, 10x101011x}} {x0xx0 \ {00010, 10000, 00100}, xx0x0 \ {00000, xx000, 010x0}} {} {} {xx1xx \ {10111, x0110, 111x0}} {00xxx \ {00xx0, 00010}, xxx01 \ {1x001, 01001, 1xx01}} { 00xxxxx1xx \ { 00xx1xx1x0, 00xx0xx1x1, 00x1xxx10x, 00x0xxx11x, 00xxx10111, 00xxxx0110, 00xxx111x0, 00xx0xx1xx, 00010xx1xx}, xxx01xx101 \ { 1x001xx101, 01001xx101, 1xx01xx101}} {x1x11 \ {x1011, 01111, 11011}, xx01x \ {10010, 0001x, 0x01x}} {0x1x1 \ {0x111, 01111, 011x1}, 0xxxx \ {01x0x, 0x10x, 01x00}} { 0x111x1x11 \ { 0x111x1011, 0x11101111, 0x11111011, 0x111x1x11, 01111x1x11, 01111x1x11}, 0xx11x1x11 \ { 0xx11x1011, 0xx1101111, 0xx1111011}, 0x111xx011 \ { 0x11100011, 0x1110x011, 0x111xx011, 01111xx011, 01111xx011}, 0xx1xxx01x \ { 0xx11xx010, 0xx10xx011, 0xx1x10010, 0xx1x0001x, 0xx1x0x01x}} {xxx00 \ {0xx00, 00000, 10x00}} {0010x \ {00101, 00100}} { 00100xxx00 \ { 001000xx00, 0010000000, 0010010x00, 00100xxx00}} {} {0xx1x \ {0xx10, 00111, 00x1x}, 10x1x \ {1001x}} {} {xx100 \ {00100, 0x100, 01100}, 1x011 \ {10011, 11011}} {11x1x \ {11011, 1111x}} { 11x111x011 \ { 11x1110011, 11x1111011, 110111x011, 111111x011}} {1x01x \ {10011, 1101x, 1101x}, 0100x \ {01001, 01000}} {x0xx1 \ {10001, x0011, x0111}, 0xx00 \ {01x00, 00000, 0x000}} { x0x111x011 \ { x0x1110011, x0x1111011, x0x1111011, x00111x011, x01111x011}, x0x0101001 \ { x0x0101001, 1000101001}, 0xx0001000 \ { 0xx0001000, 01x0001000, 0000001000, 0x00001000}} {xxx11 \ {0x011, 00011, xx011}, 1xxx1 \ {1xx11, 10xx1, 11111}} {x1000 \ {11000, 01000}} {} {00xxx \ {0001x, 00110, 001x1}, 1x010 \ {11010, 10010}} {0110x \ {01100, 01101, 01101}, x1x00 \ {01x00, 01100, 11000}} { 0110x00x0x \ { 0110100x00, 0110000x01, 0110x00101, 0110000x0x, 0110100x0x, 0110100x0x}, x1x0000x00 \ { 01x0000x00, 0110000x00, 1100000x00}} {10x1x \ {10x10, 10010, 1011x}, xx00x \ {0x00x, 11001, 01001}, 010x1 \ {01001, 01011, 01011}} {x010x \ {x0101, 00101}, 110xx \ {11000, 11011}} { 1101x10x1x \ { 1101110x10, 1101010x11, 1101x10x10, 1101x10010, 1101x1011x, 1101110x1x}, x010xxx00x \ { x0101xx000, x0100xx001, x010x0x00x, x010x11001, x010x01001, x0101xx00x, 00101xx00x}, 1100xxx00x \ { 11001xx000, 11000xx001, 1100x0x00x, 1100x11001, 1100x01001, 11000xx00x}, x010101001 \ { x010101001, x010101001, 0010101001}, 110x1010x1 \ { 1101101001, 1100101011, 110x101001, 110x101011, 110x101011, 11011010x1}} {0x0x0 \ {01010, 00010, 0x010}, 000xx \ {00011, 00000, 0001x}, 1x100 \ {10100, 11100}} {x1x11 \ {01x11, x1011, 11011}, x111x \ {11110, x1111, 01111}} { x11100x010 \ { x111001010, x111000010, x11100x010, 111100x010}, x1x1100011 \ { x1x1100011, x1x1100011, 01x1100011, x101100011, 1101100011}, x111x0001x \ { x111100010, x111000011, x111x00011, x111x0001x, 111100001x, x11110001x, 011110001x}} {x1x1x \ {01110, x1110, x1011}} {x01x0 \ {10110, x0100, 10100}} { x0110x1x10 \ { x011001110, x0110x1110, 10110x1x10}} {} {} {} {1xxx0 \ {1x000, 10110, 10000}} {1xx10 \ {10x10, 10010, 10010}, x10x0 \ {01000, 110x0, 01010}, x1xx0 \ {111x0, 01000, x1000}} { 1xx101xx10 \ { 1xx1010110, 10x101xx10, 100101xx10, 100101xx10}, x10x01xxx0 \ { x10101xx00, x10001xx10, x10x01x000, x10x010110, x10x010000, 010001xxx0, 110x01xxx0, 010101xxx0}, x1xx01xxx0 \ { x1x101xx00, x1x001xx10, x1xx01x000, x1xx010110, x1xx010000, 111x01xxx0, 010001xxx0, x10001xxx0}} {x10xx \ {0101x, 11000, x1000}, 00xxx \ {000x0, 001x1, 001x1}} {0x1xx \ {00111, 0110x, 0x101}} { 0x1xxx10xx \ { 0x1x1x10x0, 0x1x0x10x1, 0x11xx100x, 0x10xx101x, 0x1xx0101x, 0x1xx11000, 0x1xxx1000, 00111x10xx, 0110xx10xx, 0x101x10xx}, 0x1xx00xxx \ { 0x1x100xx0, 0x1x000xx1, 0x11x00x0x, 0x10x00x1x, 0x1xx000x0, 0x1xx001x1, 0x1xx001x1, 0011100xxx, 0110x00xxx, 0x10100xxx}} {x0000 \ {10000, 00000, 00000}, 0x10x \ {01101, 0110x, 0110x}} {x1xxx \ {01111, 11x1x, 1110x}} { x1x00x0000 \ { x1x0010000, x1x0000000, x1x0000000, 11100x0000}, x1x0x0x10x \ { x1x010x100, x1x000x101, x1x0x01101, x1x0x0110x, x1x0x0110x, 1110x0x10x}} {01x1x \ {01x10, 01110, 01110}} {0100x \ {01000, 01001, 01001}, 1x000 \ {11000, 10000}, 0x110 \ {00110}} { 0x11001x10 \ { 0x11001x10, 0x11001110, 0x11001110, 0011001x10}} {x00x0 \ {100x0, 00000, x0010}, 1x110 \ {11110}} {001xx \ {00110, 001x0}, xxx01 \ {0xx01, 11x01, 11001}} { 001x0x00x0 \ { 00110x0000, 00100x0010, 001x0100x0, 001x000000, 001x0x0010, 00110x00x0, 001x0x00x0}, 001101x110 \ { 0011011110, 001101x110, 001101x110}} {xxx1x \ {1x11x, 1xx1x, 01010}, 0x0xx \ {00010, 0x00x, 00011}} {x1xx0 \ {01xx0, x1000, 111x0}} { x1x10xxx10 \ { x1x101x110, x1x101xx10, x1x1001010, 01x10xxx10, 11110xxx10}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx000010, x1xx00x000, 01xx00x0x0, x10000x0x0, 111x00x0x0}} {xxx01 \ {x0001, 0xx01, 1x101}, 00x10 \ {00110, 00010}} {1x1x1 \ {10101, 101x1, 10111}} { 1x101xxx01 \ { 1x101x0001, 1x1010xx01, 1x1011x101, 10101xxx01, 10101xxx01}} {1x1x1 \ {10111, 10101, 11111}} {0xx01 \ {01001, 0x001, 01x01}} { 0xx011x101 \ { 0xx0110101, 010011x101, 0x0011x101, 01x011x101}} {1x1x1 \ {10101, 10111, 10111}, x0xx1 \ {00101, 00x11, 10111}} {x11x1 \ {x1111, 01111, 01101}} { x11x11x1x1 \ { x11111x101, x11011x111, x11x110101, x11x110111, x11x110111, x11111x1x1, 011111x1x1, 011011x1x1}, x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x100101, x11x100x11, x11x110111, x1111x0xx1, 01111x0xx1, 01101x0xx1}} {10x1x \ {10010, 10x11, 10x10}, xxxx1 \ {0xxx1, 10xx1, 1x011}} {110xx \ {11010, 11001}} { 1101x10x1x \ { 1101110x10, 1101010x11, 1101x10010, 1101x10x11, 1101x10x10, 1101010x1x}, 110x1xxxx1 \ { 11011xxx01, 11001xxx11, 110x10xxx1, 110x110xx1, 110x11x011, 11001xxxx1}} {} {10xx0 \ {10000, 10110}, xxx11 \ {01x11, 01011, x0011}, 0xxx0 \ {01xx0, 0xx10, 0x1x0}} {} {00xx1 \ {001x1, 00x01, 000x1}, 0x00x \ {0000x, 01000, 0100x}} {00x0x \ {00001, 00100}, 01xx1 \ {01101, 01x11, 01x11}} { 00x0100x01 \ { 00x0100101, 00x0100x01, 00x0100001, 0000100x01}, 01xx100xx1 \ { 01x1100x01, 01x0100x11, 01xx1001x1, 01xx100x01, 01xx1000x1, 0110100xx1, 01x1100xx1, 01x1100xx1}, 00x0x0x00x \ { 00x010x000, 00x000x001, 00x0x0000x, 00x0x01000, 00x0x0100x, 000010x00x, 001000x00x}, 01x010x001 \ { 01x0100001, 01x0101001, 011010x001}} {x1x0x \ {01x01, 11x0x, 11x0x}, x1001 \ {01001}} {00xx1 \ {00111, 00001, 00011}} { 00x01x1x01 \ { 00x0101x01, 00x0111x01, 00x0111x01, 00001x1x01}, 00x01x1001 \ { 00x0101001, 00001x1001}} {x1101 \ {01101, 11101}, 101xx \ {101x0, 10110, 10100}} {001x0 \ {00100}} { 001x0101x0 \ { 0011010100, 0010010110, 001x0101x0, 001x010110, 001x010100, 00100101x0}} {xx101 \ {11101, x0101, 00101}} {1011x \ {10111}, x0x10 \ {x0110, x0010, 10x10}} {} {0xx10 \ {01110, 00x10, 01010}} {100xx \ {1000x, 1001x, 10000}, 0x0x1 \ {00001, 010x1, 00011}, 00xxx \ {0010x, 00xx0, 00001}} { 100100xx10 \ { 1001001110, 1001000x10, 1001001010, 100100xx10}, 00x100xx10 \ { 00x1001110, 00x1000x10, 00x1001010, 00x100xx10}} {x01x1 \ {101x1, 001x1, 001x1}} {xx01x \ {x101x, 1x011, 10011}, 0001x \ {00010, 00011, 00011}} { xx011x0111 \ { xx01110111, xx01100111, xx01100111, x1011x0111, 1x011x0111, 10011x0111}, 00011x0111 \ { 0001110111, 0001100111, 0001100111, 00011x0111, 00011x0111}} {xx011 \ {11011, 0x011, 01011}} {x10xx \ {110x1, 01010}} { x1011xx011 \ { x101111011, x10110x011, x101101011, 11011xx011}} {x0x01 \ {00001, 00101, 10101}, 1x011 \ {11011, 10011, 10011}, 11xxx \ {11x1x, 11100, 11011}} {} {} {11x0x \ {1110x, 11x00, 11x01}} {11x00 \ {11100}} { 11x0011x00 \ { 11x0011100, 11x0011x00, 1110011x00}} {x0xx0 \ {x00x0, x0010, 00000}} {xx111 \ {01111, 10111, 00111}} {} {xxx10 \ {11110, 1x110, 01010}} {} {} {010xx \ {01010, 0101x}, xxxx0 \ {x1010, 10x10, 01x10}} {} {} {1x1x0 \ {11110, 111x0, 10110}, 000xx \ {000x0, 00001}, x0xx0 \ {10110, 10x10, 101x0}} {1xxx0 \ {11000, 100x0, 11110}} { 1xxx01x1x0 \ { 1xx101x100, 1xx001x110, 1xxx011110, 1xxx0111x0, 1xxx010110, 110001x1x0, 100x01x1x0, 111101x1x0}, 1xxx0000x0 \ { 1xx1000000, 1xx0000010, 1xxx0000x0, 11000000x0, 100x0000x0, 11110000x0}, 1xxx0x0xx0 \ { 1xx10x0x00, 1xx00x0x10, 1xxx010110, 1xxx010x10, 1xxx0101x0, 11000x0xx0, 100x0x0xx0, 11110x0xx0}} {} {x10xx \ {x10x1, 110x0, 010x1}, x001x \ {x0011, 10010, 10010}} {} {xxx1x \ {x111x, 10111, 1x11x}, 01x11 \ {01011}} {xxx10 \ {0x010, xx110, xx010}, 010x0 \ {01000, 01010}} { xxx10xxx10 \ { xxx10x1110, xxx101x110, 0x010xxx10, xx110xxx10, xx010xxx10}, 01010xxx10 \ { 01010x1110, 010101x110, 01010xxx10}} {1xx01 \ {10x01, 10101}} {1011x \ {10110, 10111, 10111}, x1x1x \ {1101x, x111x, 01x10}} {} {} {0x1x0 \ {001x0, 01110, 0x100}, 0xx11 \ {00x11, 00111, 0x011}} {} {xxx1x \ {1011x, 1xx1x, 0x110}, x0x11 \ {x0111, 10x11, 00111}} {0x10x \ {0010x, 01100, 00101}} {} {1xx00 \ {10100, 1x100, 11100}} {1x0xx \ {10010, 100xx, 110xx}, x00x1 \ {x0011, 00001, 00011}} { 1x0001xx00 \ { 1x00010100, 1x0001x100, 1x00011100, 100001xx00, 110001xx00}} {001x0 \ {00110, 00100, 00100}} {0xx11 \ {00x11, 01111, 00111}, xx01x \ {x101x, 10011, 1001x}} { xx01000110 \ { xx01000110, x101000110, 1001000110}} {xxx00 \ {1xx00, 00x00, 00100}} {111xx \ {111x0, 11101, 11101}, 01x0x \ {01000, 0110x, 0100x}} { 11100xxx00 \ { 111001xx00, 1110000x00, 1110000100, 11100xxx00}, 01x00xxx00 \ { 01x001xx00, 01x0000x00, 01x0000100, 01000xxx00, 01100xxx00, 01000xxx00}} {xx10x \ {x010x, x0101, 0010x}} {1x0xx \ {1101x, 10001, 10010}, x1xx1 \ {01x11, 01xx1, 11101}} { 1x00xxx10x \ { 1x001xx100, 1x000xx101, 1x00xx010x, 1x00xx0101, 1x00x0010x, 10001xx10x}, x1x01xx101 \ { x1x01x0101, x1x01x0101, x1x0100101, 01x01xx101, 11101xx101}} {1x11x \ {10111, 11111, 1x110}} {1x011 \ {10011, 11011}, 1xxxx \ {10xx0, 101x0, 10011}} { 1x0111x111 \ { 1x01110111, 1x01111111, 100111x111, 110111x111}, 1xx1x1x11x \ { 1xx111x110, 1xx101x111, 1xx1x10111, 1xx1x11111, 1xx1x1x110, 10x101x11x, 101101x11x, 100111x11x}} {01xx0 \ {011x0, 01x00, 01100}, x00x1 \ {00001, 10011}} {0x10x \ {0010x, 0x100, 00100}, 1000x \ {10000, 10001, 10001}} { 0x10001x00 \ { 0x10001100, 0x10001x00, 0x10001100, 0010001x00, 0x10001x00, 0010001x00}, 1000001x00 \ { 1000001100, 1000001x00, 1000001100, 1000001x00}, 0x101x0001 \ { 0x10100001, 00101x0001}, 10001x0001 \ { 1000100001, 10001x0001, 10001x0001}} {00x0x \ {00101, 00x00, 0000x}, 10x01 \ {10101, 10001}} {1xx01 \ {11101, 1x001}} { 1xx0100x01 \ { 1xx0100101, 1xx0100001, 1110100x01, 1x00100x01}, 1xx0110x01 \ { 1xx0110101, 1xx0110001, 1110110x01, 1x00110x01}} {} {xx00x \ {xx001, x000x, 1000x}} {} {111x1 \ {11111}, 1x010 \ {11010, 10010}} {x1x00 \ {01000, 11100, x1000}, 100xx \ {1001x, 10001, 10001}} { 100x1111x1 \ { 1001111101, 1000111111, 100x111111, 10011111x1, 10001111x1, 10001111x1}, 100101x010 \ { 1001011010, 1001010010, 100101x010}} {111xx \ {1110x, 11110, 111x1}, 0xx11 \ {00111, 01011, 00011}, xx00x \ {0x001, x0001, 0100x}} {x10xx \ {0101x, 1100x}} { x10xx111xx \ { x10x1111x0, x10x0111x1, x101x1110x, x100x1111x, x10xx1110x, x10xx11110, x10xx111x1, 0101x111xx, 1100x111xx}, x10110xx11 \ { x101100111, x101101011, x101100011, 010110xx11}, x100xxx00x \ { x1001xx000, x1000xx001, x100x0x001, x100xx0001, x100x0100x, 1100xxx00x}} {xxx10 \ {10x10, 0xx10, 00010}} {x1101 \ {01101, 11101}} {} { 11000110000000000001} { 00000000000100011011} { 00000000000100011011} { 11000110000000000001} { 00000000000100011011} { 11000000000001000110} empty { } false full { xxxxxxxxxxxxxxxxxxxxxxxxxxxxxx} true { xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx \ { xxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxx, xxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxx, xxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxx, xxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxx, xxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxx, xxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxx, xxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxx, xxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxx, xxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxx, xxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxx, xxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxx, xxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxx}} { } { } project { xxxxxxxxxxxxxxxxxx} { } { 000000111000000110000000000001, 000000100000010000000000001000, 000000000100010000000000100000} { 000000111000000110, 000000100000010000, 000000000100010000} t1 before:{ 000000000100010000000000100000} t1 after:{ 000000000100010000000000100000, 000000111000000110000000000001, 000000100000010000000000001000} delta:{ xxxxxxxxxxxxxxxxxxxxxxxxxxxxxx} { 001001001000001001, 010001001000001001} { 001001001000001001} filter: (= (:var 0) (:var 1)) {xxx \ {x01, x10}} filter: (or (= (:var 0) (:var 1)) (= (:var 0) (:var 2))) {xxx \ {001, 110}} filter: (or (= (:var 0) (:var 1)) (= (:var 0) (:var 2))) {xxx \ {001, 110}} filter interpreted filter: true { xxxxxxxxxxxxxxxxxx} filter: false { } filter: (= (:var 0) (:var 2)) { xxxxxxxxxxxxxxxxxx \ { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx}} filter: (not (= (:var 0) (:var 2))) { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx} filter: (= (:var 0) #b010) { xxxxxxxxxxxxxxx010} filter: (= ((_ extract 2 1) (:var 0)) #b11) { xxxxxxxxxxxxxxx11x} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xxxxxxxxxxxx, xx1xx0xxxxxxxxxxxx, x0xx1xxxxxxxxxxxxx, x1xx0xxxxxxxxxxxxx, 0xx1xxxxxxxxxxxxxx, 1xx0xxxxxxxxxxxxxx}, 1xx0xxxxxxxxxxx11x \ { 1x00x1xxxxxxxxx11x, 1x10x0xxxxxxxxx11x, 10x01xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 0xx1xxxxxxxxxxx11x \ { 0x01x1xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 01x10xxxxxxxxxx11x}, x1xx0xxxxxxxxxx11x \ { x10x01xxxxxxxxx11x, x11x00xxxxxxxxx11x, 01x10xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 11x00xxxxxxxxxx11x \ { 110001xxxxxxxxx11x, 111000xxxxxxxxx11x}, 01x10xxxxxxxxxx11x \ { 010101xxxxxxxxx11x, 011100xxxxxxxxx11x}, x0xx1xxxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x01x10xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 10x01xxxxxxxxxx11x}, 10x01xxxxxxxxxx11x \ { 100011xxxxxxxxx11x, 101010xxxxxxxxx11x}, 00x11xxxxxxxxxx11x \ { 000111xxxxxxxxx11x, 001110xxxxxxxxx11x}, xx1xx0xxxxxxxxx11x \ { x01x10xxxxxxxxx11x, x11x00xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 1x10x0xxxxxxxxx11x}, 1x10x0xxxxxxxxx11x \ { 101010xxxxxxxxx11x, 111000xxxxxxxxx11x}, 0x11x0xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 011100xxxxxxxxx11x}, x11x00xxxxxxxxx11x \ { 011100xxxxxxxxx11x, 111000xxxxxxxxx11x}, 111000xxxxxxxxx11x, 011100xxxxxxxxx11x, x01x10xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 101010xxxxxxxxx11x}, 101010xxxxxxxxx11x, 001110xxxxxxxxx11x, xx0xx1xxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x10x01xxxxxxxxx11x, 0x01x1xxxxxxxxx11x, 1x00x1xxxxxxxxx11x}, 1x00x1xxxxxxxxx11x \ { 100011xxxxxxxxx11x, 110001xxxxxxxxx11x}, 0x01x1xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 010101xxxxxxxxx11x}, x10x01xxxxxxxxx11x \ { 010101xxxxxxxxx11x, 110001xxxxxxxxx11x}, 110001xxxxxxxxx11x, 010101xxxxxxxxx11x, x00x11xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 100011xxxxxxxxx11x}, 100011xxxxxxxxx11x, 000111xxxxxxxxx11x} filter: (= ((_ extract 2 1) (:var 3)) ((_ extract 1 0) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0x1xxxxxxxxxxxxx, xx1x0xxxxxxxxxxxxx, x0x1xxxxxxxxxxxxxx, x1x0xxxxxxxxxxxxxx}} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= ((_ extract 2 1) (:var 3)) ((_ extract 1 0) (:var 4)))) { xxxxxxxxxxxxxxxxxx \ { xx0x1xxxxxxxxxxxxx, xx1x0xxxxxxxxxxxxx, x0x1xxxxxxxxxxxxxx, x1x0xxxxxxxxxxxxxx}, x1x0xxxxxxxxxxx11x \ { x1001xxxxxxxxxx11x, x1100xxxxxxxxxx11x}, x0x1xxxxxxxxxxx11x \ { x0011xxxxxxxxxx11x, x0110xxxxxxxxxx11x}, xx1x0xxxxxxxxxx11x \ { x0110xxxxxxxxxx11x, x1100xxxxxxxxxx11x}, x1100xxxxxxxxxx11x, x0110xxxxxxxxxx11x, xx0x1xxxxxxxxxx11x \ { x0011xxxxxxxxxx11x, x1001xxxxxxxxxx11x}, x1001xxxxxxxxxx11x, x0011xxxxxxxxxx11x} filter: (or (= (:var 0) (:var 2)) (= (:var 0) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xxxxx0xxxxxxxx1, x0xxxxxx0xxxxxxx11, x1xxxxxx0xxxxxxx01, 0xxxxxxx0xxxxxx1x1, 1xxxxxxx0xxxxxx0x1, xx1xxxxx1xxxxxxxx0, x0xxxxxx1xxxxxxx10, x1xxxxxx1xxxxxxx00, 0xxxxxxx1xxxxxx1x0, 1xxxxxxx1xxxxxx0x0, xx0xxxx0xxxxxxxx11, xx1xxxx0xxxxxxxx10, x0xxxxx0xxxxxxxx1x, 0xxxxxx0xxxxxxx11x, 1xxxxxx0xxxxxxx01x, xx0xxxx1xxxxxxxx01, xx1xxxx1xxxxxxxx00, x1xxxxx1xxxxxxxx0x, 0xxxxxx1xxxxxxx10x, 1xxxxxx1xxxxxxx00x, xx0xxx0xxxxxxxx1x1, xx1xxx0xxxxxxxx1x0, x0xxxx0xxxxxxxx11x, x1xxxx0xxxxxxxx10x, 0xxxxx0xxxxxxxx1xx, xx0xxx1xxxxxxxx0x1, xx1xxx1xxxxxxxx0x0, x0xxxx1xxxxxxxx01x, x1xxxx1xxxxxxxx00x, 1xxxxx1xxxxxxxx0xx}} filter: (or (= (:var 0) (:var 2)) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xx0xxxxxxxx1, xx1xx0xx0xxxxxxxx1, x0xx1xxx0xxxxxxxx1, x1xx0xxx0xxxxxxxx1, 0xx1xxxx0xxxxxxxx1, 1xx0xxxx0xxxxxxxx1, xx0xx1xx1xxxxxxxx0, xx1xx0xx1xxxxxxxx0, x0xx1xxx1xxxxxxxx0, x1xx0xxx1xxxxxxxx0, 0xx1xxxx1xxxxxxxx0, 1xx0xxxx1xxxxxxxx0, xx0xx1x0xxxxxxxx1x, xx1xx0x0xxxxxxxx1x, x0xx1xx0xxxxxxxx1x, x1xx0xx0xxxxxxxx1x, 0xx1xxx0xxxxxxxx1x, 1xx0xxx0xxxxxxxx1x, xx0xx1x1xxxxxxxx0x, xx1xx0x1xxxxxxxx0x, x0xx1xx1xxxxxxxx0x, x1xx0xx1xxxxxxxx0x, 0xx1xxx1xxxxxxxx0x, 1xx0xxx1xxxxxxxx0x, xx0xx10xxxxxxxx1xx, xx1xx00xxxxxxxx1xx, x0xx1x0xxxxxxxx1xx, x1xx0x0xxxxxxxx1xx, 0xx1xx0xxxxxxxx1xx, 1xx0xx0xxxxxxxx1xx, xx0xx11xxxxxxxx0xx, xx1xx01xxxxxxxx0xx, x0xx1x1xxxxxxxx0xx, x1xx0x1xxxxxxxx0xx, 0xx1xx1xxxxxxxx0xx, 1xx0xx1xxxxxxxx0xx}} filter: (or (= ((_ extract 2 1) (:var 0)) ((_ extract 1 0) (:var 2))) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xx0xxxxxxx1x, xx1xx0xx0xxxxxxx1x, x0xx1xxx0xxxxxxx1x, x1xx0xxx0xxxxxxx1x, 0xx1xxxx0xxxxxxx1x, 1xx0xxxx0xxxxxxx1x, xx0xx1xx1xxxxxxx0x, xx1xx0xx1xxxxxxx0x, x0xx1xxx1xxxxxxx0x, x1xx0xxx1xxxxxxx0x, 0xx1xxxx1xxxxxxx0x, 1xx0xxxx1xxxxxxx0x, xx0xx1x0xxxxxxx1xx, xx1xx0x0xxxxxxx1xx, x0xx1xx0xxxxxxx1xx, x1xx0xx0xxxxxxx1xx, 0xx1xxx0xxxxxxx1xx, 1xx0xxx0xxxxxxx1xx, xx0xx1x1xxxxxxx0xx, xx1xx0x1xxxxxxx0xx, x0xx1xx1xxxxxxx0xx, x1xx0xx1xxxxxxx0xx, 0xx1xxx1xxxxxxx0xx, 1xx0xxx1xxxxxxx0xx}} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xxxxxxxxxxxx, xx1xx0xxxxxxxxxxxx, x0xx1xxxxxxxxxxxxx, x1xx0xxxxxxxxxxxxx, 0xx1xxxxxxxxxxxxxx, 1xx0xxxxxxxxxxxxxx}, 1xx0xxxxxxxxxxx11x \ { 1x00x1xxxxxxxxx11x, 1x10x0xxxxxxxxx11x, 10x01xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 0xx1xxxxxxxxxxx11x \ { 0x01x1xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 01x10xxxxxxxxxx11x}, x1xx0xxxxxxxxxx11x \ { x10x01xxxxxxxxx11x, x11x00xxxxxxxxx11x, 01x10xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 11x00xxxxxxxxxx11x \ { 110001xxxxxxxxx11x, 111000xxxxxxxxx11x}, 01x10xxxxxxxxxx11x \ { 010101xxxxxxxxx11x, 011100xxxxxxxxx11x}, x0xx1xxxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x01x10xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 10x01xxxxxxxxxx11x}, 10x01xxxxxxxxxx11x \ { 100011xxxxxxxxx11x, 101010xxxxxxxxx11x}, 00x11xxxxxxxxxx11x \ { 000111xxxxxxxxx11x, 001110xxxxxxxxx11x}, xx1xx0xxxxxxxxx11x \ { x01x10xxxxxxxxx11x, x11x00xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 1x10x0xxxxxxxxx11x}, 1x10x0xxxxxxxxx11x \ { 101010xxxxxxxxx11x, 111000xxxxxxxxx11x}, 0x11x0xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 011100xxxxxxxxx11x}, x11x00xxxxxxxxx11x \ { 011100xxxxxxxxx11x, 111000xxxxxxxxx11x}, 111000xxxxxxxxx11x, 011100xxxxxxxxx11x, x01x10xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 101010xxxxxxxxx11x}, 101010xxxxxxxxx11x, 001110xxxxxxxxx11x, xx0xx1xxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x10x01xxxxxxxxx11x, 0x01x1xxxxxxxxx11x, 1x00x1xxxxxxxxx11x}, 1x00x1xxxxxxxxx11x \ { 100011xxxxxxxxx11x, 110001xxxxxxxxx11x}, 0x01x1xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 010101xxxxxxxxx11x}, x10x01xxxxxxxxx11x \ { 010101xxxxxxxxx11x, 110001xxxxxxxxx11x}, 110001xxxxxxxxx11x, 010101xxxxxxxxx11x, x00x11xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 100011xxxxxxxxx11x}, 100011xxxxxxxxx11x, 000111xxxxxxxxx11x} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) #b011)) { xxxxxxxxxxxxxxx11x, xxx011xxxxxxxxxxxx} filter: (or (= (:var 0) #b101) (= (:var 3) #b101)) { xxxxxxxxxxxxxxx101, xxx101xxxxxxxxxxxx} filter: (or (= (:var 0) #b111) (= (:var 3) #b111)) { xxxxxxxxxxxxxxx111, xxx111xxxxxxxxxxxx} filter: (not (or (= (:var 0) (:var 2)) (= (:var 3) (:var 4)))) { xx0xx1xx0xxxxxxxx1, xx0xx1xx1xxxxxxxx0, xx0xx1x0xxxxxxxx1x, xx0xx1x1xxxxxxxx0x, xx0xx10xxxxxxxx1xx, xx0xx11xxxxxxxx0xx, xx1xx0xx0xxxxxxxx1, xx1xx0xx1xxxxxxxx0, xx1xx0x0xxxxxxxx1x, xx1xx0x1xxxxxxxx0x, xx1xx00xxxxxxxx1xx, xx1xx01xxxxxxxx0xx, x0xx1xxx0xxxxxxxx1, x0xx1xxx1xxxxxxxx0, x0xx1xx0xxxxxxxx1x, x0xx1xx1xxxxxxxx0x, x0xx1x0xxxxxxxx1xx, x0xx1x1xxxxxxxx0xx, x1xx0xxx0xxxxxxxx1, x1xx0xxx1xxxxxxxx0, x1xx0xx0xxxxxxxx1x, x1xx0xx1xxxxxxxx0x, x1xx0x0xxxxxxxx1xx, x1xx0x1xxxxxxxx0xx, 0xx1xxxx0xxxxxxxx1, 0xx1xxxx1xxxxxxxx0, 0xx1xxx0xxxxxxxx1x, 0xx1xxx1xxxxxxxx0x, 0xx1xx0xxxxxxxx1xx, 0xx1xx1xxxxxxxx0xx, 1xx0xxxx0xxxxxxxx1, 1xx0xxxx1xxxxxxxx0, 1xx0xxx0xxxxxxxx1x, 1xx0xxx1xxxxxxxx0x, 1xx0xx0xxxxxxxx1xx, 1xx0xx1xxxxxxxx0xx} filter: (= (:var 0) (:var 2)) { xxxxxxxxxxxxxxxxxx \ { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx}} filter: (not (= (:var 0) (:var 2))) { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx} PASS (test udoc_relation :time 2.65 :before-memory 4.64 :after-memory 4.66) {xxx \ {0x1}} {xxx \ {0x0, 1x1}} {0xxx \ {00xx, 0101, 0111}} {} {} {0x01 \ {0001, 0101, 0101}} {} {} {x1xx \ {01xx, 0101, x100}, x1x1 \ {x111, 1101}} {} {} {} {} {} {} {x1xx \ {x10x, 11x1, 0100}} {} {1xx1 \ {1001, 1x11, 1011}} {1xx0 \ {1000, 1x00, 1100}, 1xxx \ {11x1, 1x11, 1111}} {x1x1 \ {1101, 0111, x111, 11x1}} {xxx0 \ {x110, 0010, x000}} {} {} {xx00 \ {0000, x000}, 0x00 \ {0000, 0100, 0100}} {10xx \ {1001, 1000, 1010}} {0000 \ {0000}} {1x1x \ {1x10, 1x11}} {x11x \ {0111, x111}} {1x1x \ {1110, 1011, 1x10, 1x11, 111x}} {} {1x0x \ {1x01, 1000, 1000}} {} {0xx0 \ {0000, 00x0, 0100}} {} {} {x1x1 \ {0101, 11x1, 1111}, 0x11 \ {0011}} {10x0 \ {1000, 1010}} {} {xxxx \ {011x, 1x01}, 0xx1 \ {0x01, 00x1, 0011}, 1xxx \ {11xx, 11x0, 100x}} {x10x \ {110x, 0101, 0100}, 1x01 \ {1101}} {0x0x \ {0100, 0001, 010x, 000x}, 0101} {0xx0 \ {0000, 0110, 0x00}} {} {} {10xx \ {10x1, 10x0, 1000}} {1xx0 \ {1x10, 11x0, 1010}, xxx1 \ {x1x1, 0011, x101}} {x0x0 \ {x0x0}, x1x1 \ {x1x1}} {x1x1 \ {1101, x101}, 0x0x \ {0001, 0101, 010x}} {} {} {01xx \ {011x, 010x, 0110}, x000 \ {1000, 0000}} {xx1x \ {xx10, 101x, 101x}, 0x10 \ {0010, 0110, 0110}} {1x1x \ {1x1x}, 1010 \ {1010}} {x0x0 \ {x010, x000, 10x0}} {0xx1 \ {0101, 0111, 0011}, 0x00 \ {0000}} {0000 \ {0000}} {x1x0 \ {1100, 1110, 0110}} {100x \ {1001, 1000}} {0000 \ {0000}} {1xx1 \ {1111, 11x1, 1101}, x0xx \ {x001, x000, x0x0}} {0x00 \ {0000}, xx1x \ {001x, 1x11, 1x11}} {1111, 0000 \ {0000}, 1x1x \ {1110, 1011, 1x10}} {1x1x \ {1111, 101x, 1010}} {xx1x \ {111x, 001x, xx10}} {1x1x \ {1110, 1011, 101x, 1x11}} {} {0xx0 \ {0x00, 0110, 0100}} {} {0x1x \ {0111, 001x, 0x11}} {00x0 \ {0010, 0000}} {1010 \ {1010}} {100x \ {1000}, xx10 \ {0110, x010, 0x10}, xx0x \ {1101, 1100, 100x}} {0x0x \ {000x, 0001, 0100}} {0x0x \ {0100, 0001, 000x}} {x0xx \ {x001, 10x1, x01x}} {x0xx \ {1011, 0000}, 110x \ {1101, 1100, 1100}} {xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xx01, xx1x}, 0x0x \ {0100, 0001, 0x01, 010x, 000x, 000x}} {x001 \ {1001, 0001}} {xx0x \ {1100, 0x0x, x10x}, 000x \ {0001}} {0101 \ {0101}} {x001 \ {1001, 0001, 0001}} {10xx \ {1011, 1001, 10x0}} {0101 \ {0101}} {} {0x00 \ {0000, 0100}} {} {x1xx \ {01x1, 010x, x1x0}} {011x \ {0111, 0110}, x00x \ {x001, 1000}, xxxx \ {0000, 00xx, 0111}} {1x1x \ {1110, 1011, 1x10, 111x, 101x}, 0x0x \ {0100, 0001, 0x00, 010x}, xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xxx0}} {01xx \ {01x1, 0110}} {} {} {x111 \ {0111, 1111}, 101x \ {1010, 1011}} {} {} {x101 \ {1101}} {x1xx \ {1101, 01xx, x101}, 1x0x \ {1x01, 1x00}} {0101 \ {0101}} {001x \ {0010}, 1x1x \ {1111, 1010, 1x10}} {0x0x \ {0000, 0x01, 000x}, 10xx \ {100x, 10x0, 1011}} {1x1x \ {1110, 1011, 1x10, 101x, 111x}} {} {1x00 \ {1000}} {} {xx11 \ {0011, 1111, 1111}} {xxx1 \ {1101, 1111, 0111}} {1111} {00xx \ {00x0, 00x1, 0001}} {10x0 \ {1000}, x10x \ {0100, x101, x100}} {x0x0 \ {x0x0}, 0x0x \ { 0100, 0001, 0x00, 0x01, 0x01, 010x, 000x}} {xx01 \ {1001, 0x01, 0101}} {011x \ {0111, 0110}} {} {} {x1xx \ {x10x, 1101, 0111}, xx11 \ {0111, 1111, 1x11}} {} {xx00 \ {0000, 0x00, 0100}} {x11x \ {0111, 111x, x111}, x01x \ {x011, x010, x010}} {} {11x1 \ {1101}} {1x1x \ {1011, 1110, 1x10}} {1111} {0x00 \ {0000, 0100}} {0xxx \ {0x00, 0101, 0001}} {0000 \ {0000}} {x0x0 \ {10x0, 1000}, 0x0x \ {0x00, 0000, 010x}} {xxx1 \ {xx11, xx01, x0x1}, 0xx0 \ {0100, 01x0}} {x0x0 \ {1000, 0010}, 0101 \ {0101}, 0000 \ {0000}} {x1x0 \ {01x0, 0110}} {x010 \ {1010, 0010}} {1010 \ {1010}} {x1x0 \ {1110, 1100, x100}} {1xx1 \ {1011, 1111}} {} {0xx0 \ {0000, 0x00, 01x0}} {x0x1 \ {x001, 1001, 0011}, 01xx \ {0111, 0110, 010x}, 0xx1 \ {0101, 0111, 0111}} {x0x0 \ {1000, 0010, x000, 10x0, 00x0, x000}} {1x0x \ {1x00, 1100}, x0xx \ {x00x, 1000, x001}, 100x \ {1001, 1000}} {xx0x \ {xx01, 1100, 010x}} {0x0x \ {0100, 0001, 0x00, 010x}} {1x1x \ {111x, 1010}, x001 \ {1001, 0001}} {xx0x \ {0000, x000, 1101}} {0101 \ {0101}} {xx11 \ {0111, 0011, 0011}, 00x0 \ {0010, 0000}} {0xxx \ {0x1x, 011x, 011x}} {1111 \ {1111}, x0x0 \ {1000, 0010, x010, x000, 10x0}} {} {11x1 \ {1101, 1111}, xxx1 \ {0x11, xx11, 1x01}} {} {0xx1 \ {0x01, 00x1, 0111}, xx01 \ {1001, x001, x101}, 1xx0 \ {1x10, 1000, 1100}} {01xx \ {011x, 01x0, 01x1}} {x1x1 \ {x1x1}, 0101 \ {0101}, x0x0 \ {x0x0}} {x0xx \ {0000, 10x1, 10x1}} {x010 \ {1010, 0010}} {1010 \ {1010}} {xx00 \ {1000, 0x00, x000}, 00x0 \ {0000, 0010}} {x100 \ {0100, 1100, 1100}, xx00 \ {x100, x000, 1000}} {0000 \ {0000}} {x010 \ {1010, 0010, 0010}, 000x \ {0001}} {10xx \ {10x1, 101x}} {1010 \ {1010}, 0x0x \ {0100, 0001, 0x01, 010x}} {x1xx \ {11x1, x10x, 1100}, 0x11 \ {0111, 0011}} {} {} {0x10 \ {0110}} {} {} {} {xx11 \ {1x11, x011}, 111x \ {1110}} {} {xx1x \ {0x10, x011, 111x}} {0xx0 \ {0100, 01x0, 00x0}, 10xx \ {10x1, 1010}} {1010 \ {1010}, 1x1x \ {1110, 1011, 111x, 101x}} {} {011x \ {0111, 0110}, 01x1 \ {0111, 0101}} {} {x1x0 \ {1100, 01x0, 1110}, 1x0x \ {1000, 110x}} {10xx \ {1000, 100x, 1011}, 0xx0 \ {0100, 0x10, 0x00}, 00xx \ {001x, 00x1, 0011}} {x0x0 \ {1000, 0010, 00x0, 00x0, x000, x010}, x0x0 \ {1000, 0010, 10x0, x000, x010}, 0000 \ {0000}, 0x0x \ {0100, 0001, 010x, 0x00}} {11x0 \ {1110, 1100, 1100}} {1x1x \ {111x, 1x11, 1111}, x110 \ {0110, 1110, 1110}, 00xx \ {00x0, 000x, 0011}} {1010 \ {1010}, x0x0 \ {x0x0}} {0x11 \ {0111, 0011, 0011}, x1xx \ {110x, 111x, 0100}} {xxxx \ {110x, xx10, 11x0}} {1111 \ {1111}, xxxx \ {x1x0, x0x1, 1x0x, 0x1x, 10xx, xx00}} {} {xx0x \ {xx00, 0000, x001}, 0x01 \ {0101}, xx0x \ {xx01, 1001, x100}} {} {0xxx \ {0010, 0x00, 0xx0}} {xx00 \ {x100, 1x00, 1000}} {0000 \ {0000}} {xxx0 \ {1100, 0010, 1x10}, xx01 \ {1001, 0101}} {x010 \ {0010, 1010}} {1010 \ {1010}} {x111 \ {1111, 0111}, x00x \ {1001, 0001, 0001}} {010x \ {0100}} {0x0x \ {0100, 0001, 000x, 0x01, 0x01}} {xx11 \ {0011, x111, 0x11}, 1x00 \ {1000, 1100}} {1xx1 \ {1x01, 1101, 1101}, 010x \ {0101, 0100}} {1111, 0000 \ {0000}} {00xx \ {00x1, 001x, 0001}} {x11x \ {0111, 0110, 011x}} {1x1x \ {1x1x}} {0xxx \ {010x, 0x01}} {1x11 \ {1111, 1011, 1011}} {1111 \ {1111}} {x1x0 \ {0110, 0100}, x01x \ {x010, 001x, 0010}} {} {} {1xxx \ {1101, 10x0, 1x11}, x1x1 \ {01x1, 1111}} {00x1 \ {0001, 0011}} {x1x1 \ {1101, 0111, x111, 01x1, 11x1}} {0x01 \ {0001}, xxx1 \ {1x01, 0001, 10x1}} {1x1x \ {1x11, 1011, 1011}, 00xx \ {000x, 001x, 00x1}} {0101 \ {0101}, 1111 \ {1111}, x1x1 \ {x1x1}} {1xxx \ {1xx0, 111x, 1x1x}, x0x1 \ {0011, 10x1}, x01x \ {101x, 001x}} {10x0 \ {1010, 1000}, 11x1 \ {1111, 1101, 1101}} {x0x0 \ {x0x0}, x1x1 \ {1101, 0111, x111, 11x1, 01x1, 01x1}, 1010 \ {1010}, 1111 \ {1111}} {x01x \ {1010, x010, 0011}} {1x11 \ {1111, 1011}} {1111 \ {1111}} {} {010x \ {0100, 0101}, xx00 \ {x000, 0100}} {} {xxx0 \ {x100, x010, 1x00}, xxx1 \ {0001, 1011, 1x01}} {x010 \ {1010, 0010}, xx0x \ {x101, x10x, 1000}} {1010 \ {1010}, 0000, 0101} {x0xx \ {1000, 1010, 00x0}, xx00 \ {0100, 1x00, 0x00}} {01xx \ {0101, 01x0, 0100}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, 01xx, x0xx, 00xx, xx00, xx10}, 0000 \ {0000}} {x0x1 \ {0001, 1011}, 010x \ {0101}} {x110 \ {1110, 0110, 0110}, 0x00 \ {0000}, 10xx \ {1001, 101x, 1010}} {x1x1 \ {1101, 0111, 01x1, 11x1}, 0000, 0x0x \ {0100, 0001, 0x01, 010x}} {00xx \ {00x0, 000x, 0001}} {101x \ {1011, 1010, 1010}} {1x1x \ {1110, 1011, 1x10, 111x, 101x, 101x}} {01xx \ {0100, 0101}, 10xx \ {10x1, 1001, 1011}} {xx01 \ {1001, x001, 0001}, 0xx1 \ {0111, 0001, 0101}} {0101 \ {0101}, x1x1 \ {1101, 0111, x101, 01x1}} {11x1 \ {1111, 1101, 1101}, x0x1 \ {10x1, 00x1}} {xxxx \ {0x11, 0x1x, 00x0}, x111 \ {0111, 1111}, x10x \ {0101, 110x, 1101}} {x1x1 \ {1101, 0111, x111, x101, x101}, 1111 \ {1111}, 0101 \ {0101}} {000x \ {0001, 0000, 0000}, xx10 \ {0110, x010, 1x10}} {01xx \ {01x1, 011x, 0101}} {0x0x \ { 0100, 0001, 0x01, 0x00, 0x00, 010x, 010x}, 1010 \ {1010}} {10xx \ {101x, 10x0, 10x0}, 1x0x \ {1x01, 1000, 110x}} {x011 \ {0011, 1011}, xxx1 \ {1011, 0x01, 1x11}} {1111 \ {1111}, x1x1 \ {1101, 0111, x111}, 0101 \ {0101}} {xx01 \ {x001, 0001, 0001}, xxxx \ {x10x, 1011, 10x1}, xx00 \ {0x00, 1x00, x000}} {0xx0 \ {0x00, 0110, 0000}, x1x0 \ {x110, 0100, x100}} {x0x0 \ {1000, 0010, 00x0}, 0000 \ {0000}} {0xx0 \ {01x0, 0010, 0110}, 111x \ {1111, 1110, 1110}} {xx1x \ {001x, 0010, 011x}} {1010 \ {1010}, 1x1x \ {1110, 1011, 1x11, 1x10, 1x10}} {11xx \ {111x, 110x}} {x10x \ {x100, 1101, 0101}} {0x0x \ {0x0x}} {x10x \ {010x, 1100}} {} {} {10x1 \ {1001, 1011}, xx0x \ {0100, 000x, 1x0x}} {x00x \ {1001, 000x, 0000}} {0101 \ {0101}, 0x0x \ {0100, 0001, 010x, 0x00}} {x1x1 \ {1101, x101}} {001x \ {0011, 0010}} {1111 \ {1111}} {xx00 \ {0100, 1000, x000}} {0x10 \ {0010, 0110}, xx1x \ {0x10, x111, x110}} {} {x1x0 \ {0100, x100, 0110}, x0x1 \ {1011, 10x1, x011}} {0x1x \ {011x, 001x, 0x10}} {1010 \ {1010}, 1111 \ {1111}} {000x \ {0001, 0000, 0000}, 0x1x \ {001x, 0x10, 011x}} {01xx \ {01x1, 010x, 0110}} {0x0x \ {0x0x}, 1x1x \ {1x1x}} {0x0x \ {0100, 010x, 000x}} {x101 \ {0101}} {0101 \ {0101}} {x10x \ {x100, 0101, 1100}, 1x0x \ {1x01, 1100}, xx1x \ {111x, 1011, 0010}} {} {} {1xxx \ {101x, 10x1, 1110}} {1x00 \ {1100, 1000}} {0000 \ {0000}} {01xx \ {011x, 01x1}, x11x \ {0110, x110, 0111}} {x1xx \ {11xx, 01x1, 1101}, 01xx \ {01x0, 0100, 010x}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx1x, xxx1, x1xx, 01xx}, xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx1x, xxx1, x0xx, 00xx, 0xxx}, 1x1x \ {1110, 1011, 1x10, 111x}, 1x1x \ {1110, 1011, 1x10, 101x}} {011x \ {0111, 0110}} {x110 \ {1110, 0110}, xx00 \ {0x00, 1x00, x100}} {1010 \ {1010}} {10xx \ {1001, 1011, 101x}} {xxxx \ {x10x, 1000, 00xx}, 0x0x \ {0100, 0x01, 0000}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx01, xx11, xx1x, 00xx}, 0x0x \ {0100, 0001, 0x01, 010x, 000x}} {x10x \ {010x, x101, 0101}, 0x0x \ {000x, 0100, 0x01}, x0x0 \ {10x0}} {11xx \ {11x0}} {0x0x \ {0100, 0001, 0x01, 000x}, x0x0 \ {x0x0}} {} {00xx \ {000x, 00x1, 0011}, 0x1x \ {0110, 001x, 011x}} {} {xx01 \ {1x01, 1101, 1101}} {x11x \ {0111, 1111, 011x}, xx00 \ {x000, 1000, x100}, 0x10 \ {0110, 0010, 0010}} {} {0x0x \ {0100, 000x, 010x}, 1x0x \ {1101, 1x01, 1001}} {} {} {} {x001 \ {1001, 0001}} {} {xxx1 \ {0xx1, 0x11, x1x1}, x00x \ {1001, 000x, 000x}} {xx01 \ {0101, 1001, x101}, x01x \ {0010, 1010, 001x}} {0101, 1111} {xx01 \ {0x01, 1101}} {x11x \ {x111, 0110, x110}} {} {001x \ {0010}, 0xxx \ {011x, 0x00}} {} {} {x01x \ {x010, 101x, 101x}, 100x \ {1001, 1000, 1000}} {} {} {1x0x \ {1101, 110x, 110x}, x100 \ {0100}} {111x \ {1111, 1110}} {} {x1xx \ {01x0, 11x1, x11x}, 100x \ {1001, 1000}, x011 \ {1011, 0011}} {x1x0 \ {1100, 0100}} {x0x0 \ {1000, 0010, x010, 00x0}, 0000 \ {0000}} {x1x1 \ {1111, 0111, 01x1}, xxxx \ {0010, 00x1, 1010}} {} {} {xx00 \ {1000, 0000, 0100}} {} {} {11xx \ {1101, 11x1, 11x0}} {10x1 \ {1011, 1001, 1001}} {x1x1 \ {x1x1}} {01xx \ {01x0, 0100, 011x}} {1xx0 \ {1010, 1100, 11x0}, 01xx \ {0110, 010x, 0100}} {x0x0 \ {x0x0}, xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xxx0, xx00, xx1x, 10xx, 0xxx, 00xx}} {00x0 \ {0010, 0000, 0000}, 10x0 \ {1010}} {x110 \ {1110}, x010 \ {1010, 0010}} {1010 \ {1010}} {} {xxxx \ {000x, 010x, x11x}} {} {} {xxx0 \ {x010, x100, x0x0}} {} {x100 \ {0100}, x0xx \ {x000, 00x0}} {xxx0 \ {0110, x100, x0x0}} {0000 \ {0000}, x0x0 \ {1000, 0010, x000, 00x0}} {} {x0xx \ {1001, 0001, 0011}, x0xx \ {x000, 0000, x001}} {} {0xx0 \ {00x0, 0000, 01x0}, 1x01 \ {1001, 1101, 1101}} {1xxx \ {101x, 10x1, 1100}, 000x \ {0001, 0000, 0000}, 1x0x \ {1x01, 100x, 1001}} {x0x0 \ {x0x0}, 0000 \ {0000}, 0101 \ {0101}} {1xxx \ {1xx0, 10x0, 1001}, 0x10 \ {0110, 0010}} {x00x \ {1001, x001}} {0x0x \ {0100, 0001, 0x00, 010x}} {001x \ {0011, 0010, 0010}} {xxx0 \ {x000, 1010, 0000}, x0xx \ {000x, 00x0, 10x1}} {1010 \ {1010}, 1x1x \ {1110, 1011, 1x11, 1x10, 1x10}} {0x00 \ {0000, 0100}} {11x0 \ {1110, 1100, 1100}, 11x0 \ {1100, 1110, 1110}, 101x \ {1010, 1011, 1011}} {0000 \ {0000}} {} {} {} {00xx \ {000x, 001x, 00x1}} {} {} {x011 \ {1011, 0011}, x01x \ {0010, 001x, x010}} {} {} {010x \ {0101, 0100, 0100}, xxx0 \ {0110, 1xx0, 1100}, x00x \ {000x, 1001}} {01xx \ {0110, 0111, 0100}} {x0x0 \ {1000, 0010, 10x0, 00x0}, 0x0x \ {0100, 0001, 000x, 0x01}} {x0x0 \ {1000, 0010, x000}} {100x \ {1001}, 1xx0 \ {1000, 11x0, 1x10}} {0000 \ {0000}, x0x0 \ {1000, 0010, x000, 10x0, 00x0}} {1x10 \ {1010, 1110}} {} {} {x1xx \ {x10x, 11x1, 11x0}, 00x0 \ {0000}} {x1xx \ {0100, 0101, 111x}, 0xxx \ {0001, 0110, 0010}} {xxxx \ {x1x0, x0x1, 1x0x, 0x1x, xx0x}, x0x0 \ {1000, 0010, x000}} {x0x1 \ {x001, 0001, 0011}} {101x \ {1010, 1011}} {1111 \ {1111}} {} {} {} {x1x0 \ {0110, 0100}} {x1x1 \ {0101, 1101, 1111}} {} {} {01xx \ {01x1, 011x, 0110}} {} {0xxx \ {0011, 0xx1, 0111}, xx11 \ {0011, x011}, x1xx \ {111x, x10x}} {000x \ {0000, 0001, 0001}, 0x10 \ {0110, 0010, 0010}} {0x0x \ {0100, 0001, 0x01, 000x, 010x, 010x}, 1010 \ {1010}} {x1x0 \ {0110, x100, 01x0}} {1x0x \ {1x01, 1001, 1x00}, x00x \ {0000, 0001, 100x}} {0000 \ {0000}} {} {x0x1 \ {10x1, 00x1, 00x1}} {} {} {x0x1 \ {0001, x011, 1011}, xxx1 \ {x011, 1xx1, 10x1}} {} {xx11 \ {1111, 1x11}} {11x1 \ {1111, 1101}} {1111 \ {1111}} {0xx1 \ {00x1, 01x1, 0x01}} {x1x0 \ {1110, 01x0, 1100}, xx0x \ {100x, 1000, 1100}} {0101 \ {0101}} {xx0x \ {110x, 000x, x001}, x11x \ {111x, x111, 0110}} {01x0 \ {0100, 0110}} {0000 \ {0000}, 1010 \ {1010}} {10xx \ {1001, 1010, 100x}} {x001 \ {1001, 0001}} {0101 \ {0101}} {0x00 \ {0100}} {xx0x \ {0000, 1x0x, xx01}} {0000} {1x0x \ {1100, 110x, 1x01}, x00x \ {1001, 0001, 0001}} {1x1x \ {1110, 101x, 1010}, xx01 \ {x001, 1101, 0x01}} {0101 \ {0101}} {} {} {} {x110 \ {0110, 1110}} {xx00 \ {0000, x100, x000}, xx00 \ {0000, x100}} {} {} {xx10 \ {0110, x110, x110}} {} {xx01 \ {0001, 1001}, 0xxx \ {0101, 0110, 0x1x}} {x01x \ {0011, 1011, x011}} {1x1x \ {1x1x}} {xxx1 \ {01x1, x011, 1011}, 1xx1 \ {1101, 1111, 1011}, 11xx \ {110x, 1110, 11x1}} {0x1x \ {011x, 0x11}} {1111 \ {1111}, 1x1x \ {1110, 1011, 1x10, 1x11, 111x}} {xxxx \ {x101, 0010, 110x}, 111x \ {1111, 1110}} {x0x0 \ {1000, 0010, 10x0}, x0x1 \ {1001, 0011}} {x0x0 \ {1000, 0010, 10x0}, x1x1 \ {1101, 0111}, 1010 \ {1010}, 1111 \ {1111}} {} {11x0 \ {1110, 1100}} {} {10xx \ {1001, 1011, 100x}} {00x1 \ {0001}, 11x1 \ {1111, 1101}} {x1x1 \ {1101, 0111, x101, x111, x101, 01x1}} {} {0xx1 \ {0011, 0111}} {} {11xx \ {1101, 11x0, 1110}} {x1xx \ {01x0, x10x, 110x}} {xxxx \ { x1x0, x0x1, 1x0x, 0x1x, xx01, xxx0, xx10, 0xxx, 00xx}} {1xx1 \ {1101, 1111}} {} {} {x101 \ {0101, 1101}} {0xx1 \ {0x01, 0001, 0111}, xxxx \ {0111, 1xx1, 001x}, x10x \ {1100, 110x, 0101}} {0101 \ {0101}} {01xx \ {0101, 011x, 0100}, x0x0 \ {00x0, x000, x010}, 0xxx \ {010x, 00x0, 00x1}} {10x1 \ {1001, 1011}, xx10 \ {1x10, x110, 1110}} {x1x1 \ {1101, 0111, 01x1, 11x1, x101}, 1010} {010x \ {0101, 0100}} {x11x \ {1111, 0111, 111x}, 0x00 \ {0100}} {0000 \ {0000}} {x0x0 \ {x010}} {1x0x \ {100x, 110x}} {0000 \ {0000}} {xx10 \ {0x10, x110, 0010}, 01x0 \ {0100, 0110, 0110}} {1x0x \ {1101, 100x, 1001}, 0xxx \ {0100, 0x10, 0010}} {1010 \ {1010}, 0000 \ {0000}, x0x0 \ {1000, 0010, x000, x010, x010, 10x0}} {1x0x \ {1100, 110x, 1000}, 1xx0 \ {1x10, 1x00, 10x0}, 1x1x \ {101x, 1111, 1x10}} {1x10 \ {1010, 1110, 1110}} {1010 \ {1010}} {} {0x0x \ {0x01, 0001, 0x00}} {} {} {x11x \ {1110, 0110, x111}} {} {0x00 \ {0000, 0100, 0100}} {xxx1 \ {x011, 0101, 1x01}} {} {x1x1 \ {01x1, 0111, 1111}} {01xx \ {0110, 0101, 01x1}} {x1x1 \ {x1x1}} {1x1x \ {1010, 111x, 1x10}} {} {} {} {10x0 \ {1000, 1010, 1010}} {} {} {x0x1 \ {1001, x001}, x01x \ {x010, 1011}} {} {0x1x \ {011x, 001x}, x0xx \ {x00x, 0011, 1001}} {xx00 \ {1100, x100}} {0000 \ {0000}} {xx00 \ {0100, 1100, 1100}, x11x \ {x110, x111, 0111}} {0xx1 \ {00x1, 0011, 0x01}} {1111 \ {1111}} {x0x1 \ {0011, 1001, 00x1}, 0x0x \ {0000, 0101, 000x}} {x100 \ {0100}} {0000} {} {} {} {xx10 \ {0110, 0x10}} {x0xx \ {x000, 10x1, 0001}} {1010} {} {x0x1 \ {00x1, 1011, 1011}} {} {} {01xx \ {010x, 011x}} {} {} {x1xx \ {11xx, 01xx, 010x}, xxx1 \ {00x1, 1101, 0001}} {} {xxxx \ {00x1, 010x, x111}, x101 \ {0101, 1101}} {0xx0 \ {0110, 0000, 0010}, 1x01 \ {1101, 1001}, 0x0x \ {0101, 0100, 0000}} {x0x0 \ {1000, 0010, 10x0}, 0101 \ {0101}, 0x0x \ {0100, 0001, 000x}} {x01x \ {0011, 101x, 101x}} {x101 \ {1101, 0101, 0101}} {} {xx10 \ {1x10, x110, 0x10}} {1x01 \ {1001, 1101, 1101}, 1xx1 \ {11x1, 1x01, 1111}} {} {0xx0 \ {0x00, 0010, 0010}} {x0xx \ {00x1, 10x0, 00x0}} {x0x0 \ {x0x0}} {x001 \ {0001, 1001}, 1x00 \ {1000, 1100, 1100}} {10xx \ {101x, 1011, 100x}, 1xxx \ {1011, 1xx0, 1111}} {0101 \ {0101}, 0000 \ {0000}} {x0x0 \ {0000, x010, 1000}, xx0x \ {1x0x, 0001, 1101}, xxx0 \ {11x0, 0xx0, 1xx0}} {001x \ {0010, 0011}} {1010 \ {1010}} {xx1x \ {x110, 1x10, 101x}, xx01 \ {0001, 0101, 1x01}, 0xx0 \ {0x00, 0010, 0100}} {xxxx \ {1010, xxx1, 100x}, xxx1 \ {01x1, 0011, 00x1}} {1x1x \ {1110, 1011, 111x}, 1111, 0101 \ {0101}, x0x0 \ {1000, 0010, x000}} {xx1x \ {001x, 1x10, 111x}} {x101 \ {0101}, x1xx \ {11x1, 0101, x1x0}} {1x1x \ {1110, 1011, 101x}} {01xx \ {01x0, 01x1, 0110}} {} {} {xxxx \ {101x, 0xx1, xx0x}, xx0x \ {0001, 1101}} {0xx0 \ {0110, 00x0}, 1xx0 \ {11x0, 1010, 1100}} {x0x0 \ {1000, 0010, x000, 10x0}, 0000} {0xxx \ {01xx, 00x1, 00x0}, xxx1 \ {1101, 0101, 0x01}} {0xx1 \ {01x1, 0011, 0011}, x00x \ {100x, 1001, x000}, xxx0 \ {x0x0, 1100, 1110}} {0x0x \ {0100, 0001, 000x, 0x01, 0x00}, x0x0 \ {x0x0}, x1x1 \ {1101, 0111, 11x1, 11x1}, 0101} {xxxx \ {01xx, 0xx0, 1xxx}} {} {} {xxx0 \ {x010, 0100}} {11xx \ {1100, 11x1, 11x1}} {x0x0 \ {1000, 0010, 00x0}} {00x0 \ {0010, 0000}} {1x0x \ {110x, 1100, 1001}} {0000 \ {0000}} {xxx1 \ {xx11, 00x1, 1x01}} {} {} {xx10 \ {x010, x110, 0110}} {00x1 \ {0011, 0001}, xx0x \ {x101, 0x01, 0x0x}, x11x \ {0111, 111x}} {1010 \ {1010}} {} {xx0x \ {100x, 0x00, x000}} {} {} {} {} {x011 \ {1011, 0011, 0011}, x0x0 \ {00x0, 1000, 1010}} {} {} {} {0xx1 \ {0x01, 0011, 0x11}} {} {x010 \ {0010, 1010}, xxx0 \ {1010, xx00, 00x0}} {xx10 \ {0x10, x110, x010}} {1010 \ {1010}} {x01x \ {x010, 001x}} {xxx0 \ {0000, 01x0, 1x00}, xxx1 \ {0x11, 0111, 1xx1}} {1010 \ {1010}, 1111 \ {1111}} {100x \ {1001, 1000, 1000}} {0x1x \ {0111, 0010, 0011}, xxx1 \ {11x1, 1011, 0011}} {0101 \ {0101}} {1x0x \ {1101, 1x00, 1001}} {0xx0 \ {0010, 00x0, 0x00}, 1x00 \ {1100, 1000}} {0000 \ {0000}} {0xxx \ {01x0, 000x, 00x1}, xx1x \ {0111, 1011, 0x11}} {} {} {xx1x \ {1110, 1111}} {xx1x \ {111x, x010, x011}, xx1x \ {0x1x, 1010, 011x}} {1x1x \ {1110, 1011}} t1:{0111} t2:{1100, 1101} t:{1101} {x0000 \ {10000, 00000}} {0x01x \ {00010, 0x011, 0101x}} {} {00xx1 \ {00101, 000x1, 00111}, 1xx10 \ {10010, 11010}} {x0111 \ {10111}, 0101x \ {01011}} { x011100x11 \ { x011100011, x011100111, 1011100x11}, 0101100x11 \ { 0101100011, 0101100111, 0101100x11}, 010101xx10 \ { 0101010010, 0101011010}} {01x11 \ {01011, 01111}, 1x0xx \ {10011, 11011, 110x1}} {} {} {1x110 \ {10110}, 10x10 \ {10110, 10010}} {110xx \ {1101x, 110x1, 110x0}} { 110101x110 \ { 1101010110, 110101x110, 110101x110}, 1101010x10 \ { 1101010110, 1101010010, 1101010x10, 1101010x10}} {xx01x \ {01010, x101x, 0101x}, 0xx01 \ {01001, 01101}, xx110 \ {11110, 01110, 00110}} {0xx0x \ {0000x, 00x01, 0100x}} { 0xx010xx01 \ { 0xx0101001, 0xx0101101, 000010xx01, 00x010xx01, 010010xx01}} {x0100 \ {00100}, 0x11x \ {0011x, 0x110, 00111}, xx001 \ {11001, 01001}} {0x1x1 \ {001x1, 01111, 0x101}, x1xxx \ {11x1x, 01011, 11001}, 00xxx \ {000x0, 00xx0, 001x1}} { x1x00x0100 \ { x1x0000100}, 00x00x0100 \ { 00x0000100, 00000x0100, 00x00x0100}, 0x1110x111 \ { 0x11100111, 0x11100111, 001110x111, 011110x111}, x1x1x0x11x \ { x1x110x110, x1x100x111, x1x1x0011x, x1x1x0x110, x1x1x00111, 11x1x0x11x, 010110x11x}, 00x1x0x11x \ { 00x110x110, 00x100x111, 00x1x0011x, 00x1x0x110, 00x1x00111, 000100x11x, 00x100x11x, 001110x11x}, 0x101xx001 \ { 0x10111001, 0x10101001, 00101xx001, 0x101xx001}, x1x01xx001 \ { x1x0111001, x1x0101001, 11001xx001}, 00x01xx001 \ { 00x0111001, 00x0101001, 00101xx001}} {xxxx0 \ {x11x0, 0xx00, 111x0}} {xx00x \ {11001, x0000}} { xx000xxx00 \ { xx000x1100, xx0000xx00, xx00011100, x0000xxx00}} {xxx01 \ {00001, 01001, 11x01}} {xxxx1 \ {x1101, 10x01, 0x011}} { xxx01xxx01 \ { xxx0100001, xxx0101001, xxx0111x01, x1101xxx01, 10x01xxx01}} {} {xx001 \ {x1001, 0x001}} {} {xx1xx \ {xx101, 1x10x, 0111x}} {00xx1 \ {00001, 00111, 00011}} { 00xx1xx1x1 \ { 00x11xx101, 00x01xx111, 00xx1xx101, 00xx11x101, 00xx101111, 00001xx1x1, 00111xx1x1, 00011xx1x1}} {01x0x \ {01100, 01001, 01x01}, 0xxxx \ {00xx0, 0x0xx, 0xx00}} {xx00x \ {xx001, x000x, 0000x}} { xx00x01x0x \ { xx00101x00, xx00001x01, xx00x01100, xx00x01001, xx00x01x01, xx00101x0x, x000x01x0x, 0000x01x0x}, xx00x0xx0x \ { xx0010xx00, xx0000xx01, xx00x00x00, xx00x0x00x, xx00x0xx00, xx0010xx0x, x000x0xx0x, 0000x0xx0x}} {11x1x \ {11010, 11011, 11011}, 01xxx \ {01010, 010xx, 01x1x}} {} {} {1xx0x \ {1000x, 10x0x, 11101}, 1x1x1 \ {10111, 111x1, 11111}} {0xxxx \ {00111, 0x100, 01xx1}, xx01x \ {0x011, 11010, x101x}} { 0xx0x1xx0x \ { 0xx011xx00, 0xx001xx01, 0xx0x1000x, 0xx0x10x0x, 0xx0x11101, 0x1001xx0x, 01x011xx0x}, 0xxx11x1x1 \ { 0xx111x101, 0xx011x111, 0xxx110111, 0xxx1111x1, 0xxx111111, 001111x1x1, 01xx11x1x1}, xx0111x111 \ { xx01110111, xx01111111, xx01111111, 0x0111x111, x10111x111}} {110xx \ {11000, 110x1, 11010}} {x0111 \ {10111}, 11xxx \ {11110, 11x1x, 110x0}} { x011111011 \ { x011111011, 1011111011}, 11xxx110xx \ { 11xx1110x0, 11xx0110x1, 11x1x1100x, 11x0x1101x, 11xxx11000, 11xxx110x1, 11xxx11010, 11110110xx, 11x1x110xx, 110x0110xx}} {x0110 \ {10110, 00110, 00110}} {xx00x \ {x0000, 1x000, 0000x}, 1x0x1 \ {10011, 1x001, 1x001}} {} {0x11x \ {00110, 01111, 0x110}} {x01x0 \ {00100, 10100, x0100}} { x01100x110 \ { x011000110, x01100x110}} {0xxxx \ {00111, 00xxx, 0x1x1}, 00x10 \ {00110, 00010}} {x10xx \ {x10x0, 11000, 010x1}, x1xx0 \ {x11x0, x10x0, 011x0}} { x10xx0xxxx \ { x10x10xxx0, x10x00xxx1, x101x0xx0x, x100x0xx1x, x10xx00111, x10xx00xxx, x10xx0x1x1, x10x00xxxx, 110000xxxx, 010x10xxxx}, x1xx00xxx0 \ { x1x100xx00, x1x000xx10, x1xx000xx0, x11x00xxx0, x10x00xxx0, 011x00xxx0}, x101000x10 \ { x101000110, x101000010, x101000x10}, x1x1000x10 \ { x1x1000110, x1x1000010, x111000x10, x101000x10, 0111000x10}} {0xxx0 \ {01010, 00110, 01100}, xxx10 \ {01110, x0010, x1110}} {00xxx \ {00010, 0010x, 00111}, x11xx \ {1111x, x110x, 11100}} { 00xx00xxx0 \ { 00x100xx00, 00x000xx10, 00xx001010, 00xx000110, 00xx001100, 000100xxx0, 001000xxx0}, x11x00xxx0 \ { x11100xx00, x11000xx10, x11x001010, x11x000110, x11x001100, 111100xxx0, x11000xxx0, 111000xxx0}, 00x10xxx10 \ { 00x1001110, 00x10x0010, 00x10x1110, 00010xxx10}, x1110xxx10 \ { x111001110, x1110x0010, x1110x1110, 11110xxx10}} {0x0x0 \ {000x0, 01010, 01000}} {xx1xx \ {x1100, xx101, 0x1x1}, 0x01x \ {00011, 0x010}} { xx1x00x0x0 \ { xx1100x000, xx1000x010, xx1x0000x0, xx1x001010, xx1x001000, x11000x0x0}, 0x0100x010 \ { 0x01000010, 0x01001010, 0x0100x010}} {xx110 \ {01110, x0110, x0110}, 10x11 \ {10111, 10011}, 0x1xx \ {01111, 011xx, 01100}} {x100x \ {0100x, x1000, 11000}, x100x \ {0100x, 01000, x1000}} { x100x0x10x \ { x10010x100, x10000x101, x100x0110x, x100x01100, 0100x0x10x, x10000x10x, 110000x10x}} {100x1 \ {10011}, xx111 \ {00111, 01111, x1111}} {xxx0x \ {0xx0x, xx001, x000x}} { xxx0110001 \ { 0xx0110001, xx00110001, x000110001}} {000xx \ {00000, 000x0, 0000x}} {1100x \ {11001, 11000}, x011x \ {0011x, x0110, 00110}, xxx00 \ {1x000, x1100, 01x00}} { 1100x0000x \ { 1100100000, 1100000001, 1100x00000, 1100x00000, 1100x0000x, 110010000x, 110000000x}, x011x0001x \ { x011100010, x011000011, x011x00010, 0011x0001x, x01100001x, 001100001x}, xxx0000000 \ { xxx0000000, xxx0000000, xxx0000000, 1x00000000, x110000000, 01x0000000}} {0xxx1 \ {00x01, 0x1x1, 01x01}, x1x01 \ {01x01, 11101}} {xx110 \ {x1110, 11110, 1x110}, 01x00 \ {01100, 01000}} {} {} {x100x \ {1100x, x1001, 01001}, 00xx1 \ {00x01, 00001}, 111x0 \ {11100, 11110}} {} {1111x \ {11111}, x11x1 \ {11111, 011x1, 011x1}, 0x1xx \ {0x10x, 0x1x0, 001x0}} {0x111 \ {01111, 00111}, 0111x \ {01110}} { 0x11111111 \ { 0x11111111, 0111111111, 0011111111}, 0111x1111x \ { 0111111110, 0111011111, 0111x11111, 011101111x}, 0x111x1111 \ { 0x11111111, 0x11101111, 0x11101111, 01111x1111, 00111x1111}, 01111x1111 \ { 0111111111, 0111101111, 0111101111}, 0x1110x111 \ { 011110x111, 001110x111}, 0111x0x11x \ { 011110x110, 011100x111, 0111x0x110, 0111x00110, 011100x11x}} {11xxx \ {11xx1, 11111, 110x1}, 00x10 \ {00110, 00010}} {x0011 \ {00011, 10011}, 0001x \ {00010, 00011}} { x001111x11 \ { x001111x11, x001111111, x001111011, 0001111x11, 1001111x11}, 0001x11x1x \ { 0001111x10, 0001011x11, 0001x11x11, 0001x11111, 0001x11011, 0001011x1x, 0001111x1x}, 0001000x10 \ { 0001000110, 0001000010, 0001000x10}} {1xx00 \ {11x00, 11100, 1x100}, 0x10x \ {00100, 01101, 01100}} {1010x \ {10101, 10100}} { 101001xx00 \ { 1010011x00, 1010011100, 101001x100, 101001xx00}, 1010x0x10x \ { 101010x100, 101000x101, 1010x00100, 1010x01101, 1010x01100, 101010x10x, 101000x10x}} {0x0xx \ {010xx, 000xx, 01011}} {0110x \ {01100, 01101}} { 0110x0x00x \ { 011010x000, 011000x001, 0110x0100x, 0110x0000x, 011000x00x, 011010x00x}} {1x00x \ {1x001, 1100x, 10000}, 111xx \ {11110, 11101, 111x0}} {01xx0 \ {01x10, 01000, 01010}, x1x10 \ {11010, 01110, 11110}, x11x0 \ {01100, x1110, 011x0}} { 01x001x000 \ { 01x0011000, 01x0010000, 010001x000}, x11001x000 \ { x110011000, x110010000, 011001x000, 011001x000}, 01xx0111x0 \ { 01x1011100, 01x0011110, 01xx011110, 01xx0111x0, 01x10111x0, 01000111x0, 01010111x0}, x1x1011110 \ { x1x1011110, x1x1011110, 1101011110, 0111011110, 1111011110}, x11x0111x0 \ { x111011100, x110011110, x11x011110, x11x0111x0, 01100111x0, x1110111x0, 011x0111x0}} {xx1x0 \ {01110, x01x0, 101x0}, xx01x \ {1001x, 11010, x1010}} {0xxx1 \ {01001, 00x11, 00001}, x00x0 \ {000x0, x0010, x0010}} { x00x0xx1x0 \ { x0010xx100, x0000xx110, x00x001110, x00x0x01x0, x00x0101x0, 000x0xx1x0, x0010xx1x0, x0010xx1x0}, 0xx11xx011 \ { 0xx1110011, 00x11xx011}, x0010xx010 \ { x001010010, x001011010, x0010x1010, 00010xx010, x0010xx010, x0010xx010}} {} {x0x1x \ {1001x, 10011, 10111}} {} {00x11 \ {00111, 00011, 00011}, 1xx0x \ {10x0x, 10001, 1x10x}} {1xx01 \ {1x001, 10101, 11x01}, x1001 \ {11001, 01001}} { 1xx011xx01 \ { 1xx0110x01, 1xx0110001, 1xx011x101, 1x0011xx01, 101011xx01, 11x011xx01}, x10011xx01 \ { x100110x01, x100110001, x10011x101, 110011xx01, 010011xx01}} {xxxxx \ {1x001, xx011, 1x10x}, 000x1 \ {00011, 00001, 00001}, xx100 \ {10100, 1x100}} {1100x \ {11001, 11000, 11000}, 0x10x \ {01100, 01101}} { 1100xxxx0x \ { 11001xxx00, 11000xxx01, 1100x1x001, 1100x1x10x, 11001xxx0x, 11000xxx0x, 11000xxx0x}, 0x10xxxx0x \ { 0x101xxx00, 0x100xxx01, 0x10x1x001, 0x10x1x10x, 01100xxx0x, 01101xxx0x}, 1100100001 \ { 1100100001, 1100100001, 1100100001}, 0x10100001 \ { 0x10100001, 0x10100001, 0110100001}, 11000xx100 \ { 1100010100, 110001x100, 11000xx100, 11000xx100}, 0x100xx100 \ { 0x10010100, 0x1001x100, 01100xx100}} {xxx01 \ {10101, 1x001, 0x101}} {1xx10 \ {11110, 10x10}} {} {xxx0x \ {x1x00, 1x001, 01000}} {01xx0 \ {01000, 01110, 010x0}, 000xx \ {000x1, 00010, 00010}, 0x11x \ {0x111, 00111, 00111}} { 01x00xxx00 \ { 01x00x1x00, 01x0001000, 01000xxx00, 01000xxx00}, 0000xxxx0x \ { 00001xxx00, 00000xxx01, 0000xx1x00, 0000x1x001, 0000x01000, 00001xxx0x}} {} {xxxx1 \ {0x111, 101x1, 01xx1}, 10xxx \ {10101, 10xx0, 100x1}} {} {x1001 \ {01001, 11001}, 0xx10 \ {00x10, 01110, 0x010}} {xxxx1 \ {1xx01, 0xx01, 110x1}, 11xx1 \ {11x11, 111x1, 111x1}, x0x1x \ {1011x, 1001x, 0011x}} { xxx01x1001 \ { xxx0101001, xxx0111001, 1xx01x1001, 0xx01x1001, 11001x1001}, 11x01x1001 \ { 11x0101001, 11x0111001, 11101x1001, 11101x1001}, x0x100xx10 \ { x0x1000x10, x0x1001110, x0x100x010, 101100xx10, 100100xx10, 001100xx10}} {x0x11 \ {10111, x0011, 10x11}} {0xx11 \ {01011, 01111, 01111}, x0xx1 \ {00111, x0101, 00011}, 0x00x \ {0x001, 01001, 0x000}} { 0xx11x0x11 \ { 0xx1110111, 0xx11x0011, 0xx1110x11, 01011x0x11, 01111x0x11, 01111x0x11}, x0x11x0x11 \ { x0x1110111, x0x11x0011, x0x1110x11, 00111x0x11, 00011x0x11}} {11x1x \ {11011, 11x11}} {x0110 \ {10110}} { x011011x10 \ { 1011011x10}} {010xx \ {0101x, 01010, 010x1}, x1x11 \ {11x11, x1111}} {} {} {0xxx1 \ {0x101, 0x011, 010x1}, 00x1x \ {00x10, 00011}} {0x11x \ {0x110, 0x111, 01110}} { 0x1110xx11 \ { 0x1110x011, 0x11101011, 0x1110xx11}, 0x11x00x1x \ { 0x11100x10, 0x11000x11, 0x11x00x10, 0x11x00011, 0x11000x1x, 0x11100x1x, 0111000x1x}} {x0101 \ {00101, 10101, 10101}, 1x1xx \ {11111, 1110x, 111x0}} {} {} {1xxxx \ {11xxx, 1xx01, 11001}, 01x01 \ {01101, 01001, 01001}} {xx1x0 \ {0x1x0, x01x0, 001x0}, x1000 \ {11000}} { xx1x01xxx0 \ { xx1101xx00, xx1001xx10, xx1x011xx0, 0x1x01xxx0, x01x01xxx0, 001x01xxx0}, x10001xx00 \ { x100011x00, 110001xx00}} {x0111 \ {00111, 10111}, 1101x \ {11010, 11011}} {0xx00 \ {01100, 01000, 00100}} {} {} {x0x1x \ {0001x, 10x10, x0x11}} {} {} {} {} {11xx1 \ {11011, 110x1, 111x1}, xx00x \ {xx001, x000x}} {0x0xx \ {00001, 0001x, 000x1}} { 0x0x111xx1 \ { 0x01111x01, 0x00111x11, 0x0x111011, 0x0x1110x1, 0x0x1111x1, 0000111xx1, 0001111xx1, 000x111xx1}, 0x00xxx00x \ { 0x001xx000, 0x000xx001, 0x00xxx001, 0x00xx000x, 00001xx00x, 00001xx00x}} {xx010 \ {00010, 11010, x0010}} {0x11x \ {0x111, 01111}} { 0x110xx010 \ { 0x11000010, 0x11011010, 0x110x0010}} {000xx \ {000x0, 0000x, 000x1}} {0x11x \ {01111, 00110, 00111}, x11x1 \ {11101, 111x1}} { 0x11x0001x \ { 0x11100010, 0x11000011, 0x11x00010, 0x11x00011, 011110001x, 001100001x, 001110001x}, x11x1000x1 \ { x111100001, x110100011, x11x100001, x11x1000x1, 11101000x1, 111x1000x1}} {xxx10 \ {00010, 11110, 10x10}, 0x110 \ {01110, 00110}, 1x1x0 \ {111x0, 101x0}} {011xx \ {01111, 0110x}, 1xx00 \ {11x00, 10x00, 1x100}, 1x0x1 \ {10011, 110x1}} { 01110xxx10 \ { 0111000010, 0111011110, 0111010x10}, 011100x110 \ { 0111001110, 0111000110}, 011x01x1x0 \ { 011101x100, 011001x110, 011x0111x0, 011x0101x0, 011001x1x0}, 1xx001x100 \ { 1xx0011100, 1xx0010100, 11x001x100, 10x001x100, 1x1001x100}} {x11x1 \ {x1101, 11101, 011x1}, xx1x0 \ {01110, 1x1x0, xx110}} {x111x \ {01111, 01110, 11111}, 001x0 \ {00110, 00100, 00100}} { x1111x1111 \ { x111101111, 01111x1111, 11111x1111}, x1110xx110 \ { x111001110, x11101x110, x1110xx110, 01110xx110}, 001x0xx1x0 \ { 00110xx100, 00100xx110, 001x001110, 001x01x1x0, 001x0xx110, 00110xx1x0, 00100xx1x0, 00100xx1x0}} {1xxxx \ {1xx00, 1100x, 1x111}, 10x10 \ {10110, 10010, 10010}} {x001x \ {00010, 0001x}, 11xxx \ {11x00, 111xx, 1110x}} { x001x1xx1x \ { x00111xx10, x00101xx11, x001x1x111, 000101xx1x, 0001x1xx1x}, 11xxx1xxxx \ { 11xx11xxx0, 11xx01xxx1, 11x1x1xx0x, 11x0x1xx1x, 11xxx1xx00, 11xxx1100x, 11xxx1x111, 11x001xxxx, 111xx1xxxx, 1110x1xxxx}, x001010x10 \ { x001010110, x001010010, x001010010, 0001010x10, 0001010x10}, 11x1010x10 \ { 11x1010110, 11x1010010, 11x1010010, 1111010x10}} {00x1x \ {00010, 00110, 00x10}} {1x1x0 \ {1x100, 11110, 101x0}, 100x0 \ {10000}, x101x \ {x1010, 11010, 11010}} { 1x11000x10 \ { 1x11000010, 1x11000110, 1x11000x10, 1111000x10, 1011000x10}, 1001000x10 \ { 1001000010, 1001000110, 1001000x10}, x101x00x1x \ { x101100x10, x101000x11, x101x00010, x101x00110, x101x00x10, x101000x1x, 1101000x1x, 1101000x1x}} {00x1x \ {00x11, 00011, 00x10}} {1x0xx \ {11000, 100x0, 100xx}, 0x11x \ {0x111, 00110, 0111x}} { 1x01x00x1x \ { 1x01100x10, 1x01000x11, 1x01x00x11, 1x01x00011, 1x01x00x10, 1001000x1x, 1001x00x1x}, 0x11x00x1x \ { 0x11100x10, 0x11000x11, 0x11x00x11, 0x11x00011, 0x11x00x10, 0x11100x1x, 0011000x1x, 0111x00x1x}} {11xx0 \ {11000, 11100, 11x00}, 1x101 \ {10101, 11101, 11101}} {0xxx1 \ {01xx1, 0x011, 01011}, xxx11 \ {xx011, 0xx11, 01011}} { 0xx011x101 \ { 0xx0110101, 0xx0111101, 0xx0111101, 01x011x101}} {} {xx1x0 \ {x1100, 11100, 111x0}, xx110 \ {01110, 10110, 11110}} {} {} {xxxx0 \ {xx100, x0110, 11100}, 000x1 \ {00011}} {} {x0xx0 \ {00100, x0x10, 00110}, 1x10x \ {10101, 1x100, 1x100}} {00x10 \ {00110}} { 00x10x0x10 \ { 00x10x0x10, 00x1000110, 00110x0x10}} {011xx \ {0111x, 0110x, 0110x}} {xx1x1 \ {01101, 0x111, 10101}} { xx1x1011x1 \ { xx11101101, xx10101111, xx1x101111, xx1x101101, xx1x101101, 01101011x1, 0x111011x1, 10101011x1}} {xx11x \ {00111, 01111, 1111x}} {} {} {0x0x1 \ {000x1, 0x011, 01001}, 10x0x \ {10001, 1010x, 10100}, 1x001 \ {11001}} {x11x1 \ {x1111, 111x1, 011x1}} { x11x10x0x1 \ { x11110x001, x11010x011, x11x1000x1, x11x10x011, x11x101001, x11110x0x1, 111x10x0x1, 011x10x0x1}, x110110x01 \ { x110110001, x110110101, 1110110x01, 0110110x01}, x11011x001 \ { x110111001, 111011x001, 011011x001}} {x1x1x \ {1101x, 11110, 0111x}, xxxxx \ {0x101, x1x1x, 011x0}, 1xx01 \ {1x001, 10x01, 10x01}} {x1x01 \ {11101, 01001, 01001}} { x1x01xxx01 \ { x1x010x101, 11101xxx01, 01001xxx01, 01001xxx01}, x1x011xx01 \ { x1x011x001, x1x0110x01, x1x0110x01, 111011xx01, 010011xx01, 010011xx01}} {11xx0 \ {11110, 110x0}} {x0x1x \ {10x10, 00x10, 00x1x}} { x0x1011x10 \ { x0x1011110, x0x1011010, 10x1011x10, 00x1011x10, 00x1011x10}} {x1xxx \ {110xx, x1111, 01x11}} {0xx11 \ {0x011, 01x11, 01x11}, 00x1x \ {00x10, 00x11, 0001x}} { 0xx11x1x11 \ { 0xx1111011, 0xx11x1111, 0xx1101x11, 0x011x1x11, 01x11x1x11, 01x11x1x11}, 00x1xx1x1x \ { 00x11x1x10, 00x10x1x11, 00x1x1101x, 00x1xx1111, 00x1x01x11, 00x10x1x1x, 00x11x1x1x, 0001xx1x1x}} {01x01 \ {01001, 01101}, xxxx0 \ {xxx10, x00x0, x0010}} {x1xx1 \ {11101, 11x11, x1001}, xx1xx \ {x01x1, xx1x1, x111x}, xxx1x \ {0101x, 11010, x0110}} { x1x0101x01 \ { x1x0101001, x1x0101101, 1110101x01, x100101x01}, xx10101x01 \ { xx10101001, xx10101101, x010101x01, xx10101x01}, xx1x0xxxx0 \ { xx110xxx00, xx100xxx10, xx1x0xxx10, xx1x0x00x0, xx1x0x0010, x1110xxxx0}, xxx10xxx10 \ { xxx10xxx10, xxx10x0010, xxx10x0010, 01010xxx10, 11010xxx10, x0110xxx10}} {01x1x \ {01011, 0111x, 0111x}, 01x01 \ {01001, 01101}} {11x1x \ {11011, 11111}, 1x1x1 \ {11111, 111x1, 11101}} { 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01011, 11x1x0111x, 11x1x0111x, 1101101x1x, 1111101x1x}, 1x11101x11 \ { 1x11101011, 1x11101111, 1x11101111, 1111101x11, 1111101x11}, 1x10101x01 \ { 1x10101001, 1x10101101, 1110101x01, 1110101x01}} {0xxx0 \ {01110, 0x110}} {xxx0x \ {1110x, 0x000, x0x00}, 0xx0x \ {01x00, 01x0x}} { xxx000xx00 \ { 111000xx00, 0x0000xx00, x0x000xx00}, 0xx000xx00 \ { 01x000xx00, 01x000xx00}} {} {1101x \ {11010, 11011}} {} {x1x11 \ {11x11, x1011, 01x11}} {} {} {1xx00 \ {1x100, 1x000}} {x000x \ {00000, x0001}, 01xxx \ {01x0x, 01000, 01xx0}} { x00001xx00 \ { x00001x100, x00001x000, 000001xx00}, 01x001xx00 \ { 01x001x100, 01x001x000, 01x001xx00, 010001xx00, 01x001xx00}} {0x11x \ {01111, 00110, 00111}, 100xx \ {100x0, 100x1, 10001}} {} {} {010xx \ {01001, 01011, 01000}, 01xx0 \ {01110, 01100}, 111x0 \ {11100}} {} {} {xxx11 \ {10011, x0011, x0x11}, 1x00x \ {11000, 10001, 10001}, 0xxx0 \ {0x110, 01x00, 0xx00}} {} {} {xxx1x \ {xx111, 01011, 0001x}, 00x0x \ {0010x, 0000x, 00001}} {} {} {00x0x \ {00101, 00100}, x0100 \ {10100, 00100}} {0x00x \ {01001}} { 0x00x00x0x \ { 0x00100x00, 0x00000x01, 0x00x00101, 0x00x00100, 0100100x0x}, 0x000x0100 \ { 0x00010100, 0x00000100}} {00x1x \ {00110, 0001x}, 001xx \ {00110, 001x0, 0011x}} {xx001 \ {01001, x0001, 11001}} { xx00100101 \ { 0100100101, x000100101, 1100100101}} {x00xx \ {x00x1, 10000, 1001x}, 11x11 \ {11011, 11111}, x11xx \ {01101, 01111, x1101}} {} {} {xx0x1 \ {xx011, 00011, x0011}, xxxx0 \ {10110, 010x0, 010x0}, x10x0 \ {x1010, 110x0, 01010}} {0x10x \ {00101, 01100, 0010x}} { 0x101xx001 \ { 00101xx001, 00101xx001}, 0x100xxx00 \ { 0x10001000, 0x10001000, 01100xxx00, 00100xxx00}, 0x100x1000 \ { 0x10011000, 01100x1000, 00100x1000}} {} {0x1x1 \ {0x101, 01111, 01111}, x1x10 \ {x1110, 01110, 01110}, xx000 \ {11000, 00000}} {} {x10xx \ {x1000, 01011, 11010}, 1xx1x \ {1xx11, 10x1x, 10x11}} {xxx00 \ {01100, 01x00, 01x00}} { xxx00x1000 \ { xxx00x1000, 01100x1000, 01x00x1000, 01x00x1000}} {} {x11x1 \ {01111, 11101, 111x1}} {} {x1x1x \ {11x1x, x111x, 01011}, 1100x \ {11001, 11000}} {0x001 \ {01001, 00001}} { 0x00111001 \ { 0x00111001, 0100111001, 0000111001}} {1xx00 \ {11000, 10000}, x1x01 \ {x1001, 01x01, 01x01}} {x0x1x \ {x0011, 10x10, 00011}, x00x1 \ {x0001, 00011, 100x1}} { x0001x1x01 \ { x0001x1001, x000101x01, x000101x01, x0001x1x01, 10001x1x01}} {xxxx0 \ {01000, x1010, 11000}} {10x1x \ {10010, 1011x, 10x10}, xx0x0 \ {0x0x0, 0x000, xx010}, x0xxx \ {10101, 001xx, 00x00}} { 10x10xxx10 \ { 10x10x1010, 10010xxx10, 10110xxx10, 10x10xxx10}, xx0x0xxxx0 \ { xx010xxx00, xx000xxx10, xx0x001000, xx0x0x1010, xx0x011000, 0x0x0xxxx0, 0x000xxxx0, xx010xxxx0}, x0xx0xxxx0 \ { x0x10xxx00, x0x00xxx10, x0xx001000, x0xx0x1010, x0xx011000, 001x0xxxx0, 00x00xxxx0}} {x1100 \ {11100}} {x101x \ {x1010, 01011, x1011}, 00xx1 \ {00001, 00101}} {} {0x1x1 \ {001x1, 01111, 0x101}} {x0x0x \ {10001, 00100, x0100}, xx001 \ {x1001, 00001, 00001}} { x0x010x101 \ { x0x0100101, x0x010x101, 100010x101}, xx0010x101 \ { xx00100101, xx0010x101, x10010x101, 000010x101, 000010x101}} {1100x \ {11001, 11000}, x1x0x \ {x1001, 11101, 11001}} {x001x \ {10010, x0010}, xx001 \ {x0001, 01001, 11001}, 1110x \ {11101, 11100, 11100}} { xx00111001 \ { xx00111001, x000111001, 0100111001, 1100111001}, 1110x1100x \ { 1110111000, 1110011001, 1110x11001, 1110x11000, 111011100x, 111001100x, 111001100x}, xx001x1x01 \ { xx001x1001, xx00111101, xx00111001, x0001x1x01, 01001x1x01, 11001x1x01}, 1110xx1x0x \ { 11101x1x00, 11100x1x01, 1110xx1001, 1110x11101, 1110x11001, 11101x1x0x, 11100x1x0x, 11100x1x0x}} {xxx00 \ {x1100, 00000, 10x00}, 01xxx \ {01101, 010x0, 01x0x}} {01xxx \ {011x0, 01x0x}} { 01x00xxx00 \ { 01x00x1100, 01x0000000, 01x0010x00, 01100xxx00, 01x00xxx00}, 01xxx01xxx \ { 01xx101xx0, 01xx001xx1, 01x1x01x0x, 01x0x01x1x, 01xxx01101, 01xxx010x0, 01xxx01x0x, 011x001xxx, 01x0x01xxx}} {} {xx110 \ {11110, 01110, 00110}, 1xx00 \ {11x00, 10x00, 1x000}} {} {10xxx \ {1011x, 10x01, 101x1}, xx111 \ {01111, 0x111, x1111}} {x0xx1 \ {x01x1, 10111, 00111}, xx1x1 \ {10111, 10101, x11x1}} { x0xx110xx1 \ { x0x1110x01, x0x0110x11, x0xx110111, x0xx110x01, x0xx1101x1, x01x110xx1, 1011110xx1, 0011110xx1}, xx1x110xx1 \ { xx11110x01, xx10110x11, xx1x110111, xx1x110x01, xx1x1101x1, 1011110xx1, 1010110xx1, x11x110xx1}, x0x11xx111 \ { x0x1101111, x0x110x111, x0x11x1111, x0111xx111, 10111xx111, 00111xx111}, xx111xx111 \ { xx11101111, xx1110x111, xx111x1111, 10111xx111, x1111xx111}} {xx1xx \ {1011x, 00100, 00100}, x1x01 \ {01101}} {01x10 \ {01110}, xx011 \ {x0011, 01011}} { 01x10xx110 \ { 01x1010110, 01110xx110}, xx011xx111 \ { xx01110111, x0011xx111, 01011xx111}} {00xx0 \ {000x0, 00010, 00010}, 01xx1 \ {011x1, 01101, 01x11}} {1x01x \ {1101x, 1x010}, 0x1x0 \ {00100, 001x0, 01100}} { 1x01000x10 \ { 1x01000010, 1x01000010, 1x01000010, 1101000x10, 1x01000x10}, 0x1x000xx0 \ { 0x11000x00, 0x10000x10, 0x1x0000x0, 0x1x000010, 0x1x000010, 0010000xx0, 001x000xx0, 0110000xx0}, 1x01101x11 \ { 1x01101111, 1x01101x11, 1101101x11}} {1x01x \ {11010, 1x010, 11011}} {11xx1 \ {11111, 11101, 110x1}, 10x1x \ {1001x, 10010, 10x10}, x1x01 \ {01x01, x1101, x1001}} { 11x111x011 \ { 11x1111011, 111111x011, 110111x011}, 10x1x1x01x \ { 10x111x010, 10x101x011, 10x1x11010, 10x1x1x010, 10x1x11011, 1001x1x01x, 100101x01x, 10x101x01x}} {x0x11 \ {10011, 00x11, 10111}, xx1xx \ {x0101, x111x, 11100}, x0x0x \ {00001, x000x, 00x0x}} {1x111 \ {10111}, x1xxx \ {x1101, x1000, 01001}} { 1x111x0x11 \ { 1x11110011, 1x11100x11, 1x11110111, 10111x0x11}, x1x11x0x11 \ { x1x1110011, x1x1100x11, x1x1110111}, 1x111xx111 \ { 1x111x1111, 10111xx111}, x1xxxxx1xx \ { x1xx1xx1x0, x1xx0xx1x1, x1x1xxx10x, x1x0xxx11x, x1xxxx0101, x1xxxx111x, x1xxx11100, x1101xx1xx, x1000xx1xx, 01001xx1xx}, x1x0xx0x0x \ { x1x01x0x00, x1x00x0x01, x1x0x00001, x1x0xx000x, x1x0x00x0x, x1101x0x0x, x1000x0x0x, 01001x0x0x}} {x0xxx \ {x00xx, x0x11, 10010}} {xxx0x \ {0x10x, 11x01, 0x000}, xxx10 \ {x1x10, 1x010, xx110}} { xxx0xx0x0x \ { xxx01x0x00, xxx00x0x01, xxx0xx000x, 0x10xx0x0x, 11x01x0x0x, 0x000x0x0x}, xxx10x0x10 \ { xxx10x0010, xxx1010010, x1x10x0x10, 1x010x0x10, xx110x0x10}} {x1x10 \ {x1110, x1010}, xx100 \ {10100, 11100}} {} {} {x0111 \ {00111, 10111}, x1x00 \ {11x00, 11000, x1000}, xxxx1 \ {11101, 100x1, 1x001}} {x00x1 \ {00011, 000x1, 10001}, 1x01x \ {10011, 1x011, 11010}} { x0011x0111 \ { x001100111, x001110111, 00011x0111, 00011x0111}, 1x011x0111 \ { 1x01100111, 1x01110111, 10011x0111, 1x011x0111}, x00x1xxxx1 \ { x0011xxx01, x0001xxx11, x00x111101, x00x1100x1, x00x11x001, 00011xxxx1, 000x1xxxx1, 10001xxxx1}, 1x011xxx11 \ { 1x01110011, 10011xxx11, 1x011xxx11}} {x01xx \ {10100, 00110, 1011x}, x1111 \ {11111, 01111, 01111}} {000x0 \ {00010, 00000, 00000}, x111x \ {11110, 01111, x1110}, 1xx10 \ {11x10, 10110, 10010}} { 000x0x01x0 \ { 00010x0100, 00000x0110, 000x010100, 000x000110, 000x010110, 00010x01x0, 00000x01x0, 00000x01x0}, x111xx011x \ { x1111x0110, x1110x0111, x111x00110, x111x1011x, 11110x011x, 01111x011x, x1110x011x}, 1xx10x0110 \ { 1xx1000110, 1xx1010110, 11x10x0110, 10110x0110, 10010x0110}, x1111x1111 \ { x111111111, x111101111, x111101111, 01111x1111}} {0x0xx \ {0x01x, 000xx, 000x1}, 10x11 \ {10011, 10111}} {010xx \ {01001, 010x0, 010x1}} { 010xx0x0xx \ { 010x10x0x0, 010x00x0x1, 0101x0x00x, 0100x0x01x, 010xx0x01x, 010xx000xx, 010xx000x1, 010010x0xx, 010x00x0xx, 010x10x0xx}, 0101110x11 \ { 0101110011, 0101110111, 0101110x11}} {xx0xx \ {1x0xx, 10011, x10x0}, 10x1x \ {10011, 1001x, 10110}, 101x1 \ {10101}} {} {} {001xx \ {00100, 001x1, 00101}, 1xxx1 \ {10xx1, 1x001, 11111}} {0xx10 \ {01110, 01x10, 0x110}} { 0xx1000110 \ { 0111000110, 01x1000110, 0x11000110}} {} {1110x \ {11100}} {} {1001x \ {10010}, 0100x \ {01001, 01000, 01000}} {} {} {1x1x0 \ {10100, 10110, 11110}, 0010x \ {00100, 00101}} {x110x \ {01100, x1101, 01101}, x1x01 \ {x1101, 01001, 01x01}} { x11001x100 \ { x110010100, 011001x100}, x110x0010x \ { x110100100, x110000101, x110x00100, x110x00101, 011000010x, x11010010x, 011010010x}, x1x0100101 \ { x1x0100101, x110100101, 0100100101, 01x0100101}} {11x1x \ {11x10, 11x11, 11111}} {1xxx0 \ {1x0x0, 1x100, 100x0}} { 1xx1011x10 \ { 1xx1011x10, 1x01011x10, 1001011x10}} {01xx0 \ {01000, 01x10, 01x00}} {x011x \ {10111, x0111, x0110}} { x011001x10 \ { x011001x10, x011001x10}} {0x0x1 \ {01001, 010x1, 0x001}} {} {} {11x1x \ {11011, 1101x, 1101x}, 0001x \ {00011, 00010}, x0xx0 \ {x00x0, 10100, 00100}} {10x1x \ {10111, 10110}, 10xx1 \ {10x01, 100x1, 101x1}} { 10x1x11x1x \ { 10x1111x10, 10x1011x11, 10x1x11011, 10x1x1101x, 10x1x1101x, 1011111x1x, 1011011x1x}, 10x1111x11 \ { 10x1111011, 10x1111011, 10x1111011, 1001111x11, 1011111x11}, 10x1x0001x \ { 10x1100010, 10x1000011, 10x1x00011, 10x1x00010, 101110001x, 101100001x}, 10x1100011 \ { 10x1100011, 1001100011, 1011100011}, 10x10x0x10 \ { 10x10x0010, 10110x0x10}} {1x01x \ {10011, 11011, 11011}, x1101 \ {01101, 11101}} {x0xx0 \ {x0110, x0x00, 00100}} { x0x101x010 \ { x01101x010}} {xxxx1 \ {x1xx1, xx1x1, x1101}, 010x0 \ {01000}, x00x0 \ {10000, 000x0, 100x0}} {xx011 \ {x1011, x0011}} { xx011xxx11 \ { xx011x1x11, xx011xx111, x1011xxx11, x0011xxx11}} {xxx11 \ {xx011, 1x111, 00011}, 11x0x \ {11100, 11x01, 1100x}, xx0x0 \ {010x0, xx010, x10x0}} {x1x01 \ {x1101, 01x01, 01001}, xx010 \ {00010, x1010, 1x010}} { x1x0111x01 \ { x1x0111x01, x1x0111001, x110111x01, 01x0111x01, 0100111x01}, xx010xx010 \ { xx01001010, xx010xx010, xx010x1010, 00010xx010, x1010xx010, 1x010xx010}} {x0x00 \ {00000, 10x00}, 1110x \ {11100, 11101, 11101}, x01xx \ {001x0, 1011x, 00111}} {1x10x \ {11100, 11101, 10100}, 11xx0 \ {11000, 11x00}, x11x0 \ {111x0, 01100, x1100}} { 1x100x0x00 \ { 1x10000000, 1x10010x00, 11100x0x00, 10100x0x00}, 11x00x0x00 \ { 11x0000000, 11x0010x00, 11000x0x00, 11x00x0x00}, x1100x0x00 \ { x110000000, x110010x00, 11100x0x00, 01100x0x00, x1100x0x00}, 1x10x1110x \ { 1x10111100, 1x10011101, 1x10x11100, 1x10x11101, 1x10x11101, 111001110x, 111011110x, 101001110x}, 11x0011100 \ { 11x0011100, 1100011100, 11x0011100}, x110011100 \ { x110011100, 1110011100, 0110011100, x110011100}, 1x10xx010x \ { 1x101x0100, 1x100x0101, 1x10x00100, 11100x010x, 11101x010x, 10100x010x}, 11xx0x01x0 \ { 11x10x0100, 11x00x0110, 11xx0001x0, 11xx010110, 11000x01x0, 11x00x01x0}, x11x0x01x0 \ { x1110x0100, x1100x0110, x11x0001x0, x11x010110, 111x0x01x0, 01100x01x0, x1100x01x0}} {} {1xxxx \ {110x0, 11xx1, 111x1}, x11xx \ {11101, 1111x, 11100}} {} {} {1011x \ {10111}, x0xx1 \ {x0011, x0101, 00xx1}} {} {1001x \ {10011, 10010, 10010}} {0x0x1 \ {010x1, 01001, 000x1}} { 0x01110011 \ { 0x01110011, 0101110011, 0001110011}} {01xxx \ {0110x, 01101, 010x1}, x10xx \ {11010, 010x1, 01001}} {xx0xx \ {x00x1, 010x0, 11001}} { xx0xx01xxx \ { xx0x101xx0, xx0x001xx1, xx01x01x0x, xx00x01x1x, xx0xx0110x, xx0xx01101, xx0xx010x1, x00x101xxx, 010x001xxx, 1100101xxx}, xx0xxx10xx \ { xx0x1x10x0, xx0x0x10x1, xx01xx100x, xx00xx101x, xx0xx11010, xx0xx010x1, xx0xx01001, x00x1x10xx, 010x0x10xx, 11001x10xx}} {x0x0x \ {00x01, x010x, x0101}, xx0xx \ {xx0x1, 010xx, 11001}} {0x1x1 \ {011x1, 01101, 001x1}, 1x01x \ {1x010, 10010, 10010}} { 0x101x0x01 \ { 0x10100x01, 0x101x0101, 0x101x0101, 01101x0x01, 01101x0x01, 00101x0x01}, 0x1x1xx0x1 \ { 0x111xx001, 0x101xx011, 0x1x1xx0x1, 0x1x1010x1, 0x1x111001, 011x1xx0x1, 01101xx0x1, 001x1xx0x1}, 1x01xxx01x \ { 1x011xx010, 1x010xx011, 1x01xxx011, 1x01x0101x, 1x010xx01x, 10010xx01x, 10010xx01x}} {111x1 \ {11111, 11101}} {000xx \ {00000, 00010, 00010}} { 000x1111x1 \ { 0001111101, 0000111111, 000x111111, 000x111101}} {xx011 \ {0x011, x1011}, x0x0x \ {00x01, 10101, 1000x}} {xxx11 \ {x1011, 1x111, x1111}, xxx0x \ {0x001, 11x00, x0x0x}} { xxx11xx011 \ { xxx110x011, xxx11x1011, x1011xx011, 1x111xx011, x1111xx011}, xxx0xx0x0x \ { xxx01x0x00, xxx00x0x01, xxx0x00x01, xxx0x10101, xxx0x1000x, 0x001x0x0x, 11x00x0x0x, x0x0xx0x0x}} {} {0x01x \ {00010, 0101x, 0001x}} {} {x1xxx \ {01100, 11x11, x111x}, 0xx01 \ {01x01, 0x101}, 1xx1x \ {10011, 10x11, 1x011}} {x00xx \ {0000x, 10011, 000x0}, 11x1x \ {11011, 1111x, 11x10}} { x00xxx1xxx \ { x00x1x1xx0, x00x0x1xx1, x001xx1x0x, x000xx1x1x, x00xx01100, x00xx11x11, x00xxx111x, 0000xx1xxx, 10011x1xxx, 000x0x1xxx}, 11x1xx1x1x \ { 11x11x1x10, 11x10x1x11, 11x1x11x11, 11x1xx111x, 11011x1x1x, 1111xx1x1x, 11x10x1x1x}, x00010xx01 \ { x000101x01, x00010x101, 000010xx01}, x001x1xx1x \ { x00111xx10, x00101xx11, x001x10011, x001x10x11, x001x1x011, 100111xx1x, 000101xx1x}, 11x1x1xx1x \ { 11x111xx10, 11x101xx11, 11x1x10011, 11x1x10x11, 11x1x1x011, 110111xx1x, 1111x1xx1x, 11x101xx1x}} {xx11x \ {0x110, 00111, 01110}, 11x11 \ {11011, 11111, 11111}} {1x0x1 \ {11011, 10011, 1x011}, xx01x \ {0x01x, 10010, xx010}} { 1x011xx111 \ { 1x01100111, 11011xx111, 10011xx111, 1x011xx111}, xx01xxx11x \ { xx011xx110, xx010xx111, xx01x0x110, xx01x00111, xx01x01110, 0x01xxx11x, 10010xx11x, xx010xx11x}, 1x01111x11 \ { 1x01111011, 1x01111111, 1x01111111, 1101111x11, 1001111x11, 1x01111x11}, xx01111x11 \ { xx01111011, xx01111111, xx01111111, 0x01111x11}} {xx10x \ {x0101, 00101, xx101}, x01x1 \ {10101, 10111, 00111}} {xxx11 \ {1x011, 0x111, x1011}} { xxx11x0111 \ { xxx1110111, xxx1100111, 1x011x0111, 0x111x0111, x1011x0111}} {1001x \ {10011, 10010, 10010}, xx010 \ {1x010, 0x010}} {00x00 \ {00100}} {} {xxxx1 \ {00001, xx111, x1111}, 0x01x \ {0x011, 01011, 00010}} {1xx1x \ {11x11, 1x011, 10111}} { 1xx11xxx11 \ { 1xx11xx111, 1xx11x1111, 11x11xxx11, 1x011xxx11, 10111xxx11}, 1xx1x0x01x \ { 1xx110x010, 1xx100x011, 1xx1x0x011, 1xx1x01011, 1xx1x00010, 11x110x01x, 1x0110x01x, 101110x01x}} {} {1x0x1 \ {110x1, 100x1, 10001}} {} {0x001 \ {00001, 01001}} {xx0xx \ {11010, x10x1, x10xx}, 0xxxx \ {01x1x, 0x101, 010x0}} { xx0010x001 \ { xx00100001, xx00101001, x10010x001, x10010x001}, 0xx010x001 \ { 0xx0100001, 0xx0101001, 0x1010x001}} {x1xxx \ {11011, x1001, x111x}, xx001 \ {x0001, x1001, 11001}} {0111x \ {01111, 01110, 01110}, xx11x \ {x111x, 1111x, 11110}} { 0111xx1x1x \ { 01111x1x10, 01110x1x11, 0111x11011, 0111xx111x, 01111x1x1x, 01110x1x1x, 01110x1x1x}, xx11xx1x1x \ { xx111x1x10, xx110x1x11, xx11x11011, xx11xx111x, x111xx1x1x, 1111xx1x1x, 11110x1x1x}} {11x0x \ {11100, 1100x, 1110x}, x1000 \ {01000}, x1x01 \ {11001, x1101}} {xx111 \ {11111, 01111}} {} {x11xx \ {111x0, 1111x}} {x0x00 \ {x0000, 00x00, 00000}, 101x1 \ {10111}, 0x11x \ {01110, 00111}} { x0x00x1100 \ { x0x0011100, x0000x1100, 00x00x1100, 00000x1100}, 101x1x11x1 \ { 10111x1101, 10101x1111, 101x111111, 10111x11x1}, 0x11xx111x \ { 0x111x1110, 0x110x1111, 0x11x11110, 0x11x1111x, 01110x111x, 00111x111x}} {xx1x0 \ {10100, 00100, 10110}, x10x0 \ {01010, 010x0, 01000}} {xx00x \ {10000, 00001, xx001}} { xx000xx100 \ { xx00010100, xx00000100, 10000xx100}, xx000x1000 \ { xx00001000, xx00001000, 10000x1000}} {000x0 \ {00000}} {01x0x \ {01x00, 01000, 01100}, x1xx0 \ {11x00, 01x00, 11000}} { 01x0000000 \ { 01x0000000, 01x0000000, 0100000000, 0110000000}, x1xx0000x0 \ { x1x1000000, x1x0000010, x1xx000000, 11x00000x0, 01x00000x0, 11000000x0}} {xx0xx \ {10011, 11001, x001x}, 1xx10 \ {11010, 10110, 1x110}} {011x0 \ {01110}, x1xxx \ {010x1, 11010, x11x1}} { 011x0xx0x0 \ { 01110xx000, 01100xx010, 011x0x0010, 01110xx0x0}, x1xxxxx0xx \ { x1xx1xx0x0, x1xx0xx0x1, x1x1xxx00x, x1x0xxx01x, x1xxx10011, x1xxx11001, x1xxxx001x, 010x1xx0xx, 11010xx0xx, x11x1xx0xx}, 011101xx10 \ { 0111011010, 0111010110, 011101x110, 011101xx10}, x1x101xx10 \ { x1x1011010, x1x1010110, x1x101x110, 110101xx10}} {0xxxx \ {0110x, 01111, 00xx1}, 000x0 \ {00000, 00010, 00010}} {} {} {} {} {} {x0001 \ {00001}} {x11x1 \ {x1101, 01101, 01111}} { x1101x0001 \ { x110100001, x1101x0001, 01101x0001}} {x001x \ {1001x, x0010, 00011}, 001xx \ {00101, 00100}} {0x000 \ {01000, 00000}} { 0x00000100 \ { 0x00000100, 0100000100, 0000000100}} {1x010 \ {11010, 10010}, 1x0xx \ {1x000, 1x0x0, 10000}, 000xx \ {00011, 00010}} {11xxx \ {11111, 11x11, 11010}, 0x1x1 \ {0x111, 001x1, 00111}} { 11x101x010 \ { 11x1011010, 11x1010010, 110101x010}, 11xxx1x0xx \ { 11xx11x0x0, 11xx01x0x1, 11x1x1x00x, 11x0x1x01x, 11xxx1x000, 11xxx1x0x0, 11xxx10000, 111111x0xx, 11x111x0xx, 110101x0xx}, 0x1x11x0x1 \ { 0x1111x001, 0x1011x011, 0x1111x0x1, 001x11x0x1, 001111x0x1}, 11xxx000xx \ { 11xx1000x0, 11xx0000x1, 11x1x0000x, 11x0x0001x, 11xxx00011, 11xxx00010, 11111000xx, 11x11000xx, 11010000xx}, 0x1x1000x1 \ { 0x11100001, 0x10100011, 0x1x100011, 0x111000x1, 001x1000x1, 00111000x1}} {x11xx \ {111xx, 01111, x110x}, xx1x1 \ {x11x1, x1111, 0x111}} {x10xx \ {1101x, x10x0, 010xx}, 1010x \ {10100}} { x10xxx11xx \ { x10x1x11x0, x10x0x11x1, x101xx110x, x100xx111x, x10xx111xx, x10xx01111, x10xxx110x, 1101xx11xx, x10x0x11xx, 010xxx11xx}, 1010xx110x \ { 10101x1100, 10100x1101, 1010x1110x, 1010xx110x, 10100x110x}, x10x1xx1x1 \ { x1011xx101, x1001xx111, x10x1x11x1, x10x1x1111, x10x10x111, 11011xx1x1, 010x1xx1x1}, 10101xx101 \ { 10101x1101}} {x0101 \ {10101}} {} {} {0x1xx \ {01100, 00100, 0x1x0}, 00x11 \ {00111, 00011, 00011}} {xx010 \ {x0010}, 1xx00 \ {10x00, 1x000, 1x000}} { xx0100x110 \ { xx0100x110, x00100x110}, 1xx000x100 \ { 1xx0001100, 1xx0000100, 1xx000x100, 10x000x100, 1x0000x100, 1x0000x100}} {11xxx \ {11000, 11x10, 1111x}} {x0xx0 \ {10110, 10xx0, x0110}} { x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011000, x0xx011x10, x0xx011110, 1011011xx0, 10xx011xx0, x011011xx0}} {001x0 \ {00100, 00110, 00110}, x01x0 \ {10110, 10100, x0100}} {} {} {} {xxx01 \ {x0x01, 0x101, 11101}} {} {0xx0x \ {00001, 0000x, 0110x}, 1xx1x \ {11010, 10x10, 10011}} {xx0x1 \ {11011, x0011, x1011}, xx1xx \ {101xx, 1111x, x1110}} { xx0010xx01 \ { xx00100001, xx00100001, xx00101101}, xx10x0xx0x \ { xx1010xx00, xx1000xx01, xx10x00001, xx10x0000x, xx10x0110x, 1010x0xx0x}, xx0111xx11 \ { xx01110011, 110111xx11, x00111xx11, x10111xx11}, xx11x1xx1x \ { xx1111xx10, xx1101xx11, xx11x11010, xx11x10x10, xx11x10011, 1011x1xx1x, 1111x1xx1x, x11101xx1x}} {xxx01 \ {1xx01, 1x101, x1001}, x0xxx \ {1010x, x00x0, 00x11}} {00x11 \ {00011, 00111}} { 00x11x0x11 \ { 00x1100x11, 00011x0x11, 00111x0x11}} {x111x \ {1111x, 0111x}, 10xx0 \ {10010, 10000}} {11x0x \ {11001, 11x00, 11x01}} { 11x0010x00 \ { 11x0010000, 11x0010x00}} {xx0x0 \ {1x010, xx010, 0x0x0}, xx0xx \ {0001x, 0000x, 110x1}, 1x1x1 \ {10101, 111x1, 1x111}} {001xx \ {0011x, 001x0, 0010x}, 00x1x \ {0011x, 0001x, 00010}} { 001x0xx0x0 \ { 00110xx000, 00100xx010, 001x01x010, 001x0xx010, 001x00x0x0, 00110xx0x0, 001x0xx0x0, 00100xx0x0}, 00x10xx010 \ { 00x101x010, 00x10xx010, 00x100x010, 00110xx010, 00010xx010, 00010xx010}, 001xxxx0xx \ { 001x1xx0x0, 001x0xx0x1, 0011xxx00x, 0010xxx01x, 001xx0001x, 001xx0000x, 001xx110x1, 0011xxx0xx, 001x0xx0xx, 0010xxx0xx}, 00x1xxx01x \ { 00x11xx010, 00x10xx011, 00x1x0001x, 00x1x11011, 0011xxx01x, 0001xxx01x, 00010xx01x}, 001x11x1x1 \ { 001111x101, 001011x111, 001x110101, 001x1111x1, 001x11x111, 001111x1x1, 001011x1x1}, 00x111x111 \ { 00x1111111, 00x111x111, 001111x111, 000111x111}} {x01xx \ {00111, x01x1, 001x0}, 1x0xx \ {10000, 110xx, 1x001}} {1xx1x \ {10111, 1xx10, 11111}} { 1xx1xx011x \ { 1xx11x0110, 1xx10x0111, 1xx1x00111, 1xx1xx0111, 1xx1x00110, 10111x011x, 1xx10x011x, 11111x011x}, 1xx1x1x01x \ { 1xx111x010, 1xx101x011, 1xx1x1101x, 101111x01x, 1xx101x01x, 111111x01x}} {1x0xx \ {1x011, 10001, 1000x}} {} {} {10x1x \ {10011, 1011x, 10x11}} {} {} {xx0xx \ {0x00x, 11000, x0011}, 00x1x \ {00x11, 00110, 00111}} {010xx \ {010x1, 0100x, 01010}} { 010xxxx0xx \ { 010x1xx0x0, 010x0xx0x1, 0101xxx00x, 0100xxx01x, 010xx0x00x, 010xx11000, 010xxx0011, 010x1xx0xx, 0100xxx0xx, 01010xx0xx}, 0101x00x1x \ { 0101100x10, 0101000x11, 0101x00x11, 0101x00110, 0101x00111, 0101100x1x, 0101000x1x}} {10xx1 \ {10001, 10x11, 10x01}, 0xx00 \ {01100, 01x00, 01000}} {0xx01 \ {0x001, 0x101, 00x01}, 1xxx1 \ {10011, 111x1, 11x01}} { 0xx0110x01 \ { 0xx0110001, 0xx0110x01, 0x00110x01, 0x10110x01, 00x0110x01}, 1xxx110xx1 \ { 1xx1110x01, 1xx0110x11, 1xxx110001, 1xxx110x11, 1xxx110x01, 1001110xx1, 111x110xx1, 11x0110xx1}} {00xx1 \ {00x11, 001x1, 00101}} {xxxx1 \ {x1xx1, 10xx1, 11101}, 1xxxx \ {10x0x, 11xx0, 1101x}} { xxxx100xx1 \ { xxx1100x01, xxx0100x11, xxxx100x11, xxxx1001x1, xxxx100101, x1xx100xx1, 10xx100xx1, 1110100xx1}, 1xxx100xx1 \ { 1xx1100x01, 1xx0100x11, 1xxx100x11, 1xxx1001x1, 1xxx100101, 10x0100xx1, 1101100xx1}} {00x00 \ {00000, 00100, 00100}} {1x100 \ {11100, 10100}, 0x0x1 \ {00011, 010x1, 00001}, 0xxx1 \ {00001, 00011, 01x01}} { 1x10000x00 \ { 1x10000000, 1x10000100, 1x10000100, 1110000x00, 1010000x00}} {xx010 \ {10010}} {x000x \ {10001, 00001, 0000x}} {} {11x0x \ {11100, 11x01, 11001}, xx000 \ {x0000, x1000, 10000}} {xxx0x \ {0xx00, x010x, 0x001}, 001x1 \ {00111, 00101, 00101}} { xxx0x11x0x \ { xxx0111x00, xxx0011x01, xxx0x11100, xxx0x11x01, xxx0x11001, 0xx0011x0x, x010x11x0x, 0x00111x0x}, 0010111x01 \ { 0010111x01, 0010111001, 0010111x01, 0010111x01}, xxx00xx000 \ { xxx00x0000, xxx00x1000, xxx0010000, 0xx00xx000, x0100xx000}} {xxxx1 \ {0x0x1, xx011, 1x011}, 010xx \ {01000, 01010, 010x0}} {0x1x1 \ {01111, 0x111, 00111}} { 0x1x1xxxx1 \ { 0x111xxx01, 0x101xxx11, 0x1x10x0x1, 0x1x1xx011, 0x1x11x011, 01111xxxx1, 0x111xxxx1, 00111xxxx1}, 0x1x1010x1 \ { 0x11101001, 0x10101011, 01111010x1, 0x111010x1, 00111010x1}} {1x010 \ {11010, 10010, 10010}, xx0xx \ {x0011, 10011, 110x1}} {0011x \ {00110, 00111}} { 001101x010 \ { 0011011010, 0011010010, 0011010010, 001101x010}, 0011xxx01x \ { 00111xx010, 00110xx011, 0011xx0011, 0011x10011, 0011x11011, 00110xx01x, 00111xx01x}} {xx0xx \ {0x011, 0000x, 11000}, 001xx \ {0011x, 00101, 00100}, 11xx1 \ {11011, 11x01}} {01x01 \ {01101}, 1xxx0 \ {10x10, 1x1x0, 1x010}} { 01x01xx001 \ { 01x0100001, 01101xx001}, 1xxx0xx0x0 \ { 1xx10xx000, 1xx00xx010, 1xxx000000, 1xxx011000, 10x10xx0x0, 1x1x0xx0x0, 1x010xx0x0}, 01x0100101 \ { 01x0100101, 0110100101}, 1xxx0001x0 \ { 1xx1000100, 1xx0000110, 1xxx000110, 1xxx000100, 10x10001x0, 1x1x0001x0, 1x010001x0}, 01x0111x01 \ { 01x0111x01, 0110111x01}} {1x1xx \ {1x1x1, 1x111, 1011x}} {0xx1x \ {0011x, 0x01x, 00x11}} { 0xx1x1x11x \ { 0xx111x110, 0xx101x111, 0xx1x1x111, 0xx1x1x111, 0xx1x1011x, 0011x1x11x, 0x01x1x11x, 00x111x11x}} {x1xx0 \ {11xx0, x1010, 11110}} {} {} {} {x111x \ {01111, x1110, 11110}} {} {x0xx1 \ {00xx1, 00x01, 00x11}, x01x0 \ {101x0, 001x0}} {x1010 \ {11010}, x0x00 \ {10000, 10x00, 10100}} { x1010x0110 \ { x101010110, x101000110, 11010x0110}, x0x00x0100 \ { x0x0010100, x0x0000100, 10000x0100, 10x00x0100, 10100x0100}} {0x00x \ {0100x, 0x001, 00001}, xx0xx \ {01000, 0001x, xx00x}} {} {} {01x1x \ {01110, 0111x, 0101x}} {x011x \ {x0111, 10110, 0011x}} { x011x01x1x \ { x011101x10, x011001x11, x011x01110, x011x0111x, x011x0101x, x011101x1x, 1011001x1x, 0011x01x1x}} {11xxx \ {11101, 11011, 11x11}} {0x0xx \ {000x1, 0x00x}, xx1xx \ {11100, 00100, 1010x}, 0x00x \ {0000x, 00000, 00000}} { 0x0xx11xxx \ { 0x0x111xx0, 0x0x011xx1, 0x01x11x0x, 0x00x11x1x, 0x0xx11101, 0x0xx11011, 0x0xx11x11, 000x111xxx, 0x00x11xxx}, xx1xx11xxx \ { xx1x111xx0, xx1x011xx1, xx11x11x0x, xx10x11x1x, xx1xx11101, xx1xx11011, xx1xx11x11, 1110011xxx, 0010011xxx, 1010x11xxx}, 0x00x11x0x \ { 0x00111x00, 0x00011x01, 0x00x11101, 0000x11x0x, 0000011x0x, 0000011x0x}} {1xx01 \ {10001, 10x01, 1x001}} {00xxx \ {001x0, 00111, 00x00}} { 00x011xx01 \ { 00x0110001, 00x0110x01, 00x011x001}} {x0101 \ {10101, 00101}} {1x010 \ {11010, 10010, 10010}, xx1xx \ {xx110, 1110x, x01xx}, 1xx11 \ {1x111, 1x011, 1x011}} { xx101x0101 \ { xx10110101, xx10100101, 11101x0101, x0101x0101}} {x0110 \ {10110}} {1xx1x \ {11x11, 1011x, 1111x}, 1xx1x \ {1xx11, 11x10, 1111x}} { 1xx10x0110 \ { 1xx1010110, 10110x0110, 11110x0110}, 1xx10x0110 \ { 1xx1010110, 11x10x0110, 11110x0110}} {} {} {} {01x0x \ {01100, 01001, 01000}, 00x0x \ {00001, 00101}} {xx101 \ {1x101, 00101}} { xx10101x01 \ { xx10101001, 1x10101x01, 0010101x01}, xx10100x01 \ { xx10100001, xx10100101, 1x10100x01, 0010100x01}} {111x1 \ {11101, 11111}} {01x1x \ {0111x, 0101x, 01010}, x1x01 \ {01101}} { 01x1111111 \ { 01x1111111, 0111111111, 0101111111}, x1x0111101 \ { x1x0111101, 0110111101}} {xx110 \ {00110, x1110, 01110}, x10xx \ {01000, 01001, 110x0}} {1x01x \ {10011, 1001x, 1x011}, xx1x0 \ {1x100, 11100, 001x0}} { 1x010xx110 \ { 1x01000110, 1x010x1110, 1x01001110, 10010xx110}, xx110xx110 \ { xx11000110, xx110x1110, xx11001110, 00110xx110}, 1x01xx101x \ { 1x011x1010, 1x010x1011, 1x01x11010, 10011x101x, 1001xx101x, 1x011x101x}, xx1x0x10x0 \ { xx110x1000, xx100x1010, xx1x001000, xx1x0110x0, 1x100x10x0, 11100x10x0, 001x0x10x0}} {x1x11 \ {x1011, 11011, 01x11}, 1x01x \ {11010, 11011, 10011}} {xx1x0 \ {11100, 01100, 0x100}} { xx1101x010 \ { xx11011010}} {0000x \ {00000, 00001}} {1x110 \ {10110}, 000x1 \ {00001, 00011}, x1xx1 \ {11111, 01001, 01x01}} { 0000100001 \ { 0000100001, 0000100001}, x1x0100001 \ { x1x0100001, 0100100001, 01x0100001}} {1xx10 \ {10110, 11010, 10x10}, x1x01 \ {11001, x1101, 01101}} {x11x1 \ {111x1, 11111, x1101}, 1x11x \ {1x111, 10110}} { 1x1101xx10 \ { 1x11010110, 1x11011010, 1x11010x10, 101101xx10}, x1101x1x01 \ { x110111001, x1101x1101, x110101101, 11101x1x01, x1101x1x01}} {0x000 \ {00000, 01000, 01000}} {1x010 \ {11010, 10010}, xx111 \ {x1111, 0x111}} {} {0x1x1 \ {0x111, 01111, 00101}} {xx10x \ {01100, 11100, x0100}} { xx1010x101 \ { xx10100101}} {0xxx0 \ {01x10, 0xx00, 000x0}} {x1xx1 \ {01011, 11x01, 011x1}, 0x101 \ {00101, 01101}, 0xxxx \ {0xx1x, 0x0xx}} { 0xxx00xxx0 \ { 0xx100xx00, 0xx000xx10, 0xxx001x10, 0xxx00xx00, 0xxx0000x0, 0xx100xxx0, 0x0x00xxx0}} {x011x \ {10111, 10110, x0110}, 1x1xx \ {1x101, 101x1, 11100}} {0000x \ {00001, 00000}, x0x1x \ {00x11, 1001x, x011x}} { x0x1xx011x \ { x0x11x0110, x0x10x0111, x0x1x10111, x0x1x10110, x0x1xx0110, 00x11x011x, 1001xx011x, x011xx011x}, 0000x1x10x \ { 000011x100, 000001x101, 0000x1x101, 0000x10101, 0000x11100, 000011x10x, 000001x10x}, x0x1x1x11x \ { x0x111x110, x0x101x111, x0x1x10111, 00x111x11x, 1001x1x11x, x011x1x11x}} {1xx00 \ {10x00, 11x00, 10100}} {x0x10 \ {10010, 10110, 00x10}, 1xx0x \ {1x000, 11000, 1x100}, xx101 \ {11101, 1x101}} { 1xx001xx00 \ { 1xx0010x00, 1xx0011x00, 1xx0010100, 1x0001xx00, 110001xx00, 1x1001xx00}} {x00xx \ {10011, x0010, 1001x}, x10x1 \ {01001, x1001, 110x1}, 01xx1 \ {01111, 010x1, 01101}} {x0xxx \ {x0010, x01xx, 00100}, xxxx0 \ {00000, xxx00, 01x10}, 0x110 \ {01110, 00110}} { x0xxxx00xx \ { x0xx1x00x0, x0xx0x00x1, x0x1xx000x, x0x0xx001x, x0xxx10011, x0xxxx0010, x0xxx1001x, x0010x00xx, x01xxx00xx, 00100x00xx}, xxxx0x00x0 \ { xxx10x0000, xxx00x0010, xxxx0x0010, xxxx010010, 00000x00x0, xxx00x00x0, 01x10x00x0}, 0x110x0010 \ { 0x110x0010, 0x11010010, 01110x0010, 00110x0010}, x0xx1x10x1 \ { x0x11x1001, x0x01x1011, x0xx101001, x0xx1x1001, x0xx1110x1, x01x1x10x1}, x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101111, x0xx1010x1, x0xx101101, x01x101xx1}} {x110x \ {1110x, 01101, 01101}} {xx10x \ {1x100, xx101, x1101}} { xx10xx110x \ { xx101x1100, xx100x1101, xx10x1110x, xx10x01101, xx10x01101, 1x100x110x, xx101x110x, x1101x110x}} {xx010 \ {x0010, x1010, 00010}} {1xxx1 \ {11101, 11xx1, 101x1}, 1xx01 \ {10x01, 11x01, 11101}} {} {1x0x1 \ {1x011, 1x001, 1x001}, 1x1xx \ {1110x, 1x111, 1x101}, 001xx \ {00111, 001x0}} {x001x \ {10010, 0001x}, 1x110 \ {10110}} { x00111x011 \ { x00111x011, 000111x011}, x001x1x11x \ { x00111x110, x00101x111, x001x1x111, 100101x11x, 0001x1x11x}, 1x1101x110 \ { 101101x110}, x001x0011x \ { x001100110, x001000111, x001x00111, x001x00110, 100100011x, 0001x0011x}, 1x11000110 \ { 1x11000110, 1011000110}} {1001x \ {10010, 10011}, x0x0x \ {0000x, 00x0x}, x0000 \ {10000, 00000}} {0x100 \ {01100}} { 0x100x0x00 \ { 0x10000000, 0x10000x00, 01100x0x00}, 0x100x0000 \ { 0x10010000, 0x10000000, 01100x0000}} {xx0x1 \ {1x001, xx001, 01001}} {0x111 \ {01111, 00111, 00111}} { 0x111xx011 \ { 01111xx011, 00111xx011, 00111xx011}} {} {100xx \ {1001x, 1000x, 100x0}} {} {x0x1x \ {0001x, 00x10, 10011}, 1x0xx \ {110xx, 110x0, 1000x}} {011xx \ {01110, 0111x, 01101}, xx1x1 \ {xx111, 00101, 01101}} { 0111xx0x1x \ { 01111x0x10, 01110x0x11, 0111x0001x, 0111x00x10, 0111x10011, 01110x0x1x, 0111xx0x1x}, xx111x0x11 \ { xx11100011, xx11110011, xx111x0x11}, 011xx1x0xx \ { 011x11x0x0, 011x01x0x1, 0111x1x00x, 0110x1x01x, 011xx110xx, 011xx110x0, 011xx1000x, 011101x0xx, 0111x1x0xx, 011011x0xx}, xx1x11x0x1 \ { xx1111x001, xx1011x011, xx1x1110x1, xx1x110001, xx1111x0x1, 001011x0x1, 011011x0x1}} {x1x1x \ {x1x10, 11x10, x1010}, 0x11x \ {00111, 01110}} {} {} {01x1x \ {01x11, 01110, 01x10}, xxxx0 \ {0x0x0, 01xx0, x00x0}} {x000x \ {10000, 00000}, 1x100 \ {10100}} { x0000xxx00 \ { x00000x000, x000001x00, x0000x0000, 10000xxx00, 00000xxx00}, 1x100xxx00 \ { 1x1000x000, 1x10001x00, 1x100x0000, 10100xxx00}} {xxx0x \ {0x000, 00001, 00x00}, 0xx11 \ {00x11, 00011, 0x011}} {x1x11 \ {01x11, x1111}, 0x011 \ {00011}} { x1x110xx11 \ { x1x1100x11, x1x1100011, x1x110x011, 01x110xx11, x11110xx11}, 0x0110xx11 \ { 0x01100x11, 0x01100011, 0x0110x011, 000110xx11}} {x0x00 \ {x0000, 00000, 00100}, x10xx \ {x10x0, 010x1, 01010}} {xx101 \ {0x101, 11101, 01101}} { xx101x1001 \ { xx10101001, 0x101x1001, 11101x1001, 01101x1001}} {xxx00 \ {xx000, 10000, x0x00}, x0x01 \ {10001, x0001}, 0x1xx \ {01110, 001x1, 01111}} {1xx11 \ {10011, 11111, 11011}, 00x11 \ {00011}} { 1xx110x111 \ { 1xx1100111, 1xx1101111, 100110x111, 111110x111, 110110x111}, 00x110x111 \ { 00x1100111, 00x1101111, 000110x111}} {x1100 \ {11100, 01100}} {0x0xx \ {00011, 01000}} { 0x000x1100 \ { 0x00011100, 0x00001100, 01000x1100}} {x0x10 \ {00x10, x0110, x0010}, x1x10 \ {11110, 01010, 01x10}} {001x1 \ {00111}, 001xx \ {0010x, 00100, 0011x}, x1x0x \ {11000, 11100, 01101}} { 00110x0x10 \ { 0011000x10, 00110x0110, 00110x0010, 00110x0x10}, 00110x1x10 \ { 0011011110, 0011001010, 0011001x10, 00110x1x10}} {x1xx0 \ {01xx0, 11100, x1110}, x100x \ {01001, 1100x, x1000}} {xx010 \ {1x010, x0010}, xx1xx \ {x01x0, 011x0, x11xx}} { xx010x1x10 \ { xx01001x10, xx010x1110, 1x010x1x10, x0010x1x10}, xx1x0x1xx0 \ { xx110x1x00, xx100x1x10, xx1x001xx0, xx1x011100, xx1x0x1110, x01x0x1xx0, 011x0x1xx0, x11x0x1xx0}, xx10xx100x \ { xx101x1000, xx100x1001, xx10x01001, xx10x1100x, xx10xx1000, x0100x100x, 01100x100x, x110xx100x}} {0xxx0 \ {0x110, 00010, 01xx0}} {x110x \ {11101, 11100, x1100}, x1x01 \ {11x01, 11001, x1001}} { x11000xx00 \ { x110001x00, 111000xx00, x11000xx00}} {00x00 \ {00100, 00000, 00000}, 00xx1 \ {00x01, 00111, 00101}} {x111x \ {x1110, 11110, 01110}, x1001 \ {11001, 01001, 01001}, 1x100 \ {10100, 11100, 11100}} { 1x10000x00 \ { 1x10000100, 1x10000000, 1x10000000, 1010000x00, 1110000x00, 1110000x00}, x111100x11 \ { x111100111}, x100100x01 \ { x100100x01, x100100101, 1100100x01, 0100100x01, 0100100x01}} {} {1xx1x \ {11011, 11x1x, 10010}, x00xx \ {10001, 10010, 00011}, 0x0x0 \ {000x0, 010x0}} {} {0x1x0 \ {0x110, 001x0, 01100}, x1000 \ {11000, 01000}, x1x0x \ {11101, 01x00, x110x}} {xx0x0 \ {x1000, 1x000, 11010}, 1xx10 \ {11110, 1x110, 10x10}, x1x01 \ {11001, 01001, 01x01}} { xx0x00x1x0 \ { xx0100x100, xx0000x110, xx0x00x110, xx0x0001x0, xx0x001100, x10000x1x0, 1x0000x1x0, 110100x1x0}, 1xx100x110 \ { 1xx100x110, 1xx1000110, 111100x110, 1x1100x110, 10x100x110}, xx000x1000 \ { xx00011000, xx00001000, x1000x1000, 1x000x1000}, xx000x1x00 \ { xx00001x00, xx000x1100, x1000x1x00, 1x000x1x00}, x1x01x1x01 \ { x1x0111101, x1x01x1101, 11001x1x01, 01001x1x01, 01x01x1x01}} {x1010 \ {11010}, xx111 \ {00111, 1x111, 10111}} {x00xx \ {00000, 000x0, 0001x}, xx010 \ {00010, 0x010, x0010}} { x0010x1010 \ { x001011010, 00010x1010, 00010x1010}, xx010x1010 \ { xx01011010, 00010x1010, 0x010x1010, x0010x1010}, x0011xx111 \ { x001100111, x00111x111, x001110111, 00011xx111}} {1x1x0 \ {101x0, 10110, 1x100}} {xx0x0 \ {1x000, x00x0, 01000}} { xx0x01x1x0 \ { xx0101x100, xx0001x110, xx0x0101x0, xx0x010110, xx0x01x100, 1x0001x1x0, x00x01x1x0, 010001x1x0}} {} {xx111 \ {10111, x1111, 0x111}, xx001 \ {00001, 01001, x1001}} {} {11x1x \ {11x10, 11011, 11110}, 11xxx \ {110x1, 1110x, 11x1x}} {xx10x \ {1x100, 0010x, 1x101}, x1xx0 \ {11xx0, 11x10, x10x0}} { x1x1011x10 \ { x1x1011x10, x1x1011110, 11x1011x10, 11x1011x10, x101011x10}, xx10x11x0x \ { xx10111x00, xx10011x01, xx10x11001, xx10x1110x, 1x10011x0x, 0010x11x0x, 1x10111x0x}, x1xx011xx0 \ { x1x1011x00, x1x0011x10, x1xx011100, x1xx011x10, 11xx011xx0, 11x1011xx0, x10x011xx0}} {101xx \ {101x1, 10100, 101x0}, 0x101 \ {00101, 01101}} {x01xx \ {101x1, 1010x, 00110}, 110x1 \ {11001}} { x01xx101xx \ { x01x1101x0, x01x0101x1, x011x1010x, x010x1011x, x01xx101x1, x01xx10100, x01xx101x0, 101x1101xx, 1010x101xx, 00110101xx}, 110x1101x1 \ { 1101110101, 1100110111, 110x1101x1, 11001101x1}, x01010x101 \ { x010100101, x010101101, 101010x101, 101010x101}, 110010x101 \ { 1100100101, 1100101101, 110010x101}} {x1xxx \ {0111x, 11x01, 01x10}, 0100x \ {01001, 01000}} {x10xx \ {010x1, x1011, 01001}, 11xxx \ {11010, 1101x, 110x0}} { x10xxx1xxx \ { x10x1x1xx0, x10x0x1xx1, x101xx1x0x, x100xx1x1x, x10xx0111x, x10xx11x01, x10xx01x10, 010x1x1xxx, x1011x1xxx, 01001x1xxx}, 11xxxx1xxx \ { 11xx1x1xx0, 11xx0x1xx1, 11x1xx1x0x, 11x0xx1x1x, 11xxx0111x, 11xxx11x01, 11xxx01x10, 11010x1xxx, 1101xx1xxx, 110x0x1xxx}, x100x0100x \ { x100101000, x100001001, x100x01001, x100x01000, 010010100x, 010010100x}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01001, 11x0x01000, 110000100x}} {x010x \ {10100, 00100, 1010x}, x1010 \ {11010, 01010, 01010}, xxx11 \ {11011, 0x011, 01x11}} {1x11x \ {1x111, 10110}, x1101 \ {01101, 11101}, 0x1xx \ {001x0, 0x100, 00100}} { x1101x0101 \ { x110110101, 01101x0101, 11101x0101}, 0x10xx010x \ { 0x101x0100, 0x100x0101, 0x10x10100, 0x10x00100, 0x10x1010x, 00100x010x, 0x100x010x, 00100x010x}, 1x110x1010 \ { 1x11011010, 1x11001010, 1x11001010, 10110x1010}, 0x110x1010 \ { 0x11011010, 0x11001010, 0x11001010, 00110x1010}, 1x111xxx11 \ { 1x11111011, 1x1110x011, 1x11101x11, 1x111xxx11}, 0x111xxx11 \ { 0x11111011, 0x1110x011, 0x11101x11}} {xx1x1 \ {01111, 111x1, 11101}} {0001x \ {00011, 00010}, 1x1x0 \ {10100, 11110, 10110}, x0101 \ {00101}} { 00011xx111 \ { 0001101111, 0001111111, 00011xx111}, x0101xx101 \ { x010111101, x010111101, 00101xx101}} {} {xxx0x \ {11101, x0x01, 00x01}, 1x011 \ {11011, 10011}} {} {0xx01 \ {01101, 00x01}} {x001x \ {10010, x0010, 10011}, 1110x \ {11100, 11101}} { 111010xx01 \ { 1110101101, 1110100x01, 111010xx01}} {xx0x0 \ {x1000, 1x0x0, x10x0}, xxxx0 \ {11010, 0xx00, 01000}} {1xxx0 \ {1x100, 11100, 11110}, 0x00x \ {01001, 01000}, 10x10 \ {10110, 10010, 10010}} { 1xxx0xx0x0 \ { 1xx10xx000, 1xx00xx010, 1xxx0x1000, 1xxx01x0x0, 1xxx0x10x0, 1x100xx0x0, 11100xx0x0, 11110xx0x0}, 0x000xx000 \ { 0x000x1000, 0x0001x000, 0x000x1000, 01000xx000}, 10x10xx010 \ { 10x101x010, 10x10x1010, 10110xx010, 10010xx010, 10010xx010}, 1xxx0xxxx0 \ { 1xx10xxx00, 1xx00xxx10, 1xxx011010, 1xxx00xx00, 1xxx001000, 1x100xxxx0, 11100xxxx0, 11110xxxx0}, 0x000xxx00 \ { 0x0000xx00, 0x00001000, 01000xxx00}, 10x10xxx10 \ { 10x1011010, 10110xxx10, 10010xxx10, 10010xxx10}} {x101x \ {11011, x1010, 0101x}, 1xxx1 \ {10001, 10011, 11x01}} {1xx0x \ {10000, 1xx01, 10001}} { 1xx011xx01 \ { 1xx0110001, 1xx0111x01, 1xx011xx01, 100011xx01}} {xxxx1 \ {0x111, 111x1, x0001}, 0x110 \ {01110, 00110}, xx001 \ {10001, x0001, 11001}} {} {} {xx101 \ {x1101}, 1x0xx \ {10001, 1000x, 11000}} {111xx \ {11101, 1110x, 11100}} { 11101xx101 \ { 11101x1101, 11101xx101, 11101xx101}, 111xx1x0xx \ { 111x11x0x0, 111x01x0x1, 1111x1x00x, 1110x1x01x, 111xx10001, 111xx1000x, 111xx11000, 111011x0xx, 1110x1x0xx, 111001x0xx}} {x0x00 \ {10x00, x0100, 00000}, 1x0x1 \ {1x001, 11011, 100x1}, x0xxx \ {x00xx, 10x1x, 00xx0}} {} {} {xxx00 \ {x1100, 0x100, xx100}, x10xx \ {010xx, 110x1, 110xx}} {0xxxx \ {00x0x, 01x01}, 10xx1 \ {10111, 10x11, 10x01}, 01x0x \ {01100, 0100x, 01101}} { 0xx00xxx00 \ { 0xx00x1100, 0xx000x100, 0xx00xx100, 00x00xxx00}, 01x00xxx00 \ { 01x00x1100, 01x000x100, 01x00xx100, 01100xxx00, 01000xxx00}, 0xxxxx10xx \ { 0xxx1x10x0, 0xxx0x10x1, 0xx1xx100x, 0xx0xx101x, 0xxxx010xx, 0xxxx110x1, 0xxxx110xx, 00x0xx10xx, 01x01x10xx}, 10xx1x10x1 \ { 10x11x1001, 10x01x1011, 10xx1010x1, 10xx1110x1, 10xx1110x1, 10111x10x1, 10x11x10x1, 10x01x10x1}, 01x0xx100x \ { 01x01x1000, 01x00x1001, 01x0x0100x, 01x0x11001, 01x0x1100x, 01100x100x, 0100xx100x, 01101x100x}} {1x0x0 \ {100x0, 11010, 10010}} {xx11x \ {x1111, x111x, xx111}, 100xx \ {1000x, 10001, 10010}} { xx1101x010 \ { xx11010010, xx11011010, xx11010010, x11101x010}, 100x01x0x0 \ { 100101x000, 100001x010, 100x0100x0, 100x011010, 100x010010, 100001x0x0, 100101x0x0}} {x10x0 \ {x1000, 11010, 11000}, 10xx0 \ {100x0, 10x10, 10110}, 101x0 \ {10100, 10110, 10110}} {x0x00 \ {00x00, x0000, 10100}} { x0x00x1000 \ { x0x00x1000, x0x0011000, 00x00x1000, x0000x1000, 10100x1000}, x0x0010x00 \ { x0x0010000, 00x0010x00, x000010x00, 1010010x00}, x0x0010100 \ { x0x0010100, 00x0010100, x000010100, 1010010100}} {0101x \ {01010, 01011, 01011}, xxxx1 \ {01001, 00011, x1011}} {0x00x \ {00001, 00000, 00000}} { 0x001xxx01 \ { 0x00101001, 00001xxx01}} {x1011 \ {11011, 01011}, x001x \ {00010, 10011, 0001x}} {0x001 \ {00001}} {} {x0xx1 \ {10x11, 10111, x00x1}, 11x0x \ {11x00, 1110x, 11101}, xx100 \ {01100, x0100, x0100}} {} {} {0x1x0 \ {00100, 0x100, 0x100}} {x0x10 \ {10x10, 00x10, 00x10}, 0000x \ {00001, 00000}, 1xx0x \ {10x00, 1110x, 1100x}} { x0x100x110 \ { 10x100x110, 00x100x110, 00x100x110}, 000000x100 \ { 0000000100, 000000x100, 000000x100, 000000x100}, 1xx000x100 \ { 1xx0000100, 1xx000x100, 1xx000x100, 10x000x100, 111000x100, 110000x100}} {x1xxx \ {01xx1, 11x01, x101x}, x01xx \ {x0100, 101xx, 0011x}} {0x001 \ {01001, 00001}, 011xx \ {011x1, 01100}} { 0x001x1x01 \ { 0x00101x01, 0x00111x01, 01001x1x01, 00001x1x01}, 011xxx1xxx \ { 011x1x1xx0, 011x0x1xx1, 0111xx1x0x, 0110xx1x1x, 011xx01xx1, 011xx11x01, 011xxx101x, 011x1x1xxx, 01100x1xxx}, 0x001x0101 \ { 0x00110101, 01001x0101, 00001x0101}, 011xxx01xx \ { 011x1x01x0, 011x0x01x1, 0111xx010x, 0110xx011x, 011xxx0100, 011xx101xx, 011xx0011x, 011x1x01xx, 01100x01xx}} {1xxxx \ {1011x, 110x0, 1010x}, xx101 \ {00101, x0101, 11101}} {1111x \ {11111, 11110}, xx000 \ {x0000, 11000, 01000}} { 1111x1xx1x \ { 111111xx10, 111101xx11, 1111x1011x, 1111x11010, 111111xx1x, 111101xx1x}, xx0001xx00 \ { xx00011000, xx00010100, x00001xx00, 110001xx00, 010001xx00}} {x1x00 \ {x1100, 11100, 01100}, xx0x0 \ {1x000, xx000, x0010}} {xx01x \ {00011, 00010, x0010}} { xx010xx010 \ { xx010x0010, 00010xx010, x0010xx010}} {11xxx \ {1100x, 11x0x, 11x01}} {} {} {xx111 \ {10111, 11111, 01111}, 1xxx0 \ {10x00, 100x0, 11000}} {x10x0 \ {x1010, 11010, 01000}, 10xx1 \ {100x1, 10001}} { 10x11xx111 \ { 10x1110111, 10x1111111, 10x1101111, 10011xx111}, x10x01xxx0 \ { x10101xx00, x10001xx10, x10x010x00, x10x0100x0, x10x011000, x10101xxx0, 110101xxx0, 010001xxx0}} {x11x0 \ {01110, 11110, 11100}, x1xx1 \ {01001, x1x11, x1001}} {10x1x \ {1011x, 10x10, 10110}, x11xx \ {x110x, 111xx, 011xx}} { 10x10x1110 \ { 10x1001110, 10x1011110, 10110x1110, 10x10x1110, 10110x1110}, x11x0x11x0 \ { x1110x1100, x1100x1110, x11x001110, x11x011110, x11x011100, x1100x11x0, 111x0x11x0, 011x0x11x0}, 10x11x1x11 \ { 10x11x1x11, 10111x1x11}, x11x1x1xx1 \ { x1111x1x01, x1101x1x11, x11x101001, x11x1x1x11, x11x1x1001, x1101x1xx1, 111x1x1xx1, 011x1x1xx1}} {xx110 \ {00110, x0110, 1x110}, 1x01x \ {1x010, 10011}} {00x0x \ {0000x, 00001, 00x01}} {} {xx1x1 \ {x1111, 10111, x0101}, 100x0 \ {10000, 10010}} {x1x1x \ {01x10, x1010, x111x}, 1x00x \ {1000x, 1x001, 10001}, 0x00x \ {0x001, 0100x, 00001}} { x1x11xx111 \ { x1x11x1111, x1x1110111, x1111xx111}, 1x001xx101 \ { 1x001x0101, 10001xx101, 1x001xx101, 10001xx101}, 0x001xx101 \ { 0x001x0101, 0x001xx101, 01001xx101, 00001xx101}, x1x1010010 \ { x1x1010010, 01x1010010, x101010010, x111010010}, 1x00010000 \ { 1x00010000, 1000010000}, 0x00010000 \ { 0x00010000, 0100010000}} {x10x1 \ {01001, x1011, 11011}, 01x11 \ {01011, 01111}} {xx100 \ {x1100, 11100}, xx00x \ {0100x, 00000, 1x000}} { xx001x1001 \ { xx00101001, 01001x1001}} {x0x11 \ {x0111, 10111, 00x11}} {xx1xx \ {011x0, 001x0, 1111x}, xxxx1 \ {0x111, 110x1, x10x1}} { xx111x0x11 \ { xx111x0111, xx11110111, xx11100x11, 11111x0x11}, xxx11x0x11 \ { xxx11x0111, xxx1110111, xxx1100x11, 0x111x0x11, 11011x0x11, x1011x0x11}} {xxxx0 \ {01100, xx010, 1x010}} {} {} {} {1x1x0 \ {11110, 111x0, 111x0}, 01xxx \ {01x1x, 01xx1, 011x0}} {} {110x0 \ {11000}, x0100 \ {00100}} {} {} {x1x0x \ {01101, 11101, x1101}} {xxxxx \ {1xx11, 011x1, 01xx0}, 01x01 \ {01001}, x011x \ {10111, x0110, 00111}} { xxx0xx1x0x \ { xxx01x1x00, xxx00x1x01, xxx0x01101, xxx0x11101, xxx0xx1101, 01101x1x0x, 01x00x1x0x}, 01x01x1x01 \ { 01x0101101, 01x0111101, 01x01x1101, 01001x1x01}} {xx0xx \ {x1010, xx00x, 1x011}} {01x0x \ {01000, 01001, 01x00}} { 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0xxx00x, 01000xx00x, 01001xx00x, 01x00xx00x}} {1x0xx \ {1101x, 1x010, 11011}} {010xx \ {0101x, 01000, 010x0}, 101x1 \ {10111, 10101}} { 010xx1x0xx \ { 010x11x0x0, 010x01x0x1, 0101x1x00x, 0100x1x01x, 010xx1101x, 010xx1x010, 010xx11011, 0101x1x0xx, 010001x0xx, 010x01x0xx}, 101x11x0x1 \ { 101111x001, 101011x011, 101x111011, 101x111011, 101111x0x1, 101011x0x1}} {10x01 \ {10101, 10001}, xx011 \ {01011, 10011}, xx0x1 \ {1x0x1, xx001, x1001}} {0xx00 \ {01100, 01x00, 0x000}, 0x10x \ {00101, 0010x, 01100}} { 0x10110x01 \ { 0x10110101, 0x10110001, 0010110x01, 0010110x01}, 0x101xx001 \ { 0x1011x001, 0x101xx001, 0x101x1001, 00101xx001, 00101xx001}} {0xx11 \ {00011, 0x011, 0x011}, 11x1x \ {11010, 1111x, 11110}, x0x1x \ {10111, x0011, x001x}} {0xx11 \ {01x11, 00011, 00111}, 1x00x \ {1x000, 1x001, 10001}} { 0xx110xx11 \ { 0xx1100011, 0xx110x011, 0xx110x011, 01x110xx11, 000110xx11, 001110xx11}, 0xx1111x11 \ { 0xx1111111, 01x1111x11, 0001111x11, 0011111x11}, 0xx11x0x11 \ { 0xx1110111, 0xx11x0011, 0xx11x0011, 01x11x0x11, 00011x0x11, 00111x0x11}} {x001x \ {0001x, x0010, 10010}, 1xxxx \ {1x11x, 11111, 110xx}} {x1x11 \ {x1111, 11011, 11x11}, xxxx1 \ {001x1, x0001, x1x01}} { x1x11x0011 \ { x1x1100011, x1111x0011, 11011x0011, 11x11x0011}, xxx11x0011 \ { xxx1100011, 00111x0011}, x1x111xx11 \ { x1x111x111, x1x1111111, x1x1111011, x11111xx11, 110111xx11, 11x111xx11}, xxxx11xxx1 \ { xxx111xx01, xxx011xx11, xxxx11x111, xxxx111111, xxxx1110x1, 001x11xxx1, x00011xxx1, x1x011xxx1}} {xx1xx \ {111xx, 10111, 0111x}, xxxx1 \ {01001, 10x01, 00x01}} {} {} {0x01x \ {00011, 0001x, 0101x}, x011x \ {0011x, 10111}, x11x0 \ {011x0, 11110, 11100}} {110x0 \ {11010, 11000}, 10xx1 \ {101x1, 10011}} { 110100x010 \ { 1101000010, 1101001010, 110100x010}, 10x110x011 \ { 10x1100011, 10x1100011, 10x1101011, 101110x011, 100110x011}, 11010x0110 \ { 1101000110, 11010x0110}, 10x11x0111 \ { 10x1100111, 10x1110111, 10111x0111, 10011x0111}, 110x0x11x0 \ { 11010x1100, 11000x1110, 110x0011x0, 110x011110, 110x011100, 11010x11x0, 11000x11x0}} {11x10 \ {11110, 11010}, x1x1x \ {11111, 01x1x, 01111}} {000xx \ {00010, 0001x, 000x0}} { 0001011x10 \ { 0001011110, 0001011010, 0001011x10, 0001011x10, 0001011x10}, 0001xx1x1x \ { 00011x1x10, 00010x1x11, 0001x11111, 0001x01x1x, 0001x01111, 00010x1x1x, 0001xx1x1x, 00010x1x1x}} {} {x1x1x \ {01011, 1101x, 01111}, xx10x \ {11100, 1110x, x0101}} {} {x1010 \ {11010}, x110x \ {11100, x1100, 11101}} {x001x \ {10011, 0001x, 00010}, x10x1 \ {11001, 110x1, 11011}} { x0010x1010 \ { x001011010, 00010x1010, 00010x1010}, x1001x1101 \ { x100111101, 11001x1101, 11001x1101}} {xxx0x \ {1100x, 0x10x, 0xx01}} {111x0 \ {11100, 11110}} { 11100xxx00 \ { 1110011000, 111000x100, 11100xxx00}} {011xx \ {0111x, 0110x, 01110}, xxx10 \ {1x110, x1010, 01110}, 0x0x0 \ {00010, 01010}} {x1100 \ {01100}, x1xxx \ {01100, 11x1x, x1xx1}} { x110001100 \ { x110001100, 0110001100}, x1xxx011xx \ { x1xx1011x0, x1xx0011x1, x1x1x0110x, x1x0x0111x, x1xxx0111x, x1xxx0110x, x1xxx01110, 01100011xx, 11x1x011xx, x1xx1011xx}, x1x10xxx10 \ { x1x101x110, x1x10x1010, x1x1001110, 11x10xxx10}, x11000x000 \ { 011000x000}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx000010, x1xx001010, 011000x0x0, 11x100x0x0}} {01xxx \ {0110x, 01x0x, 01111}} {0x1x0 \ {01100, 0x100, 001x0}, 0x0x0 \ {00000, 000x0}, 1xx11 \ {10x11, 1x111, 10011}} { 0x1x001xx0 \ { 0x11001x00, 0x10001x10, 0x1x001100, 0x1x001x00, 0110001xx0, 0x10001xx0, 001x001xx0}, 0x0x001xx0 \ { 0x01001x00, 0x00001x10, 0x0x001100, 0x0x001x00, 0000001xx0, 000x001xx0}, 1xx1101x11 \ { 1xx1101111, 10x1101x11, 1x11101x11, 1001101x11}} {x101x \ {01011, 1101x, 0101x}, x0xx1 \ {00101, 000x1, 10x01}} {1xx0x \ {10100, 1x100, 1000x}} { 1xx01x0x01 \ { 1xx0100101, 1xx0100001, 1xx0110x01, 10001x0x01}} {x111x \ {0111x, 11110, 01111}, x0xx1 \ {x00x1, x0x01, 10001}, x0100 \ {00100, 10100}} {x01xx \ {x011x, x0110, 10100}, 0001x \ {00010, 00011}} { x011xx111x \ { x0111x1110, x0110x1111, x011x0111x, x011x11110, x011x01111, x011xx111x, x0110x111x}, 0001xx111x \ { 00011x1110, 00010x1111, 0001x0111x, 0001x11110, 0001x01111, 00010x111x, 00011x111x}, x01x1x0xx1 \ { x0111x0x01, x0101x0x11, x01x1x00x1, x01x1x0x01, x01x110001, x0111x0xx1}, 00011x0x11 \ { 00011x0011, 00011x0x11}, x0100x0100 \ { x010000100, x010010100, 10100x0100}} {x0xx0 \ {100x0, 00x10, 00x10}} {xxxx1 \ {x0xx1, x1001, 011x1}, x1100 \ {11100, 01100}, x0000 \ {00000}} { x1100x0x00 \ { x110010000, 11100x0x00, 01100x0x00}, x0000x0x00 \ { x000010000, 00000x0x00}} {1xx0x \ {10101, 11101, 1x10x}, x11xx \ {11111, 0110x, 111x0}, 0x10x \ {0x101, 00100, 00100}} {000xx \ {0000x, 00001, 00011}, x00x1 \ {00011, 000x1, x0001}} { 0000x1xx0x \ { 000011xx00, 000001xx01, 0000x10101, 0000x11101, 0000x1x10x, 0000x1xx0x, 000011xx0x}, x00011xx01 \ { x000110101, x000111101, x00011x101, 000011xx01, x00011xx01}, 000xxx11xx \ { 000x1x11x0, 000x0x11x1, 0001xx110x, 0000xx111x, 000xx11111, 000xx0110x, 000xx111x0, 0000xx11xx, 00001x11xx, 00011x11xx}, x00x1x11x1 \ { x0011x1101, x0001x1111, x00x111111, x00x101101, 00011x11x1, 000x1x11x1, x0001x11x1}, 0000x0x10x \ { 000010x100, 000000x101, 0000x0x101, 0000x00100, 0000x00100, 0000x0x10x, 000010x10x}, x00010x101 \ { x00010x101, 000010x101, x00010x101}} {1x1xx \ {1010x, 1x110, 10100}, x11x1 \ {01101, x1101, 011x1}} {00xx1 \ {00101, 00001, 00x11}} { 00xx11x1x1 \ { 00x111x101, 00x011x111, 00xx110101, 001011x1x1, 000011x1x1, 00x111x1x1}, 00xx1x11x1 \ { 00x11x1101, 00x01x1111, 00xx101101, 00xx1x1101, 00xx1011x1, 00101x11x1, 00001x11x1, 00x11x11x1}} {0xx0x \ {00101, 0x101, 0xx00}} {xxx1x \ {x1111, 00011}} {} {xx0x0 \ {10000, 1x010, 1x0x0}} {x0x00 \ {10x00, x0000, 10000}} { x0x00xx000 \ { x0x0010000, x0x001x000, 10x00xx000, x0000xx000, 10000xx000}} {01x0x \ {0110x, 01000, 01101}} {x011x \ {00110, 10111, 1011x}, xx1x1 \ {001x1, xx111, x01x1}} { xx10101x01 \ { xx10101101, xx10101101, 0010101x01, x010101x01}} {} {x0xx1 \ {10101, 00011, 00xx1}, 0xx1x \ {0001x, 0xx10, 0x110}} {} {01xx1 \ {01001, 01111, 01011}} {x00x1 \ {x0011, 00001, 000x1}, 0x1x1 \ {0x101, 01101}} { x00x101xx1 \ { x001101x01, x000101x11, x00x101001, x00x101111, x00x101011, x001101xx1, 0000101xx1, 000x101xx1}, 0x1x101xx1 \ { 0x11101x01, 0x10101x11, 0x1x101001, 0x1x101111, 0x1x101011, 0x10101xx1, 0110101xx1}} {x0xx1 \ {10001, 10101, 101x1}, 000xx \ {00001, 00000}} {x1x1x \ {11111, 01x1x, 01x1x}, x00xx \ {1001x, x0010, x0010}, 1xx01 \ {1x001, 10101}} { x1x11x0x11 \ { x1x1110111, 11111x0x11, 01x11x0x11, 01x11x0x11}, x00x1x0xx1 \ { x0011x0x01, x0001x0x11, x00x110001, x00x110101, x00x1101x1, 10011x0xx1}, 1xx01x0x01 \ { 1xx0110001, 1xx0110101, 1xx0110101, 1x001x0x01, 10101x0x01}, x1x1x0001x \ { x1x1100010, x1x1000011, 111110001x, 01x1x0001x, 01x1x0001x}, x00xx000xx \ { x00x1000x0, x00x0000x1, x001x0000x, x000x0001x, x00xx00001, x00xx00000, 1001x000xx, x0010000xx, x0010000xx}, 1xx0100001 \ { 1xx0100001, 1x00100001, 1010100001}} {1xxx1 \ {1x1x1, 11011}, x1xx0 \ {01x10, 11100, 111x0}} {0x101 \ {00101}} { 0x1011xx01 \ { 0x1011x101, 001011xx01}} {1010x \ {10101, 10100, 10100}, x0x01 \ {10101, 00x01}} {xxxxx \ {001x0, 11100, 1xx10}, xx0x1 \ {1x001, 01011, 00011}} { xxx0x1010x \ { xxx0110100, xxx0010101, xxx0x10101, xxx0x10100, xxx0x10100, 001001010x, 111001010x}, xx00110101 \ { xx00110101, 1x00110101}, xxx01x0x01 \ { xxx0110101, xxx0100x01}, xx001x0x01 \ { xx00110101, xx00100x01, 1x001x0x01}} {1xx00 \ {10100, 1x000, 11100}, 11xxx \ {11x11, 111x0, 11100}} {xx011 \ {00011, 01011, x0011}, xx1x1 \ {x11x1, 10111, 11101}} { xx01111x11 \ { xx01111x11, 0001111x11, 0101111x11, x001111x11}, xx1x111xx1 \ { xx11111x01, xx10111x11, xx1x111x11, x11x111xx1, 1011111xx1, 1110111xx1}} {} {0x100 \ {01100}, 10xx0 \ {101x0, 10x10}, 00xx1 \ {00111, 00x11, 00001}} {} {x00xx \ {100x0, x0000, x001x}, 11x00 \ {11000}} {x10x0 \ {01010, 010x0, x1010}} { x10x0x00x0 \ { x1010x0000, x1000x0010, x10x0100x0, x10x0x0000, x10x0x0010, 01010x00x0, 010x0x00x0, x1010x00x0}, x100011x00 \ { x100011000, 0100011x00}} {x11x0 \ {11110, 011x0}} {} {} {0xx11 \ {0x111, 00011, 00x11}, x1000 \ {01000, 11000}} {001x1 \ {00111, 00101}, xx111 \ {0x111, x1111}} { 001110xx11 \ { 001110x111, 0011100011, 0011100x11, 001110xx11}, xx1110xx11 \ { xx1110x111, xx11100011, xx11100x11, 0x1110xx11, x11110xx11}} {0x1xx \ {0x110, 01101}, x1x1x \ {11x1x, 01x11, 11011}} {x01x0 \ {10110, 00100, 101x0}, xx1x0 \ {1x1x0, 111x0, 1x110}} { x01x00x1x0 \ { x01100x100, x01000x110, x01x00x110, 101100x1x0, 001000x1x0, 101x00x1x0}, xx1x00x1x0 \ { xx1100x100, xx1000x110, xx1x00x110, 1x1x00x1x0, 111x00x1x0, 1x1100x1x0}, x0110x1x10 \ { x011011x10, 10110x1x10, 10110x1x10}, xx110x1x10 \ { xx11011x10, 1x110x1x10, 11110x1x10, 1x110x1x10}} {xxx10 \ {11x10, 00110, xx010}, 10x00 \ {10000}} {xx111 \ {x0111, 01111, 00111}} {} {x11x0 \ {011x0, 11100, x1110}, x01xx \ {001x0, 10100, x0100}, 000xx \ {000x1, 0000x, 00000}} {x100x \ {0100x, 01001}, 11x1x \ {11111, 11011, 11010}} { x1000x1100 \ { x100001100, x100011100, 01000x1100}, 11x10x1110 \ { 11x1001110, 11x10x1110, 11010x1110}, x100xx010x \ { x1001x0100, x1000x0101, x100x00100, x100x10100, x100xx0100, 0100xx010x, 01001x010x}, 11x1xx011x \ { 11x11x0110, 11x10x0111, 11x1x00110, 11111x011x, 11011x011x, 11010x011x}, x100x0000x \ { x100100000, x100000001, x100x00001, x100x0000x, x100x00000, 0100x0000x, 010010000x}, 11x1x0001x \ { 11x1100010, 11x1000011, 11x1x00011, 111110001x, 110110001x, 110100001x}} {x0xx0 \ {000x0, 00x10, x0x10}, 1xx01 \ {1x001, 11x01, 1x101}} {} {} {xx01x \ {00010, 1001x, xx011}} {} {} {xx000 \ {x1000, 1x000, 00000}, x1xxx \ {0100x, 11x11, 11101}, 0x1xx \ {001x0, 0x110, 0x1x0}} {xxx01 \ {10101, 00x01}} { xxx01x1x01 \ { xxx0101001, xxx0111101, 10101x1x01, 00x01x1x01}, xxx010x101 \ { 101010x101, 00x010x101}} {x1xx1 \ {x1x11, x1101, 01x01}, 0x0xx \ {010x0, 0x01x, 00000}} {0xxx0 \ {0x0x0, 011x0, 0xx00}} { 0xxx00x0x0 \ { 0xx100x000, 0xx000x010, 0xxx0010x0, 0xxx00x010, 0xxx000000, 0x0x00x0x0, 011x00x0x0, 0xx000x0x0}} {11x01 \ {11101, 11001}} {0x0x0 \ {00000, 0x000, 000x0}} {} {1x10x \ {1x101, 1110x, 1110x}} {0x1x0 \ {00100, 0x100, 0x110}} { 0x1001x100 \ { 0x10011100, 0x10011100, 001001x100, 0x1001x100}} {00x0x \ {00100, 00x00}} {1100x \ {11001, 11000, 11000}} { 1100x00x0x \ { 1100100x00, 1100000x01, 1100x00100, 1100x00x00, 1100100x0x, 1100000x0x, 1100000x0x}} {000x0 \ {00000, 00010, 00010}} {xx10x \ {xx101, 10101, 1x101}} { xx10000000 \ { xx10000000}} {0x0x0 \ {000x0, 0x000, 00010}} {x1x10 \ {11x10, 11110, 11110}, 01xxx \ {0101x, 010x0, 01101}} { x1x100x010 \ { x1x1000010, x1x1000010, 11x100x010, 111100x010, 111100x010}, 01xx00x0x0 \ { 01x100x000, 01x000x010, 01xx0000x0, 01xx00x000, 01xx000010, 010100x0x0, 010x00x0x0}} {00xx0 \ {00010, 000x0, 00100}, xx000 \ {00000}} {00xx0 \ {001x0, 00x10, 00x10}, 0xx1x \ {01x11, 0111x, 01011}} { 00xx000xx0 \ { 00x1000x00, 00x0000x10, 00xx000010, 00xx0000x0, 00xx000100, 001x000xx0, 00x1000xx0, 00x1000xx0}, 0xx1000x10 \ { 0xx1000010, 0xx1000010, 0111000x10}, 00x00xx000 \ { 00x0000000, 00100xx000}} {1111x \ {11111, 11110, 11110}, 0x1x1 \ {011x1, 001x1, 01111}, 110x1 \ {11001, 11011}} {001xx \ {001x1, 00111, 001x0}} { 0011x1111x \ { 0011111110, 0011011111, 0011x11111, 0011x11110, 0011x11110, 001111111x, 001111111x, 001101111x}, 001x10x1x1 \ { 001110x101, 001010x111, 001x1011x1, 001x1001x1, 001x101111, 001x10x1x1, 001110x1x1}, 001x1110x1 \ { 0011111001, 0010111011, 001x111001, 001x111011, 001x1110x1, 00111110x1}} {x1001 \ {11001, 01001}, 010x1 \ {01001}} {xx1xx \ {01110, 01101, xx1x1}} { xx101x1001 \ { xx10111001, xx10101001, 01101x1001, xx101x1001}, xx1x1010x1 \ { xx11101001, xx10101011, xx1x101001, 01101010x1, xx1x1010x1}} {1x11x \ {11111, 11110, 1111x}, 11x11 \ {11011, 11111}} {01xx1 \ {01011, 010x1}, 1xx0x \ {1xx00, 10100, 1x10x}} { 01x111x111 \ { 01x1111111, 01x1111111, 010111x111, 010111x111}, 01x1111x11 \ { 01x1111011, 01x1111111, 0101111x11, 0101111x11}} {} {x00xx \ {x0000, 1001x, 1001x}} {} {xx111 \ {10111, 00111}, xxx0x \ {0x00x, x0x00, 11x0x}, 11x11 \ {11011}} {00x0x \ {00100, 00x01, 00000}, x10x0 \ {x1010, 11000, 11010}, 010x0 \ {01000, 01010}} { 00x0xxxx0x \ { 00x01xxx00, 00x00xxx01, 00x0x0x00x, 00x0xx0x00, 00x0x11x0x, 00100xxx0x, 00x01xxx0x, 00000xxx0x}, x1000xxx00 \ { x10000x000, x1000x0x00, x100011x00, 11000xxx00}, 01000xxx00 \ { 010000x000, 01000x0x00, 0100011x00, 01000xxx00}} {xx01x \ {0001x, 1x010, xx010}} {1xxx1 \ {10x01, 11001, 110x1}, 1xx1x \ {10011, 10010, 1x011}} { 1xx11xx011 \ { 1xx1100011, 11011xx011}, 1xx1xxx01x \ { 1xx11xx010, 1xx10xx011, 1xx1x0001x, 1xx1x1x010, 1xx1xxx010, 10011xx01x, 10010xx01x, 1x011xx01x}} {10x10 \ {10110, 10010}, 00x1x \ {00010, 00011, 00110}, 10x11 \ {10011, 10111, 10111}} {} {} {x1x10 \ {11110, 01x10, x1110}, xx0xx \ {010x0, 0001x, x001x}} {x111x \ {01111, x1111, 1111x}, x1x10 \ {01010, 11010}, x0101 \ {00101}} { x1110x1x10 \ { x111011110, x111001x10, x1110x1110, 11110x1x10}, x1x10x1x10 \ { x1x1011110, x1x1001x10, x1x10x1110, 01010x1x10, 11010x1x10}, x111xxx01x \ { x1111xx010, x1110xx011, x111x01010, x111x0001x, x111xx001x, 01111xx01x, x1111xx01x, 1111xxx01x}, x1x10xx010 \ { x1x1001010, x1x1000010, x1x10x0010, 01010xx010, 11010xx010}, x0101xx001 \ { 00101xx001}} {1xx11 \ {1x111, 10011}, 000x0 \ {00000}} {xx1xx \ {0x10x, xx11x, 0111x}, 1x0x0 \ {11010, 110x0, 100x0}} { xx1111xx11 \ { xx1111x111, xx11110011, xx1111xx11, 011111xx11}, xx1x0000x0 \ { xx11000000, xx10000010, xx1x000000, 0x100000x0, xx110000x0, 01110000x0}, 1x0x0000x0 \ { 1x01000000, 1x00000010, 1x0x000000, 11010000x0, 110x0000x0, 100x0000x0}} {10xx1 \ {10001, 100x1, 10111}, x11xx \ {x11x1, 01100, 11100}} {1xx11 \ {1x011, 10x11, 11x11}, x11x1 \ {11111, 111x1, x1111}, xxx01 \ {xx001, 0x001, 0x001}} { 1xx1110x11 \ { 1xx1110011, 1xx1110111, 1x01110x11, 10x1110x11, 11x1110x11}, x11x110xx1 \ { x111110x01, x110110x11, x11x110001, x11x1100x1, x11x110111, 1111110xx1, 111x110xx1, x111110xx1}, xxx0110x01 \ { xxx0110001, xxx0110001, xx00110x01, 0x00110x01, 0x00110x01}, 1xx11x1111 \ { 1xx11x1111, 1x011x1111, 10x11x1111, 11x11x1111}, x11x1x11x1 \ { x1111x1101, x1101x1111, x11x1x11x1, 11111x11x1, 111x1x11x1, x1111x11x1}, xxx01x1101 \ { xxx01x1101, xx001x1101, 0x001x1101, 0x001x1101}} {0xxx1 \ {000x1, 0xx01, 01x11}, 0x00x \ {01000, 0100x}, x111x \ {01111, x1110, 0111x}} {} {} {x1x01 \ {11x01, 01001, 01x01}, 0x0x0 \ {000x0, 0x010, 01000}} {00xxx \ {00100, 0010x, 000x0}, 011xx \ {0110x, 01110, 01100}, x10xx \ {01010, 11011, 110xx}} { 00x01x1x01 \ { 00x0111x01, 00x0101001, 00x0101x01, 00101x1x01}, 01101x1x01 \ { 0110111x01, 0110101001, 0110101x01, 01101x1x01}, x1001x1x01 \ { x100111x01, x100101001, x100101x01, 11001x1x01}, 00xx00x0x0 \ { 00x100x000, 00x000x010, 00xx0000x0, 00xx00x010, 00xx001000, 001000x0x0, 001000x0x0, 000x00x0x0}, 011x00x0x0 \ { 011100x000, 011000x010, 011x0000x0, 011x00x010, 011x001000, 011000x0x0, 011100x0x0, 011000x0x0}, x10x00x0x0 \ { x10100x000, x10000x010, x10x0000x0, x10x00x010, x10x001000, 010100x0x0, 110x00x0x0}} {010xx \ {01010, 01000, 01011}} {xx011 \ {x0011, 01011, 10011}, 0xx11 \ {0x111, 01011, 00111}, 11xxx \ {11x1x, 1101x, 11101}} { xx01101011 \ { xx01101011, x001101011, 0101101011, 1001101011}, 0xx1101011 \ { 0xx1101011, 0x11101011, 0101101011, 0011101011}, 11xxx010xx \ { 11xx1010x0, 11xx0010x1, 11x1x0100x, 11x0x0101x, 11xxx01010, 11xxx01000, 11xxx01011, 11x1x010xx, 1101x010xx, 11101010xx}} {010x0 \ {01000, 01010}, x10xx \ {01011, 010xx, 1100x}, xx11x \ {xx110, 1x11x, 0x110}} {1x10x \ {11101, 1010x}} { 1x10001000 \ { 1x10001000, 1010001000}, 1x10xx100x \ { 1x101x1000, 1x100x1001, 1x10x0100x, 1x10x1100x, 11101x100x, 1010xx100x}} {11xx1 \ {110x1, 111x1, 11101}, 0xxxx \ {01x0x, 001xx, 0101x}} {10xx1 \ {10x11, 101x1, 10111}} { 10xx111xx1 \ { 10x1111x01, 10x0111x11, 10xx1110x1, 10xx1111x1, 10xx111101, 10x1111xx1, 101x111xx1, 1011111xx1}, 10xx10xxx1 \ { 10x110xx01, 10x010xx11, 10xx101x01, 10xx1001x1, 10xx101011, 10x110xxx1, 101x10xxx1, 101110xxx1}} {1xxxx \ {10x11, 1x011, 1011x}, 1x1x0 \ {11110, 11100}} {0x1xx \ {0x100, 01100, 0111x}} { 0x1xx1xxxx \ { 0x1x11xxx0, 0x1x01xxx1, 0x11x1xx0x, 0x10x1xx1x, 0x1xx10x11, 0x1xx1x011, 0x1xx1011x, 0x1001xxxx, 011001xxxx, 0111x1xxxx}, 0x1x01x1x0 \ { 0x1101x100, 0x1001x110, 0x1x011110, 0x1x011100, 0x1001x1x0, 011001x1x0, 011101x1x0}} {1x11x \ {1x111, 1x110, 1x110}} {} {} {xx0x1 \ {1x011, 01001, xx001}, 01x10 \ {01010}} {1111x \ {11111, 11110}} { 11111xx011 \ { 111111x011, 11111xx011}, 1111001x10 \ { 1111001010, 1111001x10}} {x110x \ {1110x, 0110x}, x1xxx \ {x10x0, 01x1x, 11011}, 0x010 \ {01010, 00010}} {x10x1 \ {11001, x1011, x1011}} { x1001x1101 \ { x100111101, x100101101, 11001x1101}, x10x1x1xx1 \ { x1011x1x01, x1001x1x11, x10x101x11, x10x111011, 11001x1xx1, x1011x1xx1, x1011x1xx1}} {x01xx \ {x0100, x0101, 00101}} {11x1x \ {1111x, 11x10}} { 11x1xx011x \ { 11x11x0110, 11x10x0111, 1111xx011x, 11x10x011x}} {x1xx1 \ {011x1, x1x11, 01101}} {0x110 \ {00110, 01110}, xx100 \ {01100, 10100}, 10xx1 \ {10001, 10011, 10111}} { 10xx1x1xx1 \ { 10x11x1x01, 10x01x1x11, 10xx1011x1, 10xx1x1x11, 10xx101101, 10001x1xx1, 10011x1xx1, 10111x1xx1}} {} {001xx \ {00110, 0010x, 00101}} {} {1x00x \ {1x000, 11001, 10001}, 1x111 \ {11111, 10111}} {xxxx1 \ {0x111, 11x01, x1x01}, 101x1 \ {10111, 10101}, x00xx \ {000x0, x0001, 0001x}} { xxx011x001 \ { xxx0111001, xxx0110001, 11x011x001, x1x011x001}, 101011x001 \ { 1010111001, 1010110001, 101011x001}, x000x1x00x \ { x00011x000, x00001x001, x000x1x000, x000x11001, x000x10001, 000001x00x, x00011x00x}, xxx111x111 \ { xxx1111111, xxx1110111, 0x1111x111}, 101111x111 \ { 1011111111, 1011110111, 101111x111}, x00111x111 \ { x001111111, x001110111, 000111x111}} {} {1x11x \ {1111x, 1x111, 1011x}, xx10x \ {0x10x, 11101, 11100}} {} {x0xx1 \ {x0x01, 100x1, 00x01}, x11xx \ {x1101, 0111x, 11100}} {01x10 \ {01110, 01010}, 1xxxx \ {10100, 10x10, 10000}} { 1xxx1x0xx1 \ { 1xx11x0x01, 1xx01x0x11, 1xxx1x0x01, 1xxx1100x1, 1xxx100x01}, 01x10x1110 \ { 01x1001110, 01110x1110, 01010x1110}, 1xxxxx11xx \ { 1xxx1x11x0, 1xxx0x11x1, 1xx1xx110x, 1xx0xx111x, 1xxxxx1101, 1xxxx0111x, 1xxxx11100, 10100x11xx, 10x10x11xx, 10000x11xx}} {00xx0 \ {00100, 001x0, 000x0}} {x10xx \ {110xx, 11011, x1011}, 000x0 \ {00000, 00010, 00010}} { x10x000xx0 \ { x101000x00, x100000x10, x10x000100, x10x0001x0, x10x0000x0, 110x000xx0}, 000x000xx0 \ { 0001000x00, 0000000x10, 000x000100, 000x0001x0, 000x0000x0, 0000000xx0, 0001000xx0, 0001000xx0}} {0xxx1 \ {0xx11, 0x0x1, 0x1x1}} {x101x \ {x1010, 1101x, 0101x}, x1xx1 \ {x11x1, 11001, 11x01}} { x10110xx11 \ { x10110xx11, x10110x011, x10110x111, 110110xx11, 010110xx11}, x1xx10xxx1 \ { x1x110xx01, x1x010xx11, x1xx10xx11, x1xx10x0x1, x1xx10x1x1, x11x10xxx1, 110010xxx1, 11x010xxx1}} {x0100 \ {00100, 10100, 10100}} {} {} {0x10x \ {0x100, 00100, 00100}, xx010 \ {11010, 00010, x1010}, x0x10 \ {x0010, 00110, x0110}} {xxx01 \ {01x01, 10101, 11101}, 0xx10 \ {0x110, 00010, 01110}} { xxx010x101 \ { 01x010x101, 101010x101, 111010x101}, 0xx10xx010 \ { 0xx1011010, 0xx1000010, 0xx10x1010, 0x110xx010, 00010xx010, 01110xx010}, 0xx10x0x10 \ { 0xx10x0010, 0xx1000110, 0xx10x0110, 0x110x0x10, 00010x0x10, 01110x0x10}} {x0100 \ {00100, 10100}, x1001 \ {01001}} {} {} {x10x0 \ {x1010, 11010, 01010}} {00xx1 \ {00101, 001x1}} {} {00x1x \ {00x11, 00010, 00111}, x1xx1 \ {x1001, x1111, 01xx1}, 101xx \ {101x1, 101x0, 10100}} {} {} {xxxxx \ {10110, xxx0x, x11x1}, x0x01 \ {10101, 10001, 00001}} {0x0xx \ {01011, 00011, 010xx}, 01x0x \ {01001, 0100x, 01101}, xx0x1 \ {11011, 0x0x1, 1x011}} { 0x0xxxxxxx \ { 0x0x1xxxx0, 0x0x0xxxx1, 0x01xxxx0x, 0x00xxxx1x, 0x0xx10110, 0x0xxxxx0x, 0x0xxx11x1, 01011xxxxx, 00011xxxxx, 010xxxxxxx}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xxxx0x, 01x0xx1101, 01001xxx0x, 0100xxxx0x, 01101xxx0x}, xx0x1xxxx1 \ { xx011xxx01, xx001xxx11, xx0x1xxx01, xx0x1x11x1, 11011xxxx1, 0x0x1xxxx1, 1x011xxxx1}, 0x001x0x01 \ { 0x00110101, 0x00110001, 0x00100001, 01001x0x01}, 01x01x0x01 \ { 01x0110101, 01x0110001, 01x0100001, 01001x0x01, 01001x0x01, 01101x0x01}, xx001x0x01 \ { xx00110101, xx00110001, xx00100001, 0x001x0x01}} {xxxx0 \ {x0010, 0xxx0, 000x0}, xx1xx \ {00101, 0111x, 10101}} {x0101 \ {00101, 10101}} { x0101xx101 \ { x010100101, x010110101, 00101xx101, 10101xx101}} {10xx1 \ {100x1, 10001, 10001}} {} {} {0x111 \ {01111, 00111}, 00x1x \ {00111, 00x11, 00110}, xx1x1 \ {01111, xx111, 0x111}} {1011x \ {10111, 10110}, xx1x1 \ {011x1, 11101, 10111}, x0x1x \ {10x1x, x0111, x011x}} { 101110x111 \ { 1011101111, 1011100111, 101110x111}, xx1110x111 \ { xx11101111, xx11100111, 011110x111, 101110x111}, x0x110x111 \ { x0x1101111, x0x1100111, 10x110x111, x01110x111, x01110x111}, 1011x00x1x \ { 1011100x10, 1011000x11, 1011x00111, 1011x00x11, 1011x00110, 1011100x1x, 1011000x1x}, xx11100x11 \ { xx11100111, xx11100x11, 0111100x11, 1011100x11}, x0x1x00x1x \ { x0x1100x10, x0x1000x11, x0x1x00111, x0x1x00x11, x0x1x00110, 10x1x00x1x, x011100x1x, x011x00x1x}, 10111xx111 \ { 1011101111, 10111xx111, 101110x111, 10111xx111}, xx1x1xx1x1 \ { xx111xx101, xx101xx111, xx1x101111, xx1x1xx111, xx1x10x111, 011x1xx1x1, 11101xx1x1, 10111xx1x1}, x0x11xx111 \ { x0x1101111, x0x11xx111, x0x110x111, 10x11xx111, x0111xx111, x0111xx111}} {0110x \ {01101, 01100}} {xx0x1 \ {00011, 100x1, 110x1}, 01xx1 \ {011x1, 01001, 010x1}} { xx00101101 \ { xx00101101, 1000101101, 1100101101}, 01x0101101 \ { 01x0101101, 0110101101, 0100101101, 0100101101}} {111x0 \ {11100, 11110}, xx101 \ {0x101, 00101, 11101}} {xxx01 \ {10101, 10x01, 0x101}} { xxx01xx101 \ { xxx010x101, xxx0100101, xxx0111101, 10101xx101, 10x01xx101, 0x101xx101}} {} {0xx0x \ {0xx01, 00001}} {} {1xx1x \ {11110, 1xx11, 1111x}, 00x10 \ {00010}, 0x1x0 \ {011x0, 00100, 00100}} {x0011 \ {00011, 10011}, xxx0x \ {00x01, 0110x, 0100x}} { x00111xx11 \ { x00111xx11, x001111111, 000111xx11, 100111xx11}, xxx000x100 \ { xxx0001100, xxx0000100, xxx0000100, 011000x100, 010000x100}} {01x11 \ {01111}} {0x0xx \ {00001, 000x1, 010x1}} { 0x01101x11 \ { 0x01101111, 0001101x11, 0101101x11}} {10x00 \ {10000, 10100, 10100}, 00x00 \ {00100, 00000}, x10xx \ {0101x, 11001, 010x0}} {01x1x \ {01x11, 0111x, 01111}, 100x0 \ {10000, 10010}} { 1000010x00 \ { 1000010000, 1000010100, 1000010100, 1000010x00}, 1000000x00 \ { 1000000100, 1000000000, 1000000x00}, 01x1xx101x \ { 01x11x1010, 01x10x1011, 01x1x0101x, 01x1x01010, 01x11x101x, 0111xx101x, 01111x101x}, 100x0x10x0 \ { 10010x1000, 10000x1010, 100x001010, 100x0010x0, 10000x10x0, 10010x10x0}} {01x00 \ {01100, 01000}, x1x0x \ {11101, 11x00, 01000}} {01xx0 \ {010x0, 01110, 01x00}} { 01x0001x00 \ { 01x0001100, 01x0001000, 0100001x00, 01x0001x00}, 01x00x1x00 \ { 01x0011x00, 01x0001000, 01000x1x00, 01x00x1x00}} {x11xx \ {011x1, x111x, x110x}, 01x11 \ {01111, 01011, 01011}} {000x1 \ {00011, 00001, 00001}} { 000x1x11x1 \ { 00011x1101, 00001x1111, 000x1011x1, 000x1x1111, 000x1x1101, 00011x11x1, 00001x11x1, 00001x11x1}, 0001101x11 \ { 0001101111, 0001101011, 0001101011, 0001101x11}} {1xx01 \ {11x01, 10x01, 10101}, 1x1x0 \ {1x100, 11100, 1x110}} {} {} {xxx11 \ {10111, xx111}, 1x101 \ {11101, 10101, 10101}} {x1x0x \ {x1x01, x110x, 11x00}} { x1x011x101 \ { x1x0111101, x1x0110101, x1x0110101, x1x011x101, x11011x101}} {010xx \ {010x1, 0101x, 01000}} {0xx1x \ {01111, 01x10, 01x11}} { 0xx1x0101x \ { 0xx1101010, 0xx1001011, 0xx1x01011, 0xx1x0101x, 011110101x, 01x100101x, 01x110101x}} {} {1xx1x \ {10x11, 1x010, 10011}, x1xx0 \ {01100, x1x00, 11xx0}} {} {00x1x \ {00x10, 00111, 00011}} {x010x \ {00101, 0010x, 10101}} {} {1x1x0 \ {1x100, 101x0, 111x0}, 1xx11 \ {11x11, 1x011, 10111}} {0xx00 \ {0x000, 01000, 01000}, 1x101 \ {11101}} { 0xx001x100 \ { 0xx001x100, 0xx0010100, 0xx0011100, 0x0001x100, 010001x100, 010001x100}} {1x11x \ {1x111, 10111, 1011x}, 0xxxx \ {00x0x, 0xx00, 00x10}} {x1x11 \ {01x11, 11011, 11011}, xx0xx \ {010xx, xx001, x101x}} { x1x111x111 \ { x1x111x111, x1x1110111, x1x1110111, 01x111x111, 110111x111, 110111x111}, xx01x1x11x \ { xx0111x110, xx0101x111, xx01x1x111, xx01x10111, xx01x1011x, 0101x1x11x, x101x1x11x}, x1x110xx11 \ { 01x110xx11, 110110xx11, 110110xx11}, xx0xx0xxxx \ { xx0x10xxx0, xx0x00xxx1, xx01x0xx0x, xx00x0xx1x, xx0xx00x0x, xx0xx0xx00, xx0xx00x10, 010xx0xxxx, xx0010xxxx, x101x0xxxx}} {xx110 \ {0x110, 1x110}, 10x10 \ {10010, 10110, 10110}} {} {} {1xx11 \ {11011, 11111, 10x11}, x0111 \ {10111, 00111, 00111}} {0xxxx \ {0x01x, 01101, 00x00}, 0x0x1 \ {010x1, 00011, 01011}, x1xxx \ {01110, 110x1, 11110}} { 0xx111xx11 \ { 0xx1111011, 0xx1111111, 0xx1110x11, 0x0111xx11}, 0x0111xx11 \ { 0x01111011, 0x01111111, 0x01110x11, 010111xx11, 000111xx11, 010111xx11}, x1x111xx11 \ { x1x1111011, x1x1111111, x1x1110x11, 110111xx11}, 0xx11x0111 \ { 0xx1110111, 0xx1100111, 0xx1100111, 0x011x0111}, 0x011x0111 \ { 0x01110111, 0x01100111, 0x01100111, 01011x0111, 00011x0111, 01011x0111}, x1x11x0111 \ { x1x1110111, x1x1100111, x1x1100111, 11011x0111}} {1x1x1 \ {111x1, 11101, 11111}, 1100x \ {11001}, 0001x \ {00011, 00010, 00010}} {10xx0 \ {10010, 100x0, 10x10}, xx01x \ {00010, xx011, xx011}} { xx0111x111 \ { xx01111111, xx01111111, xx0111x111, xx0111x111}, 10x0011000 \ { 1000011000}, 10x1000010 \ { 10x1000010, 10x1000010, 1001000010, 1001000010, 10x1000010}, xx01x0001x \ { xx01100010, xx01000011, xx01x00011, xx01x00010, xx01x00010, 000100001x, xx0110001x, xx0110001x}} {x01x1 \ {x0111, 10101, x0101}} {0xx00 \ {01100, 01000, 01x00}, x100x \ {01001, x1001, 01000}, 0xxx0 \ {001x0, 0x0x0, 00110}} { x1001x0101 \ { x100110101, x1001x0101, 01001x0101, x1001x0101}} {xx001 \ {00001, 1x001}, x0x1x \ {00011, 10x1x, 10x10}, xx100 \ {1x100, 11100, 0x100}} {x1001 \ {01001}, x00xx \ {10011, 00010, 0000x}} { x1001xx001 \ { x100100001, x10011x001, 01001xx001}, x0001xx001 \ { x000100001, x00011x001, 00001xx001}, x001xx0x1x \ { x0011x0x10, x0010x0x11, x001x00011, x001x10x1x, x001x10x10, 10011x0x1x, 00010x0x1x}, x0000xx100 \ { x00001x100, x000011100, x00000x100, 00000xx100}} {01xx1 \ {01011, 01111, 01x11}} {1xx0x \ {11x0x, 1xx01}, x101x \ {x1011, 1101x, 1101x}} { 1xx0101x01 \ { 11x0101x01, 1xx0101x01}, x101101x11 \ { x101101011, x101101111, x101101x11, x101101x11, 1101101x11, 1101101x11}} {xxx0x \ {00101, 1x100, xx001}} {} {} {00xx0 \ {00100, 00110, 00010}, xxx1x \ {1xx1x, 11010, 00110}} {1x01x \ {1x011, 1x010, 10010}, xx0x0 \ {01000, x0010, 1x000}} { 1x01000x10 \ { 1x01000110, 1x01000010, 1x01000x10, 1001000x10}, xx0x000xx0 \ { xx01000x00, xx00000x10, xx0x000100, xx0x000110, xx0x000010, 0100000xx0, x001000xx0, 1x00000xx0}, 1x01xxxx1x \ { 1x011xxx10, 1x010xxx11, 1x01x1xx1x, 1x01x11010, 1x01x00110, 1x011xxx1x, 1x010xxx1x, 10010xxx1x}, xx010xxx10 \ { xx0101xx10, xx01011010, xx01000110, x0010xxx10}} {xxx10 \ {0x110, 1x010, x1010}, 0x01x \ {00010, 01011, 0001x}} {00xxx \ {000x0, 0001x, 001xx}} { 00x10xxx10 \ { 00x100x110, 00x101x010, 00x10x1010, 00010xxx10, 00010xxx10, 00110xxx10}, 00x1x0x01x \ { 00x110x010, 00x100x011, 00x1x00010, 00x1x01011, 00x1x0001x, 000100x01x, 0001x0x01x, 0011x0x01x}} {10x10 \ {10010, 10110, 10110}} {1xx1x \ {1xx10, 10x11, 1x01x}, 1xx0x \ {11000, 1x00x, 11001}, x1011 \ {01011}} { 1xx1010x10 \ { 1xx1010010, 1xx1010110, 1xx1010110, 1xx1010x10, 1x01010x10}} {0111x \ {01110, 01111}, xx1x0 \ {00100, 1x100, 1x110}} {} {} {0x011 \ {01011}} {xx100 \ {00100, 0x100, x0100}} {} {1xx01 \ {11x01, 10101, 10101}, xx00x \ {01001, x1000, 0100x}, xxx1x \ {x0011, 1011x, 10111}} {1xx0x \ {1x101, 10000, 1x001}} { 1xx011xx01 \ { 1xx0111x01, 1xx0110101, 1xx0110101, 1x1011xx01, 1x0011xx01}, 1xx0xxx00x \ { 1xx01xx000, 1xx00xx001, 1xx0x01001, 1xx0xx1000, 1xx0x0100x, 1x101xx00x, 10000xx00x, 1x001xx00x}} {0xxx1 \ {01111, 00x11, 010x1}} {} {} {x0100 \ {10100, 00100}} {x11x1 \ {111x1, x1101}, x1x00 \ {x1000, 11000, 01x00}} { x1x00x0100 \ { x1x0010100, x1x0000100, x1000x0100, 11000x0100, 01x00x0100}} {x1100 \ {11100, 01100, 01100}, x0x0x \ {10x00, x0100, 10x01}, 1xxx0 \ {110x0, 111x0, 1x110}} {01xx1 \ {01011, 01101}, 0xx01 \ {01x01, 00x01, 00x01}} { 01x01x0x01 \ { 01x0110x01, 01101x0x01}, 0xx01x0x01 \ { 0xx0110x01, 01x01x0x01, 00x01x0x01, 00x01x0x01}} {x001x \ {x0010, 00010, 1001x}, x0001 \ {10001, 00001}} {011xx \ {011x0, 01111}, 11xxx \ {11x01, 110xx, 11xx1}} { 0111xx001x \ { 01111x0010, 01110x0011, 0111xx0010, 0111x00010, 0111x1001x, 01110x001x, 01111x001x}, 11x1xx001x \ { 11x11x0010, 11x10x0011, 11x1xx0010, 11x1x00010, 11x1x1001x, 1101xx001x, 11x11x001x}, 01101x0001 \ { 0110110001, 0110100001}, 11x01x0001 \ { 11x0110001, 11x0100001, 11x01x0001, 11001x0001, 11x01x0001}} {11x01 \ {11101, 11001, 11001}} {x1xxx \ {01xx0, 11x10, 01010}} { x1x0111x01 \ { x1x0111101, x1x0111001, x1x0111001}} {x1x10 \ {11110, x1110, 01x10}} {0x11x \ {0x111, 00111, 0111x}} { 0x110x1x10 \ { 0x11011110, 0x110x1110, 0x11001x10, 01110x1x10}} {10x1x \ {10011, 10111, 1001x}} {x10x0 \ {01010, 01000, 110x0}, xx1x1 \ {01101, x0101, 11111}} { x101010x10 \ { x101010010, 0101010x10, 1101010x10}, xx11110x11 \ { xx11110011, xx11110111, xx11110011, 1111110x11}} {0110x \ {01100, 01101, 01101}, 11x01 \ {11001, 11101}} {xx01x \ {x101x, 10010, 01010}, 1x01x \ {11010, 1x010, 10011}, x1xxx \ {110x0, 11011, x11xx}} { x1x0x0110x \ { x1x0101100, x1x0001101, x1x0x01100, x1x0x01101, x1x0x01101, 110000110x, x110x0110x}, x1x0111x01 \ { x1x0111001, x1x0111101, x110111x01}} {x00xx \ {10001, x001x, 00011}, x1000 \ {11000, 01000, 01000}, 0x1x0 \ {01110, 0x110, 0x110}} {0xx1x \ {0x110, 0x010, 0001x}, 0101x \ {01010, 01011}} { 0xx1xx001x \ { 0xx11x0010, 0xx10x0011, 0xx1xx001x, 0xx1x00011, 0x110x001x, 0x010x001x, 0001xx001x}, 0101xx001x \ { 01011x0010, 01010x0011, 0101xx001x, 0101x00011, 01010x001x, 01011x001x}, 0xx100x110 \ { 0xx1001110, 0xx100x110, 0xx100x110, 0x1100x110, 0x0100x110, 000100x110}, 010100x110 \ { 0101001110, 010100x110, 010100x110, 010100x110}} {} {} {} {x1x11 \ {01x11, 11011, 11111}} {} {} {} {10xxx \ {10x00, 101x0, 1010x}, xx100 \ {00100, 10100, 01100}} {} {00xx1 \ {00x11, 00111, 00111}, 11x00 \ {11100}} {11xxx \ {110x0, 11110, 11x11}, x0x1x \ {x0111, 00011}} { 11xx100xx1 \ { 11x1100x01, 11x0100x11, 11xx100x11, 11xx100111, 11xx100111, 11x1100xx1}, x0x1100x11 \ { x0x1100x11, x0x1100111, x0x1100111, x011100x11, 0001100x11}, 11x0011x00 \ { 11x0011100, 1100011x00}} {1xx0x \ {11001, 11000, 10x00}, x00x0 \ {00000, x0010, 10000}} {1x1x1 \ {11111, 1x101, 10111}} { 1x1011xx01 \ { 1x10111001, 1x1011xx01}} {xxx0x \ {x0x01, 01101, 1000x}, xxx11 \ {x1111, x0x11, xx111}, 11xx0 \ {11x00, 111x0, 11x10}} {xxx0x \ {1x101, 10001, 0x001}, 0x01x \ {01010, 01011}, 1110x \ {11101, 11100}} { xxx0xxxx0x \ { xxx01xxx00, xxx00xxx01, xxx0xx0x01, xxx0x01101, xxx0x1000x, 1x101xxx0x, 10001xxx0x, 0x001xxx0x}, 1110xxxx0x \ { 11101xxx00, 11100xxx01, 1110xx0x01, 1110x01101, 1110x1000x, 11101xxx0x, 11100xxx0x}, 0x011xxx11 \ { 0x011x1111, 0x011x0x11, 0x011xx111, 01011xxx11}, xxx0011x00 \ { xxx0011x00, xxx0011100}, 0x01011x10 \ { 0x01011110, 0x01011x10, 0101011x10}, 1110011x00 \ { 1110011x00, 1110011100, 1110011x00}} {xx001 \ {x1001, 00001, 01001}, 11xx1 \ {11x01, 11x11}} {0000x \ {00001, 00000}} { 00001xx001 \ { 00001x1001, 0000100001, 0000101001, 00001xx001}, 0000111x01 \ { 0000111x01, 0000111x01}} {x000x \ {x0000, 00001, 00000}, xx110 \ {01110, 0x110, x1110}} {x10x0 \ {11010, 01010, 11000}} { x1000x0000 \ { x1000x0000, x100000000, 11000x0000}, x1010xx110 \ { x101001110, x10100x110, x1010x1110, 11010xx110, 01010xx110}} {xx110 \ {1x110, 00110}} {xx0xx \ {11000, xx01x, 00010}} { xx010xx110 \ { xx0101x110, xx01000110, xx010xx110, 00010xx110}} {x0x10 \ {x0110, 00110, 00x10}, x0xxx \ {00x1x, 00101, 100x1}} {x0xxx \ {00110, 10101, x00xx}, x1110 \ {01110}} { x0x10x0x10 \ { x0x10x0110, x0x1000110, x0x1000x10, 00110x0x10, x0010x0x10}, x0xxxx0xxx \ { x0xx1x0xx0, x0xx0x0xx1, x0x1xx0x0x, x0x0xx0x1x, x0xxx00x1x, x0xxx00101, x0xxx100x1, 00110x0xxx, 10101x0xxx, x00xxx0xxx}, x1110x0x10 \ { x111000x10, 01110x0x10}} {x1110 \ {11110, 01110}} {x11x0 \ {011x0, 11110, 11100}} { x1110x1110 \ { x111011110, x111001110, 01110x1110, 11110x1110}} {100x1 \ {10001}, 0xxxx \ {01x01, 00x10, 0xxx1}} {0x0x0 \ {00010, 0x010, 0x000}, 1xx0x \ {10001, 10101, 10000}} { 1xx0110001 \ { 1xx0110001, 1000110001, 1010110001}, 0x0x00xxx0 \ { 0x0100xx00, 0x0000xx10, 0x0x000x10, 000100xxx0, 0x0100xxx0, 0x0000xxx0}, 1xx0x0xx0x \ { 1xx010xx00, 1xx000xx01, 1xx0x01x01, 1xx0x0xx01, 100010xx0x, 101010xx0x, 100000xx0x}} {00x00 \ {00000, 00100}, 00x00 \ {00000, 00100}, 1xxx0 \ {10x10, 10000, 11x10}} {01x1x \ {01010, 01x11, 01x11}} { 01x101xx10 \ { 01x1010x10, 01x1011x10, 010101xx10}} {00x0x \ {0000x, 00000, 00101}, x1101 \ {11101, 01101}} {0x110 \ {01110, 00110, 00110}, 1x100 \ {11100, 10100}} { 1x10000x00 \ { 1x10000000, 1x10000000, 1110000x00, 1010000x00}} {1x0xx \ {1x001, 1100x, 11011}, x0x10 \ {10x10, 00110, x0110}} {1101x \ {11010, 11011, 11011}, 00xxx \ {0000x, 00101, 00100}, x11x0 \ {01100, x1100, 111x0}} { 1101x1x01x \ { 110111x010, 110101x011, 1101x11011, 110101x01x, 110111x01x, 110111x01x}, 00xxx1x0xx \ { 00xx11x0x0, 00xx01x0x1, 00x1x1x00x, 00x0x1x01x, 00xxx1x001, 00xxx1100x, 00xxx11011, 0000x1x0xx, 001011x0xx, 001001x0xx}, x11x01x0x0 \ { x11101x000, x11001x010, x11x011000, 011001x0x0, x11001x0x0, 111x01x0x0}, 11010x0x10 \ { 1101010x10, 1101000110, 11010x0110, 11010x0x10}, 00x10x0x10 \ { 00x1010x10, 00x1000110, 00x10x0110}, x1110x0x10 \ { x111010x10, x111000110, x1110x0110, 11110x0x10}} {xx111 \ {x1111, x0111, 01111}, 1xxxx \ {10111, 100x0, 11x00}} {xx001 \ {00001, x1001, 01001}, 0x10x \ {00100, 0x100, 00101}} { xx0011xx01 \ { 000011xx01, x10011xx01, 010011xx01}, 0x10x1xx0x \ { 0x1011xx00, 0x1001xx01, 0x10x10000, 0x10x11x00, 001001xx0x, 0x1001xx0x, 001011xx0x}} {0xx11 \ {01011, 01111, 01x11}} {x111x \ {x1111, 11111, 11110}} { x11110xx11 \ { x111101011, x111101111, x111101x11, x11110xx11, 111110xx11}} {x11x0 \ {011x0, 01110, x1110}, 01xx1 \ {01x01, 01011}} {0xxxx \ {00001, 011x1, 0x011}, 1x0x0 \ {10010, 1x000, 110x0}} { 0xxx0x11x0 \ { 0xx10x1100, 0xx00x1110, 0xxx0011x0, 0xxx001110, 0xxx0x1110}, 1x0x0x11x0 \ { 1x010x1100, 1x000x1110, 1x0x0011x0, 1x0x001110, 1x0x0x1110, 10010x11x0, 1x000x11x0, 110x0x11x0}, 0xxx101xx1 \ { 0xx1101x01, 0xx0101x11, 0xxx101x01, 0xxx101011, 0000101xx1, 011x101xx1, 0x01101xx1}} {1x0xx \ {1x010, 11001, 10010}, 0x1x0 \ {0x110, 01110}} {} {} {10x1x \ {10x11, 10010, 10010}} {110x0 \ {11010, 11000}} { 1101010x10 \ { 1101010010, 1101010010, 1101010x10}} {01x1x \ {01x11, 01x10, 0101x}, 10xx1 \ {10001, 101x1}} {xxx00 \ {10x00, 00000, 01000}, 110xx \ {1100x, 11001}} { 1101x01x1x \ { 1101101x10, 1101001x11, 1101x01x11, 1101x01x10, 1101x0101x}, 110x110xx1 \ { 1101110x01, 1100110x11, 110x110001, 110x1101x1, 1100110xx1, 1100110xx1}} {} {xx01x \ {11011, 1x010, 1x010}, 01x0x \ {01x00, 01000, 01x01}} {} {01x0x \ {01000, 01x01, 0100x}} {01x10 \ {01010, 01110, 01110}, 1x1x1 \ {111x1, 1x101}} { 1x10101x01 \ { 1x10101x01, 1x10101001, 1110101x01, 1x10101x01}} {000xx \ {0000x, 00001, 000x0}} {xx111 \ {0x111, 01111, 10111}, x1x1x \ {01011, 01x11, 11011}} { xx11100011 \ { 0x11100011, 0111100011, 1011100011}, x1x1x0001x \ { x1x1100010, x1x1000011, x1x1x00010, 010110001x, 01x110001x, 110110001x}} {xx11x \ {00111, x1111, x0111}, x10xx \ {x10x0, 01001, 0101x}} {x111x \ {11110, x1111, 01111}} { x111xxx11x \ { x1111xx110, x1110xx111, x111x00111, x111xx1111, x111xx0111, 11110xx11x, x1111xx11x, 01111xx11x}, x111xx101x \ { x1111x1010, x1110x1011, x111xx1010, x111x0101x, 11110x101x, x1111x101x, 01111x101x}} {} {x1110 \ {01110, 11110, 11110}, x000x \ {10001, 1000x, 0000x}} {} {x0xx0 \ {100x0, x0x10, x0110}, 0x0xx \ {0101x, 00010, 0x011}} {x00x1 \ {000x1, x0001, x0001}, 0x1xx \ {0x1x1, 0x11x, 0x1x0}, 10xxx \ {101x1, 10000, 10x01}} { 0x1x0x0xx0 \ { 0x110x0x00, 0x100x0x10, 0x1x0100x0, 0x1x0x0x10, 0x1x0x0110, 0x110x0xx0, 0x1x0x0xx0}, 10xx0x0xx0 \ { 10x10x0x00, 10x00x0x10, 10xx0100x0, 10xx0x0x10, 10xx0x0110, 10000x0xx0}, x00x10x0x1 \ { x00110x001, x00010x011, x00x101011, x00x10x011, 000x10x0x1, x00010x0x1, x00010x0x1}, 0x1xx0x0xx \ { 0x1x10x0x0, 0x1x00x0x1, 0x11x0x00x, 0x10x0x01x, 0x1xx0101x, 0x1xx00010, 0x1xx0x011, 0x1x10x0xx, 0x11x0x0xx, 0x1x00x0xx}, 10xxx0x0xx \ { 10xx10x0x0, 10xx00x0x1, 10x1x0x00x, 10x0x0x01x, 10xxx0101x, 10xxx00010, 10xxx0x011, 101x10x0xx, 100000x0xx, 10x010x0xx}} {x000x \ {10001, 00000, 1000x}} {} {} {0xxx0 \ {00x00, 00xx0, 0x0x0}} {x1x0x \ {11x0x, 11101, x100x}, xxxxx \ {1xxx0, 0x101, 11000}, xxx10 \ {01010, 1xx10, 11x10}} { x1x000xx00 \ { x1x0000x00, x1x0000x00, x1x000x000, 11x000xx00, x10000xx00}, xxxx00xxx0 \ { xxx100xx00, xxx000xx10, xxxx000x00, xxxx000xx0, xxxx00x0x0, 1xxx00xxx0, 110000xxx0}, xxx100xx10 \ { xxx1000x10, xxx100x010, 010100xx10, 1xx100xx10, 11x100xx10}} {x0xx0 \ {00110, 101x0, x0010}, 1xx10 \ {11010, 10x10, 10010}} {0x10x \ {01100, 0110x, 00100}, 0x11x \ {00111, 00110, 0x111}} { 0x100x0x00 \ { 0x10010100, 01100x0x00, 01100x0x00, 00100x0x00}, 0x110x0x10 \ { 0x11000110, 0x11010110, 0x110x0010, 00110x0x10}, 0x1101xx10 \ { 0x11011010, 0x11010x10, 0x11010010, 001101xx10}} {x1x10 \ {11x10, 11110, x1010}, x10xx \ {010xx, x100x, 01001}} {} {} {0x1xx \ {001xx, 01100}, x110x \ {x1100, 1110x, 0110x}} {10x00 \ {10100}} { 10x000x100 \ { 10x0000100, 10x0001100, 101000x100}, 10x00x1100 \ { 10x00x1100, 10x0011100, 10x0001100, 10100x1100}} {x00xx \ {100x0, 00001, 10000}} {xx00x \ {11001, 00000, xx000}} { xx00xx000x \ { xx001x0000, xx000x0001, xx00x10000, xx00x00001, xx00x10000, 11001x000x, 00000x000x, xx000x000x}} {x00xx \ {x00x0, x001x}, 0010x \ {00101, 00100}, 011xx \ {011x0, 01100, 01100}} {01xxx \ {0111x, 0110x, 011x0}, x001x \ {10011, 00010}, xxx0x \ {00100, 01x01, 11x0x}} { 01xxxx00xx \ { 01xx1x00x0, 01xx0x00x1, 01x1xx000x, 01x0xx001x, 01xxxx00x0, 01xxxx001x, 0111xx00xx, 0110xx00xx, 011x0x00xx}, x001xx001x \ { x0011x0010, x0010x0011, x001xx0010, x001xx001x, 10011x001x, 00010x001x}, xxx0xx000x \ { xxx01x0000, xxx00x0001, xxx0xx0000, 00100x000x, 01x01x000x, 11x0xx000x}, 01x0x0010x \ { 01x0100100, 01x0000101, 01x0x00101, 01x0x00100, 0110x0010x, 011000010x}, xxx0x0010x \ { xxx0100100, xxx0000101, xxx0x00101, xxx0x00100, 001000010x, 01x010010x, 11x0x0010x}, 01xxx011xx \ { 01xx1011x0, 01xx0011x1, 01x1x0110x, 01x0x0111x, 01xxx011x0, 01xxx01100, 01xxx01100, 0111x011xx, 0110x011xx, 011x0011xx}, x001x0111x \ { x001101110, x001001111, x001x01110, 100110111x, 000100111x}, xxx0x0110x \ { xxx0101100, xxx0001101, xxx0x01100, xxx0x01100, xxx0x01100, 001000110x, 01x010110x, 11x0x0110x}} {10xx1 \ {10111, 10001, 101x1}, 0111x \ {01110, 01111, 01111}, 010xx \ {010x1, 01000, 01011}} {1xx1x \ {11x10, 1x110}} { 1xx1110x11 \ { 1xx1110111, 1xx1110111}, 1xx1x0111x \ { 1xx1101110, 1xx1001111, 1xx1x01110, 1xx1x01111, 1xx1x01111, 11x100111x, 1x1100111x}, 1xx1x0101x \ { 1xx1101010, 1xx1001011, 1xx1x01011, 1xx1x01011, 11x100101x, 1x1100101x}} {x1xxx \ {x111x, 11000, 0111x}} {0xx1x \ {0x111, 00111, 00010}} { 0xx1xx1x1x \ { 0xx11x1x10, 0xx10x1x11, 0xx1xx111x, 0xx1x0111x, 0x111x1x1x, 00111x1x1x, 00010x1x1x}} {00xxx \ {001x0, 0010x, 00x11}} {} {} {1x11x \ {1x111, 1x110, 1111x}} {0x0xx \ {0x00x, 0x0x1, 0100x}, x1000 \ {01000, 11000}} { 0x01x1x11x \ { 0x0111x110, 0x0101x111, 0x01x1x111, 0x01x1x110, 0x01x1111x, 0x0111x11x}} {111xx \ {11101, 11110, 11111}, xxx10 \ {01x10, 11010, 01110}} {x1x10 \ {01x10, x1110, 01110}} { x1x1011110 \ { x1x1011110, 01x1011110, x111011110, 0111011110}, x1x10xxx10 \ { x1x1001x10, x1x1011010, x1x1001110, 01x10xxx10, x1110xxx10, 01110xxx10}} {x0xx1 \ {x01x1, 10011}, x00x1 \ {10001, x0001}} {100xx \ {1000x, 10010, 10011}} { 100x1x0xx1 \ { 10011x0x01, 10001x0x11, 100x1x01x1, 100x110011, 10001x0xx1, 10011x0xx1}, 100x1x00x1 \ { 10011x0001, 10001x0011, 100x110001, 100x1x0001, 10001x00x1, 10011x00x1}} {} {} {} {11xxx \ {11101, 11x11, 11x10}} {xxx1x \ {0011x, 11x10, x0x1x}} { xxx1x11x1x \ { xxx1111x10, xxx1011x11, xxx1x11x11, xxx1x11x10, 0011x11x1x, 11x1011x1x, x0x1x11x1x}} {xxx1x \ {xxx11, 01x1x, 11x10}} {xxxx0 \ {10x10, 01x10, x11x0}, xx011 \ {x0011, 01011, x1011}} { xxx10xxx10 \ { xxx1001x10, xxx1011x10, 10x10xxx10, 01x10xxx10, x1110xxx10}, xx011xxx11 \ { xx011xxx11, xx01101x11, x0011xxx11, 01011xxx11, x1011xxx11}} {x101x \ {01011, 1101x, 0101x}, 0x11x \ {0x111, 0011x, 01111}} {011x1 \ {01101, 01111}} { 01111x1011 \ { 0111101011, 0111111011, 0111101011, 01111x1011}, 011110x111 \ { 011110x111, 0111100111, 0111101111, 011110x111}} {} {1xxxx \ {110x0, 11011, 1001x}, x0001 \ {00001, 10001, 10001}} {} {11xxx \ {1111x, 11x1x, 110xx}, 1x11x \ {10111, 1111x}, 1xx10 \ {11x10, 1x010}} {} {} {010xx \ {01000, 010x1}} {0x01x \ {0x010, 0101x}} { 0x01x0101x \ { 0x01101010, 0x01001011, 0x01x01011, 0x0100101x, 0101x0101x}} {x1x0x \ {x100x, 01x0x, 01101}} {0xxx0 \ {0x010, 001x0, 00000}, 101x0 \ {10110}} { 0xx00x1x00 \ { 0xx00x1000, 0xx0001x00, 00100x1x00, 00000x1x00}, 10100x1x00 \ { 10100x1000, 1010001x00}} {0x1x0 \ {001x0, 0x110, 01100}} {0x0x1 \ {01011, 000x1, 010x1}} {} {xx010 \ {0x010, 11010, 01010}, x1101 \ {11101, 01101}} {x1x1x \ {x1010, 0111x, 01x1x}} { x1x10xx010 \ { x1x100x010, x1x1011010, x1x1001010, x1010xx010, 01110xx010, 01x10xx010}} {x10xx \ {11001, 0101x, 010xx}, x100x \ {0100x, 11000, 11000}} {1x01x \ {1x011, 11011, 10011}, 111x1 \ {11111}} { 1x01xx101x \ { 1x011x1010, 1x010x1011, 1x01x0101x, 1x01x0101x, 1x011x101x, 11011x101x, 10011x101x}, 111x1x10x1 \ { 11111x1001, 11101x1011, 111x111001, 111x101011, 111x1010x1, 11111x10x1}, 11101x1001 \ { 1110101001}} {xx100 \ {x1100, x0100, x0100}} {x11x1 \ {111x1, 011x1}, 1111x \ {11110, 11111}, 01x1x \ {0101x, 01111}} {} {00xx0 \ {00x10, 00x00, 00110}, xxx11 \ {x0011, x1011, xx011}} {0xx00 \ {00x00, 0x000, 0x100}, 1x10x \ {10101, 11101, 11101}} { 0xx0000x00 \ { 0xx0000x00, 00x0000x00, 0x00000x00, 0x10000x00}, 1x10000x00 \ { 1x10000x00}} {1xx10 \ {10x10, 10110, 10110}, 1xx00 \ {11100, 1x000, 1x100}} {xx01x \ {00010, 11011, x001x}} { xx0101xx10 \ { xx01010x10, xx01010110, xx01010110, 000101xx10, x00101xx10}} {} {1x00x \ {1x001, 11000, 11001}} {} {x0x0x \ {10101, 1000x, x0001}} {1xxx1 \ {11111, 11001, 101x1}} { 1xx01x0x01 \ { 1xx0110101, 1xx0110001, 1xx01x0001, 11001x0x01, 10101x0x01}} {11x0x \ {11x00, 1100x, 11100}} {xx110 \ {11110, 01110, 01110}} {} {x010x \ {10101, 0010x, x0101}, x1x0x \ {x1001, 01100, x1x01}} {1010x \ {10100}, 000x1 \ {00011, 00001}} { 1010xx010x \ { 10101x0100, 10100x0101, 1010x10101, 1010x0010x, 1010xx0101, 10100x010x}, 00001x0101 \ { 0000110101, 0000100101, 00001x0101, 00001x0101}, 1010xx1x0x \ { 10101x1x00, 10100x1x01, 1010xx1001, 1010x01100, 1010xx1x01, 10100x1x0x}, 00001x1x01 \ { 00001x1001, 00001x1x01, 00001x1x01}} {xx011 \ {0x011, 00011, 1x011}} {0011x \ {00111}, 00xxx \ {00110, 00x0x, 00011}, x0x0x \ {00101, 10000, 10101}} { 00111xx011 \ { 001110x011, 0011100011, 001111x011, 00111xx011}, 00x11xx011 \ { 00x110x011, 00x1100011, 00x111x011, 00011xx011}} {1x11x \ {1x111, 11110}, xx01x \ {1x010, 0001x, 11010}, x0x10 \ {00x10, 10110}} {xx1x1 \ {x0111, 0x1x1, 10111}, xx0x1 \ {11011, 1x001, 01011}} { xx1111x111 \ { xx1111x111, x01111x111, 0x1111x111, 101111x111}, xx0111x111 \ { xx0111x111, 110111x111, 010111x111}, xx111xx011 \ { xx11100011, x0111xx011, 0x111xx011, 10111xx011}, xx011xx011 \ { xx01100011, 11011xx011, 01011xx011}} {xx0x0 \ {100x0, 11010, 0x010}} {1x00x \ {1x000, 1000x, 11000}, 110x1 \ {11001}, 01xx1 \ {01001, 011x1, 01101}} { 1x000xx000 \ { 1x00010000, 1x000xx000, 10000xx000, 11000xx000}} {1x1x1 \ {101x1, 11101, 11101}} {x0x11 \ {10011, 00x11, 10111}, 10xxx \ {10xx0, 10110, 10010}} { x0x111x111 \ { x0x1110111, 100111x111, 00x111x111, 101111x111}, 10xx11x1x1 \ { 10x111x101, 10x011x111, 10xx1101x1, 10xx111101, 10xx111101}} {0xx00 \ {0x000, 00100, 01x00}, 0x00x \ {0x001, 01000, 01000}} {10xxx \ {10001, 10x01, 10x00}} { 10x000xx00 \ { 10x000x000, 10x0000100, 10x0001x00, 10x000xx00}, 10x0x0x00x \ { 10x010x000, 10x000x001, 10x0x0x001, 10x0x01000, 10x0x01000, 100010x00x, 10x010x00x, 10x000x00x}} {011xx \ {0111x, 011x1, 011x0}, 11xx0 \ {11010, 110x0, 11x10}} {111xx \ {11100, 111x1}, 01xx0 \ {01x10, 011x0}, 0x1x0 \ {0x100, 00100, 01110}} { 111xx011xx \ { 111x1011x0, 111x0011x1, 1111x0110x, 1110x0111x, 111xx0111x, 111xx011x1, 111xx011x0, 11100011xx, 111x1011xx}, 01xx0011x0 \ { 01x1001100, 01x0001110, 01xx001110, 01xx0011x0, 01x10011x0, 011x0011x0}, 0x1x0011x0 \ { 0x11001100, 0x10001110, 0x1x001110, 0x1x0011x0, 0x100011x0, 00100011x0, 01110011x0}, 111x011xx0 \ { 1111011x00, 1110011x10, 111x011010, 111x0110x0, 111x011x10, 1110011xx0}, 01xx011xx0 \ { 01x1011x00, 01x0011x10, 01xx011010, 01xx0110x0, 01xx011x10, 01x1011xx0, 011x011xx0}, 0x1x011xx0 \ { 0x11011x00, 0x10011x10, 0x1x011010, 0x1x0110x0, 0x1x011x10, 0x10011xx0, 0010011xx0, 0111011xx0}} {xx100 \ {x1100, 1x100, 11100}} {x0x0x \ {00001, 00x01, 00x0x}} { x0x00xx100 \ { x0x00x1100, x0x001x100, x0x0011100, 00x00xx100}} {} {x11xx \ {x111x, x110x, 1111x}} {} {xx0xx \ {xx01x, 10010, xx00x}, xx0xx \ {1x0x1, 01001, x00x0}} {01xxx \ {01111, 010x1, 011x0}} { 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxxxx01x, 01xxx10010, 01xxxxx00x, 01111xx0xx, 010x1xx0xx, 011x0xx0xx}, 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxx1x0x1, 01xxx01001, 01xxxx00x0, 01111xx0xx, 010x1xx0xx, 011x0xx0xx}} {1xxxx \ {1x00x, 1001x, 1000x}, 01xx1 \ {01001, 01011, 01x11}, 0xx0x \ {00x01, 0x00x, 01100}} {0xx00 \ {01x00, 01100, 00000}, x0xx0 \ {10100, 00x10, x0010}, x1100 \ {01100, 11100, 11100}} { 0xx001xx00 \ { 0xx001x000, 0xx0010000, 01x001xx00, 011001xx00, 000001xx00}, x0xx01xxx0 \ { x0x101xx00, x0x001xx10, x0xx01x000, x0xx010010, x0xx010000, 101001xxx0, 00x101xxx0, x00101xxx0}, x11001xx00 \ { x11001x000, x110010000, 011001xx00, 111001xx00, 111001xx00}, 0xx000xx00 \ { 0xx000x000, 0xx0001100, 01x000xx00, 011000xx00, 000000xx00}, x0x000xx00 \ { x0x000x000, x0x0001100, 101000xx00}, x11000xx00 \ { x11000x000, x110001100, 011000xx00, 111000xx00, 111000xx00}} {xx01x \ {1101x, 0x01x, x0010}, 1001x \ {10010, 10011}} {10xxx \ {10010, 100x0, 10011}} { 10x1xxx01x \ { 10x11xx010, 10x10xx011, 10x1x1101x, 10x1x0x01x, 10x1xx0010, 10010xx01x, 10010xx01x, 10011xx01x}, 10x1x1001x \ { 10x1110010, 10x1010011, 10x1x10010, 10x1x10011, 100101001x, 100101001x, 100111001x}} {10x01 \ {10101}} {1xx1x \ {11011, 10111, 11x10}} {} {x0100 \ {10100}} {x10xx \ {x10x0, 010x0, x1011}} { x1000x0100 \ { x100010100, x1000x0100, 01000x0100}} {x0xx0 \ {10x10, x0x10, 10xx0}} {0x1x1 \ {01101, 0x111}, x01x0 \ {10100, 00110, 00110}} { x01x0x0xx0 \ { x0110x0x00, x0100x0x10, x01x010x10, x01x0x0x10, x01x010xx0, 10100x0xx0, 00110x0xx0, 00110x0xx0}} {1x1x0 \ {10100, 11110, 11100}, 111xx \ {11100, 11101, 1110x}} {x01xx \ {00110, 001xx, 10100}} { x01x01x1x0 \ { x01101x100, x01001x110, x01x010100, x01x011110, x01x011100, 001101x1x0, 001x01x1x0, 101001x1x0}, x01xx111xx \ { x01x1111x0, x01x0111x1, x011x1110x, x010x1111x, x01xx11100, x01xx11101, x01xx1110x, 00110111xx, 001xx111xx, 10100111xx}} {0xx11 \ {0x011, 01111, 00x11}, x11xx \ {x1100, 111x1, 01101}} {1100x \ {11000}, xx0x1 \ {xx001, 1x001, x0011}} { xx0110xx11 \ { xx0110x011, xx01101111, xx01100x11, x00110xx11}, 1100xx110x \ { 11001x1100, 11000x1101, 1100xx1100, 1100x11101, 1100x01101, 11000x110x}, xx0x1x11x1 \ { xx011x1101, xx001x1111, xx0x1111x1, xx0x101101, xx001x11x1, 1x001x11x1, x0011x11x1}} {001xx \ {001x0, 00100, 00111}, 1xxxx \ {111x1, 10xx1, 11111}, 0x010 \ {01010, 00010, 00010}} {1xx00 \ {1x000, 11100, 10x00}} { 1xx0000100 \ { 1xx0000100, 1xx0000100, 1x00000100, 1110000100, 10x0000100}, 1xx001xx00 \ { 1x0001xx00, 111001xx00, 10x001xx00}} {} {} {} {xx0x0 \ {x1010, 0x010, 00010}} {1x0xx \ {10010, 11011, 1x011}} { 1x0x0xx0x0 \ { 1x010xx000, 1x000xx010, 1x0x0x1010, 1x0x00x010, 1x0x000010, 10010xx0x0}} {11xxx \ {1100x, 11001, 11001}, 1x011 \ {11011, 10011}, 00x0x \ {0010x, 00000, 00101}} {1x0xx \ {10000, 11010}} { 1x0xx11xxx \ { 1x0x111xx0, 1x0x011xx1, 1x01x11x0x, 1x00x11x1x, 1x0xx1100x, 1x0xx11001, 1x0xx11001, 1000011xxx, 1101011xxx}, 1x0111x011 \ { 1x01111011, 1x01110011}, 1x00x00x0x \ { 1x00100x00, 1x00000x01, 1x00x0010x, 1x00x00000, 1x00x00101, 1000000x0x}} {x1111 \ {11111, 01111, 01111}, 11xx1 \ {11101, 11001}} {x1xxx \ {11100, x100x, 11xx1}} { x1x11x1111 \ { x1x1111111, x1x1101111, x1x1101111, 11x11x1111}, x1xx111xx1 \ { x1x1111x01, x1x0111x11, x1xx111101, x1xx111001, x100111xx1, 11xx111xx1}} {x0xx1 \ {x0011, 00x01, 00x01}} {} {} {000x1 \ {00011}, 01x0x \ {0100x, 01001, 0110x}} {01x11 \ {01011, 01111, 01111}, xx111 \ {11111, x0111, 01111}} { 01x1100011 \ { 01x1100011, 0101100011, 0111100011, 0111100011}, xx11100011 \ { xx11100011, 1111100011, x011100011, 0111100011}} {11xx0 \ {11x10, 11x00, 110x0}} {x1x1x \ {x1110, 0111x, x111x}, 10x0x \ {1000x, 10000, 10000}} { x1x1011x10 \ { x1x1011x10, x1x1011010, x111011x10, 0111011x10, x111011x10}, 10x0011x00 \ { 10x0011x00, 10x0011000, 1000011x00, 1000011x00, 1000011x00}} {xx0x1 \ {01001, x0011, xx001}} {0011x \ {00111, 00110, 00110}, 1xxx0 \ {10xx0, 10100, 10x00}} { 00111xx011 \ { 00111x0011, 00111xx011}} {xx0x0 \ {100x0, 1x000, x00x0}, x1000 \ {01000, 11000, 11000}} {} {} {xx001 \ {0x001, x1001, 11001}} {1x11x \ {1x111, 10110}} {} {010xx \ {01011, 01001, 01010}, 1xx01 \ {10001, 11x01, 11x01}} {x10xx \ {x1011, x101x}} { x10xx010xx \ { x10x1010x0, x10x0010x1, x101x0100x, x100x0101x, x10xx01011, x10xx01001, x10xx01010, x1011010xx, x101x010xx}, x10011xx01 \ { x100110001, x100111x01, x100111x01}} {} {1x0x0 \ {11010, 11000, 110x0}} {} {} {0xx0x \ {01x0x, 00x0x, 01000}, x1000 \ {11000, 01000}} {} {} {10x00 \ {10100, 10000}} {} {} {x11xx \ {1111x, 111xx, 111xx}} {} {xxxxx \ {0xx0x, x0101, 0xxx0}, 01xxx \ {01111, 011x0, 01x01}} {x110x \ {01100, 1110x}, 10x1x \ {10111, 10x10}} { x110xxxx0x \ { x1101xxx00, x1100xxx01, x110x0xx0x, x110xx0101, x110x0xx00, 01100xxx0x, 1110xxxx0x}, 10x1xxxx1x \ { 10x11xxx10, 10x10xxx11, 10x1x0xx10, 10111xxx1x, 10x10xxx1x}, x110x01x0x \ { x110101x00, x110001x01, x110x01100, x110x01x01, 0110001x0x, 1110x01x0x}, 10x1x01x1x \ { 10x1101x10, 10x1001x11, 10x1x01111, 10x1x01110, 1011101x1x, 10x1001x1x}} {} {1x1x0 \ {111x0, 10100, 1x100}, 000x1 \ {00001, 00011, 00011}} {} {xx11x \ {xx111, 1x111, 11110}} {x1x10 \ {01110, x1110}, 0001x \ {00010, 00011}} { x1x10xx110 \ { x1x1011110, 01110xx110, x1110xx110}, 0001xxx11x \ { 00011xx110, 00010xx111, 0001xxx111, 0001x1x111, 0001x11110, 00010xx11x, 00011xx11x}} {} {xx1x0 \ {101x0, 0x1x0, 111x0}} {} {0x010 \ {01010, 00010}, x110x \ {0110x, 01101}} {0x1xx \ {00101, 0x111, 0x100}, x0x1x \ {x0x10, x0010, 10111}} { 0x1100x010 \ { 0x11001010, 0x11000010}, x0x100x010 \ { x0x1001010, x0x1000010, x0x100x010, x00100x010}, 0x10xx110x \ { 0x101x1100, 0x100x1101, 0x10x0110x, 0x10x01101, 00101x110x, 0x100x110x}} {0101x \ {01010, 01011, 01011}} {xx01x \ {01011, 0001x, 1001x}, xxxx1 \ {x10x1, 1x0x1, xx001}, 00xxx \ {000x0, 00011, 000x1}} { xx01x0101x \ { xx01101010, xx01001011, xx01x01010, xx01x01011, xx01x01011, 010110101x, 0001x0101x, 1001x0101x}, xxx1101011 \ { xxx1101011, xxx1101011, x101101011, 1x01101011}, 00x1x0101x \ { 00x1101010, 00x1001011, 00x1x01010, 00x1x01011, 00x1x01011, 000100101x, 000110101x, 000110101x}} {x0x01 \ {00001, 10001, 10101}, x1010 \ {11010, 01010}} {x0x1x \ {10x1x, 10010}, 010x0 \ {01010, 01000}, xxx00 \ {x0000, x0x00, 00100}} { x0x10x1010 \ { x0x1011010, x0x1001010, 10x10x1010, 10010x1010}, 01010x1010 \ { 0101011010, 0101001010, 01010x1010}} {x0x0x \ {0010x, x000x, x0000}, 0xxxx \ {0xxx0, 0x0x0, 0011x}} {101xx \ {101x0, 10110, 10100}} { 1010xx0x0x \ { 10101x0x00, 10100x0x01, 1010x0010x, 1010xx000x, 1010xx0000, 10100x0x0x, 10100x0x0x}, 101xx0xxxx \ { 101x10xxx0, 101x00xxx1, 1011x0xx0x, 1010x0xx1x, 101xx0xxx0, 101xx0x0x0, 101xx0011x, 101x00xxxx, 101100xxxx, 101000xxxx}} {1xx00 \ {11x00, 1x000, 10000}, 0xx1x \ {0x011, 0x110, 00111}} {xx010 \ {1x010, 00010, 0x010}, 1xxx0 \ {10010, 10110, 110x0}} { 1xx001xx00 \ { 1xx0011x00, 1xx001x000, 1xx0010000, 110001xx00}, xx0100xx10 \ { xx0100x110, 1x0100xx10, 000100xx10, 0x0100xx10}, 1xx100xx10 \ { 1xx100x110, 100100xx10, 101100xx10, 110100xx10}} {x00xx \ {1000x, 10001, 00000}, x0x1x \ {1001x, 10110}, 1xx10 \ {11010, 11x10}} {1xx10 \ {10x10, 10010}} { 1xx10x0010 \ { 10x10x0010, 10010x0010}, 1xx10x0x10 \ { 1xx1010010, 1xx1010110, 10x10x0x10, 10010x0x10}, 1xx101xx10 \ { 1xx1011010, 1xx1011x10, 10x101xx10, 100101xx10}} {0x010 \ {00010, 01010}} {x100x \ {01000, 11000, 11000}, x100x \ {11000, 01001}} {} {} {1x1x1 \ {10111, 11111}} {} {10x11 \ {10111, 10011}} {1000x \ {10001, 10000}} {} {x00xx \ {10011, x00x0, 100x1}, xxxx1 \ {0x0x1, x1001, xx111}} {xx010 \ {x0010, 1x010, 1x010}, xxx01 \ {11101, 11x01, 10001}} { xx010x0010 \ { xx010x0010, x0010x0010, 1x010x0010, 1x010x0010}, xxx01x0001 \ { xxx0110001, 11101x0001, 11x01x0001, 10001x0001}, xxx01xxx01 \ { xxx010x001, xxx01x1001, 11101xxx01, 11x01xxx01, 10001xxx01}} {1x0xx \ {1000x, 10011, 110x1}, xx011 \ {x0011, 00011, 1x011}} {0x1xx \ {001x1, 00110, 0x1x0}} { 0x1xx1x0xx \ { 0x1x11x0x0, 0x1x01x0x1, 0x11x1x00x, 0x10x1x01x, 0x1xx1000x, 0x1xx10011, 0x1xx110x1, 001x11x0xx, 001101x0xx, 0x1x01x0xx}, 0x111xx011 \ { 0x111x0011, 0x11100011, 0x1111x011, 00111xx011}} {xx101 \ {11101, 0x101, x0101}} {x1xxx \ {11x0x, 0110x, 11xx0}, 10xxx \ {10xx1, 100x1, 10xx0}} { x1x01xx101 \ { x1x0111101, x1x010x101, x1x01x0101, 11x01xx101, 01101xx101}, 10x01xx101 \ { 10x0111101, 10x010x101, 10x01x0101, 10x01xx101, 10001xx101}} {01x0x \ {0100x, 01001}} {} {} {0x11x \ {0x111, 00111, 00111}} {x01x0 \ {x0100, 00100, 001x0}} { x01100x110 \ { 001100x110}} {10xx0 \ {10x10, 100x0, 10000}, xx0x1 \ {x0001, xx011, 1x011}} {x1x0x \ {x1x01, 1100x, 11x01}, x1xxx \ {01x01, 01xx0, 01x10}, x1101 \ {01101, 11101}} { x1x0010x00 \ { x1x0010000, x1x0010000, 1100010x00}, x1xx010xx0 \ { x1x1010x00, x1x0010x10, x1xx010x10, x1xx0100x0, x1xx010000, 01xx010xx0, 01x1010xx0}, x1x01xx001 \ { x1x01x0001, x1x01xx001, 11001xx001, 11x01xx001}, x1xx1xx0x1 \ { x1x11xx001, x1x01xx011, x1xx1x0001, x1xx1xx011, x1xx11x011, 01x01xx0x1}, x1101xx001 \ { x1101x0001, 01101xx001, 11101xx001}} {x0001 \ {10001, 00001, 00001}} {x10xx \ {110x1, 0100x, 110xx}, x1xx0 \ {110x0, 11x10, x10x0}, 0x010 \ {00010, 01010}} { x1001x0001 \ { x100110001, x100100001, x100100001, 11001x0001, 01001x0001, 11001x0001}} {00xxx \ {00001, 00x0x, 00x0x}, 00xx0 \ {00x00, 00010}, x0x10 \ {10010, 00110, 00110}} {0x0xx \ {0100x, 0x01x, 0x00x}, 0x00x \ {0100x, 00000}} { 0x0xx00xxx \ { 0x0x100xx0, 0x0x000xx1, 0x01x00x0x, 0x00x00x1x, 0x0xx00001, 0x0xx00x0x, 0x0xx00x0x, 0100x00xxx, 0x01x00xxx, 0x00x00xxx}, 0x00x00x0x \ { 0x00100x00, 0x00000x01, 0x00x00001, 0x00x00x0x, 0x00x00x0x, 0100x00x0x, 0000000x0x}, 0x0x000xx0 \ { 0x01000x00, 0x00000x10, 0x0x000x00, 0x0x000010, 0100000xx0, 0x01000xx0, 0x00000xx0}, 0x00000x00 \ { 0x00000x00, 0100000x00, 0000000x00}, 0x010x0x10 \ { 0x01010010, 0x01000110, 0x01000110, 0x010x0x10}} {x10xx \ {x1011, 110x0, 01010}} {xxx0x \ {11001, 0x101, 1110x}, x0010 \ {00010}, 0xxx0 \ {0x100, 011x0, 0x0x0}} { xxx0xx100x \ { xxx01x1000, xxx00x1001, xxx0x11000, 11001x100x, 0x101x100x, 1110xx100x}, x0010x1010 \ { x001011010, x001001010, 00010x1010}, 0xxx0x10x0 \ { 0xx10x1000, 0xx00x1010, 0xxx0110x0, 0xxx001010, 0x100x10x0, 011x0x10x0, 0x0x0x10x0}} {00x10 \ {00010}} {0xx11 \ {01x11, 01111, 01111}, 0xx1x \ {01x11, 0111x, 00110}, 011x0 \ {01100}} { 0xx1000x10 \ { 0xx1000010, 0111000x10, 0011000x10}, 0111000x10 \ { 0111000010}} {x0x1x \ {0011x, x0110, 10x1x}} {x01xx \ {x0100, 00101, 10100}} { x011xx0x1x \ { x0111x0x10, x0110x0x11, x011x0011x, x011xx0110, x011x10x1x}} {x0x00 \ {10000, x0100, 10x00}, 001xx \ {001x1, 00100}} {00x0x \ {0010x}, xx111 \ {x1111}} { 00x00x0x00 \ { 00x0010000, 00x00x0100, 00x0010x00, 00100x0x00}, 00x0x0010x \ { 00x0100100, 00x0000101, 00x0x00101, 00x0x00100, 0010x0010x}, xx11100111 \ { xx11100111, x111100111}} {xx01x \ {0x011, 0x010, 11010}} {0xx1x \ {0001x, 0011x, 00111}} { 0xx1xxx01x \ { 0xx11xx010, 0xx10xx011, 0xx1x0x011, 0xx1x0x010, 0xx1x11010, 0001xxx01x, 0011xxx01x, 00111xx01x}} {0x01x \ {01011, 00010}, xx100 \ {1x100, x1100}} {x1x00 \ {01100, x1100, 11x00}} { x1x00xx100 \ { x1x001x100, x1x00x1100, 01100xx100, x1100xx100, 11x00xx100}} {1x0xx \ {110x0, 1001x, 1x011}} {1xx00 \ {10000, 11x00, 1x100}, 0x10x \ {00101, 0110x, 0x101}, 1xxx1 \ {1x111, 10011, 1xx01}} { 1xx001x000 \ { 1xx0011000, 100001x000, 11x001x000, 1x1001x000}, 0x10x1x00x \ { 0x1011x000, 0x1001x001, 0x10x11000, 001011x00x, 0110x1x00x, 0x1011x00x}, 1xxx11x0x1 \ { 1xx111x001, 1xx011x011, 1xxx110011, 1xxx11x011, 1x1111x0x1, 100111x0x1, 1xx011x0x1}} {x01x1 \ {001x1, 10101, 101x1}} {xxxx1 \ {xx111, 1x0x1, x01x1}} { xxxx1x01x1 \ { xxx11x0101, xxx01x0111, xxxx1001x1, xxxx110101, xxxx1101x1, xx111x01x1, 1x0x1x01x1, x01x1x01x1}} {x1xx1 \ {11111, x1111, 11011}} {0101x \ {01010, 01011}, xx010 \ {11010, 01010, 00010}} { 01011x1x11 \ { 0101111111, 01011x1111, 0101111011, 01011x1x11}} {x110x \ {x1101, 0110x, x1100}, 0x0x0 \ {01000, 010x0, 0x010}} {1x0x0 \ {100x0, 110x0, 10010}} { 1x000x1100 \ { 1x00001100, 1x000x1100, 10000x1100, 11000x1100}, 1x0x00x0x0 \ { 1x0100x000, 1x0000x010, 1x0x001000, 1x0x0010x0, 1x0x00x010, 100x00x0x0, 110x00x0x0, 100100x0x0}} {01x1x \ {01x11, 0101x, 01x10}} {11x1x \ {11x10, 11x11}, 110x1 \ {11001}} { 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01x11, 11x1x0101x, 11x1x01x10, 11x1001x1x, 11x1101x1x}, 1101101x11 \ { 1101101x11, 1101101011}} {x10x0 \ {x1000, 11010, x1010}, x010x \ {x0100, 00100, x0101}} {xx011 \ {01011, 0x011}} {} {x0x10 \ {00x10, 10x10, 10010}} {xxx1x \ {x0111, 11111, x001x}, xx0x1 \ {11001, 110x1, xx001}, x001x \ {10011, 00010}} { xxx10x0x10 \ { xxx1000x10, xxx1010x10, xxx1010010, x0010x0x10}, x0010x0x10 \ { x001000x10, x001010x10, x001010010, 00010x0x10}} {0x110 \ {00110, 01110}, x11x0 \ {01110, 01100, x1100}} {00xx1 \ {000x1, 00x11, 001x1}, 100x0 \ {10010, 10000}} { 100100x110 \ { 1001000110, 1001001110, 100100x110}, 100x0x11x0 \ { 10010x1100, 10000x1110, 100x001110, 100x001100, 100x0x1100, 10010x11x0, 10000x11x0}} {1x10x \ {11100, 11101}, 0x1x0 \ {001x0, 0x100, 0x100}} {} {} {xx0x1 \ {xx011, xx001, 110x1}, x1010 \ {01010, 11010}} {x11xx \ {1111x, 11101, 11100}} { x11x1xx0x1 \ { x1111xx001, x1101xx011, x11x1xx011, x11x1xx001, x11x1110x1, 11111xx0x1, 11101xx0x1}, x1110x1010 \ { x111001010, x111011010, 11110x1010}} {x000x \ {00001, 10001}, 10xx1 \ {10x01, 10001, 10x11}} {x10x0 \ {01000, 01010, 11000}, 0x110 \ {01110, 00110}} { x1000x0000 \ { 01000x0000, 11000x0000}} {110xx \ {110x1, 11010}} {0x110 \ {01110, 00110, 00110}, x1100 \ {11100, 01100}} { 0x11011010 \ { 0x11011010, 0111011010, 0011011010, 0011011010}, x110011000 \ { 1110011000, 0110011000}} {1xx1x \ {11111, 1101x, 1x011}} {} {} {1011x \ {10111}} {0x1xx \ {011xx, 0011x}} { 0x11x1011x \ { 0x11110110, 0x11010111, 0x11x10111, 0111x1011x, 0011x1011x}} {110x1 \ {11011, 11001, 11001}} {1xxx0 \ {10x00, 10000, 1xx00}} {} {x0x1x \ {00110, x0x10, x001x}} {110xx \ {11010, 110x1, 1100x}, 1x11x \ {1x110, 1011x, 1011x}} { 1101xx0x1x \ { 11011x0x10, 11010x0x11, 1101x00110, 1101xx0x10, 1101xx001x, 11010x0x1x, 11011x0x1x}, 1x11xx0x1x \ { 1x111x0x10, 1x110x0x11, 1x11x00110, 1x11xx0x10, 1x11xx001x, 1x110x0x1x, 1011xx0x1x, 1011xx0x1x}} {xx1x0 \ {0x1x0, 111x0, x0110}, 0x1x0 \ {001x0, 011x0, 01110}} {x1111 \ {11111, 01111, 01111}} {} {} {100x0 \ {10010, 10000, 10000}, x110x \ {01100, 01101, x1100}} {} {10xx1 \ {10101, 10011, 100x1}, 1x01x \ {10011, 1x010, 10010}} {x0x10 \ {00x10, 10110, x0010}} { x0x101x010 \ { x0x101x010, x0x1010010, 00x101x010, 101101x010, x00101x010}} {x0xx1 \ {x0x01, 00011, 001x1}} {x0x00 \ {10100, 00000, 00x00}} {} {0xxx1 \ {01x01, 010x1, 01011}} {1x10x \ {1010x, 1x101, 11100}} { 1x1010xx01 \ { 1x10101x01, 1x10101001, 101010xx01, 1x1010xx01}} {x0xx0 \ {00100, 00xx0, 00000}} {00x1x \ {00010, 0001x, 00x11}} { 00x10x0x10 \ { 00x1000x10, 00010x0x10, 00010x0x10}} {10xx0 \ {10110, 10x10, 10000}, x01x1 \ {001x1, 00111, 00111}} {} {} {0x11x \ {00111}, 11xx0 \ {11000, 110x0, 11110}, xx100 \ {10100, 00100, 1x100}} {} {} {x111x \ {0111x, x1110}, 00xx1 \ {00x11, 00111}, 1x001 \ {10001}} {x00xx \ {000xx, x00x1, x0001}} { x001xx111x \ { x0011x1110, x0010x1111, x001x0111x, x001xx1110, 0001xx111x, x0011x111x}, x00x100xx1 \ { x001100x01, x000100x11, x00x100x11, x00x100111, 000x100xx1, x00x100xx1, x000100xx1}, x00011x001 \ { x000110001, 000011x001, x00011x001, x00011x001}} {xx0xx \ {xx000, 1x0x1, x0011}} {xx000 \ {01000, 1x000, x0000}, x000x \ {1000x, 00001}} { xx000xx000 \ { xx000xx000, 01000xx000, 1x000xx000, x0000xx000}, x000xxx00x \ { x0001xx000, x0000xx001, x000xxx000, x000x1x001, 1000xxx00x, 00001xx00x}} {x10x0 \ {01000, 010x0}} {x1101 \ {11101, 01101}} {} {} {xx100 \ {01100, 00100, x0100}} {} {1x011 \ {10011, 11011, 11011}} {1x1x1 \ {1x101, 11101}, 10xx1 \ {10011, 10001}} { 1x1111x011 \ { 1x11110011, 1x11111011, 1x11111011}, 10x111x011 \ { 10x1110011, 10x1111011, 10x1111011, 100111x011}} {x1xxx \ {x1111, 11x10, 111x0}, 101x1 \ {10111, 10101}} {x111x \ {1111x, x1111, x1110}} { x111xx1x1x \ { x1111x1x10, x1110x1x11, x111xx1111, x111x11x10, x111x11110, 1111xx1x1x, x1111x1x1x, x1110x1x1x}, x111110111 \ { x111110111, 1111110111, x111110111}} {0xxx1 \ {0x111, 01001, 01011}} {xx001 \ {0x001, x0001}, x011x \ {0011x, x0110, 00110}} { xx0010xx01 \ { xx00101001, 0x0010xx01, x00010xx01}, x01110xx11 \ { x01110x111, x011101011, 001110xx11}} {1x10x \ {1110x, 1010x, 1010x}} {x1xxx \ {01x01, 11x0x, x110x}, 110xx \ {1101x, 11000, 110x0}} { x1x0x1x10x \ { x1x011x100, x1x001x101, x1x0x1110x, x1x0x1010x, x1x0x1010x, 01x011x10x, 11x0x1x10x, x110x1x10x}, 1100x1x10x \ { 110011x100, 110001x101, 1100x1110x, 1100x1010x, 1100x1010x, 110001x10x, 110001x10x}} {x1110 \ {01110, 11110, 11110}} {11x10 \ {11010, 11110, 11110}} { 11x10x1110 \ { 11x1001110, 11x1011110, 11x1011110, 11010x1110, 11110x1110, 11110x1110}} {1011x \ {10111}, x1xx0 \ {01010, x1110, x11x0}, 1xx01 \ {10101, 11001, 10x01}} {} {} {010xx \ {010x1, 01011, 010x0}, x1x01 \ {x1101, 11101}} {x10x0 \ {x1010, 11000, 11010}} { x10x0010x0 \ { x101001000, x100001010, x10x0010x0, x1010010x0, 11000010x0, 11010010x0}} {x1111 \ {11111, 01111, 01111}} {00x10 \ {00010, 00110, 00110}, xx010 \ {00010, x0010, 11010}} {} {x1x10 \ {01110, 11110}} {xx1xx \ {111xx, x010x, 1x100}, 0x1x1 \ {00111, 001x1, 001x1}, 1xx1x \ {1x010, 10010, 1001x}} { xx110x1x10 \ { xx11001110, xx11011110, 11110x1x10}, 1xx10x1x10 \ { 1xx1001110, 1xx1011110, 1x010x1x10, 10010x1x10, 10010x1x10}} {xx111 \ {1x111, 01111, x0111}} {x0xx0 \ {00xx0, 10110, x0x00}, 0x0xx \ {00001, 0100x, 01001}} { 0x011xx111 \ { 0x0111x111, 0x01101111, 0x011x0111}} {1xx00 \ {11x00, 10x00}, 11xx0 \ {11x00, 11100}} {1x111 \ {10111, 11111}, 10xx0 \ {10000, 10100, 10010}} { 10x001xx00 \ { 10x0011x00, 10x0010x00, 100001xx00, 101001xx00}, 10xx011xx0 \ { 10x1011x00, 10x0011x10, 10xx011x00, 10xx011100, 1000011xx0, 1010011xx0, 1001011xx0}} {01xx1 \ {01001, 01101, 01x11}, 1xxx0 \ {11x00, 1xx00, 10x10}} {0100x \ {01000, 01001}} { 0100101x01 \ { 0100101001, 0100101101, 0100101x01}, 010001xx00 \ { 0100011x00, 010001xx00, 010001xx00}} {0x01x \ {0x011, 01011}} {01xx1 \ {010x1, 01x01, 01x11}} { 01x110x011 \ { 01x110x011, 01x1101011, 010110x011, 01x110x011}} {1x1x1 \ {10101, 1x101}, 010xx \ {010x0, 01000, 01000}} {x01x1 \ {x0101, 00111}, 11x0x \ {11100, 11x01, 1100x}, 1x10x \ {1110x, 1x101, 11101}} { x01x11x1x1 \ { x01111x101, x01011x111, x01x110101, x01x11x101, x01011x1x1, 001111x1x1}, 11x011x101 \ { 11x0110101, 11x011x101, 11x011x101, 110011x101}, 1x1011x101 \ { 1x10110101, 1x1011x101, 111011x101, 1x1011x101, 111011x101}, x01x1010x1 \ { x011101001, x010101011, x0101010x1, 00111010x1}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01000, 11x0x01000, 11x0x01000, 111000100x, 11x010100x, 1100x0100x}, 1x10x0100x \ { 1x10101000, 1x10001001, 1x10x01000, 1x10x01000, 1x10x01000, 1110x0100x, 1x1010100x, 111010100x}} {} {x0111 \ {00111}} {} {xx011 \ {11011, 01011, 0x011}, 001x1 \ {00111}} {x1x01 \ {11001, 01x01, 11101}, 10xx1 \ {10001, 10111, 10x01}} { 10x11xx011 \ { 10x1111011, 10x1101011, 10x110x011, 10111xx011}, x1x0100101 \ { 1100100101, 01x0100101, 1110100101}, 10xx1001x1 \ { 10x1100101, 10x0100111, 10xx100111, 10001001x1, 10111001x1, 10x01001x1}} {} {xxxxx \ {011x1, x0x0x, 00x00}, x11x1 \ {01111}, 000x0 \ {00000}} {} {xx011 \ {00011, 11011, 01011}, x01xx \ {x01x1, x01x0, 101x0}} {} {} {x0xx0 \ {x0100, 00xx0}, x11x0 \ {01110, 011x0, 011x0}} {x0x10 \ {00010, 00110, x0110}, x1011 \ {11011, 01011, 01011}, 1111x \ {11110, 11111, 11111}} { x0x10x0x10 \ { x0x1000x10, 00010x0x10, 00110x0x10, x0110x0x10}, 11110x0x10 \ { 1111000x10, 11110x0x10}, x0x10x1110 \ { x0x1001110, x0x1001110, x0x1001110, 00010x1110, 00110x1110, x0110x1110}, 11110x1110 \ { 1111001110, 1111001110, 1111001110, 11110x1110}} {1xx1x \ {10x1x, 10x11, 1111x}, 0xx01 \ {01x01, 00101, 00001}} {xxxx1 \ {10xx1, 1x0x1, x1x01}, x10xx \ {x100x, x10x1, 01011}, x0101 \ {10101, 00101}} { xxx111xx11 \ { xxx1110x11, xxx1110x11, xxx1111111, 10x111xx11, 1x0111xx11}, x101x1xx1x \ { x10111xx10, x10101xx11, x101x10x1x, x101x10x11, x101x1111x, x10111xx1x, 010111xx1x}, xxx010xx01 \ { xxx0101x01, xxx0100101, xxx0100001, 10x010xx01, 1x0010xx01, x1x010xx01}, x10010xx01 \ { x100101x01, x100100101, x100100001, x10010xx01, x10010xx01}, x01010xx01 \ { x010101x01, x010100101, x010100001, 101010xx01, 001010xx01}} {000xx \ {00011, 0000x, 00001}} {1xxxx \ {1x110, 10x0x, 1xx01}, x11xx \ {111xx, 0110x, 11100}, 10xxx \ {1000x, 10000, 101xx}} { 1xxxx000xx \ { 1xxx1000x0, 1xxx0000x1, 1xx1x0000x, 1xx0x0001x, 1xxxx00011, 1xxxx0000x, 1xxxx00001, 1x110000xx, 10x0x000xx, 1xx01000xx}, x11xx000xx \ { x11x1000x0, x11x0000x1, x111x0000x, x110x0001x, x11xx00011, x11xx0000x, x11xx00001, 111xx000xx, 0110x000xx, 11100000xx}, 10xxx000xx \ { 10xx1000x0, 10xx0000x1, 10x1x0000x, 10x0x0001x, 10xxx00011, 10xxx0000x, 10xxx00001, 1000x000xx, 10000000xx, 101xx000xx}} {} {x010x \ {10100, 00101, 0010x}} {} {xxxx0 \ {100x0, 011x0, 11000}} {xx0x0 \ {xx000, 1x010}, 0xxx1 \ {0xx01, 00xx1, 001x1}, 0x01x \ {0101x, 01010}} { xx0x0xxxx0 \ { xx010xxx00, xx000xxx10, xx0x0100x0, xx0x0011x0, xx0x011000, xx000xxxx0, 1x010xxxx0}, 0x010xxx10 \ { 0x01010010, 0x01001110, 01010xxx10, 01010xxx10}} {1x111 \ {11111, 10111}} {0x01x \ {01010, 01011}, 100xx \ {10010, 100x0, 1001x}, x11x0 \ {11110, 01110}} { 0x0111x111 \ { 0x01111111, 0x01110111, 010111x111}, 100111x111 \ { 1001111111, 1001110111, 100111x111}} {x11x1 \ {111x1, 11101, 01101}} {} {} {0x1x0 \ {011x0, 0x100, 0x100}, 1xxx0 \ {1x100, 1x0x0}} {xx101 \ {1x101, 11101}, 1xx00 \ {10x00, 1x000, 11x00}, x110x \ {0110x, 01101, 11100}} { 1xx000x100 \ { 1xx0001100, 1xx000x100, 1xx000x100, 10x000x100, 1x0000x100, 11x000x100}, x11000x100 \ { x110001100, x11000x100, x11000x100, 011000x100, 111000x100}, 1xx001xx00 \ { 1xx001x100, 1xx001x000, 10x001xx00, 1x0001xx00, 11x001xx00}, x11001xx00 \ { x11001x100, x11001x000, 011001xx00, 111001xx00}} {x0xx1 \ {x01x1, 00001, 00xx1}, 101xx \ {1010x, 101x0, 10111}} {11x1x \ {1101x, 11111, 11011}, x11x1 \ {x1101, x1111}} { 11x11x0x11 \ { 11x11x0111, 11x1100x11, 11011x0x11, 11111x0x11, 11011x0x11}, x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x1x01x1, x11x100001, x11x100xx1, x1101x0xx1, x1111x0xx1}, 11x1x1011x \ { 11x1110110, 11x1010111, 11x1x10110, 11x1x10111, 1101x1011x, 111111011x, 110111011x}, x11x1101x1 \ { x111110101, x110110111, x11x110101, x11x110111, x1101101x1, x1111101x1}} {x0xx0 \ {000x0, 001x0, 00010}, x011x \ {00110, 1011x, 1011x}} {} {} {x1100 \ {11100}, xx110 \ {x1110, 1x110}} {x1xx0 \ {01010, 11010, x1110}, x111x \ {11110, x1111}} { x1x00x1100 \ { x1x0011100}, x1x10xx110 \ { x1x10x1110, x1x101x110, 01010xx110, 11010xx110, x1110xx110}, x1110xx110 \ { x1110x1110, x11101x110, 11110xx110}} {1x1x1 \ {10101, 11101, 101x1}} {xx111 \ {0x111, 10111}, 0xxx1 \ {0x111, 001x1, 01101}, xxx01 \ {01x01, 0xx01, 11001}} { xx1111x111 \ { xx11110111, 0x1111x111, 101111x111}, 0xxx11x1x1 \ { 0xx111x101, 0xx011x111, 0xxx110101, 0xxx111101, 0xxx1101x1, 0x1111x1x1, 001x11x1x1, 011011x1x1}, xxx011x101 \ { xxx0110101, xxx0111101, xxx0110101, 01x011x101, 0xx011x101, 110011x101}} {xxx10 \ {xx010, x1110, 11010}} {xx1x0 \ {00110, x0110, x1110}} { xx110xxx10 \ { xx110xx010, xx110x1110, xx11011010, 00110xxx10, x0110xxx10, x1110xxx10}} {xxx01 \ {11001, 00x01, 10001}} {00xxx \ {00x01, 0000x, 001x0}} { 00x01xxx01 \ { 00x0111001, 00x0100x01, 00x0110001, 00x01xxx01, 00001xxx01}} {x00x0 \ {00000, x0010, 00010}, xx110 \ {10110, 1x110, 00110}, 10xx0 \ {10100, 10x00, 10010}} {} {} {10xx1 \ {10001, 10101, 10101}, 10x1x \ {10011, 10111, 10x10}, 10x1x \ {10010, 1011x}} {01xx0 \ {011x0, 01x10}, 0x000 \ {00000, 01000, 01000}} { 01x1010x10 \ { 01x1010x10, 0111010x10, 01x1010x10}} {11xx0 \ {11x10, 11100, 11010}} {} {} {} {x0x01 \ {x0101, 00101, 10x01}, 11x1x \ {11011, 1101x, 11110}, 01xx1 \ {01011, 01111, 010x1}} {} {xx10x \ {1010x, 10100, 11100}, 101x0 \ {10110, 10100}, xx100 \ {10100, x1100, 00100}} {xxxx1 \ {110x1, x1111, x1011}, xx100 \ {00100, x1100, x0100}} { xxx01xx101 \ { xxx0110101, 11001xx101}, xx100xx100 \ { xx10010100, xx10010100, xx10011100, 00100xx100, x1100xx100, x0100xx100}, xx10010100 \ { xx10010100, 0010010100, x110010100, x010010100}} {0xxx1 \ {010x1, 00xx1, 01x11}} {x111x \ {11110, x1111, 01110}} { x11110xx11 \ { x111101011, x111100x11, x111101x11, x11110xx11}} {x001x \ {00011, 10011, x0011}} {} {} {1001x \ {10011, 10010}, 01xxx \ {0101x, 011xx, 01x00}} {x11x0 \ {01100, x1100, 01110}, x11x1 \ {011x1, 111x1, 111x1}} { x111010010 \ { x111010010, 0111010010}, x111110011 \ { x111110011, 0111110011, 1111110011, 1111110011}, x11x001xx0 \ { x111001x00, x110001x10, x11x001010, x11x0011x0, x11x001x00, 0110001xx0, x110001xx0, 0111001xx0}, x11x101xx1 \ { x111101x01, x110101x11, x11x101011, x11x1011x1, 011x101xx1, 111x101xx1, 111x101xx1}} {01x1x \ {01011, 01x11}, 1x00x \ {1x001, 1x000, 10001}} {000x1 \ {00011}} { 0001101x11 \ { 0001101011, 0001101x11, 0001101x11}, 000011x001 \ { 000011x001, 0000110001}} {00x1x \ {00011, 00110}, 0xx01 \ {0x001, 01101, 01101}} {x011x \ {00110, x0110}} { x011x00x1x \ { x011100x10, x011000x11, x011x00011, x011x00110, 0011000x1x, x011000x1x}} {110xx \ {11010, 110x1, 110x0}, 10xx0 \ {10000, 10110, 101x0}} {0x1x0 \ {01110, 011x0}} { 0x1x0110x0 \ { 0x11011000, 0x10011010, 0x1x011010, 0x1x0110x0, 01110110x0, 011x0110x0}, 0x1x010xx0 \ { 0x11010x00, 0x10010x10, 0x1x010000, 0x1x010110, 0x1x0101x0, 0111010xx0, 011x010xx0}} {11x0x \ {11100, 1110x, 11001}, 10xx0 \ {101x0, 10110, 10100}, 000xx \ {000x0, 00010, 00000}} {x0xx0 \ {00110, x00x0, x0x00}} { x0x0011x00 \ { x0x0011100, x0x0011100, x000011x00, x0x0011x00}, x0xx010xx0 \ { x0x1010x00, x0x0010x10, x0xx0101x0, x0xx010110, x0xx010100, 0011010xx0, x00x010xx0, x0x0010xx0}, x0xx0000x0 \ { x0x1000000, x0x0000010, x0xx0000x0, x0xx000010, x0xx000000, 00110000x0, x00x0000x0, x0x00000x0}} {x00x0 \ {100x0, 10000}, 0x0x1 \ {00001}} {xx0xx \ {000xx, xx010, 1x010}, x00xx \ {x0000, x00x0, 00011}} { xx0x0x00x0 \ { xx010x0000, xx000x0010, xx0x0100x0, xx0x010000, 000x0x00x0, xx010x00x0, 1x010x00x0}, x00x0x00x0 \ { x0010x0000, x0000x0010, x00x0100x0, x00x010000, x0000x00x0, x00x0x00x0}, xx0x10x0x1 \ { xx0110x001, xx0010x011, xx0x100001, 000x10x0x1}, x00x10x0x1 \ { x00110x001, x00010x011, x00x100001, 000110x0x1}} {xxx01 \ {01001, 00001, 10001}} {x01xx \ {10100, 0010x, 001x0}, x101x \ {x1010, 01010, 11011}} { x0101xxx01 \ { x010101001, x010100001, x010110001, 00101xxx01}} {100x1 \ {10001}} {0x1x0 \ {001x0, 01100, 0x100}, x10x1 \ {11001, x1001, x1011}} { x10x1100x1 \ { x101110001, x100110011, x10x110001, 11001100x1, x1001100x1, x1011100x1}} {xx101 \ {1x101, 01101, x1101}, 0xx11 \ {00011, 01111}} {00xx1 \ {00111, 00x11}, 011x1 \ {01111}} { 00x01xx101 \ { 00x011x101, 00x0101101, 00x01x1101}, 01101xx101 \ { 011011x101, 0110101101, 01101x1101}, 00x110xx11 \ { 00x1100011, 00x1101111, 001110xx11, 00x110xx11}, 011110xx11 \ { 0111100011, 0111101111, 011110xx11}} {} {1x100 \ {10100, 11100}, xx01x \ {11011, 10010, xx011}} {} {0001x \ {00011, 00010}} {00xxx \ {00010, 0011x, 0011x}, xx1x1 \ {1x111, xx111, 1x1x1}} { 00x1x0001x \ { 00x1100010, 00x1000011, 00x1x00011, 00x1x00010, 000100001x, 0011x0001x, 0011x0001x}, xx11100011 \ { xx11100011, 1x11100011, xx11100011, 1x11100011}} {xx100 \ {11100, x0100, 0x100}, 00xxx \ {00100, 00000}} {xxx11 \ {x1x11, x1111, 0xx11}, x110x \ {01101, x1101, 0110x}} { x1100xx100 \ { x110011100, x1100x0100, x11000x100, 01100xx100}, xxx1100x11 \ { x1x1100x11, x111100x11, 0xx1100x11}, x110x00x0x \ { x110100x00, x110000x01, x110x00100, x110x00000, 0110100x0x, x110100x0x, 0110x00x0x}} {x11x0 \ {01100, 111x0}, x1111 \ {11111, 01111}, xxx00 \ {1xx00, 01100}} {1xx01 \ {10001, 11101, 1x101}} {} {x0100 \ {10100, 00100, 00100}} {000x0 \ {00000, 00010}} { 00000x0100 \ { 0000010100, 0000000100, 0000000100, 00000x0100}} {0x0x1 \ {000x1, 0x011, 010x1}} {1x0x1 \ {100x1, 11011, 1x011}, xx10x \ {x0101, x1100, 11101}} { 1x0x10x0x1 \ { 1x0110x001, 1x0010x011, 1x0x1000x1, 1x0x10x011, 1x0x1010x1, 100x10x0x1, 110110x0x1, 1x0110x0x1}, xx1010x001 \ { xx10100001, xx10101001, x01010x001, 111010x001}} {} {0x11x \ {0011x, 00110, 00111}, 001x0 \ {00110, 00100, 00100}} {} {} {xxx10 \ {01010, 1xx10}, 0x11x \ {0011x, 00111, 0111x}} {} {} {1101x \ {11011}, 1xx10 \ {1x010, 1x110, 11010}} {} {} {xxx11 \ {1xx11, 0x011, xx011}, 10x0x \ {1000x, 10100, 10001}, 00x1x \ {00x11, 00011, 00010}} {} {1x01x \ {11010, 1x011}, 1x0xx \ {1x001, 1x010, 1x0x1}} {} {} {xx00x \ {0x000, 0x00x, 00000}} {xx010 \ {00010, 0x010, 0x010}, 011xx \ {0110x, 01111, 0111x}} { 0110xxx00x \ { 01101xx000, 01100xx001, 0110x0x000, 0110x0x00x, 0110x00000, 0110xxx00x}} {xx1x1 \ {x1101, 1x111, 0x101}, xxx00 \ {x1000, x1100, 01x00}} {1xx01 \ {11x01, 1x101, 11001}, 0x010 \ {01010, 00010}, 10x0x \ {10100, 10x01}} { 1xx01xx101 \ { 1xx01x1101, 1xx010x101, 11x01xx101, 1x101xx101, 11001xx101}, 10x01xx101 \ { 10x01x1101, 10x010x101, 10x01xx101}, 10x00xxx00 \ { 10x00x1000, 10x00x1100, 10x0001x00, 10100xxx00}} {0xx00 \ {01000, 00100, 0x100}} {x1x01 \ {x1101, 01x01}} {} {1xx00 \ {10100, 11100, 10x00}, xx01x \ {1001x, x0011, 00010}} {01xx0 \ {01100, 01010, 01x00}, 11x1x \ {1111x, 11011, 11010}} { 01x001xx00 \ { 01x0010100, 01x0011100, 01x0010x00, 011001xx00, 01x001xx00}, 01x10xx010 \ { 01x1010010, 01x1000010, 01010xx010}, 11x1xxx01x \ { 11x11xx010, 11x10xx011, 11x1x1001x, 11x1xx0011, 11x1x00010, 1111xxx01x, 11011xx01x, 11010xx01x}} {010x0 \ {01000, 01010, 01010}, xx10x \ {1010x, 0x10x, x110x}, x11xx \ {x110x, x11x0, x1110}} {x1xx0 \ {011x0, 01010, 01010}} { x1xx0010x0 \ { x1x1001000, x1x0001010, x1xx001000, x1xx001010, x1xx001010, 011x0010x0, 01010010x0, 01010010x0}, x1x00xx100 \ { x1x0010100, x1x000x100, x1x00x1100, 01100xx100}, x1xx0x11x0 \ { x1x10x1100, x1x00x1110, x1xx0x1100, x1xx0x11x0, x1xx0x1110, 011x0x11x0, 01010x11x0, 01010x11x0}} {x10x0 \ {010x0, 110x0, 11000}, x0x1x \ {00x10, x001x, 00011}} {xx0x0 \ {x10x0, xx000, 1x010}} { xx0x0x10x0 \ { xx010x1000, xx000x1010, xx0x0010x0, xx0x0110x0, xx0x011000, x10x0x10x0, xx000x10x0, 1x010x10x0}, xx010x0x10 \ { xx01000x10, xx010x0010, x1010x0x10, 1x010x0x10}} {xxx11 \ {01011, 10x11, 1x111}, 10xx1 \ {10x11, 101x1}, x00x1 \ {10011, 00011}} {1x11x \ {10111, 1x111, 10110}, 1xx11 \ {10111, 11111, 1x111}} { 1x111xxx11 \ { 1x11101011, 1x11110x11, 1x1111x111, 10111xxx11, 1x111xxx11}, 1xx11xxx11 \ { 1xx1101011, 1xx1110x11, 1xx111x111, 10111xxx11, 11111xxx11, 1x111xxx11}, 1x11110x11 \ { 1x11110x11, 1x11110111, 1011110x11, 1x11110x11}, 1xx1110x11 \ { 1xx1110x11, 1xx1110111, 1011110x11, 1111110x11, 1x11110x11}, 1x111x0011 \ { 1x11110011, 1x11100011, 10111x0011, 1x111x0011}, 1xx11x0011 \ { 1xx1110011, 1xx1100011, 10111x0011, 11111x0011, 1x111x0011}} {xx1x0 \ {1x110, x0100, xx100}} {xx0x0 \ {x00x0, x1010, 110x0}} { xx0x0xx1x0 \ { xx010xx100, xx000xx110, xx0x01x110, xx0x0x0100, xx0x0xx100, x00x0xx1x0, x1010xx1x0, 110x0xx1x0}} {1xxx1 \ {10x11, 10111, 10x01}, 1110x \ {11101, 11100, 11100}} {xx010 \ {x1010, 01010}} {} {} {11x01 \ {11101, 11001, 11001}} {} {1xx0x \ {1x00x, 1110x, 11000}} {} {} {xx10x \ {x110x, 00100, 0010x}, 11x0x \ {11000, 11100, 1100x}} {01xxx \ {010xx, 01010, 0111x}} { 01x0xxx10x \ { 01x01xx100, 01x00xx101, 01x0xx110x, 01x0x00100, 01x0x0010x, 0100xxx10x}, 01x0x11x0x \ { 01x0111x00, 01x0011x01, 01x0x11000, 01x0x11100, 01x0x1100x, 0100x11x0x}} {} {0x0x0 \ {0x000, 00000, 010x0}, x0x00 \ {00x00, 10x00, 10x00}, xxxx0 \ {x0x10, 01110, 100x0}} {} {01x00 \ {01100}} {xxx1x \ {x1x1x, xxx11, 00x10}} {} {0x1xx \ {0x11x, 0x110, 0x111}, 1xxx1 \ {11x11, 11x01, 10101}} {10xxx \ {10111, 10x00, 10x01}, x10xx \ {1100x, x1011, 010xx}, 011x1 \ {01101}} { 10xxx0x1xx \ { 10xx10x1x0, 10xx00x1x1, 10x1x0x10x, 10x0x0x11x, 10xxx0x11x, 10xxx0x110, 10xxx0x111, 101110x1xx, 10x000x1xx, 10x010x1xx}, x10xx0x1xx \ { x10x10x1x0, x10x00x1x1, x101x0x10x, x100x0x11x, x10xx0x11x, x10xx0x110, x10xx0x111, 1100x0x1xx, x10110x1xx, 010xx0x1xx}, 011x10x1x1 \ { 011110x101, 011010x111, 011x10x111, 011x10x111, 011010x1x1}, 10xx11xxx1 \ { 10x111xx01, 10x011xx11, 10xx111x11, 10xx111x01, 10xx110101, 101111xxx1, 10x011xxx1}, x10x11xxx1 \ { x10111xx01, x10011xx11, x10x111x11, x10x111x01, x10x110101, 110011xxx1, x10111xxx1, 010x11xxx1}, 011x11xxx1 \ { 011111xx01, 011011xx11, 011x111x11, 011x111x01, 011x110101, 011011xxx1}} {x1111 \ {11111, 01111}, 1x101 \ {10101}} {1xx11 \ {10x11, 10011, 1x011}, x11x1 \ {01111, 111x1, 11101}, 10x0x \ {1010x, 10000, 10x01}} { 1xx11x1111 \ { 1xx1111111, 1xx1101111, 10x11x1111, 10011x1111, 1x011x1111}, x1111x1111 \ { x111111111, x111101111, 01111x1111, 11111x1111}, x11011x101 \ { x110110101, 111011x101, 111011x101}, 10x011x101 \ { 10x0110101, 101011x101, 10x011x101}} {0xx0x \ {01101, 01x0x, 01x00}} {x00x1 \ {00001, 000x1, x0011}, x01x0 \ {00100, x0110}} { x00010xx01 \ { x000101101, x000101x01, 000010xx01, 000010xx01}, x01000xx00 \ { x010001x00, x010001x00, 001000xx00}} {1x1xx \ {111x0, 10101, 11111}} {x1xx1 \ {011x1, 01x11, x1x01}, x1x1x \ {01110, 11111, 0101x}, 1xxxx \ {1001x, 10010, 11x01}} { x1xx11x1x1 \ { x1x111x101, x1x011x111, x1xx110101, x1xx111111, 011x11x1x1, 01x111x1x1, x1x011x1x1}, x1x1x1x11x \ { x1x111x110, x1x101x111, x1x1x11110, x1x1x11111, 011101x11x, 111111x11x, 0101x1x11x}, 1xxxx1x1xx \ { 1xxx11x1x0, 1xxx01x1x1, 1xx1x1x10x, 1xx0x1x11x, 1xxxx111x0, 1xxxx10101, 1xxxx11111, 1001x1x1xx, 100101x1xx, 11x011x1xx}} {1xxx1 \ {10111, 1x101, 1xx01}} {110x1 \ {11011}, x0x01 \ {10101, 00001, 00001}} { 110x11xxx1 \ { 110111xx01, 110011xx11, 110x110111, 110x11x101, 110x11xx01, 110111xxx1}, x0x011xx01 \ { x0x011x101, x0x011xx01, 101011xx01, 000011xx01, 000011xx01}} {} {0x100 \ {01100}, xx11x \ {11110, 0x110, xx111}} {} {x110x \ {01100, x1101, 1110x}} {xxx0x \ {0010x, 0x001, 01100}} { xxx0xx110x \ { xxx01x1100, xxx00x1101, xxx0x01100, xxx0xx1101, xxx0x1110x, 0010xx110x, 0x001x110x, 01100x110x}} {xxx0x \ {0x101, 11x01, x0x0x}, 1xx00 \ {11000, 10000, 1x100}, x1010 \ {11010}} {} {} {} {10x0x \ {10100, 1000x, 10x01}} {} {10x0x \ {10100, 1010x}} {x1xx1 \ {x1x11, 01111, x1111}, 00x11 \ {00011}} { x1x0110x01 \ { x1x0110101}} {0xxx1 \ {01x01, 000x1, 01x11}, xx11x \ {x1110, 10111, 1x11x}} {1x11x \ {1x111, 11110, 1111x}, 110x0 \ {11010}} { 1x1110xx11 \ { 1x11100011, 1x11101x11, 1x1110xx11, 111110xx11}, 1x11xxx11x \ { 1x111xx110, 1x110xx111, 1x11xx1110, 1x11x10111, 1x11x1x11x, 1x111xx11x, 11110xx11x, 1111xxx11x}, 11010xx110 \ { 11010x1110, 110101x110, 11010xx110}} {xx0x0 \ {01010, 110x0, 000x0}, x1x0x \ {01x01, 01x00, x1000}, 10xx1 \ {10001, 10101, 10101}} {001x0 \ {00110, 00100}} { 001x0xx0x0 \ { 00110xx000, 00100xx010, 001x001010, 001x0110x0, 001x0000x0, 00110xx0x0, 00100xx0x0}, 00100x1x00 \ { 0010001x00, 00100x1000, 00100x1x00}} {} {00xx1 \ {00001, 00x01, 00101}, x0xx1 \ {00xx1, x0x01}} {} {x11x1 \ {01101, 11111}} {10xx1 \ {10101, 10x01, 10001}, 101x1 \ {10111, 10101}, x0x11 \ {x0111, x0011, x0011}} { 10xx1x11x1 \ { 10x11x1101, 10x01x1111, 10xx101101, 10xx111111, 10101x11x1, 10x01x11x1, 10001x11x1}, 101x1x11x1 \ { 10111x1101, 10101x1111, 101x101101, 101x111111, 10111x11x1, 10101x11x1}, x0x11x1111 \ { x0x1111111, x0111x1111, x0011x1111, x0011x1111}} {1x1xx \ {111xx, 101x0, 1x11x}, x101x \ {0101x, x1010, 11010}, 0xxx0 \ {0xx10, 00000, 00x00}} {10x11 \ {10011}, x010x \ {10100, 0010x}, 00xxx \ {00x01, 00xx1, 00101}} { 10x111x111 \ { 10x1111111, 10x111x111, 100111x111}, x010x1x10x \ { x01011x100, x01001x101, x010x1110x, x010x10100, 101001x10x, 0010x1x10x}, 00xxx1x1xx \ { 00xx11x1x0, 00xx01x1x1, 00x1x1x10x, 00x0x1x11x, 00xxx111xx, 00xxx101x0, 00xxx1x11x, 00x011x1xx, 00xx11x1xx, 001011x1xx}, 10x11x1011 \ { 10x1101011, 10011x1011}, 00x1xx101x \ { 00x11x1010, 00x10x1011, 00x1x0101x, 00x1xx1010, 00x1x11010, 00x11x101x}, x01000xx00 \ { x010000000, x010000x00, 101000xx00, 001000xx00}, 00xx00xxx0 \ { 00x100xx00, 00x000xx10, 00xx00xx10, 00xx000000, 00xx000x00}} {xxx1x \ {01x11, 00010, x0x1x}} {x1110 \ {01110, 11110}} { x1110xxx10 \ { x111000010, x1110x0x10, 01110xxx10, 11110xxx10}} {x0x10 \ {10110, 00010, 10010}, x001x \ {x0010, 00011, 10010}, 0xx1x \ {0011x, 0xx10, 00010}} {11x0x \ {11x00, 11100}, 01x1x \ {01011, 01010, 0111x}} { 01x10x0x10 \ { 01x1010110, 01x1000010, 01x1010010, 01010x0x10, 01110x0x10}, 01x1xx001x \ { 01x11x0010, 01x10x0011, 01x1xx0010, 01x1x00011, 01x1x10010, 01011x001x, 01010x001x, 0111xx001x}, 01x1x0xx1x \ { 01x110xx10, 01x100xx11, 01x1x0011x, 01x1x0xx10, 01x1x00010, 010110xx1x, 010100xx1x, 0111x0xx1x}} {} {x0x01 \ {10x01, 00x01, x0101}, 01xx0 \ {01000, 010x0, 01110}} {} {0x1x0 \ {01100, 00100, 01110}, xxx11 \ {01111, x1x11, 0x011}} {} {} {} {} {} {0xx1x \ {01010, 0xx11, 01110}, 0x1xx \ {01110, 001x0, 0x110}} {010x0 \ {01010}} { 010100xx10 \ { 0101001010, 0101001110, 010100xx10}, 010x00x1x0 \ { 010100x100, 010000x110, 010x001110, 010x0001x0, 010x00x110, 010100x1x0}} {11xxx \ {111x1, 11101}} {} {} {xx000 \ {01000, x0000, 10000}} {x000x \ {00001, x0001, x0001}} { x0000xx000 \ { x000001000, x0000x0000, x000010000}} {00x1x \ {0001x, 00x11, 0011x}, xxx10 \ {0xx10, 0x010, 1xx10}} {0xxx1 \ {010x1, 01111, 00xx1}, 1xx01 \ {11x01, 10101, 10001}, 00x1x \ {00111, 0001x, 00x10}} { 0xx1100x11 \ { 0xx1100011, 0xx1100x11, 0xx1100111, 0101100x11, 0111100x11, 00x1100x11}, 00x1x00x1x \ { 00x1100x10, 00x1000x11, 00x1x0001x, 00x1x00x11, 00x1x0011x, 0011100x1x, 0001x00x1x, 00x1000x1x}, 00x10xxx10 \ { 00x100xx10, 00x100x010, 00x101xx10, 00010xxx10, 00x10xxx10}} {1x1xx \ {10101, 1011x, 1x1x0}, 001xx \ {0010x, 0011x, 001x0}} {01xxx \ {010x1, 011x1}, 10x11 \ {10011, 10111, 10111}} { 01xxx1x1xx \ { 01xx11x1x0, 01xx01x1x1, 01x1x1x10x, 01x0x1x11x, 01xxx10101, 01xxx1011x, 01xxx1x1x0, 010x11x1xx, 011x11x1xx}, 10x111x111 \ { 10x1110111, 100111x111, 101111x111, 101111x111}, 01xxx001xx \ { 01xx1001x0, 01xx0001x1, 01x1x0010x, 01x0x0011x, 01xxx0010x, 01xxx0011x, 01xxx001x0, 010x1001xx, 011x1001xx}, 10x1100111 \ { 10x1100111, 1001100111, 1011100111, 1011100111}} {010xx \ {01011, 01010, 0100x}, x1xx0 \ {11010, 01010, x1000}, 1x110 \ {11110, 10110}} {} {} {0x100 \ {01100}, 0x100 \ {01100, 00100}, 00x11 \ {00111, 00011}} {101xx \ {10110, 10100, 10111}, xxx0x \ {1x101, x1001, x010x}, x10x0 \ {01000, 110x0, 010x0}} { 101000x100 \ { 1010001100, 101000x100}, xxx000x100 \ { xxx0001100, x01000x100}, x10000x100 \ { x100001100, 010000x100, 110000x100, 010000x100}, 1011100x11 \ { 1011100111, 1011100011, 1011100x11}} {} {0xx00 \ {00x00, 00100}, x01x1 \ {101x1, 10101, 001x1}} {} {1xx11 \ {11011, 10x11, 11111}} {10x01 \ {10101, 10001}, xxx1x \ {10110, 00x11, 1x111}} { xxx111xx11 \ { xxx1111011, xxx1110x11, xxx1111111, 00x111xx11, 1x1111xx11}} {0x000 \ {01000, 00000}, 0x1x0 \ {0x110, 0x100, 01100}} {} {} {xx0x1 \ {00011, 11011, 000x1}} {xxx10 \ {11010, 0xx10, 0xx10}, 1x0x1 \ {11011, 110x1, 10001}, 0011x \ {00110, 00111}} { 1x0x1xx0x1 \ { 1x011xx001, 1x001xx011, 1x0x100011, 1x0x111011, 1x0x1000x1, 11011xx0x1, 110x1xx0x1, 10001xx0x1}, 00111xx011 \ { 0011100011, 0011111011, 0011100011, 00111xx011}} {x0xxx \ {10011, x001x, x00x0}} {1x010 \ {11010, 10010, 10010}, x1x1x \ {11010, x1110, x1110}} { 1x010x0x10 \ { 1x010x0010, 1x010x0010, 11010x0x10, 10010x0x10, 10010x0x10}, x1x1xx0x1x \ { x1x11x0x10, x1x10x0x11, x1x1x10011, x1x1xx001x, x1x1xx0010, 11010x0x1x, x1110x0x1x, x1110x0x1x}} {10xx1 \ {100x1, 10101, 10001}, 11x0x \ {11001, 11000, 1110x}, x111x \ {x1111, 11110}} {0x1x0 \ {01100, 0x110, 011x0}, x10x1 \ {11011, 010x1, x1001}} { x10x110xx1 \ { x101110x01, x100110x11, x10x1100x1, x10x110101, x10x110001, 1101110xx1, 010x110xx1, x100110xx1}, 0x10011x00 \ { 0x10011000, 0x10011100, 0110011x00, 0110011x00}, x100111x01 \ { x100111001, x100111101, 0100111x01, x100111x01}, 0x110x1110 \ { 0x11011110, 0x110x1110, 01110x1110}, x1011x1111 \ { x1011x1111, 11011x1111, 01011x1111}} {1x1xx \ {111xx, 1x1x1, 10111}} {xxxxx \ {x0x10, 001x0, x01x0}} { xxxxx1x1xx \ { xxxx11x1x0, xxxx01x1x1, xxx1x1x10x, xxx0x1x11x, xxxxx111xx, xxxxx1x1x1, xxxxx10111, x0x101x1xx, 001x01x1xx, x01x01x1xx}} {0xx10 \ {01010, 0x110}} {xxxxx \ {01x0x, 111x0, 11000}} { xxx100xx10 \ { xxx1001010, xxx100x110, 111100xx10}} {100xx \ {10011, 1001x, 100x1}, x01x0 \ {x0100, 001x0, 00100}} {1x10x \ {11100, 10100, 1010x}, x111x \ {x1111, 1111x, 01110}, x1x11 \ {01011, x1011, 11011}} { 1x10x1000x \ { 1x10110000, 1x10010001, 1x10x10001, 111001000x, 101001000x, 1010x1000x}, x111x1001x \ { x111110010, x111010011, x111x10011, x111x1001x, x111x10011, x11111001x, 1111x1001x, 011101001x}, x1x1110011 \ { x1x1110011, x1x1110011, x1x1110011, 0101110011, x101110011, 1101110011}, 1x100x0100 \ { 1x100x0100, 1x10000100, 1x10000100, 11100x0100, 10100x0100, 10100x0100}, x1110x0110 \ { x111000110, 11110x0110, 01110x0110}} {xxx1x \ {11x1x, 00x11, 0x110}, 100xx \ {10010, 10001, 10000}} {xxxx0 \ {11100, 11x00, 01xx0}, xxx0x \ {01x00, 1010x, x1000}} { xxx10xxx10 \ { xxx1011x10, xxx100x110, 01x10xxx10}, xxxx0100x0 \ { xxx1010000, xxx0010010, xxxx010010, xxxx010000, 11100100x0, 11x00100x0, 01xx0100x0}, xxx0x1000x \ { xxx0110000, xxx0010001, xxx0x10001, xxx0x10000, 01x001000x, 1010x1000x, x10001000x}} {} {1x10x \ {11100, 1010x, 1010x}, 10x11 \ {10111}} {} {x01x1 \ {x0111, 101x1, 10101}, 1xxx0 \ {1x000, 1xx00, 11xx0}} {0xxx0 \ {011x0, 0x0x0, 00000}} { 0xxx01xxx0 \ { 0xx101xx00, 0xx001xx10, 0xxx01x000, 0xxx01xx00, 0xxx011xx0, 011x01xxx0, 0x0x01xxx0, 000001xxx0}} {0011x \ {00111, 00110}, 11x0x \ {1100x, 11x00, 11x00}} {1110x \ {11100, 11101, 11101}, 1x0xx \ {110x1, 1x000, 1x000}} { 1x01x0011x \ { 1x01100110, 1x01000111, 1x01x00111, 1x01x00110, 110110011x}, 1110x11x0x \ { 1110111x00, 1110011x01, 1110x1100x, 1110x11x00, 1110x11x00, 1110011x0x, 1110111x0x, 1110111x0x}, 1x00x11x0x \ { 1x00111x00, 1x00011x01, 1x00x1100x, 1x00x11x00, 1x00x11x00, 1100111x0x, 1x00011x0x, 1x00011x0x}} {1xx0x \ {11101, 10000, 10000}, 00x01 \ {00001, 00101}} {0x11x \ {0x110, 0111x, 00110}} {} {} {x111x \ {01111, 11111}, 0x0x0 \ {000x0, 010x0, 01000}, xx110 \ {0x110, 11110, 00110}} {} {01x0x \ {0100x, 01101, 01101}} {101x0 \ {10110, 10100}} { 1010001x00 \ { 1010001000, 1010001x00}} {xx0xx \ {x100x, x1010, 0x000}} {1xx1x \ {10x10, 11010, 1xx10}, 11x00 \ {11100, 11000, 11000}, 0x01x \ {01011, 00010, 01010}} { 1xx1xxx01x \ { 1xx11xx010, 1xx10xx011, 1xx1xx1010, 10x10xx01x, 11010xx01x, 1xx10xx01x}, 11x00xx000 \ { 11x00x1000, 11x000x000, 11100xx000, 11000xx000, 11000xx000}, 0x01xxx01x \ { 0x011xx010, 0x010xx011, 0x01xx1010, 01011xx01x, 00010xx01x, 01010xx01x}} {x100x \ {01000, x1000, 01001}, x0x11 \ {00011, x0111}} {0111x \ {01111, 01110, 01110}, 0x01x \ {01010, 0001x, 0101x}} { 01111x0x11 \ { 0111100011, 01111x0111, 01111x0x11}, 0x011x0x11 \ { 0x01100011, 0x011x0111, 00011x0x11, 01011x0x11}} {x1x1x \ {01x1x, 0111x, 1101x}} {} {} {0xxx0 \ {0x0x0, 01010, 0x010}} {xxx01 \ {10x01, 1x101, 0xx01}, 00x1x \ {00110, 00011, 0011x}} { 00x100xx10 \ { 00x100x010, 00x1001010, 00x100x010, 001100xx10, 001100xx10}} {0xxx0 \ {0x000, 000x0, 00xx0}, xx1xx \ {1x10x, 01111, 01111}} {x1xx0 \ {110x0, x10x0, x1000}, x0xx0 \ {00100, 00000, 00110}} { x1xx00xxx0 \ { x1x100xx00, x1x000xx10, x1xx00x000, x1xx0000x0, x1xx000xx0, 110x00xxx0, x10x00xxx0, x10000xxx0}, x0xx00xxx0 \ { x0x100xx00, x0x000xx10, x0xx00x000, x0xx0000x0, x0xx000xx0, 001000xxx0, 000000xxx0, 001100xxx0}, x1xx0xx1x0 \ { x1x10xx100, x1x00xx110, x1xx01x100, 110x0xx1x0, x10x0xx1x0, x1000xx1x0}, x0xx0xx1x0 \ { x0x10xx100, x0x00xx110, x0xx01x100, 00100xx1x0, 00000xx1x0, 00110xx1x0}} {x0x0x \ {10101, 10x00, 00x00}, x1011 \ {11011, 01011}} {11x00 \ {11000}, x11x0 \ {x1100, 01100, 01110}, 1x100 \ {10100}} { 11x00x0x00 \ { 11x0010x00, 11x0000x00, 11000x0x00}, x1100x0x00 \ { x110010x00, x110000x00, x1100x0x00, 01100x0x00}, 1x100x0x00 \ { 1x10010x00, 1x10000x00, 10100x0x00}} {001xx \ {00101, 001x0, 00111}} {01x0x \ {01000, 0110x, 01x01}, 100x0 \ {10000}} { 01x0x0010x \ { 01x0100100, 01x0000101, 01x0x00101, 01x0x00100, 010000010x, 0110x0010x, 01x010010x}, 100x0001x0 \ { 1001000100, 1000000110, 100x0001x0, 10000001x0}} {110xx \ {110x1, 1101x}, 00xx1 \ {00001, 00x11}} {11xxx \ {11101, 11110, 111x0}, x01x1 \ {10101, 001x1, 101x1}} { 11xxx110xx \ { 11xx1110x0, 11xx0110x1, 11x1x1100x, 11x0x1101x, 11xxx110x1, 11xxx1101x, 11101110xx, 11110110xx, 111x0110xx}, x01x1110x1 \ { x011111001, x010111011, x01x1110x1, x01x111011, 10101110x1, 001x1110x1, 101x1110x1}, 11xx100xx1 \ { 11x1100x01, 11x0100x11, 11xx100001, 11xx100x11, 1110100xx1}, x01x100xx1 \ { x011100x01, x010100x11, x01x100001, x01x100x11, 1010100xx1, 001x100xx1, 101x100xx1}} {x01x0 \ {00100, 00110, 10110}} {x11x0 \ {x1110, 01110}} { x11x0x01x0 \ { x1110x0100, x1100x0110, x11x000100, x11x000110, x11x010110, x1110x01x0, 01110x01x0}} {xx10x \ {11100, 10100, 1110x}, 1110x \ {11100, 11101}, 1110x \ {11101, 11100, 11100}} {x1x10 \ {11x10, 11010, x1110}} {} {0x010 \ {00010}, 1x0x1 \ {10001, 110x1, 11011}} {x101x \ {x1011, 01011, 11011}, x110x \ {1110x, 01101}} { x10100x010 \ { x101000010}, x10111x011 \ { x101111011, x101111011, x10111x011, 010111x011, 110111x011}, x11011x001 \ { x110110001, x110111001, 111011x001, 011011x001}} {01x1x \ {0111x, 01010, 01110}} {} {} {00xxx \ {00x1x, 0000x}} {x00x1 \ {00011, 00001}, x00x1 \ {000x1, 10011, 00001}} { x00x100xx1 \ { x001100x01, x000100x11, x00x100x11, x00x100001, 0001100xx1, 0000100xx1}} {1x101 \ {10101, 11101}} {10xx1 \ {10111, 10001, 101x1}} { 10x011x101 \ { 10x0110101, 10x0111101, 100011x101, 101011x101}} {1x1xx \ {11100, 111xx, 10111}} {xx0x1 \ {x0001, 110x1, x10x1}, 1x110 \ {11110}} { xx0x11x1x1 \ { xx0111x101, xx0011x111, xx0x1111x1, xx0x110111, x00011x1x1, 110x11x1x1, x10x11x1x1}, 1x1101x110 \ { 1x11011110, 111101x110}} {xx0xx \ {110xx, x000x, 01010}} {1x10x \ {1x101, 1010x, 1x100}} { 1x10xxx00x \ { 1x101xx000, 1x100xx001, 1x10x1100x, 1x10xx000x, 1x101xx00x, 1010xxx00x, 1x100xx00x}} {x111x \ {0111x, x1111, 01111}} {xx1x0 \ {10100, 11100, 111x0}, xx0xx \ {010x1, 1001x, 10010}} { xx110x1110 \ { xx11001110, 11110x1110}, xx01xx111x \ { xx011x1110, xx010x1111, xx01x0111x, xx01xx1111, xx01x01111, 01011x111x, 1001xx111x, 10010x111x}} {1x10x \ {1110x, 1x100, 1010x}, xx0xx \ {01000, x10x0, x0011}} {} {} {110x1 \ {11001, 11011, 11011}, 0xx10 \ {00110, 01110, 00x10}, 0x1x0 \ {011x0, 001x0, 00100}} {1xx00 \ {10100, 11100, 11000}, xx10x \ {0x10x}} { xx10111001 \ { xx10111001, 0x10111001}, 1xx000x100 \ { 1xx0001100, 1xx0000100, 1xx0000100, 101000x100, 111000x100, 110000x100}, xx1000x100 \ { xx10001100, xx10000100, xx10000100, 0x1000x100}} {xx011 \ {01011, x0011, 10011}} {1xx11 \ {10x11, 11011, 11011}} { 1xx11xx011 \ { 1xx1101011, 1xx11x0011, 1xx1110011, 10x11xx011, 11011xx011, 11011xx011}} {xx110 \ {x0110, 01110, 11110}} {00x01 \ {00101, 00001}} {} {x0xxx \ {10011, 001xx, 00xx0}} {1xx0x \ {1000x, 1x000, 11x0x}} { 1xx0xx0x0x \ { 1xx01x0x00, 1xx00x0x01, 1xx0x0010x, 1xx0x00x00, 1000xx0x0x, 1x000x0x0x, 11x0xx0x0x}} {10xx1 \ {10101, 101x1}, 1010x \ {10100, 10101, 10101}} {10xx0 \ {10x00, 10010, 10110}} { 10x0010100 \ { 10x0010100, 10x0010100}} {xxx1x \ {0xx1x, 10x1x, x0x1x}, 1xxx1 \ {1x111, 11x11, 11xx1}} {01x1x \ {01110, 0111x, 01010}} { 01x1xxxx1x \ { 01x11xxx10, 01x10xxx11, 01x1x0xx1x, 01x1x10x1x, 01x1xx0x1x, 01110xxx1x, 0111xxxx1x, 01010xxx1x}, 01x111xx11 \ { 01x111x111, 01x1111x11, 01x1111x11, 011111xx11}} {xx110 \ {x1110, 1x110, 00110}, 10xx0 \ {100x0, 10100, 10110}} {x01xx \ {10111, 00101, x0110}} { x0110xx110 \ { x0110x1110, x01101x110, x011000110, x0110xx110}, x01x010xx0 \ { x011010x00, x010010x10, x01x0100x0, x01x010100, x01x010110, x011010xx0}} {0x10x \ {00101, 01101, 00100}, x011x \ {00111, x0110, 1011x}} {0xxx0 \ {01000, 01xx0, 0x000}} { 0xx000x100 \ { 0xx0000100, 010000x100, 01x000x100, 0x0000x100}, 0xx10x0110 \ { 0xx10x0110, 0xx1010110, 01x10x0110}} {xxx11 \ {00011, x0111, 1xx11}} {x1x00 \ {01000}, x1xx1 \ {x10x1, 01111}} { x1x11xxx11 \ { x1x1100011, x1x11x0111, x1x111xx11, x1011xxx11, 01111xxx11}} {} {111xx \ {111x1, 11111, 11110}} {} {xx0x1 \ {010x1, 11001, 000x1}, x11x0 \ {111x0, 11100, 01110}} {00x1x \ {00x10, 00110, 00011}, 0xxx1 \ {01xx1, 0x111, 00001}} { 00x11xx011 \ { 00x1101011, 00x1100011, 00011xx011}, 0xxx1xx0x1 \ { 0xx11xx001, 0xx01xx011, 0xxx1010x1, 0xxx111001, 0xxx1000x1, 01xx1xx0x1, 0x111xx0x1, 00001xx0x1}, 00x10x1110 \ { 00x1011110, 00x1001110, 00x10x1110, 00110x1110}} {x1x01 \ {11101, 11001, x1001}, 1xxx0 \ {10100, 11xx0}} {00xxx \ {000xx, 00xx1}, x100x \ {01000, x1001}} { 00x01x1x01 \ { 00x0111101, 00x0111001, 00x01x1001, 00001x1x01, 00x01x1x01}, x1001x1x01 \ { x100111101, x100111001, x1001x1001, x1001x1x01}, 00xx01xxx0 \ { 00x101xx00, 00x001xx10, 00xx010100, 00xx011xx0, 000x01xxx0}, x10001xx00 \ { x100010100, x100011x00, 010001xx00}} {xx01x \ {00010, x001x, 11011}} {10xx1 \ {101x1, 10101, 10111}, 1x11x \ {11111, 10111}} { 10x11xx011 \ { 10x11x0011, 10x1111011, 10111xx011, 10111xx011}, 1x11xxx01x \ { 1x111xx010, 1x110xx011, 1x11x00010, 1x11xx001x, 1x11x11011, 11111xx01x, 10111xx01x}} {01x1x \ {0101x, 01010, 01111}, 10x0x \ {10000, 10101, 10001}} {} {} {} {xx01x \ {00010, 11010, 1x011}} {} {x1001 \ {11001, 01001}, xx100 \ {11100, 0x100, 01100}} {x010x \ {10100, x0100, 10101}} { x0101x1001 \ { x010111001, x010101001, 10101x1001}, x0100xx100 \ { x010011100, x01000x100, x010001100, 10100xx100, x0100xx100}} {} {x110x \ {01101, 0110x, 01100}, 11x0x \ {11101, 1100x}, xx10x \ {x010x, 1x100, x0100}} {} {0011x \ {00111}, x1x0x \ {01x0x, 01001, 01000}} {110x0 \ {11010, 11000, 11000}, x1xx1 \ {11xx1, 01x01, 11001}, x1x01 \ {01001, x1101}} { 1101000110 \ { 1101000110}, x1x1100111 \ { x1x1100111, 11x1100111}, 11000x1x00 \ { 1100001x00, 1100001000, 11000x1x00, 11000x1x00}, x1x01x1x01 \ { x1x0101x01, x1x0101001, 11x01x1x01, 01x01x1x01, 11001x1x01}, x1x01x1x01 \ { x1x0101x01, x1x0101001, 01001x1x01, x1101x1x01}} {x0xx1 \ {00x11, 00xx1, 10101}, 1xx11 \ {11011, 11x11, 11x11}} {} {} {110xx \ {11000, 1101x}} {xx1xx \ {001x1, 0x11x, 1x100}, 0x1xx \ {0x111, 0x10x, 01100}, 00xx1 \ {00x11, 00111, 00011}} { xx1xx110xx \ { xx1x1110x0, xx1x0110x1, xx11x1100x, xx10x1101x, xx1xx11000, xx1xx1101x, 001x1110xx, 0x11x110xx, 1x100110xx}, 0x1xx110xx \ { 0x1x1110x0, 0x1x0110x1, 0x11x1100x, 0x10x1101x, 0x1xx11000, 0x1xx1101x, 0x111110xx, 0x10x110xx, 01100110xx}, 00xx1110x1 \ { 00x1111001, 00x0111011, 00xx111011, 00x11110x1, 00111110x1, 00011110x1}} {x1x0x \ {11x01, x1000, x110x}, x010x \ {10100, x0100, 00101}, 01xxx \ {01011, 01x11, 0111x}} {101xx \ {101x1, 1010x, 10110}, 11x1x \ {1101x, 11011}} { 1010xx1x0x \ { 10101x1x00, 10100x1x01, 1010x11x01, 1010xx1000, 1010xx110x, 10101x1x0x, 1010xx1x0x}, 1010xx010x \ { 10101x0100, 10100x0101, 1010x10100, 1010xx0100, 1010x00101, 10101x010x, 1010xx010x}, 101xx01xxx \ { 101x101xx0, 101x001xx1, 1011x01x0x, 1010x01x1x, 101xx01011, 101xx01x11, 101xx0111x, 101x101xxx, 1010x01xxx, 1011001xxx}, 11x1x01x1x \ { 11x1101x10, 11x1001x11, 11x1x01011, 11x1x01x11, 11x1x0111x, 1101x01x1x, 1101101x1x}} {10x00 \ {10100, 10000}} {x01xx \ {10101, 00111, 0011x}} { x010010x00 \ { x010010100, x010010000}} {10xxx \ {10111, 10001, 10x10}} {x1111 \ {01111, 11111}} { x111110x11 \ { x111110111, 0111110x11, 1111110x11}} {1x000 \ {11000, 10000, 10000}} {00x0x \ {0010x, 0000x, 0000x}} { 00x001x000 \ { 00x0011000, 00x0010000, 00x0010000, 001001x000, 000001x000, 000001x000}} {} {xxx1x \ {01011, x0x11, 1x01x}, 0x10x \ {0110x, 0x100, 0010x}, 1x01x \ {1101x, 11010}} {} {x0x00 \ {00100, 10x00, x0000}, x01x1 \ {00101, 10101, 00111}} {00x0x \ {0000x, 0010x}, 1x0x1 \ {10001, 1x001}} { 00x00x0x00 \ { 00x0000100, 00x0010x00, 00x00x0000, 00000x0x00, 00100x0x00}, 00x01x0101 \ { 00x0100101, 00x0110101, 00001x0101, 00101x0101}, 1x0x1x01x1 \ { 1x011x0101, 1x001x0111, 1x0x100101, 1x0x110101, 1x0x100111, 10001x01x1, 1x001x01x1}} {00xx1 \ {000x1, 00001}} {x1100 \ {11100}} {} {1x10x \ {1x100, 10100, 1x101}, x1xx0 \ {01x10, x10x0, x1000}} {xx00x \ {0100x, xx001, x100x}} { xx00x1x10x \ { xx0011x100, xx0001x101, xx00x1x100, xx00x10100, xx00x1x101, 0100x1x10x, xx0011x10x, x100x1x10x}, xx000x1x00 \ { xx000x1000, xx000x1000, 01000x1x00, x1000x1x00}} {} {00x0x \ {00100, 00x00, 00x00}, x0x11 \ {x0011, 00111, 10011}} {} {x001x \ {00010, 10010, 00011}} {xxxxx \ {x0010, 11x11, 1xx00}, xxx10 \ {1x010, x1110, 00110}} { xxx1xx001x \ { xxx11x0010, xxx10x0011, xxx1x00010, xxx1x10010, xxx1x00011, x0010x001x, 11x11x001x}, xxx10x0010 \ { xxx1000010, xxx1010010, 1x010x0010, x1110x0010, 00110x0010}} {xxx00 \ {x0x00, x1100, x1000}} {xx1x1 \ {11101, 00111, 101x1}, x1x11 \ {11x11, 01x11}} {} {0110x \ {01100, 01101}} {} {} {0x101 \ {01101}, 10x01 \ {10001, 10101}} {01x1x \ {0111x, 01x11, 01111}} {} {xx0x1 \ {000x1, 10011}, 111xx \ {11101, 11111, 1111x}, x0x00 \ {00100, 10x00, 00000}} {00x1x \ {00111, 0011x}} { 00x11xx011 \ { 00x1100011, 00x1110011, 00111xx011, 00111xx011}, 00x1x1111x \ { 00x1111110, 00x1011111, 00x1x11111, 00x1x1111x, 001111111x, 0011x1111x}} {x1x10 \ {x1110, 11110, x1010}, x11x0 \ {01100, 01110}} {0xx10 \ {0x110, 00x10, 00x10}} { 0xx10x1x10 \ { 0xx10x1110, 0xx1011110, 0xx10x1010, 0x110x1x10, 00x10x1x10, 00x10x1x10}, 0xx10x1110 \ { 0xx1001110, 0x110x1110, 00x10x1110, 00x10x1110}} {x110x \ {11100, x1100, x1101}} {1xx1x \ {10010, 1x011, 1x01x}} {} {0100x \ {01000, 01001, 01001}, 1x0xx \ {1000x, 1101x, 110x1}} {x110x \ {11101, 0110x}, 11xxx \ {11x10, 11x11, 11011}} { x110x0100x \ { x110101000, x110001001, x110x01000, x110x01001, x110x01001, 111010100x, 0110x0100x}, 11x0x0100x \ { 11x0101000, 11x0001001, 11x0x01000, 11x0x01001, 11x0x01001}, x110x1x00x \ { x11011x000, x11001x001, x110x1000x, x110x11001, 111011x00x, 0110x1x00x}, 11xxx1x0xx \ { 11xx11x0x0, 11xx01x0x1, 11x1x1x00x, 11x0x1x01x, 11xxx1000x, 11xxx1101x, 11xxx110x1, 11x101x0xx, 11x111x0xx, 110111x0xx}} {01xxx \ {01010, 01x0x, 01111}} {x00x1 \ {00011, 100x1, 00001}} { x00x101xx1 \ { x001101x01, x000101x11, x00x101x01, x00x101111, 0001101xx1, 100x101xx1, 0000101xx1}} {1x0x1 \ {10001, 1x011, 100x1}, x0110 \ {10110, 00110, 00110}} {1xxxx \ {11100, 101xx, 101xx}, x1xx1 \ {111x1, 11001, 010x1}} { 1xxx11x0x1 \ { 1xx111x001, 1xx011x011, 1xxx110001, 1xxx11x011, 1xxx1100x1, 101x11x0x1, 101x11x0x1}, x1xx11x0x1 \ { x1x111x001, x1x011x011, x1xx110001, x1xx11x011, x1xx1100x1, 111x11x0x1, 110011x0x1, 010x11x0x1}, 1xx10x0110 \ { 1xx1010110, 1xx1000110, 1xx1000110, 10110x0110, 10110x0110}} {xx111 \ {01111, 10111, 10111}, 0xx10 \ {00x10, 00010, 01110}, x0x0x \ {1010x, 10001, x000x}} {101xx \ {1011x, 101x0, 10110}, x111x \ {11111, 01111, 01111}, x11x1 \ {x1111, x1101, x1101}} { 10111xx111 \ { 1011101111, 1011110111, 1011110111, 10111xx111}, x1111xx111 \ { x111101111, x111110111, x111110111, 11111xx111, 01111xx111, 01111xx111}, 101100xx10 \ { 1011000x10, 1011000010, 1011001110, 101100xx10, 101100xx10, 101100xx10}, x11100xx10 \ { x111000x10, x111000010, x111001110}, 1010xx0x0x \ { 10101x0x00, 10100x0x01, 1010x1010x, 1010x10001, 1010xx000x, 10100x0x0x}, x1101x0x01 \ { x110110101, x110110001, x1101x0001, x1101x0x01, x1101x0x01}} {} {x0xx1 \ {100x1, 000x1, 00x01}, 100xx \ {100x0, 10001, 100x1}} {} {x11xx \ {x111x, 011x0, x11x1}, 1xxxx \ {11xxx, 1111x, 11111}, 00xx0 \ {00010, 00100, 00110}} {01xxx \ {011x0, 01101, 010x1}, 11xx0 \ {11000, 11010}} { 01xxxx11xx \ { 01xx1x11x0, 01xx0x11x1, 01x1xx110x, 01x0xx111x, 01xxxx111x, 01xxx011x0, 01xxxx11x1, 011x0x11xx, 01101x11xx, 010x1x11xx}, 11xx0x11x0 \ { 11x10x1100, 11x00x1110, 11xx0x1110, 11xx0011x0, 11000x11x0, 11010x11x0}, 01xxx1xxxx \ { 01xx11xxx0, 01xx01xxx1, 01x1x1xx0x, 01x0x1xx1x, 01xxx11xxx, 01xxx1111x, 01xxx11111, 011x01xxxx, 011011xxxx, 010x11xxxx}, 11xx01xxx0 \ { 11x101xx00, 11x001xx10, 11xx011xx0, 11xx011110, 110001xxx0, 110101xxx0}, 01xx000xx0 \ { 01x1000x00, 01x0000x10, 01xx000010, 01xx000100, 01xx000110, 011x000xx0}, 11xx000xx0 \ { 11x1000x00, 11x0000x10, 11xx000010, 11xx000100, 11xx000110, 1100000xx0, 1101000xx0}} {xxx01 \ {0x101, x0x01, 00001}, x01x0 \ {00100, 101x0}} {xxx1x \ {x1x10, 01111, x0x10}} { xxx10x0110 \ { xxx1010110, x1x10x0110, x0x10x0110}} {x1xx0 \ {01x10, 11x10, x1x00}, x11x1 \ {011x1, 11101, 11101}} {x010x \ {00101, x0101}, 01xxx \ {01011, 01x10, 0101x}, x00x1 \ {00001, 10011, 000x1}} { x0100x1x00 \ { x0100x1x00}, 01xx0x1xx0 \ { 01x10x1x00, 01x00x1x10, 01xx001x10, 01xx011x10, 01xx0x1x00, 01x10x1xx0, 01010x1xx0}, x0101x1101 \ { x010101101, x010111101, x010111101, 00101x1101, x0101x1101}, 01xx1x11x1 \ { 01x11x1101, 01x01x1111, 01xx1011x1, 01xx111101, 01xx111101, 01011x11x1, 01011x11x1}, x00x1x11x1 \ { x0011x1101, x0001x1111, x00x1011x1, x00x111101, x00x111101, 00001x11x1, 10011x11x1, 000x1x11x1}} {} {x1x1x \ {x1110, 01010, 1101x}} {} {xx0x0 \ {x10x0, 10000, 01010}, 1x1x1 \ {11101, 11111, 10101}} {x0xx0 \ {x0x00, 00x10}} { x0xx0xx0x0 \ { x0x10xx000, x0x00xx010, x0xx0x10x0, x0xx010000, x0xx001010, x0x00xx0x0, 00x10xx0x0}} {} {xx0xx \ {x00x1, 11010, x1000}} {} {001xx \ {00100, 0010x, 0011x}, 01x0x \ {01100, 01x00, 01x00}} {xx0xx \ {00001, 11011, 00010}} { xx0xx001xx \ { xx0x1001x0, xx0x0001x1, xx01x0010x, xx00x0011x, xx0xx00100, xx0xx0010x, xx0xx0011x, 00001001xx, 11011001xx, 00010001xx}, xx00x01x0x \ { xx00101x00, xx00001x01, xx00x01100, xx00x01x00, xx00x01x00, 0000101x0x}} {110x0 \ {11010, 11000}, x100x \ {01001, 1100x, 0100x}} {1x001 \ {10001, 11001, 11001}, 1011x \ {10111, 10110, 10110}} { 1011011010 \ { 1011011010, 1011011010, 1011011010}, 1x001x1001 \ { 1x00101001, 1x00111001, 1x00101001, 10001x1001, 11001x1001, 11001x1001}} {xx0x0 \ {x1000, 11010, 01010}} {1x0xx \ {1x0x1, 1001x, 10000}, 011x1 \ {01101}, xx10x \ {xx101, 0110x, x010x}} { 1x0x0xx0x0 \ { 1x010xx000, 1x000xx010, 1x0x0x1000, 1x0x011010, 1x0x001010, 10010xx0x0, 10000xx0x0}, xx100xx000 \ { xx100x1000, 01100xx000, x0100xx000}} {x01x0 \ {x0110, 00100}} {0x0xx \ {00000, 010x0, 01001}, 01x11 \ {01111, 01011}, 01xx0 \ {01100, 01010, 01010}} { 0x0x0x01x0 \ { 0x010x0100, 0x000x0110, 0x0x0x0110, 0x0x000100, 00000x01x0, 010x0x01x0}, 01xx0x01x0 \ { 01x10x0100, 01x00x0110, 01xx0x0110, 01xx000100, 01100x01x0, 01010x01x0, 01010x01x0}} {1xx10 \ {10x10, 10110, 10110}, xxx1x \ {1001x, 0011x, x1010}, 1xx10 \ {10110, 1x110, 11010}} {0x10x \ {01101, 00100, 01100}} {} {0x1x0 \ {01110, 011x0, 0x110}, x100x \ {11000, 0100x, 01001}, x11xx \ {011x0, 11111, x11x1}} {011x0 \ {01110}, x1xxx \ {11x10, 01100, 110x0}} { 011x00x1x0 \ { 011100x100, 011000x110, 011x001110, 011x0011x0, 011x00x110, 011100x1x0}, x1xx00x1x0 \ { x1x100x100, x1x000x110, x1xx001110, x1xx0011x0, x1xx00x110, 11x100x1x0, 011000x1x0, 110x00x1x0}, 01100x1000 \ { 0110011000, 0110001000}, x1x0xx100x \ { x1x01x1000, x1x00x1001, x1x0x11000, x1x0x0100x, x1x0x01001, 01100x100x, 11000x100x}, 011x0x11x0 \ { 01110x1100, 01100x1110, 011x0011x0, 01110x11x0}, x1xxxx11xx \ { x1xx1x11x0, x1xx0x11x1, x1x1xx110x, x1x0xx111x, x1xxx011x0, x1xxx11111, x1xxxx11x1, 11x10x11xx, 01100x11xx, 110x0x11xx}} {0x10x \ {0010x, 01101, 00101}, x1000 \ {11000, 01000}} {11xxx \ {11000, 11010, 11x00}, xx001 \ {00001, 1x001}} { 11x0x0x10x \ { 11x010x100, 11x000x101, 11x0x0010x, 11x0x01101, 11x0x00101, 110000x10x, 11x000x10x}, xx0010x101 \ { xx00100101, xx00101101, xx00100101, 000010x101, 1x0010x101}, 11x00x1000 \ { 11x0011000, 11x0001000, 11000x1000, 11x00x1000}} {10x0x \ {10101, 10000}, 0xx0x \ {00x01, 01x00, 01100}} {xx011 \ {01011, x1011}, x011x \ {x0110, 1011x, 10110}} {} {x0xx1 \ {10011, x01x1, 10101}, x1xxx \ {x10x1, 11011, 110x0}} {xx0x0 \ {01010, 1x000, x1010}, 0xxx0 \ {01110, 00000, 001x0}, 10xx1 \ {10111, 101x1, 10101}} { 10xx1x0xx1 \ { 10x11x0x01, 10x01x0x11, 10xx110011, 10xx1x01x1, 10xx110101, 10111x0xx1, 101x1x0xx1, 10101x0xx1}, xx0x0x1xx0 \ { xx010x1x00, xx000x1x10, xx0x0110x0, 01010x1xx0, 1x000x1xx0, x1010x1xx0}, 0xxx0x1xx0 \ { 0xx10x1x00, 0xx00x1x10, 0xxx0110x0, 01110x1xx0, 00000x1xx0, 001x0x1xx0}, 10xx1x1xx1 \ { 10x11x1x01, 10x01x1x11, 10xx1x10x1, 10xx111011, 10111x1xx1, 101x1x1xx1, 10101x1xx1}} {x0x00 \ {10x00, 00x00, x0000}, 0xx00 \ {00000, 01000, 00100}} {1000x \ {10001, 10000}} { 10000x0x00 \ { 1000010x00, 1000000x00, 10000x0000, 10000x0x00}, 100000xx00 \ { 1000000000, 1000001000, 1000000100, 100000xx00}} {x101x \ {01010, 11011, 11011}, 10xxx \ {1001x, 100xx, 10000}} {111xx \ {11110, 11111, 1111x}, 011xx \ {01110, 01101, 011x1}} { 1111xx101x \ { 11111x1010, 11110x1011, 1111x01010, 1111x11011, 1111x11011, 11110x101x, 11111x101x, 1111xx101x}, 0111xx101x \ { 01111x1010, 01110x1011, 0111x01010, 0111x11011, 0111x11011, 01110x101x, 01111x101x}, 111xx10xxx \ { 111x110xx0, 111x010xx1, 1111x10x0x, 1110x10x1x, 111xx1001x, 111xx100xx, 111xx10000, 1111010xxx, 1111110xxx, 1111x10xxx}, 011xx10xxx \ { 011x110xx0, 011x010xx1, 0111x10x0x, 0110x10x1x, 011xx1001x, 011xx100xx, 011xx10000, 0111010xxx, 0110110xxx, 011x110xxx}} {x1x11 \ {01011, 01x11}, xxx01 \ {01x01, 00101, x0x01}} {xx111 \ {10111, x1111, x1111}, x1xx1 \ {01x11, 11x11, x1x11}} { xx111x1x11 \ { xx11101011, xx11101x11, 10111x1x11, x1111x1x11, x1111x1x11}, x1x11x1x11 \ { x1x1101011, x1x1101x11, 01x11x1x11, 11x11x1x11, x1x11x1x11}, x1x01xxx01 \ { x1x0101x01, x1x0100101, x1x01x0x01}} {} {x11xx \ {1110x, x11x0, 111x1}, 00x0x \ {00x01, 0010x, 00100}} {} {1xxx1 \ {1x001, 1xx01, 11x11}, x1xxx \ {01001, x100x, 11001}} {xxx10 \ {x0010, x0x10, xx010}, 1xx10 \ {10110, 11110, 11110}} { xxx10x1x10 \ { x0010x1x10, x0x10x1x10, xx010x1x10}, 1xx10x1x10 \ { 10110x1x10, 11110x1x10, 11110x1x10}} {x11x0 \ {01100, 011x0, 11110}, 0100x \ {01000, 01001}} {010x0 \ {01000, 01010, 01010}, 0xx01 \ {0x001, 00101}} { 010x0x11x0 \ { 01010x1100, 01000x1110, 010x001100, 010x0011x0, 010x011110, 01000x11x0, 01010x11x0, 01010x11x0}, 0100001000 \ { 0100001000, 0100001000}, 0xx0101001 \ { 0xx0101001, 0x00101001, 0010101001}} {1x000 \ {10000, 11000}, x0x10 \ {00110, 10110}, 01xx0 \ {01000, 01010}} {} {} {0xx1x \ {0001x, 00x10, 0x01x}, 1x1x1 \ {10111, 101x1, 10101}} {x0xxx \ {10xx1, x0001, 101x1}, 00x1x \ {00x11, 00011, 00011}} { x0x1x0xx1x \ { x0x110xx10, x0x100xx11, x0x1x0001x, x0x1x00x10, x0x1x0x01x, 10x110xx1x, 101110xx1x}, 00x1x0xx1x \ { 00x110xx10, 00x100xx11, 00x1x0001x, 00x1x00x10, 00x1x0x01x, 00x110xx1x, 000110xx1x, 000110xx1x}, x0xx11x1x1 \ { x0x111x101, x0x011x111, x0xx110111, x0xx1101x1, x0xx110101, 10xx11x1x1, x00011x1x1, 101x11x1x1}, 00x111x111 \ { 00x1110111, 00x1110111, 00x111x111, 000111x111, 000111x111}} {x10x0 \ {11000, 010x0, 01000}, x11x0 \ {x1110, 01110, 11100}, x001x \ {x0011, 00011, 10010}} {0x011 \ {01011}} { 0x011x0011 \ { 0x011x0011, 0x01100011, 01011x0011}} {111x1 \ {11111}} {x111x \ {0111x, x1110, 11111}, 1xx10 \ {11010, 10x10, 1x110}} { x111111111 \ { x111111111, 0111111111, 1111111111}} {110x0 \ {11010, 11000}} {x10xx \ {110x1, 010x0, x1000}} { x10x0110x0 \ { x101011000, x100011010, x10x011010, x10x011000, 010x0110x0, x1000110x0}} {x11xx \ {x1100, x1101}, x0xx1 \ {10001, 101x1, x0x11}, 11x0x \ {1110x, 11100, 11100}} {x0xxx \ {00xx0, 000x0, 101x1}} { x0xxxx11xx \ { x0xx1x11x0, x0xx0x11x1, x0x1xx110x, x0x0xx111x, x0xxxx1100, x0xxxx1101, 00xx0x11xx, 000x0x11xx, 101x1x11xx}, x0xx1x0xx1 \ { x0x11x0x01, x0x01x0x11, x0xx110001, x0xx1101x1, x0xx1x0x11, 101x1x0xx1}, x0x0x11x0x \ { x0x0111x00, x0x0011x01, x0x0x1110x, x0x0x11100, x0x0x11100, 00x0011x0x, 0000011x0x, 1010111x0x}} {1000x \ {10001, 10000}} {} {} {xx001 \ {x1001, 01001, 00001}, x1x11 \ {11x11, 01111}, 0xx00 \ {00000, 0x000, 00100}} {x01xx \ {x0111, 00101, 10111}, 110xx \ {11001, 11011, 1101x}} { x0101xx001 \ { x0101x1001, x010101001, x010100001, 00101xx001}, 11001xx001 \ { 11001x1001, 1100101001, 1100100001, 11001xx001}, x0111x1x11 \ { x011111x11, x011101111, x0111x1x11, 10111x1x11}, 11011x1x11 \ { 1101111x11, 1101101111, 11011x1x11, 11011x1x11}, x01000xx00 \ { x010000000, x01000x000, x010000100}, 110000xx00 \ { 1100000000, 110000x000, 1100000100}} {0xxx1 \ {010x1, 00x01, 000x1}, x0xxx \ {x0x00, 00101, 10x11}} {00x00 \ {00100, 00000}, x11xx \ {11101, 011x1, 011xx}} { x11x10xxx1 \ { x11110xx01, x11010xx11, x11x1010x1, x11x100x01, x11x1000x1, 111010xxx1, 011x10xxx1, 011x10xxx1}, 00x00x0x00 \ { 00x00x0x00, 00100x0x00, 00000x0x00}, x11xxx0xxx \ { x11x1x0xx0, x11x0x0xx1, x111xx0x0x, x110xx0x1x, x11xxx0x00, x11xx00101, x11xx10x11, 11101x0xxx, 011x1x0xxx, 011xxx0xxx}} {0xx01 \ {00001, 01001, 01001}, 10xx0 \ {10110, 10100}} {11x01 \ {11001, 11101, 11101}} { 11x010xx01 \ { 11x0100001, 11x0101001, 11x0101001, 110010xx01, 111010xx01, 111010xx01}} {xxx1x \ {00x11, 1111x, 0001x}, xx0xx \ {x1001, 010x0, xx011}} {} {} {xx1xx \ {00100, 011xx, x1101}, x1xxx \ {01xx0, 010x1, x11x1}, xxx10 \ {10010, 10110, 01010}} {x01x1 \ {x0111, 101x1, 10111}} { x01x1xx1x1 \ { x0111xx101, x0101xx111, x01x1011x1, x01x1x1101, x0111xx1x1, 101x1xx1x1, 10111xx1x1}, x01x1x1xx1 \ { x0111x1x01, x0101x1x11, x01x1010x1, x01x1x11x1, x0111x1xx1, 101x1x1xx1, 10111x1xx1}} {11xx0 \ {110x0, 11000, 11x00}} {x01xx \ {101x1, 0010x, 00101}} { x01x011xx0 \ { x011011x00, x010011x10, x01x0110x0, x01x011000, x01x011x00, 0010011xx0}} {0xx11 \ {01x11, 00x11, 00x11}, 011xx \ {01100, 011x0, 011x1}, 10xx1 \ {101x1, 10x01, 10101}} {xx1x1 \ {111x1, 0x1x1, 0x1x1}, 0x1x0 \ {01100, 0x110}} { xx1110xx11 \ { xx11101x11, xx11100x11, xx11100x11, 111110xx11, 0x1110xx11, 0x1110xx11}, xx1x1011x1 \ { xx11101101, xx10101111, xx1x1011x1, 111x1011x1, 0x1x1011x1, 0x1x1011x1}, 0x1x0011x0 \ { 0x11001100, 0x10001110, 0x1x001100, 0x1x0011x0, 01100011x0, 0x110011x0}, xx1x110xx1 \ { xx11110x01, xx10110x11, xx1x1101x1, xx1x110x01, xx1x110101, 111x110xx1, 0x1x110xx1, 0x1x110xx1}} {x1x00 \ {x1000, 11x00, x1100}} {xx011 \ {0x011, x1011}, x11xx \ {01110, 01111, 111xx}} { x1100x1x00 \ { x1100x1000, x110011x00, x1100x1100, 11100x1x00}} {11xx0 \ {11x10, 11110, 11010}, 1x1x0 \ {10110, 1x100, 1x100}} {x0x0x \ {00001, x000x, 00101}, xx1x1 \ {11111, xx111, 011x1}} { x0x0011x00 \ { x000011x00}, x0x001x100 \ { x0x001x100, x0x001x100, x00001x100}} {0xxx0 \ {0x010, 01010, 00110}} {x101x \ {11010, 01011, 01010}} { x10100xx10 \ { x10100x010, x101001010, x101000110, 110100xx10, 010100xx10}} {1x00x \ {1100x, 10000, 11000}, 00x10 \ {00010, 00110}} {xx1xx \ {x0101, 011xx, 101x1}, 101xx \ {10111, 10101, 101x1}, xx100 \ {01100, 1x100, 1x100}} { xx10x1x00x \ { xx1011x000, xx1001x001, xx10x1100x, xx10x10000, xx10x11000, x01011x00x, 0110x1x00x, 101011x00x}, 1010x1x00x \ { 101011x000, 101001x001, 1010x1100x, 1010x10000, 1010x11000, 101011x00x, 101011x00x}, xx1001x000 \ { xx10011000, xx10010000, xx10011000, 011001x000, 1x1001x000, 1x1001x000}, xx11000x10 \ { xx11000010, xx11000110, 0111000x10}, 1011000x10 \ { 1011000010, 1011000110}} {10xx1 \ {10011, 10111, 10001}} {010x1 \ {01001, 01011}, 111x0 \ {11100, 11110}} { 010x110xx1 \ { 0101110x01, 0100110x11, 010x110011, 010x110111, 010x110001, 0100110xx1, 0101110xx1}} {1x1x1 \ {11111, 10111, 101x1}} {1x11x \ {1011x, 10110, 1111x}} { 1x1111x111 \ { 1x11111111, 1x11110111, 1x11110111, 101111x111, 111111x111}} {x00x0 \ {00010, 10010, 100x0}} {x00x1 \ {00011, 10011}, 00x0x \ {00000, 00x01, 00001}} { 00x00x0000 \ { 00x0010000, 00000x0000}} {x10x0 \ {11000, 11010, 01000}} {1xxx1 \ {11111, 10101, 11x01}} {} {} {0xx0x \ {00101, 0xx01, 00000}, 0x0x0 \ {0x010, 000x0, 00000}} {} {0xx01 \ {00101, 00001, 00x01}, 01x11 \ {01111, 01011}} {} {} {x1xx1 \ {x1x01, 01011, x11x1}} {0x1x0 \ {0x100, 01110, 01110}, x00x0 \ {10010, 100x0, 100x0}} {} {0xx10 \ {0x010, 00110, 01010}, 10x11 \ {10011, 10111}} {} {} {xx011 \ {1x011, x0011}, 010x1 \ {01001, 01011}} {xx0xx \ {100xx, 1x011, xx0x0}} { xx011xx011 \ { xx0111x011, xx011x0011, 10011xx011, 1x011xx011}, xx0x1010x1 \ { xx01101001, xx00101011, xx0x101001, xx0x101011, 100x1010x1, 1x011010x1}} {} {xxxx0 \ {xx100, xx010, 10x10}} {} {xxxx0 \ {1x100, x1x10, x1110}} {x010x \ {x0101, 10100}, x0011 \ {10011, 00011}, x11x0 \ {01100, 11100, x1100}} { x0100xxx00 \ { x01001x100, 10100xxx00}, x11x0xxxx0 \ { x1110xxx00, x1100xxx10, x11x01x100, x11x0x1x10, x11x0x1110, 01100xxxx0, 11100xxxx0, x1100xxxx0}} {x0x00 \ {x0000, 00x00, 00000}, 0x1xx \ {0x100, 0111x, 011x0}} {1x1x1 \ {11101, 11111}, x1x10 \ {11010, 01x10, 01010}, x0x01 \ {00101, x0101}} { 1x1x10x1x1 \ { 1x1110x101, 1x1010x111, 1x1x101111, 111010x1x1, 111110x1x1}, x1x100x110 \ { x1x1001110, x1x1001110, 110100x110, 01x100x110, 010100x110}, x0x010x101 \ { 001010x101, x01010x101}} {0x01x \ {00010, 0001x, 0001x}} {0x0x1 \ {0x001, 010x1, 0x011}} { 0x0110x011 \ { 0x01100011, 0x01100011, 010110x011, 0x0110x011}} {} {} {} {00xxx \ {000x1, 00101}, 01x0x \ {0110x, 01100}} {01x10 \ {01010, 01110}, 1x00x \ {11001, 1100x, 10000}} { 01x1000x10 \ { 0101000x10, 0111000x10}, 1x00x00x0x \ { 1x00100x00, 1x00000x01, 1x00x00001, 1x00x00101, 1100100x0x, 1100x00x0x, 1000000x0x}, 1x00x01x0x \ { 1x00101x00, 1x00001x01, 1x00x0110x, 1x00x01100, 1100101x0x, 1100x01x0x, 1000001x0x}} {0x11x \ {0x111, 00111, 0x110}, 1xxx0 \ {10x10, 10x00, 1x0x0}, 0xxx1 \ {01001, 00x11, 0xx11}} {1xx10 \ {10010, 1x110, 10x10}, 111xx \ {111x0, 11110, 111x1}} { 1xx100x110 \ { 1xx100x110, 100100x110, 1x1100x110, 10x100x110}, 1111x0x11x \ { 111110x110, 111100x111, 1111x0x111, 1111x00111, 1111x0x110, 111100x11x, 111100x11x, 111110x11x}, 1xx101xx10 \ { 1xx1010x10, 1xx101x010, 100101xx10, 1x1101xx10, 10x101xx10}, 111x01xxx0 \ { 111101xx00, 111001xx10, 111x010x10, 111x010x00, 111x01x0x0, 111x01xxx0, 111101xxx0}, 111x10xxx1 \ { 111110xx01, 111010xx11, 111x101001, 111x100x11, 111x10xx11, 111x10xxx1}} {x1x00 \ {01x00, 11x00, x1000}} {01xxx \ {0111x, 011x1, 01x0x}} { 01x00x1x00 \ { 01x0001x00, 01x0011x00, 01x00x1000, 01x00x1x00}} {010xx \ {01000, 0101x, 01011}} {1x110 \ {11110, 10110}, 0011x \ {00111, 00110}} { 1x11001010 \ { 1x11001010, 1111001010, 1011001010}, 0011x0101x \ { 0011101010, 0011001011, 0011x0101x, 0011x01011, 001110101x, 001100101x}} {x01x0 \ {x0110, x0100}, 1x101 \ {10101}} {x0x1x \ {x001x, 10x11, 00111}} { x0x10x0110 \ { x0x10x0110, x0010x0110}} {101x1 \ {10101, 10111, 10111}, 0010x \ {00101, 00100, 00100}} {0x1x1 \ {01101, 00111}, xxx00 \ {xx100, 11000, 10000}} { 0x1x1101x1 \ { 0x11110101, 0x10110111, 0x1x110101, 0x1x110111, 0x1x110111, 01101101x1, 00111101x1}, 0x10100101 \ { 0x10100101, 0110100101}, xxx0000100 \ { xxx0000100, xxx0000100, xx10000100, 1100000100, 1000000100}} {} {01x10 \ {01110, 01010}} {} {11xxx \ {11x1x, 11001, 11x01}, 011x0 \ {01110, 01100}} {0xx10 \ {00010, 01x10, 00110}} { 0xx1011x10 \ { 0xx1011x10, 0001011x10, 01x1011x10, 0011011x10}, 0xx1001110 \ { 0xx1001110, 0001001110, 01x1001110, 0011001110}} {1x10x \ {11100, 1010x, 1x101}, 1xx1x \ {10011, 1xx10, 1101x}} {10x10 \ {10110}, 01xxx \ {010xx, 01010, 01xx1}, xx1xx \ {0x1xx, x01xx, xx11x}} { 01x0x1x10x \ { 01x011x100, 01x001x101, 01x0x11100, 01x0x1010x, 01x0x1x101, 0100x1x10x, 01x011x10x}, xx10x1x10x \ { xx1011x100, xx1001x101, xx10x11100, xx10x1010x, xx10x1x101, 0x10x1x10x, x010x1x10x}, 10x101xx10 \ { 10x101xx10, 10x1011010, 101101xx10}, 01x1x1xx1x \ { 01x111xx10, 01x101xx11, 01x1x10011, 01x1x1xx10, 01x1x1101x, 0101x1xx1x, 010101xx1x, 01x111xx1x}, xx11x1xx1x \ { xx1111xx10, xx1101xx11, xx11x10011, xx11x1xx10, xx11x1101x, 0x11x1xx1x, x011x1xx1x, xx11x1xx1x}} {01x0x \ {01101, 0110x, 01x01}, 00x10 \ {00010, 00110, 00110}} {001x1 \ {00101, 00111}, x0xx1 \ {00x01, x0011, 10x01}} { 0010101x01 \ { 0010101101, 0010101101, 0010101x01, 0010101x01}, x0x0101x01 \ { x0x0101101, x0x0101101, x0x0101x01, 00x0101x01, 10x0101x01}} {xx101 \ {01101, x1101, x0101}, 101x0 \ {10110, 10100}, 11x00 \ {11000}} {} {} {10x11 \ {10111, 10011, 10011}, xx001 \ {x0001, 01001, 01001}} {} {} {0xx0x \ {01x01, 0x10x}} {} {} {10xx0 \ {10100, 10110, 10010}, xx0xx \ {000x1, 10001, x00xx}} {} {} {0xxx0 \ {01x10, 00100, 0xx10}, 0110x \ {01100, 01101}} {01x1x \ {0101x, 01110, 01x11}, 1x01x \ {1x011, 1001x, 1001x}} { 01x100xx10 \ { 01x1001x10, 01x100xx10, 010100xx10, 011100xx10}, 1x0100xx10 \ { 1x01001x10, 1x0100xx10, 100100xx10, 100100xx10}} {0x0xx \ {010x0, 010x1, 01001}, 0x0xx \ {0x0x1, 01000, 0100x}, 11x10 \ {11110, 11010}} {011x0 \ {01100}, 110x0 \ {11000}} { 011x00x0x0 \ { 011100x000, 011000x010, 011x001000, 011x001000, 011000x0x0}, 110x00x0x0 \ { 110100x000, 110000x010, 110x001000, 110x001000, 110000x0x0}, 0111011x10 \ { 0111011110, 0111011010}, 1101011x10 \ { 1101011110, 1101011010}} {x11x0 \ {011x0, x1110, 111x0}, 0xx01 \ {00001, 01101, 00101}} {x000x \ {10000, 10001, 00001}} { x0000x1100 \ { x000001100, x000011100, 10000x1100}, x00010xx01 \ { x000100001, x000101101, x000100101, 100010xx01, 000010xx01}} {10xxx \ {10001, 10x0x, 10100}, xx0x1 \ {0x0x1, xx001, x0011}} {0xx1x \ {0x11x, 0x010, 0111x}, 000xx \ {0000x, 00001, 0001x}} { 0xx1x10x1x \ { 0xx1110x10, 0xx1010x11, 0x11x10x1x, 0x01010x1x, 0111x10x1x}, 000xx10xxx \ { 000x110xx0, 000x010xx1, 0001x10x0x, 0000x10x1x, 000xx10001, 000xx10x0x, 000xx10100, 0000x10xxx, 0000110xxx, 0001x10xxx}, 0xx11xx011 \ { 0xx110x011, 0xx11x0011, 0x111xx011, 01111xx011}, 000x1xx0x1 \ { 00011xx001, 00001xx011, 000x10x0x1, 000x1xx001, 000x1x0011, 00001xx0x1, 00001xx0x1, 00011xx0x1}} {x00xx \ {1000x, x001x, 100xx}, xxx10 \ {01x10, 10x10, 00x10}} {01xxx \ {01010, 01101, 01110}, x100x \ {01001, 01000, 11001}} { 01xxxx00xx \ { 01xx1x00x0, 01xx0x00x1, 01x1xx000x, 01x0xx001x, 01xxx1000x, 01xxxx001x, 01xxx100xx, 01010x00xx, 01101x00xx, 01110x00xx}, x100xx000x \ { x1001x0000, x1000x0001, x100x1000x, x100x1000x, 01001x000x, 01000x000x, 11001x000x}, 01x10xxx10 \ { 01x1001x10, 01x1010x10, 01x1000x10, 01010xxx10, 01110xxx10}} {00x10 \ {00110, 00010}} {00xxx \ {00101, 0010x, 001x0}} { 00x1000x10 \ { 00x1000110, 00x1000010, 0011000x10}} {111xx \ {111x0, 11100}} {x101x \ {x1011, 01011}, x11xx \ {x11x0, 11100, x110x}} { x101x1111x \ { x101111110, x101011111, x101x11110, x10111111x, 010111111x}, x11xx111xx \ { x11x1111x0, x11x0111x1, x111x1110x, x110x1111x, x11xx111x0, x11xx11100, x11x0111xx, 11100111xx, x110x111xx}} {x00xx \ {10000, x0011, x00x0}, xx1x0 \ {0x1x0, xx110, xx100}} {10x1x \ {10110, 10x11}, x110x \ {x1101, 0110x, 1110x}} { 10x1xx001x \ { 10x11x0010, 10x10x0011, 10x1xx0011, 10x1xx0010, 10110x001x, 10x11x001x}, x110xx000x \ { x1101x0000, x1100x0001, x110x10000, x110xx0000, x1101x000x, 0110xx000x, 1110xx000x}, 10x10xx110 \ { 10x100x110, 10x10xx110, 10110xx110}, x1100xx100 \ { x11000x100, x1100xx100, 01100xx100, 11100xx100}} {x011x \ {10110, 00111, x0111}} {0x1x1 \ {001x1, 00101, 011x1}, 000x1 \ {00001}} { 0x111x0111 \ { 0x11100111, 0x111x0111, 00111x0111, 01111x0111}, 00011x0111 \ { 0001100111, 00011x0111}} {xxxxx \ {10101, x1xx1, xx1xx}, 0xx10 \ {0x110, 01110, 01010}} {10x01 \ {10101}, x1x0x \ {x1100, 1110x, x110x}} { 10x01xxx01 \ { 10x0110101, 10x01x1x01, 10x01xx101, 10101xxx01}, x1x0xxxx0x \ { x1x01xxx00, x1x00xxx01, x1x0x10101, x1x0xx1x01, x1x0xxx10x, x1100xxx0x, 1110xxxx0x, x110xxxx0x}} {1x1x1 \ {11111, 11101, 10111}} {x110x \ {0110x, 11101}} { x11011x101 \ { x110111101, 011011x101, 111011x101}} {} {xx001 \ {1x001, 11001, 11001}} {} {00x0x \ {00x00, 00x01, 0010x}, 0110x \ {01101}, x01x0 \ {x0110, 10110, 10110}} {} {} {1x0xx \ {100x1, 1x000}} {xxx01 \ {11001, 10x01, 01101}, x0x0x \ {10000, 00101, x0101}, 0x10x \ {00100, 0010x, 0010x}} { xxx011x001 \ { xxx0110001, 110011x001, 10x011x001, 011011x001}, x0x0x1x00x \ { x0x011x000, x0x001x001, x0x0x10001, x0x0x1x000, 100001x00x, 001011x00x, x01011x00x}, 0x10x1x00x \ { 0x1011x000, 0x1001x001, 0x10x10001, 0x10x1x000, 001001x00x, 0010x1x00x, 0010x1x00x}} {xx10x \ {x110x, 10101, 11100}} {1011x \ {10111, 10110, 10110}, x0xxx \ {x0100, 00100, 00001}} { x0x0xxx10x \ { x0x01xx100, x0x00xx101, x0x0xx110x, x0x0x10101, x0x0x11100, x0100xx10x, 00100xx10x, 00001xx10x}} {x1x11 \ {x1011, 11011, 11x11}, xx10x \ {1110x, 1x100, 0x100}} {xxx1x \ {x1110, 00111, 01x1x}} { xxx11x1x11 \ { xxx11x1011, xxx1111011, xxx1111x11, 00111x1x11, 01x11x1x11}} {x0x11 \ {10011, x0111, 00x11}} {xxxx1 \ {0x101, 000x1, 00101}} { xxx11x0x11 \ { xxx1110011, xxx11x0111, xxx1100x11, 00011x0x11}} {01xxx \ {011x0, 01x00, 01x01}, x1xxx \ {11101, 11011, x1x11}} {xx111 \ {x1111, 1x111, x0111}, x0xx1 \ {10001, 10111, 001x1}} { xx11101x11 \ { x111101x11, 1x11101x11, x011101x11}, x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101x01, 1000101xx1, 1011101xx1, 001x101xx1}, xx111x1x11 \ { xx11111011, xx111x1x11, x1111x1x11, 1x111x1x11, x0111x1x11}, x0xx1x1xx1 \ { x0x11x1x01, x0x01x1x11, x0xx111101, x0xx111011, x0xx1x1x11, 10001x1xx1, 10111x1xx1, 001x1x1xx1}} {xx001 \ {1x001, 0x001, 10001}, 011xx \ {0110x, 01101, 0111x}} {100xx \ {10001, 100x1}} { 10001xx001 \ { 100011x001, 100010x001, 1000110001, 10001xx001, 10001xx001}, 100xx011xx \ { 100x1011x0, 100x0011x1, 1001x0110x, 1000x0111x, 100xx0110x, 100xx01101, 100xx0111x, 10001011xx, 100x1011xx}} {01xx1 \ {01111, 01001}} {x0xx1 \ {00001, x00x1, x0001}} { x0xx101xx1 \ { x0x1101x01, x0x0101x11, x0xx101111, x0xx101001, 0000101xx1, x00x101xx1, x000101xx1}} {x110x \ {1110x, 01101, x1101}, x11x0 \ {11100, 011x0}} {x011x \ {00110, 0011x, 1011x}, 01xxx \ {010x1, 01100}} { 01x0xx110x \ { 01x01x1100, 01x00x1101, 01x0x1110x, 01x0x01101, 01x0xx1101, 01001x110x, 01100x110x}, x0110x1110 \ { x011001110, 00110x1110, 00110x1110, 10110x1110}, 01xx0x11x0 \ { 01x10x1100, 01x00x1110, 01xx011100, 01xx0011x0, 01100x11x0}} {11xx1 \ {11101, 11111, 111x1}} {1x001 \ {11001, 10001}, xxxx0 \ {101x0, 0xx10, 1x100}, 1xxx1 \ {10xx1, 10101, 1xx01}} { 1x00111x01 \ { 1x00111101, 1x00111101, 1100111x01, 1000111x01}, 1xxx111xx1 \ { 1xx1111x01, 1xx0111x11, 1xxx111101, 1xxx111111, 1xxx1111x1, 10xx111xx1, 1010111xx1, 1xx0111xx1}} {x011x \ {x0111, 1011x, 00110}} {x0010 \ {10010, 00010, 00010}, 00x1x \ {00010, 00011, 00110}} { x0010x0110 \ { x001010110, x001000110, 10010x0110, 00010x0110, 00010x0110}, 00x1xx011x \ { 00x11x0110, 00x10x0111, 00x1xx0111, 00x1x1011x, 00x1x00110, 00010x011x, 00011x011x, 00110x011x}} {x010x \ {00100, x0100, 10100}, 01x10 \ {01110, 01010}} {0xx0x \ {0xx01, 0000x, 0x100}} { 0xx0xx010x \ { 0xx01x0100, 0xx00x0101, 0xx0x00100, 0xx0xx0100, 0xx0x10100, 0xx01x010x, 0000xx010x, 0x100x010x}} {011xx \ {011x0, 01101, 0111x}, xx1xx \ {x110x, x01x0, 0111x}} {00x01 \ {00101, 00001}, 0xxx1 \ {00111, 00001, 00011}} { 00x0101101 \ { 00x0101101, 0010101101, 0000101101}, 0xxx1011x1 \ { 0xx1101101, 0xx0101111, 0xxx101101, 0xxx101111, 00111011x1, 00001011x1, 00011011x1}, 00x01xx101 \ { 00x01x1101, 00101xx101, 00001xx101}, 0xxx1xx1x1 \ { 0xx11xx101, 0xx01xx111, 0xxx1x1101, 0xxx101111, 00111xx1x1, 00001xx1x1, 00011xx1x1}} {111xx \ {111x1, 1111x, 1111x}, x011x \ {x0111, 00110}} {xx11x \ {xx110, x1111, 01111}, x10xx \ {01001, 1101x, 11010}} { xx11x1111x \ { xx11111110, xx11011111, xx11x11111, xx11x1111x, xx11x1111x, xx1101111x, x11111111x, 011111111x}, x10xx111xx \ { x10x1111x0, x10x0111x1, x101x1110x, x100x1111x, x10xx111x1, x10xx1111x, x10xx1111x, 01001111xx, 1101x111xx, 11010111xx}, xx11xx011x \ { xx111x0110, xx110x0111, xx11xx0111, xx11x00110, xx110x011x, x1111x011x, 01111x011x}, x101xx011x \ { x1011x0110, x1010x0111, x101xx0111, x101x00110, 1101xx011x, 11010x011x}} {x1xx1 \ {010x1, 11x01, x1111}} {0x10x \ {0x101, 00101, 00100}} { 0x101x1x01 \ { 0x10101001, 0x10111x01, 0x101x1x01, 00101x1x01}} {} {11x1x \ {11010, 11x10, 1111x}} {} {1001x \ {10011, 10010}} {x000x \ {10000, x0000, 1000x}, 1x001 \ {10001, 11001}, 0xxxx \ {0000x, 0x10x, 0x0xx}} { 0xx1x1001x \ { 0xx1110010, 0xx1010011, 0xx1x10011, 0xx1x10010, 0x01x1001x}} {xx0xx \ {x0001, 0x01x, x000x}, xx00x \ {x1000, x100x, 1x001}, xx1x0 \ {11110, 01100, 11100}} {xx101 \ {1x101, 01101, 0x101}, 01xxx \ {011x1, 01001, 0101x}} { xx101xx001 \ { xx101x0001, xx101x0001, 1x101xx001, 01101xx001, 0x101xx001}, 01xxxxx0xx \ { 01xx1xx0x0, 01xx0xx0x1, 01x1xxx00x, 01x0xxx01x, 01xxxx0001, 01xxx0x01x, 01xxxx000x, 011x1xx0xx, 01001xx0xx, 0101xxx0xx}, xx101xx001 \ { xx101x1001, xx1011x001, 1x101xx001, 01101xx001, 0x101xx001}, 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0xx1000, 01x0xx100x, 01x0x1x001, 01101xx00x, 01001xx00x}, 01xx0xx1x0 \ { 01x10xx100, 01x00xx110, 01xx011110, 01xx001100, 01xx011100, 01010xx1x0}} {1xxx0 \ {10010, 10000, 110x0}, 0x001 \ {01001, 00001}} {x1x11 \ {01011, 11x11, 11x11}} {} {111xx \ {11110, 11100, 11111}, x110x \ {01100, 1110x, x1100}} {} {} {1x0x1 \ {10001, 110x1, 110x1}} {10xx0 \ {100x0, 10x10}, xx11x \ {1x110, 0111x, 11110}, 01x00 \ {01100, 01000, 01000}} { xx1111x011 \ { xx11111011, xx11111011, 011111x011}} {1001x \ {10010, 10011}} {} {} {101x0 \ {10100, 10110}, 1x1x1 \ {11111, 10101, 10111}} {1x0xx \ {1x000, 1001x, 1000x}} { 1x0x0101x0 \ { 1x01010100, 1x00010110, 1x0x010100, 1x0x010110, 1x000101x0, 10010101x0, 10000101x0}, 1x0x11x1x1 \ { 1x0111x101, 1x0011x111, 1x0x111111, 1x0x110101, 1x0x110111, 100111x1x1, 100011x1x1}} {x11x0 \ {11110, 111x0, x1100}, xx0xx \ {1000x, 0x00x, 00001}, 1xxxx \ {1x11x, 101xx, 10000}} {1xx01 \ {10x01, 11x01, 10101}, 0x1xx \ {0110x, 001xx, 0x101}, x101x \ {11010, x1011, 01011}} { 0x1x0x11x0 \ { 0x110x1100, 0x100x1110, 0x1x011110, 0x1x0111x0, 0x1x0x1100, 01100x11x0, 001x0x11x0}, x1010x1110 \ { x101011110, x101011110, 11010x1110}, 1xx01xx001 \ { 1xx0110001, 1xx010x001, 1xx0100001, 10x01xx001, 11x01xx001, 10101xx001}, 0x1xxxx0xx \ { 0x1x1xx0x0, 0x1x0xx0x1, 0x11xxx00x, 0x10xxx01x, 0x1xx1000x, 0x1xx0x00x, 0x1xx00001, 0110xxx0xx, 001xxxx0xx, 0x101xx0xx}, x101xxx01x \ { x1011xx010, x1010xx011, 11010xx01x, x1011xx01x, 01011xx01x}, 1xx011xx01 \ { 1xx0110101, 10x011xx01, 11x011xx01, 101011xx01}, 0x1xx1xxxx \ { 0x1x11xxx0, 0x1x01xxx1, 0x11x1xx0x, 0x10x1xx1x, 0x1xx1x11x, 0x1xx101xx, 0x1xx10000, 0110x1xxxx, 001xx1xxxx, 0x1011xxxx}, x101x1xx1x \ { x10111xx10, x10101xx11, x101x1x11x, x101x1011x, 110101xx1x, x10111xx1x, 010111xx1x}} {0111x \ {01111, 01110}} {0x00x \ {00000, 0x001, 0100x}, x1x0x \ {01101, 01001, x100x}, x0xxx \ {00100, 001x1, 00x01}} { x0x1x0111x \ { x0x1101110, x0x1001111, x0x1x01111, x0x1x01110, 001110111x}} {x11x0 \ {011x0, 11100}, xxx0x \ {xx001, x000x, xxx00}, x1x1x \ {x1111, 1101x, x1110}} {01x0x \ {0100x, 01001, 01101}} { 01x00x1100 \ { 01x0001100, 01x0011100, 01000x1100}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xxx001, 01x0xx000x, 01x0xxxx00, 0100xxxx0x, 01001xxx0x, 01101xxx0x}} {} {xx1xx \ {0x101, 101xx, 0x110}, 0xx00 \ {0x100, 01000, 01000}} {} {} {00x1x \ {00010, 0011x, 00110}, x0x1x \ {x0110, 10111, 10x10}} {} {} {10xxx \ {10001, 10011, 10xx0}, x1xxx \ {1101x, x1001, 11xx0}, x1xx1 \ {01111, 11101, 11x11}} {} {x1x11 \ {11x11, 11011, 11111}, xxx10 \ {x0110, 00x10, 11x10}} {xx100 \ {11100, x1100, 1x100}, 1x01x \ {11011, 10010, 1001x}} { 1x011x1x11 \ { 1x01111x11, 1x01111011, 1x01111111, 11011x1x11, 10011x1x11}, 1x010xxx10 \ { 1x010x0110, 1x01000x10, 1x01011x10, 10010xxx10, 10010xxx10}} {10xx1 \ {10011, 10001, 10x01}} {01x1x \ {0101x, 01110}} { 01x1110x11 \ { 01x1110011, 0101110x11}} {xx010 \ {1x010, 10010, 11010}, xx10x \ {11101, 0x100, 11100}} {x0x10 \ {x0010, x0110, 00110}, 00xx1 \ {00101, 001x1, 000x1}} { x0x10xx010 \ { x0x101x010, x0x1010010, x0x1011010, x0010xx010, x0110xx010, 00110xx010}, 00x01xx101 \ { 00x0111101, 00101xx101, 00101xx101, 00001xx101}} {x1xxx \ {01000, x1xx1, 01x00}, 00x01 \ {00001, 00101}} {x110x \ {11100, 11101, x1100}, 1xx1x \ {11x11, 1x010, 1x011}} { x110xx1x0x \ { x1101x1x00, x1100x1x01, x110x01000, x110xx1x01, x110x01x00, 11100x1x0x, 11101x1x0x, x1100x1x0x}, 1xx1xx1x1x \ { 1xx11x1x10, 1xx10x1x11, 1xx1xx1x11, 11x11x1x1x, 1x010x1x1x, 1x011x1x1x}, x110100x01 \ { x110100001, x110100101, 1110100x01}} {1x00x \ {11000, 10001, 11001}, 10xx1 \ {101x1, 10111}, 10x1x \ {10x10, 10x11, 10111}} {00xx0 \ {001x0, 00000, 00110}} { 00x001x000 \ { 00x0011000, 001001x000, 000001x000}, 00x1010x10 \ { 00x1010x10, 0011010x10, 0011010x10}} {x0x1x \ {00x10, 00x1x}, 11x1x \ {1111x}} {01xx0 \ {01x00, 010x0}, xx111 \ {11111, 0x111, 1x111}} { 01x10x0x10 \ { 01x1000x10, 01x1000x10, 01010x0x10}, xx111x0x11 \ { xx11100x11, 11111x0x11, 0x111x0x11, 1x111x0x11}, 01x1011x10 \ { 01x1011110, 0101011x10}, xx11111x11 \ { xx11111111, 1111111x11, 0x11111x11, 1x11111x11}} {x1xx1 \ {010x1, 01011, x1x01}} {0x0x0 \ {0x010, 01000, 0x000}, 011xx \ {01100, 01110, 01110}} { 011x1x1xx1 \ { 01111x1x01, 01101x1x11, 011x1010x1, 011x101011, 011x1x1x01}} {0xx10 \ {00110, 01110, 0x010}, 01x0x \ {0100x, 01000, 01000}} {xx1xx \ {x010x, 0110x, 101xx}, 00xx1 \ {00x01, 00011}} { xx1100xx10 \ { xx11000110, xx11001110, xx1100x010, 101100xx10}, xx10x01x0x \ { xx10101x00, xx10001x01, xx10x0100x, xx10x01000, xx10x01000, x010x01x0x, 0110x01x0x, 1010x01x0x}, 00x0101x01 \ { 00x0101001, 00x0101x01}} {x0x1x \ {00x11, 10011, 00x10}, x1xxx \ {x1100, 11011, x1x01}} {010xx \ {010x0, 01010, 01011}, xx100 \ {00100, 1x100, 11100}} { 0101xx0x1x \ { 01011x0x10, 01010x0x11, 0101x00x11, 0101x10011, 0101x00x10, 01010x0x1x, 01010x0x1x, 01011x0x1x}, 010xxx1xxx \ { 010x1x1xx0, 010x0x1xx1, 0101xx1x0x, 0100xx1x1x, 010xxx1100, 010xx11011, 010xxx1x01, 010x0x1xxx, 01010x1xxx, 01011x1xxx}, xx100x1x00 \ { xx100x1100, 00100x1x00, 1x100x1x00, 11100x1x00}} {1x0x0 \ {100x0, 11010, 11000}, 00x0x \ {00101, 00x00, 0010x}, x1x11 \ {01111, 01011, 01011}} {0111x \ {01110, 01111}} { 011101x010 \ { 0111010010, 0111011010, 011101x010}, 01111x1x11 \ { 0111101111, 0111101011, 0111101011, 01111x1x11}} {xx1x1 \ {x1101, x01x1, 00101}} {0011x \ {00110, 00111}} { 00111xx111 \ { 00111x0111, 00111xx111}} {} {x1x0x \ {x1101, x100x, 11x01}} {} {xx011 \ {x0011, 10011, 0x011}, xx00x \ {1x000, 01000, 01000}} {} {} {1x001 \ {11001, 10001}, 10xx0 \ {10x00, 10100, 100x0}} {1x011 \ {11011, 10011, 10011}} {} {xxx1x \ {x1x11, xx11x, 1011x}, x1x11 \ {11111, 11011, 01111}} {x01x0 \ {x0100, x0110, 10110}} { x0110xxx10 \ { x0110xx110, x011010110, x0110xxx10, 10110xxx10}} {x0xx0 \ {10000, 00100, x0x00}} {00xx1 \ {00001, 001x1, 00011}, 1101x \ {11010}, 01x0x \ {01001, 01x01, 0100x}} { 11010x0x10 \ { 11010x0x10}, 01x00x0x00 \ { 01x0010000, 01x0000100, 01x00x0x00, 01000x0x00}} {x1x10 \ {11x10, x1110, 01x10}, 110xx \ {1101x, 11000, 11010}} {1011x \ {10110}} { 10110x1x10 \ { 1011011x10, 10110x1110, 1011001x10, 10110x1x10}, 1011x1101x \ { 1011111010, 1011011011, 1011x1101x, 1011x11010, 101101101x}} {1xxx1 \ {11111, 1x011, 10xx1}, 110xx \ {11000, 1101x, 110x1}} {1xx0x \ {11x00, 10x0x, 10x01}} { 1xx011xx01 \ { 1xx0110x01, 10x011xx01, 10x011xx01}, 1xx0x1100x \ { 1xx0111000, 1xx0011001, 1xx0x11000, 1xx0x11001, 11x001100x, 10x0x1100x, 10x011100x}} {x1xxx \ {11x10, 11100, 010xx}} {} {} {01x00 \ {01100, 01000}} {1xx1x \ {11x10, 11010, 1x111}, 10x10 \ {10110}} {} {} {0x010 \ {01010}, xx101 \ {11101, 00101, 01101}} {} {000xx \ {000x0, 0001x, 00011}} {x11xx \ {x1110, 111xx, x11x0}, x101x \ {x1011, 11011}} { x11xx000xx \ { x11x1000x0, x11x0000x1, x111x0000x, x110x0001x, x11xx000x0, x11xx0001x, x11xx00011, x1110000xx, 111xx000xx, x11x0000xx}, x101x0001x \ { x101100010, x101000011, x101x00010, x101x0001x, x101x00011, x10110001x, 110110001x}} {01x1x \ {0111x, 01011}} {0xxx0 \ {00100, 01110, 0x010}, xx000 \ {0x000, 10000, 10000}} { 0xx1001x10 \ { 0xx1001110, 0111001x10, 0x01001x10}} {x100x \ {01000, 0100x, 11001}} {11xx1 \ {11111, 111x1}, x1xx0 \ {11x00, 11100, x1110}} { 11x01x1001 \ { 11x0101001, 11x0111001, 11101x1001}, x1x00x1000 \ { x1x0001000, x1x0001000, 11x00x1000, 11100x1000}} {x1xxx \ {11xxx, 1101x, 0111x}, 1xxx1 \ {1x0x1, 10001, 11x01}} {x00x1 \ {000x1, 00001, x0001}, xx11x \ {x111x, 0x11x, 0x111}} { x00x1x1xx1 \ { x0011x1x01, x0001x1x11, x00x111xx1, x00x111011, x00x101111, 000x1x1xx1, 00001x1xx1, x0001x1xx1}, xx11xx1x1x \ { xx111x1x10, xx110x1x11, xx11x11x1x, xx11x1101x, xx11x0111x, x111xx1x1x, 0x11xx1x1x, 0x111x1x1x}, x00x11xxx1 \ { x00111xx01, x00011xx11, x00x11x0x1, x00x110001, x00x111x01, 000x11xxx1, 000011xxx1, x00011xxx1}, xx1111xx11 \ { xx1111x011, x11111xx11, 0x1111xx11, 0x1111xx11}} {11xx0 \ {11x10, 11110}, x0010 \ {00010, 10010}} {x0xx0 \ {x0000, x0100, 10110}, x0xx0 \ {10000, x0100, 10x00}} { x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011x10, x0xx011110, x000011xx0, x010011xx0, 1011011xx0}, x0xx011xx0 \ { x0x1011x00, x0x0011x10, x0xx011x10, x0xx011110, 1000011xx0, x010011xx0, 10x0011xx0}, x0x10x0010 \ { x0x1000010, x0x1010010}} {x110x \ {x1100, 11100, 0110x}, xxx01 \ {xx101, 00001, 1xx01}} {xx101 \ {x0101, x1101, 11101}, x101x \ {11010, x1010}} { xx101x1101 \ { xx10101101, x0101x1101, x1101x1101, 11101x1101}, xx101xxx01 \ { xx101xx101, xx10100001, xx1011xx01, x0101xxx01, x1101xxx01, 11101xxx01}} {x000x \ {x0001, 1000x, 0000x}, x0xxx \ {00101, 00x0x, x000x}} {10xx0 \ {10010, 101x0, 101x0}} { 10x00x0000 \ { 10x0010000, 10x0000000, 10100x0000, 10100x0000}, 10xx0x0xx0 \ { 10x10x0x00, 10x00x0x10, 10xx000x00, 10xx0x0000, 10010x0xx0, 101x0x0xx0, 101x0x0xx0}} {01xxx \ {01x00, 01x0x, 01000}, x11xx \ {01101, 0111x, 1110x}} {1xxx1 \ {10x01, 100x1, 1x101}} { 1xxx101xx1 \ { 1xx1101x01, 1xx0101x11, 1xxx101x01, 10x0101xx1, 100x101xx1, 1x10101xx1}, 1xxx1x11x1 \ { 1xx11x1101, 1xx01x1111, 1xxx101101, 1xxx101111, 1xxx111101, 10x01x11x1, 100x1x11x1, 1x101x11x1}} {} {x001x \ {00010, 10011, 0001x}, 0x0x1 \ {0x011, 0x001, 01001}} {} {01xx1 \ {011x1, 010x1}, 0xxx0 \ {01110, 00100, 01000}} {} {} {1xxx0 \ {100x0, 10010, 110x0}} {x0110 \ {00110}} { x01101xx10 \ { x011010010, x011010010, x011011010, 001101xx10}} {10x1x \ {10x11, 10011, 10111}, 0xx0x \ {0xx01, 0x001, 0x000}} {x0x11 \ {10x11, 10011, x0011}} { x0x1110x11 \ { x0x1110x11, x0x1110011, x0x1110111, 10x1110x11, 1001110x11, x001110x11}} {10x00 \ {10000, 10100}, 11xxx \ {11001, 11111, 111xx}} {1x1x1 \ {11111, 11101, 10101}} { 1x1x111xx1 \ { 1x11111x01, 1x10111x11, 1x1x111001, 1x1x111111, 1x1x1111x1, 1111111xx1, 1110111xx1, 1010111xx1}} {0x01x \ {00011, 0101x, 0101x}, 0xx01 \ {01001, 0x001}} {10xxx \ {10111, 100xx, 10x01}} { 10x1x0x01x \ { 10x110x010, 10x100x011, 10x1x00011, 10x1x0101x, 10x1x0101x, 101110x01x, 1001x0x01x}, 10x010xx01 \ { 10x0101001, 10x010x001, 100010xx01, 10x010xx01}} {} {11xxx \ {11110, 1110x, 11x1x}, x101x \ {x1011, 0101x, 11011}, 01x1x \ {01x10, 0101x, 0111x}} {} {01x0x \ {0100x, 01101, 01101}} {11xx0 \ {11100, 11010, 11110}, xx1x0 \ {00100, 00110, 00110}, 110xx \ {11010, 110x1, 1101x}} { 11x0001x00 \ { 11x0001000, 1110001x00}, xx10001x00 \ { xx10001000, 0010001x00}, 1100x01x0x \ { 1100101x00, 1100001x01, 1100x0100x, 1100x01101, 1100x01101, 1100101x0x}} {1001x \ {10010, 10011}, x110x \ {01100, x1101}, xx1xx \ {0x10x, 1x11x, 0x101}} {} {} {xx10x \ {00100, 10101, xx101}} {1x01x \ {1x011, 1001x}} {} {xx0x0 \ {01010, 010x0, xx010}} {1x1x0 \ {1x100, 111x0}} { 1x1x0xx0x0 \ { 1x110xx000, 1x100xx010, 1x1x001010, 1x1x0010x0, 1x1x0xx010, 1x100xx0x0, 111x0xx0x0}} {00xx0 \ {000x0}} {} {} {} {xxx11 \ {01111, 10111, 11x11}, x00x1 \ {000x1, 10001, 00011}, x0xx0 \ {00000, x0x10, 10x00}} {} {} {xxx01 \ {0x001, x1x01, 11x01}, 11x0x \ {11000, 11101, 11x00}} {} {1x001 \ {10001, 11001}, 011x1 \ {01111}} {} {} {01x0x \ {01x01, 01000}} {xxx10 \ {xx110, 01010, 01010}} {} {0x000 \ {01000, 00000}} {0x1x0 \ {00100, 01110, 00110}, xx11x \ {x1111, 10110, 0x111}} { 0x1000x000 \ { 0x10001000, 0x10000000, 001000x000}} {11x0x \ {1110x, 11101, 11000}, 0xx11 \ {01x11, 0x111}} {10x00 \ {10100}, x0xx0 \ {00x00, x0110, 00000}} { 10x0011x00 \ { 10x0011100, 10x0011000, 1010011x00}, x0x0011x00 \ { x0x0011100, x0x0011000, 00x0011x00, 0000011x00}} {} {x1x10 \ {11x10, x1110}, 0xx01 \ {00101, 0x101, 01001}, x001x \ {10010, 1001x, x0010}} {} {0xx1x \ {00010, 01x10, 0xx10}, 00xx1 \ {00101, 001x1, 00x01}} {x1x01 \ {11101, 11001, x1001}, xx1xx \ {111x0, 01111, 0x100}} { xx11x0xx1x \ { xx1110xx10, xx1100xx11, xx11x00010, xx11x01x10, xx11x0xx10, 111100xx1x, 011110xx1x}, x1x0100x01 \ { x1x0100101, x1x0100101, x1x0100x01, 1110100x01, 1100100x01, x100100x01}, xx1x100xx1 \ { xx11100x01, xx10100x11, xx1x100101, xx1x1001x1, xx1x100x01, 0111100xx1}} {xxxxx \ {x1xxx, 1x111, 010x1}, xx0xx \ {11010, 1x01x, 0x0xx}, 01xx1 \ {01101, 01011, 01x01}} {10x0x \ {10001, 1010x}, 01x0x \ {01100, 01101}} { 10x0xxxx0x \ { 10x01xxx00, 10x00xxx01, 10x0xx1x0x, 10x0x01001, 10001xxx0x, 1010xxxx0x}, 01x0xxxx0x \ { 01x01xxx00, 01x00xxx01, 01x0xx1x0x, 01x0x01001, 01100xxx0x, 01101xxx0x}, 10x0xxx00x \ { 10x01xx000, 10x00xx001, 10x0x0x00x, 10001xx00x, 1010xxx00x}, 01x0xxx00x \ { 01x01xx000, 01x00xx001, 01x0x0x00x, 01100xx00x, 01101xx00x}, 10x0101x01 \ { 10x0101101, 10x0101x01, 1000101x01, 1010101x01}, 01x0101x01 \ { 01x0101101, 01x0101x01, 0110101x01}} {} {} {} {} {10x10 \ {10110, 10010, 10010}, x10xx \ {110xx, x1000, 11011}} {} {00x1x \ {00x10, 0011x, 00011}, 01x01 \ {01001, 01101}, xxxx0 \ {11010, 01x00, 1xx00}} {xx11x \ {1x110, 0x11x, x0110}, x1x10 \ {11010, x1010, x1010}} { xx11x00x1x \ { xx11100x10, xx11000x11, xx11x00x10, xx11x0011x, xx11x00011, 1x11000x1x, 0x11x00x1x, x011000x1x}, x1x1000x10 \ { x1x1000x10, x1x1000110, 1101000x10, x101000x10, x101000x10}, xx110xxx10 \ { xx11011010, 1x110xxx10, 0x110xxx10, x0110xxx10}, x1x10xxx10 \ { x1x1011010, 11010xxx10, x1010xxx10, x1010xxx10}} {x10x1 \ {01011, 01001, 010x1}, xx110 \ {00110, x1110, 11110}} {x0x0x \ {00001, 00x0x, 0010x}, xxx11 \ {1xx11, x1111}} { x0x01x1001 \ { x0x0101001, x0x0101001, 00001x1001, 00x01x1001, 00101x1001}, xxx11x1011 \ { xxx1101011, xxx1101011, 1xx11x1011, x1111x1011}} {x001x \ {1001x, 00011}, 1x0x0 \ {11010, 10010, 10010}} {x1xxx \ {01110, 010x0, 01x0x}, 00x01 \ {00101, 00001}, 0xx01 \ {00001}} { x1x1xx001x \ { x1x11x0010, x1x10x0011, x1x1x1001x, x1x1x00011, 01110x001x, 01010x001x}, x1xx01x0x0 \ { x1x101x000, x1x001x010, x1xx011010, x1xx010010, x1xx010010, 011101x0x0, 010x01x0x0, 01x001x0x0}} {xx110 \ {11110, x0110}, x101x \ {0101x, x1011, 1101x}} {xx00x \ {1x000, 11001, 10001}} {} {110xx \ {11000, 110x0}, 1xxx0 \ {1x110, 1x100, 1x0x0}} {0x0x0 \ {0x000, 01010, 010x0}, xx010 \ {1x010, 11010}} { 0x0x0110x0 \ { 0x01011000, 0x00011010, 0x0x011000, 0x0x0110x0, 0x000110x0, 01010110x0, 010x0110x0}, xx01011010 \ { xx01011010, 1x01011010, 1101011010}, 0x0x01xxx0 \ { 0x0101xx00, 0x0001xx10, 0x0x01x110, 0x0x01x100, 0x0x01x0x0, 0x0001xxx0, 010101xxx0, 010x01xxx0}, xx0101xx10 \ { xx0101x110, xx0101x010, 1x0101xx10, 110101xx10}} {x0010 \ {10010}, 011xx \ {01110, 011x1, 011x1}} {} {} {xx100 \ {11100, x0100, 10100}} {1xx01 \ {11x01, 11001, 1x101}, x0000 \ {10000}} { x0000xx100 \ { x000011100, x0000x0100, x000010100, 10000xx100}} {01xx1 \ {01101, 01111, 01111}, 0x0xx \ {00010, 010x0, 00001}, 10x0x \ {10x01, 1000x, 1000x}} {xxx00 \ {01x00, 11100, 01000}, 1xxxx \ {1xx01, 1xxx0, 1x101}} { 1xxx101xx1 \ { 1xx1101x01, 1xx0101x11, 1xxx101101, 1xxx101111, 1xxx101111, 1xx0101xx1, 1x10101xx1}, xxx000x000 \ { xxx0001000, 01x000x000, 111000x000, 010000x000}, 1xxxx0x0xx \ { 1xxx10x0x0, 1xxx00x0x1, 1xx1x0x00x, 1xx0x0x01x, 1xxxx00010, 1xxxx010x0, 1xxxx00001, 1xx010x0xx, 1xxx00x0xx, 1x1010x0xx}, xxx0010x00 \ { xxx0010000, xxx0010000, 01x0010x00, 1110010x00, 0100010x00}, 1xx0x10x0x \ { 1xx0110x00, 1xx0010x01, 1xx0x10x01, 1xx0x1000x, 1xx0x1000x, 1xx0110x0x, 1xx0010x0x, 1x10110x0x}} {1xxxx \ {10001, 11001, 1x101}} {0x100 \ {01100}} { 0x1001xx00 \ { 011001xx00}} {00xx1 \ {000x1, 00001, 00111}} {} {} {x1x00 \ {01000, 11100, 11000}} {0x1x0 \ {01110, 011x0}} { 0x100x1x00 \ { 0x10001000, 0x10011100, 0x10011000, 01100x1x00}} {0xx10 \ {01010, 00010, 00x10}, 1x00x \ {1100x, 10000, 1000x}} {xxxx1 \ {00011, 010x1, 1x1x1}} { xxx011x001 \ { xxx0111001, xxx0110001, 010011x001, 1x1011x001}} {xxxxx \ {x1xx0, 11x01, xx1x0}} {111xx \ {1110x, 111x0, 111x0}} { 111xxxxxxx \ { 111x1xxxx0, 111x0xxxx1, 1111xxxx0x, 1110xxxx1x, 111xxx1xx0, 111xx11x01, 111xxxx1x0, 1110xxxxxx, 111x0xxxxx, 111x0xxxxx}} {xx00x \ {1x000, 0x000, 1000x}} {xx10x \ {0110x, x110x, 00101}, xxxxx \ {x11x0, 0x111, xx1xx}} { xx10xxx00x \ { xx101xx000, xx100xx001, xx10x1x000, xx10x0x000, xx10x1000x, 0110xxx00x, x110xxx00x, 00101xx00x}, xxx0xxx00x \ { xxx01xx000, xxx00xx001, xxx0x1x000, xxx0x0x000, xxx0x1000x, x1100xx00x, xx10xxx00x}} {1x011 \ {11011, 10011}, 1x0xx \ {110x1, 1x00x, 1x011}} {x1xxx \ {x1111, x1xx0, 01110}} { x1x111x011 \ { x1x1111011, x1x1110011, x11111x011}, x1xxx1x0xx \ { x1xx11x0x0, x1xx01x0x1, x1x1x1x00x, x1x0x1x01x, x1xxx110x1, x1xxx1x00x, x1xxx1x011, x11111x0xx, x1xx01x0xx, 011101x0xx}} {x00x0 \ {00000, x0010}, 0xxx1 \ {00x11, 00011, 01011}} {x100x \ {1100x, 0100x, x1000}} { x1000x0000 \ { x100000000, 11000x0000, 01000x0000, x1000x0000}, x10010xx01 \ { 110010xx01, 010010xx01}} {x011x \ {10111, 0011x, 10110}, xx100 \ {1x100, x1100, 11100}} {x0100 \ {10100, 00100, 00100}} { x0100xx100 \ { x01001x100, x0100x1100, x010011100, 10100xx100, 00100xx100, 00100xx100}} {1x010 \ {11010, 10010, 10010}, xxxxx \ {0x0xx, x1xx1, x0001}} {xxx01 \ {00x01, x0x01, x1x01}} { xxx01xxx01 \ { xxx010x001, xxx01x1x01, xxx01x0001, 00x01xxx01, x0x01xxx01, x1x01xxx01}} {} {1xx0x \ {1x10x, 11000, 1xx00}, x0x00 \ {10x00, x0000}} {} {xxx01 \ {0xx01, 00101, 01101}} {xx0x0 \ {x1010, 10000, 1x000}, 0x11x \ {0x110, 01111, 01111}} {} {11x10 \ {11010, 11110}, 0010x \ {00101, 00100, 00100}, 11x11 \ {11011}} {xxx10 \ {10x10, 0xx10, 11010}, x11xx \ {01110, x11x1, 1111x}, xx1xx \ {1x11x, 1x101, x0100}} { xxx1011x10 \ { xxx1011010, xxx1011110, 10x1011x10, 0xx1011x10, 1101011x10}, x111011x10 \ { x111011010, x111011110, 0111011x10, 1111011x10}, xx11011x10 \ { xx11011010, xx11011110, 1x11011x10}, x110x0010x \ { x110100100, x110000101, x110x00101, x110x00100, x110x00100, x11010010x}, xx10x0010x \ { xx10100100, xx10000101, xx10x00101, xx10x00100, xx10x00100, 1x1010010x, x01000010x}, x111111x11 \ { x111111011, x111111x11, 1111111x11}, xx11111x11 \ { xx11111011, 1x11111x11}} {1xx10 \ {1x110, 11110, 11x10}, xx10x \ {x0101, 01101, 0010x}} {01xxx \ {01x0x, 01100, 0101x}} { 01x101xx10 \ { 01x101x110, 01x1011110, 01x1011x10, 010101xx10}, 01x0xxx10x \ { 01x01xx100, 01x00xx101, 01x0xx0101, 01x0x01101, 01x0x0010x, 01x0xxx10x, 01100xx10x}} {} {10xxx \ {10001, 100x1}} {} {11x1x \ {11111, 11011, 11010}, xx000 \ {00000, 10000}} {xx101 \ {00101, 11101}, 0x100 \ {00100}, x0x1x \ {0011x, x001x, x0010}} { x0x1x11x1x \ { x0x1111x10, x0x1011x11, x0x1x11111, x0x1x11011, x0x1x11010, 0011x11x1x, x001x11x1x, x001011x1x}, 0x100xx000 \ { 0x10000000, 0x10010000, 00100xx000}} {xxx00 \ {01100, 00x00, 00000}} {x10x1 \ {11001, x1001, 11011}} {} {000xx \ {0000x, 000x1, 000x0}, 11xxx \ {1100x, 11001, 11x00}} {1xxxx \ {10xxx, 110x0, 111x0}} { 1xxxx000xx \ { 1xxx1000x0, 1xxx0000x1, 1xx1x0000x, 1xx0x0001x, 1xxxx0000x, 1xxxx000x1, 1xxxx000x0, 10xxx000xx, 110x0000xx, 111x0000xx}, 1xxxx11xxx \ { 1xxx111xx0, 1xxx011xx1, 1xx1x11x0x, 1xx0x11x1x, 1xxxx1100x, 1xxxx11001, 1xxxx11x00, 10xxx11xxx, 110x011xxx, 111x011xxx}} {0x10x \ {01100, 00101, 0x101}, 1xx10 \ {11110, 1x010, 1x010}} {1x11x \ {1111x, 10111, 10110}} { 1x1101xx10 \ { 1x11011110, 1x1101x010, 1x1101x010, 111101xx10, 101101xx10}} {0xx0x \ {01100, 00x01, 00x00}, x01xx \ {10101, 10110, 1010x}} {011xx \ {0111x, 0110x, 011x1}} { 0110x0xx0x \ { 011010xx00, 011000xx01, 0110x01100, 0110x00x01, 0110x00x00, 0110x0xx0x, 011010xx0x}, 011xxx01xx \ { 011x1x01x0, 011x0x01x1, 0111xx010x, 0110xx011x, 011xx10101, 011xx10110, 011xx1010x, 0111xx01xx, 0110xx01xx, 011x1x01xx}} {001x0 \ {00100, 00110}, 1x0xx \ {10011, 11000, 1000x}} {x011x \ {0011x, 00111}} { x011000110 \ { x011000110, 0011000110}, x011x1x01x \ { x01111x010, x01101x011, x011x10011, 0011x1x01x, 001111x01x}} {01xxx \ {01xx1, 01110, 01110}, 0xxx1 \ {01x01, 000x1, 001x1}} {00xx1 \ {001x1, 00001}} { 00xx101xx1 \ { 00x1101x01, 00x0101x11, 00xx101xx1, 001x101xx1, 0000101xx1}, 00xx10xxx1 \ { 00x110xx01, 00x010xx11, 00xx101x01, 00xx1000x1, 00xx1001x1, 001x10xxx1, 000010xxx1}} {0x10x \ {0110x, 00100, 00101}} {1x00x \ {10000, 11000, 10001}, x1x0x \ {01101, 11000, 01x0x}} { 1x00x0x10x \ { 1x0010x100, 1x0000x101, 1x00x0110x, 1x00x00100, 1x00x00101, 100000x10x, 110000x10x, 100010x10x}, x1x0x0x10x \ { x1x010x100, x1x000x101, x1x0x0110x, x1x0x00100, x1x0x00101, 011010x10x, 110000x10x, 01x0x0x10x}} {xxxx0 \ {0xx10, 01x00, x0xx0}, x1x0x \ {01101, 11001, 01000}} {0xx10 \ {01010, 01110, 00110}, xx110 \ {01110, 11110, 10110}} { 0xx10xxx10 \ { 0xx100xx10, 0xx10x0x10, 01010xxx10, 01110xxx10, 00110xxx10}, xx110xxx10 \ { xx1100xx10, xx110x0x10, 01110xxx10, 11110xxx10, 10110xxx10}} {xxxxx \ {1xxxx, x0111, 0x0x1}, 0x01x \ {0001x, 01010, 01010}} {x0x11 \ {10x11, 00111, 10011}} { x0x11xxx11 \ { x0x111xx11, x0x11x0111, x0x110x011, 10x11xxx11, 00111xxx11, 10011xxx11}, x0x110x011 \ { x0x1100011, 10x110x011, 001110x011, 100110x011}} {11xx1 \ {11x11, 110x1}} {00x1x \ {00x10, 0011x, 00111}} { 00x1111x11 \ { 00x1111x11, 00x1111011, 0011111x11, 0011111x11}} {110x1 \ {11011}, 001x0 \ {00110, 00100, 00100}} {xx01x \ {x1010, x101x, xx010}, 1x01x \ {1x011, 1x010, 10010}, xxx0x \ {11001, 01000, 01x00}} { xx01111011 \ { xx01111011, x101111011}, 1x01111011 \ { 1x01111011, 1x01111011}, xxx0111001 \ { 1100111001}, xx01000110 \ { xx01000110, x101000110, x101000110, xx01000110}, 1x01000110 \ { 1x01000110, 1x01000110, 1001000110}, xxx0000100 \ { xxx0000100, xxx0000100, 0100000100, 01x0000100}} {x1xx0 \ {11x00, 01x00}, xx101 \ {0x101, 10101, 00101}} {001x0 \ {00100, 00110, 00110}, x1x10 \ {01010, 11110}} { 001x0x1xx0 \ { 00110x1x00, 00100x1x10, 001x011x00, 001x001x00, 00100x1xx0, 00110x1xx0, 00110x1xx0}, x1x10x1x10 \ { 01010x1x10, 11110x1x10}} {x1x01 \ {11x01, 11001, 11001}, 11xx0 \ {11x00, 11000, 110x0}, xx10x \ {11101, 01100, 00100}} {xxxx1 \ {1x1x1, 011x1, xxx11}, x11x1 \ {11101, 01101, 11111}} { xxx01x1x01 \ { xxx0111x01, xxx0111001, xxx0111001, 1x101x1x01, 01101x1x01}, x1101x1x01 \ { x110111x01, x110111001, x110111001, 11101x1x01, 01101x1x01}, xxx01xx101 \ { xxx0111101, 1x101xx101, 01101xx101}, x1101xx101 \ { x110111101, 11101xx101, 01101xx101}} {xx1x0 \ {111x0, 1x100, 0x1x0}, 1x0xx \ {1100x, 1x0x0, 11011}, xxxx1 \ {01011, 10111, 01xx1}} {1xxxx \ {1x1xx, 1111x, 10x00}} { 1xxx0xx1x0 \ { 1xx10xx100, 1xx00xx110, 1xxx0111x0, 1xxx01x100, 1xxx00x1x0, 1x1x0xx1x0, 11110xx1x0, 10x00xx1x0}, 1xxxx1x0xx \ { 1xxx11x0x0, 1xxx01x0x1, 1xx1x1x00x, 1xx0x1x01x, 1xxxx1100x, 1xxxx1x0x0, 1xxxx11011, 1x1xx1x0xx, 1111x1x0xx, 10x001x0xx}, 1xxx1xxxx1 \ { 1xx11xxx01, 1xx01xxx11, 1xxx101011, 1xxx110111, 1xxx101xx1, 1x1x1xxxx1, 11111xxxx1}} {xx011 \ {01011, x1011, 00011}, x01xx \ {001xx, 0011x, 1010x}} {x11xx \ {x11x1, 111xx, 011x0}, x0x1x \ {10x11, 10010}} { x1111xx011 \ { x111101011, x1111x1011, x111100011, x1111xx011, 11111xx011}, x0x11xx011 \ { x0x1101011, x0x11x1011, x0x1100011, 10x11xx011}, x11xxx01xx \ { x11x1x01x0, x11x0x01x1, x111xx010x, x110xx011x, x11xx001xx, x11xx0011x, x11xx1010x, x11x1x01xx, 111xxx01xx, 011x0x01xx}, x0x1xx011x \ { x0x11x0110, x0x10x0111, x0x1x0011x, x0x1x0011x, 10x11x011x, 10010x011x}} {x000x \ {0000x, 00001, x0000}, 0000x \ {00000}} {00x1x \ {00011, 00111}} {} {x111x \ {11111}} {011xx \ {011x0, 0111x, 0111x}, x1xx1 \ {x1x11, x1111, 11111}} { 0111xx111x \ { 01111x1110, 01110x1111, 0111x11111, 01110x111x, 0111xx111x, 0111xx111x}, x1x11x1111 \ { x1x1111111, x1x11x1111, x1111x1111, 11111x1111}} {1xx1x \ {11x1x, 10111}, x011x \ {0011x, 1011x, 10111}, x110x \ {x1100, x1101, 01100}} {0xx11 \ {01x11, 01111, 00111}, x1001 \ {11001, 01001}} { 0xx111xx11 \ { 0xx1111x11, 0xx1110111, 01x111xx11, 011111xx11, 001111xx11}, 0xx11x0111 \ { 0xx1100111, 0xx1110111, 0xx1110111, 01x11x0111, 01111x0111, 00111x0111}, x1001x1101 \ { x1001x1101, 11001x1101, 01001x1101}} {1x10x \ {10101, 10100, 11100}, 00xx0 \ {00100, 00x00, 00x00}} {xx110 \ {11110, 1x110, 00110}, 0x0xx \ {01000, 010xx, 010x1}, x01x0 \ {001x0, 101x0}} { 0x00x1x10x \ { 0x0011x100, 0x0001x101, 0x00x10101, 0x00x10100, 0x00x11100, 010001x10x, 0100x1x10x, 010011x10x}, x01001x100 \ { x010010100, x010011100, 001001x100, 101001x100}, xx11000x10 \ { 1111000x10, 1x11000x10, 0011000x10}, 0x0x000xx0 \ { 0x01000x00, 0x00000x10, 0x0x000100, 0x0x000x00, 0x0x000x00, 0100000xx0, 010x000xx0}, x01x000xx0 \ { x011000x00, x010000x10, x01x000100, x01x000x00, x01x000x00, 001x000xx0, 101x000xx0}} {xxx10 \ {11x10, 10110, x0010}} {01x00 \ {01000}} {} {} {xx111 \ {x1111, 1x111, 11111}} {} {x0101 \ {00101, 10101}, x1x01 \ {01101, x1101, x1101}} {xxx1x \ {1xx1x, xxx10, x0x1x}, 0xx10 \ {01110, 00110, 00110}} {} {0x11x \ {0111x, 0x111, 0011x}, 0xx0x \ {0010x, 00000, 01100}} {} {} {1xxx1 \ {10x11, 1xx11, 100x1}, x0011 \ {10011, 00011}} {} {} {} {01x11 \ {01111, 01011}, 0x11x \ {0111x}} {} {1xx10 \ {1x010, 1x110, 10010}, xx00x \ {0x00x, 10000, 0x000}} {x1x0x \ {01000, x1001, x100x}} { x1x0xxx00x \ { x1x01xx000, x1x00xx001, x1x0x0x00x, x1x0x10000, x1x0x0x000, 01000xx00x, x1001xx00x, x100xxx00x}} {0xx11 \ {00111, 01011, 01x11}, 0x1xx \ {00110, 00100, 001x1}} {01xx1 \ {01111, 01011, 01x11}, xxx10 \ {11x10, 0x110, x1110}} { 01x110xx11 \ { 01x1100111, 01x1101011, 01x1101x11, 011110xx11, 010110xx11, 01x110xx11}, 01xx10x1x1 \ { 01x110x101, 01x010x111, 01xx1001x1, 011110x1x1, 010110x1x1, 01x110x1x1}, xxx100x110 \ { xxx1000110, 11x100x110, 0x1100x110, x11100x110}} {1x000 \ {11000, 10000, 10000}, 00xxx \ {00100, 0000x}} {xxx1x \ {x0011, 10x11, x001x}, x1xx1 \ {x1111, x11x1, 01101}} { xxx1x00x1x \ { xxx1100x10, xxx1000x11, x001100x1x, 10x1100x1x, x001x00x1x}, x1xx100xx1 \ { x1x1100x01, x1x0100x11, x1xx100001, x111100xx1, x11x100xx1, 0110100xx1}} {1100x \ {11001, 11000}, 0x1x1 \ {01111, 001x1, 00111}} {xx01x \ {x101x, 11011, x0010}, xx1x0 \ {1x110, 0x110}} { xx10011000 \ { xx10011000}, xx0110x111 \ { xx01101111, xx01100111, xx01100111, x10110x111, 110110x111}} {1110x \ {11101, 11100, 11100}} {010x1 \ {01011, 01001}, 1xx1x \ {11110, 11011, 1x110}} { 0100111101 \ { 0100111101, 0100111101}} {10x01 \ {10001}} {x00xx \ {x0010, 000xx, 10011}, x1x00 \ {11100, 01x00}} { x000110x01 \ { x000110001, 0000110x01}} {001x0 \ {00100, 00110}} {11xxx \ {11100, 1101x}, xx101 \ {x1101, 1x101, 10101}, 10x10 \ {10110}} { 11xx0001x0 \ { 11x1000100, 11x0000110, 11xx000100, 11xx000110, 11100001x0, 11010001x0}, 10x1000110 \ { 10x1000110, 1011000110}} {} {01x01 \ {01001}} {} {x0xx1 \ {x01x1, x0001, 00xx1}, xx1x1 \ {00111, 10111, 1x1x1}} {x11xx \ {x1111, 0111x, 0110x}, 11x0x \ {1100x, 11101}} { x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x1x01x1, x11x1x0001, x11x100xx1, x1111x0xx1, 01111x0xx1, 01101x0xx1}, 11x01x0x01 \ { 11x01x0101, 11x01x0001, 11x0100x01, 11001x0x01, 11101x0x01}, x11x1xx1x1 \ { x1111xx101, x1101xx111, x11x100111, x11x110111, x11x11x1x1, x1111xx1x1, 01111xx1x1, 01101xx1x1}, 11x01xx101 \ { 11x011x101, 11001xx101, 11101xx101}} {00xx1 \ {00001, 00x01, 00111}} {100xx \ {10010, 1000x, 10000}, 0xx00 \ {00000, 00100, 01000}, xxxx1 \ {x1x01, 00101, 11xx1}} { 100x100xx1 \ { 1001100x01, 1000100x11, 100x100001, 100x100x01, 100x100111, 1000100xx1}, xxxx100xx1 \ { xxx1100x01, xxx0100x11, xxxx100001, xxxx100x01, xxxx100111, x1x0100xx1, 0010100xx1, 11xx100xx1}} {x00xx \ {x0010, 1001x, x0000}, 010x1 \ {01011, 01001}} {x0x1x \ {10x1x, x0010, x001x}, 0111x \ {01110, 01111}} { x0x1xx001x \ { x0x11x0010, x0x10x0011, x0x1xx0010, x0x1x1001x, 10x1xx001x, x0010x001x, x001xx001x}, 0111xx001x \ { 01111x0010, 01110x0011, 0111xx0010, 0111x1001x, 01110x001x, 01111x001x}, x0x1101011 \ { x0x1101011, 10x1101011, x001101011}, 0111101011 \ { 0111101011, 0111101011}} {1xxx1 \ {10101, 100x1, 11xx1}, x0101 \ {10101, 00101}} {0x00x \ {01000, 0x001, 0100x}} { 0x0011xx01 \ { 0x00110101, 0x00110001, 0x00111x01, 0x0011xx01, 010011xx01}, 0x001x0101 \ { 0x00110101, 0x00100101, 0x001x0101, 01001x0101}} {10x0x \ {10x01, 10001}} {0x1x1 \ {01101, 0x101, 0x101}} { 0x10110x01 \ { 0x10110x01, 0x10110001, 0110110x01, 0x10110x01, 0x10110x01}} {11xx1 \ {11001, 11011}, xx0x0 \ {1x0x0, x0010, x00x0}} {1xx01 \ {11x01, 10x01, 10101}, x0xxx \ {10101, x000x, 10xx1}, xx10x \ {01100, 01101, 0110x}} { 1xx0111x01 \ { 1xx0111001, 11x0111x01, 10x0111x01, 1010111x01}, x0xx111xx1 \ { x0x1111x01, x0x0111x11, x0xx111001, x0xx111011, 1010111xx1, x000111xx1, 10xx111xx1}, xx10111x01 \ { xx10111001, 0110111x01, 0110111x01}, x0xx0xx0x0 \ { x0x10xx000, x0x00xx010, x0xx01x0x0, x0xx0x0010, x0xx0x00x0, x0000xx0x0}, xx100xx000 \ { xx1001x000, xx100x0000, 01100xx000, 01100xx000}} {xxx1x \ {00110, xx111, x001x}} {00x11 \ {00111, 00011}, 0xxx0 \ {01x10, 00100}, x010x \ {10101, x0100, 00100}} { 00x11xxx11 \ { 00x11xx111, 00x11x0011, 00111xxx11, 00011xxx11}, 0xx10xxx10 \ { 0xx1000110, 0xx10x0010, 01x10xxx10}} {0xxx0 \ {00000, 0x110, 00110}} {x11x0 \ {x1110, 01110, x1100}, x00x1 \ {00001, 10001}} { x11x00xxx0 \ { x11100xx00, x11000xx10, x11x000000, x11x00x110, x11x000110, x11100xxx0, 011100xxx0, x11000xxx0}} {} {0x1x0 \ {011x0, 01110, 00100}} {} {1x0x1 \ {110x1, 100x1, 10001}} {00x10 \ {00010, 00110}, x10xx \ {x1011, 11001, 01010}} { x10x11x0x1 \ { x10111x001, x10011x011, x10x1110x1, x10x1100x1, x10x110001, x10111x0x1, 110011x0x1}} {111x0 \ {11100}, 0x1xx \ {0010x, 01101, 011x0}} {xx0x0 \ {x0000, 0x010, x1000}} { xx0x0111x0 \ { xx01011100, xx00011110, xx0x011100, x0000111x0, 0x010111x0, x1000111x0}, xx0x00x1x0 \ { xx0100x100, xx0000x110, xx0x000100, xx0x0011x0, x00000x1x0, 0x0100x1x0, x10000x1x0}} {x0x1x \ {x0111, 0001x, 1011x}, 111x0 \ {11110, 11100, 11100}} {} {} {x0x00 \ {00x00, x0000, x0100}, 0x101 \ {01101}} {1xxxx \ {10x11, 1x101, 10x1x}, 0x1x0 \ {011x0, 0x110}} { 1xx00x0x00 \ { 1xx0000x00, 1xx00x0000, 1xx00x0100}, 0x100x0x00 \ { 0x10000x00, 0x100x0000, 0x100x0100, 01100x0x00}, 1xx010x101 \ { 1xx0101101, 1x1010x101}} {xx110 \ {10110, 01110, 0x110}} {1111x \ {11110, 11111}} { 11110xx110 \ { 1111010110, 1111001110, 111100x110, 11110xx110}} {x10xx \ {110xx, 1100x, 110x0}, xx0xx \ {x00x1, xx010, x10x1}} {0011x \ {00111}, xx0x0 \ {100x0, 01000, 1x010}, 0xx0x \ {0x101, 01100, 00001}} { 0011xx101x \ { 00111x1010, 00110x1011, 0011x1101x, 0011x11010, 00111x101x}, xx0x0x10x0 \ { xx010x1000, xx000x1010, xx0x0110x0, xx0x011000, xx0x0110x0, 100x0x10x0, 01000x10x0, 1x010x10x0}, 0xx0xx100x \ { 0xx01x1000, 0xx00x1001, 0xx0x1100x, 0xx0x1100x, 0xx0x11000, 0x101x100x, 01100x100x, 00001x100x}, 0011xxx01x \ { 00111xx010, 00110xx011, 0011xx0011, 0011xxx010, 0011xx1011, 00111xx01x}, xx0x0xx0x0 \ { xx010xx000, xx000xx010, xx0x0xx010, 100x0xx0x0, 01000xx0x0, 1x010xx0x0}, 0xx0xxx00x \ { 0xx01xx000, 0xx00xx001, 0xx0xx0001, 0xx0xx1001, 0x101xx00x, 01100xx00x, 00001xx00x}} {x1x10 \ {01110, 11110, x1010}, x1xxx \ {1111x, x1xx0, x1011}} {x1011 \ {11011, 01011}, 10x0x \ {1000x, 10001, 10x00}, 10x1x \ {10x11, 10x10, 10111}} { 10x10x1x10 \ { 10x1001110, 10x1011110, 10x10x1010, 10x10x1x10}, x1011x1x11 \ { x101111111, x1011x1011, 11011x1x11, 01011x1x11}, 10x0xx1x0x \ { 10x01x1x00, 10x00x1x01, 10x0xx1x00, 1000xx1x0x, 10001x1x0x, 10x00x1x0x}, 10x1xx1x1x \ { 10x11x1x10, 10x10x1x11, 10x1x1111x, 10x1xx1x10, 10x1xx1011, 10x11x1x1x, 10x10x1x1x, 10111x1x1x}} {0110x \ {01100, 01101}, x1x00 \ {x1100, 01000}} {00xx0 \ {001x0, 00010, 00x00}, 00xx1 \ {00x11, 00111, 00001}} { 00x0001100 \ { 00x0001100, 0010001100, 00x0001100}, 00x0101101 \ { 00x0101101, 0000101101}, 00x00x1x00 \ { 00x00x1100, 00x0001000, 00100x1x00, 00x00x1x00}} {x11xx \ {1110x, 111xx, x11x0}, 1x1x1 \ {11101, 11111, 10111}} {x011x \ {00110, 0011x, x0111}, 011x1 \ {01101}} { x011xx111x \ { x0111x1110, x0110x1111, x011x1111x, x011xx1110, 00110x111x, 0011xx111x, x0111x111x}, 011x1x11x1 \ { 01111x1101, 01101x1111, 011x111101, 011x1111x1, 01101x11x1}, x01111x111 \ { x011111111, x011110111, 001111x111, x01111x111}, 011x11x1x1 \ { 011111x101, 011011x111, 011x111101, 011x111111, 011x110111, 011011x1x1}} {1x0x1 \ {11001, 1x011, 1x011}, x001x \ {10010, 0001x}} {0001x \ {00011, 00010}, 00x10 \ {00010, 00110}} { 000111x011 \ { 000111x011, 000111x011, 000111x011}, 0001xx001x \ { 00011x0010, 00010x0011, 0001x10010, 0001x0001x, 00011x001x, 00010x001x}, 00x10x0010 \ { 00x1010010, 00x1000010, 00010x0010, 00110x0010}} {01x01 \ {01001, 01101}} {01x0x \ {01101, 0100x}} { 01x0101x01 \ { 01x0101001, 01x0101101, 0110101x01, 0100101x01}} {xx11x \ {x1111, 1x11x, x0111}, x00x1 \ {x0001, 10011, 00001}, x10xx \ {0100x, x100x, x1010}} {xx0xx \ {10010, 0x00x, x100x}, 0x00x \ {0x000, 0x001, 01000}, 11xx0 \ {11010, 111x0, 11110}} { xx01xxx11x \ { xx011xx110, xx010xx111, xx01xx1111, xx01x1x11x, xx01xx0111, 10010xx11x}, 11x10xx110 \ { 11x101x110, 11010xx110, 11110xx110, 11110xx110}, xx0x1x00x1 \ { xx011x0001, xx001x0011, xx0x1x0001, xx0x110011, xx0x100001, 0x001x00x1, x1001x00x1}, 0x001x0001 \ { 0x001x0001, 0x00100001, 0x001x0001}, xx0xxx10xx \ { xx0x1x10x0, xx0x0x10x1, xx01xx100x, xx00xx101x, xx0xx0100x, xx0xxx100x, xx0xxx1010, 10010x10xx, 0x00xx10xx, x100xx10xx}, 0x00xx100x \ { 0x001x1000, 0x000x1001, 0x00x0100x, 0x00xx100x, 0x000x100x, 0x001x100x, 01000x100x}, 11xx0x10x0 \ { 11x10x1000, 11x00x1010, 11xx001000, 11xx0x1000, 11xx0x1010, 11010x10x0, 111x0x10x0, 11110x10x0}} {} {100xx \ {10011, 10001, 1001x}} {} {10x1x \ {10010, 10x11, 10011}, 010x1 \ {01011, 01001}} {10x10 \ {10110, 10010}} { 10x1010x10 \ { 10x1010010, 1011010x10, 1001010x10}} {} {0x0x0 \ {00010, 01000, 010x0}} {} {x1001 \ {01001, 11001, 11001}, xx001 \ {01001, x0001, 1x001}} {0x01x \ {0x011, 01010}} {} {x1x1x \ {1111x, 11110, 01011}} {0x1x0 \ {01100, 01110, 011x0}, x0xxx \ {x00x1, 10010, 000xx}} { 0x110x1x10 \ { 0x11011110, 0x11011110, 01110x1x10, 01110x1x10}, x0x1xx1x1x \ { x0x11x1x10, x0x10x1x11, x0x1x1111x, x0x1x11110, x0x1x01011, x0011x1x1x, 10010x1x1x, 0001xx1x1x}} {xx0x0 \ {0x0x0, 01000, xx010}} {1x001 \ {11001, 10001, 10001}} {} {x000x \ {x0000, x0001, x0001}, 1x0x1 \ {10001, 11001, 1x001}} {0xx01 \ {01x01, 00001, 01101}, x1xx0 \ {11x10, 01100, x11x0}, xx10x \ {0x101, 1x10x, 11101}} { 0xx01x0001 \ { 0xx01x0001, 0xx01x0001, 01x01x0001, 00001x0001, 01101x0001}, x1x00x0000 \ { x1x00x0000, 01100x0000, x1100x0000}, xx10xx000x \ { xx101x0000, xx100x0001, xx10xx0000, xx10xx0001, xx10xx0001, 0x101x000x, 1x10xx000x, 11101x000x}, 0xx011x001 \ { 0xx0110001, 0xx0111001, 0xx011x001, 01x011x001, 000011x001, 011011x001}, xx1011x001 \ { xx10110001, xx10111001, xx1011x001, 0x1011x001, 1x1011x001, 111011x001}} {00xx0 \ {00110, 00x00}} {00xx0 \ {001x0, 00100, 000x0}, 1010x \ {10100, 10101}, x10xx \ {x1000, x10x0, 110x0}} { 00xx000xx0 \ { 00x1000x00, 00x0000x10, 00xx000110, 00xx000x00, 001x000xx0, 0010000xx0, 000x000xx0}, 1010000x00 \ { 1010000x00, 1010000x00}, x10x000xx0 \ { x101000x00, x100000x10, x10x000110, x10x000x00, x100000xx0, x10x000xx0, 110x000xx0}} {x00xx \ {1000x, 100x0, 0001x}, x1xx1 \ {111x1, x1011, 11xx1}, 00xx1 \ {00101, 000x1, 001x1}} {0x10x \ {0110x, 0010x, 00100}, x0101 \ {10101, 00101}, x10xx \ {11011, 11010, x10x0}} { 0x10xx000x \ { 0x101x0000, 0x100x0001, 0x10x1000x, 0x10x10000, 0110xx000x, 0010xx000x, 00100x000x}, x0101x0001 \ { x010110001, 10101x0001, 00101x0001}, x10xxx00xx \ { x10x1x00x0, x10x0x00x1, x101xx000x, x100xx001x, x10xx1000x, x10xx100x0, x10xx0001x, 11011x00xx, 11010x00xx, x10x0x00xx}, 0x101x1x01 \ { 0x10111101, 0x10111x01, 01101x1x01, 00101x1x01}, x0101x1x01 \ { x010111101, x010111x01, 10101x1x01, 00101x1x01}, x10x1x1xx1 \ { x1011x1x01, x1001x1x11, x10x1111x1, x10x1x1011, x10x111xx1, 11011x1xx1}, 0x10100x01 \ { 0x10100101, 0x10100001, 0x10100101, 0110100x01, 0010100x01}, x010100x01 \ { x010100101, x010100001, x010100101, 1010100x01, 0010100x01}, x10x100xx1 \ { x101100x01, x100100x11, x10x100101, x10x1000x1, x10x1001x1, 1101100xx1}} {} {x0x10 \ {00110, x0110}, 0xx11 \ {00011, 01x11}} {} {} {x10x1 \ {01001, x1011, 01011}, 0xx01 \ {0x001, 00101, 01101}} {} {1x110 \ {10110, 11110, 11110}} {x11x1 \ {11101, x1101, x1101}} {} {1x11x \ {11110, 10111, 11111}} {1xxx0 \ {1x000, 10x00, 110x0}} { 1xx101x110 \ { 1xx1011110, 110101x110}} {} {x0xx1 \ {10101, 100x1, x0101}, 1x0xx \ {1001x, 11010}} {} {xxxx1 \ {01101, 01001, xx0x1}, 00x10 \ {00110, 00010, 00010}} {0xx10 \ {00010, 01x10, 01010}, 1x010 \ {11010, 10010}} { 0xx1000x10 \ { 0xx1000110, 0xx1000010, 0xx1000010, 0001000x10, 01x1000x10, 0101000x10}, 1x01000x10 \ { 1x01000110, 1x01000010, 1x01000010, 1101000x10, 1001000x10}} {01x1x \ {01x11, 01011}} {00xx1 \ {001x1, 00101, 00111}, x101x \ {11010, 11011}} { 00x1101x11 \ { 00x1101x11, 00x1101011, 0011101x11, 0011101x11}, x101x01x1x \ { x101101x10, x101001x11, x101x01x11, x101x01011, 1101001x1x, 1101101x1x}} {} {} {} {} {x000x \ {10001, 1000x, 10000}} {} {00xxx \ {00111, 00011, 00x1x}, 010x1 \ {01001, 01011}} {xxx11 \ {x1111, x0x11, 0x011}, 1x0x1 \ {100x1, 110x1, 10001}} { xxx1100x11 \ { xxx1100111, xxx1100011, xxx1100x11, x111100x11, x0x1100x11, 0x01100x11}, 1x0x100xx1 \ { 1x01100x01, 1x00100x11, 1x0x100111, 1x0x100011, 1x0x100x11, 100x100xx1, 110x100xx1, 1000100xx1}, xxx1101011 \ { xxx1101011, x111101011, x0x1101011, 0x01101011}, 1x0x1010x1 \ { 1x01101001, 1x00101011, 1x0x101001, 1x0x101011, 100x1010x1, 110x1010x1, 10001010x1}} {x0x1x \ {00110, 1011x, x0011}} {} {} {01x1x \ {01x10, 01111, 01111}, x0x01 \ {10001, 10101, x0101}} {x110x \ {11101, 01100}, xxx01 \ {11001, 0x101, 01101}} { x1101x0x01 \ { x110110001, x110110101, x1101x0101, 11101x0x01}, xxx01x0x01 \ { xxx0110001, xxx0110101, xxx01x0101, 11001x0x01, 0x101x0x01, 01101x0x01}} {1xx0x \ {1x000, 11100, 10000}, 1x01x \ {10011, 1001x}} {x11xx \ {111xx, x110x, x11x0}} { x110x1xx0x \ { x11011xx00, x11001xx01, x110x1x000, x110x11100, x110x10000, 1110x1xx0x, x110x1xx0x, x11001xx0x}, x111x1x01x \ { x11111x010, x11101x011, x111x10011, x111x1001x, 1111x1x01x, x11101x01x}} {} {} {} {xx010 \ {11010, 0x010}} {xxx10 \ {10110, 10x10, x1010}, 1x011 \ {11011, 10011}} { xxx10xx010 \ { xxx1011010, xxx100x010, 10110xx010, 10x10xx010, x1010xx010}} {0x0xx \ {0101x, 01011, 010x0}, 1x001 \ {10001, 11001, 11001}} {xx0x1 \ {x10x1, 010x1, 01001}} { xx0x10x0x1 \ { xx0110x001, xx0010x011, xx0x101011, xx0x101011, x10x10x0x1, 010x10x0x1, 010010x0x1}, xx0011x001 \ { xx00110001, xx00111001, xx00111001, x10011x001, 010011x001, 010011x001}} {x0010 \ {10010, 00010}, 10x00 \ {10100, 10000}} {x1x1x \ {0111x, 01011}, x1xx0 \ {x11x0, 01000, 01110}} { x1x10x0010 \ { x1x1010010, x1x1000010, 01110x0010}, x1x0010x00 \ { x1x0010100, x1x0010000, x110010x00, 0100010x00}} {x11x1 \ {111x1, 011x1, 11101}, x0x01 \ {10101, 10x01, x0001}} {xx10x \ {x010x, x1101, 1x10x}, x11x0 \ {011x0, 11100}} { xx101x1101 \ { xx10111101, xx10101101, xx10111101, x0101x1101, x1101x1101, 1x101x1101}, xx101x0x01 \ { xx10110101, xx10110x01, xx101x0001, x0101x0x01, x1101x0x01, 1x101x0x01}} {x1x11 \ {11111, x1111, 11x11}, x1x01 \ {01101, x1101, 01x01}} {10xx1 \ {10011, 10001, 101x1}} { 10x11x1x11 \ { 10x1111111, 10x11x1111, 10x1111x11, 10011x1x11, 10111x1x11}, 10x01x1x01 \ { 10x0101101, 10x01x1101, 10x0101x01, 10001x1x01, 10101x1x01}} {xxxx1 \ {0x1x1, 0xxx1, xx0x1}, 1xxxx \ {11xxx, 1x101, 110xx}, 10xx1 \ {10x11, 101x1, 101x1}} {1101x \ {11011, 11010, 11010}} { 11011xxx11 \ { 110110x111, 110110xx11, 11011xx011, 11011xxx11}, 1101x1xx1x \ { 110111xx10, 110101xx11, 1101x11x1x, 1101x1101x, 110111xx1x, 110101xx1x, 110101xx1x}, 1101110x11 \ { 1101110x11, 1101110111, 1101110111, 1101110x11}} {xxxx0 \ {xxx00, 00010, 01110}, 0x0x0 \ {01000, 00010, 010x0}} {x1xx0 \ {x1100, 01100, 11x00}, x1010 \ {11010}} { x1xx0xxxx0 \ { x1x10xxx00, x1x00xxx10, x1xx0xxx00, x1xx000010, x1xx001110, x1100xxxx0, 01100xxxx0, 11x00xxxx0}, x1010xxx10 \ { x101000010, x101001110, 11010xxx10}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx001000, x1xx000010, x1xx0010x0, x11000x0x0, 011000x0x0, 11x000x0x0}, x10100x010 \ { x101000010, x101001010, 110100x010}} {} {x0100 \ {00100}, 00xxx \ {00011, 0011x, 000x1}} {} {x10xx \ {010xx, 11010, x1010}, xx100 \ {x0100, 01100}} {x000x \ {00001, 1000x}, x10x0 \ {11010, x1010, 01010}, xx11x \ {1x11x, 0x110, 1x110}} { x000xx100x \ { x0001x1000, x0000x1001, x000x0100x, 00001x100x, 1000xx100x}, x10x0x10x0 \ { x1010x1000, x1000x1010, x10x0010x0, x10x011010, x10x0x1010, 11010x10x0, x1010x10x0, 01010x10x0}, xx11xx101x \ { xx111x1010, xx110x1011, xx11x0101x, xx11x11010, xx11xx1010, 1x11xx101x, 0x110x101x, 1x110x101x}, x0000xx100 \ { x0000x0100, x000001100, 10000xx100}, x1000xx100 \ { x1000x0100, x100001100}} {10xx1 \ {10101, 10x01, 10001}} {x0xx0 \ {x0110, x0000, 10100}} {} {11xxx \ {1110x, 11111, 11100}, 1011x \ {10111, 10110}} {0x101 \ {00101, 01101}, 10x1x \ {10110, 10010, 10x10}} { 0x10111x01 \ { 0x10111101, 0010111x01, 0110111x01}, 10x1x11x1x \ { 10x1111x10, 10x1011x11, 10x1x11111, 1011011x1x, 1001011x1x, 10x1011x1x}, 10x1x1011x \ { 10x1110110, 10x1010111, 10x1x10111, 10x1x10110, 101101011x, 100101011x, 10x101011x}} {x0xx0 \ {00010, 10000, 00100}, xx0x0 \ {00000, xx000, 010x0}} {} {} {xx1xx \ {10111, x0110, 111x0}} {00xxx \ {00xx0, 00010}, xxx01 \ {1x001, 01001, 1xx01}} { 00xxxxx1xx \ { 00xx1xx1x0, 00xx0xx1x1, 00x1xxx10x, 00x0xxx11x, 00xxx10111, 00xxxx0110, 00xxx111x0, 00xx0xx1xx, 00010xx1xx}, xxx01xx101 \ { 1x001xx101, 01001xx101, 1xx01xx101}} {x1x11 \ {x1011, 01111, 11011}, xx01x \ {10010, 0001x, 0x01x}} {0x1x1 \ {0x111, 01111, 011x1}, 0xxxx \ {01x0x, 0x10x, 01x00}} { 0x111x1x11 \ { 0x111x1011, 0x11101111, 0x11111011, 0x111x1x11, 01111x1x11, 01111x1x11}, 0xx11x1x11 \ { 0xx11x1011, 0xx1101111, 0xx1111011}, 0x111xx011 \ { 0x11100011, 0x1110x011, 0x111xx011, 01111xx011, 01111xx011}, 0xx1xxx01x \ { 0xx11xx010, 0xx10xx011, 0xx1x10010, 0xx1x0001x, 0xx1x0x01x}} {xxx00 \ {0xx00, 00000, 10x00}} {0010x \ {00101, 00100}} { 00100xxx00 \ { 001000xx00, 0010000000, 0010010x00, 00100xxx00}} {} {0xx1x \ {0xx10, 00111, 00x1x}, 10x1x \ {1001x}} {} {xx100 \ {00100, 0x100, 01100}, 1x011 \ {10011, 11011}} {11x1x \ {11011, 1111x}} { 11x111x011 \ { 11x1110011, 11x1111011, 110111x011, 111111x011}} {1x01x \ {10011, 1101x, 1101x}, 0100x \ {01001, 01000}} {x0xx1 \ {10001, x0011, x0111}, 0xx00 \ {01x00, 00000, 0x000}} { x0x111x011 \ { x0x1110011, x0x1111011, x0x1111011, x00111x011, x01111x011}, x0x0101001 \ { x0x0101001, 1000101001}, 0xx0001000 \ { 0xx0001000, 01x0001000, 0000001000, 0x00001000}} {xxx11 \ {0x011, 00011, xx011}, 1xxx1 \ {1xx11, 10xx1, 11111}} {x1000 \ {11000, 01000}} {} {00xxx \ {0001x, 00110, 001x1}, 1x010 \ {11010, 10010}} {0110x \ {01100, 01101, 01101}, x1x00 \ {01x00, 01100, 11000}} { 0110x00x0x \ { 0110100x00, 0110000x01, 0110x00101, 0110000x0x, 0110100x0x, 0110100x0x}, x1x0000x00 \ { 01x0000x00, 0110000x00, 1100000x00}} {10x1x \ {10x10, 10010, 1011x}, xx00x \ {0x00x, 11001, 01001}, 010x1 \ {01001, 01011, 01011}} {x010x \ {x0101, 00101}, 110xx \ {11000, 11011}} { 1101x10x1x \ { 1101110x10, 1101010x11, 1101x10x10, 1101x10010, 1101x1011x, 1101110x1x}, x010xxx00x \ { x0101xx000, x0100xx001, x010x0x00x, x010x11001, x010x01001, x0101xx00x, 00101xx00x}, 1100xxx00x \ { 11001xx000, 11000xx001, 1100x0x00x, 1100x11001, 1100x01001, 11000xx00x}, x010101001 \ { x010101001, x010101001, 0010101001}, 110x1010x1 \ { 1101101001, 1100101011, 110x101001, 110x101011, 110x101011, 11011010x1}} {0x0x0 \ {01010, 00010, 0x010}, 000xx \ {00011, 00000, 0001x}, 1x100 \ {10100, 11100}} {x1x11 \ {01x11, x1011, 11011}, x111x \ {11110, x1111, 01111}} { x11100x010 \ { x111001010, x111000010, x11100x010, 111100x010}, x1x1100011 \ { x1x1100011, x1x1100011, 01x1100011, x101100011, 1101100011}, x111x0001x \ { x111100010, x111000011, x111x00011, x111x0001x, 111100001x, x11110001x, 011110001x}} {x1x1x \ {01110, x1110, x1011}} {x01x0 \ {10110, x0100, 10100}} { x0110x1x10 \ { x011001110, x0110x1110, 10110x1x10}} {} {} {} {1xxx0 \ {1x000, 10110, 10000}} {1xx10 \ {10x10, 10010, 10010}, x10x0 \ {01000, 110x0, 01010}, x1xx0 \ {111x0, 01000, x1000}} { 1xx101xx10 \ { 1xx1010110, 10x101xx10, 100101xx10, 100101xx10}, x10x01xxx0 \ { x10101xx00, x10001xx10, x10x01x000, x10x010110, x10x010000, 010001xxx0, 110x01xxx0, 010101xxx0}, x1xx01xxx0 \ { x1x101xx00, x1x001xx10, x1xx01x000, x1xx010110, x1xx010000, 111x01xxx0, 010001xxx0, x10001xxx0}} {x10xx \ {0101x, 11000, x1000}, 00xxx \ {000x0, 001x1, 001x1}} {0x1xx \ {00111, 0110x, 0x101}} { 0x1xxx10xx \ { 0x1x1x10x0, 0x1x0x10x1, 0x11xx100x, 0x10xx101x, 0x1xx0101x, 0x1xx11000, 0x1xxx1000, 00111x10xx, 0110xx10xx, 0x101x10xx}, 0x1xx00xxx \ { 0x1x100xx0, 0x1x000xx1, 0x11x00x0x, 0x10x00x1x, 0x1xx000x0, 0x1xx001x1, 0x1xx001x1, 0011100xxx, 0110x00xxx, 0x10100xxx}} {x0000 \ {10000, 00000, 00000}, 0x10x \ {01101, 0110x, 0110x}} {x1xxx \ {01111, 11x1x, 1110x}} { x1x00x0000 \ { x1x0010000, x1x0000000, x1x0000000, 11100x0000}, x1x0x0x10x \ { x1x010x100, x1x000x101, x1x0x01101, x1x0x0110x, x1x0x0110x, 1110x0x10x}} {01x1x \ {01x10, 01110, 01110}} {0100x \ {01000, 01001, 01001}, 1x000 \ {11000, 10000}, 0x110 \ {00110}} { 0x11001x10 \ { 0x11001x10, 0x11001110, 0x11001110, 0011001x10}} {x00x0 \ {100x0, 00000, x0010}, 1x110 \ {11110}} {001xx \ {00110, 001x0}, xxx01 \ {0xx01, 11x01, 11001}} { 001x0x00x0 \ { 00110x0000, 00100x0010, 001x0100x0, 001x000000, 001x0x0010, 00110x00x0, 001x0x00x0}, 001101x110 \ { 0011011110, 001101x110, 001101x110}} {xxx1x \ {1x11x, 1xx1x, 01010}, 0x0xx \ {00010, 0x00x, 00011}} {x1xx0 \ {01xx0, x1000, 111x0}} { x1x10xxx10 \ { x1x101x110, x1x101xx10, x1x1001010, 01x10xxx10, 11110xxx10}, x1xx00x0x0 \ { x1x100x000, x1x000x010, x1xx000010, x1xx00x000, 01xx00x0x0, x10000x0x0, 111x00x0x0}} {xxx01 \ {x0001, 0xx01, 1x101}, 00x10 \ {00110, 00010}} {1x1x1 \ {10101, 101x1, 10111}} { 1x101xxx01 \ { 1x101x0001, 1x1010xx01, 1x1011x101, 10101xxx01, 10101xxx01}} {1x1x1 \ {10111, 10101, 11111}} {0xx01 \ {01001, 0x001, 01x01}} { 0xx011x101 \ { 0xx0110101, 010011x101, 0x0011x101, 01x011x101}} {1x1x1 \ {10101, 10111, 10111}, x0xx1 \ {00101, 00x11, 10111}} {x11x1 \ {x1111, 01111, 01101}} { x11x11x1x1 \ { x11111x101, x11011x111, x11x110101, x11x110111, x11x110111, x11111x1x1, 011111x1x1, 011011x1x1}, x11x1x0xx1 \ { x1111x0x01, x1101x0x11, x11x100101, x11x100x11, x11x110111, x1111x0xx1, 01111x0xx1, 01101x0xx1}} {10x1x \ {10010, 10x11, 10x10}, xxxx1 \ {0xxx1, 10xx1, 1x011}} {110xx \ {11010, 11001}} { 1101x10x1x \ { 1101110x10, 1101010x11, 1101x10010, 1101x10x11, 1101x10x10, 1101010x1x}, 110x1xxxx1 \ { 11011xxx01, 11001xxx11, 110x10xxx1, 110x110xx1, 110x11x011, 11001xxxx1}} {} {10xx0 \ {10000, 10110}, xxx11 \ {01x11, 01011, x0011}, 0xxx0 \ {01xx0, 0xx10, 0x1x0}} {} {00xx1 \ {001x1, 00x01, 000x1}, 0x00x \ {0000x, 01000, 0100x}} {00x0x \ {00001, 00100}, 01xx1 \ {01101, 01x11, 01x11}} { 00x0100x01 \ { 00x0100101, 00x0100x01, 00x0100001, 0000100x01}, 01xx100xx1 \ { 01x1100x01, 01x0100x11, 01xx1001x1, 01xx100x01, 01xx1000x1, 0110100xx1, 01x1100xx1, 01x1100xx1}, 00x0x0x00x \ { 00x010x000, 00x000x001, 00x0x0000x, 00x0x01000, 00x0x0100x, 000010x00x, 001000x00x}, 01x010x001 \ { 01x0100001, 01x0101001, 011010x001}} {x1x0x \ {01x01, 11x0x, 11x0x}, x1001 \ {01001}} {00xx1 \ {00111, 00001, 00011}} { 00x01x1x01 \ { 00x0101x01, 00x0111x01, 00x0111x01, 00001x1x01}, 00x01x1001 \ { 00x0101001, 00001x1001}} {x1101 \ {01101, 11101}, 101xx \ {101x0, 10110, 10100}} {001x0 \ {00100}} { 001x0101x0 \ { 0011010100, 0010010110, 001x0101x0, 001x010110, 001x010100, 00100101x0}} {xx101 \ {11101, x0101, 00101}} {1011x \ {10111}, x0x10 \ {x0110, x0010, 10x10}} {} {0xx10 \ {01110, 00x10, 01010}} {100xx \ {1000x, 1001x, 10000}, 0x0x1 \ {00001, 010x1, 00011}, 00xxx \ {0010x, 00xx0, 00001}} { 100100xx10 \ { 1001001110, 1001000x10, 1001001010, 100100xx10}, 00x100xx10 \ { 00x1001110, 00x1000x10, 00x1001010, 00x100xx10}} {x01x1 \ {101x1, 001x1, 001x1}} {xx01x \ {x101x, 1x011, 10011}, 0001x \ {00010, 00011, 00011}} { xx011x0111 \ { xx01110111, xx01100111, xx01100111, x1011x0111, 1x011x0111, 10011x0111}, 00011x0111 \ { 0001110111, 0001100111, 0001100111, 00011x0111, 00011x0111}} {xx011 \ {11011, 0x011, 01011}} {x10xx \ {110x1, 01010}} { x1011xx011 \ { x101111011, x10110x011, x101101011, 11011xx011}} {x0x01 \ {00001, 00101, 10101}, 1x011 \ {11011, 10011, 10011}, 11xxx \ {11x1x, 11100, 11011}} {} {} {11x0x \ {1110x, 11x00, 11x01}} {11x00 \ {11100}} { 11x0011x00 \ { 11x0011100, 11x0011x00, 1110011x00}} {x0xx0 \ {x00x0, x0010, 00000}} {xx111 \ {01111, 10111, 00111}} {} {xxx10 \ {11110, 1x110, 01010}} {} {} {010xx \ {01010, 0101x}, xxxx0 \ {x1010, 10x10, 01x10}} {} {} {1x1x0 \ {11110, 111x0, 10110}, 000xx \ {000x0, 00001}, x0xx0 \ {10110, 10x10, 101x0}} {1xxx0 \ {11000, 100x0, 11110}} { 1xxx01x1x0 \ { 1xx101x100, 1xx001x110, 1xxx011110, 1xxx0111x0, 1xxx010110, 110001x1x0, 100x01x1x0, 111101x1x0}, 1xxx0000x0 \ { 1xx1000000, 1xx0000010, 1xxx0000x0, 11000000x0, 100x0000x0, 11110000x0}, 1xxx0x0xx0 \ { 1xx10x0x00, 1xx00x0x10, 1xxx010110, 1xxx010x10, 1xxx0101x0, 11000x0xx0, 100x0x0xx0, 11110x0xx0}} {} {x10xx \ {x10x1, 110x0, 010x1}, x001x \ {x0011, 10010, 10010}} {} {xxx1x \ {x111x, 10111, 1x11x}, 01x11 \ {01011}} {xxx10 \ {0x010, xx110, xx010}, 010x0 \ {01000, 01010}} { xxx10xxx10 \ { xxx10x1110, xxx101x110, 0x010xxx10, xx110xxx10, xx010xxx10}, 01010xxx10 \ { 01010x1110, 010101x110, 01010xxx10}} {1xx01 \ {10x01, 10101}} {1011x \ {10110, 10111, 10111}, x1x1x \ {1101x, x111x, 01x10}} {} {} {0x1x0 \ {001x0, 01110, 0x100}, 0xx11 \ {00x11, 00111, 0x011}} {} {xxx1x \ {1011x, 1xx1x, 0x110}, x0x11 \ {x0111, 10x11, 00111}} {0x10x \ {0010x, 01100, 00101}} {} {1xx00 \ {10100, 1x100, 11100}} {1x0xx \ {10010, 100xx, 110xx}, x00x1 \ {x0011, 00001, 00011}} { 1x0001xx00 \ { 1x00010100, 1x0001x100, 1x00011100, 100001xx00, 110001xx00}} {001x0 \ {00110, 00100, 00100}} {0xx11 \ {00x11, 01111, 00111}, xx01x \ {x101x, 10011, 1001x}} { xx01000110 \ { xx01000110, x101000110, 1001000110}} {xxx00 \ {1xx00, 00x00, 00100}} {111xx \ {111x0, 11101, 11101}, 01x0x \ {01000, 0110x, 0100x}} { 11100xxx00 \ { 111001xx00, 1110000x00, 1110000100, 11100xxx00}, 01x00xxx00 \ { 01x001xx00, 01x0000x00, 01x0000100, 01000xxx00, 01100xxx00, 01000xxx00}} {xx10x \ {x010x, x0101, 0010x}} {1x0xx \ {1101x, 10001, 10010}, x1xx1 \ {01x11, 01xx1, 11101}} { 1x00xxx10x \ { 1x001xx100, 1x000xx101, 1x00xx010x, 1x00xx0101, 1x00x0010x, 10001xx10x}, x1x01xx101 \ { x1x01x0101, x1x01x0101, x1x0100101, 01x01xx101, 11101xx101}} {1x11x \ {10111, 11111, 1x110}} {1x011 \ {10011, 11011}, 1xxxx \ {10xx0, 101x0, 10011}} { 1x0111x111 \ { 1x01110111, 1x01111111, 100111x111, 110111x111}, 1xx1x1x11x \ { 1xx111x110, 1xx101x111, 1xx1x10111, 1xx1x11111, 1xx1x1x110, 10x101x11x, 101101x11x, 100111x11x}} {01xx0 \ {011x0, 01x00, 01100}, x00x1 \ {00001, 10011}} {0x10x \ {0010x, 0x100, 00100}, 1000x \ {10000, 10001, 10001}} { 0x10001x00 \ { 0x10001100, 0x10001x00, 0x10001100, 0010001x00, 0x10001x00, 0010001x00}, 1000001x00 \ { 1000001100, 1000001x00, 1000001100, 1000001x00}, 0x101x0001 \ { 0x10100001, 00101x0001}, 10001x0001 \ { 1000100001, 10001x0001, 10001x0001}} {00x0x \ {00101, 00x00, 0000x}, 10x01 \ {10101, 10001}} {1xx01 \ {11101, 1x001}} { 1xx0100x01 \ { 1xx0100101, 1xx0100001, 1110100x01, 1x00100x01}, 1xx0110x01 \ { 1xx0110101, 1xx0110001, 1110110x01, 1x00110x01}} {} {xx00x \ {xx001, x000x, 1000x}} {} {111x1 \ {11111}, 1x010 \ {11010, 10010}} {x1x00 \ {01000, 11100, x1000}, 100xx \ {1001x, 10001, 10001}} { 100x1111x1 \ { 1001111101, 1000111111, 100x111111, 10011111x1, 10001111x1, 10001111x1}, 100101x010 \ { 1001011010, 1001010010, 100101x010}} {111xx \ {1110x, 11110, 111x1}, 0xx11 \ {00111, 01011, 00011}, xx00x \ {0x001, x0001, 0100x}} {x10xx \ {0101x, 1100x}} { x10xx111xx \ { x10x1111x0, x10x0111x1, x101x1110x, x100x1111x, x10xx1110x, x10xx11110, x10xx111x1, 0101x111xx, 1100x111xx}, x10110xx11 \ { x101100111, x101101011, x101100011, 010110xx11}, x100xxx00x \ { x1001xx000, x1000xx001, x100x0x001, x100xx0001, x100x0100x, 1100xxx00x}} {xxx10 \ {10x10, 0xx10, 00010}} {x1101 \ {01101, 11101}} {} { 11000110000000000001} { 00000000000100011011} { 00000000000100011011} { 11000110000000000001} { 00000000000100011011} { 11000000000001000110} empty { } false full { xxxxxxxxxxxxxxxxxxxxxxxxxxxxxx} true { xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx \ { xxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxx, xxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxx, xxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxx, xxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxx, xxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxx, xxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxx, xxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxx, xxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxx, xxxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxx, xxxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxx, xxxxxxxxxxxx1xxxxxxxxxxxxxxxxxxxxxxxxxxxxx0xxxxxxxxxxxxxxxxx, xxxxxxxxxxxx0xxxxxxxxxxxxxxxxxxxxxxxxxxxxx1xxxxxxxxxxxxxxxxx}} { } { } project { xxxxxxxxxxxxxxxxxx} { } { 000000111000000110000000000001, 000000100000010000000000001000, 000000000100010000000000100000} { 000000111000000110, 000000100000010000, 000000000100010000} t1 before:{ 000000000100010000000000100000} t1 after:{ 000000000100010000000000100000, 000000111000000110000000000001, 000000100000010000000000001000} delta:{ xxxxxxxxxxxxxxxxxxxxxxxxxxxxxx} { 001001001000001001, 010001001000001001} { 001001001000001001} filter: (= (:var 0) (:var 1)) {xxx \ {x01, x10}} filter: (or (= (:var 0) (:var 1)) (= (:var 0) (:var 2))) {xxx \ {001, 110}} filter: (or (= (:var 0) (:var 1)) (= (:var 0) (:var 2))) {xxx \ {001, 110}} filter interpreted filter: true { xxxxxxxxxxxxxxxxxx} filter: false { } filter: (= (:var 0) (:var 2)) { xxxxxxxxxxxxxxxxxx \ { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx}} filter: (not (= (:var 0) (:var 2))) { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx} filter: (= (:var 0) #b010) { xxxxxxxxxxxxxxx010} filter: (= ((_ extract 2 1) (:var 0)) #b11) { xxxxxxxxxxxxxxx11x} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xxxxxxxxxxxx, xx1xx0xxxxxxxxxxxx, x0xx1xxxxxxxxxxxxx, x1xx0xxxxxxxxxxxxx, 0xx1xxxxxxxxxxxxxx, 1xx0xxxxxxxxxxxxxx}, 1xx0xxxxxxxxxxx11x \ { 1x00x1xxxxxxxxx11x, 1x10x0xxxxxxxxx11x, 10x01xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 0xx1xxxxxxxxxxx11x \ { 0x01x1xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 01x10xxxxxxxxxx11x}, x1xx0xxxxxxxxxx11x \ { x10x01xxxxxxxxx11x, x11x00xxxxxxxxx11x, 01x10xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 11x00xxxxxxxxxx11x \ { 110001xxxxxxxxx11x, 111000xxxxxxxxx11x}, 01x10xxxxxxxxxx11x \ { 010101xxxxxxxxx11x, 011100xxxxxxxxx11x}, x0xx1xxxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x01x10xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 10x01xxxxxxxxxx11x}, 10x01xxxxxxxxxx11x \ { 100011xxxxxxxxx11x, 101010xxxxxxxxx11x}, 00x11xxxxxxxxxx11x \ { 000111xxxxxxxxx11x, 001110xxxxxxxxx11x}, xx1xx0xxxxxxxxx11x \ { x01x10xxxxxxxxx11x, x11x00xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 1x10x0xxxxxxxxx11x}, 1x10x0xxxxxxxxx11x \ { 101010xxxxxxxxx11x, 111000xxxxxxxxx11x}, 0x11x0xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 011100xxxxxxxxx11x}, x11x00xxxxxxxxx11x \ { 011100xxxxxxxxx11x, 111000xxxxxxxxx11x}, 111000xxxxxxxxx11x, 011100xxxxxxxxx11x, x01x10xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 101010xxxxxxxxx11x}, 101010xxxxxxxxx11x, 001110xxxxxxxxx11x, xx0xx1xxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x10x01xxxxxxxxx11x, 0x01x1xxxxxxxxx11x, 1x00x1xxxxxxxxx11x}, 1x00x1xxxxxxxxx11x \ { 100011xxxxxxxxx11x, 110001xxxxxxxxx11x}, 0x01x1xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 010101xxxxxxxxx11x}, x10x01xxxxxxxxx11x \ { 010101xxxxxxxxx11x, 110001xxxxxxxxx11x}, 110001xxxxxxxxx11x, 010101xxxxxxxxx11x, x00x11xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 100011xxxxxxxxx11x}, 100011xxxxxxxxx11x, 000111xxxxxxxxx11x} filter: (= ((_ extract 2 1) (:var 3)) ((_ extract 1 0) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0x1xxxxxxxxxxxxx, xx1x0xxxxxxxxxxxxx, x0x1xxxxxxxxxxxxxx, x1x0xxxxxxxxxxxxxx}} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= ((_ extract 2 1) (:var 3)) ((_ extract 1 0) (:var 4)))) { xxxxxxxxxxxxxxxxxx \ { xx0x1xxxxxxxxxxxxx, xx1x0xxxxxxxxxxxxx, x0x1xxxxxxxxxxxxxx, x1x0xxxxxxxxxxxxxx}, x1x0xxxxxxxxxxx11x \ { x1001xxxxxxxxxx11x, x1100xxxxxxxxxx11x}, x0x1xxxxxxxxxxx11x \ { x0011xxxxxxxxxx11x, x0110xxxxxxxxxx11x}, xx1x0xxxxxxxxxx11x \ { x0110xxxxxxxxxx11x, x1100xxxxxxxxxx11x}, x1100xxxxxxxxxx11x, x0110xxxxxxxxxx11x, xx0x1xxxxxxxxxx11x \ { x0011xxxxxxxxxx11x, x1001xxxxxxxxxx11x}, x1001xxxxxxxxxx11x, x0011xxxxxxxxxx11x} filter: (or (= (:var 0) (:var 2)) (= (:var 0) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xxxxx0xxxxxxxx1, x0xxxxxx0xxxxxxx11, x1xxxxxx0xxxxxxx01, 0xxxxxxx0xxxxxx1x1, 1xxxxxxx0xxxxxx0x1, xx1xxxxx1xxxxxxxx0, x0xxxxxx1xxxxxxx10, x1xxxxxx1xxxxxxx00, 0xxxxxxx1xxxxxx1x0, 1xxxxxxx1xxxxxx0x0, xx0xxxx0xxxxxxxx11, xx1xxxx0xxxxxxxx10, x0xxxxx0xxxxxxxx1x, 0xxxxxx0xxxxxxx11x, 1xxxxxx0xxxxxxx01x, xx0xxxx1xxxxxxxx01, xx1xxxx1xxxxxxxx00, x1xxxxx1xxxxxxxx0x, 0xxxxxx1xxxxxxx10x, 1xxxxxx1xxxxxxx00x, xx0xxx0xxxxxxxx1x1, xx1xxx0xxxxxxxx1x0, x0xxxx0xxxxxxxx11x, x1xxxx0xxxxxxxx10x, 0xxxxx0xxxxxxxx1xx, xx0xxx1xxxxxxxx0x1, xx1xxx1xxxxxxxx0x0, x0xxxx1xxxxxxxx01x, x1xxxx1xxxxxxxx00x, 1xxxxx1xxxxxxxx0xx}} filter: (or (= (:var 0) (:var 2)) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xx0xxxxxxxx1, xx1xx0xx0xxxxxxxx1, x0xx1xxx0xxxxxxxx1, x1xx0xxx0xxxxxxxx1, 0xx1xxxx0xxxxxxxx1, 1xx0xxxx0xxxxxxxx1, xx0xx1xx1xxxxxxxx0, xx1xx0xx1xxxxxxxx0, x0xx1xxx1xxxxxxxx0, x1xx0xxx1xxxxxxxx0, 0xx1xxxx1xxxxxxxx0, 1xx0xxxx1xxxxxxxx0, xx0xx1x0xxxxxxxx1x, xx1xx0x0xxxxxxxx1x, x0xx1xx0xxxxxxxx1x, x1xx0xx0xxxxxxxx1x, 0xx1xxx0xxxxxxxx1x, 1xx0xxx0xxxxxxxx1x, xx0xx1x1xxxxxxxx0x, xx1xx0x1xxxxxxxx0x, x0xx1xx1xxxxxxxx0x, x1xx0xx1xxxxxxxx0x, 0xx1xxx1xxxxxxxx0x, 1xx0xxx1xxxxxxxx0x, xx0xx10xxxxxxxx1xx, xx1xx00xxxxxxxx1xx, x0xx1x0xxxxxxxx1xx, x1xx0x0xxxxxxxx1xx, 0xx1xx0xxxxxxxx1xx, 1xx0xx0xxxxxxxx1xx, xx0xx11xxxxxxxx0xx, xx1xx01xxxxxxxx0xx, x0xx1x1xxxxxxxx0xx, x1xx0x1xxxxxxxx0xx, 0xx1xx1xxxxxxxx0xx, 1xx0xx1xxxxxxxx0xx}} filter: (or (= ((_ extract 2 1) (:var 0)) ((_ extract 1 0) (:var 2))) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xx0xxxxxxx1x, xx1xx0xx0xxxxxxx1x, x0xx1xxx0xxxxxxx1x, x1xx0xxx0xxxxxxx1x, 0xx1xxxx0xxxxxxx1x, 1xx0xxxx0xxxxxxx1x, xx0xx1xx1xxxxxxx0x, xx1xx0xx1xxxxxxx0x, x0xx1xxx1xxxxxxx0x, x1xx0xxx1xxxxxxx0x, 0xx1xxxx1xxxxxxx0x, 1xx0xxxx1xxxxxxx0x, xx0xx1x0xxxxxxx1xx, xx1xx0x0xxxxxxx1xx, x0xx1xx0xxxxxxx1xx, x1xx0xx0xxxxxxx1xx, 0xx1xxx0xxxxxxx1xx, 1xx0xxx0xxxxxxx1xx, xx0xx1x1xxxxxxx0xx, xx1xx0x1xxxxxxx0xx, x0xx1xx1xxxxxxx0xx, x1xx0xx1xxxxxxx0xx, 0xx1xxx1xxxxxxx0xx, 1xx0xxx1xxxxxxx0xx}} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) (:var 4))) { xxxxxxxxxxxxxxxxxx \ { xx0xx1xxxxxxxxxxxx, xx1xx0xxxxxxxxxxxx, x0xx1xxxxxxxxxxxxx, x1xx0xxxxxxxxxxxxx, 0xx1xxxxxxxxxxxxxx, 1xx0xxxxxxxxxxxxxx}, 1xx0xxxxxxxxxxx11x \ { 1x00x1xxxxxxxxx11x, 1x10x0xxxxxxxxx11x, 10x01xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 0xx1xxxxxxxxxxx11x \ { 0x01x1xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 01x10xxxxxxxxxx11x}, x1xx0xxxxxxxxxx11x \ { x10x01xxxxxxxxx11x, x11x00xxxxxxxxx11x, 01x10xxxxxxxxxx11x, 11x00xxxxxxxxxx11x}, 11x00xxxxxxxxxx11x \ { 110001xxxxxxxxx11x, 111000xxxxxxxxx11x}, 01x10xxxxxxxxxx11x \ { 010101xxxxxxxxx11x, 011100xxxxxxxxx11x}, x0xx1xxxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x01x10xxxxxxxxx11x, 00x11xxxxxxxxxx11x, 10x01xxxxxxxxxx11x}, 10x01xxxxxxxxxx11x \ { 100011xxxxxxxxx11x, 101010xxxxxxxxx11x}, 00x11xxxxxxxxxx11x \ { 000111xxxxxxxxx11x, 001110xxxxxxxxx11x}, xx1xx0xxxxxxxxx11x \ { x01x10xxxxxxxxx11x, x11x00xxxxxxxxx11x, 0x11x0xxxxxxxxx11x, 1x10x0xxxxxxxxx11x}, 1x10x0xxxxxxxxx11x \ { 101010xxxxxxxxx11x, 111000xxxxxxxxx11x}, 0x11x0xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 011100xxxxxxxxx11x}, x11x00xxxxxxxxx11x \ { 011100xxxxxxxxx11x, 111000xxxxxxxxx11x}, 111000xxxxxxxxx11x, 011100xxxxxxxxx11x, x01x10xxxxxxxxx11x \ { 001110xxxxxxxxx11x, 101010xxxxxxxxx11x}, 101010xxxxxxxxx11x, 001110xxxxxxxxx11x, xx0xx1xxxxxxxxx11x \ { x00x11xxxxxxxxx11x, x10x01xxxxxxxxx11x, 0x01x1xxxxxxxxx11x, 1x00x1xxxxxxxxx11x}, 1x00x1xxxxxxxxx11x \ { 100011xxxxxxxxx11x, 110001xxxxxxxxx11x}, 0x01x1xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 010101xxxxxxxxx11x}, x10x01xxxxxxxxx11x \ { 010101xxxxxxxxx11x, 110001xxxxxxxxx11x}, 110001xxxxxxxxx11x, 010101xxxxxxxxx11x, x00x11xxxxxxxxx11x \ { 000111xxxxxxxxx11x, 100011xxxxxxxxx11x}, 100011xxxxxxxxx11x, 000111xxxxxxxxx11x} filter: (or (= ((_ extract 2 1) (:var 0)) #b11) (= (:var 3) #b011)) { xxxxxxxxxxxxxxx11x, xxx011xxxxxxxxxxxx} filter: (or (= (:var 0) #b101) (= (:var 3) #b101)) { xxxxxxxxxxxxxxx101, xxx101xxxxxxxxxxxx} filter: (or (= (:var 0) #b111) (= (:var 3) #b111)) { xxxxxxxxxxxxxxx111, xxx111xxxxxxxxxxxx} filter: (not (or (= (:var 0) (:var 2)) (= (:var 3) (:var 4)))) { xx0xx1xx0xxxxxxxx1, xx0xx1xx1xxxxxxxx0, xx0xx1x0xxxxxxxx1x, xx0xx1x1xxxxxxxx0x, xx0xx10xxxxxxxx1xx, xx0xx11xxxxxxxx0xx, xx1xx0xx0xxxxxxxx1, xx1xx0xx1xxxxxxxx0, xx1xx0x0xxxxxxxx1x, xx1xx0x1xxxxxxxx0x, xx1xx00xxxxxxxx1xx, xx1xx01xxxxxxxx0xx, x0xx1xxx0xxxxxxxx1, x0xx1xxx1xxxxxxxx0, x0xx1xx0xxxxxxxx1x, x0xx1xx1xxxxxxxx0x, x0xx1x0xxxxxxxx1xx, x0xx1x1xxxxxxxx0xx, x1xx0xxx0xxxxxxxx1, x1xx0xxx1xxxxxxxx0, x1xx0xx0xxxxxxxx1x, x1xx0xx1xxxxxxxx0x, x1xx0x0xxxxxxxx1xx, x1xx0x1xxxxxxxx0xx, 0xx1xxxx0xxxxxxxx1, 0xx1xxxx1xxxxxxxx0, 0xx1xxx0xxxxxxxx1x, 0xx1xxx1xxxxxxxx0x, 0xx1xx0xxxxxxxx1xx, 0xx1xx1xxxxxxxx0xx, 1xx0xxxx0xxxxxxxx1, 1xx0xxxx1xxxxxxxx0, 1xx0xxx0xxxxxxxx1x, 1xx0xxx1xxxxxxxx0x, 1xx0xx0xxxxxxxx1xx, 1xx0xx1xxxxxxxx0xx} filter: (= (:var 0) (:var 2)) { xxxxxxxxxxxxxxxxxx \ { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx}} filter: (not (= (:var 0) (:var 2))) { xxxxxxxx0xxxxxxxx1, xxxxxxxx1xxxxxxxx0, xxxxxxx0xxxxxxxx1x, xxxxxxx1xxxxxxxx0x, xxxxxx0xxxxxxxx1xx, xxxxxx1xxxxxxxx0xx} PASS (test udoc_relation :time 2.64 :before-memory 4.66 :after-memory 4.66) PASS (test string_buffer :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test string_buffer :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test map :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test map :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test diff_logic :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test diff_logic :time 0.00 :before-memory 4.66 :after-memory 4.66) 0 2 6 8198 {1, 2, 44} : 1 {1, 2, 4, 44} : 3 PASS (test uint_set :time 0.03 :before-memory 4.66 :after-memory 4.66) 0 2 6 8198 {1, 2, 44} : 1 {1, 2, 4, 44} : 3 PASS (test uint_set :time 0.03 :before-memory 4.66 :after-memory 4.66) PASS (test list :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test list :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test small_object_allocator :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test small_object_allocator :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test timeout :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test timeout :time 0.00 :before-memory 4.66 :after-memory 4.66) [hypothesis]: a #5 := (not a) [hypothesis]: #5 #5 := (not a) #6 := [hypothesis]: #5 #4 := [hypothesis]: a #7 := [unit-resolution #4 #6]: false [lemma #7]: a #5 := (not a) #10 := (or a #5) #6 := [hypothesis]: #5 #4 := [hypothesis]: a #7 := [unit-resolution #4 #6]: false [lemma #7]: #10 PASS (test proof_checker :time 0.00 :before-memory 4.66 :after-memory 4.66) [hypothesis]: a #5 := (not a) [hypothesis]: #5 #5 := (not a) #6 := [hypothesis]: #5 #4 := [hypothesis]: a #7 := [unit-resolution #4 #6]: false [lemma #7]: a #5 := (not a) #10 := (or a #5) #6 := [hypothesis]: #5 #4 := [hypothesis]: a #7 := [unit-resolution #4 #6]: false [lemma #7]: #10 PASS (test proof_checker :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test simplifier :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test simplifier :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test bit_blaster :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test bit_blaster :time 0.00 :before-memory 4.66 :after-memory 4.66) (forall ((y S)) (and (p y (:var 1)) (p (:var 2) (:var 3)))) (forall ((y S)) (and (p y (:var 2)) (p (:var 1) (:var 3)))) (forall ((y S)) (and (p y (:var 2)) (p (:var 1) (:var 3)))) (forall ((y S) (x S)) (and (p x y) (p (:var 2) (:var 3)))) (forall ((y S) (x S)) (and (p x y) (p (:var 3) (:var 2)))) (forall ((y S) (x S)) (and (p x y) (p (:var 3) (:var 2)))) PASS (test var_subst :time 0.00 :before-memory 4.66 :after-memory 4.66) (forall ((y S)) (and (p y (:var 1)) (p (:var 2) (:var 3)))) (forall ((y S)) (and (p y (:var 2)) (p (:var 1) (:var 3)))) (forall ((y S)) (and (p y (:var 2)) (p (:var 1) (:var 3)))) (forall ((y S) (x S)) (and (p x y) (p (:var 2) (:var 3)))) (forall ((y S) (x S)) (and (p x y) (p (:var 3) (:var 2)))) (forall ((y S) (x S)) (and (p x y) (p (:var 3) (:var 2)))) PASS (test var_subst :time 0.00 :before-memory 4.66 :after-memory 4.66) WARNING: parser error WARNING: parser error WARNING: parser error PASS (test simple_parser :time 0.00 :before-memory 4.66 :after-memory 4.66) WARNING: parser error WARNING: parser error WARNING: parser error PASS (test simple_parser :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test api :time 0.00 :before-memory 4.66 :after-memory 4.66) PASS (test api :time 0.00 :before-memory 4.66 :after-memory 4.66) l_true l_true l_true l_false a l_false a c l_false a c e l_true PASS (test cube_clause :time 0.00 :before-memory 4.66 :after-memory 4.66) l_true l_true l_true l_false a l_false a c l_false a c e l_true PASS (test cube_clause :time 0.00 :before-memory 4.66 :after-memory 4.66) x: (1, 2), y: (-2, 3), z: (-1, 5) x: (1, 2), y: (-2, 3), z: (-4, 6) [10, 10] (-oo, oo) [-10, oo) (-oo, 10] (-10, oo) (-oo, 10) [2, 10] [[-25, 25), 0x1, 0x2, 0x3, 0x4, 0x1, 0x2, 0x3, 0x4] [[1/3, oo), 0x1, 0x2, 0x3] [[0, 9], 0x1, 0x2] [[0, 16), 0x1, 0x2] [(4, 16], 0x1, 0x1, 0x2] [[0, 9], 0x1, 0x2] [[4, 16), 0x2, 0x2, 0x1] [2, 10] * (0, 1/10] = [(0, 1], 0x1, 0x3, 0x2, 0x3] [-2, -1) * [-3, 0] = [0, 6] (1, 2] * [0, 3] = [0, 6] (1, 2) * [-3, 0] = (-6, 0] [10, 20] / (0, 1] = [10, oo) [5, oo) PASS (test old_interval :time 0.00 :before-memory 4.66 :after-memory 4.66) x: (1, 2), y: (-2, 3), z: (-1, 5) x: (1, 2), y: (-2, 3), z: (-4, 6) [10, 10] (-oo, oo) [-10, oo) (-oo, 10] (-10, oo) (-oo, 10) [2, 10] [[-25, 25), 0x1, 0x2, 0x3, 0x4, 0x1, 0x2, 0x3, 0x4] [[1/3, oo), 0x1, 0x2, 0x3] [[0, 9], 0x1, 0x2] [[0, 16), 0x1, 0x2] [(4, 16], 0x1, 0x1, 0x2] [[0, 9], 0x1, 0x2] [[4, 16), 0x2, 0x2, 0x1] [2, 10] * (0, 1/10] = [(0, 1], 0x1, 0x3, 0x2, 0x3] [-2, -1) * [-3, 0] = [0, 6] (1, 2] * [0, 3] = [0, 6] (1, 2) * [-3, 0] = (-6, 0] [10, 20] / (0, 1] = [10, oo) [5, oo) PASS (test old_interval :time 0.00 :before-memory 4.66 :after-memory 4.66) Class a |-> 0 Class b |-> 0 Class c |-> 2 Class d |-> 0 Class (f a) |-> 4 Class (f b) |-> 4 Class (f c) |-> 6 asserting b <= f(a) Class a |-> 0 Class b |-> 0 Class c |-> 2 Class d |-> 0 Class (f a) |-> 0 Class (f b) |-> 0 Class (f c) |-> 0 Class ((as const (Array Int Int)) 1) |-> 0 Class (store ((as const (Array Int Int)) 1) 1 a) |-> 1 Class (store (store ((as const (Array Int Int)) 1) 1 a) 2 b) |-> 2 Class (store ((as const (Array Int Int)) 1) 2 b) |-> 3 Class (store (store ((as const (Array Int Int)) 1) 2 b) 1 a) |-> 2 PASS (test get_implied_equalities :time 0.01 :before-memory 4.66 :after-memory 4.68) Class a |-> 0 Class b |-> 0 Class c |-> 2 Class d |-> 0 Class (f a) |-> 4 Class (f b) |-> 4 Class (f c) |-> 6 asserting b <= f(a) Class a |-> 0 Class b |-> 0 Class c |-> 2 Class d |-> 0 Class (f a) |-> 0 Class (f b) |-> 0 Class (f c) |-> 0 Class ((as const (Array Int Int)) 1) |-> 0 Class (store ((as const (Array Int Int)) 1) 1 a) |-> 1 Class (store (store ((as const (Array Int Int)) 1) 1 a) 2 b) |-> 2 Class (store ((as const (Array Int Int)) 1) 2 b) |-> 3 Class (store (store ((as const (Array Int Int)) 1) 2 b) 1 a) |-> 2 PASS (test get_implied_equalities :time 0.01 :before-memory 4.68 :after-memory 4.68) not solved 1 3 0 0 PASS (test arith_simplifier_plugin :time 0.00 :before-memory 4.68 :after-memory 4.68) not solved 1 3 0 0 PASS (test arith_simplifier_plugin :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test matcher :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test matcher :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test object_allocator :time 0.04 :before-memory 4.68 :after-memory 4.68) PASS (test object_allocator :time 0.04 :before-memory 4.68 :after-memory 4.68) i: 0, a: 1 i: 1, a: 2 i: 2, a: 4 i: 3, a: 8 i: 4, a: 16 i: 5, a: 32 i: 6, a: 64 i: 7, a: 128 i: 8, a: 256 i: 9, a: 512 i: 10, a: 1024 i: 11, a: 2048 i: 12, a: 4096 i: 13, a: 8192 i: 14, a: 16384 i: 15, a: 32768 i: 16, a: 65536 i: 17, a: 131072 i: 18, a: 262144 i: 19, a: 524288 i: 20, a: 1048576 i: 21, a: 2097152 i: 22, a: 4194304 i: 23, a: 8388608 i: 24, a: 16777216 i: 25, a: 33554432 i: 26, a: 67108864 i: 27, a: 134217728 i: 28, a: 268435456 i: 29, a: 536870912 i: 30, a: 1073741824 i: 31, a: 2147483648 i: 32, a: 4294967296 i: 33, a: 8589934592 i: 34, a: 17179869184 i: 35, a: 34359738368 i: 36, a: 68719476736 i: 37, a: 137438953472 i: 38, a: 274877906944 i: 39, a: 549755813888 i: 40, a: 1099511627776 i: 41, a: 2199023255552 i: 42, a: 4398046511104 i: 43, a: 8796093022208 i: 44, a: 17592186044416 i: 45, a: 35184372088832 i: 46, a: 70368744177664 i: 47, a: 140737488355328 i: 48, a: 281474976710656 i: 49, a: 562949953421312 i: 50, a: 1125899906842624 i: 51, a: 2251799813685248 i: 52, a: 4503599627370496 i: 53, a: 9007199254740992 i: 54, a: 18014398509481984 i: 55, a: 36028797018963968 i: 56, a: 72057594037927936 i: 57, a: 144115188075855872 i: 58, a: 288230376151711744 i: 59, a: 576460752303423488 i: 60, a: 1152921504606846976 i: 61, a: 2305843009213693952 i: 62, a: 4611686018427387904 i: 63, a: 9223372036854775808 i: 64, a: 18446744073709551616 i: 65, a: 36893488147419103232 i: 66, a: 73786976294838206464 i: 67, a: 147573952589676412928 i: 68, a: 295147905179352825856 i: 69, a: 590295810358705651712 i: 70, a: 1180591620717411303424 i: 71, a: 2361183241434822606848 i: 72, a: 4722366482869645213696 i: 73, a: 9444732965739290427392 i: 74, a: 18889465931478580854784 i: 75, a: 37778931862957161709568 i: 76, a: 75557863725914323419136 i: 77, a: 151115727451828646838272 i: 78, a: 302231454903657293676544 i: 79, a: 604462909807314587353088 i: 80, a: 1208925819614629174706176 i: 81, a: 2417851639229258349412352 i: 82, a: 4835703278458516698824704 i: 83, a: 9671406556917033397649408 i: 84, a: 19342813113834066795298816 i: 85, a: 38685626227668133590597632 i: 86, a: 77371252455336267181195264 i: 87, a: 154742504910672534362390528 i: 88, a: 309485009821345068724781056 i: 89, a: 618970019642690137449562112 i: 90, a: 1237940039285380274899124224 i: 91, a: 2475880078570760549798248448 i: 92, a: 4951760157141521099596496896 i: 93, a: 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a: 222080953466272591199075685926070986449690197545177424948221464175614296816150792216146981230467722745372842241654252947958894873066551754501797863509499913290930227125991025205626388067556110108100514141822405069711373777925 b: 4017617934712179466936807180297524109100071513171281860791553210854089166106670691028492348187290690111215256078843749209807622517332893180959866162706618294025565859229463279161575605 g1: 428132322655336791458701484849810348963343786336189049265 g2: 428132322655336791458701484849810348963343786336189049265 a: -6209707377372051284010195298515283742045443889479106516099130319418474510624766557151611982920564481309276848363856798487352765034550902856533413205780026077482987485063287891205 b: -21013508679003231068789794113638815334263335478632632058592833356113455483485937425658172532930550046431753668030378425811640273273402863317843434011782110522069246792606177484537001126675173185139334753 g1: 60826941244850147395694238692970880578434047991 g2: 60826941244850147395694238692970880578434047991 g: 2147483648 213^{1/5}: 3 -213^{1/5}: -2 log2(0): 0 log2(1): 0 log2(2): 1 log2(3): 1 log2(4): 2 log2(5): 2 log2(6): 2 log2(7): 2 log2(8): 3 log2(9): 3 log2(10): 3 log2(11): 3 log2(12): 3 log2(13): 3 log2(14): 3 log2(15): 3 log2(16): 4 log2(17): 4 log2(18): 4 log2(19): 4 log2(20): 4 log2(21): 4 log2(22): 4 log2(23): 4 log2(24): 4 log2(25): 4 log2(26): 4 log2(27): 4 log2(28): 4 log2(29): 4 log2(30): 4 log2(31): 4 log2(32): 5 log2(33): 5 log2(34): 5 log2(35): 5 log2(36): 5 log2(37): 5 log2(38): 5 log2(39): 5 log2(40): 5 log2(41): 5 log2(42): 5 log2(43): 5 log2(44): 5 log2(45): 5 log2(46): 5 log2(47): 5 log2(48): 5 log2(49): 5 log2(50): 5 log2(51): 5 log2(52): 5 log2(53): 5 log2(54): 5 log2(55): 5 log2(56): 5 log2(57): 5 log2(58): 5 log2(59): 5 log2(60): 5 log2(61): 5 log2(62): 5 log2(63): 5 log2(64): 6 a: 1000231 b: 102928187172727273 b: 102951963583964173000063 r: 18446744075857035263 expected: 18446744075857035263 4294967295 4294967295 1002034040050606089383838288182 1002034040050606089383838288182 *-2 = -2004068080101212178767676576364 v2: 4294967296 v2*v2: 18446744073709551616 v2: 4294967296 v2*v2: 18446744073709551616 v2: 115792089237316195423570985008687907853269984665640564039457584007913129639936 PASS (test mpz :time 0.02 :before-memory 4.68 :after-memory 4.68) i: 0, a: 1 i: 1, a: 2 i: 2, a: 4 i: 3, a: 8 i: 4, a: 16 i: 5, a: 32 i: 6, a: 64 i: 7, a: 128 i: 8, a: 256 i: 9, a: 512 i: 10, a: 1024 i: 11, a: 2048 i: 12, a: 4096 i: 13, a: 8192 i: 14, a: 16384 i: 15, a: 32768 i: 16, a: 65536 i: 17, a: 131072 i: 18, a: 262144 i: 19, a: 524288 i: 20, a: 1048576 i: 21, a: 2097152 i: 22, a: 4194304 i: 23, a: 8388608 i: 24, a: 16777216 i: 25, a: 33554432 i: 26, a: 67108864 i: 27, a: 134217728 i: 28, a: 268435456 i: 29, a: 536870912 i: 30, a: 1073741824 i: 31, a: 2147483648 i: 32, a: 4294967296 i: 33, a: 8589934592 i: 34, a: 17179869184 i: 35, a: 34359738368 i: 36, a: 68719476736 i: 37, a: 137438953472 i: 38, a: 274877906944 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1960352178423649225892280536314678469863235161290760134098320083785718977406685228720876400548457222670557383566413188152649739244776561301613716575787818575602170756801796949930237097950270522739079575817769427 b: -25384154713871646476808223512414581909063492530373174271243332366838025244352050483714117680294099568596054993381312466480940437911572856264771452863538475465229700420479583225394983981052267891620066062 g1: 4179708984265806324928461116697741999511642038037 g2: 4179708984265806324928461116697741999511642038037 a: -349256717799207080394849609820183585996524601631231936883025528029804487906948134776250214658392015308383329264038993138245202578751143214190367854605596256993077323373768381517729783048759490776101797861 b: -985139945319990785680156247979996422530806924961814986725840561594436127527958238949245592686334932621686380586536254139616369228057092744226984377364834556541410448655953710445145559150208728074169 g1: 1346019145817437081368523953398329917380854477 g2: 1346019145817437081368523953398329917380854477 a: -149736550027231283712206412964562178741440585785902220706191976409223479758375789833197568404472839565571847929871207212173419614542477953192909574618001850522815261545021051236484912779706286374040222860738204 b: 68178517612029643974388357228434446330959886012775393688776131853162559439238865101573215452897868702712017332339146360751741072534475020024523195821054805567130562854765878236381352570205109803 g1: 6510119565583144494776770221422526200150977226021 g2: 6510119565583144494776770221422526200150977226021 a: 568038408526896562918092114832000037709119184432925081019763944823125217530309356466832726213353409161931480395119090219197826180210048520070960296876913278180142004375949712758866324460358175538673401160955453228 b: 12918170321349774004903317349216627640937588988470219051482424880402999814899658562373151128521222204856705429478454561656205162139336704062127225501961253250051066098484720895512311679480772133281754514608420794017024199 g1: 1240858815571998317754386811122560876850367385310074033063058015235288502294909 g2: 1240858815571998317754386811122560876850367385310074033063058015235288502294909 a: 205612332648181921758372645790949691935998256975376065436061447598856682771920824932859394837461887015779961237895842372541845006958653111716035602451790922395652173198163565013780562454031323988660452717470571351 b: 162245969050809894474270260493919222406436287611885461263809013308869831025196905715466896678230370868513506490228377358881251843921220897366919646267201791262981474847161484728274113854939914447429228748712820591371127089849640695656491193 g1: 2085095625406351609368675184631662475539682827300623898296877661 g2: 2085095625406351609368675184631662475539682827300623898296877661 a: -1390178499701917461683270380403562800751510565949079692620244522485547290500332255512457915206814077467052648312925651739531295911750536753770614196271673865206857758187378909418665677796422941437469 b: 19237436287865567569634133586479273332183434667315576796441787099686273145752986594410761057530970641427112901816475956743319139588984370398036034691370216575195755025823992847965371884498242962018423 g1: 23494334560781987777796595767756668787940703546608221053609 g2: 23494334560781987777796595767756668787940703546608221053609 a: 5593980395607533522268516602501307483202128668315103500750016665694520831930186612662416498428888546459597201770674202630636441176499621919225177954226136514070583079255734297443339225455967104452378049704218583614209 b: -245416203671391941112704751442350908702828878883271716551584490080287568199821690268455564995896577135133165167328441588090929230436620114931222136780225055418578997119924579544918488613431334000057410770849479319007 g1: 211145515808498016031750956689701833323287518586925822365963550202201571439 g2: 211145515808498016031750956689701833323287518586925822365963550202201571439 a: -371567976249870618929142736391847131455977187703423110783345762658310156543196901759454908249614693275405574152595340203289783397815779453727496845529286907340697958129063261225 b: -31083328029269937083066261100223836587803810027279124083427918206588815127925333231505418078385336427406340264645110993520631386825285186833229975774415328057398140305843453053079031952740 g1: 11034914308430244615314878417607382290916211850998565994416732245 g2: 11034914308430244615314878417607382290916211850998565994416732245 a: 7066110684390952456916626518811883416127339712441988048443571673827451171269204485134032456805832052638661262800802701773280866022689156009793945697942386911348503990136239 b: 3755001110190229262374433854777410520392130065360180423683941139827484325396974328201764061592466181628621510112993796708111674033520460998215391640375413022035385455306600654045619169893305207163890497035105037885678584045509634524689296968794625728182647 g1: 1035439824674085131032840654547143944103080279051990362891 g2: 1035439824674085131032840654547143944103080279051990362891 g: 2147483648 213^{1/5}: 3 -213^{1/5}: -2 log2(0): 0 log2(1): 0 log2(2): 1 log2(3): 1 log2(4): 2 log2(5): 2 log2(6): 2 log2(7): 2 log2(8): 3 log2(9): 3 log2(10): 3 log2(11): 3 log2(12): 3 log2(13): 3 log2(14): 3 log2(15): 3 log2(16): 4 log2(17): 4 log2(18): 4 log2(19): 4 log2(20): 4 log2(21): 4 log2(22): 4 log2(23): 4 log2(24): 4 log2(25): 4 log2(26): 4 log2(27): 4 log2(28): 4 log2(29): 4 log2(30): 4 log2(31): 4 log2(32): 5 log2(33): 5 log2(34): 5 log2(35): 5 log2(36): 5 log2(37): 5 log2(38): 5 log2(39): 5 log2(40): 5 log2(41): 5 log2(42): 5 log2(43): 5 log2(44): 5 log2(45): 5 log2(46): 5 log2(47): 5 log2(48): 5 log2(49): 5 log2(50): 5 log2(51): 5 log2(52): 5 log2(53): 5 log2(54): 5 log2(55): 5 log2(56): 5 log2(57): 5 log2(58): 5 log2(59): 5 log2(60): 5 log2(61): 5 log2(62): 5 log2(63): 5 log2(64): 6 a: 1000231 b: 102928187172727273 b: 102951963583964173000063 r: 18446744075857035263 expected: 18446744075857035263 4294967295 4294967295 1002034040050606089383838288182 1002034040050606089383838288182 *-2 = -2004068080101212178767676576364 v2: 4294967296 v2*v2: 18446744073709551616 v2: 4294967296 v2*v2: 18446744073709551616 v2: 115792089237316195423570985008687907853269984665640564039457584007913129639936 PASS (test mpz :time 0.03 :before-memory 4.68 :after-memory 4.68) 1 11/10 1/3 1002034040050606089383838288182 1002034040050606089383838288182 *-2 = -2004068080101212178767676576364 1/3: 0.3333333333? 1/4: 0.25 PASS (test mpq :time 0.00 :before-memory 4.68 :after-memory 4.68) 1 11/10 1/3 1002034040050606089383838288182 1002034040050606089383838288182 *-2 = -2004068080101212178767676576364 1/3: 0.3333333333? 1/4: 0.25 PASS (test mpq :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test mpf :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test mpf :time 0.00 :before-memory 4.68 :after-memory 4.68) **************************************************************************************************** 1 3 2 **************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** PASS (test total_order :time 0.90 :before-memory 4.68 :after-memory 4.68) **************************************************************************************************** 1 3 2 **************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** **************************************************************************************************** PASS (test total_order :time 0.90 :before-memory 4.68 :after-memory 4.68) table with signature (2,4,8,4): (1,3,7,2) (1,3,7,3) 1 3 7 2 1 3 7 3 table with signature (2,4,8,4,2,4,8,4): (0,3,7,1,1,3,7,3) (1,3,7,3,1,3,7,3) table with signature (2,4,8,4,2,4,8,4): (0,3,7,1,1,3,7,2) (1,3,7,3,1,3,7,2) (0,3,7,1,1,3,7,3) (1,3,7,3,1,3,7,3) PASS (test dl_table :time 0.10 :before-memory 4.68 :after-memory 4.68) table with signature (2,4,8,4): (1,3,7,2) (1,3,7,3) 1 3 7 2 1 3 7 3 table with signature (2,4,8,4,2,4,8,4): (0,3,7,1,1,3,7,3) (1,3,7,3,1,3,7,3) table with signature (2,4,8,4,2,4,8,4): (0,3,7,1,1,3,7,2) (1,3,7,3,1,3,7,2) (0,3,7,1,1,3,7,3) (1,3,7,3,1,3,7,3) PASS (test dl_table :time 0.10 :before-memory 4.68 :after-memory 4.68) PASS (test dl_context :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_context :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_util :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_util :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_product_relation :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_product_relation :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_relation :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test dl_relation :time 0.00 :before-memory 4.68 :after-memory 4.68) max. heap size: 68.6693 Mbytes max. heap size: 68.6693 Mbytes PASS (test parray :time 0.09 :before-memory 4.68 :after-memory 4.68) max. heap size: 68.6693 Mbytes max. heap size: 68.6693 Mbytes PASS (test parray :time 0.09 :before-memory 4.68 :after-memory 4.68) PASS (test stack :time 0.26 :before-memory 4.68 :after-memory 4.68) PASS (test stack :time 0.26 :before-memory 4.68 :after-memory 4.68) [\"hello\"\"world\" ] [\"hello\" world\"] [\"hello\" world\"] [\"hello\" world\"] [\"hello\" \"world\" ] [] [ ] [] [ ] [] [] [] [] PASS (test escaped :time 0.00 :before-memory 4.68 :after-memory 4.68) [\"hello\"\"world\" ] [\"hello\" world\"] [\"hello\" world\"] [\"hello\" world\"] [\"hello\" \"world\" ] [] [ ] [] [ ] [] [] [] [] PASS (test escaped :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test buffer :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test buffer :time 0.00 :before-memory 4.68 :after-memory 4.68) 10 20 30 12 10 12 10 13 14 12 10 13 18 10 14 16 13 18 14 16 13 size: 9 9 size: 7 7 size: 662 662 PASS (test chashtable :time 0.04 :before-memory 4.68 :after-memory 4.68) 10 20 30 12 10 12 10 13 14 12 10 13 18 10 14 16 13 18 14 16 13 size: 8 8 size: 8 8 size: 675 675 PASS (test chashtable :time 0.04 :before-memory 4.68 :after-memory 4.68) testing exception Format 12 twelve PASS (test ex :time 0.00 :before-memory 4.68 :after-memory 4.68) testing exception Format 12 twelve PASS (test ex :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test nlarith_util :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test nlarith_util :time 0.00 :before-memory 4.68 :after-memory 4.68) Using Z3 Version 4.8 (build 4, revision 0) result 1 model : mySet -> (lambda ((x!1 Int)) (or (= x!1 43) (= x!1 42))) PASS (test api_bug :time 0.01 :before-memory 4.68 :after-memory 4.68) Using Z3 Version 4.8 (build 4, revision 0) result 1 model : mySet -> (lambda ((x!1 Int)) (or (= x!1 43) (= x!1 42))) PASS (test api_bug :time 0.01 :before-memory 4.68 :after-memory 4.68) 0.0 (<= (+ (* (/ 13.0 10.0) x y) (* (/ 23.0 10.0) y y) (* (- 2.0) x)) (/ 11.0 10.0)) (= (+ (* 3.0 x x) (* (- 4.0) y)) (- 7.0)) PASS (test arith_rewriter :time 0.00 :before-memory 4.68 :after-memory 4.68) 0.0 (<= (+ (* (/ 13.0 10.0) x y) (* (/ 23.0 10.0) y y) (* (- 2.0) x)) (/ 11.0 10.0)) (= (+ (* 3.0 x x) (* (- 4.0) y)) (- 7.0)) PASS (test arith_rewriter :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test check_assumptions :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test check_assumptions :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test smt_context :time 0.00 :before-memory 4.68 :after-memory 4.68) PASS (test smt_context :time 0.00 :before-memory 4.68 :after-memory 4.68) b -> 63 a -> 47 b -> 46 a -> 0 c -> 47 l_false PASS (test theory_dl :time 0.01 :before-memory 4.68 :after-memory 4.68) b -> 63 a -> 47 b -> 46 a -> 0 c -> 47 l_false PASS (test theory_dl :time 0.01 :before-memory 4.68 :after-memory 4.68) satisfiable a1 -> (_ as-array k!0) k!0 -> { true -> true else -> true } -------------------------- Logical context: scope-lvl: 0 base-lvl: 0 search-lvl: 0 inconsistent(): 0 m_asserted_formulas.inconsistent(): 0 #1 := true #5 := a1 #7 := (select a1 true) #2 := false #26 := as-array[#2147483785] #6 := a2 #27 := (= a2 as-array[#2147483785]) asserted formulas: #7 #27 current assignment: #7: (select a1 true) expression -> bool_var: (#1 -> p!0) (#7 -> p!1) expression -> enode: (#1 -> e!0) (#2 -> e!1) (#5 -> e!2) (#7 -> e!3) relevant exprs: #7 #1 #5 Theory array: v0 #5 -> #5 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {#7 #7} maps: {} p_parent_maps: {} p_const: {} v1 #7 -> #7 is_array: 0 is_select: 1 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} recfun{}decl2enodes: id 131 -> #7 hot bool vars: -------------------------- Logical context: scope-lvl: 0 base-lvl: 0 search-lvl: 0 inconsistent(): 0 m_asserted_formulas.inconsistent(): 0 #1 := true #5 := a1 #7 := (select a1 true) #26 := as-array[#2147483785] #6 := a2 #27 := (= a2 as-array[#2147483785]) #2 := false asserted formulas: #7 #27 current assignment: #7: (select a1 true) #27: (= a2 (_ as-array k!0)) equivalence classes: #6 -> #26: a2 -> (_ as-array k!0) expression -> bool_var: (#1 -> p!0) (#7 -> p!1) (#27 -> p!2) expression -> enode: (#1 -> e!0) (#2 -> e!1) (#5 -> e!2) (#7 -> e!3) (#6 -> e!4) (#26 -> e!5) (#27 -> e!6) relevant exprs: #7 #1 #5 #27 #26 #6 Theory array: v0 #5 -> #5 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {#7 #7} maps: {} p_parent_maps: {} p_const: {} v1 #7 -> #7 is_array: 0 is_select: 1 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} v2 #6 -> #6 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} v3 #26 -> #6 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} recfun{}decl2enodes: id 131 -> #7 hot bool vars: -------------------------- unknown PASS (test model_retrieval :time 0.00 :before-memory 4.68 :after-memory 4.68) satisfiable a1 -> (_ as-array k!0) k!0 -> { true -> true else -> true } -------------------------- Logical context: scope-lvl: 0 base-lvl: 0 search-lvl: 0 inconsistent(): 0 m_asserted_formulas.inconsistent(): 0 #1 := true #5 := a1 #7 := (select a1 true) #2 := false #26 := as-array[#2147483785] #6 := a2 #27 := (= a2 as-array[#2147483785]) asserted formulas: #7 #27 current assignment: #7: (select a1 true) expression -> bool_var: (#1 -> p!0) (#7 -> p!1) expression -> enode: (#1 -> e!0) (#2 -> e!1) (#5 -> e!2) (#7 -> e!3) relevant exprs: #7 #1 #5 Theory array: v0 #5 -> #5 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {#7 #7} maps: {} p_parent_maps: {} p_const: {} v1 #7 -> #7 is_array: 0 is_select: 1 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} recfun{}decl2enodes: id 131 -> #7 hot bool vars: -------------------------- Logical context: scope-lvl: 0 base-lvl: 0 search-lvl: 0 inconsistent(): 0 m_asserted_formulas.inconsistent(): 0 #1 := true #5 := a1 #7 := (select a1 true) #26 := as-array[#2147483785] #6 := a2 #27 := (= a2 as-array[#2147483785]) #2 := false asserted formulas: #7 #27 current assignment: #7: (select a1 true) #27: (= a2 (_ as-array k!0)) equivalence classes: #6 -> #26: a2 -> (_ as-array k!0) expression -> bool_var: (#1 -> p!0) (#7 -> p!1) (#27 -> p!2) expression -> enode: (#1 -> e!0) (#2 -> e!1) (#5 -> e!2) (#7 -> e!3) (#6 -> e!4) (#26 -> e!5) (#27 -> e!6) relevant exprs: #7 #1 #5 #27 #26 #6 Theory array: v0 #5 -> #5 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {#7 #7} maps: {} p_parent_maps: {} p_const: {} v1 #7 -> #7 is_array: 0 is_select: 1 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} v2 #6 -> #6 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} v3 #26 -> #6 is_array: 1 is_select: 0 upward: 0 stores: {} p_stores: {} p_selects: {} maps: {} p_parent_maps: {} p_const: {} recfun{}decl2enodes: id 131 -> #7 hot bool vars: -------------------------- unknown PASS (test model_retrieval :time 0.00 :before-memory 4.68 :after-memory 4.68) - <= 0; value: 0 + v0 -2*v2 <= 0; value: -4 + v1 -2*v2 + 1 <= 0; value: -4 + 3*v2 -4*v4 <= 0; value: -11 + 3*v2 -5*v3 + 1 <= 0; value: -10 + 3*v2 -6*v5 + 1 <= 0; value: -26 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 + 1 / 2 - <= 0; value: 0 - v0 -2*v2 <= 0; value: -4 + -1*v0 + v1 + 1 <= 0; value: 0 + 3*v0 -8*v4 + 2 <= 0; value: -32 + 3*v0 -10*v3 + 4 <= 0; value: -30 + 3*v0 -12*v5 + 4 <= 0; value: -62 0: 1 3 4 5 2 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v1 + 1 - <= 0; value: 0 - v0 -2*v2 <= 0; value: -4 - -1*v0 + v1 + 1 <= 0; value: 0 + 3*v1 -8*v4 + 5 <= 0; value: -32 + 3*v1 -10*v3 + 7 <= 0; value: -30 + 3*v1 -12*v5 + 7 <= 0; value: -62 0: 1 3 4 5 2 1: 2 3 4 5 2: 1 2 3 4 5 3: 4 4: 3 5: 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 5*v2 -31 < 0; value: -1 + -1*v1 + 4*v2 + 2*v3 -45 <= 0; value: -26 + 5*v1 + v3 -42 <= 0; value: -13 + -3*v2 -9 < 0; value: -21 + v3 -4 = 0; value: 0 0: 1: 1 2 3 2: 1 2 4 3: 2 3 5 optimal: oo + 2*v0 + 98 < 0; value: 108 + -144 < 0; value: -144 - -1*v1 + 4*v2 + 2*v3 -45 <= 0; value: 0 + -283 < 0; value: -283 - -3*v2 -9 < 0; value: -3 - v3 -4 = 0; value: 0 0: 1: 1 2 3 2: 1 2 4 3 3: 2 3 5 1 0: 5 -> 5 1: 5 -> -45 2: 4 -> -2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -3*v2 -4*v3 + 11 <= 0; value: -2 + 3*v0 + 5*v2 -43 <= 0; value: -16 + -6*v1 + 4*v3 + 14 = 0; value: 0 + 3*v0 + 2*v3 -25 <= 0; value: -11 + 4*v2 -19 < 0; value: -7 0: 2 4 1: 3 2: 1 2 5 3: 1 3 4 optimal: (37/4 -e*1) + + 37/4 < 0; value: 37/4 - -3*v2 -4*v3 + 11 <= 0; value: 0 - 3*v0 -77/4 <= 0; value: 0 - -6*v1 + 4*v3 + 14 = 0; value: 0 + -59/8 < 0; value: -59/8 - 4*v2 -19 < 0; value: -7/2 0: 2 4 1: 3 2: 1 2 5 4 3: 1 3 4 0: 4 -> 77/12 1: 3 -> 107/48 2: 3 -> 31/8 3: 1 -> -5/32 + 2*v0 -2*v1 <= 0; value: 0 + = 0; value: 0 + -5*v0 -5*v1 <= 0; value: 0 + 5*v2 -1*v3 -27 <= 0; value: -14 + v2 -8 <= 0; value: -5 + -1*v1 <= 0; value: 0 0: 2 1: 2 5 2: 3 4 3: 3 optimal: 0 + <= 0; value: 0 + = 0; value: 0 - -5*v0 -5*v1 <= 0; value: 0 + 5*v2 -1*v3 -27 <= 0; value: -14 + v2 -8 <= 0; value: -5 - v0 <= 0; value: 0 0: 2 5 1: 2 5 2: 3 4 3: 3 0: 0 -> 0 1: 0 -> 0 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 5*v2 -77 <= 0; value: -40 + -2*v1 + 3*v2 + 2*v3 -28 <= 0; value: -17 + -5*v0 -6*v1 + 2*v2 -4 <= 0; value: -11 + -4*v0 + v2 -1 <= 0; value: 0 + -2*v2 -6*v3 -6 <= 0; value: -16 0: 3 4 1: 1 2 3 2: 1 2 3 4 5 3: 2 5 optimal: oo + 11/3*v0 + 2*v3 + 10/3 <= 0; value: 7 + -5*v0 -21*v3 -102 <= 0; value: -107 + 5/3*v0 -5*v3 -101/3 <= 0; value: -32 - -5*v0 -6*v1 + 2*v2 -4 <= 0; value: 0 + -4*v0 -3*v3 -4 <= 0; value: -8 - -2*v2 -6*v3 -6 <= 0; value: 0 0: 3 4 2 1 1: 1 2 3 2: 1 2 3 4 5 3: 2 5 1 4 0: 1 -> 1 1: 2 -> -5/2 2: 5 -> -3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 18 = 0; value: 0 + 2*v1 -3*v3 -2 <= 0; value: -1 + 4*v0 -12 = 0; value: 0 + -1*v1 + 2 = 0; value: 0 + 2*v2 -4*v3 -17 < 0; value: -11 0: 1 3 1: 2 4 2: 5 3: 2 5 optimal: 2 + + 2 <= 0; value: 2 - -6*v0 + 18 = 0; value: 0 + -3*v3 + 2 <= 0; value: -1 + = 0; value: 0 - -1*v1 + 2 = 0; value: 0 + 2*v2 -4*v3 -17 < 0; value: -11 0: 1 3 1: 2 4 2: 5 3: 2 5 0: 3 -> 3 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v0 -3*v2 + 2 <= 0; value: -3 + v1 + 2*v2 -4*v3 -2 <= 0; value: 0 + -1*v0 + 1 <= 0; value: -3 + -2*v1 + v3 + 4 <= 0; value: -2 + -3*v0 + 4*v1 -5 <= 0; value: -1 0: 1 3 5 1: 2 4 5 2: 1 2 3: 2 4 optimal: oo + 38/21*v0 -92/21 <= 0; value: 20/7 - v0 -3*v2 + 2 <= 0; value: 0 - 2*v2 -7/2*v3 <= 0; value: 0 + -1*v0 + 1 <= 0; value: -3 - -2*v1 + v3 + 4 <= 0; value: 0 + -55/21*v0 + 79/21 <= 0; value: -47/7 0: 1 3 5 1: 2 4 5 2: 1 2 5 3: 2 4 5 0: 4 -> 4 1: 4 -> 18/7 2: 3 -> 2 3: 2 -> 8/7 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 -18 = 0; value: 0 + -1*v2 + 4*v3 + 3 <= 0; value: -1 + <= 0; value: 0 + 4*v1 -18 < 0; value: -6 + -5*v1 -6*v2 -15 <= 0; value: -54 0: 1: 1 4 5 2: 2 5 3: 2 optimal: oo + 2*v0 -6 <= 0; value: -2 - 6*v1 -18 = 0; value: 0 + -1*v2 + 4*v3 + 3 <= 0; value: -1 + <= 0; value: 0 + -6 < 0; value: -6 + -6*v2 -30 <= 0; value: -54 0: 1: 1 4 5 2: 2 5 3: 2 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -3*v2 + 4 < 0; value: -1 + v0 + v2 + 5*v3 -19 <= 0; value: -12 + -5*v1 + v2 -5 < 0; value: -25 + 4*v0 + 4*v1 -3*v3 -28 = 0; value: 0 + 3*v3 <= 0; value: 0 0: 1 2 4 1: 3 4 2: 1 2 3 3: 2 4 5 optimal: (46/5 -e*1) + + 46/5 < 0; value: 46/5 - 5*v0 -3*v2 + 4 < 0; value: -3 + -11/5 <= 0; value: -11/5 - 5*v0 + v2 -15/4*v3 -40 < 0; value: -17/6 - 4*v0 + 4*v1 -3*v3 -28 = 0; value: 0 - 16/3*v0 -464/15 < 0; value: -16/3 0: 1 2 4 3 5 1: 3 4 2: 1 2 3 5 3: 2 4 5 3 0: 2 -> 24/5 1: 5 -> 49/30 2: 5 -> 31/3 3: 0 -> -34/45 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 4*v1 -21 < 0; value: -7 + -6*v0 -6*v3 + 30 = 0; value: 0 + -6*v1 + 3*v2 + v3 -7 = 0; value: 0 + 4*v2 -2*v3 -19 <= 0; value: -7 + -5*v0 + 1 <= 0; value: -4 0: 1 2 5 1: 1 3 2: 3 4 3: 2 3 4 optimal: oo + 7/3*v0 -1*v2 + 2/3 <= 0; value: -2 + 16/3*v0 + 2*v2 -67/3 < 0; value: -7 - -6*v0 -6*v3 + 30 = 0; value: 0 - -6*v1 + 3*v2 + v3 -7 = 0; value: 0 + 2*v0 + 4*v2 -29 <= 0; value: -7 + -5*v0 + 1 <= 0; value: -4 0: 1 2 5 4 1: 1 3 2: 3 4 1 3: 2 3 4 1 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 -44 <= 0; value: -24 + 4*v2 + v3 -18 <= 0; value: 0 + 6*v0 -4*v2 + 3*v3 + 2 < 0; value: -2 + v3 -5 <= 0; value: -3 + -3*v1 + 2 <= 0; value: -4 0: 3 1: 1 5 2: 1 2 3 3: 2 3 4 optimal: oo + 4/3*v2 -1*v3 -2 < 0; value: 4/3 + 4*v2 -128/3 <= 0; value: -80/3 + 4*v2 + v3 -18 <= 0; value: 0 - 6*v0 -4*v2 + 3*v3 + 2 < 0; value: -1 + v3 -5 <= 0; value: -3 - -3*v1 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 3 3: 2 3 4 0: 1 -> 7/6 1: 2 -> 2/3 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v3 -18 = 0; value: 0 + -2*v1 -1*v2 -2 < 0; value: -7 + 2*v0 -5*v1 -6*v2 + 14 <= 0; value: -1 + = 0; value: 0 + 3*v0 -4*v3 <= 0; value: 0 0: 3 5 1: 2 3 2: 2 3 3: 1 5 optimal: (124/7 -e*1) + + 124/7 < 0; value: 124/7 - 6*v3 -18 = 0; value: 0 - -4/5*v0 + 7/5*v2 -38/5 < 0; value: -7/5 - 2*v0 -5*v1 -6*v2 + 14 <= 0; value: 0 + = 0; value: 0 - 3*v0 -4*v3 <= 0; value: 0 0: 3 5 2 1: 2 3 2: 2 3 3: 1 5 0: 4 -> 4 1: 1 -> -128/35 2: 3 -> 47/7 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -1*v2 -6*v3 + 18 = 0; value: 0 + -6*v1 + 7 <= 0; value: -5 + -1*v0 + v1 + 4*v2 -3 <= 0; value: -1 + -3*v3 + 3 <= 0; value: -6 + 4*v2 -5*v3 + 10 <= 0; value: -5 0: 1 3 1: 2 3 2: 1 3 5 3: 1 4 5 optimal: 131/12 + + 131/12 <= 0; value: 131/12 - -2*v0 -1*v2 -6*v3 + 18 = 0; value: 0 - -6*v1 + 7 <= 0; value: 0 + -323/24 <= 0; value: -323/24 - -12/5*v2 -3 <= 0; value: 0 - 4*v2 -5*v3 + 10 <= 0; value: 0 0: 1 3 1: 2 3 2: 1 3 5 4 3: 1 4 5 3 0: 0 -> 53/8 1: 2 -> 7/6 2: 0 -> -5/4 3: 3 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 + v3 -1 <= 0; value: 0 + 5*v0 + 4*v1 -10 = 0; value: 0 + -2*v1 + 3*v3 -3 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + -1*v2 -2*v3 + 4 = 0; value: 0 0: 2 4 1: 1 2 3 2: 4 5 3: 1 3 5 optimal: 4 + + 4 <= 0; value: 4 + <= 0; value: 0 - 5*v0 + 4*v1 -10 = 0; value: 0 - -1/3*v3 + 1/3 <= 0; value: 0 - 3*v0 -2*v2 -2 = 0; value: 0 - -1*v2 -2*v3 + 4 = 0; value: 0 0: 2 4 3 1 1: 1 2 3 2: 4 5 3 1 3: 1 3 5 0: 2 -> 2 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 + 3*v2 + 18 = 0; value: 0 + 3*v0 -6*v1 -6*v2 + 14 < 0; value: -28 + -4*v0 -1*v3 + 19 = 0; value: 0 + -5*v1 -3*v3 + 34 = 0; value: 0 + v0 + 3*v3 -13 = 0; value: 0 0: 2 3 5 1: 1 2 4 2: 1 2 3: 3 4 5 optimal: -2 + -2 <= 0; value: -2 - -6*v1 + 3*v2 + 18 = 0; value: 0 + -28 < 0; value: -28 - -4*v0 -1*v3 + 19 = 0; value: 0 - -5/2*v2 -3*v3 + 19 = 0; value: 0 - -11*v0 + 44 = 0; value: 0 0: 2 3 5 1: 1 2 4 2: 1 2 4 3: 3 4 5 2 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 + 5*v3 -30 <= 0; value: -10 + 5*v1 -3*v2 + 5*v3 -20 = 0; value: 0 + -5*v2 + 2*v3 -8 <= 0; value: 0 + 3*v0 -1*v1 -3 <= 0; value: 0 + -2*v1 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 3: 1 2 3 optimal: 2 + + 2 <= 0; value: 2 + -10 <= 0; value: -10 - 5*v1 -3*v2 + 5*v3 -20 = 0; value: 0 - -5*v2 + 2*v3 -8 <= 0; value: 0 - 3*v0 + 19/10*v2 -3 <= 0; value: 0 - -6*v0 + 6 = 0; value: 0 0: 4 5 1 1: 1 2 4 5 2: 2 3 4 5 1 3: 1 2 3 4 5 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -3*v2 + 6*v3 -66 < 0; value: -39 + -4*v0 -1*v1 + 6*v3 = 0; value: 0 + 5*v1 -2*v3 + 4 <= 0; value: 0 + 4*v0 -17 < 0; value: -5 + 5*v0 + 3*v3 -45 <= 0; value: -24 0: 1 2 4 5 1: 2 3 2: 1 3: 1 2 3 5 optimal: oo + 10*v0 -12*v3 <= 0; value: 6 + 6*v0 -3*v2 + 6*v3 -66 < 0; value: -39 - -4*v0 -1*v1 + 6*v3 = 0; value: 0 + -20*v0 + 28*v3 + 4 <= 0; value: 0 + 4*v0 -17 < 0; value: -5 + 5*v0 + 3*v3 -45 <= 0; value: -24 0: 1 2 4 5 3 1: 2 3 2: 1 3: 1 2 3 5 0: 3 -> 3 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -1*v2 + v3 -17 <= 0; value: -9 + -6*v0 -4*v2 -18 < 0; value: -52 + -1*v1 <= 0; value: -4 + 3*v1 + 2*v2 -20 = 0; value: 0 + 3*v0 -5*v2 -1*v3 -3 <= 0; value: -17 0: 1 2 5 1: 3 4 2: 1 2 4 5 3: 1 5 optimal: 80/3 + + 80/3 <= 0; value: 80/3 - 3*v0 + v3 -27 <= 0; value: 0 + -138 < 0; value: -138 - 2/3*v2 -20/3 <= 0; value: 0 - 3*v1 + 2*v2 -20 = 0; value: 0 - -2*v3 -26 <= 0; value: 0 0: 1 2 5 1: 3 4 2: 1 2 4 5 3 3: 1 5 2 0: 3 -> 40/3 1: 4 -> 0 2: 4 -> 10 3: 3 -> -13 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 + v2 -50 <= 0; value: -26 + v0 -6*v1 -4 = 0; value: 0 + 3*v0 -5*v2 -4 < 0; value: -12 + -1*v0 -6*v1 <= 0; value: -4 + v2 -2*v3 + 1 < 0; value: -3 0: 1 2 3 4 1: 2 4 2: 1 3 5 3: 5 optimal: (691/42 -e*1) + + 691/42 < 0; value: 691/42 - 28/3*v2 -130/3 <= 0; value: 0 - v0 -6*v1 -4 = 0; value: 0 - 3*v0 -5*v2 -4 < 0; value: -3 + -99/7 < 0; value: -99/7 + -2*v3 + 79/14 < 0; value: -33/14 0: 1 2 3 4 1: 2 4 2: 1 3 5 4 3: 5 0: 4 -> 113/14 1: 0 -> 19/28 2: 4 -> 65/14 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 -2*v2 -10 <= 0; value: -26 + -4*v1 -6*v3 -10 < 0; value: -36 + -4*v0 + 3*v3 -5 = 0; value: 0 + 5*v0 + 4*v1 -1*v2 -18 <= 0; value: -7 + -3*v0 -4*v1 + 2*v3 -3 <= 0; value: -8 0: 3 4 5 1: 1 2 4 5 2: 1 4 3: 2 3 5 optimal: oo + 13/28*v2 + 225/28 <= 0; value: 251/28 + -53/28*v2 -241/28 <= 0; value: -347/28 + -23/14*v2 -691/14 < 0; value: -737/14 - -4*v0 + 3*v3 -5 = 0; value: 0 - 14/3*v0 -1*v2 -53/3 <= 0; value: 0 - -3*v0 -4*v1 + 2*v3 -3 <= 0; value: 0 0: 3 4 5 2 1 1: 1 2 4 5 2: 1 4 2 3: 2 3 5 1 4 0: 1 -> 59/14 1: 2 -> -15/56 2: 2 -> 2 3: 3 -> 51/7 + 2*v0 -2*v1 <= 0; value: 6 + 5*v0 + 2*v3 -47 <= 0; value: -19 + 5*v0 -5*v2 -3*v3 -1 < 0; value: -8 + 4*v1 -3*v3 + 8 <= 0; value: 0 + 6*v0 + 3*v3 -81 <= 0; value: -45 + -1*v0 -2*v1 -3*v3 -1 < 0; value: -19 0: 1 2 4 5 1: 3 5 2: 2 3: 1 2 3 4 5 optimal: (103 -e*1) + + 103 < 0; value: 103 - 5*v0 + 2*v3 -47 <= 0; value: 0 + -5*v2 -159 < 0; value: -174 + -349 < 0; value: -349 - -3/2*v0 -21/2 <= 0; value: 0 - -1*v0 -2*v1 -3*v3 -1 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 2 3: 1 2 3 4 5 0: 4 -> -7 1: 1 -> -115/2 2: 3 -> 3 3: 4 -> 41 + 2*v0 -2*v1 <= 0; value: -8 + 3*v0 + 6*v2 -3*v3 + 12 = 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 3*v2 -6*v3 + 24 = 0; value: 0 + 5*v2 -2*v3 -3 <= 0; value: -11 + 6*v1 -32 <= 0; value: -8 0: 1 2 1: 5 2: 1 2 3 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 3*v0 + 6*v2 -3*v3 + 12 = 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 3*v2 -6*v3 + 24 = 0; value: 0 + 5*v2 -2*v3 -3 <= 0; value: -11 + 6*v1 -32 <= 0; value: -8 0: 1 2 1: 5 2: 1 2 3 4 3: 1 3 4 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 3*v3 -11 = 0; value: 0 + v0 + 4*v3 -9 = 0; value: 0 + 5*v0 -2*v1 -4*v2 -8 <= 0; value: -25 + -6*v0 -3*v2 + 16 < 0; value: -2 + 4*v0 + 6*v2 -4*v3 -55 < 0; value: -35 0: 1 2 3 4 5 1: 3 2: 3 4 5 3: 1 2 5 optimal: (133/3 -e*1) + + 133/3 < 0; value: 133/3 - 5*v0 + 3*v3 -11 = 0; value: 0 - -17/3*v0 + 17/3 = 0; value: 0 - 5*v0 -2*v1 -4*v2 -8 <= 0; value: 0 + -39/2 < 0; value: -39/2 - 4*v0 + 6*v2 -4*v3 -55 < 0; value: -6 0: 1 2 3 4 5 1: 3 2: 3 4 5 3: 1 2 5 4 0: 1 -> 1 1: 3 -> -115/6 2: 4 -> 53/6 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -4*v1 + 1 < 0; value: -3 + 4*v2 <= 0; value: 0 + 6*v1 -33 <= 0; value: -9 + -6*v0 + 2*v2 + 7 <= 0; value: -5 + 5*v0 + v1 -38 <= 0; value: -24 0: 1 4 5 1: 1 3 5 2: 2 4 3: optimal: oo + -1/3*v2 -5/3 < 0; value: -5/3 - 6*v0 -4*v1 + 1 < 0; value: -4 + 4*v2 <= 0; value: 0 + 3*v2 -21 < 0; value: -21 - -6*v0 + 2*v2 + 7 <= 0; value: 0 + 13/6*v2 -181/6 < 0; value: -181/6 0: 1 4 5 3 1: 1 3 5 2: 2 4 5 3 3: 0: 2 -> 7/6 1: 4 -> 3 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 + 5 = 0; value: 0 + -3*v0 -5*v2 + 10 < 0; value: -4 + 6*v0 -42 <= 0; value: -24 + 6*v2 + 5*v3 -60 <= 0; value: -39 + 4*v0 + 6*v2 + v3 -52 < 0; value: -31 0: 2 3 5 1: 1 2: 2 4 5 3: 4 5 optimal: 12 + + 12 <= 0; value: 12 - -5*v1 + 5 = 0; value: 0 + -5*v2 -11 < 0; value: -16 - 6*v0 -42 <= 0; value: 0 + 6*v2 + 5*v3 -60 <= 0; value: -39 + 6*v2 + v3 -24 < 0; value: -15 0: 2 3 5 1: 1 2: 2 4 5 3: 4 5 0: 3 -> 7 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -5*v3 + 9 = 0; value: 0 + 3*v2 -4*v3 <= 0; value: 0 + -2*v0 + 2*v2 + 6 = 0; value: 0 + v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 6*v2 -3*v3 -34 < 0; value: -22 0: 1 3 4 5 1: 2: 2 3 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -5*v3 + 9 = 0; value: 0 + 3*v2 -4*v3 <= 0; value: 0 + -2*v0 + 2*v2 + 6 = 0; value: 0 + v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 6*v2 -3*v3 -34 < 0; value: -22 0: 1 3 4 5 1: 2: 2 3 5 3: 1 2 4 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -2*v1 + 4*v2 -34 <= 0; value: -16 + -6*v0 -2*v2 -8 < 0; value: -28 + 4*v0 + 3*v1 -3*v2 -7 <= 0; value: -2 + -2*v1 + 6*v2 -3*v3 -43 <= 0; value: -25 + 3*v1 -12 <= 0; value: -3 0: 1 2 3 1: 1 3 4 5 2: 1 2 3 4 3: 4 optimal: (750 -e*1) + + 750 < 0; value: 750 - 4*v0 -2*v1 + 4*v2 -34 <= 0; value: 0 - -6*v0 -2*v2 -8 < 0; value: -2 - v0 -70 < 0; value: -1 + -3*v3 -717 < 0; value: -717 + -927 < 0; value: -927 0: 1 2 3 4 5 1: 1 3 4 5 2: 1 2 3 4 5 3: 4 0: 2 -> 69 1: 3 -> -299 2: 4 -> -210 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -71 <= 0; value: -40 + 3*v2 + 6*v3 -33 = 0; value: 0 + -3*v0 -4*v1 -3*v2 + 20 < 0; value: -2 + -3*v2 -3*v3 -19 <= 0; value: -43 + 3*v0 + 2*v1 + 5*v3 -20 <= 0; value: 0 0: 3 5 1: 3 5 2: 1 2 3 4 3: 1 2 4 5 optimal: (335/3 -e*1) + + 335/3 < 0; value: 335/3 - -8*v3 -16 <= 0; value: 0 - 3*v2 + 6*v3 -33 = 0; value: 0 - -3*v0 -4*v1 -3*v2 + 20 < 0; value: -4 + -58 <= 0; value: -58 - 3/2*v0 -85/2 < 0; value: -3/2 0: 3 5 1: 3 5 2: 1 2 3 4 5 3: 1 2 4 5 0: 1 -> 82/3 1: 1 -> -103/4 2: 5 -> 15 3: 3 -> -2 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 3*v1 + 1 <= 0; value: 0 + 6*v0 -3*v1 + 5*v3 -35 < 0; value: -9 + 2*v0 + v1 + 6*v3 -15 <= 0; value: 0 + -5*v0 + 5*v1 + 2*v2 -6 < 0; value: -13 + 5*v0 + 6*v3 -55 <= 0; value: -29 0: 1 2 3 4 5 1: 1 2 3 4 2: 4 3: 2 3 5 optimal: oo + -2*v0 -10/3*v3 + 70/3 < 0; value: 12 + 5*v0 + 5*v3 -34 < 0; value: -9 - 6*v0 -3*v1 + 5*v3 -35 < 0; value: -3 + 4*v0 + 23/3*v3 -80/3 < 0; value: -3 + 5*v0 + 2*v2 + 25/3*v3 -193/3 < 0; value: -28 + 5*v0 + 6*v3 -55 <= 0; value: -29 0: 1 2 3 4 5 1: 1 2 3 4 2: 4 3: 2 3 5 1 4 0: 4 -> 4 1: 1 -> -1 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 -3*v3 -39 <= 0; value: -22 + 2*v2 -6*v3 -6 <= 0; value: 0 + 6*v0 -2*v3 -39 < 0; value: -15 + -2*v2 + 5*v3 + 3 < 0; value: -3 + -5*v1 + v2 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 4 5 3: 1 2 3 4 optimal: (63/5 -e*1) + + 63/5 < 0; value: 63/5 + -58 < 0; value: -58 - -1*v3 -3 < 0; value: -1 - 6*v0 -33 <= 0; value: 0 - -2*v2 + 5*v3 + 3 < 0; value: -2 - -5*v1 + v2 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 4 5 3: 1 2 3 4 0: 4 -> 11/2 1: 1 -> -1/10 2: 3 -> -5/2 3: 0 -> -2 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 + 3*v1 -4 <= 0; value: -2 + 5*v0 + v1 -6*v3 -13 <= 0; value: -8 + -1*v1 = 0; value: 0 + 4*v1 = 0; value: 0 + -1*v0 -4*v2 + 2*v3 + 1 = 0; value: 0 0: 1 2 5 1: 1 2 3 4 2: 5 3: 2 5 optimal: 4 + + 4 <= 0; value: 4 - -8*v2 + 4*v3 -2 <= 0; value: 0 + -12*v2 -6 <= 0; value: -6 - -1*v1 = 0; value: 0 + = 0; value: 0 - -1*v0 -4*v2 + 2*v3 + 1 = 0; value: 0 0: 1 2 5 1: 1 2 3 4 2: 5 2 1 3: 2 5 1 0: 1 -> 2 1: 0 -> 0 2: 0 -> 0 3: 0 -> 1/2 + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -1*v1 + 5 = 0; value: 0 + 5*v0 -5*v2 -6*v3 -22 <= 0; value: -7 + -4*v0 -1*v2 + 17 < 0; value: -5 + -5*v0 -2*v1 + v2 + 21 <= 0; value: -2 + v0 + 5*v1 + v2 -9 <= 0; value: -2 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 2 optimal: oo + 4*v2 + 24/5*v3 + 38/5 <= 0; value: 78/5 - -1*v0 -1*v1 + 5 = 0; value: 0 - 5*v0 -5*v2 -6*v3 -22 <= 0; value: 0 + -5*v2 -24/5*v3 -3/5 < 0; value: -53/5 + -2*v2 -18/5*v3 -11/5 <= 0; value: -31/5 + -3*v2 -24/5*v3 -8/5 <= 0; value: -38/5 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 2 3 4 5 0: 5 -> 32/5 1: 0 -> -7/5 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 + 1 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -18 < 0; value: -11 + v0 -2*v2 + 4 <= 0; value: -1 + -3*v0 + 6*v3 -59 <= 0; value: -32 + 5*v0 -2*v2 + v3 -6 <= 0; value: -2 0: 2 3 4 5 1: 2 2: 1 2 3 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 + 1 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -18 < 0; value: -11 + v0 -2*v2 + 4 <= 0; value: -1 + -3*v0 + 6*v3 -59 <= 0; value: -32 + 5*v0 -2*v2 + v3 -6 <= 0; value: -2 0: 2 3 4 5 1: 2 2: 1 2 3 5 3: 1 4 5 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + 5*v1 -27 <= 0; value: -15 + -2*v0 -2*v2 + 12 = 0; value: 0 + 6*v0 + v1 + 6*v3 -104 <= 0; value: -65 + v2 + v3 -10 <= 0; value: 0 + -1*v1 + 3*v2 -19 < 0; value: -7 0: 1 2 3 1: 1 3 5 2: 2 4 5 3: 3 4 optimal: oo + -16*v3 + 282 < 0; value: 202 + 36*v3 -662 < 0; value: -482 - -2*v0 -2*v2 + 12 = 0; value: 0 - 3*v0 + 6*v3 -105 < 0; value: -3 + 3*v3 -39 < 0; value: -24 - -1*v1 + 3*v2 -19 < 0; value: -1 0: 1 2 3 4 1: 1 3 5 2: 2 4 5 1 3 3: 3 4 1 0: 1 -> 24 1: 3 -> -72 2: 5 -> -18 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 4*v3 -8 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -2 <= 0; value: 0 + 3*v0 + 3*v2 -4*v3 + 1 <= 0; value: -1 + 2*v1 + 5*v2 -6*v3 <= 0; value: -2 + 3*v1 -3*v3 -3 < 0; value: -9 0: 2 3 1: 1 4 5 2: 2 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 2/3 <= 0; value: 2/3 - 6*v1 + 4*v3 -8 = 0; value: 0 - -1*v0 -1*v2 + 2*v3 -2 <= 0; value: 0 - v0 + v2 -3 <= 0; value: 0 + -5*v0 -2/3 <= 0; value: -2/3 + -23/2 < 0; value: -23/2 0: 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 1 2 3 4 5 0: 0 -> 0 1: 0 -> -1/3 2: 2 -> 3 3: 2 -> 5/2 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v3 -65 <= 0; value: -38 + -5*v0 + 4*v1 -1 <= 0; value: 0 + 5*v3 -34 <= 0; value: -9 + -2*v0 -6*v2 + 36 = 0; value: 0 + -6*v3 + 18 < 0; value: -12 0: 1 2 4 1: 1 2 2: 4 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v3 -65 <= 0; value: -38 + -5*v0 + 4*v1 -1 <= 0; value: 0 + 5*v3 -34 <= 0; value: -9 + -2*v0 -6*v2 + 36 = 0; value: 0 + -6*v3 + 18 < 0; value: -12 0: 1 2 4 1: 1 2 2: 4 3: 1 3 5 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 3*v1 + 3*v2 -38 < 0; value: -23 + -6*v0 -4*v1 -6*v2 + 26 <= 0; value: -2 + -6*v3 + 2 <= 0; value: -4 + -2*v3 + 2 = 0; value: 0 + 6*v0 + 5*v1 -3*v2 -6 <= 0; value: -13 0: 1 2 5 1: 1 2 5 2: 1 2 5 3: 3 4 optimal: oo + 5*v0 + 3*v2 -13 <= 0; value: -1 + 3/2*v0 -3/2*v2 -37/2 < 0; value: -49/2 - -6*v0 -4*v1 -6*v2 + 26 <= 0; value: 0 + -6*v3 + 2 <= 0; value: -4 + -2*v3 + 2 = 0; value: 0 + -3/2*v0 -21/2*v2 + 53/2 <= 0; value: -31/2 0: 1 2 5 1: 1 2 5 2: 1 2 5 3: 3 4 0: 0 -> 0 1: 1 -> 1/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + 6*v1 -6*v3 -13 <= 0; value: -43 + -4*v0 + 8 = 0; value: 0 + -6*v1 -5*v3 + 1 <= 0; value: -30 + 3*v2 -4*v3 -10 < 0; value: -27 + 6*v2 + 2*v3 -24 <= 0; value: -8 0: 1 2 1: 1 3 2: 4 5 3: 1 3 4 5 optimal: oo + 2*v0 -5*v2 + 59/3 <= 0; value: 56/3 + -3*v0 + 33*v2 -144 <= 0; value: -117 + -4*v0 + 8 = 0; value: 0 - -6*v1 -5*v3 + 1 <= 0; value: 0 + 15*v2 -58 < 0; value: -43 - 6*v2 + 2*v3 -24 <= 0; value: 0 0: 1 2 1: 1 3 2: 4 5 1 3: 1 3 4 5 0: 2 -> 2 1: 1 -> -22/3 2: 1 -> 1 3: 5 -> 9 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 -2*v2 -4*v3 -5 <= 0; value: -25 + 2*v0 + 4*v2 -17 <= 0; value: -11 + -3*v0 -4*v1 -6*v3 + 32 < 0; value: -1 + -4*v1 -4*v2 -3 < 0; value: -15 + 5*v0 + 5*v2 + 4*v3 -23 = 0; value: 0 0: 2 3 5 1: 1 3 4 2: 1 2 4 5 3: 1 3 5 optimal: (391/26 -e*1) + + 391/26 < 0; value: 391/26 - 52/23*v0 -582/23 <= 0; value: 0 + -160/13 <= 0; value: -160/13 - -3*v0 -4*v1 -6*v3 + 32 < 0; value: -35/26 - -9/2*v0 -23/2*v2 -1/2 <= 0; value: 0 - 5*v0 + 5*v2 + 4*v3 -23 = 0; value: 0 0: 2 3 5 1 4 1: 1 3 4 2: 1 2 4 5 3: 1 3 5 4 0: 3 -> 291/26 1: 3 -> 417/104 2: 0 -> -115/26 3: 2 -> -141/52 + 2*v0 -2*v1 <= 0; value: -2 + -3*v2 <= 0; value: 0 + 3*v1 -2*v2 -8 <= 0; value: -5 + -4*v0 -2*v3 + 8 <= 0; value: 0 + -3*v0 + 6*v2 = 0; value: 0 + 3*v1 -4*v3 + 8 < 0; value: -5 0: 3 4 1: 2 5 2: 1 2 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -3*v2 <= 0; value: 0 + 3*v1 -2*v2 -8 <= 0; value: -5 + -4*v0 -2*v3 + 8 <= 0; value: 0 + -3*v0 + 6*v2 = 0; value: 0 + 3*v1 -4*v3 + 8 < 0; value: -5 0: 3 4 1: 2 5 2: 1 2 4 3: 3 5 0: 0 -> 0 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 + 2 <= 0; value: -4 + 2*v1 + 2*v3 -50 <= 0; value: -30 + -5*v1 -12 <= 0; value: -37 + -3*v1 -4*v3 + 35 = 0; value: 0 + -5*v0 -1*v3 -6 <= 0; value: -21 0: 1 5 1: 2 3 4 2: 3: 2 4 5 optimal: oo + 2*v0 + 24/5 <= 0; value: 44/5 + -3*v0 + 2 <= 0; value: -4 + -337/10 <= 0; value: -337/10 - 20/3*v3 -211/3 <= 0; value: 0 - -3*v1 -4*v3 + 35 = 0; value: 0 + -5*v0 -331/20 <= 0; value: -531/20 0: 1 5 1: 2 3 4 2: 3: 2 4 5 3 0: 2 -> 2 1: 5 -> -12/5 2: 4 -> 4 3: 5 -> 211/20 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -5*v2 -1*v3 -11 < 0; value: -3 + 3*v0 + 5*v1 -4*v3 -25 <= 0; value: -3 + -1*v0 + 4*v2 + 2 <= 0; value: -2 + -6*v0 + v2 -1*v3 -6 <= 0; value: -30 + -3*v3 <= 0; value: 0 0: 2 3 4 1: 1 2 2: 1 3 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -5*v2 -1*v3 -11 < 0; value: -3 + 3*v0 + 5*v1 -4*v3 -25 <= 0; value: -3 + -1*v0 + 4*v2 + 2 <= 0; value: -2 + -6*v0 + v2 -1*v3 -6 <= 0; value: -30 + -3*v3 <= 0; value: 0 0: 2 3 4 1: 1 2 2: 1 3 4 3: 1 2 4 5 0: 4 -> 4 1: 2 -> 2 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 2*v1 + 2 <= 0; value: -1 + 2*v3 -8 = 0; value: 0 + -3*v0 + 4*v1 -2*v3 + 9 <= 0; value: -8 + 4*v1 -1*v2 -4*v3 -8 < 0; value: -27 + -5*v0 -4*v1 + 2 < 0; value: -13 0: 1 3 5 1: 1 3 4 5 2: 4 3: 2 3 4 optimal: oo + 9/2*v0 -1 < 0; value: 25/2 + -7/2*v0 + 3 < 0; value: -15/2 + 2*v3 -8 = 0; value: 0 + -8*v0 -2*v3 + 11 < 0; value: -21 + -5*v0 -1*v2 -4*v3 -6 < 0; value: -40 - -5*v0 -4*v1 + 2 < 0; value: -4 0: 1 3 5 4 1: 1 3 4 5 2: 4 3: 2 3 4 0: 3 -> 3 1: 0 -> -9/4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 -4*v2 -4*v3 -1 <= 0; value: -21 + <= 0; value: 0 + -5*v0 -3*v1 + 2*v2 -4 <= 0; value: -16 + v0 + 6*v1 -40 < 0; value: -16 + -2*v2 + 3*v3 -37 <= 0; value: -22 0: 1 3 4 1: 3 4 2: 1 3 5 3: 1 5 optimal: oo + 68/15*v0 + 191/15 <= 0; value: 191/15 - 4*v0 -4*v2 -4*v3 -1 <= 0; value: 0 + <= 0; value: 0 - -5*v0 -3*v1 + 2*v2 -4 <= 0; value: 0 + -33/5*v0 -391/5 < 0; value: -391/5 - -2*v0 + 5*v3 -73/2 <= 0; value: 0 0: 1 3 4 5 1: 3 4 2: 1 3 5 4 3: 1 5 4 0: 0 -> 0 1: 4 -> -191/30 2: 0 -> -151/20 3: 5 -> 73/10 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 + 4*v3 -26 <= 0; value: -16 + -2*v0 -5*v2 -1*v3 + 16 <= 0; value: -2 + 2*v0 + 4*v1 -75 <= 0; value: -49 + v1 -4*v2 -2*v3 -1 <= 0; value: -8 + -5*v0 + 3*v1 -4*v3 + 6 <= 0; value: -2 0: 1 2 3 5 1: 3 4 5 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 + 4*v3 -26 <= 0; value: -16 + -2*v0 -5*v2 -1*v3 + 16 <= 0; value: -2 + 2*v0 + 4*v1 -75 <= 0; value: -49 + v1 -4*v2 -2*v3 -1 <= 0; value: -8 + -5*v0 + 3*v1 -4*v3 + 6 <= 0; value: -2 0: 1 2 3 5 1: 3 4 5 2: 1 2 4 3: 1 2 4 5 0: 3 -> 3 1: 5 -> 5 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 6*v1 -7 <= 0; value: -19 + -1*v1 -6*v2 + 2 <= 0; value: -16 + -4*v2 + 3*v3 -2 <= 0; value: -5 + -6*v1 -5*v2 -5*v3 + 3 < 0; value: -27 + 3*v0 + 4*v2 -43 < 0; value: -22 0: 1 5 1: 1 2 4 2: 2 3 4 5 3: 3 4 optimal: oo + -11/12*v0 + 503/12 < 0; value: 235/6 + 19/4*v0 -531/4 < 0; value: -237/2 + 73/24*v0 -997/24 < 0; value: -389/12 - -4*v2 + 3*v3 -2 <= 0; value: 0 - -6*v1 -5*v2 -5*v3 + 3 < 0; value: -6 - 3*v0 + 4*v2 -43 < 0; value: -4 0: 1 5 2 1: 1 2 4 2: 2 3 4 5 1 3: 3 4 2 1 0: 3 -> 3 1: 0 -> -491/36 2: 3 -> 15/2 3: 3 -> 32/3 + 2*v0 -2*v1 <= 0; value: 6 + -6*v2 + 6*v3 <= 0; value: 0 + -2*v0 + 3*v2 -14 <= 0; value: -8 + -5*v1 -5*v2 -13 <= 0; value: -33 + -4*v1 <= 0; value: 0 + v2 -4 <= 0; value: 0 0: 2 1: 3 4 2: 1 2 3 5 3: 1 optimal: oo + 2*v0 <= 0; value: 6 + -6*v2 + 6*v3 <= 0; value: 0 + -2*v0 + 3*v2 -14 <= 0; value: -8 + -5*v2 -13 <= 0; value: -33 - -4*v1 <= 0; value: 0 + v2 -4 <= 0; value: 0 0: 2 1: 3 4 2: 1 2 3 5 3: 1 0: 3 -> 3 1: 0 -> 0 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 5*v1 -5 <= 0; value: -3 + -4*v0 -3*v1 -1*v3 + 16 = 0; value: 0 + 3*v0 + v3 -24 <= 0; value: -14 + 6*v2 + 6*v3 -33 < 0; value: -21 + 3*v0 -4*v1 -5*v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2 5 2: 4 3: 2 3 4 5 optimal: (592/29 -e*1) + + 592/29 < 0; value: 592/29 + -969/29 < 0; value: -969/29 - -4*v0 -3*v1 -1*v3 + 16 = 0; value: 0 - 3*v0 -1*v2 -37/2 <= 0; value: 0 - 6*v2 + 6*v3 -33 < 0; value: -6 - 58/3*v0 -328/3 < 0; value: -58/3 0: 1 2 3 5 1: 1 2 5 2: 4 3 5 1 3: 2 3 4 5 1 0: 3 -> 135/29 1: 1 -> -338/87 2: 1 -> -263/58 3: 1 -> 262/29 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -4*v2 <= 0; value: 0 + 2*v2 + 6*v3 <= 0; value: 0 + -6*v0 -6*v2 <= 0; value: 0 + -3*v1 = 0; value: 0 + -2*v1 <= 0; value: 0 0: 1 3 1: 4 5 2: 1 2 3 3: 2 optimal: oo + 2*v0 <= 0; value: 0 + -6*v0 -4*v2 <= 0; value: 0 + 2*v2 + 6*v3 <= 0; value: 0 + -6*v0 -6*v2 <= 0; value: 0 - -3*v1 = 0; value: 0 + <= 0; value: 0 0: 1 3 1: 4 5 2: 1 2 3 3: 2 0: 0 -> 0 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -1*v2 + 1 <= 0; value: 0 + -6*v1 -6*v3 + 54 = 0; value: 0 + 2*v2 -5 <= 0; value: -3 + -4*v2 -5*v3 + 9 <= 0; value: -15 + 3*v0 + 2*v1 -12 <= 0; value: -2 0: 5 1: 2 5 2: 1 3 4 3: 2 4 optimal: oo + 2*v0 + 2*v3 -18 <= 0; value: -10 + -1*v2 + 1 <= 0; value: 0 - -6*v1 -6*v3 + 54 = 0; value: 0 + 2*v2 -5 <= 0; value: -3 + -4*v2 -5*v3 + 9 <= 0; value: -15 + 3*v0 -2*v3 + 6 <= 0; value: -2 0: 5 1: 2 5 2: 1 3 4 3: 2 4 5 0: 0 -> 0 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 6*v1 -10 <= 0; value: -1 + 4*v0 + v1 -4*v3 + 1 = 0; value: 0 + -4*v0 -1*v1 + 5*v3 -13 <= 0; value: -8 + -2*v0 -4*v1 + 15 <= 0; value: -3 + -1*v1 -6*v3 + 27 = 0; value: 0 0: 1 2 3 4 1: 1 2 3 4 5 2: 3: 2 3 5 optimal: 51/19 + + 51/19 <= 0; value: 51/19 + -299/38 <= 0; value: -299/38 - 4*v0 + v1 -4*v3 + 1 = 0; value: 0 + -149/19 <= 0; value: -149/19 - 38/5*v0 -129/5 <= 0; value: 0 - 4*v0 -10*v3 + 28 = 0; value: 0 0: 1 2 3 4 5 3 1: 1 2 3 4 5 2: 3: 2 3 5 4 1 0: 3 -> 129/38 1: 3 -> 39/19 2: 5 -> 5 3: 4 -> 79/19 + 2*v0 -2*v1 <= 0; value: -10 + 5*v0 <= 0; value: 0 + 2*v0 + 2*v1 -2*v2 -21 < 0; value: -13 + -4*v0 -6*v1 -14 <= 0; value: -44 + 4*v1 -6*v2 -36 < 0; value: -22 + 5*v1 + 4*v2 -29 = 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 2 4 5 3: optimal: 14/3 + + 14/3 <= 0; value: 14/3 - 5*v0 <= 0; value: 0 + -46 < 0; value: -46 - -4*v0 + 24/5*v2 -244/5 <= 0; value: 0 + -319/3 < 0; value: -319/3 - 5*v1 + 4*v2 -29 = 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 2 4 5 3 3: 0: 0 -> 0 1: 5 -> -7/3 2: 1 -> 61/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + v0 + 2*v2 + 3*v3 -11 = 0; value: 0 + 2*v0 + v3 -16 <= 0; value: -10 + 5*v1 + 4*v2 -21 = 0; value: 0 + 6*v1 -14 < 0; value: -8 + -1*v1 + 5*v2 -56 <= 0; value: -37 0: 1 2 1: 3 4 5 2: 1 3 5 3: 1 2 optimal: 908/29 + + 908/29 <= 0; value: 908/29 - v0 + 2*v2 + 3*v3 -11 = 0; value: 0 - 5/3*v0 -1675/87 <= 0; value: 0 - 5*v1 + 4*v2 -21 = 0; value: 0 + -1120/29 < 0; value: -1120/29 - -29/10*v0 -87/10*v3 -283/10 <= 0; value: 0 0: 1 2 5 4 1: 3 4 5 2: 1 3 5 4 3: 1 2 5 4 0: 3 -> 335/29 1: 1 -> -119/29 2: 4 -> 301/29 3: 0 -> -206/29 + 2*v0 -2*v1 <= 0; value: 2 + -1*v1 + 4*v3 -15 <= 0; value: -7 + -4*v1 + 6*v2 -1*v3 -16 = 0; value: 0 + -5*v0 + 2*v1 -1*v2 + 8 = 0; value: 0 + -2*v0 -4*v3 -3 < 0; value: -13 + 6*v0 + 2*v2 -3*v3 -17 <= 0; value: -11 0: 3 4 5 1: 1 2 3 2: 2 3 5 3: 1 2 4 5 optimal: (1941/91 -e*1) + + 1941/91 < 0; value: 1941/91 - -91/16*v0 -445/32 < 0; value: -91/16 - -4*v1 + 6*v2 -1*v3 -16 = 0; value: 0 - -5*v0 + 2*v2 -1/2*v3 = 0; value: 0 - 38*v0 -16*v2 -3 < 0; value: -16 + -586/13 < 0; value: -586/13 0: 3 4 5 1 1: 1 2 3 2: 2 3 5 1 4 3: 1 2 4 5 3 0: 1 -> -263/182 1: 0 -> -12991/1456 2: 3 -> -1907/728 3: 2 -> 723/182 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 -6*v3 -18 = 0; value: 0 + -1*v0 -3*v2 + 14 <= 0; value: -5 + -4*v3 + 4 <= 0; value: -4 + 4*v0 -5*v1 -4*v3 + 17 = 0; value: 0 + 6*v0 -4*v1 + 3*v2 -54 <= 0; value: -35 0: 2 4 5 1: 1 4 5 2: 2 5 3: 1 3 4 optimal: 342/29 + + 342/29 <= 0; value: 342/29 - 6*v1 -6*v3 -18 = 0; value: 0 - -87/38*v2 -35/19 <= 0; value: 0 + -756/29 <= 0; value: -756/29 - 4*v0 -9*v3 + 2 = 0; value: 0 - 38/9*v0 + 3*v2 -602/9 <= 0; value: 0 0: 2 4 5 3 1: 1 4 5 2: 2 5 3 3: 1 3 4 5 0: 4 -> 476/29 1: 5 -> 305/29 2: 5 -> -70/87 3: 2 -> 218/29 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + 2*v2 + 2*v3 -29 = 0; value: 0 + 3*v0 -1*v2 -11 = 0; value: 0 + -2*v1 -3*v3 -7 <= 0; value: -26 + 4*v2 -38 <= 0; value: -22 + -5*v2 + 8 <= 0; value: -12 0: 1 2 1: 3 2: 1 2 4 5 3: 1 3 optimal: 176/5 + + 176/5 <= 0; value: 176/5 - 3*v0 + 2*v2 + 2*v3 -29 = 0; value: 0 - 3*v0 -1*v2 -11 = 0; value: 0 - -2*v1 -3*v3 -7 <= 0; value: 0 + -158/5 <= 0; value: -158/5 - -15*v0 + 63 <= 0; value: 0 0: 1 2 5 4 1: 3 2: 1 2 4 5 3: 1 3 0: 5 -> 21/5 1: 5 -> -67/5 2: 4 -> 8/5 3: 3 -> 33/5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -15 <= 0; value: -9 + 6*v0 -6*v2 + 1 <= 0; value: -5 + -5*v1 + 2*v3 -2 < 0; value: -7 + 4*v1 -5*v2 -6 < 0; value: -19 + -4*v0 -4*v1 + 28 = 0; value: 0 0: 2 5 1: 1 3 4 5 2: 2 4 3: 3 optimal: oo + -8/5*v3 + 78/5 < 0; value: 38/5 + 4/5*v3 -79/5 < 0; value: -59/5 - 6*v0 -6*v2 + 1 <= 0; value: 0 - 5*v2 + 2*v3 -227/6 < 0; value: -17/12 + 18/5*v3 -1363/30 < 0; value: -823/30 - -4*v0 -4*v1 + 28 = 0; value: 0 0: 2 5 3 1 4 1: 1 3 4 5 2: 2 4 3 1 3: 3 4 1 0: 4 -> 307/60 1: 3 -> 113/60 2: 5 -> 317/60 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + v1 -1 = 0; value: 0 + -3*v3 + 6 <= 0; value: 0 + -4*v0 -5*v2 -4 <= 0; value: -14 + 2*v0 -6*v1 -5*v3 + 3 <= 0; value: -13 + -2*v1 + 2 = 0; value: 0 0: 1 3 4 1: 1 4 5 2: 3 3: 2 4 optimal: -2 + -2 <= 0; value: -2 - -2*v0 + v1 -1 = 0; value: 0 + -3*v3 + 6 <= 0; value: 0 + -5*v2 -4 <= 0; value: -14 + -5*v3 -3 <= 0; value: -13 - -4*v0 = 0; value: 0 0: 1 3 4 5 1: 1 4 5 2: 3 3: 2 4 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v2 + 6 < 0; value: -2 + -1*v1 -1*v3 -1 <= 0; value: -5 + v1 + 3*v3 -19 <= 0; value: -7 + -5*v0 + 4*v2 -44 <= 0; value: -28 + -2*v1 + 6*v2 -24 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 4 5 3: 2 3 optimal: oo + 2*v0 + 22 <= 0; value: 22 + -116/3 < 0; value: -116/3 - -3*v2 -1*v3 + 11 <= 0; value: 0 - 2*v3 -20 <= 0; value: 0 + -5*v0 -128/3 <= 0; value: -128/3 - -2*v1 + 6*v2 -24 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 4 5 2 3 3: 2 3 1 4 0: 0 -> 0 1: 0 -> -11 2: 4 -> 1/3 3: 4 -> 10 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 -4*v2 -6*v3 -55 < 0; value: -113 + 6*v0 + 5*v1 -40 <= 0; value: -16 + 6*v0 -4*v3 -8 <= 0; value: -4 + 6*v1 -1*v3 -4 <= 0; value: -9 + -3*v1 + v3 -5 = 0; value: 0 0: 1 2 3 1: 2 4 5 2: 1 3: 1 3 4 5 optimal: 548/51 + + 548/51 <= 0; value: 548/51 + -4*v2 -5603/51 < 0; value: -6623/51 - 17/2*v0 -155/3 <= 0; value: 0 - 6*v0 -4*v3 -8 <= 0; value: 0 + -117/17 <= 0; value: -117/17 - -3*v1 + v3 -5 = 0; value: 0 0: 1 2 3 4 1: 2 4 5 2: 1 3: 1 3 4 5 2 0: 4 -> 310/51 1: 0 -> 12/17 2: 5 -> 5 3: 5 -> 121/17 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v2 + 4*v3 -34 = 0; value: 0 + 3*v0 + 2*v3 -49 <= 0; value: -30 + 2*v0 + 5*v1 -1*v2 -25 = 0; value: 0 + 4*v2 + 5*v3 -48 <= 0; value: -19 + v0 -6*v1 -5*v2 -7 <= 0; value: -33 0: 1 2 3 5 1: 3 5 2: 1 3 4 5 3: 1 2 4 optimal: 1628/17 + + 1628/17 <= 0; value: 1628/17 - 6*v0 -4*v2 + 4*v3 -34 = 0; value: 0 - 34/31*v0 -1362/31 <= 0; value: 0 - 2*v0 + 5*v1 -1*v2 -25 = 0; value: 0 + -2753/17 <= 0; value: -2753/17 - -59/10*v0 -31/5*v3 + 157/10 <= 0; value: 0 0: 1 2 3 5 4 1: 3 5 2: 1 3 4 5 3: 1 2 4 5 0: 3 -> 681/17 1: 4 -> -133/17 2: 1 -> 16 3: 5 -> -605/17 + 2*v0 -2*v1 <= 0; value: 10 + -6*v0 -3*v3 -9 <= 0; value: -42 + -2*v0 + 8 < 0; value: -2 + -5*v0 -5*v1 -2*v3 + 27 = 0; value: 0 + 6*v0 + v2 -60 < 0; value: -25 + 6*v0 + 3*v2 -85 <= 0; value: -40 0: 1 2 3 4 5 1: 3 2: 4 5 3: 1 3 optimal: oo + 4*v0 + 4/5*v3 -54/5 <= 0; value: 10 + -6*v0 -3*v3 -9 <= 0; value: -42 + -2*v0 + 8 < 0; value: -2 - -5*v0 -5*v1 -2*v3 + 27 = 0; value: 0 + 6*v0 + v2 -60 < 0; value: -25 + 6*v0 + 3*v2 -85 <= 0; value: -40 0: 1 2 3 4 5 1: 3 2: 4 5 3: 1 3 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -4*v3 -7 <= 0; value: -22 + <= 0; value: 0 + -1*v0 -4*v2 + 13 = 0; value: 0 + 6*v1 -5*v2 + 4*v3 -8 <= 0; value: -5 + -2*v1 -4*v2 + 18 = 0; value: 0 0: 3 1: 1 4 5 2: 3 4 5 3: 1 4 optimal: 80/7 + + 80/7 <= 0; value: 80/7 - -28/17*v3 -424/17 <= 0; value: 0 + <= 0; value: 0 - -1*v0 -4*v2 + 13 = 0; value: 0 - 17/4*v0 + 4*v3 -37/4 <= 0; value: 0 - -2*v1 -4*v2 + 18 = 0; value: 0 0: 3 1 4 1: 1 4 5 2: 3 4 5 1 3: 1 4 0: 1 -> 115/7 1: 3 -> 75/7 2: 3 -> -6/7 3: 0 -> -106/7 + 2*v0 -2*v1 <= 0; value: -8 + v0 -4*v2 -5*v3 -15 <= 0; value: -39 + 5*v2 + 2*v3 -67 <= 0; value: -40 + 5*v0 -1*v1 + 2*v3 -2 <= 0; value: 0 + -6*v0 -4*v1 + 26 = 0; value: 0 + -1*v1 -6*v2 -6*v3 + 38 < 0; value: -3 0: 1 3 4 1: 3 4 5 2: 1 2 5 3: 1 2 3 5 optimal: (249/22 -e*1) + + 249/22 < 0; value: 249/22 + -2151/88 <= 0; value: -2151/88 - 22/7*v2 -793/14 < 0; value: -22/7 - 5*v0 -1*v1 + 2*v3 -2 <= 0; value: 0 - -26*v0 -8*v3 + 34 = 0; value: 0 - 21*v0 -6*v2 + 6 < 0; value: -21 0: 1 3 4 5 2 1: 3 4 5 2: 1 2 5 3: 1 2 3 5 4 0: 1 -> 551/154 1: 5 -> 349/308 2: 5 -> 749/44 3: 1 -> -4545/616 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -5*v1 -1 < 0; value: -11 + 2*v2 -13 <= 0; value: -3 + 5*v0 + 3*v2 -21 <= 0; value: -6 + 6*v3 -41 <= 0; value: -11 + -2*v1 <= 0; value: -4 0: 1 3 1: 1 5 2: 2 3 3: 4 optimal: oo + -6/5*v2 + 42/5 <= 0; value: 12/5 + 6/5*v2 -47/5 < 0; value: -17/5 + 2*v2 -13 <= 0; value: -3 - 5*v0 + 3*v2 -21 <= 0; value: 0 + 6*v3 -41 <= 0; value: -11 - -2*v1 <= 0; value: 0 0: 1 3 1: 1 5 2: 2 3 1 3: 4 0: 0 -> 6/5 1: 2 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 3*v2 + 3 < 0; value: -1 + 2*v0 + 3*v3 -2 <= 0; value: 0 + 4*v3 <= 0; value: 0 + v0 -3*v2 -1 <= 0; value: 0 + 3*v1 -26 < 0; value: -14 0: 1 2 4 1: 5 2: 1 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 3*v2 + 3 < 0; value: -1 + 2*v0 + 3*v3 -2 <= 0; value: 0 + 4*v3 <= 0; value: 0 + v0 -3*v2 -1 <= 0; value: 0 + 3*v1 -26 < 0; value: -14 0: 1 2 4 1: 5 2: 1 4 3: 2 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 -1*v3 -1 <= 0; value: -4 + 5*v1 + 2*v2 -47 < 0; value: -16 + 2*v0 -6*v1 + 24 = 0; value: 0 + 2*v0 + v1 -22 <= 0; value: -11 + -5*v1 + 3*v3 + 2 <= 0; value: -23 0: 1 3 4 1: 2 3 4 5 2: 2 3: 1 5 optimal: 16/7 + + 16/7 <= 0; value: 16/7 + -1*v3 -61/7 <= 0; value: -61/7 + 2*v2 -99/7 < 0; value: -57/7 - 2*v0 -6*v1 + 24 = 0; value: 0 - 7/3*v0 -18 <= 0; value: 0 + 3*v3 -216/7 <= 0; value: -216/7 0: 1 3 4 5 2 1: 2 3 4 5 2: 2 3: 1 5 0: 3 -> 54/7 1: 5 -> 46/7 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -2*v2 + v3 + 4 <= 0; value: -3 + 5*v1 -15 = 0; value: 0 + -5*v0 + v3 -6 < 0; value: -15 + 6*v1 + 4*v3 -22 = 0; value: 0 + 5*v2 -36 <= 0; value: -16 0: 3 1: 2 4 2: 1 5 3: 1 3 4 optimal: oo + 2*v0 -6 <= 0; value: -2 + -2*v2 + v3 + 4 <= 0; value: -3 - 5*v1 -15 = 0; value: 0 + -5*v0 + v3 -6 < 0; value: -15 + 4*v3 -4 = 0; value: 0 + 5*v2 -36 <= 0; value: -16 0: 3 1: 2 4 2: 1 5 3: 1 3 4 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + v1 = 0; value: 0 + -6*v0 -3*v2 + 21 = 0; value: 0 + 2*v0 + v2 -7 <= 0; value: 0 + v0 -3*v2 -4*v3 + 15 < 0; value: -3 + -2*v0 + 5*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 1 5 2: 2 3 4 3: 4 optimal: 2 + + 2 <= 0; value: 2 - v1 = 0; value: 0 - -6*v0 -3*v2 + 21 = 0; value: 0 + <= 0; value: 0 + -4*v3 + 1 < 0; value: -3 - v2 -5 = 0; value: 0 0: 2 3 4 5 1: 1 5 2: 2 3 4 5 3: 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 5*v1 + 10 = 0; value: 0 + -4*v2 -4*v3 + 12 <= 0; value: 0 + -2*v0 + 2*v2 + 3*v3 <= 0; value: -2 + 3*v0 -6*v1 -5*v2 + 7 <= 0; value: -1 + 2*v2 + 6*v3 -26 <= 0; value: -12 0: 1 3 4 1: 1 4 2: 2 3 4 5 3: 2 3 5 optimal: 4 + + 4 <= 0; value: 4 - -5*v0 + 5*v1 + 10 = 0; value: 0 + -4*v2 -4*v3 + 12 <= 0; value: 0 + -2*v0 + 2*v2 + 3*v3 <= 0; value: -2 + -3*v0 -5*v2 + 19 <= 0; value: -1 + 2*v2 + 6*v3 -26 <= 0; value: -12 0: 1 3 4 1: 1 4 2: 2 3 4 5 3: 2 3 5 0: 5 -> 5 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v2 + 3*v3 -25 <= 0; value: -15 + 2*v1 -12 <= 0; value: -6 + 6*v0 -1*v2 -11 = 0; value: 0 + v1 -2*v2 -2 <= 0; value: -1 + -2*v1 -3*v2 + 5 <= 0; value: -4 0: 1 3 1: 2 4 5 2: 1 3 4 5 3: 1 optimal: oo + 20*v0 -38 <= 0; value: 2 + -13*v0 + 3*v3 + 8 <= 0; value: -15 + -18*v0 + 26 <= 0; value: -10 - 6*v0 -1*v2 -11 = 0; value: 0 + -21*v0 + 39 <= 0; value: -3 - -2*v1 -3*v2 + 5 <= 0; value: 0 0: 1 3 4 2 1: 2 4 5 2: 1 3 4 5 2 3: 1 0: 2 -> 2 1: 3 -> 1 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 10 + v0 -1*v1 + 6*v3 -11 = 0; value: 0 + v1 -5*v2 -5*v3 + 11 < 0; value: -4 + 3*v1 <= 0; value: 0 + -3*v0 -2*v2 + 19 = 0; value: 0 + 2*v1 -4*v2 -2 < 0; value: -10 0: 1 4 1: 1 2 3 5 2: 2 4 5 3: 1 2 optimal: oo + -12*v3 + 22 <= 0; value: 10 - v0 -1*v1 + 6*v3 -11 = 0; value: 0 + v0 -5*v2 + v3 < 0; value: -4 + 3*v0 + 18*v3 -33 <= 0; value: 0 + -3*v0 -2*v2 + 19 = 0; value: 0 + 2*v0 -4*v2 + 12*v3 -24 < 0; value: -10 0: 1 4 2 3 5 1: 1 2 3 5 2: 2 4 5 3: 1 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -10 + 3*v1 -15 = 0; value: 0 + -3*v0 -2*v2 + 8 = 0; value: 0 + 2*v0 + v1 -13 < 0; value: -8 + -4*v0 + 3*v3 -3 = 0; value: 0 + -2*v0 + 2*v2 -3*v3 -12 <= 0; value: -7 0: 2 3 4 5 1: 1 3 2: 2 5 3: 4 5 optimal: (-2 -e*1) + -2 < 0; value: -2 - 3*v1 -15 = 0; value: 0 - -3*v0 -2*v2 + 8 = 0; value: 0 - 3/2*v3 -19/2 < 0; value: -3/2 - 8/3*v2 + 3*v3 -41/3 = 0; value: 0 + -43 < 0; value: -43 0: 2 3 4 5 1: 1 3 2: 2 5 3 4 3: 4 5 3 0: 0 -> 13/4 1: 5 -> 5 2: 4 -> -7/8 3: 1 -> 16/3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 5*v2 + 6*v3 -105 <= 0; value: -64 + 5*v2 -3*v3 + 4 <= 0; value: 0 + 6*v0 + 6*v1 -5*v2 -25 = 0; value: 0 + 6*v0 -2*v3 -23 <= 0; value: -11 + -1*v2 + 4*v3 -24 < 0; value: -13 0: 1 3 4 1: 3 2: 1 2 3 5 3: 1 2 4 5 optimal: oo + -16*v0 + 325/3 < 0; value: 181/3 + 84*v0 -524 < 0; value: -272 + 51*v0 -623/2 < 0; value: -317/2 - 6*v0 + 6*v1 -5*v2 -25 = 0; value: 0 - 6*v0 -2*v3 -23 <= 0; value: 0 - -1*v2 + 4*v3 -24 < 0; value: -1 0: 1 3 4 2 1: 3 2: 1 2 3 5 3: 1 2 4 5 0: 3 -> 3 1: 2 -> -79/3 2: 1 -> -33 3: 3 -> -5/2 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 -1*v2 -1*v3 <= 0; value: -8 + 3*v0 -4*v1 + 5*v2 -21 <= 0; value: -7 + -3*v0 -3*v1 + v2 <= 0; value: -3 + 5*v1 + 2*v2 + 2*v3 -40 <= 0; value: -21 + -5*v0 -4*v1 -3*v2 -17 <= 0; value: -35 0: 2 3 5 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 optimal: 53/2 + + 53/2 <= 0; value: 53/2 - v0 -4/3*v2 -1*v3 <= 0; value: 0 - 80/13*v0 -460/13 <= 0; value: 0 - -3*v0 -3*v1 + v2 <= 0; value: 0 + -125/2 <= 0; value: -125/2 - -17/4*v0 + 13/4*v3 -17 <= 0; value: 0 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 5 2 0: 1 -> 23/4 1: 1 -> -15/2 2: 3 -> -21/4 3: 4 -> 51/4 + 2*v0 -2*v1 <= 0; value: -10 + 2*v0 + 3*v1 -3*v2 -7 < 0; value: -1 + 6*v0 + 5*v2 -26 <= 0; value: -11 + 4*v0 + v3 <= 0; value: 0 + -4*v1 + v3 + 20 = 0; value: 0 + 2*v1 + v3 -22 <= 0; value: -12 0: 1 2 3 1: 1 4 5 2: 1 2 3: 3 4 5 optimal: oo + 2*v0 -1/2*v3 -10 <= 0; value: -10 + 2*v0 -3*v2 + 3/4*v3 + 8 < 0; value: -1 + 6*v0 + 5*v2 -26 <= 0; value: -11 + 4*v0 + v3 <= 0; value: 0 - -4*v1 + v3 + 20 = 0; value: 0 + 3/2*v3 -12 <= 0; value: -12 0: 1 2 3 1: 1 4 5 2: 1 2 3: 3 4 5 1 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v2 <= 0; value: 0 + = 0; value: 0 + 6*v0 -50 <= 0; value: -26 + -4*v0 + v1 + 1 <= 0; value: -12 + -3*v0 + 6*v2 -10 <= 0; value: -4 0: 3 4 5 1: 1 4 2: 1 5 3: optimal: oo + 2*v0 -2*v2 <= 0; value: 2 - -3*v1 + 3*v2 <= 0; value: 0 + = 0; value: 0 + 6*v0 -50 <= 0; value: -26 + -4*v0 + v2 + 1 <= 0; value: -12 + -3*v0 + 6*v2 -10 <= 0; value: -4 0: 3 4 5 1: 1 4 2: 1 5 4 3: 0: 4 -> 4 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -5*v2 <= 0; value: 0 + -5*v0 + v3 -21 <= 0; value: -46 + -5*v1 -1*v2 -2*v3 + 5 <= 0; value: -10 + -2*v1 -4*v2 + 6 = 0; value: 0 + -6*v0 -4*v1 + 2*v2 + 7 <= 0; value: -35 0: 2 5 1: 3 4 5 2: 1 3 4 5 3: 2 3 optimal: oo + 22/5*v0 -4 <= 0; value: 18 + -3*v0 -5/2 <= 0; value: -35/2 + -23/10*v0 -95/4 <= 0; value: -141/4 - 9*v2 -2*v3 -10 <= 0; value: 0 - -2*v1 -4*v2 + 6 = 0; value: 0 - -6*v0 + 20/9*v3 + 55/9 <= 0; value: 0 0: 2 5 1 1: 3 4 5 2: 1 3 4 5 3: 2 3 5 1 0: 5 -> 5 1: 3 -> -4 2: 0 -> 7/2 3: 0 -> 43/4 + 2*v0 -2*v1 <= 0; value: 8 + 3*v1 + 6*v2 -40 <= 0; value: -16 + -1*v0 + 4*v2 -12 = 0; value: 0 + -2*v1 -5*v2 -2*v3 + 20 <= 0; value: -4 + -6*v0 -3 <= 0; value: -27 + 4*v0 + 2*v3 -53 < 0; value: -33 0: 2 4 5 1: 1 3 2: 1 2 3 3: 3 5 optimal: (387/8 -e*1) + + 387/8 < 0; value: 387/8 + -1549/16 < 0; value: -1549/16 - -1*v0 + 4*v2 -12 = 0; value: 0 - -2*v1 -5*v2 -2*v3 + 20 <= 0; value: 0 - -6*v0 -3 <= 0; value: 0 - 4*v0 + 2*v3 -53 < 0; value: -2 0: 2 4 5 1 1: 1 3 2: 1 2 3 3: 3 5 1 0: 4 -> -1/2 1: 0 -> -379/16 2: 4 -> 23/8 3: 2 -> 53/2 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -3*v3 + 19 < 0; value: -17 + 3*v0 -6*v2 -6 <= 0; value: -21 + 4*v1 + 4*v3 -45 <= 0; value: -17 + -5*v1 -2*v3 -11 < 0; value: -40 + -3*v0 + 2*v2 + 5 = 0; value: 0 0: 1 2 5 1: 3 4 2: 2 5 3: 1 3 4 optimal: oo + 4/3*v2 + 77/3 < 0; value: 97/3 + -4*v2 -233/4 < 0; value: -313/4 + -4*v2 -1 <= 0; value: -21 - 12/5*v3 -269/5 < 0; value: -12/5 - -5*v1 -2*v3 -11 < 0; value: -5 - -3*v0 + 2*v2 + 5 = 0; value: 0 0: 1 2 5 1: 3 4 2: 2 5 1 3: 1 3 4 0: 5 -> 5 1: 5 -> -293/30 2: 5 -> 5 3: 2 -> 257/12 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -6*v2 + 3 < 0; value: -5 + -4*v1 + 6*v2 -2*v3 -6 = 0; value: 0 + 5*v0 + v3 -8 <= 0; value: -2 + -5*v2 -3*v3 + 13 = 0; value: 0 + -4*v0 -2*v3 + 6 = 0; value: 0 0: 1 3 5 1: 2 2: 1 2 4 3: 2 3 4 5 optimal: (45/8 -e*1) + + 45/8 < 0; value: 45/8 - -16/5*v0 -9/5 < 0; value: -5/2 - -4*v1 + 6*v2 -2*v3 -6 = 0; value: 0 + -107/16 < 0; value: -107/16 - -5*v2 -3*v3 + 13 = 0; value: 0 - -4*v0 + 10/3*v2 -8/3 = 0; value: 0 0: 1 3 5 1: 2 2: 1 2 4 3 5 3: 2 3 4 5 0: 1 -> 7/32 1: 1 -> -19/16 2: 2 -> 17/16 3: 1 -> 41/16 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v3 -67 <= 0; value: -35 + -5*v0 + v2 + 19 = 0; value: 0 + -1*v0 + 1 < 0; value: -3 + 3*v0 + v1 + 4*v3 -67 <= 0; value: -39 + 5*v1 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v3 -67 <= 0; value: -35 + -5*v0 + v2 + 19 = 0; value: 0 + -1*v0 + 1 < 0; value: -3 + 3*v0 + v1 + 4*v3 -67 <= 0; value: -39 + 5*v1 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3: 1 4 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 <= 0; value: 0 + 5*v1 -6*v3 + 11 <= 0; value: -7 + 2*v0 -3*v1 + 3*v2 -4 = 0; value: 0 + 3*v2 + 2*v3 -14 <= 0; value: -8 + 3*v0 -4*v1 -4*v2 -6 = 0; value: 0 0: 3 5 1: 1 2 3 5 2: 3 4 5 3: 2 4 optimal: 4 + + 4 <= 0; value: 4 - 17/8*v0 -17/4 <= 0; value: 0 + -6*v3 + 11 <= 0; value: -7 - 2*v0 -3*v1 + 3*v2 -4 = 0; value: 0 + 2*v3 -14 <= 0; value: -8 - 1/3*v0 -8*v2 -2/3 = 0; value: 0 0: 3 5 1 2 4 1: 1 2 3 5 2: 3 4 5 1 2 3: 2 4 0: 2 -> 2 1: 0 -> 0 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v3 -31 <= 0; value: -19 + v0 + 2*v3 -15 <= 0; value: -7 + -4*v0 + 3*v2 <= 0; value: -4 + v1 + v2 -19 < 0; value: -12 + -3*v2 + 4*v3 -3 <= 0; value: -7 0: 2 3 1: 4 2: 3 4 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v3 -31 <= 0; value: -19 + v0 + 2*v3 -15 <= 0; value: -7 + -4*v0 + 3*v2 <= 0; value: -4 + v1 + v2 -19 < 0; value: -12 + -3*v2 + 4*v3 -3 <= 0; value: -7 0: 2 3 1: 4 2: 3 4 5 3: 1 2 5 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 -5*v2 -16 <= 0; value: -66 + -4*v3 + 8 = 0; value: 0 + -2*v0 + 4*v2 -14 < 0; value: -4 + -5*v1 -2*v2 + 7 <= 0; value: -13 + -2*v2 -5 <= 0; value: -15 0: 1 3 1: 4 2: 1 3 4 5 3: 2 optimal: oo + 12/5*v0 < 0; value: 12 + -15/2*v0 -67/2 < 0; value: -71 + -4*v3 + 8 = 0; value: 0 - -2*v0 + 4*v2 -14 < 0; value: -2 - -5*v1 -2*v2 + 7 <= 0; value: 0 + -1*v0 -12 < 0; value: -17 0: 1 3 5 1: 4 2: 1 3 4 5 3: 2 0: 5 -> 5 1: 2 -> -4/5 2: 5 -> 11/2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + 6*v3 -7 < 0; value: -1 + -2*v3 -1 <= 0; value: -3 + 4*v1 + 3*v3 -37 < 0; value: -18 + 6*v0 -3*v1 -4*v3 + 8 <= 0; value: -8 + -5*v0 -6*v2 + 5*v3 + 12 <= 0; value: -1 0: 1 4 5 1: 3 4 2: 5 3: 1 2 3 4 5 optimal: (-5/3 -e*1) + -5/3 < 0; value: -5/3 - -4*v0 + 6*v3 -7 < 0; value: -21/10 - 24/5*v2 -88/5 < 0; value: -8/5 + -271/6 < 0; value: -271/6 - 6*v0 -3*v1 -4*v3 + 8 <= 0; value: 0 - -5/3*v0 -6*v2 + 107/6 <= 0; value: 0 0: 1 4 5 3 2 1: 3 4 2: 5 2 3 3: 1 2 3 4 5 0: 0 -> -13/10 1: 4 -> 2/15 2: 3 -> 10/3 3: 1 -> -1/20 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 5*v2 -1*v3 -18 = 0; value: 0 + 3*v2 -12 = 0; value: 0 + -3*v0 + 2 <= 0; value: -1 + -4*v2 + 16 = 0; value: 0 + -5*v1 + 6*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 4 5 3: 1 5 optimal: oo + 28/5*v0 -38/5 <= 0; value: -2 - 3*v0 + 5*v2 -1*v3 -18 = 0; value: 0 - 3*v2 -12 = 0; value: 0 + -3*v0 + 2 <= 0; value: -1 + = 0; value: 0 - -5*v1 + 6*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 4 5 3: 1 5 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -2*v0 + 3*v3 -22 <= 0; value: -14 + 6*v0 + 3*v3 -56 <= 0; value: -32 + 6*v0 + 3*v2 -37 < 0; value: -13 + -6*v0 -4*v1 -4*v2 -11 <= 0; value: -39 + 2*v0 + 6*v2 -28 <= 0; value: 0 0: 1 2 3 4 5 1: 4 2: 3 4 5 3: 1 2 optimal: (1043/30 -e*1) + + 1043/30 < 0; value: 1043/30 + 3*v3 -156/5 < 0; value: -96/5 + 3*v3 -142/5 <= 0; value: -82/5 - 5*v0 -23 < 0; value: -5 - -6*v0 -4*v1 -4*v2 -11 <= 0; value: 0 - 2*v0 + 6*v2 -28 <= 0; value: 0 0: 1 2 3 4 5 1: 4 2: 3 4 5 3: 1 2 0: 2 -> 18/5 1: 0 -> -697/60 2: 4 -> 52/15 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + v0 -5*v2 + 25 = 0; value: 0 + 2*v1 + 5*v2 -35 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + -5*v0 -1*v3 <= 0; value: -2 + -4*v1 + 20 = 0; value: 0 0: 1 4 1: 2 5 2: 1 2 3: 3 4 optimal: -10 + -10 <= 0; value: -10 - v0 -5*v2 + 25 = 0; value: 0 - 2*v1 + 5*v2 -35 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + -1*v3 <= 0; value: -2 - 2*v0 = 0; value: 0 0: 1 4 5 1: 2 5 2: 1 2 5 3: 3 4 0: 0 -> 0 1: 5 -> 5 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -6*v2 -12 <= 0; value: 0 + v1 + 5*v2 -17 = 0; value: 0 + -5*v1 + 6*v3 -42 <= 0; value: -22 + -1*v1 + 6*v2 -22 <= 0; value: -6 + -3*v0 -3*v1 -3*v3 + 4 <= 0; value: -32 0: 1 5 1: 2 3 4 5 2: 1 2 4 3: 3 5 optimal: 138/11 + + 138/11 <= 0; value: 138/11 - 6*v0 -366/11 <= 0; value: 0 - v1 + 5*v2 -17 = 0; value: 0 + 6*v3 -422/11 <= 0; value: -92/11 - 11*v2 -39 <= 0; value: 0 + -3*v3 -115/11 <= 0; value: -280/11 0: 1 5 1: 2 3 4 5 2: 1 2 4 3 5 3: 3 5 0: 5 -> 61/11 1: 2 -> -8/11 2: 3 -> 39/11 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 + v1 -1*v3 + 21 = 0; value: 0 + v0 + v1 -6 = 0; value: 0 + 4*v0 -5*v1 -5*v2 -15 = 0; value: 0 + 5*v0 + 4*v1 -31 < 0; value: -2 + -3*v0 + 3*v1 -6*v2 + 1 <= 0; value: -11 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 3 5 3: 1 optimal: (16 -e*1) + + 16 < 0; value: 16 - -4*v0 + v1 -1*v3 + 21 = 0; value: 0 - 5*v0 + v3 -27 = 0; value: 0 - 9*v0 -5*v2 -45 = 0; value: 0 - 5/9*v2 -2 < 0; value: -5/9 + -223/5 < 0; value: -223/5 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 3 5 4 3: 1 2 3 4 5 0: 5 -> 58/9 1: 1 -> -4/9 2: 0 -> 13/5 3: 2 -> -47/9 + 2*v0 -2*v1 <= 0; value: 2 + -2*v1 -1*v3 + 6 = 0; value: 0 + 4*v3 -8 = 0; value: 0 + -2*v0 + 3*v2 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 0: 3 1: 1 2: 3 3: 1 2 optimal: oo + 2*v0 -4 <= 0; value: 2 - -2*v1 -1*v3 + 6 = 0; value: 0 - 4*v3 -8 = 0; value: 0 + -2*v0 + 3*v2 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 0: 3 1: 1 2: 3 3: 1 2 0: 3 -> 3 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 6*v2 -7 < 0; value: -1 + 2*v1 -7 <= 0; value: -3 + 3*v2 -3*v3 + 3 = 0; value: 0 + -2*v0 + 6*v3 -12 = 0; value: 0 + -5*v0 + 2*v1 -4 = 0; value: 0 0: 1 4 5 1: 2 5 2: 1 3 3: 3 4 optimal: oo + -9*v2 + 5 <= 0; value: -4 + 9*v2 -10 < 0; value: -1 + 15*v2 -18 <= 0; value: -3 - 3*v2 -3*v3 + 3 = 0; value: 0 - -2*v0 + 6*v3 -12 = 0; value: 0 - -5*v0 + 2*v1 -4 = 0; value: 0 0: 1 4 5 2 1: 2 5 2: 1 3 2 3: 3 4 1 2 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + v1 + 3*v3 -55 <= 0; value: -14 + -6*v0 + 3*v1 -1*v2 + 16 < 0; value: -3 + -6*v0 -1*v1 -5*v2 + 25 < 0; value: -6 + -4*v1 + 8 = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 2 3 3: 1 optimal: oo + -1*v3 + 41/3 <= 0; value: 26/3 - 6*v0 + 3*v3 -53 <= 0; value: 0 + -1*v2 + 3*v3 -31 < 0; value: -17 + -5*v2 + 3*v3 -30 < 0; value: -20 - -4*v1 + 8 = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 2 3 3: 1 2 3 0: 4 -> 19/3 1: 2 -> 2 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -5*v2 + 10 <= 0; value: 0 + 4*v0 -6*v1 + 6*v2 -7 < 0; value: -1 + -6*v0 -2*v1 -1*v2 + 1 < 0; value: -3 + 4*v2 -2*v3 -4 = 0; value: 0 + -2*v0 -3*v3 -1 <= 0; value: -7 0: 2 3 5 1: 2 3 2: 1 2 3 4 3: 4 5 optimal: oo + 2/3*v0 -5/3 < 0; value: -5/3 - -5*v2 + 10 <= 0; value: 0 - 4*v0 -6*v1 + 6*v2 -7 < 0; value: -1/2 + -22/3*v0 -8/3 <= 0; value: -8/3 + -2*v3 + 4 = 0; value: 0 + -2*v0 -3*v3 -1 <= 0; value: -7 0: 2 3 5 1: 2 3 2: 1 2 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 11/12 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v1 + 2*v2 -4 < 0; value: -1 + -5*v1 -4*v2 + 14 <= 0; value: -7 + 6*v1 + v2 -19 < 0; value: -9 + -2*v0 -1*v1 + 5*v3 -19 < 0; value: -10 + -5*v0 + v3 -4 < 0; value: -2 0: 4 5 1: 1 2 3 4 2: 1 2 3 3: 4 5 optimal: oo + 2*v0 -4/5 < 0; value: -4/5 - -5*v1 + 2*v2 -4 < 0; value: -3/2 - -6*v2 + 18 <= 0; value: 0 + -68/5 < 0; value: -68/5 + -2*v0 + 5*v3 -97/5 <= 0; value: -47/5 + -5*v0 + v3 -4 < 0; value: -2 0: 4 5 1: 1 2 3 4 2: 1 2 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 7/10 2: 4 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 <= 0; value: 0 + 3*v0 + 6*v3 -58 <= 0; value: -31 + 5*v1 + 2*v2 -6*v3 -8 = 0; value: 0 + 5*v0 + 5*v1 + 4*v2 -72 < 0; value: -27 + 5*v0 -4*v1 -14 < 0; value: -5 0: 2 4 5 1: 3 4 5 2: 1 3 4 3: 2 3 optimal: oo + -1/2*v0 + 7 < 0; value: 9/2 + 5*v2 <= 0; value: 0 + 37/4*v0 + 2*v2 -167/2 < 0; value: -149/4 - 5*v1 + 2*v2 -6*v3 -8 = 0; value: 0 + 45/4*v0 + 4*v2 -179/2 < 0; value: -133/4 - 5*v0 + 8/5*v2 -24/5*v3 -102/5 < 0; value: -5/2 0: 2 4 5 1: 3 4 5 2: 1 3 4 5 2 3: 2 3 5 4 0: 5 -> 5 1: 4 -> 27/8 2: 0 -> 0 3: 2 -> 71/48 + 2*v0 -2*v1 <= 0; value: -4 + 2*v1 + 5*v3 -75 <= 0; value: -40 + -6*v0 -1*v1 -2*v3 -24 <= 0; value: -57 + -3*v0 -5*v1 -4*v3 -46 <= 0; value: -100 + 3*v0 -3*v1 -2 < 0; value: -8 + -6*v0 -6*v2 + 36 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 2: 5 3: 1 2 3 optimal: (4/3 -e*1) + + 4/3 < 0; value: 4/3 + 2*v0 + 5*v3 -229/3 < 0; value: -136/3 + -7*v0 -2*v3 -70/3 <= 0; value: -163/3 + -8*v0 -4*v3 -128/3 <= 0; value: -260/3 - 3*v0 -3*v1 -2 < 0; value: -3 + -6*v0 -6*v2 + 36 = 0; value: 0 0: 2 3 4 5 1 1: 1 2 3 4 2: 5 3: 1 2 3 0: 3 -> 3 1: 5 -> 10/3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -3*v3 + 4 <= 0; value: -2 + -4*v0 + 5*v2 = 0; value: 0 + 5*v0 <= 0; value: 0 + -3*v1 + 3*v2 + 4*v3 + 2 < 0; value: -2 + v0 -6*v2 = 0; value: 0 0: 1 2 3 5 1: 4 2: 2 4 5 3: 1 4 optimal: (-44/9 -e*1) + -44/9 < 0; value: -44/9 - -6*v0 -3*v3 + 4 <= 0; value: 0 - -4*v0 + 5*v2 = 0; value: 0 - 5*v0 <= 0; value: 0 - -3*v1 + 3*v2 + 4*v3 + 2 < 0; value: -7/3 + = 0; value: 0 0: 1 2 3 5 1: 4 2: 2 4 5 3: 1 4 0: 0 -> 0 1: 4 -> 29/9 2: 0 -> 0 3: 2 -> 4/3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 6*v3 <= 0; value: 0 + -5*v0 + 4*v1 + 5 = 0; value: 0 + <= 0; value: 0 + v0 -2*v2 -1 = 0; value: 0 + 2*v1 -1*v3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 4 3: 1 5 optimal: 2 + + 2 <= 0; value: 2 - -3*v1 + 6*v3 <= 0; value: 0 - -5*v0 + 5 = 0; value: 0 + <= 0; value: 0 + -2*v2 = 0; value: 0 - 3*v3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 4 3: 1 5 2 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -4*v3 <= 0; value: 0 + -2*v0 + 6*v2 -24 <= 0; value: 0 + 2*v0 + 4*v2 -37 <= 0; value: -21 + -6*v1 + 4*v2 -1*v3 -16 = 0; value: 0 + v0 -3*v1 <= 0; value: 0 0: 2 3 5 1: 4 5 2: 2 3 4 3: 1 4 optimal: 0 + <= 0; value: 0 - 8*v0 -16*v2 + 64 <= 0; value: 0 - 2*v2 -8 <= 0; value: 0 + -21 <= 0; value: -21 - -6*v1 + 4*v2 -1*v3 -16 = 0; value: 0 - v0 -2*v2 + 1/2*v3 + 8 <= 0; value: 0 0: 2 3 5 1 1: 4 5 2: 2 3 4 5 1 3: 1 4 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -5*v3 + 20 = 0; value: 0 + 4*v0 -6*v1 + 2*v3 -69 <= 0; value: -45 + v2 -6*v3 + 19 = 0; value: 0 + -1*v0 + v1 -2*v2 -13 <= 0; value: -27 + 6*v1 -5*v2 -4*v3 -29 <= 0; value: -70 0: 2 4 1: 2 4 5 2: 3 4 5 3: 1 2 3 5 optimal: 253/6 + + 253/6 <= 0; value: 253/6 - -5*v3 + 20 = 0; value: 0 - 4*v0 -6*v1 + 2*v3 -69 <= 0; value: 0 - v2 -5 = 0; value: 0 + -529/12 <= 0; value: -529/12 - 4*v0 -5*v2 -106 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 3 4 5 3: 1 2 3 5 4 0: 4 -> 131/4 1: 0 -> 35/3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -1*v3 -26 < 0; value: -14 + 3*v2 -33 <= 0; value: -18 + -4*v0 -1*v2 + 3*v3 -8 <= 0; value: -4 + 5*v0 -2*v2 + 8 <= 0; value: -2 + 3*v1 + 5*v2 -2*v3 -57 < 0; value: -23 0: 3 4 1: 5 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -1*v3 -26 < 0; value: -14 + 3*v2 -33 <= 0; value: -18 + -4*v0 -1*v2 + 3*v3 -8 <= 0; value: -4 + 5*v0 -2*v2 + 8 <= 0; value: -2 + 3*v1 + 5*v2 -2*v3 -57 < 0; value: -23 0: 3 4 1: 5 2: 1 2 3 4 5 3: 1 3 5 0: 0 -> 0 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 4 <= 0; value: -2 + 4*v1 -31 <= 0; value: -19 + -6*v2 -2*v3 + 16 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: -2 + -1*v2 + 2 <= 0; value: 0 0: 1: 1 2 2: 3 4 5 3: 3 4 optimal: oo + 2*v0 -4 <= 0; value: 0 - -2*v1 + 4 <= 0; value: 0 + -23 <= 0; value: -23 + -6*v2 -2*v3 + 16 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: -2 + -1*v2 + 2 <= 0; value: 0 0: 1: 1 2 2: 3 4 5 3: 3 4 0: 2 -> 2 1: 3 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 + 2*v2 + 6*v3 -36 <= 0; value: -11 + 4*v2 -2*v3 <= 0; value: 0 + -3*v1 + 5*v2 -1 <= 0; value: 0 + -3*v1 -1*v2 <= 0; value: -11 + -4*v0 + 8 = 0; value: 0 0: 5 1: 1 3 4 2: 1 2 3 4 3: 1 2 optimal: 37/9 + + 37/9 <= 0; value: 37/9 + 6*v3 -641/18 <= 0; value: -209/18 + -2*v3 + 2/3 <= 0; value: -22/3 - -3*v1 + 5*v2 -1 <= 0; value: 0 - -6*v2 + 1 <= 0; value: 0 - -4*v0 + 8 = 0; value: 0 0: 5 1: 1 3 4 2: 1 2 3 4 3: 1 2 0: 2 -> 2 1: 3 -> -1/18 2: 2 -> 1/6 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -1*v1 + 4*v3 -4 = 0; value: 0 + -3*v0 -1*v3 + 4 < 0; value: -4 + 2*v1 -2*v2 -9 <= 0; value: -5 + -3*v0 + 4 <= 0; value: -2 + -1*v1 + 4*v3 -8 <= 0; value: -4 0: 2 4 1: 1 3 5 2: 3 3: 1 2 5 optimal: oo + 26*v0 -24 < 0; value: 28 - -1*v1 + 4*v3 -4 = 0; value: 0 - -3*v0 -1*v3 + 4 < 0; value: -1 + -24*v0 -2*v2 + 15 < 0; value: -37 + -3*v0 + 4 <= 0; value: -2 + -4 <= 0; value: -4 0: 2 4 3 1: 1 3 5 2: 3 3: 1 2 5 3 0: 2 -> 2 1: 4 -> -8 2: 2 -> 2 3: 2 -> -1 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -4*v1 + 5*v2 -5 < 0; value: -1 + 3*v0 + v1 + 2*v3 -51 <= 0; value: -30 + -4*v0 -4*v3 + 28 = 0; value: 0 + 4*v0 + 2*v2 -16 = 0; value: 0 + -1*v1 -2*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 3: 2 3 5 optimal: (-47/8 -e*1) + -47/8 < 0; value: -47/8 - 8*v2 -33 < 0; value: -1/2 + -483/16 < 0; value: -483/16 - -4*v0 -4*v3 + 28 = 0; value: 0 - 4*v0 + 2*v2 -16 = 0; value: 0 - -1*v1 -2*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 2 3: 2 3 5 1 0: 2 -> 63/32 1: 5 -> 79/16 2: 4 -> 65/16 3: 5 -> 161/32 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v1 + 4*v3 + 2 = 0; value: 0 + 2*v0 -8 = 0; value: 0 + -3*v1 -6*v2 -4*v3 -2 < 0; value: -17 + -2*v1 + 3 < 0; value: -3 + 6*v0 -2*v1 + 6*v2 -50 <= 0; value: -26 0: 1 2 5 1: 1 3 4 5 2: 3 5 3: 1 3 optimal: (5 -e*1) + + 5 < 0; value: 5 - 4*v0 -6*v1 + 4*v3 + 2 = 0; value: 0 - 2*v0 -8 = 0; value: 0 + -6*v2 + 5/2 <= 0; value: -7/2 - -4/3*v0 -4/3*v3 + 7/3 < 0; value: -4/3 + 6*v2 -29 <= 0; value: -23 0: 1 2 5 3 4 1: 1 3 4 5 2: 3 5 3: 1 3 4 5 0: 4 -> 4 1: 3 -> 13/6 2: 1 -> 1 3: 0 -> -5/4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v2 -2*v3 + 17 <= 0; value: -11 + 3*v0 + 5*v2 -36 <= 0; value: -13 + v1 -3*v2 -5 <= 0; value: -15 + -3*v0 + 3*v1 -6*v3 + 27 <= 0; value: 0 + 6*v0 + 6*v1 -21 <= 0; value: -3 0: 1 2 4 5 1: 3 4 5 2: 1 2 3 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v2 -2*v3 + 17 <= 0; value: -11 + 3*v0 + 5*v2 -36 <= 0; value: -13 + v1 -3*v2 -5 <= 0; value: -15 + -3*v0 + 3*v1 -6*v3 + 27 <= 0; value: 0 + 6*v0 + 6*v1 -21 <= 0; value: -3 0: 1 2 4 5 1: 3 4 5 2: 1 2 3 3: 1 4 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -5*v1 + v2 + 7 <= 0; value: -2 + 5*v1 + 3*v3 -26 <= 0; value: -16 + -3*v1 -4*v2 -5*v3 -1 <= 0; value: -11 + 4*v1 -5*v2 -2*v3 -3 <= 0; value: 0 + v0 + v2 -2*v3 -9 <= 0; value: -3 0: 5 1: 1 2 3 4 2: 1 3 4 5 3: 2 3 4 5 optimal: 2712/53 + + 2712/53 <= 0; value: 2712/53 - -5*v1 + v2 + 7 <= 0; value: 0 - 53/21*v3 -386/21 <= 0; value: 0 + -1511/53 <= 0; value: -1511/53 - -21/5*v2 -2*v3 + 13/5 <= 0; value: 0 - v0 -1400/53 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 3 4 5 2 3: 2 3 4 5 0: 5 -> 1400/53 1: 2 -> 44/53 2: 1 -> -151/53 3: 0 -> 386/53 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -10 <= 0; value: -4 + -5*v0 + 6*v3 + 19 = 0; value: 0 + 6*v1 -1*v2 -32 <= 0; value: -21 + -6*v0 + v1 + 3*v3 -2 <= 0; value: -27 + 5*v0 + v3 -43 <= 0; value: -17 0: 2 4 5 1: 1 3 4 2: 3 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -10 <= 0; value: -4 + -5*v0 + 6*v3 + 19 = 0; value: 0 + 6*v1 -1*v2 -32 <= 0; value: -21 + -6*v0 + v1 + 3*v3 -2 <= 0; value: -27 + 5*v0 + v3 -43 <= 0; value: -17 0: 2 4 5 1: 1 3 4 2: 3 3: 2 4 5 0: 5 -> 5 1: 2 -> 2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v1 + 4*v2 -4 <= 0; value: -9 + 5*v0 -1*v1 + 3 <= 0; value: 0 + -5*v0 + 4*v3 -16 <= 0; value: -4 + -3*v0 + 5*v1 -4*v2 -31 <= 0; value: -20 + -1*v0 + 4*v1 -33 < 0; value: -21 0: 2 3 4 5 1: 1 2 4 5 2: 1 4 3: 3 optimal: oo + -32/5*v3 + 98/5 <= 0; value: 2/5 - -15*v0 + 4*v2 -13 <= 0; value: 0 - 5*v0 -1*v1 + 3 <= 0; value: 0 - -4/3*v2 + 4*v3 -35/3 <= 0; value: 0 + 28/5*v3 -257/5 <= 0; value: -173/5 + 76/5*v3 -409/5 < 0; value: -181/5 0: 2 3 4 5 1 1: 1 2 4 5 2: 1 4 3 5 3: 3 4 5 0: 0 -> -4/5 1: 3 -> -1 2: 1 -> 1/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -5*v0 + 1 <= 0; value: -19 + -2*v0 + 4*v2 -12 = 0; value: 0 + -5*v0 + 6*v1 + 19 <= 0; value: -1 + -1*v1 <= 0; value: 0 + -5*v1 + 6*v2 -30 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 2 5 3: optimal: 8 + + 8 <= 0; value: 8 + -19 <= 0; value: -19 - -2*v0 + 4*v2 -12 = 0; value: 0 + -1 <= 0; value: -1 - -1*v1 <= 0; value: 0 - 6*v2 -30 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 2 5 1 3 3: 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -5*v2 -19 <= 0; value: -39 + -2*v0 -3*v2 + 4*v3 -3 <= 0; value: -7 + -3*v0 + v1 + 2 = 0; value: 0 + 5*v1 -6*v2 -2 <= 0; value: -6 + -1*v0 -5*v1 -3*v2 <= 0; value: -34 0: 2 3 5 1: 3 4 5 2: 1 2 4 5 3: 2 optimal: oo + 3/4*v2 + 3/2 <= 0; value: 9/2 + -5*v2 -19 <= 0; value: -39 + -21/8*v2 + 4*v3 -17/4 <= 0; value: -11/4 - -3*v0 + v1 + 2 = 0; value: 0 + -141/16*v2 -21/8 <= 0; value: -303/8 - -16*v0 -3*v2 + 10 <= 0; value: 0 0: 2 3 5 4 1: 3 4 5 2: 1 2 4 5 3: 2 0: 2 -> -1/8 1: 4 -> -19/8 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -6*v2 -9 <= 0; value: -19 + -3*v3 + 15 = 0; value: 0 + -1*v0 + 2 = 0; value: 0 + -4*v0 -5*v2 + 1 <= 0; value: -7 + -6*v1 + 3*v2 -3 <= 0; value: -15 0: 3 4 1: 1 5 2: 1 4 5 3: 2 optimal: 98/17 + + 98/17 <= 0; value: 98/17 - -17/2*v2 -13/2 <= 0; value: 0 + -3*v3 + 15 = 0; value: 0 - -1*v0 + 2 = 0; value: 0 + -54/17 <= 0; value: -54/17 - -6*v1 + 3*v2 -3 <= 0; value: 0 0: 3 4 1: 1 5 2: 1 4 5 3: 2 0: 2 -> 2 1: 2 -> -15/17 2: 0 -> -13/17 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 4*v1 + 5*v2 -114 <= 0; value: -69 + -1*v0 + 6*v2 -1*v3 -56 < 0; value: -34 + -3*v1 -5*v2 + 3*v3 -13 <= 0; value: -29 + -1*v0 -1*v1 -4*v3 -16 < 0; value: -41 + -1*v0 + 2*v2 -17 < 0; value: -10 0: 1 2 4 5 1: 1 3 4 2: 1 2 3 5 3: 2 3 4 optimal: (11071/67 -e*1) + + 11071/67 < 0; value: 11071/67 - 268/85*v0 -2445/17 < 0; value: -268/85 - -4/5*v0 + 17/3*v2 -161/3 <= 0; value: 0 - -3*v1 -5*v2 + 3*v3 -13 <= 0; value: 0 - -1*v0 + 5/3*v2 -5*v3 -35/3 < 0; value: -5 + -8253/268 < 0; value: -8253/268 0: 1 2 4 5 1: 1 3 4 2: 1 2 3 5 4 3: 2 3 4 1 0: 3 -> 11957/268 1: 2 -> -811321/22780 2: 5 -> 89806/5695 3: 5 -> -113901/22780 + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 + 3*v1 -32 <= 0; value: -11 + -3*v0 -5*v2 + 6 = 0; value: 0 + -1*v1 + 4*v2 + 2 < 0; value: -3 + -1*v0 -1*v1 < 0; value: -7 + -2*v0 + 5*v3 -11 <= 0; value: -5 0: 1 2 4 5 1: 1 3 4 2: 2 3 3: 5 optimal: (136/7 -e*1) + + 136/7 < 0; value: 136/7 + -32 < 0; value: -32 - -3*v0 -5*v2 + 6 = 0; value: 0 - -1*v1 + 4*v2 + 2 < 0; value: -1 - 7/5*v0 -34/5 <= 0; value: 0 + 5*v3 -145/7 <= 0; value: -75/7 0: 1 2 4 5 1: 1 3 4 2: 2 3 4 1 3: 5 0: 2 -> 34/7 1: 5 -> -27/7 2: 0 -> -12/7 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 -6*v3 -9 <= 0; value: -3 + 3*v0 -2*v1 -12 <= 0; value: -7 + -2*v0 + 6*v1 -6*v2 -12 <= 0; value: -6 + -2*v2 <= 0; value: 0 + -4*v1 -5*v3 -4 <= 0; value: -17 0: 2 3 1: 1 2 3 5 2: 3 4 3: 1 5 optimal: oo + 5/6*v3 + 26/3 <= 0; value: 19/2 + -27/2*v3 -15 <= 0; value: -57/2 - 3*v0 -2*v1 -12 <= 0; value: 0 + -6*v2 -35/6*v3 -74/3 <= 0; value: -61/2 + -2*v2 <= 0; value: 0 - -6*v0 -5*v3 + 20 <= 0; value: 0 0: 2 3 5 1 1: 1 2 3 5 2: 3 4 3: 1 5 3 0: 3 -> 5/2 1: 2 -> -9/4 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 <= 0; value: -9 + -4*v0 -5*v1 + v3 + 27 = 0; value: 0 + v0 -3*v2 + 6*v3 -18 <= 0; value: 0 + -6*v2 -5*v3 + 55 = 0; value: 0 + -6*v0 -5*v2 + 43 = 0; value: 0 0: 1 2 3 5 1: 2 2: 3 4 5 3: 2 3 4 optimal: -2 + -2 <= 0; value: -2 + -9 <= 0; value: -9 - -4*v0 -5*v1 + v3 + 27 = 0; value: 0 - 331/25*v0 -993/25 <= 0; value: 0 - -6*v2 -5*v3 + 55 = 0; value: 0 - -6*v0 -5*v2 + 43 = 0; value: 0 0: 1 2 3 5 1: 2 2: 3 4 5 3: 2 3 4 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 4*v0 + 3*v1 -22 = 0; value: 0 + 2*v0 -1*v1 -2*v3 -10 <= 0; value: -6 + 2*v0 -6*v1 -5*v3 + 9 = 0; value: 0 + v0 + 6*v1 -1*v3 -15 <= 0; value: 0 + -5*v0 -6*v2 + 24 < 0; value: -8 0: 1 2 3 4 5 1: 1 2 3 4 2: 5 3: 2 3 4 optimal: oo + 7/3*v3 + 5/3 <= 0; value: 4 - 4*v0 + 3*v1 -22 = 0; value: 0 + -1/3*v3 -17/3 <= 0; value: -6 - 10*v0 -5*v3 -35 = 0; value: 0 + -9/2*v3 + 9/2 <= 0; value: 0 + -6*v2 -5/2*v3 + 13/2 < 0; value: -8 0: 1 2 3 4 5 1: 1 2 3 4 2: 5 3: 2 3 4 5 0: 4 -> 4 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 2*v3 -12 <= 0; value: 0 + v0 + 6*v3 -32 = 0; value: 0 + -4*v1 -6*v2 + 15 <= 0; value: -31 + -6*v0 -4*v2 + 3*v3 + 17 = 0; value: 0 + -1*v0 -2*v1 -3*v2 + 12 < 0; value: -13 0: 1 2 4 5 1: 3 5 2: 3 4 5 3: 1 2 4 optimal: (9 -e*1) + + 9 < 0; value: 9 - v0 + 2*v3 -12 <= 0; value: 0 - -2*v0 + 4 = 0; value: 0 + -5 <= 0; value: -5 - -6*v0 -4*v2 + 3*v3 + 17 = 0; value: 0 - -1*v0 -2*v1 -3*v2 + 12 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 3 4 5 3: 1 2 4 0: 2 -> 2 1: 4 -> -3/2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -1*v2 -6*v3 + 2 < 0; value: -2 + -1*v2 -2*v3 + 4 <= 0; value: 0 + 3*v0 -5*v2 + 7 <= 0; value: -13 + -3*v0 -3*v1 + 2*v2 + 4 <= 0; value: 0 + v1 + 6*v3 -10 <= 0; value: -6 0: 3 4 1: 4 5 2: 1 2 3 4 3: 1 2 5 optimal: -40/9 + -40/9 <= 0; value: -40/9 + -43/6 < 0; value: -43/6 - -1*v2 -2*v3 + 4 <= 0; value: 0 - 36/7*v0 -1/7 <= 0; value: 0 - -3*v0 -3*v1 + 2*v2 + 4 <= 0; value: 0 - -1*v0 + 14/3*v3 -6 <= 0; value: 0 0: 3 4 5 1 1: 4 5 2: 1 2 3 4 5 3: 1 2 5 3 0: 0 -> 1/36 1: 4 -> 9/4 2: 4 -> 17/12 3: 0 -> 31/24 + 2*v0 -2*v1 <= 0; value: -4 + -3*v2 -4*v3 <= 0; value: 0 + -5*v0 -2*v1 + v2 -19 <= 0; value: -44 + 3*v3 <= 0; value: 0 + 4*v0 -5*v2 -16 <= 0; value: -4 + -1*v1 + 2*v3 -2 <= 0; value: -7 0: 2 4 1: 2 5 2: 1 2 4 3: 1 3 5 optimal: oo + 23/4*v0 + 61/4 <= 0; value: 65/2 - -3*v2 -4*v3 <= 0; value: 0 - -5*v0 + 4*v2 -15 <= 0; value: 0 + -45/16*v0 -135/16 <= 0; value: -135/8 + -9/4*v0 -139/4 <= 0; value: -83/2 - -1*v1 + 2*v3 -2 <= 0; value: 0 0: 2 4 3 1: 2 5 2: 1 2 4 3 3: 1 3 5 2 0: 3 -> 3 1: 5 -> -53/4 2: 0 -> 15/2 3: 0 -> -45/8 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 + 2*v2 -5*v3 -2 < 0; value: -1 + -6*v2 -2*v3 + 4 <= 0; value: -16 + -4*v0 -5*v1 -3*v3 + 2 < 0; value: -6 + v0 + 3*v3 -3 = 0; value: 0 + 6*v0 = 0; value: 0 0: 1 3 4 5 1: 3 2: 1 2 3: 1 2 3 4 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 + 2*v2 -7 < 0; value: -1 + -6*v2 + 2 <= 0; value: -16 - -4*v0 -5*v1 -3*v3 + 2 < 0; value: -3 - v0 + 3*v3 -3 = 0; value: 0 - 6*v0 = 0; value: 0 0: 1 3 4 5 2 1: 3 2: 1 2 3: 1 2 3 4 0: 0 -> 0 1: 1 -> 2/5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + v1 + 2*v2 -38 <= 0; value: -24 + 2*v2 -1*v3 -8 < 0; value: -2 + -5*v0 -6*v2 -7 <= 0; value: -42 + -3*v2 + 11 <= 0; value: -4 + 4*v0 -6*v1 -6 <= 0; value: -2 0: 1 3 5 1: 1 5 2: 1 2 3 4 3: 2 optimal: 137/21 + + 137/21 <= 0; value: 137/21 - 14/3*v0 + 2*v2 -39 <= 0; value: 0 + -1*v3 -2/3 < 0; value: -14/3 + -881/14 <= 0; value: -881/14 - -3*v2 + 11 <= 0; value: 0 - 4*v0 -6*v1 -6 <= 0; value: 0 0: 1 3 5 1: 1 5 2: 1 2 3 4 3: 2 0: 1 -> 95/14 1: 0 -> 74/21 2: 5 -> 11/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -2*v2 + 8 = 0; value: 0 + 3*v0 + 6*v1 -3*v3 -18 <= 0; value: -3 + -4*v1 -3*v2 -18 <= 0; value: -46 + -1*v0 + 6*v1 -3*v3 -43 <= 0; value: -28 + -5*v0 + 3*v3 -9 = 0; value: 0 0: 1 2 4 5 1: 2 3 4 2: 1 3 3: 2 4 5 optimal: oo + -3/2*v3 + 39/2 <= 0; value: 15 - -6*v0 -2*v2 + 8 = 0; value: 0 + 69/10*v3 -927/10 <= 0; value: -72 - -4*v1 -3*v2 -18 <= 0; value: 0 + 9/2*v3 -221/2 <= 0; value: -97 - -5*v0 + 3*v3 -9 = 0; value: 0 0: 1 2 4 5 1: 2 3 4 2: 1 3 2 4 3: 2 4 5 0: 0 -> 0 1: 4 -> -15/2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 2*v2 + 5*v3 -78 < 0; value: -46 + 3*v0 -5*v1 + v2 < 0; value: -7 + -6*v1 -4*v2 + 28 = 0; value: 0 + -4*v0 + 5*v1 + 4*v3 -21 <= 0; value: -9 + -3*v0 + 4*v1 -5*v3 + 1 <= 0; value: -5 0: 2 4 5 1: 1 2 3 4 5 2: 1 2 3 3: 1 4 5 optimal: oo + -35/6*v3 + 70 < 0; value: 175/3 - 12/13*v0 + 5*v3 -804/13 < 0; value: -12/13 - 3*v0 + 13/3*v2 -70/3 < 0; value: -13/3 - -6*v1 -4*v2 + 28 = 0; value: 0 + 79/6*v3 -129 < 0; value: -308/3 + 5/4*v3 -72 < 0; value: -139/2 0: 2 4 5 1 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 5 0: 4 -> 331/6 1: 4 -> 1061/39 2: 1 -> -879/26 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 6*v2 -6*v3 -34 = 0; value: 0 + -1*v1 + 4*v3 -4 = 0; value: 0 + 6*v2 -1*v3 -28 = 0; value: 0 + -6*v0 + 4*v1 -6*v2 + 9 <= 0; value: -11 + -1*v3 + 2 = 0; value: 0 0: 4 1: 1 2 4 2: 1 3 4 3: 1 2 3 5 optimal: oo + 2*v0 -8 <= 0; value: -6 - 4*v1 + 6*v2 -6*v3 -34 = 0; value: 0 - 3/2*v2 + 5/2*v3 -25/2 = 0; value: 0 - 33/5*v2 -33 = 0; value: 0 + -6*v0 -5 <= 0; value: -11 + = 0; value: 0 0: 4 1: 1 2 4 2: 1 3 4 2 5 3: 1 2 3 5 4 0: 1 -> 1 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 -4*v2 -3*v3 + 29 < 0; value: -3 + v1 = 0; value: 0 + 6*v1 + 3*v2 -25 <= 0; value: -10 + = 0; value: 0 + 6*v1 + 3*v2 -41 <= 0; value: -26 0: 1: 1 2 3 5 2: 1 3 5 3: 1 optimal: oo + 2*v0 <= 0; value: 0 + -4*v2 -3*v3 + 29 < 0; value: -3 - v1 = 0; value: 0 + 3*v2 -25 <= 0; value: -10 + = 0; value: 0 + 3*v2 -41 <= 0; value: -26 0: 1: 1 2 3 5 2: 1 3 5 3: 1 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -5*v3 -11 < 0; value: -29 + -2*v0 + 3*v1 + 2 < 0; value: -1 + -3*v2 + 3*v3 <= 0; value: 0 + -6*v2 -4*v3 <= 0; value: 0 + 3*v0 -3*v1 -15 < 0; value: -9 0: 1 2 5 1: 2 5 2: 3 4 3: 1 3 4 optimal: (10 -e*1) + + 10 < 0; value: 10 + -6*v0 -5*v3 -11 < 0; value: -29 + v0 -13 < 0; value: -10 + -3*v2 + 3*v3 <= 0; value: 0 + -6*v2 -4*v3 <= 0; value: 0 - 3*v0 -3*v1 -15 < 0; value: -3 0: 1 2 5 1: 2 5 2: 3 4 3: 1 3 4 0: 3 -> 3 1: 1 -> -1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 <= 0; value: 0 + -4*v3 + 9 < 0; value: -3 + 2*v1 <= 0; value: 0 + -6*v0 + v1 + 4 <= 0; value: -2 + 5*v1 + 6*v3 -37 < 0; value: -19 0: 4 1: 1 3 4 5 2: 3: 2 5 optimal: oo + 2*v0 <= 0; value: 2 - -6*v1 <= 0; value: 0 + -4*v3 + 9 < 0; value: -3 + <= 0; value: 0 + -6*v0 + 4 <= 0; value: -2 + 6*v3 -37 < 0; value: -19 0: 4 1: 1 3 4 5 2: 3: 2 5 0: 1 -> 1 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + v2 -14 < 0; value: -4 + -6*v2 + 6*v3 + 17 <= 0; value: -7 + v1 -4*v3 <= 0; value: -2 + -2*v0 + 2 = 0; value: 0 + 6*v1 -1*v3 -14 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + v2 -14 < 0; value: -4 + -6*v2 + 6*v3 + 17 <= 0; value: -7 + v1 -4*v3 <= 0; value: -2 + -2*v0 + 2 = 0; value: 0 + 6*v1 -1*v3 -14 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 3: 2 3 5 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + <= 0; value: 0 + 5*v3 -47 < 0; value: -27 + 5*v0 -4*v1 -5 < 0; value: -1 + 6*v0 + 4*v2 -108 < 0; value: -68 + -1*v1 -2*v2 -3*v3 + 24 = 0; value: 0 0: 3 4 1: 3 5 2: 4 5 3: 2 5 optimal: oo + 4/5*v2 + 92/25 < 0; value: 172/25 + <= 0; value: 0 - -25/12*v0 -10/3*v2 -59/12 <= 0; value: 0 - 5*v0 + 8*v2 + 12*v3 -101 < 0; value: -12 + -28/5*v2 -3054/25 < 0; value: -3614/25 - -1*v1 -2*v2 -3*v3 + 24 = 0; value: 0 0: 3 4 2 1: 3 5 2: 4 5 3 2 3: 2 5 3 0: 4 -> -219/25 1: 4 -> -46/5 2: 4 -> 4 3: 4 -> 42/5 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + v3 + 2 <= 0; value: 0 + 4*v0 -2*v1 -6*v2 + 12 < 0; value: -12 + 3*v1 + 3*v2 -26 <= 0; value: -2 + -6*v0 + 3*v2 -1*v3 -2 < 0; value: -1 + -1*v0 + 6*v3 -25 <= 0; value: -14 0: 1 2 4 5 1: 2 3 2: 2 3 4 3: 1 4 5 optimal: (390/23 -e*1) + + 390/23 < 0; value: 390/23 - -4*v0 + v3 + 2 <= 0; value: 0 - 4*v0 -2*v1 -6*v2 + 12 < 0; value: -2 + -702/23 < 0; value: -702/23 - -6*v0 + 3*v2 -1*v3 -2 < 0; value: -3 - 23*v0 -37 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 2: 2 3 4 3: 1 4 5 3 0: 1 -> 37/23 1: 5 -> -66/23 2: 3 -> 301/69 3: 2 -> 102/23 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 -4*v3 -14 < 0; value: -38 + v0 -1*v1 -3*v2 -1 <= 0; value: -10 + -2*v0 -2*v1 + 14 = 0; value: 0 + -1*v1 -1*v3 + 2 <= 0; value: -1 + -3*v0 + v3 -13 < 0; value: -27 0: 1 2 3 5 1: 2 3 4 2: 2 3: 1 4 5 optimal: oo + 6*v2 + 2 <= 0; value: 26 + -12*v2 -26 < 0; value: -74 - -3*v2 + 2*v3 + 2 <= 0; value: 0 - -2*v0 -2*v1 + 14 = 0; value: 0 - v0 -1*v3 -5 <= 0; value: 0 + -3*v2 -26 < 0; value: -38 0: 1 2 3 5 4 1: 2 3 4 2: 2 1 5 3: 1 4 5 2 0: 5 -> 10 1: 2 -> -3 2: 4 -> 4 3: 1 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 6*v1 <= 0; value: 0 + -6*v1 <= 0; value: 0 + -4*v2 -3 <= 0; value: -7 + 3*v0 + 3*v2 -7 <= 0; value: -4 + -1*v1 <= 0; value: 0 0: 1 4 1: 1 2 5 2: 3 4 3: optimal: 37/6 + + 37/6 <= 0; value: 37/6 + -37/3 <= 0; value: -37/3 - -6*v1 <= 0; value: 0 - -4*v2 -3 <= 0; value: 0 - 3*v0 + 3*v2 -7 <= 0; value: 0 + <= 0; value: 0 0: 1 4 1: 1 2 5 2: 3 4 1 3: 0: 0 -> 37/12 1: 0 -> 0 2: 1 -> -3/4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -1*v3 + 4 <= 0; value: -6 + -3*v0 + 9 = 0; value: 0 + 5*v0 -1*v2 -6*v3 -18 <= 0; value: -10 + -3*v0 -6*v1 -4*v2 + 32 <= 0; value: -5 + -3*v0 -4*v3 + 5 <= 0; value: -8 0: 1 2 3 4 5 1: 4 2: 3 4 3: 1 3 5 optimal: oo + 3*v0 + 4/3*v2 -32/3 <= 0; value: -1/3 + -3*v0 -1*v3 + 4 <= 0; value: -6 + -3*v0 + 9 = 0; value: 0 + 5*v0 -1*v2 -6*v3 -18 <= 0; value: -10 - -3*v0 -6*v1 -4*v2 + 32 <= 0; value: 0 + -3*v0 -4*v3 + 5 <= 0; value: -8 0: 1 2 3 4 5 1: 4 2: 3 4 3: 1 3 5 0: 3 -> 3 1: 4 -> 19/6 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 -3*v3 -2 <= 0; value: -11 + -1*v1 -4*v2 -5 < 0; value: -23 + -1*v2 + 1 <= 0; value: -3 + -2*v0 + 5*v1 -4 = 0; value: 0 + -4*v0 -4*v2 + 28 = 0; value: 0 0: 4 5 1: 1 2 4 2: 2 3 5 3: 1 optimal: 28/5 + + 28/5 <= 0; value: 28/5 + -3*v3 + 38/5 <= 0; value: -37/5 + -61/5 < 0; value: -61/5 - -1*v2 + 1 <= 0; value: 0 - -2*v0 + 5*v1 -4 = 0; value: 0 - -4*v0 -4*v2 + 28 = 0; value: 0 0: 4 5 2 1 1: 1 2 4 2: 2 3 5 1 3: 1 0: 3 -> 6 1: 2 -> 16/5 2: 4 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + 6*v0 -3*v1 -15 = 0; value: 0 + -5*v1 -6*v3 + 9 <= 0; value: -18 + 4*v0 -1*v3 -16 <= 0; value: -2 + -6*v0 + v2 + 18 < 0; value: -6 0: 2 4 5 1: 2 3 2: 5 3: 1 3 4 optimal: (194/25 -e*1) + + 194/25 < 0; value: 194/25 - 5*v3 -19 < 0; value: -9/2 - 6*v0 -3*v1 -15 = 0; value: 0 - -5/3*v2 -6*v3 + 4 <= 0; value: 0 + -383/25 < 0; value: -383/25 - -6*v0 + v2 + 18 < 0; value: -6 0: 2 4 5 3 1: 2 3 2: 5 3 4 3: 1 3 4 0: 4 -> 133/50 1: 3 -> 8/25 2: 0 -> -201/25 3: 2 -> 29/10 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 -5*v1 + 32 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -45 <= 0; value: -20 + 5*v0 -3*v1 -16 = 0; value: 0 + -1*v0 + 3*v1 + 5*v3 -66 < 0; value: -42 0: 1 3 4 5 1: 1 4 5 2: 3: 2 5 optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 - -40/3*v0 + 176/3 < 0; value: -4 + -6*v3 + 24 = 0; value: 0 + -23 < 0; value: -23 - 5*v0 -3*v1 -16 = 0; value: 0 + 5*v3 -322/5 < 0; value: -222/5 0: 1 3 4 5 1: 1 4 5 2: 3: 2 5 0: 5 -> 47/10 1: 3 -> 5/2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 3*v1 -95 <= 0; value: -59 + -6*v2 + 6 = 0; value: 0 + 5*v2 + 4*v3 -33 < 0; value: -16 + v0 -5*v3 + 10 <= 0; value: 0 + 2*v0 -10 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 3*v1 -95 <= 0; value: -59 + -6*v2 + 6 = 0; value: 0 + 5*v2 + 4*v3 -33 < 0; value: -16 + v0 -5*v3 + 10 <= 0; value: 0 + 2*v0 -10 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 3: 3 4 0: 5 -> 5 1: 2 -> 2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 + v3 -10 < 0; value: -2 + -3*v0 + 2*v1 + 5*v3 -6 = 0; value: 0 + v0 -1*v3 <= 0; value: 0 + 4*v0 + 4*v1 -5*v3 -3 <= 0; value: -1 + -1*v1 -6*v3 + 8 <= 0; value: -5 0: 2 3 4 1: 2 4 5 2: 1 3: 1 2 3 4 5 optimal: oo + -1*v0 -30*v2 + 44 < 0; value: 12 - 6*v2 + v3 -10 < 0; value: -1 - -3*v0 + 2*v1 + 5*v3 -6 = 0; value: 0 + v0 + 6*v2 -10 < 0; value: -2 + 10*v0 + 90*v2 -141 < 0; value: -31 + -3/2*v0 + 21*v2 -30 < 0; value: -12 0: 2 3 4 5 1: 2 4 5 2: 1 3 4 5 3: 1 2 3 4 5 0: 2 -> 2 1: 1 -> -3/2 2: 1 -> 1 3: 2 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + 4*v1 -6*v2 -7 <= 0; value: -37 + 2*v1 + 2*v2 -6*v3 -16 <= 0; value: -6 + v0 + 3*v1 -4*v3 -5 = 0; value: 0 + -5*v2 + 6*v3 + 3 <= 0; value: -22 + -1*v1 -6*v2 -19 <= 0; value: -49 0: 3 1: 1 2 3 5 2: 1 2 4 5 3: 2 3 4 optimal: oo + 52/17*v0 + 178/17 <= 0; value: 438/17 + -45/17*v0 -241/17 <= 0; value: -466/17 - -2/3*v0 + 2*v2 -10/3*v3 -38/3 <= 0; value: 0 - v0 + 3*v1 -4*v3 -5 = 0; value: 0 + -45/34*v0 -282/17 <= 0; value: -789/34 - 3/5*v0 -34/5*v2 -78/5 <= 0; value: 0 0: 3 5 1 2 4 1: 1 2 3 5 2: 1 2 4 5 3: 2 3 4 5 1 0: 5 -> 5 1: 0 -> -134/17 2: 5 -> -63/34 3: 0 -> -201/34 + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v2 -2*v3 + 1 <= 0; value: -10 + 6*v0 + 6*v1 + 3*v2 -71 <= 0; value: -44 + -3*v0 + 4 <= 0; value: -5 + 4*v0 + 2*v3 -39 <= 0; value: -25 + = 0; value: 0 0: 1 2 3 4 1: 2 2: 1 2 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v2 -2*v3 + 1 <= 0; value: -10 + 6*v0 + 6*v1 + 3*v2 -71 <= 0; value: -44 + -3*v0 + 4 <= 0; value: -5 + 4*v0 + 2*v3 -39 <= 0; value: -25 + = 0; value: 0 0: 1 2 3 4 1: 2 2: 1 2 3: 1 4 0: 3 -> 3 1: 0 -> 0 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 -6*v2 + 3*v3 + 24 < 0; value: -13 + -6*v2 -19 <= 0; value: -49 + -3*v0 + 4*v1 + 3*v2 -76 <= 0; value: -48 + -3*v0 + 1 < 0; value: -2 + v2 -5 <= 0; value: 0 0: 3 4 1: 1 3 2: 1 2 3 5 3: 1 optimal: oo + 2*v0 + 3*v2 -3/2*v3 -12 < 0; value: 1/2 - -4*v1 -6*v2 + 3*v3 + 24 < 0; value: -4 + -6*v2 -19 <= 0; value: -49 + -3*v0 -3*v2 + 3*v3 -52 < 0; value: -61 + -3*v0 + 1 < 0; value: -2 + v2 -5 <= 0; value: 0 0: 3 4 1: 1 3 2: 1 2 3 5 3: 1 3 0: 1 -> 1 1: 4 -> 7/4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + 3*v0 + 5*v1 -25 = 0; value: 0 + -6*v2 + 24 = 0; value: 0 + 3*v0 -3*v2 -3 = 0; value: 0 + -4*v0 -6*v3 + 18 <= 0; value: -20 + v3 -8 <= 0; value: -5 0: 1 3 4 1: 1 2: 2 3 3: 4 5 optimal: 6 + + 6 <= 0; value: 6 - 3*v0 + 5*v1 -25 = 0; value: 0 - -6*v2 + 24 = 0; value: 0 - 3*v0 -3*v2 -3 = 0; value: 0 + -6*v3 -2 <= 0; value: -20 + v3 -8 <= 0; value: -5 0: 1 3 4 1: 1 2: 2 3 4 3: 4 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 5*v1 <= 0; value: 0 + -2*v0 -2*v2 + 8 <= 0; value: 0 + 6*v0 -5*v1 -1 <= 0; value: 0 + -2*v1 -1 <= 0; value: -3 + 4*v2 + 5*v3 -12 = 0; value: 0 0: 1 2 3 1: 1 3 4 2: 2 5 3: 5 optimal: 1/2 + + 1/2 <= 0; value: 1/2 + -5/4 <= 0; value: -5/4 - -2*v0 -2*v2 + 8 <= 0; value: 0 - 6*v0 -5*v1 -1 <= 0; value: 0 - -3*v3 -3 <= 0; value: 0 - 4*v2 + 5*v3 -12 = 0; value: 0 0: 1 2 3 4 1: 1 3 4 2: 2 5 4 1 3: 5 4 1 0: 1 -> -1/4 1: 1 -> -1/2 2: 3 -> 17/4 3: 0 -> -1 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -6*v3 + 14 = 0; value: 0 + -2*v1 -4*v3 -9 <= 0; value: -19 + 4*v2 + 5*v3 -22 = 0; value: 0 + -2*v0 -5*v2 + 25 = 0; value: 0 + 4*v1 -9 < 0; value: -5 0: 4 1: 1 2 5 2: 3 4 3: 1 2 3 optimal: 995/8 + + 995/8 <= 0; value: 995/8 - -2*v1 -6*v3 + 14 = 0; value: 0 - 16/25*v0 -111/5 <= 0; value: 0 - 4*v2 + 5*v3 -22 = 0; value: 0 - -2*v0 -5*v2 + 25 = 0; value: 0 + -119 < 0; value: -119 0: 4 2 5 1: 1 2 5 2: 3 4 2 5 3: 1 2 3 5 0: 5 -> 555/16 1: 1 -> -55/2 2: 3 -> -71/8 3: 2 -> 23/2 + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 <= 0; value: 0 + -1*v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 + 6*v2 -5 <= 0; value: -3 + 4*v3 -4 = 0; value: 0 + -6*v0 + v2 -5*v3 + 28 = 0; value: 0 0: 3 5 1: 2: 1 2 3 5 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 <= 0; value: 0 + -1*v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 + 6*v2 -5 <= 0; value: -3 + 4*v3 -4 = 0; value: 0 + -6*v0 + v2 -5*v3 + 28 = 0; value: 0 0: 3 5 1: 2: 1 2 3 5 3: 2 4 5 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 4*v2 -45 <= 0; value: -9 + -3*v0 -4*v3 -4 <= 0; value: -10 + -1*v0 + 6*v2 -55 <= 0; value: -33 + v0 + 6*v3 -2 = 0; value: 0 + 6*v0 + v2 -39 <= 0; value: -23 0: 2 3 4 5 1: 1 2: 1 3 5 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 4*v2 -45 <= 0; value: -9 + -3*v0 -4*v3 -4 <= 0; value: -10 + -1*v0 + 6*v2 -55 <= 0; value: -33 + v0 + 6*v3 -2 = 0; value: 0 + 6*v0 + v2 -39 <= 0; value: -23 0: 2 3 4 5 1: 1 2: 1 3 5 3: 2 4 0: 2 -> 2 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 6*v1 + 5*v3 -98 < 0; value: -43 + -5*v0 -3*v3 + 28 <= 0; value: -2 + -4*v0 -5*v1 -13 < 0; value: -35 + -6*v0 + 2*v3 + 8 = 0; value: 0 + v2 <= 0; value: 0 0: 1 2 3 4 1: 1 3 2: 5 3: 1 2 4 optimal: (314/9 -e*1) + + 314/9 < 0; value: 314/9 - 27/5*v3 -112 < 0; value: -27/5 + -6112/81 < 0; value: -6112/81 - -4*v0 -5*v1 -13 < 0; value: -5 - -6*v0 + 2*v3 + 8 = 0; value: 0 + v2 <= 0; value: 0 0: 1 2 3 4 1: 1 3 2: 5 3: 1 2 4 0: 3 -> 641/81 1: 2 -> -3212/405 2: 0 -> 0 3: 5 -> 533/27 + 2*v0 -2*v1 <= 0; value: -2 + v0 -1*v1 + 6*v2 -20 <= 0; value: -3 + -1*v1 -2*v2 + 3*v3 + 6 <= 0; value: -1 + 2*v0 -6 = 0; value: 0 + 5*v1 -1*v2 -18 < 0; value: -1 + 4*v1 -1*v3 -30 < 0; value: -15 0: 1 3 1: 1 2 4 5 2: 1 2 4 3: 2 5 optimal: oo + -12*v2 + 40 <= 0; value: 4 - v0 + 8*v2 -3*v3 -26 <= 0; value: 0 - -1*v1 -2*v2 + 3*v3 + 6 <= 0; value: 0 + 2*v0 -6 = 0; value: 0 + 5*v0 + 29*v2 -118 < 0; value: -16 + 11/3*v0 + 64/3*v2 -304/3 < 0; value: -79/3 0: 1 3 5 4 1: 1 2 4 5 2: 1 2 4 5 3: 2 5 1 4 0: 3 -> 3 1: 4 -> 1 2: 3 -> 3 3: 1 -> 1/3 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -1 <= 0; value: -4 + -3*v1 + 4*v2 -2 < 0; value: -1 + 5*v0 + 4*v1 + v2 -34 <= 0; value: -5 + = 0; value: 0 + 5*v1 -70 <= 0; value: -45 0: 1 3 1: 2 3 5 2: 2 3 3: optimal: oo + 2*v0 -8/3*v2 + 4/3 < 0; value: -22/3 + -3*v0 -1 <= 0; value: -4 - -3*v1 + 4*v2 -2 < 0; value: -1/2 + 5*v0 + 19/3*v2 -110/3 < 0; value: -19/3 + = 0; value: 0 + 20/3*v2 -220/3 < 0; value: -140/3 0: 1 3 1: 2 3 5 2: 2 3 5 3: 0: 1 -> 1 1: 5 -> 29/6 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 3*v3 -12 <= 0; value: -6 + -4*v2 + 6*v3 + 2 <= 0; value: -6 + -2*v2 + 9 < 0; value: -1 + -4*v2 -3*v3 -9 < 0; value: -35 + -4*v0 + 6*v2 -21 <= 0; value: -11 0: 5 1: 2: 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + 3*v3 -12 <= 0; value: -6 + -4*v2 + 6*v3 + 2 <= 0; value: -6 + -2*v2 + 9 < 0; value: -1 + -4*v2 -3*v3 -9 < 0; value: -35 + -4*v0 + 6*v2 -21 <= 0; value: -11 0: 5 1: 2: 2 3 4 5 3: 1 2 4 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 = 0; value: 0 + -2*v1 + 6*v3 -18 <= 0; value: -6 + -6*v2 -5*v3 -35 < 0; value: -80 + 4*v0 + 3*v1 + 3*v3 -51 <= 0; value: -33 + -3*v0 -2*v2 -8 <= 0; value: -18 0: 1 4 5 1: 2 4 2: 3 5 3: 2 3 4 optimal: oo + 2*v0 + 36/5*v2 + 60 < 0; value: 96 + 4*v0 = 0; value: 0 - -2*v1 + 6*v3 -18 <= 0; value: 0 - -6*v2 -5*v3 -35 < 0; value: -5 + 4*v0 -72/5*v2 -162 < 0; value: -234 + -3*v0 -2*v2 -8 <= 0; value: -18 0: 1 4 5 1: 2 4 2: 3 5 4 3: 2 3 4 0: 0 -> 0 1: 3 -> -45 2: 5 -> 5 3: 3 -> -12 + 2*v0 -2*v1 <= 0; value: 4 + -2*v2 + 2*v3 <= 0; value: 0 + -1*v1 + 4*v3 + 3 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: 0 + 6*v1 -2*v3 -18 = 0; value: 0 + -6*v1 -4*v2 + 18 = 0; value: 0 0: 1: 2 4 5 2: 1 3 5 3: 1 2 3 4 optimal: oo + 2*v0 -6 <= 0; value: 4 + -2*v2 <= 0; value: 0 - -1*v1 + 4*v3 + 3 = 0; value: 0 + -3*v2 <= 0; value: 0 - 22*v3 = 0; value: 0 + -4*v2 = 0; value: 0 0: 1: 2 4 5 2: 1 3 5 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 6*v2 -44 < 0; value: -26 + v0 + 3*v2 -21 < 0; value: -11 + 3*v0 + 5*v2 -3*v3 -45 <= 0; value: -27 + -2*v0 + 6*v2 -22 < 0; value: -6 + -3*v0 + v1 + 3*v2 -13 < 0; value: -5 0: 2 3 4 5 1: 5 2: 1 2 3 4 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 6*v2 -44 < 0; value: -26 + v0 + 3*v2 -21 < 0; value: -11 + 3*v0 + 5*v2 -3*v3 -45 <= 0; value: -27 + -2*v0 + 6*v2 -22 < 0; value: -6 + -3*v0 + v1 + 3*v2 -13 < 0; value: -5 0: 2 3 4 5 1: 5 2: 1 2 3 4 5 3: 3 0: 1 -> 1 1: 2 -> 2 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v3 -12 = 0; value: 0 + 2*v0 + 2*v1 + 4*v3 -42 <= 0; value: -26 + 2*v1 + 4*v2 -5*v3 -45 <= 0; value: -29 + 2*v0 + v2 -19 < 0; value: -9 + v3 <= 0; value: 0 0: 1 2 4 1: 2 3 2: 3 4 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v3 -12 = 0; value: 0 + 2*v0 + 2*v1 + 4*v3 -42 <= 0; value: -26 + 2*v1 + 4*v2 -5*v3 -45 <= 0; value: -29 + 2*v0 + v2 -19 < 0; value: -9 + v3 <= 0; value: 0 0: 1 2 4 1: 2 3 2: 3 4 3: 1 2 3 5 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -2*v1 + 3*v2 -6*v3 + 1 < 0; value: -26 + -3*v1 + 4*v3 -18 <= 0; value: -11 + -4*v2 + 4 = 0; value: 0 + v1 + 6*v3 -64 < 0; value: -37 + 3*v0 + v1 -5*v3 + 5 = 0; value: 0 0: 5 1: 1 2 4 5 2: 1 3 3: 1 2 4 5 optimal: (478/39 -e*1) + + 478/39 < 0; value: 478/39 - -78/11*v0 + 3*v2 + 169/11 < 0; value: -5 - 9*v0 -11*v3 -3 <= 0; value: 0 - -4*v2 + 4 = 0; value: 0 + -734/13 < 0; value: -734/13 - 3*v0 + v1 -5*v3 + 5 = 0; value: 0 0: 5 1 2 4 1: 1 2 4 5 2: 1 3 4 3: 1 2 4 5 0: 4 -> 257/78 1: 3 -> -36/13 2: 1 -> 1 3: 4 -> 63/26 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -2*v2 + 9 = 0; value: 0 + 4*v1 -6*v3 + 6 = 0; value: 0 + -3*v0 + 2*v1 + 6*v3 -50 <= 0; value: -32 + 2*v1 -5*v2 -6 = 0; value: 0 + 2*v0 + 4*v1 -1*v2 -47 <= 0; value: -31 0: 3 5 1: 1 2 3 4 5 2: 1 4 5 3: 2 3 optimal: 29 + + 29 <= 0; value: 29 - -3*v1 -2*v2 + 9 = 0; value: 0 + -6*v3 + 18 = 0; value: 0 + 6*v3 -193/2 <= 0; value: -157/2 - -19/3*v2 = 0; value: 0 - 2*v0 -35 <= 0; value: 0 0: 3 5 1: 1 2 3 4 5 2: 1 4 5 2 3 3: 2 3 0: 2 -> 35/2 1: 3 -> 3 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v3 <= 0; value: 0 + -2*v2 -3*v3 + 4 < 0; value: -4 + -3*v2 -1*v3 + 10 < 0; value: -2 + 6*v1 -6 = 0; value: 0 + -3*v0 + 5*v2 -39 <= 0; value: -22 0: 5 1: 4 2: 2 3 5 3: 1 2 3 optimal: oo + 2*v0 -2 <= 0; value: 0 + -2*v3 <= 0; value: 0 + -2*v2 -3*v3 + 4 < 0; value: -4 + -3*v2 -1*v3 + 10 < 0; value: -2 - 6*v1 -6 = 0; value: 0 + -3*v0 + 5*v2 -39 <= 0; value: -22 0: 5 1: 4 2: 2 3 5 3: 1 2 3 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -4*v1 -5 < 0; value: -1 + 5*v1 -5*v3 -6 <= 0; value: -31 + 6*v0 -4*v2 -4 <= 0; value: -2 + v3 -7 <= 0; value: -2 + -2*v2 -1*v3 -2 <= 0; value: -9 0: 1 3 1: 1 2 2: 3 5 3: 2 4 5 optimal: (5/2 -e*1) + + 5/2 < 0; value: 5/2 - 4*v0 -4*v1 -5 < 0; value: -1/2 + 5*v0 -5*v3 -49/4 < 0; value: -129/4 + 6*v0 -4*v2 -4 <= 0; value: -2 + v3 -7 <= 0; value: -2 + -2*v2 -1*v3 -2 <= 0; value: -9 0: 1 3 2 1: 1 2 2: 3 5 3: 2 4 5 0: 1 -> 1 1: 0 -> -1/8 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 6*v0 + 4*v2 -16 = 0; value: 0 + -1*v0 + 4*v1 + 3*v2 -24 <= 0; value: -11 + -2*v0 + 5*v1 + 3*v3 -47 <= 0; value: -27 + 6*v0 -3*v2 -9 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 2 3 5 3: 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 6*v0 + 4*v2 -16 = 0; value: 0 + -1*v0 + 4*v1 + 3*v2 -24 <= 0; value: -11 + -2*v0 + 5*v1 + 3*v3 -47 <= 0; value: -27 + 6*v0 -3*v2 -9 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 2 3 5 3: 4 0: 2 -> 2 1: 3 -> 3 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v3 -4 = 0; value: 0 + 3*v0 + 2*v2 -19 <= 0; value: -7 + -3*v1 + 5*v2 -6 <= 0; value: -18 + -6*v1 + v3 -18 < 0; value: -38 + -4*v2 = 0; value: 0 0: 2 1: 3 4 2: 2 3 5 3: 1 4 optimal: 50/3 + + 50/3 <= 0; value: 50/3 + v3 -4 = 0; value: 0 - 3*v0 -19 <= 0; value: 0 - -3*v1 + 5*v2 -6 <= 0; value: 0 + v3 -6 < 0; value: -2 - -4*v2 = 0; value: 0 0: 2 1: 3 4 2: 2 3 5 4 3: 1 4 0: 4 -> 19/3 1: 4 -> -2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v3 -19 <= 0; value: -11 + 6*v1 -1*v2 + 2*v3 -37 <= 0; value: -22 + 4*v0 + 5*v3 -24 <= 0; value: -11 + 5*v2 + v3 -31 < 0; value: -5 + 6*v0 -1*v2 -6*v3 -2 <= 0; value: -1 0: 1 3 5 1: 2 2: 2 4 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v3 -19 <= 0; value: -11 + 6*v1 -1*v2 + 2*v3 -37 <= 0; value: -22 + 4*v0 + 5*v3 -24 <= 0; value: -11 + 5*v2 + v3 -31 < 0; value: -5 + 6*v0 -1*v2 -6*v3 -2 <= 0; value: -1 0: 1 3 5 1: 2 2: 2 4 5 3: 1 2 3 4 5 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -4*v1 + v2 + 2 <= 0; value: -8 + -2*v0 + 3*v2 -4*v3 -2 <= 0; value: -12 + 4*v0 -4*v3 + 16 = 0; value: 0 + -5*v1 + 5 < 0; value: -5 + 2*v0 -2*v1 + 6*v3 -78 <= 0; value: -50 0: 1 2 3 5 1: 1 4 5 2: 1 2 3: 2 3 5 optimal: (12 -e*1) + + 12 < 0; value: 12 + v2 -44 <= 0; value: -40 + 3*v2 -60 <= 0; value: -48 - 4*v0 -4*v3 + 16 = 0; value: 0 - -5*v1 + 5 < 0; value: -5/2 - 8*v3 -88 <= 0; value: 0 0: 1 2 3 5 1: 1 4 5 2: 1 2 3: 2 3 5 1 0: 1 -> 7 1: 2 -> 3/2 2: 4 -> 4 3: 5 -> 11 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -1*v3 -14 <= 0; value: -3 + 4*v1 + 3*v2 -14 = 0; value: 0 + v0 + 5*v1 + 6*v3 -94 <= 0; value: -57 + 6*v0 + 3*v1 -60 < 0; value: -36 + -2*v2 -2 <= 0; value: -6 0: 1 3 4 1: 2 3 4 2: 2 5 3: 1 3 optimal: oo + 2*v0 + 3/2*v2 -7 <= 0; value: 2 + 5*v0 -1*v3 -14 <= 0; value: -3 - 4*v1 + 3*v2 -14 = 0; value: 0 + v0 -15/4*v2 + 6*v3 -153/2 <= 0; value: -57 + 6*v0 -9/4*v2 -99/2 < 0; value: -36 + -2*v2 -2 <= 0; value: -6 0: 1 3 4 1: 2 3 4 2: 2 5 3 4 3: 1 3 0: 3 -> 3 1: 2 -> 2 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 -3*v2 + 1 = 0; value: 0 + 2*v0 -6*v1 -6 <= 0; value: -18 + 2*v0 -6*v2 + 6*v3 + 18 <= 0; value: 0 + 3*v2 -9 = 0; value: 0 + 5*v2 -15 = 0; value: 0 0: 2 3 1: 1 2 2: 1 3 4 5 3: 3 optimal: 14 + + 14 <= 0; value: 14 - 4*v1 -3*v2 + 1 = 0; value: 0 - 2*v0 -18 <= 0; value: 0 - 2*v0 -6*v2 + 6*v3 + 18 <= 0; value: 0 - v0 + 3*v3 = 0; value: 0 + = 0; value: 0 0: 2 3 4 5 1: 1 2 2: 1 3 4 5 2 3: 3 4 5 2 0: 0 -> 9 1: 2 -> 2 2: 3 -> 3 3: 0 -> -3 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 + 3*v2 -3*v3 -35 <= 0; value: -14 + 2*v1 + 4*v2 -18 = 0; value: 0 + -6*v1 -5*v3 + 32 <= 0; value: -23 + -6*v0 -2*v1 -4*v3 + 42 = 0; value: 0 + -2*v0 + v3 -2 <= 0; value: -1 0: 4 5 1: 1 2 3 4 2: 1 2 3: 1 3 4 5 optimal: 6 + + 6 <= 0; value: 6 + -179/4 <= 0; value: -179/4 - 2*v1 + 4*v2 -18 = 0; value: 0 - 32*v0 -80 <= 0; value: 0 - -6*v0 + 4*v2 -4*v3 + 24 = 0; value: 0 - -2*v0 + v3 -2 <= 0; value: 0 0: 4 5 3 1 1: 1 2 3 4 2: 1 2 3 4 3: 1 3 4 5 0: 2 -> 5/2 1: 5 -> -1/2 2: 2 -> 19/4 3: 5 -> 7 + 2*v0 -2*v1 <= 0; value: 4 + -5*v2 + 5 = 0; value: 0 + -6*v0 -4*v1 -7 < 0; value: -19 + -1*v1 <= 0; value: 0 + 6*v1 + 6*v2 -3*v3 + 6 = 0; value: 0 + v2 -2 < 0; value: -1 0: 2 1: 2 3 4 2: 1 4 5 3: 4 optimal: oo + 2*v0 <= 0; value: 4 + -5*v2 + 5 = 0; value: 0 + -6*v0 -7 < 0; value: -19 - -1*v1 <= 0; value: 0 + 6*v2 -3*v3 + 6 = 0; value: 0 + v2 -2 < 0; value: -1 0: 2 1: 2 3 4 2: 1 4 5 3: 4 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -6*v2 + 4*v3 + 14 = 0; value: 0 + -1*v1 -4*v2 + 15 = 0; value: 0 + -2*v0 -1*v1 + 2*v3 + 1 <= 0; value: -2 + -4*v1 + 6*v2 -14 <= 0; value: -8 + -4*v0 + 6*v3 -3 < 0; value: -1 0: 3 5 1: 2 3 4 2: 1 2 4 3: 1 3 5 optimal: (1/22 -e*1) + + 1/22 < 0; value: 1/22 - -6*v2 + 4*v3 + 14 = 0; value: 0 - -1*v1 -4*v2 + 15 = 0; value: 0 + -13/22 <= 0; value: -13/22 - 88/9*v0 -46/3 <= 0; value: 0 - -4*v0 + 6*v3 -3 < 0; value: -18/11 0: 3 5 4 1: 2 3 4 2: 1 2 4 3 3: 1 3 5 4 0: 1 -> 69/44 1: 3 -> 25/11 2: 3 -> 35/11 3: 1 -> 14/11 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -3*v1 <= 0; value: 0 + -4*v0 -6*v1 + v2 + 28 = 0; value: 0 + 2*v0 -4*v1 -5*v2 -15 <= 0; value: -31 + 3*v0 -2*v2 + 6*v3 -35 < 0; value: -18 + -1*v0 -5*v1 + 9 < 0; value: -9 0: 1 2 3 4 5 1: 1 2 3 5 2: 2 3 4 3: 4 optimal: 0 + <= 0; value: 0 - 3*v0 -3*v1 <= 0; value: 0 + -10*v0 + v2 + 28 = 0; value: 0 + -2*v0 -5*v2 -15 <= 0; value: -31 + 3*v0 -2*v2 + 6*v3 -35 < 0; value: -18 + -6*v0 + 9 < 0; value: -9 0: 1 2 3 4 5 1: 1 2 3 5 2: 2 3 4 3: 4 0: 3 -> 3 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + v1 + 5*v2 + 4*v3 -47 <= 0; value: -29 + 6*v0 + 6*v1 -18 = 0; value: 0 + -2*v0 -3*v3 <= 0; value: 0 + 4*v1 -12 <= 0; value: 0 + -3*v0 + 3*v1 -3*v2 <= 0; value: 0 0: 2 3 5 1: 1 2 4 5 2: 1 5 3: 1 3 optimal: oo + 4*v0 -6 <= 0; value: -6 + -1*v0 + 5*v2 + 4*v3 -44 <= 0; value: -29 - 6*v0 + 6*v1 -18 = 0; value: 0 + -2*v0 -3*v3 <= 0; value: 0 + -4*v0 <= 0; value: 0 + -6*v0 -3*v2 + 9 <= 0; value: 0 0: 2 3 5 1 4 1: 1 2 4 5 2: 1 5 3: 1 3 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -6*v1 -2*v2 + 12 = 0; value: 0 + -6*v0 + 3*v1 -4*v3 + 13 = 0; value: 0 + <= 0; value: 0 + 2*v2 + 2*v3 -12 <= 0; value: -4 + v0 -6*v1 + 5*v3 -3 = 0; value: 0 0: 1 2 5 1: 1 2 5 2: 1 4 3: 2 4 5 optimal: -37/18 + -37/18 <= 0; value: -37/18 - 6*v0 -6*v1 -2*v2 + 12 = 0; value: 0 - -3*v0 -1*v2 -4*v3 + 19 = 0; value: 0 + <= 0; value: 0 - 16*v0 -20 <= 0; value: 0 - -11*v0 -3*v3 + 23 = 0; value: 0 0: 1 2 5 4 1: 1 2 5 2: 1 4 2 5 3: 2 4 5 0: 1 -> 5/4 1: 3 -> 41/18 2: 0 -> 35/12 3: 4 -> 37/12 + 2*v0 -2*v1 <= 0; value: -8 + v3 -8 <= 0; value: -5 + -3*v0 -6*v3 -2 <= 0; value: -20 + -4*v0 + 6*v3 -18 = 0; value: 0 + -3*v1 -2*v3 + 2 < 0; value: -16 + -1*v0 + 4*v1 + 4*v3 -29 <= 0; value: -1 0: 2 3 5 1: 4 5 2: 3: 1 2 3 4 5 optimal: (73/3 -e*1) + + 73/3 < 0; value: 73/3 - 2/3*v0 -5 <= 0; value: 0 + -145/2 <= 0; value: -145/2 - -4*v0 + 6*v3 -18 = 0; value: 0 - -3*v1 -2*v3 + 2 < 0; value: -3 + -139/6 < 0; value: -139/6 0: 2 3 5 1 1: 4 5 2: 3: 1 2 3 4 5 0: 0 -> 15/2 1: 4 -> -11/3 2: 2 -> 2 3: 3 -> 8 + 2*v0 -2*v1 <= 0; value: -6 + <= 0; value: 0 + <= 0; value: 0 + v0 + 6*v2 -50 <= 0; value: -24 + -3*v2 -1*v3 + 17 = 0; value: 0 + v1 -5 = 0; value: 0 0: 3 1: 5 2: 3 4 3: 4 optimal: oo + 4*v3 + 22 <= 0; value: 42 + <= 0; value: 0 + <= 0; value: 0 - v0 + 6*v2 -50 <= 0; value: 0 - -3*v2 -1*v3 + 17 = 0; value: 0 - v1 -5 = 0; value: 0 0: 3 1: 5 2: 3 4 3: 4 0: 2 -> 26 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 4*v3 -4 = 0; value: 0 + v0 + v3 -4 <= 0; value: -1 + -4*v0 -3*v3 -7 <= 0; value: -16 + 3*v1 -3*v3 -7 <= 0; value: -16 + v1 + 5*v3 -15 = 0; value: 0 0: 2 3 1: 4 5 2: 1 3: 1 2 3 4 5 optimal: 162 + + 162 <= 0; value: 162 - -2*v2 + 4*v3 -4 = 0; value: 0 - v0 + 1/2*v2 -3 <= 0; value: 0 - -1*v0 -19 <= 0; value: 0 + -376 <= 0; value: -376 - v1 + 5*v3 -15 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 2 3 4 3: 1 2 3 4 5 0: 0 -> -19 1: 0 -> -100 2: 4 -> 44 3: 3 -> 23 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -6*v3 -5 <= 0; value: -3 + -1*v0 + 5*v1 + v2 -10 <= 0; value: 0 + -5*v1 -6*v2 + v3 -12 < 0; value: -45 + -4*v1 + v2 -4*v3 -3 < 0; value: -11 + 2*v0 + v1 + 4*v2 -31 < 0; value: -5 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 3: 1 3 4 optimal: (8695/247 -e*1) + + 8695/247 < 0; value: 8695/247 - 494/73*v0 -6731/73 < 0; value: -494/73 + -20537/494 <= 0; value: -20537/494 - -29/4*v2 + 6*v3 -33/4 <= 0; value: 0 - -4*v1 + v2 -4*v3 -3 < 0; value: -4 - 2*v0 + 73/24*v2 -265/8 < 0; value: -25447/11856 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 1 3: 1 3 4 2 5 0: 4 -> 6237/494 1: 2 -> -2535535/865488 2: 4 -> 67907/36062 3: 1 -> 3159349/865488 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 + 5 = 0; value: 0 + -2*v1 + v3 -4 <= 0; value: -1 + 2*v0 -3*v1 -3*v2 -6 <= 0; value: -3 + -4*v0 + 12 = 0; value: 0 + -5*v0 -5*v1 -1*v2 + 18 <= 0; value: -2 0: 3 4 5 1: 1 2 3 5 2: 3 5 3: 2 optimal: 4 + + 4 <= 0; value: 4 - -5*v1 + 5 = 0; value: 0 + v3 -6 <= 0; value: -1 + -3*v2 -3 <= 0; value: -3 - -4*v0 + 12 = 0; value: 0 + -1*v2 -2 <= 0; value: -2 0: 3 4 5 1: 1 2 3 5 2: 3 5 3: 2 0: 3 -> 3 1: 1 -> 1 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -10 + -6*v1 + 5*v2 + 3*v3 -2 <= 0; value: -1 + 4*v1 + 4*v3 -28 = 0; value: 0 + -5*v1 -4*v2 + 45 = 0; value: 0 + -2*v0 + 5*v2 -62 < 0; value: -37 + -2*v0 + 3*v1 -4*v3 -17 <= 0; value: -10 0: 4 5 1: 1 2 3 5 2: 1 3 4 3: 1 2 5 optimal: oo + 2*v0 -602/61 <= 0; value: -602/61 - 61/5*v2 -62 <= 0; value: 0 - 4*v1 + 4*v3 -28 = 0; value: 0 - -4*v2 + 5*v3 + 10 = 0; value: 0 + -2*v0 -2232/61 < 0; value: -2232/61 + -2*v0 -638/61 <= 0; value: -638/61 0: 4 5 1: 1 2 3 5 2: 1 3 4 5 3: 1 2 5 3 0: 0 -> 0 1: 5 -> 301/61 2: 5 -> 310/61 3: 2 -> 126/61 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v1 + 4*v3 + 26 < 0; value: -1 + -3*v1 + 1 <= 0; value: -14 + -4*v0 -2*v3 + 20 <= 0; value: -2 + -3*v1 -3*v2 + v3 -19 <= 0; value: -43 + 4*v2 -29 <= 0; value: -13 0: 1 3 1: 1 2 4 2: 4 5 3: 1 3 4 optimal: (181/21 -e*1) + + 181/21 < 0; value: 181/21 - -6*v0 -3*v1 + 4*v3 + 26 < 0; value: -3 - 14*v0 -65 <= 0; value: 0 - -4*v0 -2*v3 + 20 <= 0; value: 0 + -3*v2 -135/7 <= 0; value: -219/7 + 4*v2 -29 <= 0; value: -13 0: 1 3 2 4 1: 1 2 4 2: 4 5 3: 1 3 4 2 0: 4 -> 65/14 1: 5 -> 4/3 2: 4 -> 4 3: 3 -> 5/7 + 2*v0 -2*v1 <= 0; value: -4 + -3*v1 + 3*v3 + 5 <= 0; value: -10 + -4*v0 -1*v1 + 7 <= 0; value: -10 + 6*v0 + 2*v3 -26 <= 0; value: -8 + -5*v1 -5*v2 -14 < 0; value: -44 + -3*v0 + 6*v1 -2*v2 -37 <= 0; value: -18 0: 2 3 5 1: 1 2 4 5 2: 4 5 3: 1 3 optimal: oo + 10*v0 -14 < 0; value: 16 - -3*v1 + 3*v3 + 5 <= 0; value: 0 - -4*v0 + v2 + 49/5 <= 0; value: 0 + -2*v0 -46/3 < 0; value: -64/3 - -5*v2 -5*v3 -67/3 < 0; value: -5 + -35*v0 + 123/5 < 0; value: -402/5 0: 2 3 5 1: 1 2 4 5 2: 4 5 2 3 3: 1 3 2 4 5 0: 3 -> 3 1: 5 -> -4 2: 1 -> 11/5 3: 0 -> -17/3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -4*v1 = 0; value: 0 + 5*v0 -3*v1 + 6*v3 -50 <= 0; value: -32 + -5*v0 -1*v3 -2 <= 0; value: -5 + -1*v0 + 4*v3 -27 <= 0; value: -15 + 6*v1 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 3: 2 3 4 5 optimal: oo + -7/3*v3 + 7 <= 0; value: 0 - -3*v0 -4*v1 = 0; value: 0 + 7/6*v3 -71/2 <= 0; value: -32 + 7/3*v3 -12 <= 0; value: -5 + 14/3*v3 -29 <= 0; value: -15 - -9/2*v0 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 3 4 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 + v1 -2*v2 -11 = 0; value: 0 + -3*v0 -3*v3 + 3 < 0; value: -9 + 2*v0 -2*v1 -8 <= 0; value: -2 + 5*v0 -6*v1 + 6*v3 -14 = 0; value: 0 + 2*v2 -8 <= 0; value: -2 0: 1 2 3 4 1: 1 3 4 2: 1 5 3: 2 4 optimal: 8 + + 8 <= 0; value: 8 - 4*v0 + v1 -2*v2 -11 = 0; value: 0 + -7/2*v0 + 8 < 0; value: -6 - 1/3*v0 -2*v3 -10/3 <= 0; value: 0 - 29*v0 -12*v2 + 6*v3 -80 = 0; value: 0 + 5*v0 -23 <= 0; value: -3 0: 1 2 3 4 5 1: 1 3 4 2: 1 5 3 4 3: 2 4 3 5 0: 4 -> 4 1: 1 -> 0 2: 3 -> 5/2 3: 0 -> -1 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 + 4*v3 -38 <= 0; value: -4 + v2 -1 = 0; value: 0 + 2*v0 -19 <= 0; value: -11 + 6*v1 + 6*v3 -64 <= 0; value: -4 + -6*v0 + 6*v3 -6 <= 0; value: 0 0: 3 5 1: 1 4 2: 1 2 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 + 4*v3 -38 <= 0; value: -4 + v2 -1 = 0; value: 0 + 2*v0 -19 <= 0; value: -11 + 6*v1 + 6*v3 -64 <= 0; value: -4 + -6*v0 + 6*v3 -6 <= 0; value: 0 0: 3 5 1: 1 4 2: 1 2 3: 1 4 5 0: 4 -> 4 1: 5 -> 5 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 6*v2 -38 < 0; value: -20 + 6*v0 -44 < 0; value: -26 + 5*v1 -1*v3 -35 <= 0; value: -21 + -4*v0 + 4*v3 -2 <= 0; value: -10 + -1*v0 -5*v1 -1 <= 0; value: -19 0: 2 4 5 1: 1 3 5 2: 1 3: 3 4 optimal: (18 -e*1) + + 18 < 0; value: 18 + 6*v2 -94/3 <= 0; value: -4/3 - 6*v0 -44 < 0; value: -6 + -1*v3 -130/3 < 0; value: -133/3 + 4*v3 -94/3 < 0; value: -82/3 - -1*v0 -5*v1 -1 <= 0; value: 0 0: 2 4 5 1 3 1: 1 3 5 2: 1 3: 3 4 0: 3 -> 19/3 1: 3 -> -22/15 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 -5*v2 + 10 <= 0; value: -20 + -6*v3 -11 < 0; value: -23 + -6*v2 + 5*v3 + 5 < 0; value: -3 + -5*v2 + 11 <= 0; value: -4 + 5*v0 + 5*v2 -5*v3 -5 = 0; value: 0 0: 5 1: 1 2: 1 3 4 5 3: 2 3 5 optimal: oo + 2*v3 -2 <= 0; value: 2 - -5*v1 -5*v2 + 10 <= 0; value: 0 + -6*v3 -11 < 0; value: -23 + 6*v0 -1*v3 -1 < 0; value: -3 + 5*v0 -5*v3 + 6 <= 0; value: -4 - 5*v0 + 5*v2 -5*v3 -5 = 0; value: 0 0: 5 3 4 1: 1 2: 1 3 4 5 3: 2 3 5 4 0: 0 -> 0 1: 3 -> -1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -1*v3 -4 < 0; value: -11 + 5*v2 + 4*v3 -27 < 0; value: -15 + -4*v0 + 16 = 0; value: 0 + -6*v0 + 5*v1 <= 0; value: -9 + 4*v1 -5*v2 + 5*v3 -62 <= 0; value: -35 0: 1 3 4 1: 4 5 2: 2 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -1*v3 -4 < 0; value: -11 + 5*v2 + 4*v3 -27 < 0; value: -15 + -4*v0 + 16 = 0; value: 0 + -6*v0 + 5*v1 <= 0; value: -9 + 4*v1 -5*v2 + 5*v3 -62 <= 0; value: -35 0: 1 3 4 1: 4 5 2: 2 5 3: 1 2 5 0: 4 -> 4 1: 3 -> 3 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + v1 -3*v3 -50 < 0; value: -30 + 4*v1 -5*v3 -17 <= 0; value: -9 + -5*v1 -1*v3 + 5 <= 0; value: -5 + 3*v1 + v2 -6*v3 -6 = 0; value: 0 + -2*v0 + 6*v2 -6*v3 -2 <= 0; value: -8 0: 1 5 1: 1 2 3 4 2: 4 5 3: 1 2 3 4 5 optimal: (3501/244 -e*1) + + 3501/244 < 0; value: 3501/244 - 122/21*v0 -997/21 < 0; value: -122/21 + -6373/488 < 0; value: -6373/488 - 5/3*v2 -11*v3 -5 <= 0; value: 0 - 3*v1 + v2 -6*v3 -6 = 0; value: 0 - -2*v0 + 56/11*v2 + 8/11 <= 0; value: 0 0: 1 5 2 1: 1 2 3 4 2: 4 5 3 1 2 3: 1 2 3 4 5 0: 3 -> 875/122 1: 2 -> 10349/10248 2: 0 -> 9137/3416 3: 0 -> -505/10248 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -2*v1 -2*v2 -68 <= 0; value: -44 + -3*v0 + 5*v3 -7 < 0; value: -2 + 5*v2 -5*v3 -2 <= 0; value: -17 + 6*v2 + 5*v3 -68 <= 0; value: -42 + -5*v1 + 5*v3 -22 <= 0; value: -12 0: 1 2 1: 1 5 2: 1 3 4 3: 2 3 4 5 optimal: oo + -1*v0 + 194/5 <= 0; value: 169/5 - 6*v0 -4*v2 -292/5 <= 0; value: 0 + 9/2*v0 -82 < 0; value: -119/2 - 5*v2 -5*v3 -2 <= 0; value: 0 + 33/2*v0 -1153/5 <= 0; value: -1481/10 - -5*v1 + 5*v3 -22 <= 0; value: 0 0: 1 2 4 1: 1 5 2: 1 3 4 2 3: 2 3 4 5 1 0: 5 -> 5 1: 2 -> -119/10 2: 1 -> -71/10 3: 4 -> -15/2 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 -3*v1 -2*v3 -7 < 0; value: -29 + 5*v0 + 5*v1 -39 <= 0; value: -14 + <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -3 + 2*v0 -1*v2 <= 0; value: 0 0: 1 2 4 5 1: 1 2 2: 4 5 3: 1 optimal: oo + 6*v0 + 4/3*v3 + 14/3 < 0; value: 40/3 - -6*v0 -3*v1 -2*v3 -7 < 0; value: -3 + -5*v0 -10/3*v3 -152/3 < 0; value: -187/3 + <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -3 + 2*v0 -1*v2 <= 0; value: 0 0: 1 2 4 5 1: 1 2 2: 4 5 3: 1 2 0: 1 -> 1 1: 4 -> -14/3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -6 < 0; value: -15 + 3*v0 -6*v1 + 6*v2 -18 < 0; value: -9 + 6*v0 -4*v2 -6 = 0; value: 0 + -2*v1 + 6*v3 = 0; value: 0 + 5*v2 -19 < 0; value: -4 0: 2 3 1: 2 4 2: 1 2 3 5 3: 4 optimal: (29/3 -e*1) + + 29/3 < 0; value: 29/3 - -9/2*v0 -3/2 < 0; value: -9/2 - 3*v0 + 6*v2 -18*v3 -18 < 0; value: -18 - 6*v0 -4*v2 -6 = 0; value: 0 - -2*v1 + 6*v3 = 0; value: 0 + -29 < 0; value: -29 0: 2 3 1 5 1: 2 4 2: 1 2 3 5 3: 4 2 0: 3 -> 2/3 1: 3 -> -1/6 2: 3 -> -1/2 3: 1 -> -1/18 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -5*v2 + 5*v3 + 3 <= 0; value: -2 + -2*v0 -6*v1 -2*v2 + 13 <= 0; value: -1 + 5*v1 -6*v2 + 14 < 0; value: -4 + -4*v0 -6*v1 + v3 + 12 < 0; value: -2 + 4*v3 -22 <= 0; value: -14 0: 2 4 1: 1 2 3 4 2: 1 2 3 3: 1 4 5 optimal: oo + 10/3*v0 -1/3*v3 -4 < 0; value: 26/3 + -11/3*v0 + 43/6*v3 -7/2 < 0; value: -23/6 - -2*v0 -6*v1 -2*v2 + 13 <= 0; value: 0 + -28/3*v0 + 23/6*v3 + 21 < 0; value: -26/3 - -2*v0 + 2*v2 + v3 -1 < 0; value: -1/2 + 4*v3 -22 <= 0; value: -14 0: 2 4 1 3 1: 1 2 3 4 2: 1 2 3 4 3: 1 4 5 3 0: 4 -> 4 1: 0 -> -1/4 2: 3 -> 13/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -15 = 0; value: 0 + 4*v0 -3*v3 -7 < 0; value: -1 + 2*v0 + 2*v1 -26 < 0; value: -10 + -3*v0 -4*v2 -17 < 0; value: -38 + 4*v0 + 4*v2 -4*v3 -42 <= 0; value: -26 0: 2 3 4 5 1: 3 2: 1 4 5 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -15 = 0; value: 0 + 4*v0 -3*v3 -7 < 0; value: -1 + 2*v0 + 2*v1 -26 < 0; value: -10 + -3*v0 -4*v2 -17 < 0; value: -38 + 4*v0 + 4*v2 -4*v3 -42 <= 0; value: -26 0: 2 3 4 5 1: 3 2: 1 4 5 3: 2 5 0: 3 -> 3 1: 5 -> 5 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v3 <= 0; value: 0 + -3*v1 -6*v2 <= 0; value: 0 + v0 + 4*v1 + v2 -3 <= 0; value: -1 + -3*v1 + v2 = 0; value: 0 + -2*v1 + 3*v2 + 5*v3 <= 0; value: 0 0: 3 1: 2 3 4 5 2: 2 3 4 5 3: 1 5 optimal: 6 + + 6 <= 0; value: 6 + -6*v3 <= 0; value: 0 - -3*v1 -6*v2 <= 0; value: 0 - v0 -3 <= 0; value: 0 - 7*v2 = 0; value: 0 + 5*v3 <= 0; value: 0 0: 3 1: 2 3 4 5 2: 2 3 4 5 3: 1 5 0: 2 -> 3 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + = 0; value: 0 + 2*v1 -1*v3 + 2 = 0; value: 0 + v0 + 2*v2 -6 = 0; value: 0 + -2*v1 <= 0; value: 0 + -4*v1 + 6*v3 -14 < 0; value: -2 0: 3 1: 2 4 5 2: 3 3: 2 5 optimal: oo + -4*v2 + 12 <= 0; value: 8 + = 0; value: 0 - 2*v1 -1*v3 + 2 = 0; value: 0 - v0 + 2*v2 -6 = 0; value: 0 - -1*v3 + 2 <= 0; value: 0 + -2 < 0; value: -2 0: 3 1: 2 4 5 2: 3 3: 2 5 4 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -69 <= 0; value: -44 + -3*v0 -5*v3 -8 <= 0; value: -38 + -5*v0 -2*v2 + 33 = 0; value: 0 + v0 + 4*v2 -27 < 0; value: -6 + -4*v0 + 20 = 0; value: 0 0: 1 2 3 4 5 1: 2: 3 4 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -69 <= 0; value: -44 + -3*v0 -5*v3 -8 <= 0; value: -38 + -5*v0 -2*v2 + 33 = 0; value: 0 + v0 + 4*v2 -27 < 0; value: -6 + -4*v0 + 20 = 0; value: 0 0: 1 2 3 4 5 1: 2: 3 4 3: 2 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -3*v1 = 0; value: 0 + 4*v0 -6*v3 <= 0; value: 0 + <= 0; value: 0 + 4*v1 -21 <= 0; value: -13 + 5*v1 -1*v2 -5 = 0; value: 0 0: 1 2 1: 1 4 5 2: 5 3: 2 optimal: 21/4 + + 21/4 <= 0; value: 21/4 - 2*v0 -3*v1 = 0; value: 0 - 4*v0 -6*v3 <= 0; value: 0 + <= 0; value: 0 - 4/5*v2 -17 <= 0; value: 0 - -1*v2 + 5*v3 -5 = 0; value: 0 0: 1 2 5 4 1: 1 4 5 2: 5 4 3: 2 5 4 0: 3 -> 63/8 1: 2 -> 21/4 2: 5 -> 85/4 3: 2 -> 21/4 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 4*v3 + 12 = 0; value: 0 + -1*v2 + 3*v3 + 2 = 0; value: 0 + 6*v1 -2*v2 -14 = 0; value: 0 + -6*v1 -6*v3 + 16 < 0; value: -14 + -2*v1 + 1 < 0; value: -7 0: 1: 1 3 4 5 2: 2 3 3: 1 2 4 optimal: oo + 2*v0 -17/3 < 0; value: 7/3 - -4*v1 + 4*v3 + 12 = 0; value: 0 - -1*v2 + 3*v3 + 2 = 0; value: 0 + = 0; value: 0 - -4*v2 + 6 < 0; value: -4 + -14/3 <= 0; value: -14/3 0: 1: 1 3 4 5 2: 2 3 4 5 3: 1 2 4 3 5 0: 4 -> 4 1: 4 -> 19/6 2: 5 -> 5/2 3: 1 -> 1/6 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -5*v1 -6 < 0; value: -18 + 5*v1 + 6*v2 -5*v3 -38 = 0; value: 0 + -4*v1 + 3*v3 -5 < 0; value: -21 + v1 + 4*v2 -2*v3 -38 < 0; value: -22 + -2*v0 -4*v1 -11 <= 0; value: -31 0: 1 5 1: 1 2 3 4 5 2: 2 4 3: 2 3 4 optimal: oo + 2/5*v0 + 12/5 < 0; value: 16/5 - 4*v0 + 6*v2 -5*v3 -44 < 0; value: -5 - 5*v1 + 6*v2 -5*v3 -38 = 0; value: 0 + -4/5*v0 + 18/5*v2 -133/5 <= 0; value: -87/5 + -4/5*v0 + 8/5*v2 -108/5 <= 0; value: -92/5 + -26/5*v0 -31/5 <= 0; value: -83/5 0: 1 5 4 3 1: 1 2 3 4 5 2: 2 4 1 3 5 3: 2 3 4 1 5 0: 2 -> 2 1: 4 -> 7/5 2: 3 -> 3 3: 0 -> -13/5 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 12 < 0; value: -4 + -5*v0 -2*v3 -11 <= 0; value: -42 + 2*v0 -1*v1 + v2 -18 <= 0; value: -5 + 4*v1 -8 <= 0; value: -4 + 6*v3 -18 = 0; value: 0 0: 2 3 1: 3 4 2: 1 3 3: 2 5 optimal: (184/5 -e*1) + + 184/5 < 0; value: 184/5 - -4*v2 + 12 < 0; value: -2 - -5*v0 -2*v3 -11 <= 0; value: 0 - 2*v0 -1*v1 + v2 -18 <= 0; value: 0 + -476/5 < 0; value: -476/5 - 6*v3 -18 = 0; value: 0 0: 2 3 4 1: 3 4 2: 1 3 4 3: 2 5 4 0: 5 -> -17/5 1: 1 -> -213/10 2: 4 -> 7/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 5*v3 -5 <= 0; value: -1 + 2*v0 -8 = 0; value: 0 + 3*v1 -3*v2 -3 <= 0; value: 0 + -4*v0 -5*v1 + 33 < 0; value: -3 + -3*v0 -4*v1 + 5*v2 + 6 < 0; value: -7 0: 1 2 4 5 1: 3 4 5 2: 3 5 3: 1 optimal: (6/5 -e*1) + + 6/5 < 0; value: 6/5 + 5*v3 -21 <= 0; value: -1 - 2*v0 -8 = 0; value: 0 + -3*v2 + 36/5 < 0; value: -9/5 - -4*v0 -5*v1 + 33 < 0; value: -3/2 + 5*v2 -98/5 <= 0; value: -23/5 0: 1 2 4 5 3 1: 3 4 5 2: 3 5 3: 1 0: 4 -> 4 1: 4 -> 37/10 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + v0 -5*v1 + 4 = 0; value: 0 + -2*v1 -2*v3 + 2 = 0; value: 0 + -4*v0 + 2*v2 -3 < 0; value: -1 + -4*v0 + 4*v3 <= 0; value: -4 + -5*v3 <= 0; value: 0 0: 1 3 4 1: 1 2 2: 3 3: 2 4 5 optimal: 0 + <= 0; value: 0 - v0 -5*v1 + 4 = 0; value: 0 - -2/5*v0 -2*v3 + 2/5 = 0; value: 0 + 2*v2 -7 < 0; value: -1 + -4 <= 0; value: -4 - -5*v3 <= 0; value: 0 0: 1 3 4 2 1: 1 2 2: 3 3: 2 4 5 3 0: 1 -> 1 1: 1 -> 1 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -4*v1 + v2 + v3 + 3 <= 0; value: -9 + -4*v0 + 4*v2 <= 0; value: 0 + v1 + v2 -16 <= 0; value: -10 + -4*v1 -6*v3 + 11 < 0; value: -17 + -6*v0 + v1 + 8 = 0; value: 0 0: 2 5 1: 1 3 4 5 2: 1 2 3 3: 1 4 optimal: (31/81 -e*1) + + 31/81 < 0; value: 31/81 - -23*v2 + v3 + 35 <= 0; value: 0 - -4*v0 + 4*v2 <= 0; value: 0 + -2117/162 < 0; value: -2117/162 - -162/23*v3 + 149/23 < 0; value: -175/46 - -6*v0 + v1 + 8 = 0; value: 0 0: 2 5 4 1 3 1: 1 3 4 5 2: 1 2 3 4 3: 1 4 3 0: 2 -> 11813/7452 1: 4 -> 1877/1242 2: 2 -> 11813/7452 3: 2 -> 473/324 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 6*v2 -6 <= 0; value: -2 + -5*v0 -2*v2 -5*v3 -3 < 0; value: -28 + -2*v1 + 4*v2 + 4 = 0; value: 0 + 4*v0 -9 <= 0; value: -5 + -5*v0 + 4*v1 + 2*v3 -13 < 0; value: -2 0: 2 4 5 1: 1 3 5 2: 1 2 3 3: 2 5 optimal: oo + 12*v0 + 10*v3 + 2 < 0; value: 54 + -25*v0 -25*v3 -17 < 0; value: -142 - -5*v0 -2*v2 -5*v3 -3 < 0; value: -2 - -2*v1 + 4*v2 + 4 = 0; value: 0 + 4*v0 -9 <= 0; value: -5 + -25*v0 -18*v3 -17 < 0; value: -114 0: 2 4 5 1 1: 1 3 5 2: 1 2 3 5 3: 2 5 1 0: 1 -> 1 1: 2 -> -24 2: 0 -> -13 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -35 <= 0; value: -23 + -2*v0 + 2*v2 + 6*v3 -47 <= 0; value: -15 + -2*v0 + 5*v1 -11 <= 0; value: -7 + 4*v2 + v3 -21 = 0; value: 0 + -2*v0 + 3*v1 -5*v3 -14 < 0; value: -39 0: 1 2 3 5 1: 3 5 2: 2 4 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -35 <= 0; value: -23 + -2*v0 + 2*v2 + 6*v3 -47 <= 0; value: -15 + -2*v0 + 5*v1 -11 <= 0; value: -7 + 4*v2 + v3 -21 = 0; value: 0 + -2*v0 + 3*v1 -5*v3 -14 < 0; value: -39 0: 1 2 3 5 1: 3 5 2: 2 4 3: 2 4 5 0: 3 -> 3 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 < 0; value: -4 + v0 + 3*v1 -15 = 0; value: 0 + 3*v0 -9 <= 0; value: 0 + -2*v0 -6*v2 + 2*v3 + 14 <= 0; value: -2 + -3*v1 + 4*v2 <= 0; value: 0 0: 2 3 4 1: 1 2 5 2: 4 5 3: 4 optimal: -2 + -2 <= 0; value: -2 + -4 < 0; value: -4 - v0 + 3*v1 -15 = 0; value: 0 - 3*v0 -9 <= 0; value: 0 + -6*v2 + 2*v3 + 8 <= 0; value: -2 + 4*v2 -12 <= 0; value: 0 0: 2 3 4 1 5 1: 1 2 5 2: 4 5 3: 4 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -6*v1 -27 <= 0; value: -9 + -6*v0 -6*v2 + 18 < 0; value: -24 + -6*v2 -5*v3 + 19 <= 0; value: -14 + v1 -1 <= 0; value: 0 + 6*v1 + 2*v2 -5*v3 -1 <= 0; value: -4 0: 1 2 1: 1 4 5 2: 2 3 5 3: 3 5 optimal: 9 + + 9 <= 0; value: 9 - 6*v0 -6*v1 -27 <= 0; value: 0 + -6*v0 -6*v2 + 18 < 0; value: -24 + -6*v2 -5*v3 + 19 <= 0; value: -14 + v0 -11/2 <= 0; value: -3/2 + 6*v0 + 2*v2 -5*v3 -28 <= 0; value: -13 0: 1 2 4 5 1: 1 4 5 2: 2 3 5 3: 3 5 0: 4 -> 4 1: 1 -> -1/2 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 3*v2 -60 <= 0; value: -39 + 4*v0 + 4*v1 -64 < 0; value: -36 + -2*v0 + 3*v2 -2*v3 -1 = 0; value: 0 + v1 -6*v2 -7 <= 0; value: -21 + -6*v0 + v1 -6 <= 0; value: -20 0: 2 3 5 1: 1 2 4 5 2: 1 3 4 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 3*v2 -60 <= 0; value: -39 + 4*v0 + 4*v1 -64 < 0; value: -36 + -2*v0 + 3*v2 -2*v3 -1 = 0; value: 0 + v1 -6*v2 -7 <= 0; value: -21 + -6*v0 + v1 -6 <= 0; value: -20 0: 2 3 5 1: 1 2 4 5 2: 1 3 4 3: 3 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 6*v2 -75 <= 0; value: -44 + -3*v0 -5*v3 -25 < 0; value: -60 + -2*v3 + 6 < 0; value: -2 + 3*v1 -5*v2 -4 = 0; value: 0 + -5*v3 + 20 = 0; value: 0 0: 1 2 1: 4 2: 1 4 3: 2 3 5 optimal: oo + 2*v0 -10/3*v2 -8/3 <= 0; value: 4 + 5*v0 + 6*v2 -75 <= 0; value: -44 + -3*v0 -5*v3 -25 < 0; value: -60 + -2*v3 + 6 < 0; value: -2 - 3*v1 -5*v2 -4 = 0; value: 0 + -5*v3 + 20 = 0; value: 0 0: 1 2 1: 4 2: 1 4 3: 2 3 5 0: 5 -> 5 1: 3 -> 3 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 + v1 + 2*v3 -8 <= 0; value: -3 + 4*v0 -5*v2 -3*v3 -12 <= 0; value: -32 + 4*v1 + 2*v3 -44 <= 0; value: -24 + v1 -1*v2 -2*v3 -1 <= 0; value: 0 + 5*v0 + 6*v1 + 6*v3 -33 <= 0; value: -3 0: 1 2 5 1: 1 3 4 5 2: 2 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 + v1 + 2*v3 -8 <= 0; value: -3 + 4*v0 -5*v2 -3*v3 -12 <= 0; value: -32 + 4*v1 + 2*v3 -44 <= 0; value: -24 + v1 -1*v2 -2*v3 -1 <= 0; value: 0 + 5*v0 + 6*v1 + 6*v3 -33 <= 0; value: -3 0: 1 2 5 1: 1 3 4 5 2: 2 4 3: 1 2 3 4 5 0: 0 -> 0 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + v0 -5*v3 + 1 <= 0; value: -2 + -3*v0 -6*v1 + 18 = 0; value: 0 + 2*v0 -1*v3 -3 = 0; value: 0 + -3*v1 -5*v3 + 11 = 0; value: 0 + -5*v0 -4*v3 + 2 <= 0; value: -12 0: 1 2 3 5 1: 2 4 2: 3: 1 3 4 5 optimal: 0 + <= 0; value: 0 + -2 <= 0; value: -2 - -3*v0 -6*v1 + 18 = 0; value: 0 - 2*v0 -1*v3 -3 = 0; value: 0 - -17/4*v3 + 17/4 = 0; value: 0 + -12 <= 0; value: -12 0: 1 2 3 5 4 1: 2 4 2: 3: 1 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 18 = 0; value: 0 + 5*v1 + v3 -56 <= 0; value: -35 + 3*v3 -3 = 0; value: 0 + 3*v2 -5*v3 -4 = 0; value: 0 + 2*v0 + 6*v1 + 4*v2 -56 <= 0; value: -20 0: 5 1: 2 5 2: 1 4 5 3: 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 18 = 0; value: 0 + 5*v1 + v3 -56 <= 0; value: -35 + 3*v3 -3 = 0; value: 0 + 3*v2 -5*v3 -4 = 0; value: 0 + 2*v0 + 6*v1 + 4*v2 -56 <= 0; value: -20 0: 5 1: 2 5 2: 1 4 5 3: 2 3 4 0: 0 -> 0 1: 4 -> 4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 4*v2 + 8 = 0; value: 0 + -5*v0 + 4*v1 <= 0; value: 0 + -3*v2 + 5*v3 <= 0; value: -4 + -1*v1 + 4*v2 -6*v3 -2 <= 0; value: -1 + = 0; value: 0 0: 1 2 1: 2 4 2: 1 3 4 3: 3 4 optimal: oo + v0 + 28/5 <= 0; value: 48/5 - -5*v0 + 4*v2 + 8 = 0; value: 0 + -3*v0 -56/5 <= 0; value: -116/5 - -3*v2 + 5*v3 <= 0; value: 0 - -1*v1 + 4*v2 -6*v3 -2 <= 0; value: 0 + = 0; value: 0 0: 1 2 1: 2 4 2: 1 3 4 2 3: 3 4 2 0: 4 -> 4 1: 5 -> -4/5 2: 3 -> 3 3: 1 -> 9/5 + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 -6*v1 + 6*v2 -5 <= 0; value: -29 + 2*v2 -5 <= 0; value: -3 + -1*v1 -4*v2 + 6*v3 -1 <= 0; value: -10 + -5*v0 -4*v3 <= 0; value: 0 + -4*v1 + 2*v2 + 6*v3 + 9 < 0; value: -9 0: 1 4 1: 1 3 5 2: 1 2 3 5 3: 3 4 5 optimal: (10 -e*1) + + 10 < 0; value: 10 - 21/2*v0 -62/3 <= 0; value: 0 + -716/63 <= 0; value: -716/63 - -45/8*v0 -9/2*v2 -13/4 <= 0; value: 0 - -5*v0 -4*v3 <= 0; value: 0 - -4*v1 + 2*v2 + 6*v3 + 9 < 0; value: -4 0: 1 4 3 2 1: 1 3 5 2: 1 2 3 5 3: 3 4 5 1 0: 0 -> 124/63 1: 5 -> -128/63 2: 1 -> -401/126 3: 0 -> -155/63 + 2*v0 -2*v1 <= 0; value: -2 + v0 + 6*v2 -80 < 0; value: -49 + v0 -2*v1 < 0; value: -3 + 2*v0 -2*v1 + 2 = 0; value: 0 + 3*v2 -39 < 0; value: -24 + -3*v0 + 2*v1 + v3 -15 <= 0; value: -9 0: 1 2 3 5 1: 2 3 5 2: 1 4 3: 5 optimal: -2 + -2 <= 0; value: -2 + v0 + 6*v2 -80 < 0; value: -49 + -1*v0 -2 < 0; value: -3 - 2*v0 -2*v1 + 2 = 0; value: 0 + 3*v2 -39 < 0; value: -24 + -1*v0 + v3 -13 <= 0; value: -9 0: 1 2 3 5 1: 2 3 5 2: 1 4 3: 5 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 -1*v2 -14 < 0; value: -7 + -6*v2 -5*v3 -36 < 0; value: -79 + 2*v0 + 4*v2 + 2*v3 -33 <= 0; value: -7 + 3*v0 -15 <= 0; value: -9 + 6*v3 -42 <= 0; value: -12 0: 3 4 1: 1 2: 1 2 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 -1*v2 -14 < 0; value: -7 + -6*v2 -5*v3 -36 < 0; value: -79 + 2*v0 + 4*v2 + 2*v3 -33 <= 0; value: -7 + 3*v0 -15 <= 0; value: -9 + 6*v3 -42 <= 0; value: -12 0: 3 4 1: 1 2: 1 2 3 3: 2 3 5 0: 2 -> 2 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 + v2 + 3*v3 -7 < 0; value: -3 + -2*v1 -1*v3 + 4 = 0; value: 0 + -1*v0 + 4*v2 -34 <= 0; value: -20 + 5*v0 -27 <= 0; value: -17 + <= 0; value: 0 0: 3 4 1: 1 2 2: 1 3 3: 1 2 optimal: oo + 2*v0 -1/6*v2 -5/6 < 0; value: 5/2 - v2 + 6*v3 -19 < 0; value: -3/2 - -2*v1 -1*v3 + 4 = 0; value: 0 + -1*v0 + 4*v2 -34 <= 0; value: -20 + 5*v0 -27 <= 0; value: -17 + <= 0; value: 0 0: 3 4 1: 1 2 2: 1 3 3: 1 2 0: 2 -> 2 1: 1 -> 7/8 2: 4 -> 4 3: 2 -> 9/4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 + 4*v3 -7 < 0; value: -3 + 6*v2 + 3*v3 -9 = 0; value: 0 + 6*v0 + 3*v1 + 2*v2 -16 < 0; value: -2 + 2*v3 -2 <= 0; value: 0 + 4*v1 <= 0; value: 0 0: 3 1: 1 3 5 2: 2 3 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 + 4*v3 -7 < 0; value: -3 + 6*v2 + 3*v3 -9 = 0; value: 0 + 6*v0 + 3*v1 + 2*v2 -16 < 0; value: -2 + 2*v3 -2 <= 0; value: 0 + 4*v1 <= 0; value: 0 0: 3 1: 1 3 5 2: 2 3 3: 1 2 4 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 + 3*v2 -17 = 0; value: 0 + -5*v1 + 4*v2 + 2 <= 0; value: -2 + 5*v1 -1*v2 -16 = 0; value: 0 + 5*v0 -14 <= 0; value: -9 + -6*v1 + 5*v2 -5*v3 + 29 <= 0; value: 0 0: 1 4 1: 2 3 5 2: 1 2 3 5 3: 5 optimal: -6/5 + -6/5 <= 0; value: -6/5 - 5*v0 + 3*v2 -17 = 0; value: 0 + -11 <= 0; value: -11 - 5*v1 -1*v2 -16 = 0; value: 0 - 5*v0 -14 <= 0; value: 0 + -5*v3 + 68/5 <= 0; value: -57/5 0: 1 4 2 5 1: 2 3 5 2: 1 2 3 5 3: 5 0: 1 -> 14/5 1: 4 -> 17/5 2: 4 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -3*v1 -21 <= 0; value: -3 + -4*v0 + 6*v2 -6*v3 + 20 = 0; value: 0 + -5*v0 -6*v2 + 24 <= 0; value: -19 + 5*v1 -26 <= 0; value: -6 + -6*v1 + v2 + 2 < 0; value: -19 0: 1 2 3 1: 1 4 5 2: 2 3 5 3: 2 optimal: (502/77 -e*1) + + 502/77 < 0; value: 502/77 - 6*v0 -3*v1 -21 <= 0; value: 0 - -4*v0 + 6*v2 -6*v3 + 20 = 0; value: 0 - -77/12*v2 + 17/3 <= 0; value: 0 + -1817/77 < 0; value: -1817/77 - -17*v2 + 18*v3 -16 < 0; value: -885/77 0: 1 2 3 5 4 1: 1 4 5 2: 2 3 5 4 3: 2 3 5 4 0: 5 -> 1447/308 1: 4 -> 369/154 2: 3 -> 68/77 3: 3 -> 167/154 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -1*v1 + v2 + 4 <= 0; value: 0 + -5*v0 -4*v1 + 18 = 0; value: 0 + -6*v1 + 6*v3 -5 <= 0; value: -11 + -3*v0 -2*v2 + 2*v3 + 8 = 0; value: 0 + 3*v0 -6*v2 -1 < 0; value: -7 0: 1 2 4 5 1: 1 2 3 2: 1 4 5 3: 3 4 optimal: 33/14 + + 33/14 <= 0; value: 33/14 - -2*v0 -1*v1 + v2 + 4 <= 0; value: 0 - 9*v0 -4*v3 -14 = 0; value: 0 - 21*v0 -53 <= 0; value: 0 - -3*v0 -2*v2 + 2*v3 + 8 = 0; value: 0 + -109/14 < 0; value: -109/14 0: 1 2 4 5 3 1: 1 2 3 2: 1 4 5 2 3 3: 3 4 5 2 0: 2 -> 53/21 1: 2 -> 113/84 2: 2 -> 67/28 3: 1 -> 61/28 + 2*v0 -2*v1 <= 0; value: 8 + v1 -4*v2 + 12 = 0; value: 0 + -2*v0 + 5 < 0; value: -3 + -5*v0 -4*v2 + 2*v3 -5 < 0; value: -31 + <= 0; value: 0 + v0 + v2 -20 < 0; value: -13 0: 2 3 5 1: 1 2: 1 3 5 3: 3 optimal: oo + 12*v0 -4*v3 + 34 < 0; value: 70 - v1 -4*v2 + 12 = 0; value: 0 + -2*v0 + 5 < 0; value: -3 - -5*v0 -4*v2 + 2*v3 -5 < 0; value: -4 + <= 0; value: 0 + -1/4*v0 + 1/2*v3 -85/4 < 0; value: -83/4 0: 2 3 5 1: 1 2: 1 3 5 3: 3 5 0: 4 -> 4 1: 0 -> -27 2: 3 -> -15/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -1*v3 + 1 <= 0; value: 0 + 6*v0 -4*v2 -19 < 0; value: -7 + -1*v1 + v2 -1 <= 0; value: -3 + -6*v0 + 3*v1 + 4*v2 -4 <= 0; value: -1 + <= 0; value: 0 0: 2 4 1: 3 4 2: 2 3 4 3: 1 optimal: oo + -1*v0 + 23/2 < 0; value: 15/2 + -1*v3 + 1 <= 0; value: 0 - 6*v0 -4*v2 -19 < 0; value: -7/2 - -1*v1 + v2 -1 <= 0; value: 0 + 9/2*v0 -161/4 < 0; value: -89/4 + <= 0; value: 0 0: 2 4 1: 3 4 2: 2 3 4 3: 1 0: 4 -> 4 1: 5 -> 9/8 2: 3 -> 17/8 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 5*v2 -2*v3 + 2 = 0; value: 0 + -5*v0 -4*v1 -6*v3 + 27 = 0; value: 0 + -6*v0 + 4*v1 -4*v3 -9 < 0; value: -3 + <= 0; value: 0 + 4*v0 -10 <= 0; value: -6 0: 2 3 5 1: 2 3 2: 1 3: 1 2 3 optimal: oo + 9/2*v0 + 15/2*v2 -21/2 <= 0; value: -6 - 5*v2 -2*v3 + 2 = 0; value: 0 - -5*v0 -4*v1 -6*v3 + 27 = 0; value: 0 + -11*v0 -25*v2 + 8 < 0; value: -3 + <= 0; value: 0 + 4*v0 -10 <= 0; value: -6 0: 2 3 5 1: 2 3 2: 1 3 3: 1 2 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -6*v1 + 2*v2 + 8 = 0; value: 0 + 5*v1 + 5*v2 -5*v3 -39 <= 0; value: -24 + -5*v1 -5*v2 + 33 <= 0; value: -2 + -4*v1 + v2 -4 <= 0; value: -17 + -2*v0 + 3*v2 + 5*v3 -32 <= 0; value: -13 0: 1 5 1: 1 2 3 4 2: 1 2 3 4 5 3: 2 5 optimal: oo + 3/2*v0 -53/10 <= 0; value: 11/5 - 2*v0 -6*v1 + 2*v2 + 8 = 0; value: 0 + -5*v3 -6 <= 0; value: -26 - -5/3*v0 -20/3*v2 + 79/3 <= 0; value: 0 + -5/4*v0 -213/20 <= 0; value: -169/10 + -11/4*v0 + 5*v3 -403/20 <= 0; value: -139/10 0: 1 5 3 4 2 1: 1 2 3 4 2: 1 2 3 4 5 3: 2 5 0: 5 -> 5 1: 4 -> 39/10 2: 3 -> 27/10 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 + 2*v2 -8 <= 0; value: -4 + 6*v0 -6*v3 + 10 <= 0; value: -8 + -1*v2 -1 <= 0; value: -3 + 2*v2 -4*v3 + 8 = 0; value: 0 + -4*v0 <= 0; value: 0 0: 1 2 5 1: 2: 1 3 4 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 + 2*v2 -8 <= 0; value: -4 + 6*v0 -6*v3 + 10 <= 0; value: -8 + -1*v2 -1 <= 0; value: -3 + 2*v2 -4*v3 + 8 = 0; value: 0 + -4*v0 <= 0; value: 0 0: 1 2 5 1: 2: 1 3 4 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v2 -36 = 0; value: 0 + v1 -3*v3 -3 < 0; value: -8 + 6*v0 -37 <= 0; value: -7 + -4*v0 -6*v3 -27 <= 0; value: -59 + 6*v0 -6*v1 -44 <= 0; value: -20 0: 1 3 4 5 1: 2 5 2: 1 3: 2 4 optimal: 44/3 + + 44/3 <= 0; value: 44/3 + 6*v0 + 2*v2 -36 = 0; value: 0 + v0 -3*v3 -31/3 < 0; value: -34/3 + 6*v0 -37 <= 0; value: -7 + -4*v0 -6*v3 -27 <= 0; value: -59 - 6*v0 -6*v1 -44 <= 0; value: 0 0: 1 3 4 5 2 1: 2 5 2: 1 3: 2 4 0: 5 -> 5 1: 1 -> -7/3 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + <= 0; value: 0 + -2*v1 + 4 = 0; value: 0 + 3*v1 + 3*v2 + 3*v3 -55 <= 0; value: -34 + -3*v0 + 2*v1 -3*v3 -6 <= 0; value: -20 + -2*v0 -2*v3 + 9 < 0; value: -3 0: 4 5 1: 2 3 4 2: 3 3: 3 4 5 optimal: oo + 2*v0 -4 <= 0; value: 6 + <= 0; value: 0 - -2*v1 + 4 = 0; value: 0 + 3*v2 + 3*v3 -49 <= 0; value: -34 + -3*v0 -3*v3 -2 <= 0; value: -20 + -2*v0 -2*v3 + 9 < 0; value: -3 0: 4 5 1: 2 3 4 2: 3 3: 3 4 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 + 2*v3 -2 <= 0; value: -8 + v0 + 2*v2 -15 <= 0; value: -1 + -5*v0 -3*v3 <= 0; value: -26 + 3*v0 -1*v1 + 3*v2 -35 <= 0; value: -9 + -4*v2 + 3*v3 + 14 = 0; value: 0 0: 2 3 4 1: 4 2: 1 2 4 5 3: 1 3 5 optimal: oo + 7/2*v0 + 49 <= 0; value: 63 + -5/6*v0 -9 <= 0; value: -37/3 + -3/2*v0 -8 <= 0; value: -14 - -5*v0 -3*v3 <= 0; value: 0 - 3*v0 -1*v1 + 3*v2 -35 <= 0; value: 0 - -4*v2 + 3*v3 + 14 = 0; value: 0 0: 2 3 4 1 1: 4 2: 1 2 4 5 3: 1 3 5 2 0: 4 -> 4 1: 1 -> -55/2 2: 5 -> -3/2 3: 2 -> -20/3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 6*v2 + 6*v3 -70 <= 0; value: -38 + 4*v1 + v3 -54 < 0; value: -29 + -4*v0 -4*v3 -1 <= 0; value: -37 + v1 + 6*v3 -60 < 0; value: -25 + 6*v1 + 4*v3 -126 <= 0; value: -76 0: 3 1: 1 2 4 5 2: 1 3: 1 2 3 4 5 optimal: oo + 8*v0 -6*v2 + 143/2 <= 0; value: 183/2 - -2*v1 + 6*v2 + 6*v3 -70 <= 0; value: 0 + -13*v0 + 12*v2 -789/4 < 0; value: -901/4 - -4*v0 -4*v3 -1 <= 0; value: 0 + -9*v0 + 3*v2 -389/4 < 0; value: -509/4 + -22*v0 + 18*v2 -683/2 <= 0; value: -787/2 0: 3 2 4 5 1: 1 2 4 5 2: 1 2 4 5 3: 1 2 3 4 5 0: 4 -> 4 1: 5 -> -167/4 2: 2 -> 2 3: 5 -> -17/4 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 + 6*v2 -6 = 0; value: 0 + 4*v2 + 5*v3 -23 <= 0; value: -4 + 4*v2 -6*v3 + 14 = 0; value: 0 + 2*v1 + 2*v2 + 6*v3 -25 <= 0; value: -1 + <= 0; value: 0 0: 1 1: 4 2: 1 2 3 4 3: 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 + 6*v2 -6 = 0; value: 0 + 4*v2 + 5*v3 -23 <= 0; value: -4 + 4*v2 -6*v3 + 14 = 0; value: 0 + 2*v1 + 2*v2 + 6*v3 -25 <= 0; value: -1 + <= 0; value: 0 0: 1 1: 4 2: 1 2 3 4 3: 2 3 4 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 6*v3 -61 <= 0; value: -31 + 3*v1 <= 0; value: 0 + 4*v1 + 4*v3 -20 = 0; value: 0 + -6*v0 + 5*v3 -54 < 0; value: -29 + -5*v0 -5*v1 <= 0; value: 0 0: 1 4 5 1: 2 3 5 2: 3: 1 3 4 optimal: 124 + + 124 <= 0; value: 124 - v0 -31 <= 0; value: 0 + -93 <= 0; value: -93 - 4*v1 + 4*v3 -20 = 0; value: 0 + -60 < 0; value: -60 - -5*v0 + 5*v3 -25 <= 0; value: 0 0: 1 4 5 2 1: 2 3 5 2: 3: 1 3 4 5 2 0: 0 -> 31 1: 0 -> -31 2: 2 -> 2 3: 5 -> 36 + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -2*v1 + 4*v3 + 15 = 0; value: 0 + 6*v0 + 5*v2 -66 <= 0; value: -21 + 4*v2 -29 <= 0; value: -17 + 3*v0 -2*v3 -28 < 0; value: -13 + -1*v3 <= 0; value: 0 0: 1 2 4 1: 1 2: 2 3 3: 1 4 5 optimal: (95/3 -e*1) + + 95/3 < 0; value: 95/3 - -3*v0 -2*v1 + 4*v3 + 15 = 0; value: 0 - 6*v0 + 5*v2 -66 <= 0; value: 0 + -21 < 0; value: -21 - -5/2*v2 + 5 < 0; value: -5/4 - -1*v3 <= 0; value: 0 0: 1 2 4 1: 1 2: 2 3 4 3: 1 4 5 0: 5 -> 107/12 1: 0 -> -47/8 2: 3 -> 5/2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 -3*v1 + v3 + 1 <= 0; value: -3 + 6*v0 <= 0; value: 0 + v0 -1*v1 + 3*v2 -13 <= 0; value: 0 + -2*v0 + 4*v1 + 6*v2 -38 = 0; value: 0 + -3*v0 + 4*v1 -10 <= 0; value: -2 0: 1 2 3 4 5 1: 1 3 4 5 2: 3 4 3: 1 optimal: -4 + -4 <= 0; value: -4 + v3 -5 <= 0; value: -3 - 6*v0 <= 0; value: 0 - v0 -1*v1 + 3*v2 -13 <= 0; value: 0 - 2*v0 + 18*v2 -90 = 0; value: 0 + -2 <= 0; value: -2 0: 1 2 3 4 5 1: 1 3 4 5 2: 3 4 1 5 3: 1 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -6*v3 + 13 <= 0; value: -17 + v0 + 3*v2 -5*v3 -2 <= 0; value: -7 + 5*v0 + v1 + 3*v3 -31 = 0; value: 0 + 4*v3 -24 <= 0; value: -8 + 5*v3 -56 < 0; value: -36 0: 1 2 3 1: 3 2: 2 3: 1 2 3 4 5 optimal: oo + -36*v2 + 358 <= 0; value: 214 + 6*v2 -87 <= 0; value: -63 - v0 + 3*v2 -32 <= 0; value: 0 - 5*v0 + v1 + 3*v3 -31 = 0; value: 0 - 4*v3 -24 <= 0; value: 0 + -26 < 0; value: -26 0: 1 2 3 1: 3 2: 2 1 3: 1 2 3 4 5 0: 3 -> 20 1: 4 -> -87 2: 4 -> 4 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -4*v3 -10 <= 0; value: -23 + 2*v2 + 2*v3 -26 <= 0; value: -16 + -3*v0 -2*v1 -7 < 0; value: -17 + 4*v1 -56 <= 0; value: -36 + 6*v0 <= 0; value: 0 0: 3 5 1: 3 4 2: 1 2 3: 1 2 optimal: (7 -e*1) + + 7 < 0; value: 7 + 3*v2 -4*v3 -10 <= 0; value: -23 + 2*v2 + 2*v3 -26 <= 0; value: -16 - -3*v0 -2*v1 -7 < 0; value: -2 + -70 < 0; value: -70 - 6*v0 <= 0; value: 0 0: 3 5 4 1: 3 4 2: 1 2 3: 1 2 0: 0 -> 0 1: 5 -> -5/2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 4*v3 + 1 < 0; value: -5 + 2*v1 + 2*v2 -34 <= 0; value: -18 + -3*v2 + 4*v3 -3 = 0; value: 0 + 5*v0 + 5*v1 -141 <= 0; value: -91 + 6*v0 -2*v3 -25 <= 0; value: -1 0: 4 5 1: 2 4 2: 1 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 4*v3 + 1 < 0; value: -5 + 2*v1 + 2*v2 -34 <= 0; value: -18 + -3*v2 + 4*v3 -3 = 0; value: 0 + 5*v0 + 5*v1 -141 <= 0; value: -91 + 6*v0 -2*v3 -25 <= 0; value: -1 0: 4 5 1: 2 4 2: 1 2 3 3: 1 3 5 0: 5 -> 5 1: 5 -> 5 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 5*v1 + 5*v2 + 2*v3 -62 < 0; value: -29 + -4*v1 -1*v2 + 4*v3 -8 <= 0; value: -3 + 5*v0 + 4*v1 -8 = 0; value: 0 + 3*v0 -6*v1 -2*v2 -4 <= 0; value: -22 + -6*v0 -2*v2 -6*v3 + 30 = 0; value: 0 0: 3 4 5 1: 1 2 3 4 2: 1 2 4 5 3: 1 2 5 optimal: (574/29 -e*1) + + 574/29 < 0; value: 574/29 - 58/21*v2 -382/7 < 0; value: -58/21 + -3203/87 < 0; value: -3203/87 - 5*v0 + 4*v1 -8 = 0; value: 0 - -11/2*v2 -21/2*v3 + 73/2 <= 0; value: 0 - -6*v0 -2*v2 -6*v3 + 30 = 0; value: 0 0: 3 4 5 2 1 1: 1 2 3 4 2: 1 2 4 5 3: 1 2 5 4 0: 0 -> 3104/609 1: 2 -> -2662/609 2: 3 -> 544/29 3: 4 -> -1289/203 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -6*v3 + 3 <= 0; value: -18 + v0 + 2*v1 + 4*v3 -53 <= 0; value: -31 + -6*v0 -14 <= 0; value: -38 + -1*v3 + 3 < 0; value: -1 + -3*v1 + 1 <= 0; value: -2 0: 2 3 1: 1 2 5 2: 3: 1 2 4 optimal: (80 -e*1) + + 80 < 0; value: 80 + -14 <= 0; value: -14 - v0 + 4*v3 -157/3 <= 0; value: 0 + -256 < 0; value: -256 - -1*v3 + 3 < 0; value: -1/2 - -3*v1 + 1 <= 0; value: 0 0: 2 3 1: 1 2 5 2: 3: 1 2 4 3 0: 4 -> 115/3 1: 1 -> 1/3 2: 1 -> 1 3: 4 -> 7/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 -1*v3 -3 <= 0; value: -11 + 3*v0 + 4*v1 + 5*v3 -53 < 0; value: -18 + v0 -2*v1 + 6*v3 -41 <= 0; value: -22 + 3*v0 + 2*v1 -1*v3 -8 <= 0; value: -3 + -3*v1 + 2*v3 <= 0; value: -1 0: 1 2 3 4 1: 2 3 4 5 2: 3: 1 2 3 4 5 optimal: 218/5 + + 218/5 <= 0; value: 218/5 - -4*v0 -1*v3 -3 <= 0; value: 0 + -1127/5 < 0; value: -1127/5 + -752/5 <= 0; value: -752/5 - 5/3*v0 -9 <= 0; value: 0 - -3*v1 + 2*v3 <= 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 3: 1 2 3 4 5 0: 1 -> 27/5 1: 3 -> -82/5 2: 5 -> 5 3: 4 -> -123/5 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 3*v1 -34 < 0; value: -15 + v1 + 4*v3 -13 < 0; value: -6 + -1*v3 + 1 <= 0; value: 0 + -2*v2 + 1 < 0; value: -9 + v0 + 2*v1 -23 <= 0; value: -15 0: 1 5 1: 1 2 5 2: 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 3*v1 -34 < 0; value: -15 + v1 + 4*v3 -13 < 0; value: -6 + -1*v3 + 1 <= 0; value: 0 + -2*v2 + 1 < 0; value: -9 + v0 + 2*v1 -23 <= 0; value: -15 0: 1 5 1: 1 2 5 2: 4 3: 2 3 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 -10 <= 0; value: -5 + -3*v1 -2*v2 + 8 = 0; value: 0 + -6*v1 -4*v3 + 24 = 0; value: 0 + -6*v1 + 2*v3 -4 < 0; value: -10 + -2*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3: 3 4 5 optimal: oo + 2*v0 -8/3 <= 0; value: -2/3 - 5*v3 -20 <= 0; value: 0 - -3*v1 -2*v2 + 8 = 0; value: 0 - 4*v2 -4*v3 + 8 = 0; value: 0 + -4 < 0; value: -4 + -11 <= 0; value: -11 0: 1: 2 3 4 2: 1 2 3 4 3: 3 4 5 1 0: 1 -> 1 1: 2 -> 4/3 2: 1 -> 2 3: 3 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 -4*v3 -34 < 0; value: -71 + -1*v0 -1*v2 + 7 = 0; value: 0 + -3*v1 + 2 < 0; value: -1 + 2*v0 -4*v2 + 16 = 0; value: 0 + -4*v3 + 8 <= 0; value: -4 0: 2 4 1: 3 2: 1 2 4 3: 1 5 optimal: (8/3 -e*1) + + 8/3 < 0; value: 8/3 + -4*v3 -59 < 0; value: -71 - -1*v0 -1*v2 + 7 = 0; value: 0 - -3*v1 + 2 < 0; value: -1/2 - -6*v2 + 30 = 0; value: 0 + -4*v3 + 8 <= 0; value: -4 0: 2 4 1: 3 2: 1 2 4 3: 1 5 0: 2 -> 2 1: 1 -> 5/6 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + 2*v1 + v2 -28 <= 0; value: -8 + -2*v3 <= 0; value: 0 + -5*v1 + 4*v2 + 18 < 0; value: -2 + -4*v0 -1*v1 + 5*v3 + 20 = 0; value: 0 + 4*v0 -2*v2 -2*v3 -30 <= 0; value: -14 0: 1 4 5 1: 1 3 4 2: 1 3 5 3: 2 4 5 optimal: (75/7 -e*1) + + 75/7 < 0; value: 75/7 + -255/14 < 0; value: -255/14 - -2*v3 <= 0; value: 0 - 20*v0 + 4*v2 -82 < 0; value: -75/7 - -4*v0 -1*v1 + 5*v3 + 20 = 0; value: 0 - -14/5*v2 -68/5 <= 0; value: 0 0: 1 4 5 3 1: 1 3 4 2: 1 3 5 3: 2 4 5 3 1 0: 4 -> 127/28 1: 4 -> 13/7 2: 0 -> -34/7 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 2*v1 -11 <= 0; value: -7 + 6*v0 + 6*v1 -45 < 0; value: -15 + -1*v0 -6*v2 -3 < 0; value: -16 + -2*v0 -1*v2 -1*v3 <= 0; value: -4 + -5*v0 + 2*v1 -2*v2 <= 0; value: -1 0: 1 2 3 4 5 1: 1 2 5 2: 3 4 5 3: 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 2*v1 -11 <= 0; value: -7 + 6*v0 + 6*v1 -45 < 0; value: -15 + -1*v0 -6*v2 -3 < 0; value: -16 + -2*v0 -1*v2 -1*v3 <= 0; value: -4 + -5*v0 + 2*v1 -2*v2 <= 0; value: -1 0: 1 2 3 4 5 1: 1 2 5 2: 3 4 5 3: 4 0: 1 -> 1 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 + 2*v2 -14 = 0; value: 0 + -1*v3 <= 0; value: 0 + v0 -1*v1 -2 < 0; value: -1 + -1*v0 -1*v1 + 6 <= 0; value: -3 + -4*v0 -4*v1 + 3 < 0; value: -33 0: 3 4 5 1: 1 3 4 5 2: 1 3: 2 optimal: (4 -e*1) + + 4 < 0; value: 4 - 3*v1 + 2*v2 -14 = 0; value: 0 + -1*v3 <= 0; value: 0 - v0 + 2/3*v2 -20/3 < 0; value: -1/2 + -2*v0 + 8 <= 0; value: -2 + -8*v0 + 11 <= 0; value: -29 0: 3 4 5 1: 1 3 4 5 2: 1 3 4 5 3: 2 0: 5 -> 5 1: 4 -> 7/2 2: 1 -> 7/4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + v1 -6*v3 -1 = 0; value: 0 + -6*v0 + 3*v2 + 4 <= 0; value: -20 + -2*v0 -5*v1 -10 <= 0; value: -23 + -2*v3 <= 0; value: 0 + <= 0; value: 0 0: 2 3 1: 1 3 2: 2 3: 1 4 optimal: oo + 2*v0 -2 <= 0; value: 6 - v1 -6*v3 -1 = 0; value: 0 + -6*v0 + 3*v2 + 4 <= 0; value: -20 + -2*v0 -15 <= 0; value: -23 - -2*v3 <= 0; value: 0 + <= 0; value: 0 0: 2 3 1: 1 3 2: 2 3: 1 4 3 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 7 <= 0; value: -1 + -1*v2 + 4 <= 0; value: -1 + 3*v0 -1*v3 -11 <= 0; value: -4 + -3*v3 -14 <= 0; value: -29 + <= 0; value: 0 0: 1 3 1: 2: 2 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 7 <= 0; value: -1 + -1*v2 + 4 <= 0; value: -1 + 3*v0 -1*v3 -11 <= 0; value: -4 + -3*v3 -14 <= 0; value: -29 + <= 0; value: 0 0: 1 3 1: 2: 2 3: 3 4 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v2 -2*v3 + 1 <= 0; value: -3 + -6*v0 -4*v1 + 26 = 0; value: 0 + -3*v1 -1*v2 -4 < 0; value: -10 + 6*v0 + 4*v3 -55 <= 0; value: -29 + -1*v1 + 4*v2 + 2 <= 0; value: 0 0: 2 4 1: 2 3 5 2: 1 3 5 3: 1 4 optimal: (478/39 -e*1) + + 478/39 < 0; value: 478/39 - -6*v2 -2*v3 + 1 <= 0; value: 0 - -6*v0 -4*v1 + 26 = 0; value: 0 - 13/3*v3 -73/6 < 0; value: -7/4 + -175/13 <= 0; value: -175/13 - 3/2*v0 + 4*v2 -9/2 <= 0; value: 0 0: 2 4 3 5 1: 2 3 5 2: 1 3 5 4 3: 1 4 3 0: 3 -> 61/13 1: 2 -> -7/13 2: 0 -> -33/52 3: 2 -> 125/52 + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 <= 0; value: 0 + 6*v2 <= 0; value: 0 + -2*v2 + 3*v3 -22 <= 0; value: -10 + 2*v1 + 4*v2 -2*v3 -1 <= 0; value: -7 + 6*v0 + v2 + 6*v3 -106 < 0; value: -64 0: 5 1: 4 2: 1 2 3 4 5 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 <= 0; value: 0 + 6*v2 <= 0; value: 0 + -2*v2 + 3*v3 -22 <= 0; value: -10 + 2*v1 + 4*v2 -2*v3 -1 <= 0; value: -7 + 6*v0 + v2 + 6*v3 -106 < 0; value: -64 0: 5 1: 4 2: 1 2 3 4 5 3: 3 4 5 0: 3 -> 3 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 6*v3 -27 < 0; value: -9 + -4*v0 + v2 -1 <= 0; value: 0 + 3*v0 -3 <= 0; value: 0 + 3*v2 -37 <= 0; value: -22 + -2*v0 -4*v1 + 5*v2 -66 <= 0; value: -43 0: 2 3 5 1: 1 5 2: 2 4 5 3: 1 optimal: oo + 3*v0 -5/2*v2 + 33 < 0; value: 47/2 - -3*v1 + 6*v3 -27 < 0; value: -3 + -4*v0 + v2 -1 <= 0; value: 0 + 3*v0 -3 <= 0; value: 0 + 3*v2 -37 <= 0; value: -22 - -2*v0 + 5*v2 -8*v3 -30 <= 0; value: 0 0: 2 3 5 1: 1 5 2: 2 4 5 3: 1 5 0: 1 -> 1 1: 0 -> -39/4 2: 5 -> 5 3: 3 -> -7/8 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 -14 <= 0; value: -8 + 2*v0 -3*v3 -5 <= 0; value: -13 + -6*v0 + v3 -5 <= 0; value: -13 + -1*v0 -5*v1 + 3*v2 -2 <= 0; value: -6 + 2*v0 -5*v2 -2*v3 + 9 <= 0; value: 0 0: 2 3 4 5 1: 4 2: 1 4 5 3: 2 3 5 optimal: oo + 24/5*v0 + 26/25 <= 0; value: 266/25 + -12*v0 -76/5 <= 0; value: -196/5 + -16*v0 -20 <= 0; value: -52 - -6*v0 + v3 -5 <= 0; value: 0 - -1*v0 -5*v1 + 3*v2 -2 <= 0; value: 0 - 2*v0 -5*v2 -2*v3 + 9 <= 0; value: 0 0: 2 3 4 5 1 1: 4 2: 1 4 5 3: 2 3 5 1 0: 2 -> 2 1: 1 -> -83/25 2: 1 -> -21/5 3: 4 -> 17 + 2*v0 -2*v1 <= 0; value: 0 + 5*v3 -20 = 0; value: 0 + -5*v0 -4*v1 -3*v3 -10 < 0; value: -40 + 4*v1 + 2*v2 -25 <= 0; value: -11 + v1 + 3*v2 + 5*v3 -66 <= 0; value: -35 + -5*v0 -1*v3 + 14 = 0; value: 0 0: 2 5 1: 2 3 4 2: 3 4 3: 1 2 4 5 optimal: (20 -e*1) + + 20 < 0; value: 20 - 5*v3 -20 = 0; value: 0 - -5*v0 -4*v1 -3*v3 -10 < 0; value: -4 + 2*v2 -57 < 0; value: -51 + 3*v2 -54 < 0; value: -45 - -5*v0 + 10 = 0; value: 0 0: 2 5 3 4 1: 2 3 4 2: 3 4 3: 1 2 4 5 3 0: 2 -> 2 1: 2 -> -7 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -6 <= 0; value: -15 + -3*v3 + 7 <= 0; value: -5 + -4*v1 -6*v2 -36 <= 0; value: -78 + -4*v2 -9 <= 0; value: -29 + 3*v0 -3*v3 + 6 = 0; value: 0 0: 5 1: 1 3 2: 3 4 3: 2 5 optimal: oo + 2*v3 <= 0; value: 8 - -3*v1 -6 <= 0; value: 0 + -3*v3 + 7 <= 0; value: -5 + -6*v2 -28 <= 0; value: -58 + -4*v2 -9 <= 0; value: -29 - 3*v0 -3*v3 + 6 = 0; value: 0 0: 5 1: 1 3 2: 3 4 3: 2 5 0: 2 -> 2 1: 3 -> -2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -3*v3 -15 <= 0; value: -38 + 6*v3 -47 < 0; value: -17 + -3*v0 + v2 + 4 <= 0; value: -4 + -5*v0 + 3 <= 0; value: -17 + 2*v0 -2*v2 -4*v3 + 4 <= 0; value: -16 0: 1 3 4 5 1: 2: 3 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -3*v3 -15 <= 0; value: -38 + 6*v3 -47 < 0; value: -17 + -3*v0 + v2 + 4 <= 0; value: -4 + -5*v0 + 3 <= 0; value: -17 + 2*v0 -2*v2 -4*v3 + 4 <= 0; value: -16 0: 1 3 4 5 1: 2: 3 5 3: 1 2 5 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 5*v0 + v1 + 6*v2 -23 <= 0; value: -1 + v2 -3 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -5 = 0; value: 0 + -5*v2 -1*v3 + 19 = 0; value: 0 + -1*v0 -1*v2 <= 0; value: -3 0: 1 3 5 1: 1 2: 1 2 3 4 5 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 5*v0 + v1 + 6*v2 -23 <= 0; value: -1 + v2 -3 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -5 = 0; value: 0 + -5*v2 -1*v3 + 19 = 0; value: 0 + -1*v0 -1*v2 <= 0; value: -3 0: 1 3 5 1: 1 2: 1 2 3 4 5 3: 3 4 0: 0 -> 0 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 <= 0; value: -12 + -6*v0 + 6*v2 + 2 < 0; value: -4 + -5*v0 -2*v1 + 23 = 0; value: 0 + -2*v0 + 5*v1 -37 <= 0; value: -23 + -5*v2 + 6*v3 + 2 <= 0; value: -2 0: 2 3 4 1: 1 3 4 2: 2 5 3: 5 optimal: 46/5 + + 46/5 <= 0; value: 46/5 - 15/2*v0 -69/2 <= 0; value: 0 + 6*v2 -128/5 < 0; value: -68/5 - -5*v0 -2*v1 + 23 = 0; value: 0 + -231/5 <= 0; value: -231/5 + -5*v2 + 6*v3 + 2 <= 0; value: -2 0: 2 3 4 1 1: 1 3 4 2: 2 5 3: 5 0: 3 -> 23/5 1: 4 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 + 5*v2 -4*v3 + 1 <= 0; value: -25 + 2*v2 -1*v3 -1 = 0; value: 0 + -1*v3 + 3 <= 0; value: 0 + 5*v0 + 3*v3 -17 <= 0; value: -8 + v0 + 6*v3 -27 <= 0; value: -9 0: 4 5 1: 1 2: 1 2 3: 1 2 3 4 5 optimal: 139/54 + + 139/54 <= 0; value: 139/54 - -6*v1 + 5*v2 -4*v3 + 1 <= 0; value: 0 - 2*v2 -1*v3 -1 = 0; value: 0 + -37/27 <= 0; value: -37/27 - 9/2*v0 -7/2 <= 0; value: 0 - v0 + 12*v2 -33 <= 0; value: 0 0: 4 5 3 1: 1 2: 1 2 4 5 3 3: 1 2 3 4 5 0: 0 -> 7/9 1: 4 -> -55/108 2: 2 -> 145/54 3: 3 -> 118/27 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -16 = 0; value: 0 + 6*v2 -64 < 0; value: -40 + 3*v0 -4*v2 + 3 <= 0; value: -4 + v1 + 3*v3 -13 <= 0; value: -4 + -2*v0 -1*v1 -3*v3 -5 <= 0; value: -20 0: 3 5 1: 4 5 2: 1 2 3 3: 4 5 optimal: oo + 6*v0 + 6*v3 + 10 <= 0; value: 40 + 4*v2 -16 = 0; value: 0 + 6*v2 -64 < 0; value: -40 + 3*v0 -4*v2 + 3 <= 0; value: -4 + -2*v0 -18 <= 0; value: -24 - -2*v0 -1*v1 -3*v3 -5 <= 0; value: 0 0: 3 5 4 1: 4 5 2: 1 2 3 3: 4 5 0: 3 -> 3 1: 3 -> -17 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -5*v2 -1*v3 -5 < 0; value: -3 + -1*v1 -5*v3 + 4 = 0; value: 0 + 2*v1 -21 < 0; value: -13 + -4*v1 + 5*v3 -12 <= 0; value: -28 + -5*v0 + 5*v2 -3*v3 + 1 <= 0; value: -4 0: 1 5 1: 2 3 4 2: 1 5 3: 1 2 4 5 optimal: oo + 5*v2 + 233/25 < 0; value: 233/25 - 2*v0 -5*v2 -153/25 < 0; value: -2 - -1*v1 -5*v3 + 4 = 0; value: 0 + -121/5 < 0; value: -121/5 - 25*v3 -28 <= 0; value: 0 + -15/2*v2 -883/50 < 0; value: -883/50 0: 1 5 1: 2 3 4 2: 1 5 3: 1 2 4 5 3 0: 1 -> 103/50 1: 4 -> -8/5 2: 0 -> 0 3: 0 -> 28/25 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -6 <= 0; value: -16 + v1 -5*v2 + 6*v3 -5 < 0; value: -19 + 4*v3 -5 <= 0; value: -1 + -5*v1 -20 < 0; value: -45 + 4*v0 + 3*v3 -34 <= 0; value: -11 0: 5 1: 1 2 4 2: 2 3: 2 3 5 optimal: oo + -3/2*v3 + 23 <= 0; value: 43/2 - -2*v1 -6 <= 0; value: 0 + -5*v2 + 6*v3 -8 < 0; value: -27 + 4*v3 -5 <= 0; value: -1 + -5 < 0; value: -5 - 4*v0 + 3*v3 -34 <= 0; value: 0 0: 5 1: 1 2 4 2: 2 3: 2 3 5 0: 5 -> 31/4 1: 5 -> -3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 5*v2 -14 <= 0; value: -8 + 4*v1 + 4*v2 -46 < 0; value: -22 + 5*v1 + 2*v2 + 2*v3 -60 < 0; value: -39 + 4*v2 -20 <= 0; value: -8 + -3*v2 + 3 < 0; value: -6 0: 1 1: 2 3 2: 1 2 3 4 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 5*v2 -14 <= 0; value: -8 + 4*v1 + 4*v2 -46 < 0; value: -22 + 5*v1 + 2*v2 + 2*v3 -60 < 0; value: -39 + 4*v2 -20 <= 0; value: -8 + -3*v2 + 3 < 0; value: -6 0: 1 1: 2 3 2: 1 2 3 4 5 3: 3 0: 3 -> 3 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + 2*v1 + 4*v2 -4 <= 0; value: -9 + 4*v1 -6*v3 + 1 <= 0; value: -3 + v1 + 2*v2 + 2*v3 -6 = 0; value: 0 + -3*v1 + 5 <= 0; value: -1 + -6*v2 + 2*v3 -6 <= 0; value: -2 0: 1 1: 1 2 3 4 2: 1 3 5 3: 2 3 5 optimal: oo + 2*v0 -10/3 <= 0; value: 8/3 + -3*v0 + 4*v2 -2/3 <= 0; value: -29/3 + 6*v2 -16/3 <= 0; value: -16/3 - v1 + 2*v2 + 2*v3 -6 = 0; value: 0 - 6*v2 + 6*v3 -13 <= 0; value: 0 + -8*v2 -5/3 <= 0; value: -5/3 0: 1 1: 1 2 3 4 2: 1 3 5 4 2 1 3: 2 3 5 4 1 0: 3 -> 3 1: 2 -> 5/3 2: 0 -> 0 3: 2 -> 13/6 + 2*v0 -2*v1 <= 0; value: -2 + v1 -6*v2 -1*v3 -8 < 0; value: -5 + -2*v0 -3*v2 + 4 = 0; value: 0 + -6*v0 -1*v2 -3*v3 + 12 = 0; value: 0 + v0 -3*v1 + 5 < 0; value: -2 + 2*v0 + 5*v1 -19 = 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 1 2 3 3: 1 3 optimal: (6/11 -e*1) + + 6/11 < 0; value: 6/11 + -1/9 <= 0; value: -1/9 - -2*v0 -3*v2 + 4 = 0; value: 0 - 8*v2 -3*v3 = 0; value: 0 - -99/80*v3 -2 < 0; value: -1 - 2*v0 + 5*v1 -19 = 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 1 2 3 4 3: 1 3 4 0: 2 -> 27/11 1: 3 -> 31/11 2: 0 -> -10/33 3: 0 -> -80/99 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v2 -9 < 0; value: -1 + = 0; value: 0 + -6*v0 + v1 -1 = 0; value: 0 + -3*v0 -1*v2 -3*v3 + 7 = 0; value: 0 + -6*v1 -3*v2 + 9 <= 0; value: 0 0: 3 4 1: 1 3 5 2: 1 4 5 3: 4 optimal: (-1/3 -e*1) + -1/3 < 0; value: -1/3 - 1/2*v2 -3/2 < 0; value: -1/2 + = 0; value: 0 - -6*v0 + v1 -1 = 0; value: 0 - -3*v0 -1*v2 -3*v3 + 7 = 0; value: 0 - 9*v2 + 36*v3 -81 <= 0; value: 0 0: 3 4 5 1 1: 1 3 5 2: 1 4 5 3: 4 5 1 0: 0 -> -1/12 1: 1 -> 1/2 2: 1 -> 2 3: 2 -> 7/4 + 2*v0 -2*v1 <= 0; value: -6 + v0 -6*v1 -4*v3 + 8 < 0; value: -27 + 2*v0 -4*v1 -4*v3 -17 <= 0; value: -43 + -3*v1 -2*v2 + 20 = 0; value: 0 + -1*v0 -6*v2 -4*v3 + 23 < 0; value: -14 + 4*v0 -5*v1 -4*v3 -21 < 0; value: -49 0: 1 2 4 5 1: 1 2 3 5 2: 3 4 3: 1 2 4 5 optimal: oo + 5/3*v0 + 4/3*v3 -8/3 < 0; value: 3 - v0 + 4*v2 -4*v3 -32 < 0; value: -4 + 4/3*v0 -4/3*v3 -67/3 <= 0; value: -25 - -3*v1 -2*v2 + 20 = 0; value: 0 + 1/2*v0 -10*v3 -25 < 0; value: -109/2 + 19/6*v0 -2/3*v3 -83/3 <= 0; value: -53/2 0: 1 2 4 5 1: 1 2 3 5 2: 3 4 2 1 5 3: 1 2 4 5 0: 1 -> 1 1: 4 -> 1/6 2: 4 -> 39/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 2*v2 + v3 -57 <= 0; value: -18 + -6*v0 -3*v2 -38 < 0; value: -77 + 4*v1 + v2 -34 <= 0; value: -17 + 4*v1 -4*v2 + 1 <= 0; value: -7 + <= 0; value: 0 0: 1 2 1: 3 4 2: 1 2 3 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 2*v2 + v3 -57 <= 0; value: -18 + -6*v0 -3*v2 -38 < 0; value: -77 + 4*v1 + v2 -34 <= 0; value: -17 + 4*v1 -4*v2 + 1 <= 0; value: -7 + <= 0; value: 0 0: 1 2 1: 3 4 2: 1 2 3 4 3: 1 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 8 = 0; value: 0 + 5*v0 -1*v2 -1*v3 -4 <= 0; value: 0 + -4*v1 -6*v2 -28 <= 0; value: -66 + 3*v3 -6 <= 0; value: -3 + 3*v1 -13 <= 0; value: -7 0: 1 2 1: 3 5 2: 2 3 3: 2 4 optimal: oo + 2*v0 + 3*v2 + 14 <= 0; value: 33 + -4*v0 + 8 = 0; value: 0 + 5*v0 -1*v2 -1*v3 -4 <= 0; value: 0 - -4*v1 -6*v2 -28 <= 0; value: 0 + 3*v3 -6 <= 0; value: -3 + -9/2*v2 -34 <= 0; value: -113/2 0: 1 2 1: 3 5 2: 2 3 5 3: 2 4 0: 2 -> 2 1: 2 -> -29/2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 + 3*v3 -90 <= 0; value: -48 + 4*v2 -35 <= 0; value: -15 + 4*v2 -5*v3 <= 0; value: 0 + 2*v2 -6*v3 <= 0; value: -14 + 2*v0 + 6*v3 -50 <= 0; value: -16 0: 5 1: 1 2: 1 2 3 4 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 + 3*v3 -90 <= 0; value: -48 + 4*v2 -35 <= 0; value: -15 + 4*v2 -5*v3 <= 0; value: 0 + 2*v2 -6*v3 <= 0; value: -14 + 2*v0 + 6*v3 -50 <= 0; value: -16 0: 5 1: 1 2: 1 2 3 4 3: 1 3 4 5 0: 5 -> 5 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 -1 <= 0; value: -3 + -3*v1 -1*v3 + 2 < 0; value: -8 + -3*v0 -4*v1 + 23 = 0; value: 0 + -2*v1 + 2*v3 -9 <= 0; value: -5 + -1*v3 -2 <= 0; value: -6 0: 3 1: 2 3 4 2: 1 3: 2 4 5 optimal: (73/4 -e*1) + + 73/4 < 0; value: 73/4 + -2*v2 -1 <= 0; value: -3 - -4*v3 + 31/2 < 0; value: -1/4 - -3*v0 -4*v1 + 23 = 0; value: 0 - 3/2*v0 + 2*v3 -41/2 <= 0; value: 0 + -47/8 <= 0; value: -47/8 0: 3 2 4 1: 2 3 4 2: 1 3: 2 4 5 0: 5 -> 101/12 1: 2 -> -9/16 2: 1 -> 1 3: 4 -> 63/16 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 <= 0; value: -1 + -3*v3 + 6 = 0; value: 0 + -3*v0 + 2*v2 -6 <= 0; value: -1 + -5*v0 + 5*v2 + 2*v3 -51 < 0; value: -32 + -1*v0 + 1 = 0; value: 0 0: 3 4 5 1: 1 2: 3 4 3: 2 4 optimal: 2 + + 2 <= 0; value: 2 - -1*v1 <= 0; value: 0 + -3*v3 + 6 = 0; value: 0 + 2*v2 -9 <= 0; value: -1 + 5*v2 + 2*v3 -56 < 0; value: -32 - -1*v0 + 1 = 0; value: 0 0: 3 4 5 1: 1 2: 3 4 3: 2 4 0: 1 -> 1 1: 1 -> 0 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 10 + -4*v0 -2*v1 + 15 <= 0; value: -5 + -4*v2 -5*v3 + 25 = 0; value: 0 + 2*v0 -4*v1 + 6*v2 -41 < 0; value: -1 + -6*v1 <= 0; value: 0 + -3*v1 + 2*v2 -5*v3 -10 < 0; value: -5 0: 1 3 1: 1 3 4 5 2: 2 3 5 3: 2 5 optimal: oo + 15/2*v3 + 7/2 < 0; value: 11 + -15*v3 + 8 < 0; value: -7 - -4*v2 -5*v3 + 25 = 0; value: 0 - 2*v0 + 6*v2 -41 < 0; value: -1/2 - -6*v1 <= 0; value: 0 + -15/2*v3 + 5/2 < 0; value: -5 0: 1 3 1: 1 3 4 5 2: 2 3 5 1 3: 2 5 1 0: 5 -> 21/4 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 15 = 0; value: 0 + -5*v1 -5*v2 -5 < 0; value: -15 + -4*v0 -3*v3 -20 <= 0; value: -41 + 5*v0 -3*v2 -33 <= 0; value: -21 + 6*v1 + 2*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 2 5 2: 2 4 5 3: 3 5 optimal: oo + 2*v0 + 2*v2 + 2 < 0; value: 10 + -5*v0 + 15 = 0; value: 0 - -5*v1 -5*v2 -5 < 0; value: -5 + -4*v0 -3*v3 -20 <= 0; value: -41 + 5*v0 -3*v2 -33 <= 0; value: -21 + -4*v2 -3*v3 -5 < 0; value: -18 0: 1 3 4 1: 2 5 2: 2 4 5 3: 3 5 0: 3 -> 3 1: 1 -> -1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 2*v3 -4 <= 0; value: -13 + -1*v1 -1*v2 + 2 = 0; value: 0 + -3*v1 + 3 = 0; value: 0 + 2*v0 -4*v2 -11 <= 0; value: -5 + -2*v1 + 1 <= 0; value: -1 0: 1 4 1: 2 3 5 2: 2 4 3: 1 optimal: 13 + + 13 <= 0; value: 13 + 2*v3 -53/2 <= 0; value: -41/2 - -1*v1 -1*v2 + 2 = 0; value: 0 - 3*v2 -3 = 0; value: 0 - 2*v0 -15 <= 0; value: 0 + -1 <= 0; value: -1 0: 1 4 1: 2 3 5 2: 2 4 3 5 3: 1 0: 5 -> 15/2 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + v1 + 5*v2 -17 <= 0; value: -3 + -3*v0 + 4*v1 + 4*v3 -7 <= 0; value: 0 + 4*v0 -6*v1 -1*v3 + 3 <= 0; value: -9 + 2*v1 -6*v3 -8 = 0; value: 0 + -1*v0 -5*v3 + 3 = 0; value: 0 0: 2 3 5 1: 1 2 3 4 2: 1 3: 2 3 4 5 optimal: 22/13 + + 22/13 <= 0; value: 22/13 + 5*v2 -178/13 <= 0; value: -48/13 + -93/13 <= 0; value: -93/13 - 39/5*v0 -162/5 <= 0; value: 0 - 2*v1 -6*v3 -8 = 0; value: 0 - -1*v0 -5*v3 + 3 = 0; value: 0 0: 2 3 5 1 1: 1 2 3 4 2: 1 3: 2 3 4 5 1 0: 3 -> 54/13 1: 4 -> 43/13 2: 2 -> 2 3: 0 -> -3/13 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 -5*v3 + 30 = 0; value: 0 + 5*v2 -20 = 0; value: 0 + -5*v1 + v2 + 21 = 0; value: 0 + -3*v0 -5*v1 -2*v2 + 48 = 0; value: 0 + -1*v0 + v1 = 0; value: 0 0: 1 4 5 1: 3 4 5 2: 2 3 4 3: 1 optimal: 0 + <= 0; value: 0 - -1*v0 -5*v3 + 30 = 0; value: 0 - 5*v2 -20 = 0; value: 0 - -5*v1 + v2 + 21 = 0; value: 0 - 15*v3 -75 = 0; value: 0 + = 0; value: 0 0: 1 4 5 1: 3 4 5 2: 2 3 4 5 3: 1 4 5 0: 5 -> 5 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 2*v1 -2*v3 -26 = 0; value: 0 + -1*v0 + 5*v1 -9 <= 0; value: -4 + <= 0; value: 0 + 6*v1 -31 <= 0; value: -19 + 2*v1 -3*v2 + 5 = 0; value: 0 0: 1 2 1: 1 2 4 5 2: 5 3: 1 optimal: oo + 2*v0 -3*v2 + 5 <= 0; value: 6 - 6*v0 + 2*v1 -2*v3 -26 = 0; value: 0 + -1*v0 + 15/2*v2 -43/2 <= 0; value: -4 + <= 0; value: 0 + 9*v2 -46 <= 0; value: -19 - -6*v0 -3*v2 + 2*v3 + 31 = 0; value: 0 0: 1 2 5 4 1: 1 2 4 5 2: 5 2 4 3: 1 5 2 4 0: 5 -> 5 1: 2 -> 2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 -3*v3 <= 0; value: 0 + -5*v1 -4*v3 -1 < 0; value: -6 + -6*v0 + 6*v1 + v2 -18 <= 0; value: -7 + 4*v0 -3*v3 <= 0; value: 0 + 2*v0 -2*v1 -3*v2 + 2 < 0; value: -15 0: 1 3 4 5 1: 2 3 5 2: 3 5 3: 1 2 4 optimal: oo + 3*v2 -2 < 0; value: 13 + -5/4*v0 -45/8*v2 + 9/2 <= 0; value: -189/8 - -5*v1 -4*v3 -1 < 0; value: -5 + -8*v2 -12 < 0; value: -52 + 31/4*v0 -45/8*v2 + 9/2 <= 0; value: -189/8 - 2*v0 -3*v2 + 8/5*v3 + 12/5 <= 0; value: 0 0: 1 3 4 5 1: 2 3 5 2: 3 5 1 4 3: 1 2 4 5 3 0: 0 -> 0 1: 1 -> -11/2 2: 5 -> 5 3: 0 -> 63/8 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 <= 0; value: 0 + v2 -2 <= 0; value: -1 + -6*v1 + 5*v2 <= 0; value: -1 + 6*v0 -6*v2 + v3 <= 0; value: -2 + -3*v0 + 4*v1 -11 <= 0; value: -7 0: 1 4 5 1: 3 5 2: 2 3 4 3: 4 optimal: oo + 1/3*v0 -5/18*v3 <= 0; value: -10/9 + -6*v0 <= 0; value: 0 + v0 + 1/6*v3 -2 <= 0; value: -4/3 - -6*v1 + 5*v2 <= 0; value: 0 - 6*v0 -6*v2 + v3 <= 0; value: 0 + 1/3*v0 + 5/9*v3 -11 <= 0; value: -79/9 0: 1 4 5 2 1: 3 5 2: 2 3 4 5 3: 4 2 5 0: 0 -> 0 1: 1 -> 5/9 2: 1 -> 2/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 2*v1 + 5*v3 + 7 <= 0; value: 0 + -5*v0 + 6*v1 -9 = 0; value: 0 + -1*v0 + 5*v2 -46 < 0; value: -24 + -1*v0 + v1 -2 <= 0; value: -1 + 2*v1 -8 = 0; value: 0 0: 1 2 3 4 1: 1 2 4 5 2: 3 3: 1 optimal: -2 + -2 <= 0; value: -2 + 5*v3 <= 0; value: 0 - -5*v0 + 6*v1 -9 = 0; value: 0 + 5*v2 -49 < 0; value: -24 + -1 <= 0; value: -1 - 5/3*v0 -5 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 4 5 2: 3 3: 1 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 2*v2 -6*v3 + 3 <= 0; value: -1 + -4*v2 -3 <= 0; value: -7 + v0 -1 <= 0; value: 0 + 6*v0 -5*v1 -8 < 0; value: -2 + -1*v2 + 1 <= 0; value: 0 0: 3 4 1: 4 2: 1 2 5 3: 1 optimal: oo + -2/5*v0 + 16/5 < 0; value: 14/5 + 2*v2 -6*v3 + 3 <= 0; value: -1 + -4*v2 -3 <= 0; value: -7 + v0 -1 <= 0; value: 0 - 6*v0 -5*v1 -8 < 0; value: -1 + -1*v2 + 1 <= 0; value: 0 0: 3 4 1: 4 2: 1 2 5 3: 1 0: 1 -> 1 1: 0 -> -1/5 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v2 + 3 <= 0; value: -21 + -5*v0 + 6*v1 + 4*v3 -13 = 0; value: 0 + 4*v0 -2*v3 -10 = 0; value: 0 + 2*v0 + 4*v1 -51 <= 0; value: -29 + -6*v2 + 24 = 0; value: 0 0: 2 3 4 1: 2 4 2: 1 5 3: 2 3 optimal: oo + 3*v0 -11 <= 0; value: 4 + -6*v2 + 3 <= 0; value: -21 - -5*v0 + 6*v1 + 4*v3 -13 = 0; value: 0 - 4*v0 -2*v3 -10 = 0; value: 0 + -29 <= 0; value: -29 + -6*v2 + 24 = 0; value: 0 0: 2 3 4 1: 2 4 2: 1 5 3: 2 3 4 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 4*v1 + v2 -43 < 0; value: -27 + v2 + 6*v3 -32 <= 0; value: -21 + -3*v0 -4*v1 + 19 = 0; value: 0 + 3*v0 + 4*v1 -38 < 0; value: -19 + 4*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 1 2 3: 2 5 optimal: oo + 7/2*v0 -19/2 <= 0; value: -6 + -8*v0 + v2 -24 < 0; value: -27 + v2 + 6*v3 -32 <= 0; value: -21 - -3*v0 -4*v1 + 19 = 0; value: 0 + -19 < 0; value: -19 + 4*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 1 2 3: 2 5 0: 1 -> 1 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 2*v2 + 2*v3 + 12 = 0; value: 0 + -3*v0 -2*v3 + 9 <= 0; value: -5 + 6*v1 -6*v2 -3*v3 -35 <= 0; value: -20 + v0 -3*v3 -1 <= 0; value: 0 + 5*v0 -2*v1 + 3*v3 -31 < 0; value: -16 0: 1 2 4 5 1: 3 5 2: 1 3 3: 1 2 3 4 5 optimal: (236/11 -e*1) + + 236/11 < 0; value: 236/11 - -4*v0 + 2*v2 + 2*v3 + 12 = 0; value: 0 - -11/3*v0 + 29/3 <= 0; value: 0 + -853/11 < 0; value: -853/11 - -5*v0 + 3*v2 + 17 <= 0; value: 0 - 5*v0 -2*v1 + 3*v3 -31 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 1 3 2 4 3: 1 2 3 4 5 0: 4 -> 29/11 1: 4 -> -78/11 2: 1 -> -14/11 3: 1 -> 6/11 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -19 < 0; value: -48 + -2*v0 -4*v2 -2 < 0; value: -24 + -6*v0 + 5*v2 -55 <= 0; value: -36 + = 0; value: 0 + 2*v0 -1*v1 + v2 -5 < 0; value: -3 0: 1 2 3 5 1: 5 2: 1 2 3 5 3: optimal: (302/17 -e*1) + + 302/17 < 0; value: 302/17 + -108/17 <= 0; value: -108/17 - -2*v0 -4*v2 -2 < 0; value: -4 - -17/2*v0 -115/2 < 0; value: -17/2 + = 0; value: 0 - 2*v0 -1*v1 + v2 -5 < 0; value: -1 0: 1 2 3 5 1: 5 2: 1 2 3 5 3: 0: 1 -> -98/17 1: 5 -> -413/34 2: 5 -> 115/34 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 2*v2 -5*v3 -16 = 0; value: 0 + -2*v0 + 3*v2 + 1 = 0; value: 0 + -4*v0 -5*v1 + 4*v3 + 45 = 0; value: 0 + -3*v1 -1*v3 -9 <= 0; value: -24 + -6*v0 + 4*v2 + 18 = 0; value: 0 0: 2 3 5 1: 1 3 4 2: 1 2 5 3: 1 3 4 optimal: 0 + <= 0; value: 0 - 2*v1 + 2*v2 -5*v3 -16 = 0; value: 0 - -2*v0 + 3*v2 + 1 = 0; value: 0 - -4*v0 + 5*v2 -17/2*v3 + 5 = 0; value: 0 + -24 <= 0; value: -24 - -10/3*v0 + 50/3 = 0; value: 0 0: 2 3 5 4 1: 1 3 4 2: 1 2 5 3 4 3: 1 3 4 0: 5 -> 5 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + v1 + 3*v3 -17 <= 0; value: -11 + 5*v3 -12 < 0; value: -2 + -2*v0 + 6*v1 -6*v2 + 16 < 0; value: -14 + -3*v1 -1*v3 + 2 = 0; value: 0 + -2*v1 + v3 -5 <= 0; value: -3 0: 1 3 1: 1 3 4 5 2: 3 3: 1 2 4 5 optimal: (62/9 -e*1) + + 62/9 < 0; value: 62/9 - 3*v0 -149/15 <= 0; value: 0 - 5*v3 -12 < 0; value: -1 + -6*v2 + 386/45 < 0; value: -964/45 - -3*v1 -1*v3 + 2 = 0; value: 0 + -7/3 <= 0; value: -7/3 0: 1 3 1: 1 3 4 5 2: 3 3: 1 2 4 5 3 0: 0 -> 149/45 1: 0 -> -1/15 2: 5 -> 5 3: 2 -> 11/5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v2 <= 0; value: 0 + -4*v2 + 5*v3 -6 <= 0; value: -1 + v0 + 4*v2 -3 <= 0; value: -1 + 5*v1 -5*v2 -3*v3 -12 = 0; value: 0 + -3*v3 <= 0; value: -3 0: 3 1: 4 2: 1 2 3 4 3: 2 4 5 optimal: 81/5 + + 81/5 <= 0; value: 81/5 + -9/2 <= 0; value: -9/2 - -4*v2 -6 <= 0; value: 0 - v0 -9 <= 0; value: 0 - 5*v1 -5*v2 -3*v3 -12 = 0; value: 0 - -3*v3 <= 0; value: 0 0: 3 1: 4 2: 1 2 3 4 3: 2 4 5 0: 2 -> 9 1: 3 -> 9/10 2: 0 -> -3/2 3: 1 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v1 -5*v2 + 10 = 0; value: 0 + -4*v1 <= 0; value: 0 + -3*v0 -6*v2 -1*v3 + 26 = 0; value: 0 + -4*v0 -1*v2 -5*v3 + 39 = 0; value: 0 + 5*v1 -6*v2 -9 < 0; value: -21 0: 3 4 1: 1 2 5 2: 1 3 4 5 3: 3 4 optimal: (4182/473 -e*1) + + 4182/473 < 0; value: 4182/473 - -3*v1 -5*v2 + 10 = 0; value: 0 + -420/43 < 0; value: -420/43 - -3*v0 -6*v2 -1*v3 + 26 = 0; value: 0 - -7/2*v0 -29/6*v3 + 104/3 = 0; value: 0 - 473/87*v0 -1082/29 < 0; value: -473/87 0: 3 4 2 5 1: 1 2 5 2: 1 3 4 5 2 3: 3 4 2 5 0: 3 -> 2773/473 1: 0 -> 6770/3741 2: 2 -> 1140/1247 3: 5 -> 40151/13717 + 2*v0 -2*v1 <= 0; value: 8 + -3*v2 -4*v3 + 10 < 0; value: -7 + -2*v2 -1*v3 + 7 <= 0; value: -1 + 2*v1 + 5*v3 -29 < 0; value: -19 + -5*v3 + 3 <= 0; value: -7 + 2*v1 + 3*v2 -5*v3 + 1 = 0; value: 0 0: 1: 3 5 2: 1 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 + 38/5 <= 0; value: 78/5 + -2 < 0; value: -2 - -2*v2 -1*v3 + 7 <= 0; value: 0 + -168/5 < 0; value: -168/5 - 10*v2 -32 <= 0; value: 0 - 2*v1 + 3*v2 -5*v3 + 1 = 0; value: 0 0: 1: 3 5 2: 1 2 5 3 4 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> -19/5 2: 3 -> 16/5 3: 2 -> 3/5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 + v2 -29 <= 0; value: -12 + -3*v1 + 5*v2 + 4*v3 -80 <= 0; value: -48 + 4*v0 -3*v3 <= 0; value: 0 + 6*v1 + 6*v3 -89 < 0; value: -47 + -4*v2 + 20 = 0; value: 0 0: 3 1: 1 2 4 2: 1 2 5 3: 2 3 4 optimal: oo + -14/9*v0 + 110/3 <= 0; value: 32 + 64/9*v0 -292/3 <= 0; value: -76 - -3*v1 + 5*v2 + 4*v3 -80 <= 0; value: 0 - 4*v0 -3*v3 <= 0; value: 0 + 56/3*v0 -199 < 0; value: -143 - -4*v2 + 20 = 0; value: 0 0: 3 4 1 1: 1 2 4 2: 1 2 5 4 3: 2 3 4 1 0: 3 -> 3 1: 3 -> -13 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v1 -3*v3 + 3 <= 0; value: -12 + -5*v2 + 1 < 0; value: -4 + 3*v0 -6*v1 -22 <= 0; value: -13 + 5*v0 -1*v1 -1*v3 -28 < 0; value: -18 + 2*v0 + 6*v1 -4*v3 -1 <= 0; value: -15 0: 3 4 5 1: 1 3 4 5 2: 2 3: 1 4 5 optimal: oo + 2/9*v3 + 344/27 < 0; value: 374/27 + -7/3*v3 -25/9 <= 0; value: -130/9 + -5*v2 + 1 < 0; value: -4 - 3*v0 -6*v1 -22 <= 0; value: 0 - 9/2*v0 -1*v3 -73/3 < 0; value: -9/2 + -26/9*v3 + 109/27 <= 0; value: -281/27 0: 3 4 5 1 1: 1 3 4 5 2: 2 3: 1 4 5 0: 3 -> 149/27 1: 0 -> -49/54 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 6*v1 -9 < 0; value: -3 + -2*v2 -2 <= 0; value: -6 + 6*v0 + 3*v3 <= 0; value: 0 + -4*v0 + 2*v2 + v3 -9 < 0; value: -5 + -1*v1 + 6*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 1 5 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 -12*v3 -2 <= 0; value: -2 + -4*v0 + 36*v3 -3 < 0; value: -3 + -2*v2 -2 <= 0; value: -6 + 6*v0 + 3*v3 <= 0; value: 0 + -4*v0 + 2*v2 + v3 -9 < 0; value: -5 - -1*v1 + 6*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 1 5 2: 2 4 3: 3 4 5 1 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -1*v3 + 1 <= 0; value: -1 + -6*v0 -1*v2 + 26 = 0; value: 0 + -4*v0 + 16 <= 0; value: 0 + 5*v1 + 2*v2 -14 < 0; value: -5 + 3*v2 -15 <= 0; value: -9 0: 2 3 1: 4 2: 2 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -1*v3 + 1 <= 0; value: -1 + -6*v0 -1*v2 + 26 = 0; value: 0 + -4*v0 + 16 <= 0; value: 0 + 5*v1 + 2*v2 -14 < 0; value: -5 + 3*v2 -15 <= 0; value: -9 0: 2 3 1: 4 2: 2 4 5 3: 1 0: 4 -> 4 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 5*v1 -56 <= 0; value: -31 + 3*v0 -1*v2 -2*v3 + 6 = 0; value: 0 + v1 + 2*v3 -15 = 0; value: 0 + 4*v0 -6*v1 -4*v3 -39 <= 0; value: -81 + 3*v0 -2*v2 -5*v3 + 23 = 0; value: 0 0: 2 4 5 1: 1 3 4 2: 2 5 3: 2 3 4 5 optimal: 69/2 + + 69/2 <= 0; value: 69/2 + -305/2 <= 0; value: -305/2 - 3*v0 -1*v2 -2*v3 + 6 = 0; value: 0 - v1 + 2*v3 -15 = 0; value: 0 - -20*v0 -41 <= 0; value: 0 - -9/2*v0 + 1/2*v2 + 8 = 0; value: 0 0: 2 4 5 1 1: 1 3 4 2: 2 5 4 1 3: 2 3 4 5 1 0: 2 -> -41/20 1: 5 -> -193/10 2: 2 -> -689/20 3: 5 -> 343/20 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -3*v2 -1 < 0; value: -4 + 3*v0 -5*v1 + 1 <= 0; value: -1 + 6*v1 + 5*v2 -60 <= 0; value: -39 + -2*v0 + 6*v2 + v3 -17 = 0; value: 0 + 2*v1 -2*v2 -4*v3 + 8 = 0; value: 0 0: 1 2 4 1: 2 3 5 2: 1 3 4 5 3: 4 5 optimal: (290/279 -e*1) + + 290/279 < 0; value: 290/279 - 279/55*v0 -502/55 < 0; value: -223/110 - -17*v0 + 55*v2 -149 <= 0; value: 0 + -10043/279 <= 0; value: -10043/279 - -2*v0 + 6*v2 + v3 -17 = 0; value: 0 - 2*v1 -2*v2 -4*v3 + 8 = 0; value: 0 0: 1 2 4 3 1: 2 3 5 2: 1 3 4 5 2 3: 4 5 2 3 0: 1 -> 781/558 1: 1 -> 967/930 2: 3 -> 96419/30690 3: 1 -> 14563/15345 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -65 < 0; value: -41 + -5*v0 + 5*v3 + 18 <= 0; value: -2 + 6*v1 -4*v2 -20 < 0; value: -4 + v2 -3*v3 -4 < 0; value: -2 + -6*v0 + 6 < 0; value: -18 0: 1 2 5 1: 3 2: 3 4 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -65 < 0; value: -41 + -5*v0 + 5*v3 + 18 <= 0; value: -2 + 6*v1 -4*v2 -20 < 0; value: -4 + v2 -3*v3 -4 < 0; value: -2 + -6*v0 + 6 < 0; value: -18 0: 1 2 5 1: 3 2: 3 4 3: 2 4 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -2*v3 -8 = 0; value: 0 + 5*v1 -2*v2 -23 <= 0; value: -12 + 2*v0 -4*v2 -2 <= 0; value: 0 + -1*v2 -6*v3 + 22 <= 0; value: -10 + 2*v0 -2*v1 + 6*v2 -16 = 0; value: 0 0: 3 5 1: 1 2 5 2: 2 3 4 5 3: 1 4 optimal: 424/91 + + 424/91 <= 0; value: 424/91 - 6*v1 -2*v3 -8 = 0; value: 0 + -1322/91 <= 0; value: -1322/91 - 2*v0 -4*v2 -2 <= 0; value: 0 - -91/2*v0 + 435/2 <= 0; value: 0 - 2*v0 + 6*v2 -2/3*v3 -56/3 = 0; value: 0 0: 3 5 4 2 1: 1 2 5 2: 2 3 4 5 3: 1 4 5 2 0: 5 -> 435/91 1: 3 -> 223/91 2: 2 -> 172/91 3: 5 -> 305/91 + 2*v0 -2*v1 <= 0; value: -6 + = 0; value: 0 + 2*v0 -1*v2 + 5*v3 + 1 <= 0; value: 0 + -6*v1 + 3*v3 + 12 <= 0; value: -12 + -1*v0 + 2*v2 + 3*v3 -5 = 0; value: 0 + 3*v0 -2*v3 -7 <= 0; value: -4 0: 2 4 5 1: 3 2: 2 4 3: 2 3 4 5 optimal: 26/45 + + 26/45 <= 0; value: 26/45 + = 0; value: 0 - 45/4*v0 -97/4 <= 0; value: 0 - -6*v1 + 3*v3 + 12 <= 0; value: 0 - -1*v0 + 2*v2 + 3*v3 -5 = 0; value: 0 - 7/3*v0 + 4/3*v2 -31/3 <= 0; value: 0 0: 2 4 5 1: 3 2: 2 4 5 3: 2 3 4 5 0: 1 -> 97/45 1: 4 -> 28/15 2: 3 -> 179/45 3: 0 -> -4/15 + 2*v0 -2*v1 <= 0; value: 6 + -1*v2 + 3*v3 -19 <= 0; value: -10 + v0 -4*v2 + 6*v3 -17 = 0; value: 0 + -5*v0 -2*v1 + 3*v2 + 7 <= 0; value: -13 + -3*v3 -3 <= 0; value: -15 + -1*v3 + 4 <= 0; value: 0 0: 2 3 1: 3 2: 1 2 3 3: 1 2 4 5 optimal: oo + 25/4*v0 -49/4 <= 0; value: 19 + -1/4*v0 -35/4 <= 0; value: -10 - v0 -4*v2 + 6*v3 -17 = 0; value: 0 - -5*v0 -2*v1 + 3*v2 + 7 <= 0; value: 0 + -15 <= 0; value: -15 - -1*v3 + 4 <= 0; value: 0 0: 2 3 1 1: 3 2: 1 2 3 3: 1 2 4 5 0: 5 -> 5 1: 2 -> -9/2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 -6*v2 + 27 <= 0; value: -3 + v0 + 2*v1 -5*v2 + 7 <= 0; value: 0 + -2*v2 -1 <= 0; value: -7 + -3*v0 + 4*v2 -6 = 0; value: 0 + 3*v1 + 3*v3 -25 <= 0; value: -10 0: 2 4 1: 1 2 5 2: 1 2 3 4 3: 5 optimal: oo + 17/4*v0 -9 <= 0; value: -1/2 - -4*v1 -6*v2 + 27 <= 0; value: 0 + -5*v0 + 17/2 <= 0; value: -3/2 + -3/2*v0 -4 <= 0; value: -7 - -3*v0 + 4*v2 -6 = 0; value: 0 + -27/8*v0 + 3*v3 -23/2 <= 0; value: -49/4 0: 2 4 3 5 1: 1 2 5 2: 1 2 3 4 5 3: 5 0: 2 -> 2 1: 3 -> 9/4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 + 5 = 0; value: 0 + -2*v1 -4*v3 + 12 = 0; value: 0 + 6*v0 -15 < 0; value: -3 + -6*v1 -6*v2 + 48 < 0; value: -6 + v1 + 2*v2 + 6*v3 -29 <= 0; value: -9 0: 3 1: 2 4 5 2: 1 4 5 3: 2 5 optimal: (-1 -e*1) + -1 < 0; value: -1 - -1*v2 + 5 = 0; value: 0 - -2*v1 -4*v3 + 12 = 0; value: 0 - 6*v0 -15 < 0; value: -3/2 - -6*v2 + 12*v3 + 12 < 0; value: -3 + -7 <= 0; value: -7 0: 3 1: 2 4 5 2: 1 4 5 3: 2 5 4 0: 2 -> 9/4 1: 4 -> 7/2 2: 5 -> 5 3: 1 -> 5/4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -51 < 0; value: -27 + 6*v0 + 2*v3 -66 <= 0; value: -36 + -1*v1 -1*v2 + 3*v3 -3 <= 0; value: 0 + 5*v0 -20 = 0; value: 0 + -3*v2 -1*v3 + 17 <= 0; value: -1 0: 1 2 4 1: 3 2: 3 5 3: 2 3 5 optimal: oo + 2*v0 + 20*v2 -96 <= 0; value: 12 + 6*v0 -51 < 0; value: -27 + 6*v0 -6*v2 -32 <= 0; value: -38 - -1*v1 -1*v2 + 3*v3 -3 <= 0; value: 0 + 5*v0 -20 = 0; value: 0 - -3*v2 -1*v3 + 17 <= 0; value: 0 0: 1 2 4 1: 3 2: 3 5 2 3: 2 3 5 0: 4 -> 4 1: 1 -> -2 2: 5 -> 5 3: 3 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -4*v3 = 0; value: 0 + -3*v1 -1 <= 0; value: -4 + 6*v0 -6*v2 -5*v3 -17 < 0; value: -11 + -1*v2 + 3 <= 0; value: -1 + 6*v1 -6*v2 + 5 <= 0; value: -13 0: 3 1: 2 5 2: 3 4 5 3: 1 3 optimal: oo + 2*v2 + 19/3 < 0; value: 43/3 - -4*v3 = 0; value: 0 - -3*v1 -1 <= 0; value: 0 - 6*v0 -6*v2 -5*v3 -17 < 0; value: -11/2 + -1*v2 + 3 <= 0; value: -1 + -6*v2 + 3 <= 0; value: -21 0: 3 1: 2 5 2: 3 4 5 3: 1 3 0: 5 -> 71/12 1: 1 -> -1/3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 5*v2 <= 0; value: -10 + -1*v0 -1*v1 + 7 = 0; value: 0 + 2*v1 + 2*v2 -14 <= 0; value: -4 + 2*v0 + v2 -2*v3 -4 <= 0; value: -10 + 5*v1 + 6*v2 -6*v3 + 4 <= 0; value: -1 0: 1 2 4 1: 2 3 5 2: 1 3 4 5 3: 4 5 optimal: oo + -2*v2 + 4*v3 -6 <= 0; value: 14 + 15/2*v2 -5*v3 -10 <= 0; value: -35 - -1*v0 -1*v1 + 7 = 0; value: 0 + 3*v2 -2*v3 -4 <= 0; value: -14 - 2*v0 + v2 -2*v3 -4 <= 0; value: 0 + 17/2*v2 -11*v3 + 29 <= 0; value: -26 0: 1 2 4 3 5 1: 2 3 5 2: 1 3 4 5 3: 4 5 1 3 0: 2 -> 7 1: 5 -> 0 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 + 5*v2 -4*v3 <= 0; value: 0 + -2*v3 + 10 = 0; value: 0 + 3*v0 + 3*v1 + v2 -21 < 0; value: -7 + 6*v2 -12 = 0; value: 0 + 5*v0 -5*v1 -4*v2 + 8 = 0; value: 0 0: 1 3 5 1: 3 5 2: 1 3 4 5 3: 1 2 optimal: 0 + <= 0; value: 0 - 5*v0 + 5*v2 -4*v3 <= 0; value: 0 - -2*v3 + 10 = 0; value: 0 + -7 < 0; value: -7 - -6*v0 + 12 = 0; value: 0 - 5*v0 -5*v1 -4*v2 + 8 = 0; value: 0 0: 1 3 5 4 1: 3 5 2: 1 3 4 5 3: 1 2 4 3 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 5*v3 -38 <= 0; value: -18 + -4*v1 + 4*v2 -5*v3 + 3 <= 0; value: -9 + 3*v0 + 6*v1 -3*v2 -74 < 0; value: -47 + 2*v0 -4*v1 -11 <= 0; value: -29 + <= 0; value: 0 0: 3 4 1: 1 2 3 4 2: 2 3 3: 1 2 optimal: (599/24 -e*1) + + 599/24 < 0; value: 599/24 - 4*v2 -35 <= 0; value: 0 - -4*v1 + 4*v2 -5*v3 + 3 <= 0; value: 0 - 6*v0 -3*v2 -181/2 < 0; value: -6 - 2*v0 -4*v2 + 5*v3 -14 <= 0; value: 0 + <= 0; value: 0 0: 3 4 1: 1 2 3 4 2: 2 3 4 1 3: 1 2 4 3 0: 1 -> 443/24 1: 5 -> 311/48 2: 2 -> 35/4 3: 0 -> 29/12 + 2*v0 -2*v1 <= 0; value: -2 + 6*v3 -66 < 0; value: -36 + -4*v1 + 2*v3 -5 <= 0; value: -15 + -2*v1 + 4*v3 -10 = 0; value: 0 + -4*v1 -7 <= 0; value: -27 + 3*v0 + 4*v3 -92 < 0; value: -60 0: 5 1: 2 3 4 2: 3: 1 2 3 5 optimal: (164/3 -e*1) + + 164/3 < 0; value: 164/3 + -51 < 0; value: -51 - -6*v3 + 15 <= 0; value: 0 - -2*v1 + 4*v3 -10 = 0; value: 0 + -7 <= 0; value: -7 - 3*v0 -82 < 0; value: -3 0: 5 1: 2 3 4 2: 3: 1 2 3 5 4 0: 4 -> 79/3 1: 5 -> 0 2: 4 -> 4 3: 5 -> 5/2 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 2*v1 + 2 = 0; value: 0 + -5*v1 + 4*v2 + v3 -10 = 0; value: 0 + 5*v2 + 2*v3 -85 <= 0; value: -50 + v0 + 2*v2 -36 < 0; value: -22 + -2*v1 + 4 <= 0; value: -2 0: 1 4 1: 1 2 5 2: 2 3 4 3: 2 3 optimal: 2 + + 2 <= 0; value: 2 - -2*v0 + 2*v1 + 2 = 0; value: 0 + -5*v0 + 4*v2 + v3 -5 = 0; value: 0 + 5*v2 + 2*v3 -85 <= 0; value: -50 + v0 + 2*v2 -36 < 0; value: -22 + -2*v0 + 6 <= 0; value: -2 0: 1 4 2 5 1: 1 2 5 2: 2 3 4 3: 2 3 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -1 < 0; value: -5 + 5*v1 + 3*v3 -32 <= 0; value: -16 + -2*v0 + 5*v2 -24 < 0; value: -3 + 4*v0 -6*v1 + 3 < 0; value: -1 + 6*v1 -3*v3 -16 < 0; value: -10 0: 1 3 4 1: 2 4 5 2: 3 3: 2 5 optimal: (63/22 -e*1) + + 63/22 < 0; value: 63/22 + -277/22 < 0; value: -277/22 - 11/2*v3 -56/3 <= 0; value: 0 + 5*v2 -783/22 < 0; value: -233/22 - 4*v0 -6*v1 + 3 < 0; value: -56/11 - 4*v0 -3*v3 -13 < 0; value: -4 0: 1 3 4 2 5 1: 2 4 5 2: 3 3: 2 5 1 3 0: 2 -> 211/44 1: 2 -> 50/11 2: 5 -> 5 3: 2 -> 112/33 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 6*v3 + 3 < 0; value: -10 + v1 -4*v2 -4 <= 0; value: -11 + 6*v1 -78 <= 0; value: -48 + v1 + 4*v3 -13 = 0; value: 0 + 3*v1 + 5*v2 -30 = 0; value: 0 0: 1 1: 2 3 4 5 2: 2 5 3: 1 4 optimal: oo + 26/3*v0 -30 < 0; value: 40/3 - -5*v0 + 5/2*v2 + 15/2 < 0; value: -5/2 + -34/3*v0 + 23 < 0; value: -101/3 + -20*v0 + 12 < 0; value: -88 - v1 + 4*v3 -13 = 0; value: 0 - 5*v2 -12*v3 + 9 = 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 2 5 1 3 3: 1 4 5 2 3 0: 5 -> 5 1: 5 -> 0 2: 3 -> 6 3: 2 -> 13/4 + 2*v0 -2*v1 <= 0; value: -10 + -1*v1 -1*v2 -3*v3 -1 <= 0; value: -9 + -1*v1 + 5*v2 + 2 <= 0; value: -3 + v1 -3*v2 -5 = 0; value: 0 + -2*v1 + 2*v3 -5 < 0; value: -13 + 5*v0 -4*v2 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 2 3 5 3: 1 4 optimal: (-23/65 -e*1) + -23/65 < 0; value: -23/65 - -13/3*v3 + 4 <= 0; value: 0 + -96/13 < 0; value: -96/13 - v1 -3*v2 -5 = 0; value: 0 - -15/2*v0 + 2*v3 -15 < 0; value: -171/26 - 5*v0 -4*v2 <= 0; value: 0 0: 5 1 4 2 1: 1 2 3 4 2: 1 2 3 5 4 3: 1 4 2 0: 0 -> -57/65 1: 5 -> 89/52 2: 0 -> -57/52 3: 1 -> 12/13 + 2*v0 -2*v1 <= 0; value: 4 + v0 -4 = 0; value: 0 + 5*v0 -4*v1 -3*v2 -3 = 0; value: 0 + 3*v1 + 6*v2 + v3 -40 < 0; value: -13 + -1*v3 -2 <= 0; value: -5 + 6*v0 + v3 -27 <= 0; value: 0 0: 1 2 5 1: 2 3 2: 2 3 3: 3 4 5 optimal: (56/5 -e*1) + + 56/5 < 0; value: 56/5 - v0 -4 = 0; value: 0 - 5*v0 -4*v1 -3*v2 -3 = 0; value: 0 - 15/4*v0 + 15/4*v2 + v3 -169/4 < 0; value: -15/4 - -1*v3 -2 <= 0; value: 0 + -5 <= 0; value: -5 0: 1 2 5 3 1: 2 3 2: 2 3 3: 3 4 5 0: 4 -> 4 1: 2 -> -17/20 2: 3 -> 34/5 3: 3 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + -5*v2 -1*v3 + 7 <= 0; value: -13 + 3*v0 + 4*v1 -3*v3 -8 = 0; value: 0 + -1*v1 -1*v2 -3 <= 0; value: -9 + v0 + 3*v2 -21 < 0; value: -9 + 2*v0 + 6*v2 -5*v3 -38 <= 0; value: -14 0: 2 4 5 1: 2 3 2: 1 3 4 5 3: 1 2 5 optimal: 1636/71 + + 1636/71 <= 0; value: 1636/71 - -2/5*v0 -31/5*v2 + 73/5 <= 0; value: 0 - 3*v0 + 4*v1 -3*v3 -8 = 0; value: 0 - 71/124*v0 -117/31 <= 0; value: 0 + -612/71 < 0; value: -612/71 - 2*v0 + 6*v2 -5*v3 -38 <= 0; value: 0 0: 2 4 5 3 1 1: 2 3 2: 1 3 4 5 3: 1 2 5 3 0: 0 -> 468/71 1: 2 -> -350/71 2: 4 -> 137/71 3: 0 -> -188/71 + 2*v0 -2*v1 <= 0; value: -10 + 4*v0 -5*v2 + 6*v3 -1 <= 0; value: -16 + -6*v0 + v3 <= 0; value: 0 + -4*v2 + 3*v3 + 2 <= 0; value: -10 + 5*v1 -2*v3 -31 < 0; value: -6 + 3*v0 + 4*v1 + 4*v3 -20 = 0; value: 0 0: 1 2 5 1: 4 5 2: 1 3 3: 1 2 3 4 5 optimal: oo + 31/16*v2 -769/80 <= 0; value: -19/5 - 40*v0 -5*v2 -1 <= 0; value: 0 - -6*v0 + v3 <= 0; value: 0 + -7/4*v2 + 49/20 <= 0; value: -14/5 + -183/32*v2 -1143/160 < 0; value: -243/10 - 3*v0 + 4*v1 + 4*v3 -20 = 0; value: 0 0: 1 2 5 4 3 1: 4 5 2: 1 3 4 3: 1 2 3 4 5 0: 0 -> 2/5 1: 5 -> 23/10 2: 3 -> 3 3: 0 -> 12/5 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 2*v2 -1 <= 0; value: -3 + 3*v1 -3*v3 <= 0; value: 0 + 4*v1 -1*v3 -15 < 0; value: -6 + 6*v1 -18 <= 0; value: 0 + -5*v0 + 2*v3 -7 < 0; value: -1 0: 5 1: 1 2 3 4 2: 1 3: 2 3 5 optimal: oo + 2*v0 -2*v2 + 1 <= 0; value: -3 - -2*v1 + 2*v2 -1 <= 0; value: 0 + 3*v2 -3*v3 -3/2 <= 0; value: -9/2 + 4*v2 -1*v3 -17 < 0; value: -12 + 6*v2 -21 <= 0; value: -9 + -5*v0 + 2*v3 -7 < 0; value: -1 0: 5 1: 1 2 3 4 2: 1 2 3 4 3: 2 3 5 0: 0 -> 0 1: 3 -> 3/2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 + 4*v3 -5 <= 0; value: -1 + -3*v0 -5*v1 + v3 + 2 <= 0; value: -1 + 4*v0 -3*v3 + 5 < 0; value: -1 + v1 + 2*v3 -11 < 0; value: -6 + -2*v2 <= 0; value: 0 0: 2 3 1: 1 2 4 2: 5 3: 1 2 3 4 optimal: (-24/25 -e*1) + -24/25 < 0; value: -24/25 - 20/3*v0 -19/15 < 0; value: -19/30 - -3*v0 -5*v1 + v3 + 2 <= 0; value: 0 - 4*v0 -3*v3 + 5 < 0; value: -31/100 + -649/100 <= 0; value: -649/100 + -2*v2 <= 0; value: 0 0: 2 3 1 4 1: 1 2 4 2: 5 3: 1 2 3 4 0: 0 -> 19/200 1: 1 -> 2167/3000 2: 0 -> 0 3: 2 -> 569/300 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 3*v3 -45 <= 0; value: -25 + -5*v0 -4*v1 -1*v3 -37 < 0; value: -82 + v0 -3*v2 + 2*v3 + 1 < 0; value: -6 + -1*v0 + 2*v2 + 2*v3 -5 <= 0; value: -2 + -2*v2 + 2*v3 -6 <= 0; value: -14 0: 1 2 3 4 1: 2 2: 3 4 5 3: 1 2 3 4 5 optimal: (5387/86 -e*1) + + 5387/86 < 0; value: 5387/86 - 43/10*v0 -411/10 <= 0; value: 0 - -5*v0 -4*v1 -1*v3 -37 < 0; value: -4 - 2*v0 -5*v2 + 6 < 0; value: -110/43 - -1*v0 + 2*v2 + 2*v3 -5 <= 0; value: 0 + -496/43 <= 0; value: -496/43 0: 1 2 3 4 5 1: 2 2: 3 4 5 1 3: 1 2 3 4 5 0: 5 -> 411/43 1: 5 -> -3549/172 2: 4 -> 238/43 3: 0 -> 75/43 + 2*v0 -2*v1 <= 0; value: 8 + -6*v1 -3*v3 -1 <= 0; value: -19 + 5*v1 + 4*v3 -49 < 0; value: -28 + -3*v0 -1*v2 + 10 <= 0; value: -7 + 6*v3 -24 = 0; value: 0 + -2*v1 -3*v2 + 6*v3 -30 < 0; value: -14 0: 3 1: 1 2 5 2: 3 5 3: 1 2 4 5 optimal: oo + 2*v0 + 13/3 <= 0; value: 43/3 - -6*v1 -3*v3 -1 <= 0; value: 0 + -263/6 < 0; value: -263/6 + -3*v0 -1*v2 + 10 <= 0; value: -7 - 6*v3 -24 = 0; value: 0 + -3*v2 -5/3 < 0; value: -23/3 0: 3 1: 1 2 5 2: 3 5 3: 1 2 4 5 0: 5 -> 5 1: 1 -> -13/6 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -5*v2 + 3 <= 0; value: -22 + -1*v0 <= 0; value: 0 + v0 -6*v3 + 12 <= 0; value: 0 + v1 -4*v3 -4 < 0; value: -10 + -4*v0 + 4*v2 -27 <= 0; value: -15 0: 2 3 5 1: 1 4 2: 1 5 3: 3 4 optimal: oo + 24*v3 -357/10 <= 0; value: 123/10 - -5*v1 -5*v2 + 3 <= 0; value: 0 + -6*v3 + 12 <= 0; value: 0 - v0 -6*v3 + 12 <= 0; value: 0 + -10*v3 + 37/20 < 0; value: -363/20 - -4*v0 + 4*v2 -27 <= 0; value: 0 0: 2 3 5 4 1: 1 4 2: 1 5 4 3: 3 4 2 0: 0 -> 0 1: 2 -> -123/20 2: 3 -> 27/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -4*v3 + 4 <= 0; value: 0 + -3*v0 + 2*v1 + 3 <= 0; value: -1 + 2*v0 -6*v1 + 7 <= 0; value: -9 + -1*v1 -3 < 0; value: -7 + -4*v2 + 4 = 0; value: 0 0: 2 3 1: 2 3 4 2: 1 5 3: 1 optimal: oo + 4/3*v0 -7/3 <= 0; value: 3 + 4*v2 -4*v3 + 4 <= 0; value: 0 + -7/3*v0 + 16/3 <= 0; value: -4 - 2*v0 -6*v1 + 7 <= 0; value: 0 + -1/3*v0 -25/6 < 0; value: -11/2 + -4*v2 + 4 = 0; value: 0 0: 2 3 4 1: 2 3 4 2: 1 5 3: 1 0: 4 -> 4 1: 4 -> 5/2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 5*v2 -73 <= 0; value: -48 + 3*v1 -29 < 0; value: -17 + 3*v2 -4*v3 -8 <= 0; value: -5 + 2*v3 <= 0; value: 0 + -1*v0 + 5*v1 + 3*v2 -33 < 0; value: -13 0: 5 1: 1 2 5 2: 1 3 5 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 5*v2 -73 <= 0; value: -48 + 3*v1 -29 < 0; value: -17 + 3*v2 -4*v3 -8 <= 0; value: -5 + 2*v3 <= 0; value: 0 + -1*v0 + 5*v1 + 3*v2 -33 < 0; value: -13 0: 5 1: 1 2 5 2: 1 3 5 3: 3 4 0: 3 -> 3 1: 4 -> 4 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v1 + v2 + 1 <= 0; value: -3 + 3*v0 -5*v2 -2*v3 + 2 < 0; value: -6 + -4*v1 + v2 -1 <= 0; value: -6 + 3*v0 + 4*v2 -53 <= 0; value: -26 + 2*v1 -11 <= 0; value: -7 0: 1 2 4 1: 1 3 5 2: 1 2 3 4 3: 2 optimal: oo + 17/10*v0 + 1/5*v3 + 3/10 < 0; value: 48/5 + -9/5*v0 -4/5*v3 + 4/5 < 0; value: -57/5 - 3*v0 -5*v2 -2*v3 + 2 < 0; value: -3 - -4*v1 + v2 -1 <= 0; value: 0 + 27/5*v0 -8/5*v3 -257/5 < 0; value: -154/5 + 3/10*v0 -1/5*v3 -113/10 < 0; value: -53/5 0: 1 2 4 5 1: 1 3 5 2: 1 2 3 4 5 3: 2 1 4 5 0: 5 -> 5 1: 2 -> 7/20 2: 3 -> 12/5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 3*v0 -3*v3 -3 <= 0; value: 0 + -2*v0 -1*v3 -6 < 0; value: -17 + -6*v1 + 3*v2 -9 <= 0; value: 0 + -3*v2 -4*v3 + 21 = 0; value: 0 + -2*v3 + 6 <= 0; value: 0 0: 1 2 1: 3 2: 3 4 3: 1 2 4 5 optimal: oo + 2*v0 + 4/3*v3 -4 <= 0; value: 8 + 3*v0 -3*v3 -3 <= 0; value: 0 + -2*v0 -1*v3 -6 < 0; value: -17 - -6*v1 + 3*v2 -9 <= 0; value: 0 - -3*v2 -4*v3 + 21 = 0; value: 0 + -2*v3 + 6 <= 0; value: 0 0: 1 2 1: 3 2: 3 4 3: 1 2 4 5 0: 4 -> 4 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -6*v3 + 30 = 0; value: 0 + 5*v1 + v2 -37 < 0; value: -24 + 6*v0 + 2*v2 -6 = 0; value: 0 + -4*v1 -6*v2 + 21 <= 0; value: -5 + 2*v1 -3*v2 + 5 <= 0; value: 0 0: 1 3 1: 2 4 5 2: 2 3 4 5 3: 1 optimal: oo + 21*v3 -213/2 <= 0; value: -3/2 - -2*v0 -6*v3 + 30 = 0; value: 0 + -117/2*v3 + 1049/4 < 0; value: -121/4 - 6*v0 + 2*v2 -6 = 0; value: 0 - -4*v1 -6*v2 + 21 <= 0; value: 0 + -54*v3 + 535/2 <= 0; value: -5/2 0: 1 3 2 5 1: 2 4 5 2: 2 3 4 5 3: 1 2 5 0: 0 -> 0 1: 2 -> 3/4 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v1 + 3*v3 -3 = 0; value: 0 + -3*v1 -3 < 0; value: -9 + <= 0; value: 0 + 6*v1 + v3 -13 = 0; value: 0 + -1*v1 -3*v2 <= 0; value: -2 0: 1 1: 1 2 4 5 2: 5 3: 1 4 optimal: oo + 5/3*v0 -3 <= 0; value: 2 - 4*v0 -6*v1 + 3*v3 -3 = 0; value: 0 + -1/2*v0 -15/2 < 0; value: -9 + <= 0; value: 0 - 4*v0 + 4*v3 -16 = 0; value: 0 + -1/6*v0 -3*v2 -3/2 <= 0; value: -2 0: 1 2 4 5 1: 1 2 4 5 2: 5 3: 1 4 2 5 0: 3 -> 3 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -2*v1 + v2 -23 <= 0; value: -13 + 5*v1 + 6*v3 -88 <= 0; value: -51 + 3*v1 -20 <= 0; value: -5 + -4*v0 -6*v1 + 3*v2 + 41 <= 0; value: -9 + -6*v0 -5*v2 + 7 <= 0; value: -23 0: 1 4 5 1: 1 2 3 4 2: 1 4 5 3: 2 optimal: 161/10 + + 161/10 <= 0; value: 161/10 - 16/3*v0 -110/3 <= 0; value: 0 + 6*v3 -751/8 <= 0; value: -655/8 + -941/40 <= 0; value: -941/40 - -4*v0 -6*v1 + 3*v2 + 41 <= 0; value: 0 - -6*v0 -5*v2 + 7 <= 0; value: 0 0: 1 4 5 2 3 1: 1 2 3 4 2: 1 4 5 2 3 3: 2 0: 5 -> 55/8 1: 5 -> -47/40 2: 0 -> -137/20 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v2 -15 < 0; value: -8 + 5*v1 -4*v3 + 4 = 0; value: 0 + -3*v2 + 6 <= 0; value: 0 + 3*v1 -1*v3 + 1 <= 0; value: 0 + -3*v2 + 5*v3 + 1 <= 0; value: 0 0: 1 1: 2 4 2: 1 3 5 3: 2 4 5 optimal: oo + 2*v0 -8/5*v3 + 8/5 <= 0; value: 2 + -5*v0 + 6*v2 -15 < 0; value: -8 - 5*v1 -4*v3 + 4 = 0; value: 0 + -3*v2 + 6 <= 0; value: 0 + 7/5*v3 -7/5 <= 0; value: 0 + -3*v2 + 5*v3 + 1 <= 0; value: 0 0: 1 1: 2 4 2: 1 3 5 3: 2 4 5 0: 1 -> 1 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 -4*v1 -3*v3 + 7 <= 0; value: -1 + -2*v1 -2*v3 < 0; value: -2 + 4*v0 -3*v1 -13 = 0; value: 0 + 5*v1 + 5*v3 -8 < 0; value: -3 + -4*v0 -2*v3 + 5 <= 0; value: -11 0: 1 3 5 1: 1 2 3 4 2: 3: 1 2 4 5 optimal: (34/5 -e*1) + + 34/5 < 0; value: 34/5 - -19/3*v0 -3*v3 + 73/3 <= 0; value: 0 + -16/5 < 0; value: -16/5 - 4*v0 -3*v1 -13 = 0; value: 0 - 35/19*v3 -77/19 < 0; value: -35/19 + -53/5 < 0; value: -53/5 0: 1 3 5 2 4 1: 1 2 3 4 2: 3: 1 2 4 5 0: 4 -> 311/95 1: 1 -> 3/95 2: 3 -> 3 3: 0 -> 6/5 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 + 2*v3 -16 < 0; value: -10 + 4*v1 <= 0; value: 0 + -2*v0 + 2*v1 + 6*v3 -50 <= 0; value: -32 + -3*v1 -3*v3 + 9 <= 0; value: 0 + v0 + 6*v1 <= 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 3: 1 3 4 optimal: (94/7 -e*1) + + 94/7 < 0; value: 94/7 - 6*v0 + 2*v3 -16 < 0; value: -2 + -212/7 < 0; value: -212/7 - -14*v0 -12 <= 0; value: 0 - -3*v1 -3*v3 + 9 <= 0; value: 0 + -324/7 < 0; value: -324/7 0: 1 3 5 2 1: 2 3 4 5 2: 3: 1 3 4 2 5 0: 0 -> -6/7 1: 0 -> -46/7 2: 0 -> 0 3: 3 -> 67/7 + 2*v0 -2*v1 <= 0; value: -6 + = 0; value: 0 + 2*v0 + 3*v3 -32 < 0; value: -16 + -4*v1 + 3*v2 + 5 = 0; value: 0 + 3*v1 + 5*v3 -85 <= 0; value: -50 + -5*v0 -1*v1 -4*v2 + 20 < 0; value: -15 0: 2 5 1: 3 4 5 2: 3 5 3: 2 4 optimal: oo + -102/19*v3 + 928/19 < 0; value: 520/19 + = 0; value: 0 - 2*v0 + 3*v3 -32 < 0; value: -2 - -4*v1 + 3*v2 + 5 = 0; value: 0 + 325/38*v3 -2095/19 < 0; value: -1445/19 - -5*v0 -19/4*v2 + 75/4 < 0; value: -19/4 0: 2 5 4 1: 3 4 5 2: 3 5 4 3: 2 4 0: 2 -> 9 1: 5 -> -163/76 2: 5 -> -86/19 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v0 -3*v3 + 4 < 0; value: -3 + 6*v2 -3*v3 -19 <= 0; value: -10 + 2*v2 + 5*v3 -45 <= 0; value: -24 + 4*v0 -4*v1 + 3*v3 -14 <= 0; value: -5 + 2*v0 + 5*v1 -12 <= 0; value: -5 0: 1 4 5 1: 4 5 2: 2 3 3: 1 2 3 4 optimal: oo + -3*v2 + 33/2 < 0; value: 15/2 - 2*v0 -3*v3 + 4 < 0; value: -3 - -2*v0 + 6*v2 -23 <= 0; value: 0 + 12*v2 -230/3 < 0; value: -122/3 - 4*v0 -4*v1 + 3*v3 -14 <= 0; value: 0 + 57/2*v2 -535/4 < 0; value: -193/4 0: 1 4 5 2 3 1: 4 5 2: 2 3 5 3: 1 2 3 4 5 0: 1 -> -5/2 1: 1 -> -11/2 2: 3 -> 3 3: 3 -> 2/3 + 2*v0 -2*v1 <= 0; value: 0 + -6*v3 + 24 = 0; value: 0 + -3*v3 + 2 <= 0; value: -10 + -4*v0 -5*v1 -3*v3 -37 <= 0; value: -94 + 2*v2 -4 <= 0; value: -2 + -3*v1 -1*v3 + 19 = 0; value: 0 0: 3 1: 3 5 2: 4 3: 1 2 3 5 optimal: oo + 2*v0 -10 <= 0; value: 0 - -6*v3 + 24 = 0; value: 0 + -10 <= 0; value: -10 + -4*v0 -74 <= 0; value: -94 + 2*v2 -4 <= 0; value: -2 - -3*v1 -1*v3 + 19 = 0; value: 0 0: 3 1: 3 5 2: 4 3: 1 2 3 5 0: 5 -> 5 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -40 <= 0; value: -23 + v0 -3 <= 0; value: 0 + 3*v2 -14 <= 0; value: -5 + v2 + 4*v3 -10 <= 0; value: -3 + v0 + 2*v3 -7 <= 0; value: -2 0: 2 5 1: 2: 1 3 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -40 <= 0; value: -23 + v0 -3 <= 0; value: 0 + 3*v2 -14 <= 0; value: -5 + v2 + 4*v3 -10 <= 0; value: -3 + v0 + 2*v3 -7 <= 0; value: -2 0: 2 5 1: 2: 1 3 4 3: 1 4 5 0: 3 -> 3 1: 3 -> 3 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -5*v2 + 3*v3 + 3 <= 0; value: -2 + -2*v2 -1 <= 0; value: -3 + -4*v0 -5*v2 + 7 < 0; value: -6 + 2*v0 -3*v3 -4 <= 0; value: 0 + 6*v0 -3*v1 -3 = 0; value: 0 0: 3 4 5 1: 5 2: 1 2 3 3: 1 4 optimal: oo + 5/2*v2 -3/2 < 0; value: 1 + -5*v2 + 3*v3 + 3 <= 0; value: -2 + -2*v2 -1 <= 0; value: -3 - -4*v0 -5*v2 + 7 < 0; value: -3 + -5/2*v2 -3*v3 -1/2 < 0; value: -3 - 6*v0 -3*v1 -3 = 0; value: 0 0: 3 4 5 1: 5 2: 1 2 3 4 3: 1 4 0: 2 -> 5/4 1: 3 -> 3/2 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 + 2*v3 -2 <= 0; value: 0 + -6*v1 + 5*v3 -9 <= 0; value: -22 + <= 0; value: 0 + 2*v0 -6*v2 -17 <= 0; value: -41 + v1 + 3*v2 -5*v3 -12 < 0; value: -2 0: 1 4 1: 2 5 2: 4 5 3: 1 2 5 optimal: (114/7 -e*1) + + 114/7 < 0; value: 114/7 - 112/25*v0 -314/25 < 0; value: -112/25 - -6*v1 + 5*v3 -9 <= 0; value: 0 + <= 0; value: 0 - 2*v0 -6*v2 -17 <= 0; value: 0 - 3*v2 -25/6*v3 -27/2 < 0; value: -25/6 0: 1 4 1: 2 5 2: 4 5 1 3: 1 2 5 0: 0 -> 101/56 1: 3 -> -3953/840 2: 4 -> -125/56 3: 1 -> -2693/700 + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 -6*v2 -1 <= 0; value: -31 + 5*v0 + 2*v1 + 6*v2 -86 <= 0; value: -46 + -4*v0 -4*v1 + 20 = 0; value: 0 + -5*v1 + 5*v2 -1*v3 + 4 = 0; value: 0 + 4*v1 -28 <= 0; value: -8 0: 1 2 3 1: 2 3 4 5 2: 1 2 4 3: 4 optimal: oo + -8*v2 + 274/3 <= 0; value: 154/3 + -77 <= 0; value: -77 - 3*v2 + 3/5*v3 -317/5 <= 0; value: 0 - -4*v0 -4*v1 + 20 = 0; value: 0 - 5*v0 + 5*v2 -1*v3 -21 = 0; value: 0 + 8*v2 -328/3 <= 0; value: -208/3 0: 1 2 3 4 5 1: 2 3 4 5 2: 1 2 4 5 3: 4 2 1 5 0: 0 -> 46/3 1: 5 -> -31/3 2: 5 -> 5 3: 4 -> 242/3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -2*v1 + v2 -20 < 0; value: -10 + -6*v0 + v1 + 2*v2 + 11 <= 0; value: -10 + -4*v1 + 2*v3 -10 <= 0; value: -22 + 6*v1 + v2 + 6*v3 -33 < 0; value: -15 + -5*v1 + 15 = 0; value: 0 0: 1 2 1: 1 2 3 4 5 2: 1 2 4 3: 3 4 optimal: oo + -1/2*v2 + 7 < 0; value: 7 - 4*v0 + v2 -26 < 0; value: -4 + 7/2*v2 -25 < 0; value: -25 + 2*v3 -22 <= 0; value: -22 + v2 + 6*v3 -15 < 0; value: -15 - -5*v1 + 15 = 0; value: 0 0: 1 2 1: 1 2 3 4 5 2: 1 2 4 3: 3 4 0: 4 -> 11/2 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 -2 <= 0; value: -10 + -1*v1 + 2*v2 + 5*v3 -22 = 0; value: 0 + 5*v0 -1*v1 -3*v3 -10 = 0; value: 0 + -4*v0 -2*v2 + 21 <= 0; value: -3 + 3*v1 + 4*v2 -49 <= 0; value: -30 0: 3 4 1: 2 3 5 2: 1 2 4 5 3: 2 3 optimal: 24 + + 24 <= 0; value: 24 + -287/5 <= 0; value: -287/5 - -1*v1 + 2*v2 + 5*v3 -22 = 0; value: 0 - 5*v0 -2*v2 -8*v3 + 12 = 0; value: 0 - -4*v0 -2*v2 + 21 <= 0; value: 0 - -25/8*v0 -215/8 <= 0; value: 0 0: 3 4 5 1 1: 2 3 5 2: 1 2 4 5 3 3: 2 3 5 0: 4 -> -43/5 1: 1 -> -103/5 2: 4 -> 277/10 3: 3 -> -54/5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + 6*v0 -12 = 0; value: 0 + v0 + 4*v2 -14 <= 0; value: -4 + -6*v0 -5*v2 + 10 <= 0; value: -12 0: 2 3 4 5 1: 2: 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + 6*v0 -12 = 0; value: 0 + v0 + 4*v2 -14 <= 0; value: -4 + -6*v0 -5*v2 + 10 <= 0; value: -12 0: 2 3 4 5 1: 2: 4 5 3: 1 0: 2 -> 2 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 + 5*v1 -9 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + v1 -3*v3 + 4 <= 0; value: 0 + 6*v1 -2*v3 -21 <= 0; value: -13 + v1 + 5*v2 -7 = 0; value: 0 0: 1 1: 1 3 4 5 2: 5 3: 2 3 4 optimal: -2 + -2 <= 0; value: -2 - -1*v0 + 5*v1 -9 = 0; value: 0 - -5*v3 + 10 = 0; value: 0 - -5*v2 -3*v3 + 11 <= 0; value: 0 + -13 <= 0; value: -13 - 1/5*v0 + 5*v2 -26/5 = 0; value: 0 0: 1 5 3 4 1: 1 3 4 5 2: 5 3 4 3: 2 3 4 0: 1 -> 1 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 -35 <= 0; value: -23 + -3*v0 + 4*v1 + 2*v3 -5 < 0; value: -3 + 4*v0 + 6*v2 -35 < 0; value: -21 + -3*v0 + 6*v1 -6 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 1: 1 2 4 2: 3 3: 2 optimal: (23/3 -e*1) + + 23/3 < 0; value: 23/3 - -9/2*v2 -11/4 <= 0; value: 0 + 2*v3 -32/3 < 0; value: -32/3 - 4*v0 + 6*v2 -35 < 0; value: -4 - -3*v0 + 6*v1 -6 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 1 1: 1 2 4 2: 3 1 2 3: 2 0: 2 -> 26/3 1: 2 -> 16/3 2: 1 -> -11/18 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + v1 + 6*v2 -20 = 0; value: 0 + -5*v0 + 5*v2 + 1 <= 0; value: -4 + -4*v1 + 5*v3 -48 <= 0; value: -31 + 3*v0 + 2*v1 -27 <= 0; value: -11 + 4*v1 -2*v2 -4 <= 0; value: -2 0: 2 4 1: 1 3 4 5 2: 1 2 5 3: 3 optimal: oo + -35/12*v3 + 526/15 <= 0; value: 1229/60 - v1 + 6*v2 -20 = 0; value: 0 - -5*v0 + 5*v2 + 1 <= 0; value: 0 - 24*v0 + 5*v3 -664/5 <= 0; value: 0 + 15/8*v3 -172/5 <= 0; value: -1001/40 + 65/12*v3 -188/3 <= 0; value: -427/12 0: 2 4 3 5 1: 1 3 4 5 2: 1 2 5 3 4 3: 3 4 5 0: 4 -> 539/120 1: 2 -> -23/4 2: 3 -> 103/24 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + 2*v1 + 4*v3 -50 <= 0; value: -30 + 2*v0 + 5*v3 -33 = 0; value: 0 + -1*v0 -6*v2 + 4*v3 -7 < 0; value: -15 + -6*v0 + 6*v3 -6 <= 0; value: 0 + -1*v1 + 4*v3 -39 <= 0; value: -19 0: 2 3 4 1: 1 5 2: 3 3: 1 2 3 4 5 optimal: oo + 26/5*v0 + 126/5 <= 0; value: 46 + -24/5*v0 -244/5 <= 0; value: -68 - 2*v0 + 5*v3 -33 = 0; value: 0 + -13/5*v0 -6*v2 + 97/5 < 0; value: -15 + -42/5*v0 + 168/5 <= 0; value: 0 - -1*v1 + 4*v3 -39 <= 0; value: 0 0: 2 3 4 1 1: 1 5 2: 3 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> -19 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 9 < 0; value: -11 + <= 0; value: 0 + -4*v0 + 5*v1 + 4 < 0; value: -6 + 3*v1 + 4*v2 -16 < 0; value: -10 + 4*v0 -5*v1 -2*v3 <= 0; value: 0 0: 1 3 5 1: 3 4 5 2: 4 3: 5 optimal: oo + 2/5*v0 + 4/5*v3 <= 0; value: 6 + -4*v0 + 9 < 0; value: -11 + <= 0; value: 0 + -2*v3 + 4 < 0; value: -6 + 12/5*v0 + 4*v2 -6/5*v3 -16 < 0; value: -10 - 4*v0 -5*v1 -2*v3 <= 0; value: 0 0: 1 3 5 4 1: 3 4 5 2: 4 3: 5 3 4 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -1*v1 = 0; value: 0 + 2*v0 -4*v1 -7 < 0; value: -1 + -3*v0 -5*v3 -13 < 0; value: -32 + 3*v1 + 4*v2 -4 = 0; value: 0 + -5*v0 + 5 < 0; value: -10 0: 2 3 5 1: 1 2 4 2: 4 3: 3 optimal: (7 -e*1) + + 7 < 0; value: 7 - -1*v1 = 0; value: 0 - 2*v0 -7 < 0; value: -1/2 + -5*v3 -47/2 < 0; value: -67/2 + 4*v2 -4 = 0; value: 0 + -25/2 < 0; value: -25/2 0: 2 3 5 1: 1 2 4 2: 4 3: 3 0: 3 -> 13/4 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 + 3 <= 0; value: -3 + 6*v0 -6*v3 -32 <= 0; value: -14 + -1*v0 -3*v3 + 2 < 0; value: -1 + -1*v2 + 5*v3 -2 <= 0; value: -5 + -3*v2 -6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2: 4 5 3: 2 3 4 5 optimal: 233/21 + + 233/21 <= 0; value: 233/21 - -6*v1 + 3 <= 0; value: 0 - 6*v0 -6*v3 -32 <= 0; value: 0 + -130/21 < 0; value: -130/21 - -7/2*v2 + 11/2 <= 0; value: 0 - -3*v2 -6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2: 4 5 3 3: 2 3 4 5 0: 3 -> 127/21 1: 1 -> 1/2 2: 3 -> 11/7 3: 0 -> 5/7 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -1*v1 + 3*v2 + 10 < 0; value: -7 + 6*v2 + 3*v3 -27 <= 0; value: 0 + 2*v3 -19 <= 0; value: -9 + -3*v2 + 5*v3 -41 <= 0; value: -22 + -1*v1 + 2*v2 -3*v3 + 6 <= 0; value: -8 0: 1 1: 1 5 2: 1 2 4 5 3: 2 3 4 5 optimal: (3176/65 -e*1) + + 3176/65 < 0; value: 3176/65 - -5*v0 -1*v1 + 3*v2 + 10 < 0; value: -1 - 195/14*v0 -1149/14 <= 0; value: 0 + -29/13 <= 0; value: -29/13 - -15*v0 + 14*v3 -29 <= 0; value: 0 - 5*v0 -1*v2 -3*v3 -4 <= 0; value: 0 0: 1 5 4 2 3 1: 1 5 2: 1 2 4 5 3: 2 3 4 5 0: 4 -> 383/65 1: 3 -> -228/13 2: 2 -> 4/13 3: 5 -> 109/13 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v3 + 12 = 0; value: 0 + v0 -5*v1 + 22 = 0; value: 0 + -4*v0 -4*v3 + 9 <= 0; value: -3 + 5*v1 -3*v3 -49 <= 0; value: -24 + 6*v0 + 6*v1 -5*v2 -105 < 0; value: -62 0: 1 2 3 5 1: 2 4 5 2: 5 3: 1 3 4 optimal: oo + 10/9*v2 + 26/3 < 0; value: 88/9 - -4*v0 + 4*v3 + 12 = 0; value: 0 - v0 -5*v1 + 22 = 0; value: 0 + -50/9*v2 -199/3 < 0; value: -647/9 + -25/18*v2 -239/6 < 0; value: -371/9 - -5*v2 + 36/5*v3 -57 < 0; value: -36/5 0: 1 2 3 5 4 1: 2 4 5 2: 5 3 4 3: 1 3 4 5 0: 3 -> 191/18 1: 5 -> 587/90 2: 1 -> 1 3: 0 -> 137/18 + 2*v0 -2*v1 <= 0; value: 4 + v1 + 4*v3 -32 < 0; value: -19 + -1*v1 -6*v3 -7 <= 0; value: -26 + -5*v1 -5*v2 + 5*v3 -23 <= 0; value: -13 + 2*v1 -1*v3 <= 0; value: -1 + 3*v3 -11 <= 0; value: -2 0: 1: 1 2 3 4 2: 3 3: 1 2 3 4 5 optimal: oo + 2*v0 + 58 <= 0; value: 64 + -139/3 < 0; value: -139/3 - v2 -7*v3 -12/5 <= 0; value: 0 - -5*v1 -5*v2 + 5*v3 -23 <= 0; value: 0 + -185/3 <= 0; value: -185/3 - 3/7*v2 -421/35 <= 0; value: 0 0: 1: 1 2 3 4 2: 3 2 1 4 5 3: 1 2 3 4 5 0: 3 -> 3 1: 1 -> -29 2: 0 -> 421/15 3: 3 -> 11/3 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 + 2*v2 -37 <= 0; value: -17 + -2*v0 + 3*v3 -35 <= 0; value: -22 + 2*v2 -4*v3 + 8 <= 0; value: -4 + 5*v0 + 5*v1 -41 <= 0; value: -21 + 5*v0 -6*v1 + 13 <= 0; value: 0 0: 2 4 5 1: 1 4 5 2: 1 3 3: 2 3 optimal: -178/55 + -178/55 <= 0; value: -178/55 + 2*v2 -191/11 <= 0; value: -103/11 + 3*v3 -2287/55 <= 0; value: -1462/55 + 2*v2 -4*v3 + 8 <= 0; value: -4 - 55/6*v0 -181/6 <= 0; value: 0 - 5*v0 -6*v1 + 13 <= 0; value: 0 0: 2 4 5 1 1: 1 4 5 2: 1 3 3: 2 3 0: 1 -> 181/55 1: 3 -> 54/11 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 + 5*v2 + 2*v3 -62 <= 0; value: -37 + -2*v1 + 5 <= 0; value: -1 + -5*v1 + 3*v2 + 12 = 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 4*v3 -5 < 0; value: -1 0: 1: 1 2 3 2: 1 3 3: 1 4 5 optimal: oo + 2*v0 -5 <= 0; value: -5 + 2*v3 -277/6 <= 0; value: -265/6 - -6/5*v2 + 1/5 <= 0; value: 0 - -5*v1 + 3*v2 + 12 = 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 4*v3 -5 < 0; value: -1 0: 1: 1 2 3 2: 1 3 2 3: 1 4 5 0: 0 -> 0 1: 3 -> 5/2 2: 1 -> 1/6 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 + 5*v1 + 5*v3 -42 = 0; value: 0 + -3*v0 + 4*v2 -3*v3 -5 <= 0; value: -11 + -4*v0 + 3*v3 -11 = 0; value: 0 + 6*v1 -5*v2 -17 <= 0; value: -8 + 4*v0 + 5*v1 -31 <= 0; value: -7 0: 1 2 3 5 1: 1 4 5 2: 2 4 3: 1 2 3 optimal: 334/5 + + 334/5 <= 0; value: 334/5 - -3*v0 + 5*v1 + 5*v3 -42 = 0; value: 0 + 4*v2 -170 <= 0; value: -158 - -4*v0 + 3*v3 -11 = 0; value: 0 + -5*v2 -427/5 <= 0; value: -502/5 - 1/3*v0 -22/3 <= 0; value: 0 0: 1 2 3 5 4 1: 1 4 5 2: 2 4 3: 1 2 3 4 5 0: 1 -> 22 1: 4 -> -57/5 2: 3 -> 3 3: 5 -> 33 + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 + 6*v3 -10 = 0; value: 0 + 4*v0 -2*v2 -9 <= 0; value: -5 + -6*v0 -4 < 0; value: -16 + -2*v2 -3*v3 -2 <= 0; value: -6 + -5*v0 + 2*v2 + 6 = 0; value: 0 0: 2 3 5 1: 2: 1 2 4 5 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 + 6*v3 -10 = 0; value: 0 + 4*v0 -2*v2 -9 <= 0; value: -5 + -6*v0 -4 < 0; value: -16 + -2*v2 -3*v3 -2 <= 0; value: -6 + -5*v0 + 2*v2 + 6 = 0; value: 0 0: 2 3 5 1: 2: 1 2 4 5 3: 1 4 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -5*v0 + 3*v2 + v3 -18 <= 0; value: -4 + -6*v1 + 2*v3 + 13 <= 0; value: -13 + 3*v2 -2*v3 -18 <= 0; value: -10 + 5*v0 + 3*v1 -15 = 0; value: 0 + -6*v0 + v3 -4 <= 0; value: -2 0: 1 4 5 1: 2 4 2: 1 3 3: 1 2 3 5 optimal: oo + -8/5*v2 + 26/3 <= 0; value: 34/15 + 6*v2 -89/2 <= 0; value: -41/2 - 10*v0 + 2*v3 -17 <= 0; value: 0 - 3*v2 -2*v3 -18 <= 0; value: 0 - 5*v0 + 3*v1 -15 = 0; value: 0 + 33/10*v2 -34 <= 0; value: -104/5 0: 1 4 5 2 1: 2 4 2: 1 3 5 3: 1 2 3 5 0: 0 -> 23/10 1: 5 -> 7/6 2: 4 -> 4 3: 2 -> -3 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -3*v1 -2 = 0; value: 0 + v0 -5*v1 -3 <= 0; value: -7 + -6*v0 -5*v2 -2*v3 -15 < 0; value: -46 + -2*v2 -5 < 0; value: -11 + -6*v2 -3*v3 + 33 = 0; value: 0 0: 1 2 3 1: 1 2 2: 3 4 5 3: 3 5 optimal: 14/11 + + 14/11 <= 0; value: 14/11 - 5*v0 -3*v1 -2 = 0; value: 0 - -22/3*v0 + 1/3 <= 0; value: 0 + -5*v2 -2*v3 -168/11 < 0; value: -443/11 + -2*v2 -5 < 0; value: -11 + -6*v2 -3*v3 + 33 = 0; value: 0 0: 1 2 3 1: 1 2 2: 3 4 5 3: 3 5 0: 1 -> 1/22 1: 1 -> -13/22 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 <= 0; value: 0 + 2*v3 -17 <= 0; value: -7 + 6*v0 -3*v1 + 8 < 0; value: -1 + -3*v1 + 2*v2 + 5 = 0; value: 0 + -6*v0 -1*v1 -5*v3 + 28 = 0; value: 0 0: 1 3 5 1: 3 4 5 2: 4 3: 2 5 optimal: (-16/3 -e*1) + -16/3 < 0; value: -16/3 - -5*v0 <= 0; value: 0 + -103/15 <= 0; value: -103/15 - 24*v0 + 15*v3 -76 < 0; value: -1/2 - -3*v1 + 2*v2 + 5 = 0; value: 0 - -6*v0 -2/3*v2 -5*v3 + 79/3 = 0; value: 0 0: 1 3 5 2 1: 3 4 5 2: 4 3 5 3: 2 5 3 0: 0 -> 0 1: 3 -> 17/6 2: 2 -> 7/4 3: 5 -> 151/30 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 4*v2 -2*v3 -47 <= 0; value: -15 + -1*v1 + 4 <= 0; value: 0 + 6*v0 + v1 -5*v3 -32 < 0; value: -14 + -4*v1 + 4*v3 + 3 <= 0; value: -5 + -5*v2 + 24 <= 0; value: -1 0: 1 3 1: 2 3 4 2: 1 5 3: 1 3 4 optimal: (27/4 -e*1) + + 27/4 < 0; value: 27/4 + 4*v2 -24 <= 0; value: -4 - -1*v1 + 4 <= 0; value: 0 - 6*v0 -5*v3 -28 < 0; value: -6 - 4*v3 -13 <= 0; value: 0 + -5*v2 + 24 <= 0; value: -1 0: 1 3 1: 2 3 4 2: 1 5 3: 1 3 4 0: 4 -> 51/8 1: 4 -> 4 2: 5 -> 5 3: 2 -> 13/4 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v3 -10 = 0; value: 0 + 4*v1 -20 = 0; value: 0 + -5*v0 -4*v3 + 10 < 0; value: -35 + -1*v0 + 5*v3 -36 <= 0; value: -16 + -4*v1 + 4*v2 + 6*v3 -26 <= 0; value: -8 0: 3 4 1: 1 2 5 2: 5 3: 1 3 4 5 optimal: oo + 2*v0 -10 <= 0; value: 0 - 4*v1 -2*v3 -10 = 0; value: 0 - 2*v3 -10 = 0; value: 0 + -5*v0 -10 < 0; value: -35 + -1*v0 -11 <= 0; value: -16 + 4*v2 -16 <= 0; value: -8 0: 3 4 1: 1 2 5 2: 5 3: 1 3 4 5 2 0: 5 -> 5 1: 5 -> 5 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v2 -6 <= 0; value: -18 + -1*v0 + v2 -2 <= 0; value: 0 + 3*v0 + 2*v1 -5*v2 + 10 = 0; value: 0 + 4*v0 + 2*v1 + 5*v2 -53 < 0; value: -32 + 2*v0 -4*v2 -2*v3 + 10 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 1 2 3 4 5 3: 5 optimal: (815/2 -e*1) + + 815/2 < 0; value: 815/2 - -2*v0 + 2*v3 -16 <= 0; value: 0 + -163/2 < 0; value: -163/2 - 3*v0 + 2*v1 -5*v2 + 10 = 0; value: 0 - v0 -78 < 0; value: -1 - 2*v0 -4*v2 -2*v3 + 10 = 0; value: 0 0: 2 3 4 5 1 1: 3 4 2: 1 2 3 4 5 3: 5 1 2 4 0: 1 -> 77 1: 1 -> -497/4 2: 3 -> -3/2 3: 0 -> 85 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 -1*v2 + 3*v3 -10 <= 0; value: -22 + 5*v2 + 3*v3 -38 <= 0; value: -24 + 4*v3 -12 <= 0; value: 0 + -6*v1 -1*v2 + 6*v3 <= 0; value: -1 + 4*v1 -2*v3 -6 <= 0; value: 0 0: 1 1: 4 5 2: 1 2 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 1/3*v2 -2*v3 <= 0; value: 13/3 + -4*v0 -1*v2 + 3*v3 -10 <= 0; value: -22 + 5*v2 + 3*v3 -38 <= 0; value: -24 + 4*v3 -12 <= 0; value: 0 - -6*v1 -1*v2 + 6*v3 <= 0; value: 0 + -2/3*v2 + 2*v3 -6 <= 0; value: -2/3 0: 1 1: 4 5 2: 1 2 4 5 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> 17/6 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 -5*v1 + 19 = 0; value: 0 + -4*v0 -2*v3 + 18 = 0; value: 0 + 3*v2 -6*v3 + 2 <= 0; value: -4 + -4*v1 + 2*v3 < 0; value: -2 + -3*v1 -4*v2 -3*v3 -24 <= 0; value: -55 0: 1 2 1: 1 4 5 2: 3 5 3: 2 3 4 5 optimal: 3610/357 + + 3610/357 <= 0; value: 3610/357 - -3*v0 -5*v1 + 19 = 0; value: 0 - -4*v0 -2*v3 + 18 = 0; value: 0 - 3*v2 -6*v3 + 2 <= 0; value: 0 + -2162/357 < 0; value: -2162/357 - -119/20*v2 -143/5 <= 0; value: 0 0: 1 2 4 5 1: 1 4 5 2: 3 5 4 3: 2 3 4 5 0: 3 -> 1976/357 1: 2 -> 57/119 2: 4 -> -572/119 3: 3 -> -739/357 + 2*v0 -2*v1 <= 0; value: 2 + -1*v1 -5*v3 -17 <= 0; value: -40 + 2*v1 -4*v2 -1 <= 0; value: -3 + v2 -4*v3 + 14 = 0; value: 0 + v0 + 2*v1 -25 <= 0; value: -15 + -2*v1 -1*v2 -3*v3 + 20 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 5 3: 1 3 5 optimal: oo + 2*v0 + 7/4*v2 -19/2 <= 0; value: 2 + -3/8*v2 -157/4 <= 0; value: -40 + -23/4*v2 + 17/2 <= 0; value: -3 - v2 -4*v3 + 14 = 0; value: 0 + v0 -7/4*v2 -31/2 <= 0; value: -15 - -2*v1 -1*v2 -3*v3 + 20 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 5 1 4 3: 1 3 5 2 4 0: 4 -> 4 1: 3 -> 3 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 + 3 <= 0; value: -3 + -1*v1 -3*v2 + v3 + 4 = 0; value: 0 + v1 -1*v3 -1 <= 0; value: -3 + 5*v0 -26 <= 0; value: -1 + v0 + 5*v2 -2*v3 -8 < 0; value: -3 0: 4 5 1: 1 2 3 2: 2 5 3: 2 3 5 optimal: (37/5 -e*1) + + 37/5 < 0; value: 37/5 - -1*v0 + v2 + 3 <= 0; value: 0 - -1*v1 -3*v2 + v3 + 4 = 0; value: 0 + -18/5 <= 0; value: -18/5 - 5*v0 -26 <= 0; value: 0 - v0 + 5*v2 -2*v3 -8 < 0; value: -9/10 0: 4 5 1 3 1: 1 2 3 2: 2 5 1 3 3: 2 3 5 1 0: 5 -> 26/5 1: 3 -> 39/20 2: 2 -> 11/5 3: 5 -> 91/20 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -5*v3 + 1 < 0; value: -1 + -4*v1 + 3*v3 -3 <= 0; value: -8 + -1*v1 + 1 <= 0; value: -1 + -1*v0 -4*v1 -5*v3 + 7 <= 0; value: -7 + -3*v0 -3*v3 -1 <= 0; value: -7 0: 1 4 5 1: 2 3 4 2: 3: 1 2 4 5 optimal: (46/9 -e*1) + + 46/9 < 0; value: 46/9 - 3*v0 -5*v3 + 1 < 0; value: -3 - 3*v3 -7 <= 0; value: 0 - -1*v1 + 1 <= 0; value: 0 + -110/9 < 0; value: -110/9 + -56/3 < 0; value: -56/3 0: 1 4 5 1: 2 3 4 2: 3: 1 2 4 5 0: 1 -> 23/9 1: 2 -> 1 2: 0 -> 0 3: 1 -> 7/3 + 2*v0 -2*v1 <= 0; value: -2 + v0 + 5*v1 -1*v2 -19 <= 0; value: -11 + -3*v1 + 3*v2 + 2*v3 -5 = 0; value: 0 + -1*v2 + 6*v3 -8 <= 0; value: -5 + 3*v0 + 3*v1 -3*v2 = 0; value: 0 + -1*v0 + 2*v1 + 2*v3 -14 <= 0; value: -9 0: 1 4 5 1: 1 2 4 5 2: 1 2 3 4 3: 2 3 5 optimal: oo + 22*v0 -14 <= 0; value: 8 + -40*v0 + 9 <= 0; value: -31 - -3*v1 + 3*v2 + 2*v3 -5 = 0; value: 0 - -9*v0 -1*v2 + 7 <= 0; value: 0 - 3*v0 + 2*v3 -5 = 0; value: 0 + -24*v0 + 5 <= 0; value: -19 0: 1 4 5 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 2 3 5 4 1 0: 1 -> 1 1: 2 -> -3 2: 3 -> -2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 6 = 0; value: 0 + 3*v0 + 6*v2 -21 = 0; value: 0 + 4*v2 + 5*v3 -29 <= 0; value: -17 + -4*v1 -1*v3 + 12 = 0; value: 0 + -3*v0 -2*v1 + 5*v3 + 3 < 0; value: -6 0: 2 5 1: 1 4 5 2: 2 3 3: 3 4 5 optimal: oo + -4*v2 + 8 <= 0; value: -4 - -2*v1 + 6 = 0; value: 0 - 3*v0 + 6*v2 -21 = 0; value: 0 + 4*v2 + 5*v3 -29 <= 0; value: -17 + -1*v3 = 0; value: 0 + 6*v2 + 5*v3 -24 < 0; value: -6 0: 2 5 1: 1 4 5 2: 2 3 5 3: 3 4 5 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 5*v0 + 4*v2 -12 <= 0; value: -4 + -1*v1 <= 0; value: -1 + -6*v1 + 2*v2 < 0; value: -2 + -6*v0 + 2*v1 + 6*v3 -5 < 0; value: -3 0: 2 5 1: 3 4 5 2: 2 4 3: 5 optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 + = 0; value: 0 - 5*v0 -12 <= 0; value: 0 - -1/3*v2 <= 0; value: 0 - -6*v1 + 2*v2 < 0; value: -3 + 6*v3 -97/5 < 0; value: -97/5 0: 2 5 1: 3 4 5 2: 2 4 3 5 3: 5 0: 0 -> 12/5 1: 1 -> 1/2 2: 2 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -2*v0 + 2*v3 -3 < 0; value: -9 + -5*v0 + v1 + 4*v3 + 1 < 0; value: -14 + 6*v1 + 4*v2 -30 < 0; value: -12 + 4*v0 + 4*v3 -20 = 0; value: 0 + -2*v1 + v3 <= 0; value: -1 0: 1 2 4 1: 2 3 5 2: 3 3: 1 2 4 5 optimal: oo + 3*v0 -5 <= 0; value: 7 + -4*v0 + 7 < 0; value: -9 + -19/2*v0 + 47/2 < 0; value: -29/2 + -3*v0 + 4*v2 -15 < 0; value: -15 - 4*v0 + 4*v3 -20 = 0; value: 0 - -2*v1 + v3 <= 0; value: 0 0: 1 2 4 3 1: 2 3 5 2: 3 3: 1 2 4 5 3 0: 4 -> 4 1: 1 -> 1/2 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 -4*v3 -11 < 0; value: -28 + 4*v2 -13 < 0; value: -1 + -6*v1 -4*v3 -20 <= 0; value: -46 + -1*v0 -1*v1 + 6*v2 -13 <= 0; value: -2 + -1*v3 < 0; value: -2 0: 4 1: 1 3 4 2: 2 4 3: 1 3 5 optimal: oo + 2*v0 + 4/3*v3 + 20/3 <= 0; value: 52/3 + -2*v3 -1 < 0; value: -5 + 2/3*v0 -4/9*v3 -59/9 < 0; value: -43/9 - 6*v0 -36*v2 -4*v3 + 58 <= 0; value: 0 - -1*v0 -1*v1 + 6*v2 -13 <= 0; value: 0 + -1*v3 < 0; value: -2 0: 4 1 3 2 1: 1 3 4 2: 2 4 1 3 3: 1 3 5 2 0: 4 -> 4 1: 3 -> -14/3 2: 3 -> 37/18 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -1*v1 + 3 <= 0; value: -1 + 6*v1 -2*v2 + 2*v3 -31 < 0; value: -1 + 3*v0 + 6*v3 -76 <= 0; value: -46 + 3*v1 -5*v2 -2 = 0; value: 0 + -6*v3 -13 < 0; value: -43 0: 1 3 1: 1 2 4 2: 2 4 3: 2 3 5 optimal: (1228/3 -e*1) + + 1228/3 < 0; value: 1228/3 - -6*v0 -5/3*v2 + 7/3 <= 0; value: 0 + -13118/15 < 0; value: -13118/15 - 3*v0 + 6*v3 -76 <= 0; value: 0 - 3*v1 -5*v2 -2 = 0; value: 0 - -6*v3 -13 < 0; value: -6 0: 1 3 2 1: 1 2 4 2: 2 4 1 3: 2 3 5 0: 0 -> 83/3 1: 4 -> -163 2: 2 -> -491/5 3: 5 -> -7/6 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 3*v2 + 5*v3 -47 <= 0; value: -27 + -1*v1 + 2*v2 -9 = 0; value: 0 + 3*v1 -2*v2 -1*v3 + 2 < 0; value: -6 + v1 + 4*v2 + 6*v3 -58 <= 0; value: -31 + 2*v0 -3*v1 + 5*v2 -48 <= 0; value: -26 0: 1 5 1: 2 3 4 5 2: 1 2 3 4 5 3: 1 3 4 optimal: oo + -6*v0 + 102 <= 0; value: 102 + 9*v0 + 5*v3 -110 <= 0; value: -105 - -1*v1 + 2*v2 -9 = 0; value: 0 + 8*v0 -1*v3 -109 < 0; value: -110 + 12*v0 + 6*v3 -193 <= 0; value: -187 - 2*v0 -1*v2 -21 <= 0; value: 0 0: 1 5 3 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 1 3 4 0: 0 -> 0 1: 1 -> -51 2: 5 -> -21 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v3 -12 <= 0; value: 0 + -3*v2 -2*v3 + 4 < 0; value: -14 + v0 -2 <= 0; value: -1 + -2*v0 + 5*v2 -35 <= 0; value: -17 + 5*v0 + 4*v3 -17 = 0; value: 0 0: 3 4 5 1: 2: 2 4 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v3 -12 <= 0; value: 0 + -3*v2 -2*v3 + 4 < 0; value: -14 + v0 -2 <= 0; value: -1 + -2*v0 + 5*v2 -35 <= 0; value: -17 + 5*v0 + 4*v3 -17 = 0; value: 0 0: 3 4 5 1: 2: 2 4 3: 1 2 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v1 + 3*v3 -7 <= 0; value: -4 + -3*v1 -6*v2 + 2 <= 0; value: -7 + 6*v1 + 3*v2 -18 = 0; value: 0 + 6*v0 -6*v2 + 4*v3 -31 < 0; value: -13 + -1*v0 -2*v1 -1*v3 -3 <= 0; value: -12 0: 4 5 1: 1 2 3 5 2: 2 3 4 3: 1 4 5 optimal: oo + 16/5*v0 + 32/5 <= 0; value: 16 - -1/2*v0 + 5/2*v3 -17/2 <= 0; value: 0 + -27/5*v0 -314/5 <= 0; value: -79 - 6*v1 + 3*v2 -18 = 0; value: 0 + -2/5*v0 -459/5 < 0; value: -93 - -1*v0 + v2 -1*v3 -9 <= 0; value: 0 0: 4 5 2 1 4 1: 1 2 3 5 2: 2 3 4 5 1 3: 1 4 5 2 0: 3 -> 3 1: 3 -> -5 2: 0 -> 16 3: 0 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -34 <= 0; value: -18 + -1*v0 + v1 + 2*v3 <= 0; value: 0 + -1*v2 + v3 = 0; value: 0 + 4*v0 -16 = 0; value: 0 + 5*v2 = 0; value: 0 0: 2 4 1: 1 2 2: 3 5 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -34 <= 0; value: -18 + -1*v0 + v1 + 2*v3 <= 0; value: 0 + -1*v2 + v3 = 0; value: 0 + 4*v0 -16 = 0; value: 0 + 5*v2 = 0; value: 0 0: 2 4 1: 1 2 2: 3 5 3: 2 3 0: 4 -> 4 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 4*v1 -3 < 0; value: -15 + -6*v0 -1*v2 -2*v3 + 31 <= 0; value: -4 + 6*v0 + 2*v1 -26 = 0; value: 0 + -6*v0 -4*v2 + 20 <= 0; value: -16 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 3 2: 2 4 3: 2 5 optimal: oo + 8*v0 -26 <= 0; value: 6 + -16*v0 + 49 < 0; value: -15 + -6*v0 -1*v2 -2*v3 + 31 <= 0; value: -4 - 6*v0 + 2*v1 -26 = 0; value: 0 + -6*v0 -4*v2 + 20 <= 0; value: -16 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 3 2: 2 4 3: 2 5 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 2*v3 -25 <= 0; value: -13 + 5*v0 -6*v3 + 9 = 0; value: 0 + -2*v0 + v1 -5*v3 -13 < 0; value: -37 + 5*v2 -5 = 0; value: 0 + 6*v0 + 6*v3 -75 < 0; value: -33 0: 2 3 5 1: 3 2: 1 4 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 2*v3 -25 <= 0; value: -13 + 5*v0 -6*v3 + 9 = 0; value: 0 + -2*v0 + v1 -5*v3 -13 < 0; value: -37 + 5*v2 -5 = 0; value: 0 + 6*v0 + 6*v3 -75 < 0; value: -33 0: 2 3 5 1: 3 2: 1 4 3: 1 2 3 5 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -37 <= 0; value: -22 + = 0; value: 0 + -1*v0 -5*v2 + 2*v3 -7 <= 0; value: -20 + -4*v3 -14 < 0; value: -34 + 3*v0 + 5*v1 -34 < 0; value: -20 0: 1 3 5 1: 5 2: 3 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -37 <= 0; value: -22 + = 0; value: 0 + -1*v0 -5*v2 + 2*v3 -7 <= 0; value: -20 + -4*v3 -14 < 0; value: -34 + 3*v0 + 5*v1 -34 < 0; value: -20 0: 1 3 5 1: 5 2: 3 3: 3 4 0: 3 -> 3 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + v1 -4*v2 + 7 = 0; value: 0 + <= 0; value: 0 + 2*v2 -1*v3 -1 = 0; value: 0 + 2*v0 -1*v1 -3*v3 + 8 <= 0; value: -2 + 5*v3 -17 < 0; value: -2 0: 4 1: 1 4 2: 1 3 3: 3 4 5 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 - v1 -4*v2 + 7 = 0; value: 0 + <= 0; value: 0 - 2*v2 -1*v3 -1 = 0; value: 0 - 2*v0 -5*v3 + 13 <= 0; value: 0 - 2*v0 -4 < 0; value: -2 0: 4 5 1: 1 4 2: 1 3 4 3: 3 4 5 0: 0 -> 1 1: 1 -> 1 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -20 < 0; value: -12 + -3*v2 -4*v3 + 2 <= 0; value: -19 + -2*v0 + v1 + 1 <= 0; value: 0 + -3*v0 -5*v1 + 4*v3 -6 <= 0; value: -15 + -3*v0 + 3*v1 + v2 -6 = 0; value: 0 0: 1 3 4 5 1: 3 4 5 2: 2 5 3: 2 4 optimal: oo + 16/5*v0 -8/5*v3 + 12/5 <= 0; value: 4 + 4*v0 -20 < 0; value: -12 + -72/5*v0 + 16/5*v3 -134/5 <= 0; value: -46 + -13/5*v0 + 4/5*v3 -1/5 <= 0; value: -3 - -8*v0 + 5/3*v2 + 4*v3 -16 <= 0; value: 0 - -3*v0 + 3*v1 + v2 -6 = 0; value: 0 0: 1 3 4 5 2 1: 3 4 5 2: 2 5 4 3 3: 2 4 3 0: 2 -> 2 1: 3 -> 0 2: 3 -> 12 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + 6*v1 + 2*v3 -37 < 0; value: -13 + 2*v0 + 3*v1 + 2*v3 -50 <= 0; value: -28 + -5*v0 -2 <= 0; value: -12 + = 0; value: 0 + -2*v1 + 3*v2 -4 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 5 3: 1 2 optimal: oo + 2*v0 -3*v2 + 4 <= 0; value: -4 + -3*v0 + 9*v2 + 2*v3 -49 < 0; value: -13 + 2*v0 + 9/2*v2 + 2*v3 -56 <= 0; value: -28 + -5*v0 -2 <= 0; value: -12 + = 0; value: 0 - -2*v1 + 3*v2 -4 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 5 1 2 3: 1 2 0: 2 -> 2 1: 4 -> 4 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -7 <= 0; value: -16 + -3*v0 + 4*v1 + v3 + 8 = 0; value: 0 + -1*v0 -4*v1 + 5*v2 -17 <= 0; value: -5 + -5*v2 + 6*v3 -7 <= 0; value: -16 + 5*v0 -1*v2 -28 <= 0; value: -16 0: 1 2 3 5 1: 2 3 2: 3 4 5 3: 2 4 optimal: 3167/302 + + 3167/302 <= 0; value: 3167/302 + -4138/151 <= 0; value: -4138/151 - -3*v0 + 4*v1 + v3 + 8 = 0; value: 0 - -4*v0 + 35/6*v2 -47/6 <= 0; value: 0 - -5*v2 + 6*v3 -7 <= 0; value: 0 - 151/35*v0 -1027/35 <= 0; value: 0 0: 1 2 3 5 1: 2 3 2: 3 4 5 3: 2 4 3 0: 3 -> 1027/151 1: 0 -> 941/604 2: 3 -> 907/151 3: 1 -> 932/151 + 2*v0 -2*v1 <= 0; value: 10 + -5*v0 + 2*v1 -4*v3 + 41 = 0; value: 0 + -5*v2 + 6*v3 + 1 <= 0; value: 0 + -5*v2 -5*v3 + 45 = 0; value: 0 + 4*v0 -31 <= 0; value: -11 + -5*v0 + 4*v2 + 5 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 5 3: 1 2 3 optimal: 31/2 + + 31/2 <= 0; value: 31/2 - -5*v0 + 2*v1 -4*v3 + 41 = 0; value: 0 + -605/16 <= 0; value: -605/16 - -5*v2 -5*v3 + 45 = 0; value: 0 - 4*v0 -31 <= 0; value: 0 - -5*v0 + 4*v2 + 5 = 0; value: 0 0: 1 4 5 2 1: 1 2: 2 3 5 3: 1 2 3 0: 5 -> 31/4 1: 0 -> 0 2: 5 -> 135/16 3: 4 -> 9/16 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 <= 0; value: 0 + -5*v0 + 2*v3 -1 <= 0; value: -13 + 2*v0 -22 <= 0; value: -14 + 3*v0 -12 <= 0; value: 0 + 3*v0 -3*v3 <= 0; value: 0 0: 2 3 4 5 1: 1 2: 3: 2 5 optimal: 8 + + 8 <= 0; value: 8 - -2*v1 <= 0; value: 0 + 2*v3 -21 <= 0; value: -13 + -14 <= 0; value: -14 - 3*v0 -12 <= 0; value: 0 + -3*v3 + 12 <= 0; value: 0 0: 2 3 4 5 1: 1 2: 3: 2 5 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 4*v2 <= 0; value: 0 + 4*v2 -20 = 0; value: 0 + -3*v1 + v2 + 10 = 0; value: 0 + -3*v1 -4*v3 + 13 <= 0; value: -2 + v1 -12 <= 0; value: -7 0: 1 1: 3 4 5 2: 1 2 3 3: 4 optimal: oo + 2*v0 -10 <= 0; value: -2 + -5*v0 + 20 <= 0; value: 0 - 4*v2 -20 = 0; value: 0 - -3*v1 + v2 + 10 = 0; value: 0 + -4*v3 -2 <= 0; value: -2 + -7 <= 0; value: -7 0: 1 1: 3 4 5 2: 1 2 3 4 5 3: 4 0: 4 -> 4 1: 5 -> 5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + 2*v0 -2*v2 -3 < 0; value: -7 + 4*v2 -4*v3 -8 < 0; value: -4 + -4*v1 -5*v2 + 30 = 0; value: 0 + <= 0; value: 0 + 5*v2 + 3*v3 -27 <= 0; value: -14 0: 1 1: 3 2: 1 2 3 5 3: 2 5 optimal: (105/16 -e*1) + + 105/16 < 0; value: 105/16 - 2*v0 -45/4 < 0; value: -2 - 4*v2 -4*v3 -8 < 0; value: -4 - -4*v1 -5*v2 + 30 = 0; value: 0 + <= 0; value: 0 - 8*v3 -17 <= 0; value: 0 0: 1 1: 3 2: 1 2 3 5 3: 2 5 1 0: 0 -> 37/8 1: 5 -> 115/32 2: 2 -> 25/8 3: 1 -> 17/8 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 6*v2 -37 < 0; value: -1 + -2*v0 -4*v1 -4*v2 + 1 <= 0; value: -21 + v0 + 5*v1 + v3 -18 <= 0; value: -9 + -4*v2 + 6*v3 + 6 = 0; value: 0 + 4*v3 -6 < 0; value: -2 0: 1 2 3 1: 2 3 2: 1 2 4 3: 3 4 5 optimal: (468/17 -e*1) + + 468/17 < 0; value: 468/17 - 6*v0 + 9*v3 -28 < 0; value: -9 - -2*v0 -4*v1 -4*v2 + 1 <= 0; value: 0 - 17/6*v0 -1601/36 < 0; value: -17/6 - -4*v2 + 6*v3 + 6 = 0; value: 0 + -602/17 < 0; value: -602/17 0: 1 2 3 5 1: 2 3 2: 1 2 4 3 3: 3 4 5 1 0: 3 -> 1499/102 1: 1 -> 299/102 2: 3 -> -341/34 3: 1 -> -392/51 + 2*v0 -2*v1 <= 0; value: -4 + v3 = 0; value: 0 + -6*v0 -6*v2 + 15 <= 0; value: -3 + v2 + 5*v3 -2 = 0; value: 0 + 3*v0 + v3 -7 <= 0; value: -4 + 5*v1 -22 < 0; value: -7 0: 2 4 1: 5 2: 2 3 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + v3 = 0; value: 0 + -6*v0 -6*v2 + 15 <= 0; value: -3 + v2 + 5*v3 -2 = 0; value: 0 + 3*v0 + v3 -7 <= 0; value: -4 + 5*v1 -22 < 0; value: -7 0: 2 4 1: 5 2: 2 3 3: 1 3 4 0: 1 -> 1 1: 3 -> 3 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -2*v3 -7 <= 0; value: -3 + <= 0; value: 0 + 6*v1 -2*v2 -3*v3 -59 <= 0; value: -37 + -5*v0 -2*v1 + 6*v2 + 18 < 0; value: -4 + 4*v0 + 6*v2 -23 < 0; value: -1 0: 4 5 1: 3 4 2: 1 3 4 5 3: 1 3 optimal: oo + 7*v0 -6*v2 -18 < 0; value: 4 + 4*v2 -2*v3 -7 <= 0; value: -3 + <= 0; value: 0 + -15*v0 + 16*v2 -3*v3 -5 < 0; value: -49 - -5*v0 -2*v1 + 6*v2 + 18 < 0; value: -2 + 4*v0 + 6*v2 -23 < 0; value: -1 0: 4 5 3 1: 3 4 2: 1 3 4 5 3: 1 3 0: 4 -> 4 1: 4 -> 3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 30 = 0; value: 0 + 5*v0 -6*v1 -5*v3 + 13 <= 0; value: -1 + -3*v0 + 4*v1 + 4*v2 -47 <= 0; value: -30 + 4*v0 -20 = 0; value: 0 + -1*v2 + v3 + 1 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 3 5 3: 2 5 optimal: 79 + + 79 <= 0; value: 79 - -6*v0 + 30 = 0; value: 0 - 5*v0 -6*v1 -5*v3 + 13 <= 0; value: 0 - 1/3*v0 + 2/3*v2 -35 <= 0; value: 0 + = 0; value: 0 - -1*v2 + v3 + 1 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 3 5 3: 2 5 3 0: 5 -> 5 1: 4 -> -69/2 2: 4 -> 50 3: 3 -> 49 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 <= 0; value: 0 + 2*v3 -11 < 0; value: -5 + 3*v0 -2*v3 -1 < 0; value: -7 + v0 -3*v2 -4 <= 0; value: -10 + 6*v0 + 4*v1 -5*v3 + 1 <= 0; value: -6 0: 1 3 4 5 1: 5 2: 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 <= 0; value: 0 + 2*v3 -11 < 0; value: -5 + 3*v0 -2*v3 -1 < 0; value: -7 + v0 -3*v2 -4 <= 0; value: -10 + 6*v0 + 4*v1 -5*v3 + 1 <= 0; value: -6 0: 1 3 4 5 1: 5 2: 4 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 5*v3 -67 <= 0; value: -40 + v1 -3*v3 + 1 <= 0; value: -5 + 6*v0 + 2*v2 + 2*v3 -71 <= 0; value: -31 + -4*v0 -6*v3 + 6 <= 0; value: -32 + -6*v1 + 5*v3 + 2 <= 0; value: -1 0: 3 4 1: 1 2 5 2: 3 3: 1 2 3 4 5 optimal: oo + -2/3*v2 + 841/39 <= 0; value: 263/13 + -787/13 <= 0; value: -787/13 - -13/6*v3 + 4/3 <= 0; value: 0 - 6*v0 + 2*v2 -907/13 <= 0; value: 0 + 4/3*v2 -1724/39 <= 0; value: -540/13 - -6*v1 + 5*v3 + 2 <= 0; value: 0 0: 3 4 1: 1 2 5 2: 3 4 3: 1 2 3 4 5 0: 5 -> 285/26 1: 3 -> 11/13 2: 2 -> 2 3: 3 -> 8/13 + 2*v0 -2*v1 <= 0; value: 2 + 3*v3 -18 <= 0; value: -9 + 4*v1 -5*v2 + 5 = 0; value: 0 + 4*v0 + 2*v1 -8 <= 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -3*v1 + 3*v2 + v3 -16 <= 0; value: -10 0: 3 1: 2 3 5 2: 2 5 3: 1 4 5 optimal: 54 + + 54 <= 0; value: 54 + -9 <= 0; value: -9 - 4*v1 -5*v2 + 5 = 0; value: 0 - 4*v0 -124/3 <= 0; value: 0 - -6*v3 + 18 = 0; value: 0 - -3/4*v2 + v3 -49/4 <= 0; value: 0 0: 3 1: 2 3 5 2: 2 5 3 3: 1 4 5 3 0: 1 -> 31/3 1: 0 -> -50/3 2: 1 -> -37/3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 -2*v2 -17 < 0; value: -5 + -2*v0 + 8 = 0; value: 0 + -2*v1 + 4*v2 + v3 < 0; value: -4 + 4*v0 + 6*v1 -63 <= 0; value: -29 + -5*v0 -1*v1 + 19 < 0; value: -4 0: 2 4 5 1: 1 3 4 5 2: 1 3 3: 3 optimal: (10 -e*1) + + 10 < 0; value: 10 + -2*v2 -21 < 0; value: -21 - -2*v0 + 8 = 0; value: 0 - -2*v1 + 4*v2 + v3 < 0; value: -2 + -53 < 0; value: -53 - -5*v0 -2*v2 -1/2*v3 + 19 <= 0; value: 0 0: 2 4 5 1 1: 1 3 4 5 2: 1 3 5 4 3: 3 5 1 4 0: 4 -> 4 1: 3 -> 0 2: 0 -> 0 3: 2 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 3*v3 -16 < 0; value: -7 + -3*v0 -6*v1 + 11 <= 0; value: -1 + -4*v1 -4*v2 -1*v3 + 11 = 0; value: 0 + -5*v1 + 10 = 0; value: 0 + 5*v1 + 3*v3 -27 < 0; value: -8 0: 2 1: 2 3 4 5 2: 1 3 3: 1 3 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + -6*v2 -7 < 0; value: -7 + -3*v0 -1 <= 0; value: -1 - -4*v1 -4*v2 -1*v3 + 11 = 0; value: 0 - 5*v2 + 5/4*v3 -15/4 = 0; value: 0 + -12*v2 -8 < 0; value: -8 0: 2 1: 2 3 4 5 2: 1 3 2 4 5 3: 1 3 5 2 4 0: 0 -> 0 1: 2 -> 2 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + -1*v1 + 4*v3 -5 = 0; value: 0 + 6*v0 + v1 -3*v2 <= 0; value: -9 + v0 -6*v1 + 3*v2 + 5 < 0; value: -1 + 4*v0 -1*v1 -2*v3 -3 < 0; value: -10 + -5*v0 -1*v1 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 3 3: 1 4 5 optimal: (-2 -e*1) + -2 < 0; value: -2 - -1*v1 + 4*v3 -5 = 0; value: 0 - 37/6*v0 -5/2*v2 + 5/6 < 0; value: -5/2 - v0 + 3*v2 -24*v3 + 35 < 0; value: -9/2 + -7 <= 0; value: -7 - -5*v0 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 3 4 3: 1 4 5 3 2 0: 0 -> 0 1: 3 -> 9/4 2: 4 -> 4/3 3: 2 -> 29/16 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -4*v2 + 2 < 0; value: -13 + v3 <= 0; value: 0 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 -6*v2 -2 <= 0; value: -22 + 6*v0 -2*v2 + 4*v3 = 0; value: 0 0: 1 3 4 5 1: 4 2: 1 4 5 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -4*v2 + 2 < 0; value: -13 + v3 <= 0; value: 0 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 -6*v2 -2 <= 0; value: -22 + 6*v0 -2*v2 + 4*v3 = 0; value: 0 0: 1 3 4 5 1: 4 2: 1 4 5 3: 2 5 0: 1 -> 1 1: 4 -> 4 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -6*v3 <= 0; value: -30 + 6*v0 -5*v1 + 1 <= 0; value: -1 + -5*v0 -6*v2 + 33 = 0; value: 0 + -6*v1 -3*v2 -5*v3 + 58 = 0; value: 0 + 6*v0 + 5*v2 -66 < 0; value: -33 0: 2 3 5 1: 2 4 2: 3 4 5 3: 1 4 optimal: oo + 12/25*v2 -76/25 <= 0; value: -8/5 + -846/125*v2 -1392/125 <= 0; value: -786/25 - 6*v0 + 5/2*v2 + 25/6*v3 -142/3 <= 0; value: 0 - -5*v0 -6*v2 + 33 = 0; value: 0 - -6*v1 -3*v2 -5*v3 + 58 = 0; value: 0 + -11/5*v2 -132/5 < 0; value: -33 0: 2 3 5 1 1: 2 4 2: 3 4 5 2 1 3: 1 4 2 0: 3 -> 3 1: 4 -> 19/5 2: 3 -> 3 3: 5 -> 131/25 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -1*v2 + 13 = 0; value: 0 + -2*v0 -6*v1 -1*v3 + 4 < 0; value: -31 + -6*v0 + 5*v1 -2*v2 + 14 = 0; value: 0 + -5*v0 -5*v1 + 30 <= 0; value: -10 + 5*v0 -6*v3 -5 < 0; value: -3 0: 2 3 4 5 1: 1 2 3 4 2: 1 3 3: 2 5 optimal: oo + 4/5*v3 -2 < 0; value: 2/5 - -2*v1 -1*v2 + 13 = 0; value: 0 + -41/5*v3 -10 < 0; value: -173/5 - -6*v0 -9/2*v2 + 93/2 = 0; value: 0 + -10*v3 + 15 < 0; value: -15 - 5*v0 -6*v3 -5 < 0; value: -3/2 0: 2 3 4 5 1: 1 2 3 4 2: 1 3 2 4 3: 2 5 4 0: 4 -> 43/10 1: 4 -> 21/5 2: 5 -> 23/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -3*v3 -12 < 0; value: -6 + -1*v0 -4*v3 -1 <= 0; value: -20 + -6*v0 -3 <= 0; value: -21 + -2*v0 -1*v3 -4 <= 0; value: -14 + 5*v0 -1*v1 -32 < 0; value: -19 0: 1 2 3 4 5 1: 5 2: 3: 1 2 4 optimal: (68 -e*1) + + 68 < 0; value: 68 + -3*v3 -15 < 0; value: -27 + -4*v3 -1/2 <= 0; value: -33/2 - -6*v0 -3 <= 0; value: 0 + -1*v3 -3 <= 0; value: -7 - 5*v0 -1*v1 -32 < 0; value: -1 0: 1 2 3 4 5 1: 5 2: 3: 1 2 4 0: 3 -> -1/2 1: 2 -> -67/2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -20 < 0; value: -12 + 5*v1 -15 = 0; value: 0 + 3*v3 -4 < 0; value: -1 + 6*v2 -6 = 0; value: 0 + 5*v2 + 4*v3 -22 <= 0; value: -13 0: 1 1: 2 2: 4 5 3: 3 5 optimal: (4 -e*1) + + 4 < 0; value: 4 - 4*v0 -20 < 0; value: -4 - 5*v1 -15 = 0; value: 0 + 3*v3 -4 < 0; value: -1 + 6*v2 -6 = 0; value: 0 + 5*v2 + 4*v3 -22 <= 0; value: -13 0: 1 1: 2 2: 4 5 3: 3 5 0: 2 -> 4 1: 3 -> 3 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + v2 -5 = 0; value: 0 + 4*v0 -4*v2 + 12 = 0; value: 0 + -5*v1 -6*v3 + 8 < 0; value: -23 + -4*v1 + 3*v3 + 14 < 0; value: -3 + -2*v0 + 4*v2 -36 <= 0; value: -20 0: 2 5 1: 3 4 2: 1 2 5 3: 3 4 optimal: (-20/13 -e*1) + -20/13 < 0; value: -20/13 - v2 -5 = 0; value: 0 - 4*v0 -4*v2 + 12 = 0; value: 0 - -39/4*v3 -19/2 <= 0; value: 0 - -4*v1 + 3*v3 + 14 < 0; value: -4 + -20 <= 0; value: -20 0: 2 5 1: 3 4 2: 1 2 5 3: 3 4 0: 2 -> 2 1: 5 -> 49/13 2: 5 -> 5 3: 1 -> -38/39 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -5*v1 + 20 = 0; value: 0 + -5*v1 + 6*v2 -6 <= 0; value: -14 + 3*v0 + 2*v1 -8 = 0; value: 0 + -1*v1 -5*v2 + 3 <= 0; value: -11 + 6*v1 -29 <= 0; value: -5 0: 1 3 1: 1 2 3 4 5 2: 2 4 3: optimal: -8 + -8 <= 0; value: -8 - -5*v0 -5*v1 + 20 = 0; value: 0 + 6*v2 -26 <= 0; value: -14 - v0 = 0; value: 0 + -5*v2 -1 <= 0; value: -11 + -5 <= 0; value: -5 0: 1 3 2 4 5 1: 1 2 3 4 5 2: 2 4 3: 0: 0 -> 0 1: 4 -> 4 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -1*v3 -1 < 0; value: -12 + 5*v0 + v2 -32 < 0; value: -10 + -2*v0 -2*v1 -1 < 0; value: -17 + -6*v2 + 6*v3 -13 <= 0; value: -7 + -5*v2 <= 0; value: -10 0: 2 3 1: 1 3 2: 2 4 5 3: 1 4 optimal: (431/21 -e*1) + + 431/21 < 0; value: 431/21 - -2*v1 -1*v3 -1 < 0; value: -2 - 7*v0 -205/6 < 0; value: -37/12 - -2*v0 + v2 + 13/6 <= 0; value: 0 - -6*v2 + 6*v3 -13 <= 0; value: 0 + -1595/42 < 0; value: -1595/42 0: 2 3 5 1: 1 3 2: 2 4 5 3 3: 1 4 3 0: 4 -> 373/84 1: 4 -> -331/84 2: 2 -> 47/7 3: 3 -> 373/42 + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + v2 -1*v3 -2 < 0; value: -1 + -5*v2 -10 <= 0; value: -30 + 3*v0 + 5*v2 -63 < 0; value: -31 + -6*v0 -2*v2 -31 < 0; value: -63 + -5*v2 -11 <= 0; value: -31 0: 3 4 1: 1 2: 1 2 3 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + v2 -1*v3 -2 < 0; value: -1 + -5*v2 -10 <= 0; value: -30 + 3*v0 + 5*v2 -63 < 0; value: -31 + -6*v0 -2*v2 -31 < 0; value: -63 + -5*v2 -11 <= 0; value: -31 0: 3 4 1: 1 2: 1 2 3 4 5 3: 1 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v2 -10 <= 0; value: -6 + -3*v1 + 5*v2 + 2*v3 -27 = 0; value: 0 + 4*v0 -7 <= 0; value: -3 + -3*v1 + 4*v2 -16 <= 0; value: -3 + -1*v0 + 5*v1 -1*v3 < 0; value: -1 0: 3 5 1: 2 4 5 2: 1 2 4 3: 2 5 optimal: oo + 2*v0 -8/3*v2 + 32/3 <= 0; value: 2 + v2 -10 <= 0; value: -6 - -3*v1 + 5*v2 + 2*v3 -27 = 0; value: 0 + 4*v0 -7 <= 0; value: -3 - -1*v2 -2*v3 + 11 <= 0; value: 0 + -1*v0 + 43/6*v2 -193/6 < 0; value: -9/2 0: 3 5 1: 2 4 5 2: 1 2 4 5 3: 2 5 4 0: 1 -> 1 1: 1 -> 0 2: 4 -> 4 3: 5 -> 7/2 + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 + 6*v3 -32 = 0; value: 0 + -1*v0 <= 0; value: 0 + -2*v0 + 6*v1 + 5*v2 -29 < 0; value: -18 + -5*v0 -6*v1 -5*v2 + 11 = 0; value: 0 + v0 -5*v3 -12 <= 0; value: -37 0: 2 3 4 5 1: 3 4 2: 1 3 4 3: 1 5 optimal: oo + 8/3*v0 + 35 <= 0; value: 35 - 2*v2 + 6*v3 -32 = 0; value: 0 + -1*v0 <= 0; value: 0 + -7*v0 -18 < 0; value: -18 - -5*v0 -6*v1 -5*v2 + 11 = 0; value: 0 - v0 -5*v3 -12 <= 0; value: 0 0: 2 3 4 5 1: 3 4 2: 1 3 4 3: 1 5 0: 0 -> 0 1: 1 -> -35/2 2: 1 -> 116/5 3: 5 -> -12/5 + 2*v0 -2*v1 <= 0; value: 2 + v0 -5*v1 + v3 -5 <= 0; value: 0 + 2*v1 + 4*v2 -16 = 0; value: 0 + v0 -2*v1 + 2*v3 -26 <= 0; value: -17 + 6*v1 + 3*v3 -35 < 0; value: -23 + -5*v0 -2*v1 + 4*v2 -28 <= 0; value: -17 0: 1 3 5 1: 1 2 3 4 5 2: 2 5 3: 1 3 4 optimal: oo + 9/2*v0 + 6 <= 0; value: 21/2 - v0 -5*v1 + v3 -5 <= 0; value: 0 - 2/5*v0 + 4*v2 + 2/5*v3 -18 = 0; value: 0 + -11*v0 -40 <= 0; value: -51 + -117/4*v0 -83 < 0; value: -449/4 - -5*v0 + 8*v2 -44 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 3 4 5 2: 2 5 3 4 3: 1 3 4 2 5 0: 1 -> 1 1: 0 -> -17/4 2: 4 -> 49/8 3: 4 -> -69/4 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 + 10 <= 0; value: -2 + -1*v0 -2*v1 -3*v3 + 18 <= 0; value: -5 + -5*v2 <= 0; value: 0 + 4*v0 -4*v3 -9 <= 0; value: -5 + 2*v0 -27 <= 0; value: -17 0: 2 4 5 1: 1 2 2: 3 3: 2 4 optimal: 22 + + 22 <= 0; value: 22 - -4*v1 + 10 <= 0; value: 0 + -137/4 <= 0; value: -137/4 + -5*v2 <= 0; value: 0 - 4*v0 -4*v3 -9 <= 0; value: 0 - 2*v3 -45/2 <= 0; value: 0 0: 2 4 5 1: 1 2 2: 3 3: 2 4 5 0: 5 -> 27/2 1: 3 -> 5/2 2: 0 -> 0 3: 4 -> 45/4 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 -4*v2 + 6*v3 + 20 = 0; value: 0 + -6*v0 -4*v1 + 4*v3 + 17 <= 0; value: -1 + -1*v0 -2*v2 -3*v3 -2 <= 0; value: -30 + 5*v0 -25 < 0; value: -10 + v0 + 3*v3 -27 <= 0; value: -9 0: 2 3 4 5 1: 1 2 2: 1 3 3: 1 2 3 5 optimal: (103/3 -e*1) + + 103/3 < 0; value: 103/3 - -6*v1 -4*v2 + 6*v3 + 20 = 0; value: 0 - -6*v0 + 8/3*v2 + 11/3 <= 0; value: 0 - -1*v0 -2*v2 -3*v3 -2 <= 0; value: 0 - 5*v0 -25 < 0; value: -5 + -195/4 < 0; value: -195/4 0: 2 3 4 5 5 1: 1 2 2: 1 3 2 5 3: 1 2 3 5 0: 3 -> 4 1: 5 -> -53/6 2: 5 -> 61/8 3: 5 -> -85/12 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 6*v1 -14 < 0; value: -9 + -6*v2 -5*v3 -1 <= 0; value: -25 + -2*v0 + 4*v1 -2*v2 -4 < 0; value: -10 + 2*v0 + 5*v1 -3*v2 <= 0; value: -5 + -1*v0 + 4*v3 + 1 <= 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 6*v1 -14 < 0; value: -9 + -6*v2 -5*v3 -1 <= 0; value: -25 + -2*v0 + 4*v1 -2*v2 -4 < 0; value: -10 + 2*v0 + 5*v1 -3*v2 <= 0; value: -5 + -1*v0 + 4*v3 + 1 <= 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3 4 3: 2 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 3*v1 -12 <= 0; value: -5 + 5*v0 + 4*v3 -39 < 0; value: -7 + 6*v0 -2*v2 -25 < 0; value: -11 + 6*v0 + 4*v2 -44 = 0; value: 0 + 6*v1 + 3*v2 -78 <= 0; value: -33 0: 1 2 3 4 1: 1 5 2: 3 4 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 3*v1 -12 <= 0; value: -5 + 5*v0 + 4*v3 -39 < 0; value: -7 + 6*v0 -2*v2 -25 < 0; value: -11 + 6*v0 + 4*v2 -44 = 0; value: 0 + 6*v1 + 3*v2 -78 <= 0; value: -33 0: 1 2 3 4 1: 1 5 2: 3 4 5 3: 2 0: 4 -> 4 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 + 3*v3 -44 < 0; value: -27 + 5*v2 <= 0; value: 0 + -6*v1 + 5*v2 -9 < 0; value: -21 + -6*v0 -3 <= 0; value: -21 + -4*v1 + 8 = 0; value: 0 0: 4 1: 1 3 5 2: 2 3 3: 1 optimal: oo + 2*v0 -4 <= 0; value: 2 + 3*v3 -36 < 0; value: -27 + 5*v2 <= 0; value: 0 + 5*v2 -21 < 0; value: -21 + -6*v0 -3 <= 0; value: -21 - -4*v1 + 8 = 0; value: 0 0: 4 1: 1 3 5 2: 2 3 3: 1 0: 3 -> 3 1: 2 -> 2 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 6*v3 -25 <= 0; value: -6 + 5*v0 -3*v1 <= 0; value: -7 + 3*v0 -2*v1 + 5 <= 0; value: 0 + -3*v1 + 2 < 0; value: -10 + -5*v1 -15 < 0; value: -35 0: 1 2 3 1: 2 3 4 5 2: 3: 1 optimal: (-34/9 -e*1) + -34/9 < 0; value: -34/9 - -5*v0 + 6*v3 -25 <= 0; value: 0 + -73/9 < 0; value: -73/9 - 3*v0 -2*v1 + 5 <= 0; value: 0 - -27/5*v3 + 17 < 0; value: -23/10 + -55/3 <= 0; value: -55/3 0: 1 2 3 4 5 1: 2 3 4 5 2: 3: 1 4 5 2 0: 1 -> -32/45 1: 4 -> 43/30 2: 0 -> 0 3: 4 -> 193/54 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 5*v2 + 5*v3 -10 = 0; value: 0 + -6*v3 = 0; value: 0 + -1*v1 + 6*v2 -48 <= 0; value: -29 + 2*v0 -4*v2 + 6 < 0; value: -6 + -5*v0 -2*v3 -4 <= 0; value: -14 0: 4 5 1: 1 3 2: 1 3 4 3: 1 2 5 optimal: (29/10 -e*1) + + 29/10 < 0; value: 29/10 - -2*v1 + 5*v2 + 5*v3 -10 = 0; value: 0 - -6*v3 = 0; value: 0 + -783/20 < 0; value: -783/20 - 2*v0 -4*v2 + 6 < 0; value: -4 - -5*v0 -4 <= 0; value: 0 0: 4 5 3 1: 1 3 2: 1 3 4 3: 1 2 5 3 0: 2 -> -4/5 1: 5 -> 1/4 2: 4 -> 21/10 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 6*v2 + 4*v3 -69 <= 0; value: -43 + -5*v0 -2 <= 0; value: -7 + -3*v0 -4*v1 < 0; value: -7 + 4*v0 + v1 + 2*v2 -16 < 0; value: -5 + 2*v0 -4*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 4 3: 1 optimal: oo + -4/9*v2 + 22/9 < 0; value: 10/9 + 6*v2 + 4*v3 -69 <= 0; value: -43 + 20/9*v2 -173/9 < 0; value: -113/9 + 20/9*v2 -173/9 < 0; value: -113/9 - 9/2*v0 + 2*v2 -31/2 < 0; value: -5/2 - 2*v0 -4*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 4 2 3 3: 1 0: 1 -> 14/9 1: 1 -> 23/18 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -1*v1 + 5*v2 -31 <= 0; value: -15 + -4*v2 -1*v3 + 16 <= 0; value: -3 + v0 + 3*v2 -13 <= 0; value: 0 + -5*v0 -6*v1 -1*v2 + 33 = 0; value: 0 + 6*v1 + 4*v2 -2*v3 -66 < 0; value: -32 0: 3 4 1: 1 4 5 2: 1 2 3 4 5 3: 2 5 optimal: oo + 8/3*v3 -6 <= 0; value: 2 + -2/3*v3 -15 <= 0; value: -17 - 4/3*v0 -1*v3 -4/3 <= 0; value: 0 - v0 + 3*v2 -13 <= 0; value: 0 - -5*v0 -6*v1 -1*v2 + 33 = 0; value: 0 + -13/2*v3 -26 < 0; value: -91/2 0: 3 4 1 5 2 1: 1 4 5 2: 1 2 3 4 5 3: 2 5 1 0: 1 -> 13/4 1: 4 -> 9/4 2: 4 -> 13/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 4*v3 -25 < 0; value: -11 + -2*v3 -3 <= 0; value: -7 + 4*v0 + v2 + 4*v3 -35 <= 0; value: -18 + 2*v1 -1*v3 -6 = 0; value: 0 + v1 -2*v2 -2*v3 -1 <= 0; value: -3 0: 3 1: 4 5 2: 1 3 5 3: 1 2 3 4 5 optimal: 239/16 + + 239/16 <= 0; value: 239/16 + -73/4 < 0; value: -73/4 - 8/3*v2 -17/3 <= 0; value: 0 - 4*v0 -311/8 <= 0; value: 0 - 2*v1 -1*v3 -6 = 0; value: 0 - -2*v2 -3/2*v3 + 2 <= 0; value: 0 0: 3 1: 4 5 2: 1 3 5 2 3: 1 2 3 4 5 0: 2 -> 311/32 1: 4 -> 9/4 2: 1 -> 17/8 3: 2 -> -3/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 -6*v2 -4*v3 + 48 = 0; value: 0 + -1*v1 -2 <= 0; value: -6 + <= 0; value: 0 + 5*v3 -20 = 0; value: 0 + -3*v0 -2*v1 + 12 <= 0; value: -2 0: 1 5 1: 2 5 2: 1 3: 1 4 optimal: 44/3 + + 44/3 <= 0; value: 44/3 - -4*v0 -6*v2 -4*v3 + 48 = 0; value: 0 - -9/4*v2 + 4 <= 0; value: 0 + <= 0; value: 0 - 5*v3 -20 = 0; value: 0 - -3*v0 -2*v1 + 12 <= 0; value: 0 0: 1 5 2 1: 2 5 2: 1 2 3: 1 4 2 0: 2 -> 16/3 1: 4 -> -2 2: 4 -> 16/9 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -1*v1 + 4*v3 -26 = 0; value: 0 + -2*v0 + v2 = 0; value: 0 + 2*v0 -6*v1 -5 < 0; value: -1 + 3*v0 -6*v3 -20 <= 0; value: -44 + -2*v1 + 4*v3 -34 <= 0; value: -14 0: 1 2 3 4 1: 1 3 5 2: 2 3: 1 4 5 optimal: (38/3 -e*1) + + 38/3 < 0; value: 38/3 - 3*v0 -1*v1 + 4*v3 -26 = 0; value: 0 - -2*v0 + v2 = 0; value: 0 - -16*v0 -24*v3 + 151 < 0; value: -24 - 7/2*v2 -231/4 <= 0; value: 0 + -104/3 <= 0; value: -104/3 0: 1 2 3 4 5 1: 1 3 5 2: 2 4 5 3: 1 4 5 3 0: 2 -> 33/4 1: 0 -> 71/12 2: 4 -> 33/2 3: 5 -> 43/24 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 -6*v1 + 5*v2 -1 = 0; value: 0 + -3*v0 + 6*v2 -3 = 0; value: 0 + v2 -2 = 0; value: 0 + 5*v1 + 5*v2 + 4*v3 -79 <= 0; value: -52 + -6*v1 + 3*v2 <= 0; value: 0 0: 1 2 1: 1 4 5 2: 1 2 3 4 5 3: 4 optimal: 4 + + 4 <= 0; value: 4 - -1*v0 -6*v1 + 5*v2 -1 = 0; value: 0 - -3*v0 + 6*v2 -3 = 0; value: 0 - 1/2*v0 -3/2 = 0; value: 0 + 4*v3 -64 <= 0; value: -52 + <= 0; value: 0 0: 1 2 5 4 3 1: 1 4 5 2: 1 2 3 4 5 3: 4 0: 3 -> 3 1: 1 -> 1 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 8 <= 0; value: -1 + 3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 -4 < 0; value: -19 + -3*v1 -5 <= 0; value: -20 + -3*v1 + 3*v2 + 2*v3 + 1 < 0; value: -1 0: 1: 4 5 2: 1 2 3 5 3: 2 5 optimal: oo + 2*v0 -80/9 < 0; value: 10/9 - -3*v2 + 8 <= 0; value: 0 - 3*v2 + 6*v3 -21 = 0; value: 0 + -52/3 < 0; value: -52/3 + -55/3 <= 0; value: -55/3 - -3*v1 + 3*v2 + 2*v3 + 1 < 0; value: -5/6 0: 1: 4 5 2: 1 2 3 5 4 3: 2 5 4 0: 5 -> 5 1: 5 -> 85/18 2: 3 -> 8/3 3: 2 -> 13/6 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 + 2*v2 -1*v3 + 29 = 0; value: 0 + 2*v1 -3*v2 -6*v3 -6 <= 0; value: -20 + -3*v0 -1*v3 + 10 < 0; value: -2 + -2*v2 -3*v3 + 12 <= 0; value: -1 + 5*v0 -5*v2 -11 <= 0; value: -6 0: 3 5 1: 1 2 2: 1 2 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2/3*v2 + 1/3*v3 -29/3 <= 0; value: -4 - -6*v1 + 2*v2 -1*v3 + 29 = 0; value: 0 + -7/3*v2 -19/3*v3 + 11/3 <= 0; value: -20 + -3*v0 -1*v3 + 10 < 0; value: -2 + -2*v2 -3*v3 + 12 <= 0; value: -1 + 5*v0 -5*v2 -11 <= 0; value: -6 0: 3 5 1: 1 2 2: 1 2 4 5 3: 1 2 3 4 0: 3 -> 3 1: 5 -> 5 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -5*v0 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v2 -7 <= 0; value: -1 + -5*v0 + v3 + 8 = 0; value: 0 + -1*v1 + v3 + 2 <= 0; value: 0 + 2*v0 -4*v3 + 4 = 0; value: 0 0: 1 3 5 1: 1 4 2: 2 3: 1 3 4 5 optimal: -4 + -4 <= 0; value: -4 - -5*v0 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v2 -7 <= 0; value: -1 - -5*v0 + v3 + 8 = 0; value: 0 + <= 0; value: 0 - -18*v0 + 36 = 0; value: 0 0: 1 3 5 4 1: 1 4 2: 2 3: 1 3 4 5 0: 2 -> 2 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -1*v0 + 1 = 0; value: 0 + -2*v1 <= 0; value: -8 + 5*v2 -20 = 0; value: 0 + 5*v1 + 2*v2 -2*v3 -40 <= 0; value: -18 + -3*v1 -4*v2 -12 <= 0; value: -40 0: 1 1: 2 4 5 2: 3 4 5 3: 4 optimal: 2 + + 2 <= 0; value: 2 - -1*v0 + 1 = 0; value: 0 - -2*v1 <= 0; value: 0 + 5*v2 -20 = 0; value: 0 + 2*v2 -2*v3 -40 <= 0; value: -38 + -4*v2 -12 <= 0; value: -28 0: 1 1: 2 4 5 2: 3 4 5 3: 4 0: 1 -> 1 1: 4 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -6*v3 -11 < 0; value: -32 + 5*v0 + 3*v2 -67 < 0; value: -30 + 6*v2 -58 < 0; value: -34 + 5*v3 -12 <= 0; value: -7 + 3*v0 + v2 -5*v3 -14 = 0; value: 0 0: 1 2 5 1: 2: 2 3 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -6*v3 -11 < 0; value: -32 + 5*v0 + 3*v2 -67 < 0; value: -30 + 6*v2 -58 < 0; value: -34 + 5*v3 -12 <= 0; value: -7 + 3*v0 + v2 -5*v3 -14 = 0; value: 0 0: 1 2 5 1: 2: 2 3 5 3: 1 4 5 0: 5 -> 5 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + 1 <= 0; value: 0 + -3*v2 -6*v3 -13 <= 0; value: -52 + 2*v1 + 3*v2 -17 = 0; value: 0 + 5*v1 -1*v3 -1 <= 0; value: 0 + 4*v0 -4*v2 -4*v3 -19 <= 0; value: -51 0: 5 1: 1 3 4 2: 2 3 5 3: 2 4 5 optimal: oo + 2*v2 + 2*v3 + 15/2 <= 0; value: 51/2 - -1*v1 + 1 <= 0; value: 0 + -3*v2 -6*v3 -13 <= 0; value: -52 + 3*v2 -15 = 0; value: 0 + -1*v3 + 4 <= 0; value: 0 - 4*v0 -4*v2 -4*v3 -19 <= 0; value: 0 0: 5 1: 1 3 4 2: 2 3 5 3: 2 4 5 0: 1 -> 55/4 1: 1 -> 1 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -4*v2 -6*v3 -2 <= 0; value: -24 + 6*v2 + 2*v3 -43 <= 0; value: -17 + 6*v0 + 3*v1 -33 = 0; value: 0 + 5*v2 -52 < 0; value: -32 + 5*v2 -32 < 0; value: -12 0: 3 1: 3 2: 1 2 4 5 3: 1 2 optimal: oo + 6*v0 -22 <= 0; value: 2 + -4*v2 -6*v3 -2 <= 0; value: -24 + 6*v2 + 2*v3 -43 <= 0; value: -17 - 6*v0 + 3*v1 -33 = 0; value: 0 + 5*v2 -52 < 0; value: -32 + 5*v2 -32 < 0; value: -12 0: 3 1: 3 2: 1 2 4 5 3: 1 2 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -6*v2 + 3 < 0; value: -22 + 3*v1 -4*v2 + 3*v3 -56 <= 0; value: -29 + v0 -3*v3 -3 <= 0; value: -12 + -1*v1 -2*v2 + 5 = 0; value: 0 + -3*v0 -4*v1 + 4*v3 -12 < 0; value: -25 0: 3 5 1: 1 2 4 5 2: 1 2 4 3: 2 3 5 optimal: (108/5 -e*1) + + 108/5 < 0; value: 108/5 - 5/6*v0 -4 <= 0; value: 0 + -471/5 < 0; value: -471/5 - v0 -3*v3 -3 <= 0; value: 0 - -1*v1 -2*v2 + 5 = 0; value: 0 - -3*v0 + 8*v2 + 4*v3 -32 < 0; value: -8 0: 3 5 1 2 1: 1 2 4 5 2: 1 2 4 5 3: 2 3 5 1 0: 3 -> 24/5 1: 5 -> -4 2: 0 -> 9/2 3: 4 -> 3/5 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 -3*v3 + 8 <= 0; value: -7 + 5*v1 + 5*v3 -25 = 0; value: 0 + 5*v0 + 3*v1 -20 = 0; value: 0 + 5*v1 <= 0; value: 0 + -5*v0 + 5*v3 -9 <= 0; value: -4 0: 3 5 1: 2 3 4 2: 1 3: 1 2 5 optimal: 72/5 + + 72/5 <= 0; value: 72/5 + 4*v2 -13 <= 0; value: -13 - 5*v1 + 5*v3 -25 = 0; value: 0 - 5*v0 -3*v3 -5 = 0; value: 0 + -10 <= 0; value: -10 - 10/3*v0 -52/3 <= 0; value: 0 0: 3 5 1 4 1: 2 3 4 2: 1 3: 1 2 5 3 4 0: 4 -> 26/5 1: 0 -> -2 2: 0 -> 0 3: 5 -> 7 + 2*v0 -2*v1 <= 0; value: -4 + 2*v2 -3*v3 -2 <= 0; value: -1 + -6*v0 + 6*v3 = 0; value: 0 + 6*v2 -3*v3 -10 < 0; value: -1 + -3*v0 + 3*v2 + 5*v3 -17 <= 0; value: -9 + -2*v1 + 4*v2 + 2*v3 -6 <= 0; value: -2 0: 2 4 1: 5 2: 1 3 4 5 3: 1 2 3 4 5 optimal: oo + -4*v2 + 6 <= 0; value: -2 + -3*v0 + 2*v2 -2 <= 0; value: -1 - -6*v0 + 6*v3 = 0; value: 0 + -3*v0 + 6*v2 -10 < 0; value: -1 + 2*v0 + 3*v2 -17 <= 0; value: -9 - -2*v1 + 4*v2 + 2*v3 -6 <= 0; value: 0 0: 2 4 1 3 1: 5 2: 1 3 4 5 3: 1 2 3 4 5 0: 1 -> 1 1: 3 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -1*v1 + 7 = 0; value: 0 + -5*v2 + 5 <= 0; value: -20 + v2 + 6*v3 -82 <= 0; value: -53 + <= 0; value: 0 + 3*v1 + 6*v2 -42 = 0; value: 0 0: 1 1: 1 5 2: 2 3 5 3: 3 optimal: oo + -32*v3 + 1214/3 <= 0; value: 830/3 - -3*v0 -1*v1 + 7 = 0; value: 0 + 30*v3 -405 <= 0; value: -285 - v2 + 6*v3 -82 <= 0; value: 0 + <= 0; value: 0 - -9*v0 + 6*v2 -21 = 0; value: 0 0: 1 5 1: 1 5 2: 2 3 5 3: 3 2 0: 1 -> 109/3 1: 4 -> -102 2: 5 -> 58 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + 5*v2 -5 = 0; value: 0 + 4*v1 -5*v2 -23 <= 0; value: -12 + -2*v1 + 5 < 0; value: -3 + -6*v0 -2*v1 + 2*v3 + 11 < 0; value: -1 0: 5 1: 3 4 5 2: 2 3 3: 5 optimal: oo + 2*v0 -5 < 0; value: -1 + <= 0; value: 0 + 5*v2 -5 = 0; value: 0 + -5*v2 -13 < 0; value: -18 - 6*v0 -2*v3 -6 <= 0; value: 0 - -6*v0 -2*v1 + 2*v3 + 11 < 0; value: -3/2 0: 5 4 3 1: 3 4 5 2: 2 3 3: 5 4 3 0: 2 -> 2 1: 4 -> 13/4 2: 1 -> 1 3: 4 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -5*v2 -2*v3 -4 <= 0; value: -20 + 3*v2 -5*v3 -5 <= 0; value: -17 + -3*v0 + 2*v2 + 1 = 0; value: 0 + 5*v2 + 4*v3 -17 = 0; value: 0 + -3*v1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 3 4 3: 1 2 4 optimal: 494/111 + + 494/111 <= 0; value: 494/111 + -3410/111 <= 0; value: -3410/111 - -37/5*v3 + 26/5 <= 0; value: 0 - -3*v0 + 2*v2 + 1 = 0; value: 0 - 5*v2 + 4*v3 -17 = 0; value: 0 - -3*v1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 3 4 3: 1 2 4 0: 1 -> 247/111 1: 0 -> 0 2: 1 -> 105/37 3: 3 -> 26/37 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -25 <= 0; value: 0 + -4*v0 + 5*v1 + 2*v3 -33 <= 0; value: -16 + -4*v1 + 3*v2 -4 <= 0; value: -9 + -2*v0 -2*v1 -4*v2 + 36 = 0; value: 0 + -2*v2 + 2*v3 -4 < 0; value: -10 0: 2 4 1: 2 3 4 2: 1 3 4 5 3: 2 5 optimal: 5 + + 5 <= 0; value: 5 - 5*v2 -25 <= 0; value: 0 + 2*v3 -161/4 <= 0; value: -145/4 - 4*v0 -21 <= 0; value: 0 - -2*v0 -2*v1 -4*v2 + 36 = 0; value: 0 + 2*v3 -14 < 0; value: -10 0: 2 4 3 1: 2 3 4 2: 1 3 4 5 2 3: 2 5 0: 3 -> 21/4 1: 5 -> 11/4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + v2 -34 < 0; value: -17 + 6*v0 + 2*v3 -38 = 0; value: 0 + -1*v0 -2*v2 <= 0; value: -9 + -1*v1 -6*v2 -13 < 0; value: -29 + -5*v2 + 10 = 0; value: 0 0: 1 2 3 1: 4 2: 1 3 4 5 3: 2 optimal: (214/3 -e*1) + + 214/3 < 0; value: 214/3 - -1*v3 -13 < 0; value: -1 - 6*v0 + 2*v3 -38 = 0; value: 0 + -44/3 < 0; value: -44/3 - -1*v1 -6*v2 -13 < 0; value: -1 - -5*v2 + 10 = 0; value: 0 0: 1 2 3 1: 4 2: 1 3 4 5 3: 2 1 3 0: 5 -> 31/3 1: 4 -> -24 2: 2 -> 2 3: 4 -> -12 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 + 2*v3 + 10 <= 0; value: -18 + -6*v2 + 27 <= 0; value: -3 + 4*v3 -6 <= 0; value: -2 + 4*v0 -3*v1 -3*v3 + 12 = 0; value: 0 + -6*v0 = 0; value: 0 0: 4 5 1: 4 2: 1 2 3: 1 3 4 optimal: -5 + -5 <= 0; value: -5 + -6*v2 + 13 <= 0; value: -17 + -6*v2 + 27 <= 0; value: -3 - 4*v3 -6 <= 0; value: 0 - 4*v0 -3*v1 -3*v3 + 12 = 0; value: 0 - -6*v0 = 0; value: 0 0: 4 5 1: 4 2: 1 2 3: 1 3 4 0: 0 -> 0 1: 3 -> 5/2 2: 5 -> 5 3: 1 -> 3/2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 -4*v3 -14 = 0; value: 0 + -6*v0 -6*v1 -6*v2 -23 <= 0; value: -89 + 2*v0 -3*v1 + 4*v3 + 5 = 0; value: 0 + 4*v1 -1*v3 -20 < 0; value: -1 + -1*v0 + 3*v2 -6 = 0; value: 0 0: 2 3 5 1: 2 3 4 2: 1 2 5 3: 1 3 4 optimal: -7/24 + -7/24 <= 0; value: -7/24 - 6*v2 -4*v3 -14 = 0; value: 0 - -16*v0 -41 <= 0; value: 0 - 2*v0 -3*v1 + 4*v3 + 5 = 0; value: 0 + -2677/96 < 0; value: -2677/96 - -1*v0 + 3*v2 -6 = 0; value: 0 0: 2 3 5 4 1: 2 3 4 2: 1 2 5 4 3: 1 3 4 2 0: 3 -> -41/16 1: 5 -> -29/12 2: 3 -> 55/48 3: 1 -> -57/32 + 2*v0 -2*v1 <= 0; value: -10 + -2*v0 + v3 -2 <= 0; value: 0 + 6*v0 -1*v2 + 3*v3 -2 = 0; value: 0 + 2*v1 -5*v2 -6 <= 0; value: -16 + -3*v1 + 5*v2 + 4*v3 -13 = 0; value: 0 + -5*v1 + 20 <= 0; value: -5 0: 1 2 1: 3 4 5 2: 2 3 4 3: 1 2 4 optimal: oo + 2*v0 -8 <= 0; value: -8 + -68/19*v0 -3/19 <= 0; value: -3/19 - 6*v0 -1*v2 + 3*v3 -2 = 0; value: 0 + -120/19*v0 -297/19 <= 0; value: -297/19 - -3*v1 + 5*v2 + 4*v3 -13 = 0; value: 0 - 40/3*v0 -95/9*v2 + 335/9 <= 0; value: 0 0: 1 2 5 3 1: 3 4 5 2: 2 3 4 5 1 3: 1 2 4 5 3 0: 0 -> 0 1: 5 -> 4 2: 4 -> 67/19 3: 2 -> 35/19 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -1*v2 + 8 <= 0; value: -5 + v0 -6*v1 + 5*v2 + 14 <= 0; value: -2 + 2*v0 + 4*v1 -5*v2 -40 <= 0; value: -23 + 4*v1 + 2*v2 -32 <= 0; value: -14 + 5*v0 -1*v1 + 6*v3 -54 < 0; value: -25 0: 1 2 3 5 1: 2 3 4 5 2: 1 2 3 4 3: 5 optimal: 149/7 + + 149/7 <= 0; value: 149/7 - -4*v0 -1*v2 + 8 <= 0; value: 0 - v0 -6*v1 + 5*v2 + 14 <= 0; value: 0 - 28/3*v0 -44 <= 0; value: 0 + -542/7 <= 0; value: -542/7 + 6*v3 -49/2 < 0; value: -13/2 0: 1 2 3 5 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 5 0: 3 -> 33/7 1: 4 -> -83/14 2: 1 -> -76/7 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 + 6*v1 -3*v3 -53 <= 0; value: -33 + -4*v1 + 3*v3 + 13 <= 0; value: -7 + -5*v0 -2*v1 + 6 < 0; value: -29 + 3*v0 + v1 -3*v2 -31 < 0; value: -14 + 4*v1 + 2*v3 -49 <= 0; value: -29 0: 1 3 4 1: 1 2 3 4 5 2: 4 3: 1 2 5 optimal: oo + 42*v2 + 386 < 0; value: 428 + -42*v2 -426 < 0; value: -468 - -4*v1 + 3*v3 + 13 <= 0; value: 0 - -5*v0 -3/2*v3 -1/2 < 0; value: -3/2 - 1/2*v0 -3*v2 -28 < 0; value: -1/2 + -100*v2 -971 < 0; value: -1071 0: 1 3 4 5 1: 1 2 3 4 5 2: 4 1 5 3: 1 2 5 3 4 0: 5 -> 61 1: 5 -> -595/4 2: 1 -> 1 3: 0 -> -608/3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4*v1 + 2 = 0; value: 0 + 2*v0 -4*v3 <= 0; value: -2 + 5*v0 + v3 -17 = 0; value: 0 + 2*v1 -4 = 0; value: 0 + 5*v0 + v1 -4*v3 -14 <= 0; value: -5 0: 1 2 3 5 1: 1 4 5 2: 3: 2 3 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 -4*v1 + 2 = 0; value: 0 + -2 <= 0; value: -2 - 5*v0 + v3 -17 = 0; value: 0 - -1/5*v3 + 2/5 = 0; value: 0 + -5 <= 0; value: -5 0: 1 2 3 5 4 1: 1 4 5 2: 3: 2 3 5 4 0: 3 -> 3 1: 2 -> 2 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 4*v2 -5 <= 0; value: -15 + -5*v1 -4*v3 + 11 < 0; value: -6 + -4*v0 + 4*v3 + 8 = 0; value: 0 + -1*v2 -5*v3 -1 <= 0; value: -16 + 3*v2 + 6*v3 -25 <= 0; value: -7 0: 1 3 1: 2 2: 1 4 5 3: 2 3 4 5 optimal: oo + -9/5*v2 + 73/5 < 0; value: 73/5 + 5*v2 -52/3 <= 0; value: -52/3 - -5*v1 -4*v3 + 11 < 0; value: -5 - -4*v0 + 4*v3 + 8 = 0; value: 0 + 3/2*v2 -131/6 <= 0; value: -131/6 - 6*v0 + 3*v2 -37 <= 0; value: 0 0: 1 3 5 4 1: 2 2: 1 4 5 3: 2 3 4 5 0: 5 -> 37/6 1: 1 -> -2/15 2: 0 -> 0 3: 3 -> 25/6 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 3*v1 -14 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -28 <= 0; value: -14 + -3*v1 -6*v2 + 30 = 0; value: 0 + -3*v0 + 6*v1 + 3*v3 -12 = 0; value: 0 + 2*v1 + 6*v2 -49 <= 0; value: -21 0: 1 2 4 1: 1 2 3 4 5 2: 2 3 5 3: 4 optimal: 95 + + 95 <= 0; value: 95 + -14 <= 0; value: -14 - 4*v0 -114 <= 0; value: 0 - -3*v1 -6*v2 + 30 = 0; value: 0 - -3*v0 -12*v2 + 3*v3 + 48 = 0; value: 0 - -1/2*v0 + 1/2*v3 -21 <= 0; value: 0 0: 1 2 4 5 1: 1 2 3 4 5 2: 2 3 5 4 1 3: 4 5 2 1 0: 4 -> 57/2 1: 2 -> -19 2: 4 -> 29/2 3: 4 -> 141/2 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + v2 + 2*v3 -12 = 0; value: 0 + -4*v2 -14 <= 0; value: -30 + -6*v1 -3*v3 -14 < 0; value: -38 + -6*v0 + 4*v2 -16 = 0; value: 0 + -5*v2 -5*v3 -6 <= 0; value: -46 0: 1 4 1: 3 2: 1 2 4 5 3: 1 3 5 optimal: oo + 11/4*v0 + 26/3 < 0; value: 26/3 - -3*v0 + v2 + 2*v3 -12 = 0; value: 0 + -6*v0 -30 <= 0; value: -30 - -6*v1 -3*v3 -14 < 0; value: -6 - -6*v0 + 4*v2 -16 = 0; value: 0 + -45/4*v0 -46 <= 0; value: -46 0: 1 4 5 2 1: 3 2: 1 2 4 5 3: 1 3 5 0: 0 -> 0 1: 2 -> -10/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + 6*v3 -78 <= 0; value: -48 + 5*v0 + 2*v1 -20 = 0; value: 0 + -2*v1 = 0; value: 0 + -3*v0 + 3*v1 -11 <= 0; value: -23 + 5*v0 -3*v1 + 3*v3 -70 <= 0; value: -35 0: 2 4 5 1: 1 2 3 4 5 2: 3: 1 5 optimal: 8 + + 8 <= 0; value: 8 + 6*v3 -78 <= 0; value: -48 - 5*v0 + 2*v1 -20 = 0; value: 0 - 5*v0 -20 = 0; value: 0 + -23 <= 0; value: -23 + 3*v3 -50 <= 0; value: -35 0: 2 4 5 3 1 1: 1 2 3 4 5 2: 3: 1 5 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -3*v1 + 4 <= 0; value: -3 + -3*v0 + 6*v2 <= 0; value: 0 + -3*v0 + 7 < 0; value: -5 + v0 + 3*v1 + v2 -54 < 0; value: -33 + 6*v1 -3*v3 -24 <= 0; value: -9 0: 1 2 3 4 1: 1 4 5 2: 2 4 3: 5 optimal: oo + -2/9*v2 + 76/9 < 0; value: 8 - 2*v0 -3*v1 + 4 <= 0; value: 0 + 7*v2 -50 < 0; value: -36 + v2 -43 < 0; value: -41 - v2 + 9/4*v3 -38 < 0; value: -9/4 - 4*v0 -3*v3 -16 <= 0; value: 0 0: 1 2 3 4 5 1: 1 4 5 2: 2 4 3 3: 5 4 2 3 0: 4 -> 61/4 1: 5 -> 23/2 2: 2 -> 2 3: 5 -> 15 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -5*v2 + 6 <= 0; value: -4 + -5*v2 -8 < 0; value: -18 + -2*v2 -6*v3 + 4 < 0; value: -12 + 2*v3 -6 <= 0; value: -2 + 6*v2 -3*v3 -17 <= 0; value: -11 0: 1 1: 2: 1 2 3 5 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -5*v2 + 6 <= 0; value: -4 + -5*v2 -8 < 0; value: -18 + -2*v2 -6*v3 + 4 < 0; value: -12 + 2*v3 -6 <= 0; value: -2 + 6*v2 -3*v3 -17 <= 0; value: -11 0: 1 1: 2: 1 2 3 5 3: 3 4 5 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v1 -6*v2 + 6*v3 + 6 = 0; value: 0 + -2*v2 -1*v3 = 0; value: 0 + -3*v1 + 3 = 0; value: 0 + 4*v1 + 3*v2 -10 <= 0; value: -6 + -3*v1 + 4*v3 -1 <= 0; value: -4 0: 1: 1 3 4 5 2: 1 2 4 3: 1 2 5 optimal: oo + 2*v0 -2 <= 0; value: 6 - -6*v1 -6*v2 + 6*v3 + 6 = 0; value: 0 - -2*v2 -1*v3 = 0; value: 0 - 9*v2 = 0; value: 0 + -6 <= 0; value: -6 + -4 <= 0; value: -4 0: 1: 1 3 4 5 2: 1 2 4 3 5 3: 1 2 5 3 4 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -2*v1 + 2*v2 -6 < 0; value: -16 + 2*v0 + 6*v1 + 6*v3 -62 <= 0; value: -8 + -4*v0 -6*v2 <= 0; value: 0 + -1*v0 -5*v1 -2*v2 -8 < 0; value: -33 + -4*v1 + 17 < 0; value: -3 0: 2 3 4 1: 1 2 4 5 2: 1 3 4 3: 2 optimal: oo + -6*v3 + 28 < 0; value: 4 + 2*v2 -29/2 <= 0; value: -29/2 - 2*v0 + 6*v3 -73/2 < 0; value: -2 + -6*v2 + 12*v3 -73 < 0; value: -25 + -2*v2 + 3*v3 -95/2 < 0; value: -71/2 - -4*v1 + 17 < 0; value: -3/2 0: 2 3 4 1: 1 2 4 5 2: 1 3 4 3: 2 3 4 0: 0 -> 21/4 1: 5 -> 37/8 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 2*v2 -22 = 0; value: 0 + -6*v0 + 6*v2 <= 0; value: 0 + 4*v0 -4*v2 = 0; value: 0 + v0 + 3*v3 -42 <= 0; value: -25 + -2*v0 -6*v2 -1*v3 + 21 = 0; value: 0 0: 2 3 4 5 1: 1 2: 1 2 3 5 3: 4 5 optimal: oo + -1/3*v3 -1/3 <= 0; value: -2 - 6*v1 + 2*v2 -22 = 0; value: 0 - -6*v0 + 6*v2 <= 0; value: 0 + = 0; value: 0 + 23/8*v3 -315/8 <= 0; value: -25 - -8*v0 -1*v3 + 21 = 0; value: 0 0: 2 3 4 5 1: 1 2: 1 2 3 5 3: 4 5 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 + v3 -32 <= 0; value: -18 + -3*v0 + 7 <= 0; value: -2 + <= 0; value: 0 + 4*v0 -15 <= 0; value: -3 + 5*v0 -18 < 0; value: -3 0: 2 4 5 1: 1 2: 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 + v3 -32 <= 0; value: -18 + -3*v0 + 7 <= 0; value: -2 + <= 0; value: 0 + 4*v0 -15 <= 0; value: -3 + 5*v0 -18 < 0; value: -3 0: 2 4 5 1: 1 2: 3: 1 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + -2*v1 -2*v2 + 3*v3 + 4 <= 0; value: -7 + 3*v1 -5*v2 + 4 < 0; value: -6 + -3*v2 -4*v3 -17 <= 0; value: -44 + -5*v1 + 25 = 0; value: 0 0: 1 1: 1 2 3 5 2: 1 2 3 4 3: 2 4 optimal: oo + v2 -9/2 <= 0; value: 1/2 - 4*v0 -2*v2 -11 <= 0; value: 0 + -2*v2 + 3*v3 -6 <= 0; value: -7 + -5*v2 + 19 < 0; value: -6 + -3*v2 -4*v3 -17 <= 0; value: -44 - -5*v1 + 25 = 0; value: 0 0: 1 1: 1 2 3 5 2: 1 2 3 4 3: 2 4 0: 1 -> 21/4 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 + 6*v1 -31 <= 0; value: -7 + -1*v0 + 5*v1 + 6*v3 -61 <= 0; value: -29 + -1*v1 -4*v2 + 7 <= 0; value: -1 + 6*v0 -4*v3 + 3 <= 0; value: -5 + 6*v1 + 4*v2 -39 <= 0; value: -11 0: 1 2 4 1: 1 2 3 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 + 8*v2 -14 <= 0; value: -6 + -3*v0 -24*v2 + 11 <= 0; value: -13 + -1*v0 -20*v2 + 6*v3 -26 <= 0; value: -34 - -1*v1 -4*v2 + 7 <= 0; value: 0 + 6*v0 -4*v3 + 3 <= 0; value: -5 + -20*v2 + 3 <= 0; value: -17 0: 1 2 4 1: 1 2 3 5 2: 3 5 1 2 3: 2 4 0: 0 -> 0 1: 4 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v0 + v1 -1*v3 + 18 = 0; value: 0 + 5*v0 -6*v2 -22 <= 0; value: -13 + 6*v0 -3*v1 + 5*v3 -20 <= 0; value: -2 + -5*v1 -5*v2 + 2*v3 + 2 <= 0; value: -3 + -6*v0 -6*v1 + v3 + 14 <= 0; value: -4 0: 1 2 3 5 1: 1 3 4 5 2: 2 4 3: 1 3 4 5 optimal: oo + 204/25*v2 + 428/25 <= 0; value: 632/25 - -6*v0 + v1 -1*v3 + 18 = 0; value: 0 - 5*v0 -6*v2 -22 <= 0; value: 0 + -864/25*v2 -1098/25 <= 0; value: -1962/25 + -269/25*v2 -58/25 <= 0; value: -327/25 - -42*v0 -5*v3 + 122 <= 0; value: 0 0: 1 2 3 5 4 1: 1 3 4 5 2: 2 4 3 3: 1 3 4 5 0: 3 -> 28/5 1: 0 -> -176/25 2: 1 -> 1 3: 0 -> -566/25 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -6 <= 0; value: -3 + 4*v2 + 5*v3 -25 = 0; value: 0 + 4*v0 -4*v3 -8 <= 0; value: 0 + 6*v1 -6*v3 <= 0; value: 0 + v0 + v2 -8 = 0; value: 0 0: 3 5 1: 1 4 2: 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -6 <= 0; value: -3 + 4*v2 + 5*v3 -25 = 0; value: 0 + 4*v0 -4*v3 -8 <= 0; value: 0 + 6*v1 -6*v3 <= 0; value: 0 + v0 + v2 -8 = 0; value: 0 0: 3 5 1: 1 4 2: 2 5 3: 1 2 3 4 0: 3 -> 3 1: 1 -> 1 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 10 + -4*v1 + 5*v2 + 6*v3 -21 <= 0; value: -11 + -6*v3 <= 0; value: 0 + v0 + 3*v1 + 5*v2 -42 <= 0; value: -27 + -6*v1 -4*v2 + 4*v3 + 8 <= 0; value: 0 + 6*v2 -6*v3 -12 = 0; value: 0 0: 3 1: 1 3 4 2: 1 3 4 5 3: 1 2 4 5 optimal: 64 + + 64 <= 0; value: 64 + -11 <= 0; value: -11 - -6*v3 <= 0; value: 0 - v0 -32 <= 0; value: 0 - -6*v1 -4*v2 + 4*v3 + 8 <= 0; value: 0 - 6*v2 -12 = 0; value: 0 0: 3 1: 1 3 4 2: 1 3 4 5 3: 1 2 4 5 3 0: 5 -> 32 1: 0 -> 0 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + v2 -1*v3 + 1 <= 0; value: -3 + 2*v1 + 5*v2 -6*v3 -21 <= 0; value: -44 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + 6*v1 -7 < 0; value: -1 + 2*v0 + 2*v1 -6*v2 <= 0; value: 0 0: 3 5 1: 2 3 4 5 2: 1 2 3 5 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + v2 -1*v3 + 1 <= 0; value: -3 + 2*v1 + 5*v2 -6*v3 -21 <= 0; value: -44 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + 6*v1 -7 < 0; value: -1 + 2*v0 + 2*v1 -6*v2 <= 0; value: 0 0: 3 5 1: 2 3 4 5 2: 1 2 3 5 3: 1 2 0: 2 -> 2 1: 1 -> 1 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 + 3*v2 -5*v3 -1 <= 0; value: -4 + 4*v0 -3*v1 -27 <= 0; value: -17 + 5*v2 + v3 -4 <= 0; value: -1 + 4*v0 + 6*v1 + 6*v3 -136 <= 0; value: -90 + 4*v0 -6*v1 + 2*v3 -23 <= 0; value: -13 0: 2 4 5 1: 1 2 4 5 2: 1 3 3: 1 3 4 5 optimal: oo + -2/3*v0 + 18 <= 0; value: 46/3 - 4*v0 + 3*v2 -3*v3 -24 <= 0; value: 0 - 2/3*v0 -1*v2 -15/2 <= 0; value: 0 + 16/3*v0 -57 <= 0; value: -107/3 + 24*v0 -283 <= 0; value: -187 - 4*v0 -6*v1 + 2*v3 -23 <= 0; value: 0 0: 2 4 5 1 3 1: 1 2 4 5 2: 1 3 2 4 3: 1 3 4 5 2 0: 4 -> 4 1: 2 -> -11/3 2: 0 -> -29/6 3: 3 -> -15/2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 -28 < 0; value: -13 + 3*v1 -4*v2 < 0; value: -20 + -3*v1 + 6*v2 -37 < 0; value: -7 + -5*v1 -4*v2 + 10 < 0; value: -10 + 6*v0 + 4*v3 -77 < 0; value: -37 0: 1 5 1: 2 3 4 2: 1 2 3 4 3: 1 5 optimal: oo + -4/3*v3 + 209/7 < 0; value: 515/21 + 10/3*v3 -1609/42 < 0; value: -1049/42 + -562/21 < 0; value: -562/21 - 42/5*v2 -43 <= 0; value: 0 - -5*v1 -4*v2 + 10 < 0; value: -5 - 6*v0 + 4*v3 -77 < 0; value: -6 0: 1 5 1: 2 3 4 2: 1 2 3 4 3: 1 5 0: 4 -> 55/6 1: 0 -> -23/21 2: 5 -> 215/42 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v1 -1*v2 + 8 = 0; value: 0 + -4*v0 + v1 + 18 = 0; value: 0 + 4*v2 -1*v3 -41 <= 0; value: -23 + -1*v2 -5*v3 -8 <= 0; value: -23 + -5*v0 + 4*v1 < 0; value: -17 0: 1 2 5 1: 1 2 5 2: 1 3 4 3: 3 4 optimal: oo + 1/10*v3 + 81/10 <= 0; value: 83/10 - v0 -4*v1 -1*v2 + 8 = 0; value: 0 - -15/4*v0 -1/4*v2 + 20 = 0; value: 0 - -60*v0 -1*v3 + 279 <= 0; value: 0 + -21/4*v3 -73/4 <= 0; value: -115/4 + -11/60*v3 -417/20 < 0; value: -1273/60 0: 1 2 5 3 4 1: 1 2 5 2: 1 3 4 2 5 3: 3 4 5 0: 5 -> 277/60 1: 2 -> 7/15 2: 5 -> 43/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 3*v2 -3*v3 + 14 <= 0; value: -6 + 6*v0 + 5*v3 -53 <= 0; value: -21 + -5*v1 -4*v2 -4 < 0; value: -14 + -2*v3 + 1 < 0; value: -7 + -3*v0 + 3*v1 <= 0; value: 0 0: 1 2 5 1: 3 5 2: 1 3 3: 1 2 4 optimal: (535/18 -e*1) + + 535/18 < 0; value: 535/18 - -4*v0 + 3*v2 -3*v3 + 14 <= 0; value: 0 - 6*v0 + 5*v3 -53 <= 0; value: 0 - -5*v1 -4*v2 -4 < 0; value: -5 - 12/5*v0 -101/5 < 0; value: -12/5 + -535/12 < 0; value: -535/12 0: 1 2 5 4 1: 3 5 2: 1 3 5 3: 1 2 4 5 0: 2 -> 89/12 1: 2 -> -1201/225 2: 0 -> 623/90 3: 4 -> 17/10 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 5*v1 + 3*v2 + 4 = 0; value: 0 + 2*v2 + v3 -9 = 0; value: 0 + 5*v1 + 3*v3 -26 <= 0; value: -6 + 4*v2 -20 < 0; value: -12 + 3*v0 + v3 -20 = 0; value: 0 0: 1 5 1: 1 3 2: 1 2 4 3: 2 3 5 optimal: (66/5 -e*1) + + 66/5 < 0; value: 66/5 - -3*v0 + 5*v1 + 3*v2 + 4 = 0; value: 0 - 2*v2 + v3 -9 = 0; value: 0 + -27 < 0; value: -27 - 6*v0 -42 < 0; value: -6 - 3*v0 + v3 -20 = 0; value: 0 0: 1 5 3 4 1: 1 3 2: 1 2 4 3 3: 2 3 5 4 0: 5 -> 6 1: 1 -> 7/10 2: 2 -> 7/2 3: 5 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 + 5*v2 -16 = 0; value: 0 + -1*v0 -5*v2 -2*v3 -11 <= 0; value: -35 + 6*v0 + 4*v2 + 2*v3 -88 <= 0; value: -58 + -1*v1 + 3*v3 -5 <= 0; value: -3 + 2*v0 + v3 -5 = 0; value: 0 0: 2 3 5 1: 1 4 2: 1 2 3 3: 2 3 4 5 optimal: 538/27 + + 538/27 <= 0; value: 538/27 - -4*v1 + 5*v2 -16 = 0; value: 0 - 27*v0 -77 <= 0; value: 0 + -11104/135 <= 0; value: -11104/135 - -5/4*v2 + 3*v3 -1 <= 0; value: 0 - 2*v0 + v3 -5 = 0; value: 0 0: 2 3 5 1: 1 4 2: 1 2 3 4 3: 2 3 4 5 0: 2 -> 77/27 1: 1 -> -64/9 2: 4 -> -112/45 3: 1 -> -19/27 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 + 3*v3 -29 < 0; value: -15 + 5*v1 -9 <= 0; value: -4 + 3*v2 -11 <= 0; value: -5 + v0 -6*v3 + 19 <= 0; value: -2 + v1 -5*v3 + 13 < 0; value: -6 0: 1 4 1: 2 5 2: 1 3 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 + 3*v3 -29 < 0; value: -15 + 5*v1 -9 <= 0; value: -4 + 3*v2 -11 <= 0; value: -5 + v0 -6*v3 + 19 <= 0; value: -2 + v1 -5*v3 + 13 < 0; value: -6 0: 1 4 1: 2 5 2: 1 3 3: 1 4 5 0: 3 -> 3 1: 1 -> 1 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 4*v1 + v2 -4 <= 0; value: 0 + -3*v3 + 2 <= 0; value: -1 + v1 -5*v2 -6*v3 + 26 = 0; value: 0 + 2*v0 + v3 -2 < 0; value: -1 + -4*v3 -3 < 0; value: -7 0: 1 4 1: 1 3 2: 1 3 3: 2 3 4 5 optimal: oo + 2*v0 -10*v2 + 44 <= 0; value: 4 + -6*v0 + 21*v2 -92 <= 0; value: -8 - -3*v3 + 2 <= 0; value: 0 - v1 -5*v2 -6*v3 + 26 = 0; value: 0 + 2*v0 -4/3 < 0; value: -4/3 + -17/3 < 0; value: -17/3 0: 1 4 1: 1 3 2: 1 3 3: 2 3 4 5 1 0: 0 -> 0 1: 0 -> -2 2: 4 -> 4 3: 1 -> 2/3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -5*v1 + 22 = 0; value: 0 + -6*v0 -3*v2 + 27 = 0; value: 0 + 5*v3 -24 <= 0; value: -14 + 5*v0 -5*v3 -8 <= 0; value: -3 + -1*v0 -2 < 0; value: -5 0: 1 2 4 5 1: 1 2: 2 3: 3 4 optimal: 356/25 + + 356/25 <= 0; value: 356/25 - -4*v0 -5*v1 + 22 = 0; value: 0 - -6*v0 -3*v2 + 27 = 0; value: 0 - 5*v3 -24 <= 0; value: 0 - -5/2*v2 -5*v3 + 29/2 <= 0; value: 0 + -42/5 < 0; value: -42/5 0: 1 2 4 5 1: 1 2: 2 4 5 3: 3 4 5 0: 3 -> 32/5 1: 2 -> -18/25 2: 3 -> -19/5 3: 2 -> 24/5 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -6*v3 + 37 = 0; value: 0 + -6*v0 + 4*v2 -4*v3 -21 <= 0; value: -55 + -5*v0 + 5*v2 + 7 < 0; value: -13 + -3*v2 -1*v3 <= 0; value: -5 + -1*v0 + v2 -1 < 0; value: -5 0: 2 3 5 1: 1 2: 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 + 12/5*v3 -74/5 <= 0; value: 0 - -5*v1 -6*v3 + 37 = 0; value: 0 + -6*v0 + 4*v2 -4*v3 -21 <= 0; value: -55 + -5*v0 + 5*v2 + 7 < 0; value: -13 + -3*v2 -1*v3 <= 0; value: -5 + -1*v0 + v2 -1 < 0; value: -5 0: 2 3 5 1: 1 2: 2 3 4 5 3: 1 2 4 0: 5 -> 5 1: 5 -> 5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + v2 -4*v3 -5 <= 0; value: -20 + 4*v0 -12 <= 0; value: -4 + -4*v2 -6*v3 -21 <= 0; value: -49 + -1*v0 + v2 -1*v3 + 2 < 0; value: -3 + 3*v0 -3*v1 -2 <= 0; value: -5 0: 2 4 5 1: 5 2: 1 3 4 3: 1 3 4 optimal: 4/3 + + 4/3 <= 0; value: 4/3 + v2 -4*v3 -5 <= 0; value: -20 + 4*v0 -12 <= 0; value: -4 + -4*v2 -6*v3 -21 <= 0; value: -49 + -1*v0 + v2 -1*v3 + 2 < 0; value: -3 - 3*v0 -3*v1 -2 <= 0; value: 0 0: 2 4 5 1: 5 2: 1 3 4 3: 1 3 4 0: 2 -> 2 1: 3 -> 4/3 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 -1*v2 -8 < 0; value: -5 + 5*v0 -4*v3 -2 = 0; value: 0 + -5*v0 -1*v1 -2*v3 -9 <= 0; value: -24 + v1 -1*v2 + 2 <= 0; value: 0 + -5*v1 + 5 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 4 3: 2 3 optimal: oo + 8/5*v3 -6/5 <= 0; value: 2 + -1*v2 -2 < 0; value: -5 - 5*v0 -4*v3 -2 = 0; value: 0 + -6*v3 -12 <= 0; value: -24 + -1*v2 + 3 <= 0; value: 0 - -5*v1 + 5 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 4 3: 2 3 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + v2 -13 <= 0; value: -7 + v1 + 2*v2 -7 < 0; value: -4 + -2*v0 -5*v2 -3*v3 + 1 <= 0; value: -4 + v1 -2 <= 0; value: -1 + -2*v2 + 5*v3 + 2 <= 0; value: 0 0: 3 1: 1 2 4 2: 1 2 3 5 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + v2 -13 <= 0; value: -7 + v1 + 2*v2 -7 < 0; value: -4 + -2*v0 -5*v2 -3*v3 + 1 <= 0; value: -4 + v1 -2 <= 0; value: -1 + -2*v2 + 5*v3 + 2 <= 0; value: 0 0: 3 1: 1 2 4 2: 1 2 3 5 3: 3 5 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + <= 0; value: 0 + 3*v1 -6*v3 -12 < 0; value: -27 + 4*v1 + 5*v2 -5*v3 -49 <= 0; value: -32 + 5*v1 -1*v2 -5*v3 + 1 < 0; value: -9 + -1*v2 + 4*v3 -17 <= 0; value: -6 0: 1: 2 3 4 2: 3 4 5 3: 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + <= 0; value: 0 + 3*v1 -6*v3 -12 < 0; value: -27 + 4*v1 + 5*v2 -5*v3 -49 <= 0; value: -32 + 5*v1 -1*v2 -5*v3 + 1 < 0; value: -9 + -1*v2 + 4*v3 -17 <= 0; value: -6 0: 1: 2 3 4 2: 3 4 5 3: 2 3 4 5 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 5 <= 0; value: -7 + -2*v0 + v2 + 5 = 0; value: 0 + v1 -7 < 0; value: -4 + 6*v3 -22 < 0; value: -10 + 6*v0 + 3*v1 -34 < 0; value: -7 0: 2 5 1: 1 3 5 2: 2 3: 4 optimal: (91/12 -e*1) + + 91/12 < 0; value: 91/12 - -4*v1 + 5 <= 0; value: 0 - -2*v0 + v2 + 5 = 0; value: 0 + -23/4 < 0; value: -23/4 + 6*v3 -22 < 0; value: -10 - 3*v2 -61/4 < 0; value: -3 0: 2 5 1: 1 3 5 2: 2 5 3: 4 0: 3 -> 109/24 1: 3 -> 5/4 2: 1 -> 49/12 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -3*v2 -1*v3 + 3 <= 0; value: -2 + -4*v1 -5*v2 + 3 <= 0; value: -6 + -6*v0 -3*v3 + 18 < 0; value: -12 + -3*v1 + 2*v2 + 1 <= 0; value: 0 + 5*v0 -3*v1 -6*v2 -11 = 0; value: 0 0: 3 5 1: 2 4 5 2: 1 2 4 5 3: 1 3 optimal: oo + 7/6*v0 + 4/3 <= 0; value: 6 + -15/8*v0 -1*v3 + 15/2 <= 0; value: -2 + -115/24*v0 + 79/6 <= 0; value: -6 + -6*v0 -3*v3 + 18 < 0; value: -12 - -3*v1 + 2*v2 + 1 <= 0; value: 0 - 5*v0 -8*v2 -12 = 0; value: 0 0: 3 5 2 1 1: 2 4 5 2: 1 2 4 5 3: 1 3 0: 4 -> 4 1: 1 -> 1 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v3 -46 <= 0; value: -28 + -4*v0 -2*v1 -2 <= 0; value: -26 + -2*v0 + 8 = 0; value: 0 + 2*v2 -4*v3 -1 <= 0; value: -5 + -6*v0 + 4*v2 + 6*v3 -13 <= 0; value: -3 0: 2 3 5 1: 2 2: 4 5 3: 1 4 5 optimal: 26 + + 26 <= 0; value: 26 + 6*v3 -46 <= 0; value: -28 - -4*v0 -2*v1 -2 <= 0; value: 0 - -2*v0 + 8 = 0; value: 0 + 2*v2 -4*v3 -1 <= 0; value: -5 + 4*v2 + 6*v3 -37 <= 0; value: -3 0: 2 3 5 1: 2 2: 4 5 3: 1 4 5 0: 4 -> 4 1: 4 -> -9 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 -5 <= 0; value: -2 + -3*v2 -1 <= 0; value: -4 + -5*v2 + 3*v3 -18 <= 0; value: -11 + 6*v1 -30 = 0; value: 0 + 3*v0 -2*v2 -6*v3 -4 < 0; value: -27 0: 5 1: 4 2: 1 2 3 5 3: 3 5 optimal: (30 -e*1) + + 30 < 0; value: 30 - 3*v2 -5 <= 0; value: 0 + -6 <= 0; value: -6 - -5*v2 + 3*v3 -18 <= 0; value: 0 - 6*v1 -30 = 0; value: 0 - 3*v0 -2*v2 -6*v3 -4 < 0; value: -3 0: 5 1: 4 2: 1 2 3 5 3: 3 5 0: 1 -> 19 1: 5 -> 5 2: 1 -> 5/3 3: 4 -> 79/9 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 4*v1 + 4*v2 -11 <= 0; value: -7 + 3*v0 -4*v1 -12 <= 0; value: 0 + 6*v0 + 4*v1 + v2 -58 <= 0; value: -30 + v0 -5*v1 -1*v2 <= 0; value: 0 + 4*v1 + 4*v2 -21 <= 0; value: -5 0: 1 2 3 4 1: 1 2 3 4 5 2: 1 3 4 5 3: optimal: 643/66 + + 643/66 <= 0; value: 643/66 + -137/11 <= 0; value: -137/11 - 3*v0 -4*v1 -12 <= 0; value: 0 - -11*v2 + 29 <= 0; value: 0 + -1085/132 <= 0; value: -1085/132 - 3*v0 + 4*v2 -33 <= 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 1 3 4 5 3: 0: 4 -> 247/33 1: 0 -> 115/44 2: 4 -> 29/11 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 3*v3 -8 < 0; value: -3 + v1 -4*v2 -5*v3 + 20 < 0; value: -25 + -5*v1 + 4*v2 -1*v3 -43 <= 0; value: -28 + 5*v0 -1*v2 -6 < 0; value: -1 + -6*v2 + 18 <= 0; value: -12 0: 1 4 1: 2 3 2: 2 3 4 5 3: 1 2 3 optimal: (274/15 -e*1) + + 274/15 < 0; value: 274/15 - -5*v0 + 3*v3 -8 < 0; value: -1 + -83/3 <= 0; value: -83/3 - -5*v1 + 4*v2 -1*v3 -43 <= 0; value: 0 - 5*v0 -1*v2 -6 < 0; value: -1 - -30*v0 + 54 <= 0; value: 0 0: 1 4 2 5 1: 2 3 2: 2 3 4 5 3: 1 2 3 0: 2 -> 9/5 1: 0 -> -97/15 2: 5 -> 4 3: 5 -> 16/3 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -6*v3 + 20 <= 0; value: 0 + 4*v1 -1*v3 -4 = 0; value: 0 + -2*v1 + 4*v2 -14 <= 0; value: -4 + -5*v0 -1*v2 + 2*v3 -26 < 0; value: -54 + 6*v3 <= 0; value: 0 0: 1 4 1: 2 3 2: 3 4 3: 1 2 4 5 optimal: oo + -28*v2 + 120 <= 0; value: 36 - -4*v0 -6*v3 + 20 <= 0; value: 0 - 4*v1 -1*v3 -4 = 0; value: 0 - 1/3*v0 + 4*v2 -53/3 <= 0; value: 0 + 75*v2 -355 < 0; value: -130 + 48*v2 -192 <= 0; value: -48 0: 1 4 3 5 1: 2 3 2: 3 4 5 3: 1 2 4 5 3 0: 5 -> 17 1: 1 -> -1 2: 3 -> 3 3: 0 -> -8 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + v2 -1 <= 0; value: -3 + -2*v0 + 1 <= 0; value: -7 + -4*v0 + 3*v1 + 2*v2 + 6 <= 0; value: 0 + 6*v0 -6*v1 + 4*v3 -34 < 0; value: -14 + -5*v1 + 10 = 0; value: 0 0: 1 2 3 4 1: 3 4 5 2: 1 3 3: 4 optimal: oo + -4/3*v3 + 34/3 < 0; value: 26/3 + v2 + 2/3*v3 -26/3 < 0; value: -16/3 + 4/3*v3 -43/3 < 0; value: -35/3 + 2*v2 + 8/3*v3 -56/3 < 0; value: -28/3 - 6*v0 + 4*v3 -46 < 0; value: -6 - -5*v1 + 10 = 0; value: 0 0: 1 2 3 4 1: 3 4 5 2: 1 3 3: 4 1 2 3 0: 4 -> 16/3 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -3*v3 -1 <= 0; value: 0 + -3*v1 -6*v2 + 4*v3 -1 <= 0; value: -6 + -5*v0 + 4 <= 0; value: -11 + -1*v1 -4*v2 -5*v3 + 7 <= 0; value: -3 + -4*v0 + 2*v2 -3 <= 0; value: -13 0: 3 5 1: 1 2 4 2: 2 4 5 3: 1 2 4 optimal: oo + 222/19*v0 + 92/19 <= 0; value: 758/19 + -332/19*v0 -242/19 <= 0; value: -1238/19 - -3*v1 -6*v2 + 4*v3 -1 <= 0; value: 0 + -5*v0 + 4 <= 0; value: -11 - -2*v2 -19/3*v3 + 22/3 <= 0; value: 0 - -4*v0 + 2*v2 -3 <= 0; value: 0 0: 3 5 1 1: 1 2 4 2: 2 4 5 1 3: 1 2 4 0: 3 -> 3 1: 1 -> -322/19 2: 1 -> 15/2 3: 1 -> -23/19 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 + 6*v3 -23 < 0; value: -9 + -6*v0 -3*v1 -4*v2 + 39 = 0; value: 0 + -4*v1 + 2*v2 + 8 <= 0; value: -6 + 3*v1 -6*v2 + 5*v3 -2 = 0; value: 0 + -4*v0 -3*v1 -1*v2 -19 <= 0; value: -45 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 3: 1 4 optimal: (-129/52 -e*1) + -129/52 < 0; value: -129/52 - 4*v0 + 6*v3 -23 < 0; value: -189/52 - -6*v0 -3*v1 -4*v2 + 39 = 0; value: 0 - 52/45*v0 -253/90 <= 0; value: 0 - -6*v0 -10*v2 + 5*v3 + 37 = 0; value: 0 + -2241/52 <= 0; value: -2241/52 0: 1 2 5 3 4 1: 2 3 4 5 2: 2 3 4 5 3: 1 4 3 5 0: 2 -> 253/104 1: 5 -> 53/13 2: 3 -> 633/208 3: 1 -> 167/104 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 -2*v2 -2*v3 + 12 = 0; value: 0 + 2*v0 -4 = 0; value: 0 + -6*v0 -1*v2 + 7 <= 0; value: -9 + 5*v0 + v2 + 4*v3 -60 < 0; value: -30 + -6*v2 + 2*v3 + 16 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 5 3: 1 4 5 optimal: oo + 2*v0 -2*v2 -2*v3 + 12 <= 0; value: 0 - 2*v1 -2*v2 -2*v3 + 12 = 0; value: 0 + 2*v0 -4 = 0; value: 0 + -6*v0 -1*v2 + 7 <= 0; value: -9 + 5*v0 + v2 + 4*v3 -60 < 0; value: -30 + -6*v2 + 2*v3 + 16 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 5 3: 1 4 5 0: 2 -> 2 1: 2 -> 2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + v0 -4*v2 + 1 = 0; value: 0 + v0 + v1 + v3 -8 = 0; value: 0 + -6*v0 + 10 < 0; value: -8 + -5*v0 -9 <= 0; value: -24 + -1*v0 -6*v2 + 4*v3 + 1 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 1 5 3: 2 5 optimal: oo + 21/4*v0 -63/4 <= 0; value: 0 - v0 -4*v2 + 1 = 0; value: 0 - v0 + v1 + v3 -8 = 0; value: 0 + -6*v0 + 10 < 0; value: -8 + -5*v0 -9 <= 0; value: -24 - -1*v0 -6*v2 + 4*v3 + 1 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 1 5 3: 2 5 0: 3 -> 3 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 6 = 0; value: 0 + -6*v1 -4*v3 + 21 <= 0; value: -5 + -6*v1 + v2 < 0; value: -17 + -5*v1 -1*v3 -2 <= 0; value: -19 + -5*v1 -2*v2 <= 0; value: -17 0: 1: 1 2 3 4 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 -6 <= 0; value: -6 - -2*v1 + 6 = 0; value: 0 + -4*v3 + 3 <= 0; value: -5 + v2 -18 < 0; value: -17 + -1*v3 -17 <= 0; value: -19 + -2*v2 -15 <= 0; value: -17 0: 1: 1 2 3 4 5 2: 3 5 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -6*v1 -4*v2 + 1 <= 0; value: -21 + 2*v0 -4*v1 -7 <= 0; value: -1 + 6*v0 -3*v1 -4*v2 -11 = 0; value: 0 + 6*v1 -2*v2 -1 <= 0; value: -3 + v0 -6*v1 + 1 = 0; value: 0 0: 2 3 5 1: 1 2 3 4 5 2: 1 3 4 3: optimal: 37/4 + + 37/4 <= 0; value: 37/4 + -207/8 <= 0; value: -207/8 - 4/3*v0 -23/3 <= 0; value: 0 - 6*v0 -3*v1 -4*v2 -11 = 0; value: 0 + -69/16 <= 0; value: -69/16 - -11*v0 + 8*v2 + 23 = 0; value: 0 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 1 3 4 2 5 3: 0: 5 -> 23/4 1: 1 -> 9/8 2: 4 -> 161/32 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 -12 = 0; value: 0 + 4*v0 -4*v1 + 4*v2 -20 = 0; value: 0 + 3*v0 -6*v1 + 12 = 0; value: 0 + 3*v2 -17 <= 0; value: -2 + 6*v0 -6*v3 -22 <= 0; value: -4 0: 2 3 5 1: 1 2 3 2: 2 4 3: 5 optimal: 0 + <= 0; value: 0 - 3*v1 -12 = 0; value: 0 - 4*v0 + 4*v2 -36 = 0; value: 0 - -3*v2 + 15 = 0; value: 0 + -2 <= 0; value: -2 + -6*v3 + 2 <= 0; value: -4 0: 2 3 5 1: 1 2 3 2: 2 4 3 5 3: 5 0: 4 -> 4 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v3 -35 <= 0; value: -20 + v2 -3 = 0; value: 0 + -5*v0 + 1 < 0; value: -4 + -5*v2 -1*v3 + 20 = 0; value: 0 + 4*v1 -3*v2 -3 = 0; value: 0 0: 3 1: 5 2: 2 4 5 3: 1 4 optimal: oo + 2*v0 -6 <= 0; value: -4 + 3*v3 -35 <= 0; value: -20 - v2 -3 = 0; value: 0 + -5*v0 + 1 < 0; value: -4 + -1*v3 + 5 = 0; value: 0 - 4*v1 -3*v2 -3 = 0; value: 0 0: 3 1: 5 2: 2 4 5 3: 1 4 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -1*v1 + 5*v3 -5 <= 0; value: 0 + v0 -6*v1 -24 <= 0; value: -53 + -3*v0 -2*v1 + 6 <= 0; value: -7 + 5*v0 + 4*v3 -13 = 0; value: 0 + -6*v0 -6*v1 -19 <= 0; value: -55 0: 2 3 4 5 1: 1 2 3 5 2: 3: 1 4 optimal: 51/19 + + 51/19 <= 0; value: 51/19 - -1*v1 + 5*v3 -5 <= 0; value: 0 + -468/19 <= 0; value: -468/19 - 19/2*v0 -33/2 <= 0; value: 0 - 5*v0 + 4*v3 -13 = 0; value: 0 + -604/19 <= 0; value: -604/19 0: 2 3 4 5 1: 1 2 3 5 2: 3: 1 4 2 3 5 0: 1 -> 33/19 1: 5 -> 15/38 2: 2 -> 2 3: 2 -> 41/38 + 2*v0 -2*v1 <= 0; value: 0 + v2 -3*v3 -2 = 0; value: 0 + -1*v2 + 5*v3 = 0; value: 0 + -4*v0 + 1 < 0; value: -3 + 2*v1 + 4*v2 -55 < 0; value: -33 + 2*v0 -1*v1 -2*v3 + 1 = 0; value: 0 0: 3 5 1: 4 5 2: 1 2 4 3: 1 2 5 optimal: (3/2 -e*1) + + 3/2 < 0; value: 3/2 - v2 -3*v3 -2 = 0; value: 0 - 2/3*v2 -10/3 = 0; value: 0 - -4*v0 + 1 < 0; value: -3/2 + -36 < 0; value: -36 - 2*v0 -1*v1 -2*v3 + 1 = 0; value: 0 0: 3 5 4 1: 4 5 2: 1 2 4 3: 1 2 5 4 0: 1 -> 5/8 1: 1 -> 1/4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -3*v1 -6*v2 -4*v3 + 43 = 0; value: 0 + -3*v0 -5*v2 -4*v3 + 34 < 0; value: -17 + -1*v1 + 4*v3 -16 < 0; value: -1 + v1 -2*v3 + 7 = 0; value: 0 + 6*v1 -1*v2 -5 < 0; value: -3 0: 2 1: 1 3 4 5 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 + 12/5*v2 -58/5 <= 0; value: 8 - -3*v1 -6*v2 -4*v3 + 43 = 0; value: 0 + -3*v0 -13/5*v2 + 42/5 < 0; value: -17 + -6/5*v2 + 19/5 < 0; value: -1 - -2*v2 -10/3*v3 + 64/3 = 0; value: 0 + -41/5*v2 + 149/5 < 0; value: -3 0: 2 1: 1 3 4 5 2: 1 2 5 3 4 3: 1 2 3 4 5 0: 5 -> 5 1: 1 -> 1 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v3 <= 0; value: 0 + 4*v0 -5*v2 -2 <= 0; value: -1 + -6*v2 + 4*v3 -2 <= 0; value: -8 + v0 + 6*v1 + 6*v3 -52 < 0; value: -24 + -1*v0 + 4 <= 0; value: 0 0: 1 2 4 5 1: 4 2: 2 3 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v3 <= 0; value: 0 + 4*v0 -5*v2 -2 <= 0; value: -1 + -6*v2 + 4*v3 -2 <= 0; value: -8 + v0 + 6*v1 + 6*v3 -52 < 0; value: -24 + -1*v0 + 4 <= 0; value: 0 0: 1 2 4 5 1: 4 2: 2 3 3: 1 3 4 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 + 5*v3 -90 < 0; value: -53 + -3*v2 -3*v3 -23 < 0; value: -50 + 5*v3 -25 = 0; value: 0 + v1 <= 0; value: 0 + -1*v0 + v3 -6 < 0; value: -1 0: 5 1: 4 2: 1 2 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 + 5*v3 -90 < 0; value: -53 + -3*v2 -3*v3 -23 < 0; value: -50 + 5*v3 -25 = 0; value: 0 + v1 <= 0; value: 0 + -1*v0 + v3 -6 < 0; value: -1 0: 5 1: 4 2: 1 2 3: 1 2 3 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + 3*v1 + 4*v3 -23 < 0; value: -8 + 6*v0 -5*v2 -88 < 0; value: -58 + -2*v1 -6*v2 + 2 <= 0; value: 0 + -2*v1 < 0; value: -2 + -1*v0 + 5*v2 < 0; value: -5 0: 2 5 1: 1 3 4 2: 2 3 5 3: 1 optimal: (269/9 -e*1) + + 269/9 < 0; value: 269/9 + 4*v3 -23 < 0; value: -11 - 6*v0 -269/3 < 0; value: -6 - -2*v1 -6*v2 + 2 <= 0; value: 0 - 6*v2 -2 < 0; value: -1 + -239/18 < 0; value: -239/18 0: 2 5 1: 1 3 4 2: 2 3 5 4 1 3: 1 0: 5 -> 251/18 1: 1 -> 1/2 2: 0 -> 1/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v3 -6 = 0; value: 0 + 6*v0 -4*v2 -52 <= 0; value: -32 + -5*v2 + 5*v3 -5 = 0; value: 0 + -1*v0 + 3*v3 -5 <= 0; value: -3 + -1*v1 + 4*v2 -1*v3 -2 < 0; value: -5 0: 2 4 1: 5 2: 2 3 5 3: 1 3 4 5 optimal: (56/3 -e*1) + + 56/3 < 0; value: 56/3 - 3*v3 -6 = 0; value: 0 - 6*v0 -56 <= 0; value: 0 - -5*v2 + 5 = 0; value: 0 + -25/3 <= 0; value: -25/3 - -1*v1 + 4*v2 -1*v3 -2 < 0; value: -1 0: 2 4 1: 5 2: 2 3 5 3: 1 3 4 5 0: 4 -> 28/3 1: 5 -> 1 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 -6*v1 + 9 <= 0; value: -6 + -4*v1 + 2*v2 + 2 = 0; value: 0 + 3*v2 -6 < 0; value: -3 + 2*v0 + v2 -19 <= 0; value: -12 + -1*v2 + 1 <= 0; value: 0 0: 1 4 1: 1 2 2: 2 3 4 5 3: optimal: 16 + + 16 <= 0; value: 16 + -24 <= 0; value: -24 - -4*v1 + 2*v2 + 2 = 0; value: 0 + -3 < 0; value: -3 - 2*v0 -18 <= 0; value: 0 - -1*v2 + 1 <= 0; value: 0 0: 1 4 1: 1 2 2: 2 3 4 5 1 3: 0: 3 -> 9 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v2 -2*v3 -16 < 0; value: -10 + 3*v0 + 6*v2 + 5*v3 -121 <= 0; value: -72 + -3*v0 -6*v1 + v3 + 1 = 0; value: 0 + -2*v1 <= 0; value: 0 + -2*v1 -6*v2 + 18 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 2 5 3: 1 2 3 optimal: 12 + + 12 <= 0; value: 12 + -38 < 0; value: -38 - 18*v0 + 6*v2 -126 <= 0; value: 0 - -3*v0 -6*v1 + v3 + 1 = 0; value: 0 - v0 -1/3*v3 -1/3 <= 0; value: 0 - -6*v2 + 18 = 0; value: 0 0: 1 2 3 4 5 1: 3 4 5 2: 1 2 5 3: 1 2 3 4 5 0: 2 -> 6 1: 0 -> 0 2: 3 -> 3 3: 5 -> 17 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -6*v2 -6 <= 0; value: -14 + v0 -6*v1 -2*v2 + 16 = 0; value: 0 + 2*v0 + 6*v1 + 3*v3 -46 <= 0; value: -15 + 3*v0 + 6*v3 -106 < 0; value: -70 + -2*v0 + 2*v3 -6 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 2: 1 2 3: 3 4 5 optimal: oo + 5/3*v0 + 2/3*v2 -16/3 <= 0; value: 0 + 5*v0 -6*v2 -6 <= 0; value: -14 - v0 -6*v1 -2*v2 + 16 = 0; value: 0 + 3*v0 -2*v2 + 3*v3 -30 <= 0; value: -15 + 3*v0 + 6*v3 -106 < 0; value: -70 + -2*v0 + 2*v3 -6 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 2: 1 2 3 3: 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 10 + 5*v0 -6*v3 -7 = 0; value: 0 + 3*v2 + v3 -15 = 0; value: 0 + 6*v1 <= 0; value: 0 + -2*v1 -3*v2 -5*v3 -7 <= 0; value: -34 + -1*v0 + 3*v2 -3*v3 + 2 <= 0; value: 0 0: 1 5 1: 3 4 2: 2 4 5 3: 1 2 4 5 optimal: oo + 16/3*v0 + 52/3 <= 0; value: 44 - 5*v0 -6*v3 -7 = 0; value: 0 - 5/6*v0 + 3*v2 -97/6 = 0; value: 0 + -10*v0 -52 <= 0; value: -102 - -2*v1 -3*v2 -5*v3 -7 <= 0; value: 0 + -13/3*v0 + 65/3 <= 0; value: 0 0: 1 5 2 3 1: 3 4 2: 2 4 5 3 3: 1 2 4 5 3 0: 5 -> 5 1: 0 -> -17 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -5*v3 + 1 < 0; value: -14 + -2*v0 -2*v1 + 14 = 0; value: 0 + v1 + 3*v2 -26 <= 0; value: -9 + -4*v0 + 5*v1 + 5*v2 -15 = 0; value: 0 + 3*v1 -2*v3 <= 0; value: 0 0: 2 4 1: 2 3 4 5 2: 3 4 3: 1 5 optimal: 156/11 + + 156/11 <= 0; value: 156/11 + -5*v3 + 1 < 0; value: -14 - -2*v0 -2*v1 + 14 = 0; value: 0 - 22/9*v2 -191/9 <= 0; value: 0 - -9*v0 + 5*v2 + 20 = 0; value: 0 + -2*v3 -3/22 <= 0; value: -135/22 0: 2 4 3 5 1: 2 3 4 5 2: 3 4 5 3: 1 5 0: 5 -> 155/22 1: 2 -> -1/22 2: 5 -> 191/22 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + 6*v0 -5*v3 -4 < 0; value: -14 + -1*v0 + 3*v2 -14 <= 0; value: -5 + 5*v2 -4*v3 -16 < 0; value: -9 + 4*v1 + 3*v3 -60 <= 0; value: -38 + -1*v1 -4*v2 + 2 <= 0; value: -14 0: 1 2 1: 4 5 2: 2 3 5 3: 1 3 4 optimal: (2304/47 -e*1) + + 2304/47 < 0; value: 2304/47 - 47/5*v3 -152/5 <= 0; value: 0 - -1*v0 + 3*v2 -14 <= 0; value: 0 - 5/3*v0 -4*v3 + 22/3 < 0; value: -5/3 + -6340/47 < 0; value: -6340/47 - -1*v1 -4*v2 + 2 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3 5 4 3: 1 3 4 0: 0 -> 111/47 1: 4 -> -2794/141 2: 3 -> 769/141 3: 2 -> 152/47 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 -4*v1 -2 = 0; value: 0 + 6*v1 + 5*v2 -12 = 0; value: 0 + 2*v2 <= 0; value: 0 + 6*v3 -14 <= 0; value: -8 + -5*v0 -2*v1 -21 <= 0; value: -50 0: 1 5 1: 1 2 5 2: 2 3 3: 4 optimal: oo + -5/3*v2 + 6 <= 0; value: 6 - 2*v0 -4*v1 -2 = 0; value: 0 - 3*v0 + 5*v2 -15 = 0; value: 0 + 2*v2 <= 0; value: 0 + 6*v3 -14 <= 0; value: -8 + 10*v2 -50 <= 0; value: -50 0: 1 5 2 1: 1 2 5 2: 2 3 5 3: 4 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -3*v3 <= 0; value: -1 + 4*v2 -25 < 0; value: -13 + 6*v2 + 4*v3 -30 = 0; value: 0 + -2*v0 + 4*v1 = 0; value: 0 + 6*v0 + 2*v3 -22 < 0; value: -4 0: 1 4 5 1: 4 2: 2 3 3: 1 3 5 optimal: (33/13 -e*1) + + 33/13 < 0; value: 33/13 - 4*v0 -3*v3 <= 0; value: 0 + -547/39 < 0; value: -547/39 - 6*v2 + 4*v3 -30 = 0; value: 0 - -2*v0 + 4*v1 = 0; value: 0 - -39/4*v2 + 107/4 < 0; value: -5/4 0: 1 4 5 1: 4 2: 2 3 5 3: 1 3 5 0: 2 -> 249/104 1: 1 -> 249/208 2: 3 -> 112/39 3: 3 -> 83/26 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 + 2*v1 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + -1*v0 -2*v2 -3*v3 + 10 = 0; value: 0 + -6*v0 -1*v2 + 13 = 0; value: 0 + -6*v0 -4*v3 -12 <= 0; value: -32 0: 1 2 3 4 5 1: 1 2: 3 4 3: 3 5 optimal: 4 + + 4 <= 0; value: 4 - -6*v0 + 2*v1 + 12 = 0; value: 0 - -3*v0 + 6 = 0; value: 0 + -2*v2 -3*v3 + 8 = 0; value: 0 + -1*v2 + 1 = 0; value: 0 + -4*v3 -24 <= 0; value: -32 0: 1 2 3 4 5 1: 1 2: 3 4 3: 3 5 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + v0 + 6*v1 -1*v2 <= 0; value: -1 + 3*v0 + 4*v2 + 2*v3 -78 < 0; value: -45 + 2*v0 -1*v2 -6*v3 + 22 = 0; value: 0 + -5*v2 + v3 -1 <= 0; value: -17 + -5*v1 + 2*v3 -18 < 0; value: -10 0: 1 2 3 1: 1 5 2: 1 2 3 4 3: 2 3 4 5 optimal: (294/11 -e*1) + + 294/11 < 0; value: 294/11 - 16/5*v0 -2188/55 < 0; value: -16/5 - 11/3*v0 + 11/3*v2 -212/3 < 0; value: -11/3 - 2*v0 -1*v2 -6*v3 + 22 = 0; value: 0 + -2511/88 <= 0; value: -2511/88 - -5*v1 + 2*v3 -18 < 0; value: -703/264 0: 1 2 3 4 1: 1 5 2: 1 2 3 4 3: 2 3 4 5 1 0: 3 -> 503/44 1: 0 -> -703/1320 2: 4 -> 301/44 3: 4 -> 1673/264 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 -4*v3 -12 = 0; value: 0 + 3*v2 -5*v3 -6 = 0; value: 0 + 5*v1 + 6*v2 -3*v3 -35 < 0; value: -8 + 2*v0 + 5*v3 -8 = 0; value: 0 + 2*v0 -18 < 0; value: -10 0: 4 5 1: 1 3 2: 2 3 3: 1 2 3 4 optimal: (16 -e*1) + + 16 < 0; value: 16 - 4*v1 -4*v3 -12 = 0; value: 0 - 3*v2 -5*v3 -6 = 0; value: 0 + -32 < 0; value: -32 - 2*v0 + 3*v2 -14 = 0; value: 0 - 2*v0 -18 < 0; value: -2 0: 4 5 3 1: 1 3 2: 2 3 4 3: 1 2 3 4 0: 4 -> 8 1: 3 -> 7/5 2: 2 -> -2/3 3: 0 -> -8/5 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 -3*v2 -4*v3 -3 <= 0; value: -30 + 4*v0 -5*v2 + 2*v3 + 17 = 0; value: 0 + 4*v0 -4*v3 -8 = 0; value: 0 + 3*v0 + 3*v1 -3*v3 -15 = 0; value: 0 + 6*v0 + 4*v1 -5*v2 + 1 <= 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -6 <= 0; value: -2 + -38/5*v0 -74/5 <= 0; value: -30 - 4*v0 -5*v2 + 2*v3 + 17 = 0; value: 0 - 12*v0 -10*v2 + 26 = 0; value: 0 - 3*v0 + 3*v1 -3*v3 -15 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 1 2 5 3 3: 1 2 3 4 5 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -2*v1 -4*v3 -2 = 0; value: 0 + 2*v1 -23 <= 0; value: -13 + 5*v0 -5*v3 -11 <= 0; value: -6 + -5*v1 + v2 + v3 + 13 <= 0; value: -5 + 2*v2 + 2*v3 -39 < 0; value: -25 0: 1 3 1: 1 2 4 2: 4 5 3: 1 3 4 5 optimal: oo + 16/11*v0 -4/11*v2 -50/11 <= 0; value: -2/11 - 6*v0 -2*v1 -4*v3 -2 = 0; value: 0 + 6/11*v0 + 4/11*v2 -203/11 <= 0; value: -163/11 + -20/11*v0 + 5/11*v2 -31/11 <= 0; value: -91/11 - -15*v0 + v2 + 11*v3 + 18 <= 0; value: 0 + 30/11*v0 + 20/11*v2 -465/11 < 0; value: -265/11 0: 1 3 4 2 5 1: 1 2 4 2: 4 5 3 2 3: 1 3 4 5 2 0: 4 -> 4 1: 5 -> 45/11 2: 4 -> 4 3: 3 -> 38/11 + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 5*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + -4*v0 + 4*v2 + 4 <= 0; value: 0 + v0 -5*v1 + 2*v3 -17 <= 0; value: -41 + 6*v1 -5*v2 -34 <= 0; value: -4 0: 3 4 1: 4 5 2: 1 3 5 3: 1 2 4 optimal: oo + 20/3*v2 + 238/3 <= 0; value: 238/3 + -6*v2 <= 0; value: 0 - -4*v3 <= 0; value: 0 + -38/3*v2 -532/3 <= 0; value: -532/3 - v0 -5*v1 + 2*v3 -17 <= 0; value: 0 - 6/5*v0 -5*v2 -272/5 <= 0; value: 0 0: 3 4 5 1: 4 5 2: 1 3 5 3: 1 2 4 5 0: 1 -> 136/3 1: 5 -> 17/3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 3*v1 -4*v2 -11 = 0; value: 0 + -1*v1 + 5*v3 -15 = 0; value: 0 + -5*v2 + 3 <= 0; value: -2 + 6*v1 -54 <= 0; value: -24 + -2*v1 + 4*v2 + 6 = 0; value: 0 0: 1: 1 2 4 5 2: 1 3 5 3: 2 optimal: oo + 2*v0 -10 <= 0; value: -6 - 3*v1 -4*v2 -11 = 0; value: 0 + 5*v3 -20 = 0; value: 0 + -2 <= 0; value: -2 + -24 <= 0; value: -24 - 4/3*v2 -4/3 = 0; value: 0 0: 1: 1 2 4 5 2: 1 3 5 2 4 3: 2 0: 2 -> 2 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 3*v3 -15 = 0; value: 0 + 6*v0 + v1 -4*v2 -92 <= 0; value: -61 + -4*v1 -1*v2 + 3*v3 -14 < 0; value: -3 + 3*v1 -4 <= 0; value: -1 + -2*v0 + 1 < 0; value: -9 0: 2 5 1: 2 3 4 2: 1 2 3 3: 1 3 optimal: (539/13 -e*1) + + 539/13 < 0; value: 539/13 - -4*v2 + 3*v3 -15 = 0; value: 0 - 6*v0 -13/4*v2 -367/4 < 0; value: -13/4 - -4*v1 -1*v2 + 3*v3 -14 < 0; value: -4 + -841/13 < 0; value: -841/13 - -2*v0 + 1 < 0; value: -2 0: 2 5 4 1: 2 3 4 2: 1 2 3 4 3: 1 3 2 4 0: 5 -> 3/2 1: 1 -> -889/52 2: 0 -> -318/13 3: 5 -> -359/13 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v3 -1 <= 0; value: -4 + 2*v0 -21 <= 0; value: -13 + 6*v0 + 3*v2 + 6*v3 -47 <= 0; value: -2 + v1 -2*v3 <= 0; value: -1 + 3*v2 + 5*v3 -43 < 0; value: -24 0: 2 3 1: 1 4 2: 3 5 3: 1 3 4 5 optimal: 67/3 + + 67/3 <= 0; value: 67/3 - -3*v1 + 3*v3 -1 <= 0; value: 0 - -1*v2 -14/3 <= 0; value: 0 - 6*v0 + 3*v2 -49 <= 0; value: 0 - -1*v3 -1/3 <= 0; value: 0 + -176/3 < 0; value: -176/3 0: 2 3 1: 1 4 2: 3 5 2 3: 1 3 4 5 0: 4 -> 21/2 1: 3 -> -2/3 2: 3 -> -14/3 3: 2 -> -1/3 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 2*v2 -3*v3 -24 <= 0; value: -12 + 6*v1 -6*v3 -5 <= 0; value: -11 + 6*v1 + 2*v3 -26 = 0; value: 0 + -1*v0 -2*v1 + v2 + 5 = 0; value: 0 + 6*v1 + 2*v2 + 2*v3 -76 < 0; value: -44 0: 4 1: 1 2 3 4 5 2: 1 4 5 3: 1 2 3 5 optimal: oo + 3*v0 -1*v2 -5 <= 0; value: -2 + -15/2*v0 + 19/2*v2 -51/2 <= 0; value: -12 + -12*v0 + 12*v2 -23 <= 0; value: -11 - 6*v1 + 2*v3 -26 = 0; value: 0 - -1*v0 + v2 + 2/3*v3 -11/3 = 0; value: 0 + 2*v2 -50 < 0; value: -44 0: 4 1 2 1: 1 2 3 4 5 2: 1 4 5 2 3: 1 2 3 5 4 0: 2 -> 2 1: 3 -> 3 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + v2 -2 <= 0; value: -1 + -3*v0 + 4*v1 -3*v3 -3 <= 0; value: -10 + 6*v2 + 6*v3 -65 <= 0; value: -29 + 6*v2 -9 <= 0; value: -3 + 3*v3 -28 <= 0; value: -13 0: 2 1: 2 2: 1 3 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + v2 -2 <= 0; value: -1 + -3*v0 + 4*v1 -3*v3 -3 <= 0; value: -10 + 6*v2 + 6*v3 -65 <= 0; value: -29 + 6*v2 -9 <= 0; value: -3 + 3*v3 -28 <= 0; value: -13 0: 2 1: 2 2: 1 3 4 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -4*v3 < 0; value: -8 + 3*v0 + 6*v3 -36 = 0; value: 0 + 6*v0 + 3*v2 + 5*v3 -71 <= 0; value: -25 + -2*v1 -1*v3 + 7 <= 0; value: 0 + v0 + 2*v3 -12 = 0; value: 0 0: 1 2 3 5 1: 4 2: 3 3: 1 2 3 4 5 optimal: (7/2 -e*1) + + 7/2 < 0; value: 7/2 - 8*v0 -24 < 0; value: -4 - 3*v0 + 6*v3 -36 = 0; value: 0 + 3*v2 -61/2 <= 0; value: -43/2 - -2*v1 -1*v3 + 7 <= 0; value: 0 + = 0; value: 0 0: 1 2 3 5 1: 4 2: 3 3: 1 2 3 4 5 0: 2 -> 5/2 1: 1 -> 9/8 2: 3 -> 3 3: 5 -> 19/4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 3*v1 + 9 <= 0; value: 0 + 3*v1 -1*v2 -3*v3 + 1 = 0; value: 0 + -4*v1 -1*v3 + 3 < 0; value: -21 + -2*v3 -3 <= 0; value: -11 + <= 0; value: 0 0: 1 1: 1 2 3 2: 2 3: 2 3 4 optimal: oo + 2*v0 -2/15*v2 -16/15 < 0; value: 32/5 + -6*v0 + 1/5*v2 + 53/5 < 0; value: -63/5 - 3*v1 -1*v2 -3*v3 + 1 = 0; value: 0 - -4/3*v2 -5*v3 + 13/3 < 0; value: -5 + 8/15*v2 -71/15 <= 0; value: -13/5 + <= 0; value: 0 0: 1 1: 1 2 3 2: 2 3 1 4 3: 2 3 4 1 0: 4 -> 4 1: 5 -> 9/5 2: 4 -> 4 3: 4 -> 4/5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 -1*v3 -25 <= 0; value: -6 + -3*v0 + 6*v2 -12 = 0; value: 0 + 3*v0 -31 <= 0; value: -19 + 3*v1 + 6*v2 -93 <= 0; value: -60 + 6*v0 -66 < 0; value: -42 0: 2 3 5 1: 4 2: 1 2 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 -1*v3 -25 <= 0; value: -6 + -3*v0 + 6*v2 -12 = 0; value: 0 + 3*v0 -31 <= 0; value: -19 + 3*v1 + 6*v2 -93 <= 0; value: -60 + 6*v0 -66 < 0; value: -42 0: 2 3 5 1: 4 2: 1 2 4 3: 1 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 6 <= 0; value: -2 + v0 + 6*v1 + 4*v3 -11 = 0; value: 0 + -3*v2 < 0; value: -6 + -6*v1 + 6 <= 0; value: 0 + 6*v1 -6*v3 -15 <= 0; value: -9 0: 2 1: 2 4 5 2: 1 3 3: 2 5 optimal: 20 + + 20 <= 0; value: 20 + -4*v2 + 6 <= 0; value: -2 - v0 + 6*v1 + 4*v3 -11 = 0; value: 0 + -3*v2 < 0; value: -6 - v0 + 4*v3 -5 <= 0; value: 0 - 3/2*v0 -33/2 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 1 3 3: 2 5 4 0: 5 -> 11 1: 1 -> 1 2: 2 -> 2 3: 0 -> -3/2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 2*v2 -5*v3 -2 <= 0; value: -13 + v0 -1 = 0; value: 0 + -3*v1 + 2 <= 0; value: -4 + 3*v0 + v3 -8 <= 0; value: 0 + -2*v1 + 5*v2 -32 <= 0; value: -16 0: 1 2 4 1: 3 5 2: 1 5 3: 1 4 optimal: 2/3 + + 2/3 <= 0; value: 2/3 + 2*v2 -5*v3 + 4 <= 0; value: -13 - v0 -1 = 0; value: 0 - -3*v1 + 2 <= 0; value: 0 + v3 -5 <= 0; value: 0 + 5*v2 -100/3 <= 0; value: -40/3 0: 1 2 4 1: 3 5 2: 1 5 3: 1 4 0: 1 -> 1 1: 2 -> 2/3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -9 < 0; value: -3 + -1*v2 + 6*v3 -4 < 0; value: -9 + -5*v2 + 1 <= 0; value: -24 + 3*v3 <= 0; value: 0 + -4*v0 + 5*v1 <= 0; value: -1 0: 5 1: 1 5 2: 2 3 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -9 < 0; value: -3 + -1*v2 + 6*v3 -4 < 0; value: -9 + -5*v2 + 1 <= 0; value: -24 + 3*v3 <= 0; value: 0 + -4*v0 + 5*v1 <= 0; value: -1 0: 5 1: 1 5 2: 2 3 3: 2 4 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 4*v1 -1*v2 + 4 = 0; value: 0 + -6*v0 + 6*v3 -3 <= 0; value: -9 + -2*v0 + 5*v3 -11 < 0; value: -4 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 2 <= 0; value: -2 0: 2 3 4 5 1: 1 2: 1 3: 2 3 optimal: oo + 2*v0 -1/2*v2 + 2 <= 0; value: 8 - 4*v1 -1*v2 + 4 = 0; value: 0 + -6*v0 + 6*v3 -3 <= 0; value: -9 + -2*v0 + 5*v3 -11 < 0; value: -4 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 2 <= 0; value: -2 0: 2 3 4 5 1: 1 2: 1 3: 2 3 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 <= 0; value: 0 + 2*v0 -2*v1 -1*v2 -9 <= 0; value: -3 + 3*v0 -2*v3 -27 < 0; value: -16 + -6*v3 + 4 < 0; value: -8 + -6*v0 -2*v2 -34 <= 0; value: -72 0: 2 3 5 1: 1 2 2: 2 5 3: 3 4 optimal: oo + 4/3*v3 + 18 < 0; value: 62/3 - -1*v1 <= 0; value: 0 - 2*v0 -1*v2 -9 <= 0; value: 0 - 3/2*v2 -2*v3 -27/2 < 0; value: -3/2 + -6*v3 + 4 < 0; value: -8 + -20/3*v3 -106 < 0; value: -358/3 0: 2 3 5 1: 1 2 2: 2 5 3 3: 3 4 5 0: 5 -> 59/6 1: 0 -> 0 2: 4 -> 32/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -6*v2 -5*v3 + 13 <= 0; value: -5 + 4*v0 = 0; value: 0 + 3*v1 + 5*v2 -64 <= 0; value: -34 + -2*v0 + 3*v2 -9 = 0; value: 0 + = 0; value: 0 0: 2 4 1: 3 2: 1 3 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + -6*v2 -5*v3 + 13 <= 0; value: -5 + 4*v0 = 0; value: 0 + 3*v1 + 5*v2 -64 <= 0; value: -34 + -2*v0 + 3*v2 -9 = 0; value: 0 + = 0; value: 0 0: 2 4 1: 3 2: 1 3 4 3: 1 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + v1 -6*v3 + 4 <= 0; value: -4 + 4*v1 -1*v3 -18 <= 0; value: -4 + v2 + v3 -18 < 0; value: -11 + -6*v2 -5*v3 -39 < 0; value: -79 + -4*v1 -6*v3 -1 <= 0; value: -29 0: 1: 1 2 5 2: 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 883/2 < 0; value: 891/2 + -4395/4 < 0; value: -4395/4 + -1048 < 0; value: -1048 - v2 + v3 -18 < 0; value: -1 - -1*v2 -129 < 0; value: -1 - -4*v1 -6*v3 -1 <= 0; value: 0 0: 1: 1 2 5 2: 3 4 1 2 3: 1 2 3 4 5 0: 2 -> 2 1: 4 -> -871/4 2: 5 -> -128 3: 2 -> 145 + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 + 6*v3 -17 <= 0; value: -2 + -6*v2 -1*v3 + 8 <= 0; value: -15 + -6*v0 + 2*v1 -6 <= 0; value: -26 + 6*v0 -4*v1 -16 = 0; value: 0 0: 4 5 1: 4 5 2: 1 2 3 3: 1 2 3 optimal: 38/3 + + 38/3 <= 0; value: 38/3 + -3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 + 6*v3 -17 <= 0; value: -2 + -6*v2 -1*v3 + 8 <= 0; value: -15 - -3*v0 -14 <= 0; value: 0 - 6*v0 -4*v1 -16 = 0; value: 0 0: 4 5 1: 4 5 2: 1 2 3 3: 1 2 3 0: 4 -> -14/3 1: 2 -> -11 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 + 3*v2 + 5*v3 -71 < 0; value: -38 + 3*v1 -6*v2 + 6 = 0; value: 0 + 2*v0 + 6*v1 -66 < 0; value: -38 + 4*v1 -46 <= 0; value: -30 + v0 + 3*v1 -6*v2 + 4 = 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 1 2 5 3: 1 optimal: oo + 2*v0 -4*v2 + 4 <= 0; value: -4 + 2*v0 + 3*v2 + 5*v3 -71 < 0; value: -38 - 3*v1 -6*v2 + 6 = 0; value: 0 + 2*v0 + 12*v2 -78 < 0; value: -38 + 8*v2 -54 <= 0; value: -30 + v0 -2 = 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 1 2 5 3 4 3: 1 0: 2 -> 2 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 + 4*v3 <= 0; value: -1 + 3*v2 -3*v3 -9 = 0; value: 0 + -5*v1 -3*v3 -12 <= 0; value: -40 + -5*v0 + 3*v1 -21 <= 0; value: -11 + -1*v0 -3*v1 -3 <= 0; value: -19 0: 1 4 5 1: 3 4 5 2: 2 3: 1 2 3 optimal: oo + 24/5*v2 -6/5 <= 0; value: 18 + -5*v2 -6 <= 0; value: -26 - 3*v2 -3*v3 -9 = 0; value: 0 - 5/3*v0 -3*v3 -7 <= 0; value: 0 + -54/5*v2 -84/5 <= 0; value: -60 - -1*v0 -3*v1 -3 <= 0; value: 0 0: 1 4 5 3 1: 3 4 5 2: 2 1 4 3: 1 2 3 4 0: 1 -> 6 1: 5 -> -3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 -1*v3 -3 < 0; value: -10 + 3*v1 + v2 -5 <= 0; value: 0 + 2*v0 + 2*v2 -6 < 0; value: -2 + -5*v2 + 3*v3 -6 <= 0; value: -1 + -4*v1 + v3 -1 = 0; value: 0 0: 3 1: 2 5 2: 1 2 3 4 3: 1 4 5 optimal: (173/16 -e*1) + + 173/16 < 0; value: 173/16 - -1*v2 -1*v3 -3 < 0; value: -1 + -271/32 < 0; value: -271/32 - 2*v0 + 2*v2 -6 < 0; value: -2 - 8*v0 -39 < 0; value: -8 - -4*v1 + v3 -1 = 0; value: 0 0: 3 2 4 1: 2 5 2: 1 2 3 4 3: 1 4 5 2 0: 0 -> 31/8 1: 1 -> -9/32 2: 2 -> -15/8 3: 5 -> -1/8 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v3 <= 0; value: -9 + 4*v0 + 3*v2 -8 <= 0; value: -5 + v0 + 5*v1 + 3*v3 -26 < 0; value: -12 + 4*v2 + 4*v3 -41 < 0; value: -25 + -3*v0 + 3*v1 -8 <= 0; value: -5 0: 1 2 3 5 1: 3 5 2: 2 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v3 <= 0; value: -9 + 4*v0 + 3*v2 -8 <= 0; value: -5 + v0 + 5*v1 + 3*v3 -26 < 0; value: -12 + 4*v2 + 4*v3 -41 < 0; value: -25 + -3*v0 + 3*v1 -8 <= 0; value: -5 0: 1 2 3 5 1: 3 5 2: 2 4 3: 1 3 4 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -6*v0 + 4*v2 + 2*v3 + 2 <= 0; value: -6 + 6*v0 + v1 -4*v3 -20 = 0; value: 0 + -3*v0 + 1 <= 0; value: -14 + v3 -6 < 0; value: -3 + v2 -6*v3 -5 <= 0; value: -19 0: 1 2 3 1: 2 2: 1 5 3: 1 2 4 5 optimal: oo + 14*v0 -4/3*v2 -100/3 <= 0; value: 94/3 + -6*v0 + 13/3*v2 + 1/3 <= 0; value: -37/3 - 6*v0 + v1 -4*v3 -20 = 0; value: 0 + -3*v0 + 1 <= 0; value: -14 + 1/6*v2 -41/6 < 0; value: -37/6 - v2 -6*v3 -5 <= 0; value: 0 0: 1 2 3 1: 2 2: 1 5 4 3: 1 2 4 5 0: 5 -> 5 1: 2 -> -32/3 2: 4 -> 4 3: 3 -> -1/6 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 -6*v2 -1*v3 -6 < 0; value: -17 + -3*v2 -4*v3 + 22 = 0; value: 0 + -2*v0 + 4*v1 -1 <= 0; value: -5 + 2*v2 + 5*v3 -48 < 0; value: -24 + -3*v1 + 3*v2 -4 <= 0; value: -1 0: 3 1: 1 3 5 2: 1 2 4 5 3: 1 2 4 optimal: oo + 2*v0 + 548/21 < 0; value: 716/21 + -320/21 <= 0; value: -320/21 - -3*v2 -4*v3 + 22 = 0; value: 0 + -2*v0 -1117/21 < 0; value: -1285/21 - 7/3*v3 -100/3 < 0; value: -7/3 - -3*v1 + 3*v2 -4 <= 0; value: 0 0: 3 1: 1 3 5 2: 1 2 4 5 3 3: 1 2 4 3 0: 4 -> 4 1: 1 -> -82/7 2: 2 -> -218/21 3: 4 -> 93/7 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v3 -25 <= 0; value: -14 + -3*v2 + 9 = 0; value: 0 + -6*v2 + 5*v3 + 1 < 0; value: -7 + -1*v0 <= 0; value: 0 + 4*v3 -9 < 0; value: -1 0: 4 1: 1 2: 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v3 -25 <= 0; value: -14 + -3*v2 + 9 = 0; value: 0 + -6*v2 + 5*v3 + 1 < 0; value: -7 + -1*v0 <= 0; value: 0 + 4*v3 -9 < 0; value: -1 0: 4 1: 1 2: 2 3 3: 1 3 5 0: 0 -> 0 1: 1 -> 1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 10 + -6*v2 + 5*v3 -25 <= 0; value: -16 + -4*v0 + 2*v2 -8 <= 0; value: -26 + 5*v0 -5*v2 -1*v3 -17 = 0; value: 0 + v2 -1 <= 0; value: 0 + 5*v1 <= 0; value: 0 0: 2 3 1: 5 2: 1 2 3 4 3: 1 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -6*v2 + 5*v3 -25 <= 0; value: -16 + -4*v0 + 2*v2 -8 <= 0; value: -26 + 5*v0 -5*v2 -1*v3 -17 = 0; value: 0 + v2 -1 <= 0; value: 0 + 5*v1 <= 0; value: 0 0: 2 3 1: 5 2: 1 2 3 4 3: 1 3 0: 5 -> 5 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -4*v3 + 12 <= 0; value: -8 + v1 -4*v2 + v3 -5 <= 0; value: -3 + -2*v0 + v2 + 9 = 0; value: 0 + 2*v0 -3*v1 -13 <= 0; value: -6 + -3*v2 -6*v3 + 21 <= 0; value: -12 0: 3 4 1: 2 4 2: 2 3 5 3: 1 2 5 optimal: oo + 1/3*v2 + 35/3 <= 0; value: 12 + -4*v3 + 12 <= 0; value: -8 + -11/3*v2 + v3 -19/3 <= 0; value: -5 - -2*v0 + v2 + 9 = 0; value: 0 - 2*v0 -3*v1 -13 <= 0; value: 0 + -3*v2 -6*v3 + 21 <= 0; value: -12 0: 3 4 2 1: 2 4 2: 2 3 5 3: 1 2 5 0: 5 -> 5 1: 1 -> -1 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + 5*v1 -32 <= 0; value: -13 + -4*v1 -1*v3 + 2 <= 0; value: -11 + 6*v0 -2*v3 -10 = 0; value: 0 + -1*v1 + 3*v2 + 2 <= 0; value: -1 + 4*v2 + 5*v3 -14 <= 0; value: -9 0: 1 3 1: 1 2 4 2: 4 5 3: 2 3 5 optimal: 19/3 + + 19/3 <= 0; value: 19/3 + -169/6 <= 0; value: -169/6 - -12*v2 -1*v3 -6 <= 0; value: 0 - 6*v0 -2*v3 -10 = 0; value: 0 - -1*v1 + 3*v2 + 2 <= 0; value: 0 - 14*v0 -118/3 <= 0; value: 0 0: 1 3 5 1: 1 2 4 2: 4 5 2 1 3: 2 3 5 1 0: 2 -> 59/21 1: 3 -> -5/14 2: 0 -> -11/14 3: 1 -> 24/7 + 2*v0 -2*v1 <= 0; value: -4 + 6*v3 -16 <= 0; value: -10 + v0 + v1 -2 <= 0; value: 0 + -6*v2 + 25 < 0; value: -5 + -6*v0 + 5*v1 -28 < 0; value: -18 + 2*v0 + 3*v2 -35 < 0; value: -20 0: 2 4 5 1: 2 4 2: 3 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v3 -16 <= 0; value: -10 + v0 + v1 -2 <= 0; value: 0 + -6*v2 + 25 < 0; value: -5 + -6*v0 + 5*v1 -28 < 0; value: -18 + 2*v0 + 3*v2 -35 < 0; value: -20 0: 2 4 5 1: 2 4 2: 3 5 3: 1 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 -5*v3 + 14 < 0; value: -14 + -5*v1 -6*v2 + 34 = 0; value: 0 + -5*v3 -18 <= 0; value: -38 + -2*v0 -3*v2 -2*v3 -1 <= 0; value: -27 + = 0; value: 0 0: 4 1: 1 2 2: 2 4 3: 1 3 4 optimal: oo + 2*v0 + 5/2*v3 -7 < 0; value: 9 - 24/5*v2 -5*v3 -66/5 < 0; value: -24/5 - -5*v1 -6*v2 + 34 = 0; value: 0 + -5*v3 -18 <= 0; value: -38 + -2*v0 -41/8*v3 -37/4 < 0; value: -143/4 + = 0; value: 0 0: 4 1: 1 2 2: 2 4 1 3: 1 3 4 0: 3 -> 3 1: 2 -> -3/10 2: 4 -> 71/12 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 -4*v3 + 1 < 0; value: -15 + 5*v0 + 3*v3 -20 <= 0; value: -6 + -3*v1 -6*v3 + 19 <= 0; value: -5 + -1*v2 + 4*v3 -17 <= 0; value: -5 + -2*v1 + 4 = 0; value: 0 0: 2 1: 1 3 5 2: 4 3: 1 2 3 4 optimal: 7/5 + + 7/5 <= 0; value: 7/5 + -35/3 < 0; value: -35/3 - 5*v0 + 3*v3 -20 <= 0; value: 0 - -6*v3 + 13 <= 0; value: 0 + -1*v2 -25/3 <= 0; value: -25/3 - -2*v1 + 4 = 0; value: 0 0: 2 1: 1 3 5 2: 4 3: 1 2 3 4 0: 1 -> 27/10 1: 2 -> 2 2: 0 -> 0 3: 3 -> 13/6 + 2*v0 -2*v1 <= 0; value: -2 + -1*v3 <= 0; value: 0 + -6*v0 -3*v1 + 2 <= 0; value: -1 + 4*v2 -22 < 0; value: -14 + -1*v0 + 3*v1 -3 = 0; value: 0 + 2*v1 -6*v3 -4 <= 0; value: -2 0: 2 4 1: 2 4 5 2: 3 3: 1 5 optimal: oo + 12*v3 + 2 <= 0; value: 2 + -1*v3 <= 0; value: 0 + -63*v3 -22 <= 0; value: -22 + 4*v2 -22 < 0; value: -14 - -1*v0 + 3*v1 -3 = 0; value: 0 - 2/3*v0 -6*v3 -2 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 3 3: 1 5 2 0: 0 -> 3 1: 1 -> 2 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + 3*v3 -13 = 0; value: 0 + -3*v2 + 6*v3 -24 = 0; value: 0 + -1*v1 -4*v3 + 22 = 0; value: 0 + 2*v3 -14 <= 0; value: -4 + 3*v2 -1*v3 -1 <= 0; value: 0 0: 1: 1 3 2: 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -4 <= 0; value: 0 - -1*v1 + 3*v3 -13 = 0; value: 0 - -3*v2 + 6*v3 -24 = 0; value: 0 - -7/2*v2 + 7 = 0; value: 0 + -4 <= 0; value: -4 + <= 0; value: 0 0: 1: 1 3 2: 2 5 3 4 3: 1 2 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 4*v3 -6 <= 0; value: -2 + -4*v1 + v2 + 2 <= 0; value: -10 + 5*v0 -4*v3 + 1 <= 0; value: -3 + -5*v2 + 4*v3 + 16 = 0; value: 0 + 2*v3 -3 < 0; value: -1 0: 3 1: 2 2: 2 4 3: 1 3 4 5 optimal: (-6/5 -e*1) + -6/5 < 0; value: -6/5 + <= 0; value: 0 - -4*v1 + v2 + 2 <= 0; value: 0 - 5*v0 -4*v3 + 1 <= 0; value: 0 - -5*v2 + 4*v3 + 16 = 0; value: 0 - 5/2*v0 -5/2 < 0; value: -5/4 0: 3 1 5 1: 2 2: 2 4 3: 1 3 4 5 0: 0 -> 1/2 1: 4 -> 59/40 2: 4 -> 39/10 3: 1 -> 7/8 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v2 -2 <= 0; value: 0 + 2*v0 + 3*v3 -12 <= 0; value: -3 + 5*v1 + 2*v2 -15 < 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -1*v3 -2 < 0; value: -5 0: 1 2 1: 1 3 2: 1 3 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v2 -2 <= 0; value: 0 + 2*v0 + 3*v3 -12 <= 0; value: -3 + 5*v1 + 2*v2 -15 < 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -1*v3 -2 < 0; value: -5 0: 1 2 1: 1 3 2: 1 3 3: 2 4 5 0: 0 -> 0 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 + 5*v2 + 4*v3 -78 <= 0; value: -47 + 5*v0 + 5*v3 -20 <= 0; value: 0 + -5*v0 + 6*v1 -35 < 0; value: -23 + 3*v3 -14 <= 0; value: -2 + -1*v0 -6*v2 + 10 <= 0; value: -8 0: 1 2 3 5 1: 3 2: 1 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 + 5*v2 + 4*v3 -78 <= 0; value: -47 + 5*v0 + 5*v3 -20 <= 0; value: 0 + -5*v0 + 6*v1 -35 < 0; value: -23 + 3*v3 -14 <= 0; value: -2 + -1*v0 -6*v2 + 10 <= 0; value: -8 0: 1 2 3 5 1: 3 2: 1 5 3: 1 2 4 0: 0 -> 0 1: 2 -> 2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -6*v2 + 3*v3 + 9 = 0; value: 0 + -3*v1 -2*v2 + 12 = 0; value: 0 + 4*v0 -3*v2 -5*v3 -17 <= 0; value: -11 + 5*v0 -4*v2 -17 <= 0; value: -4 + -5*v3 + 5 = 0; value: 0 0: 3 4 1: 1 2 2: 1 2 3 4 3: 1 3 5 optimal: 38/5 + + 38/5 <= 0; value: 38/5 - 3*v1 -6*v2 + 3*v3 + 9 = 0; value: 0 - -8*v2 + 24 = 0; value: 0 + -39/5 <= 0; value: -39/5 - 5*v0 -29 <= 0; value: 0 - -5*v3 + 5 = 0; value: 0 0: 3 4 1: 1 2 2: 1 2 3 4 3: 1 3 5 2 0: 5 -> 29/5 1: 2 -> 2 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6 <= 0; value: 0 + -3*v0 + 4*v1 + 6*v3 -9 <= 0; value: -2 + -5*v0 + 6*v1 -24 <= 0; value: -15 + v0 + 5*v1 -37 <= 0; value: -14 + -4*v2 + 7 <= 0; value: -5 0: 1 2 3 4 1: 2 3 4 2: 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6 <= 0; value: 0 + -3*v0 + 4*v1 + 6*v3 -9 <= 0; value: -2 + -5*v0 + 6*v1 -24 <= 0; value: -15 + v0 + 5*v1 -37 <= 0; value: -14 + -4*v2 + 7 <= 0; value: -5 0: 1 2 3 4 1: 2 3 4 2: 5 3: 2 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 3*v3 -53 <= 0; value: -34 + -2*v0 -4*v2 -3*v3 + 17 = 0; value: 0 + -4*v0 -3*v2 + 11 = 0; value: 0 + = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 2: 2 3 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 3*v3 -53 <= 0; value: -34 + -2*v0 -4*v2 -3*v3 + 17 = 0; value: 0 + -4*v0 -3*v2 + 11 = 0; value: 0 + = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 2: 2 3 3: 1 2 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -6*v0 -5*v2 + v3 -25 <= 0; value: -73 + -2*v0 -2*v1 -2 < 0; value: -10 + -2*v0 -5*v1 + 8 = 0; value: 0 + -2*v0 -1 <= 0; value: -9 + -5*v2 + 25 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 1 5 3: 1 optimal: oo + 14/5*v0 -16/5 <= 0; value: 8 + -6*v0 -5*v2 + v3 -25 <= 0; value: -73 + -6/5*v0 -26/5 < 0; value: -10 - -2*v0 -5*v1 + 8 = 0; value: 0 + -2*v0 -1 <= 0; value: -9 + -5*v2 + 25 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 1 5 3: 1 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 + v1 + 1 <= 0; value: 0 + -2*v0 -6*v1 + 23 < 0; value: -3 + 3*v2 -3*v3 + 9 = 0; value: 0 + 4*v2 -3*v3 + 9 = 0; value: 0 + 5*v1 -4*v2 -37 < 0; value: -22 0: 1 2 1: 1 2 5 2: 3 4 5 3: 3 4 optimal: oo + 8/3*v0 -23/3 < 0; value: 3 + -4/3*v0 + 29/6 < 0; value: -1/2 - -2*v0 -6*v1 + 23 < 0; value: -3/2 + 3*v2 -3*v3 + 9 = 0; value: 0 + 4*v2 -3*v3 + 9 = 0; value: 0 + -5/3*v0 -4*v2 -107/6 < 0; value: -49/2 0: 1 2 5 1: 1 2 5 2: 3 4 5 3: 3 4 0: 4 -> 4 1: 3 -> 11/4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4 < 0; value: -2 + -5*v0 -6*v3 -2 <= 0; value: -37 + 3*v0 -2*v2 + 6 <= 0; value: -1 + -1*v1 -6*v2 -3*v3 + 8 <= 0; value: -37 + -6*v1 + 5*v3 -73 <= 0; value: -48 0: 1 2 3 1: 4 5 2: 3 4 3: 2 4 5 optimal: (95/3 -e*1) + + 95/3 < 0; value: 95/3 - 4/3*v2 -8 < 0; value: -2/3 - -5*v0 -6*v3 -2 <= 0; value: 0 - 3*v0 -2*v2 + 6 <= 0; value: 0 + -49/6 < 0; value: -49/6 - -6*v1 + 5*v3 -73 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 3 4 1 3: 2 4 5 0: 1 -> 5/3 1: 0 -> -1469/108 2: 5 -> 11/2 3: 5 -> -31/18 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v2 + 3*v3 -34 <= 0; value: -20 + -6*v0 -6*v2 + 2 <= 0; value: -4 + -4*v2 -1 <= 0; value: -5 + = 0; value: 0 + -5*v0 -2*v3 + 4 < 0; value: -4 0: 1 2 5 1: 2: 1 2 3 3: 1 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v2 + 3*v3 -34 <= 0; value: -20 + -6*v0 -6*v2 + 2 <= 0; value: -4 + -4*v2 -1 <= 0; value: -5 + = 0; value: 0 + -5*v0 -2*v3 + 4 < 0; value: -4 0: 1 2 5 1: 2: 1 2 3 3: 1 5 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -6*v2 + 16 <= 0; value: -4 + -6*v0 + 3*v2 + 5*v3 -60 < 0; value: -35 + -4*v1 + 4*v2 < 0; value: -4 + -4*v0 + 4*v2 -1*v3 -3 = 0; value: 0 + v0 + 6*v2 -45 <= 0; value: -19 0: 1 2 4 5 1: 3 2: 1 2 3 4 5 3: 2 4 optimal: (68/9 -e*1) + + 68/9 < 0; value: 68/9 - -4*v0 -3/2*v3 + 23/2 <= 0; value: 0 + -1718/9 < 0; value: -1718/9 - -4*v1 + 4*v2 < 0; value: -16/9 - -4*v0 + 4*v2 -1*v3 -3 = 0; value: 0 - 3*v0 -29 <= 0; value: 0 0: 1 2 4 5 1: 3 2: 1 2 3 4 5 3: 2 4 1 5 0: 2 -> 29/3 1: 5 -> 19/3 2: 4 -> 53/9 3: 5 -> -163/9 + 2*v0 -2*v1 <= 0; value: -6 + 2*v2 -10 < 0; value: -4 + -6*v0 -2*v1 -6*v2 + 8 <= 0; value: -32 + -1*v0 < 0; value: -2 + -1*v2 + 1 < 0; value: -2 + 3*v2 -9 = 0; value: 0 0: 2 3 1: 2 2: 1 2 4 5 3: optimal: oo + 8*v0 + 10 <= 0; value: 26 + -4 < 0; value: -4 - -6*v0 -2*v1 -6*v2 + 8 <= 0; value: 0 + -1*v0 < 0; value: -2 + -2 < 0; value: -2 - 3*v2 -9 = 0; value: 0 0: 2 3 1: 2 2: 1 2 4 5 3: 0: 2 -> 2 1: 5 -> -11 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 6*v3 + 1 <= 0; value: -2 + 4*v0 -6*v3 -8 = 0; value: 0 + v0 -1*v1 -3 = 0; value: 0 + 5*v1 -4*v2 -2 = 0; value: 0 + 4*v2 + 2*v3 -13 <= 0; value: -1 0: 1 2 3 1: 3 4 2: 4 5 3: 1 2 5 optimal: 6 + + 6 <= 0; value: 6 + -3*v0 + 6*v3 + 1 <= 0; value: -2 + 4*v0 -6*v3 -8 = 0; value: 0 - v0 -1*v1 -3 = 0; value: 0 + 5*v0 -4*v2 -17 = 0; value: 0 + 4*v2 + 2*v3 -13 <= 0; value: -1 0: 1 2 3 4 1: 3 4 2: 4 5 3: 1 2 5 0: 5 -> 5 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 + 2*v3 + 2 <= 0; value: 0 + -6*v0 + 2*v1 + 12 = 0; value: 0 + 4*v0 + 6*v3 -32 <= 0; value: -12 + -6*v0 -6*v2 + 42 = 0; value: 0 + -2*v0 -3*v3 + 10 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 4 3: 1 3 5 optimal: 4 + + 4 <= 0; value: 4 - -3*v0 + 2*v3 + 2 <= 0; value: 0 - -6*v0 + 2*v1 + 12 = 0; value: 0 + -12 <= 0; value: -12 + -6*v2 + 30 = 0; value: 0 - -13/3*v3 + 26/3 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 4 3: 1 3 5 4 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 4*v2 + 2*v3 -14 <= 0; value: -8 + -3*v0 + 3*v3 <= 0; value: 0 + -6*v2 + v3 -3 <= 0; value: 0 + 6*v2 <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -14 0: 2 1: 5 2: 1 3 4 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 4*v2 + 2*v3 -14 <= 0; value: -8 + -3*v0 + 3*v3 <= 0; value: 0 + -6*v2 + v3 -3 <= 0; value: 0 + 6*v2 <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -14 0: 2 1: 5 2: 1 3 4 5 3: 1 2 3 0: 3 -> 3 1: 5 -> 5 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -6*v0 -2*v2 + 25 < 0; value: -3 + 6*v0 -3*v2 -1*v3 + 2 = 0; value: 0 + 2*v0 -11 <= 0; value: -5 + 2*v0 + 4*v1 -26 = 0; value: 0 + -4*v0 + 5*v1 -26 <= 0; value: -13 0: 1 2 3 4 5 1: 4 5 2: 1 2 3: 2 optimal: 7/2 + + 7/2 <= 0; value: 7/2 + -2*v2 -8 < 0; value: -18 - 6*v0 -3*v2 -1*v3 + 2 = 0; value: 0 - v2 + 1/3*v3 -35/3 <= 0; value: 0 - 2*v0 + 4*v1 -26 = 0; value: 0 + -117/4 <= 0; value: -117/4 0: 1 2 3 4 5 1: 4 5 2: 1 2 3 5 3: 2 3 1 5 0: 3 -> 11/2 1: 5 -> 15/4 2: 5 -> 5 3: 5 -> 20 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 3*v1 -32 = 0; value: 0 + -5*v1 + 20 = 0; value: 0 + -5*v0 -16 <= 0; value: -41 + -2*v0 + 4*v1 + 5*v2 -6 <= 0; value: 0 + 3*v1 -6*v2 -6*v3 -3 < 0; value: -9 0: 1 3 4 1: 1 2 4 5 2: 4 5 3: 5 optimal: 2 + + 2 <= 0; value: 2 - 4*v0 + 3*v1 -32 = 0; value: 0 - 20/3*v0 -100/3 = 0; value: 0 + -41 <= 0; value: -41 + 5*v2 <= 0; value: 0 + -6*v2 -6*v3 + 9 < 0; value: -9 0: 1 3 4 2 5 1: 1 2 4 5 2: 4 5 3: 5 0: 5 -> 5 1: 4 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 = 0; value: 0 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 2*v1 -2*v3 <= 0; value: 0 + 3*v2 -1*v3 -28 <= 0; value: -17 + -6*v0 + v3 -1 = 0; value: 0 0: 1 5 1: 2 3 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 = 0; value: 0 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 2*v1 -2*v3 <= 0; value: 0 + 3*v2 -1*v3 -28 <= 0; value: -17 + -6*v0 + v3 -1 = 0; value: 0 0: 1 5 1: 2 3 2: 2 4 3: 3 4 5 0: 0 -> 0 1: 1 -> 1 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -17 < 0; value: -11 + -4*v0 -5*v2 + 3*v3 + 10 = 0; value: 0 + <= 0; value: 0 + 3*v1 -3*v3 = 0; value: 0 + -3*v1 -2*v2 + 5 = 0; value: 0 0: 1 2 1: 4 5 2: 2 5 3: 2 4 optimal: (412/63 -e*1) + + 412/63 < 0; value: 412/63 - 3*v0 -17 < 0; value: -3 - -4*v0 -5*v2 + 3*v3 + 10 = 0; value: 0 + <= 0; value: 0 - 3*v1 -3*v3 = 0; value: 0 - -4*v0 -7*v2 + 15 = 0; value: 0 0: 1 2 5 1: 4 5 2: 2 5 3: 2 4 5 0: 2 -> 14/3 1: 1 -> 127/63 2: 1 -> -11/21 3: 1 -> 127/63 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 6*v1 -2*v2 + 2 = 0; value: 0 + -6*v0 -2*v1 + v2 -6 <= 0; value: -16 + -4*v0 -6 <= 0; value: -14 + 3*v0 + v2 + 4*v3 -69 <= 0; value: -39 0: 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 optimal: oo + -8/3*v3 + 124/3 <= 0; value: 28 - -1/3*v2 + 4/3 <= 0; value: 0 - 6*v1 -2*v2 + 2 = 0; value: 0 + 8*v3 -134 <= 0; value: -94 + 16/3*v3 -278/3 <= 0; value: -66 - 3*v0 + 4*v3 -65 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 3 4 0: 2 -> 15 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 + 4*v3 -46 < 0; value: -19 + -4*v2 + 3*v3 + 2 <= 0; value: -1 + v1 -2 <= 0; value: -1 + 2*v0 -3*v3 + 3 <= 0; value: -2 + 4*v3 -12 = 0; value: 0 0: 4 1: 3 2: 1 2 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 + 4*v3 -46 < 0; value: -19 + -4*v2 + 3*v3 + 2 <= 0; value: -1 + v1 -2 <= 0; value: -1 + 2*v0 -3*v3 + 3 <= 0; value: -2 + 4*v3 -12 = 0; value: 0 0: 4 1: 3 2: 1 2 3: 1 2 4 5 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -5*v2 + v3 <= 0; value: -1 + -2*v1 -5*v2 + 3*v3 -5 < 0; value: -20 + 6*v1 -6*v2 <= 0; value: 0 + 3*v2 + 3*v3 -35 <= 0; value: -20 + -4*v1 -4*v2 + 23 <= 0; value: -1 0: 1: 1 2 3 5 2: 1 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v3 + 71/6 <= 0; value: 83/6 + 10*v3 -82 <= 0; value: -62 + 6*v3 -103/2 < 0; value: -79/2 + 12*v3 -211/2 <= 0; value: -163/2 - 3*v2 + 3*v3 -35 <= 0; value: 0 - -4*v1 -4*v2 + 23 <= 0; value: 0 0: 1: 1 2 3 5 2: 1 2 3 4 5 3: 1 2 4 3 0: 3 -> 3 1: 3 -> -47/12 2: 3 -> 29/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + v1 -20 < 0; value: -13 + 2*v0 -2*v1 -1 < 0; value: -3 + -2*v2 -3*v3 -18 <= 0; value: -38 + 6*v1 -3*v2 -6 = 0; value: 0 + 6*v2 -4*v3 -16 < 0; value: -8 0: 1 2 1: 1 2 4 2: 3 4 5 3: 3 5 optimal: (1 -e*1) + + 1 < 0; value: 1 + 3*v0 -41/2 < 0; value: -29/2 - 2*v0 -1*v2 -3 < 0; value: -1 + -4*v0 -3*v3 -12 <= 0; value: -32 - 6*v1 -3*v2 -6 = 0; value: 0 + 12*v0 -4*v3 -34 < 0; value: -26 0: 1 2 3 5 1: 1 2 4 2: 3 4 5 2 1 3: 3 5 0: 2 -> 2 1: 3 -> 2 2: 4 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 5*v2 -2*v3 <= 0; value: -8 + -3*v1 + 5*v2 + 6 <= 0; value: -3 + -2*v2 + 3*v3 -35 <= 0; value: -23 + 3*v2 = 0; value: 0 + v1 + v2 -1*v3 + 1 <= 0; value: 0 0: 1: 2 5 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + -2*v3 <= 0; value: -8 - -3*v1 + 5*v2 + 6 <= 0; value: 0 + 3*v3 -35 <= 0; value: -23 - 3*v2 = 0; value: 0 + -1*v3 + 3 <= 0; value: -1 0: 1: 2 5 2: 1 2 3 4 5 3: 1 3 5 0: 0 -> 0 1: 3 -> 2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v1 + 6*v3 -3 = 0; value: 0 + 3*v0 + 6*v2 -33 = 0; value: 0 + -4*v0 -3*v2 + 9 <= 0; value: -10 + -5*v2 + 8 < 0; value: -17 + 5*v0 -1*v2 + v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2: 2 3 4 5 3: 1 5 optimal: oo + -1*v0 -6*v3 + 3 <= 0; value: 2 - 3*v0 -2*v1 + 6*v3 -3 = 0; value: 0 + 3*v0 + 6*v2 -33 = 0; value: 0 + -4*v0 -3*v2 + 9 <= 0; value: -10 + -5*v2 + 8 < 0; value: -17 + 5*v0 -1*v2 + v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2: 2 3 4 5 3: 1 5 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 3*v1 + 3 <= 0; value: 0 + -2*v2 -3 <= 0; value: -7 + 6*v0 + 4*v3 -17 < 0; value: -11 + 2*v1 -5*v2 -2*v3 + 5 < 0; value: -3 + 4*v1 + 3*v3 -4 = 0; value: 0 0: 1 3 1: 1 4 5 2: 2 4 3: 3 4 5 optimal: (33/7 -e*1) + + 33/7 < 0; value: 33/7 - -21/8*v0 -57/16 < 0; value: -21/8 + -2*v2 -3 <= 0; value: -7 - 6*v0 + 4*v3 -17 < 0; value: -4 + -5*v2 -15 < 0; value: -25 - 4*v1 + 3*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 4 5 2: 2 4 3: 3 4 5 1 0: 1 -> -5/14 1: 1 -> -103/56 2: 2 -> 2 3: 0 -> 53/14 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 6 <= 0; value: -6 + 6*v1 -5*v2 -2 <= 0; value: -1 + -5*v0 + 5*v1 -1*v2 + 3 <= 0; value: -8 + 5*v0 + 6*v1 -47 <= 0; value: -26 + -1*v0 + 6*v1 + 2*v2 -5 = 0; value: 0 0: 1 3 4 5 1: 2 3 4 5 2: 2 3 5 3: optimal: oo + 5/3*v0 + 2/3*v2 -5/3 <= 0; value: 4 + -4*v0 + 6 <= 0; value: -6 + v0 -7*v2 + 3 <= 0; value: -1 + -25/6*v0 -8/3*v2 + 43/6 <= 0; value: -8 + 6*v0 -2*v2 -42 <= 0; value: -26 - -1*v0 + 6*v1 + 2*v2 -5 = 0; value: 0 0: 1 3 4 5 2 1: 2 3 4 5 2: 2 3 5 4 3: 0: 3 -> 3 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4*v1 <= 0; value: -2 + v1 -2*v3 < 0; value: -4 + 2*v0 -5*v2 -11 <= 0; value: -30 + -2*v3 + 6 = 0; value: 0 + 6*v1 -1*v3 -23 <= 0; value: -14 0: 1 3 1: 1 2 5 2: 3 3: 2 4 5 optimal: 26/3 + + 26/3 <= 0; value: 26/3 - 2*v0 -4*v1 <= 0; value: 0 + -5/3 < 0; value: -5/3 + -5*v2 + 19/3 <= 0; value: -56/3 - -2*v3 + 6 = 0; value: 0 - 3*v0 -1*v3 -23 <= 0; value: 0 0: 1 3 2 5 1: 1 2 5 2: 3 3: 2 4 5 3 0: 3 -> 26/3 1: 2 -> 13/3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -1*v1 -4*v3 + 12 < 0; value: -5 + v2 + 3*v3 -32 <= 0; value: -12 + -5*v0 + 5*v3 -23 < 0; value: -3 + -4*v0 + 2*v2 -12 <= 0; value: -6 + 6*v0 -4*v3 -4 < 0; value: -18 0: 1 3 4 5 1: 1 2: 2 4 3: 1 2 3 5 optimal: (64/5 -e*1) + + 64/5 < 0; value: 64/5 - 5*v0 -1*v1 -4*v3 + 12 < 0; value: -1 + 3*v0 + v2 -91/5 <= 0; value: -51/5 - -5*v0 + 5*v3 -23 < 0; value: -3/2 + -4*v0 + 2*v2 -12 <= 0; value: -6 + 2*v0 -112/5 < 0; value: -102/5 0: 1 3 4 5 2 1: 1 2: 2 4 3: 1 2 3 5 0: 1 -> 1 1: 2 -> -16/5 2: 5 -> 5 3: 5 -> 53/10 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 4*v1 -6 = 0; value: 0 + 5*v1 + 5*v3 -25 = 0; value: 0 + -6*v0 -1*v3 -11 <= 0; value: -26 + 3*v1 -6 = 0; value: 0 + 2*v0 + 4*v1 -12 <= 0; value: 0 0: 1 3 5 1: 1 2 4 5 2: 3: 2 3 optimal: 0 + <= 0; value: 0 - -1*v0 + 4*v1 -6 = 0; value: 0 + 5*v3 -15 = 0; value: 0 + -1*v3 -23 <= 0; value: -26 + = 0; value: 0 - 3*v0 -6 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 4 5 2: 3: 2 3 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + 5*v2 -4*v3 -11 = 0; value: 0 + -1*v2 -1*v3 + 4 <= 0; value: 0 + v0 + 3*v1 -44 <= 0; value: -29 + -6*v2 -3*v3 + 12 < 0; value: -9 + v0 -6*v3 -5 < 0; value: -11 0: 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 5*v2 -4*v3 -11 = 0; value: 0 + -1*v2 -1*v3 + 4 <= 0; value: 0 + v0 + 3*v1 -44 <= 0; value: -29 + -6*v2 -3*v3 + 12 < 0; value: -9 + v0 -6*v3 -5 < 0; value: -11 0: 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -41 <= 0; value: -21 + -6*v0 + 2*v1 -4*v2 + 40 = 0; value: 0 + 3*v1 -5*v2 -1 < 0; value: -11 + 6*v2 -2*v3 -37 <= 0; value: -15 + -3*v0 + 6*v1 + 5*v3 -70 <= 0; value: -35 0: 1 2 5 1: 2 3 5 2: 2 3 4 3: 4 5 optimal: oo + -4*v0 -4*v2 + 40 <= 0; value: 0 + 4*v0 -41 <= 0; value: -21 - -6*v0 + 2*v1 -4*v2 + 40 = 0; value: 0 + 9*v0 + v2 -61 < 0; value: -11 + 6*v2 -2*v3 -37 <= 0; value: -15 + 15*v0 + 12*v2 + 5*v3 -190 <= 0; value: -35 0: 1 2 5 3 1: 2 3 5 2: 2 3 4 5 3: 4 5 0: 5 -> 5 1: 5 -> 5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 -4*v2 + 21 <= 0; value: -1 + 5*v2 -20 = 0; value: 0 + -5*v0 + 5*v2 -14 <= 0; value: -4 + 6*v2 -6*v3 -49 < 0; value: -31 + v0 -6*v1 -5*v2 + 23 <= 0; value: -13 0: 3 5 1: 1 5 2: 1 2 3 4 5 3: 4 optimal: 19 + + 19 <= 0; value: 19 - -2*v1 -4*v2 + 21 <= 0; value: 0 - 5*v2 -20 = 0; value: 0 + -54 <= 0; value: -54 + -6*v3 -25 < 0; value: -31 - v0 -12 <= 0; value: 0 0: 3 5 1: 1 5 2: 1 2 3 4 5 3: 4 0: 2 -> 12 1: 3 -> 5/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -10 <= 0; value: -35 + -5*v2 + 25 = 0; value: 0 + 6*v0 + 2*v1 -23 < 0; value: -15 + -3*v0 <= 0; value: 0 + -3*v2 -1*v3 -11 <= 0; value: -30 0: 1 3 4 1: 3 2: 1 2 5 3: 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -10 <= 0; value: -35 + -5*v2 + 25 = 0; value: 0 + 6*v0 + 2*v1 -23 < 0; value: -15 + -3*v0 <= 0; value: 0 + -3*v2 -1*v3 -11 <= 0; value: -30 0: 1 3 4 1: 3 2: 1 2 5 3: 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -2*v1 <= 0; value: 0 + -5*v2 + 20 = 0; value: 0 + 2*v1 -1*v2 -6 = 0; value: 0 + -5*v0 -6*v2 + v3 -19 <= 0; value: -51 + -6*v2 -3*v3 + 14 < 0; value: -16 0: 1 4 1: 1 3 2: 2 3 4 5 3: 4 5 optimal: -6 + -6 <= 0; value: -6 - 5*v0 -2*v1 <= 0; value: 0 - -5*v2 + 20 = 0; value: 0 - 5*v0 -1*v2 -6 = 0; value: 0 + v3 -53 <= 0; value: -51 + -3*v3 -10 < 0; value: -16 0: 1 4 3 1: 1 3 2: 2 3 4 5 3: 4 5 0: 2 -> 2 1: 5 -> 5 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 4*v1 -27 <= 0; value: -10 + 3*v1 -1*v3 -6 <= 0; value: 0 + 3*v0 + 4*v2 + 2*v3 -25 = 0; value: 0 + -3*v0 -1*v1 + 3*v2 -6 = 0; value: 0 + 2*v1 -6*v2 + v3 + 5 <= 0; value: -10 0: 1 3 4 1: 1 2 4 5 2: 3 4 5 3: 2 3 5 optimal: oo + 61/2*v0 -9/2 <= 0; value: 26 + -52*v0 -18 <= 0; value: -70 + -195/4*v0 -25/4 <= 0; value: -55 - 3*v0 + 4*v2 + 2*v3 -25 = 0; value: 0 - -3*v0 -1*v1 + 3*v2 -6 = 0; value: 0 - -6*v0 + v3 -7 <= 0; value: 0 0: 1 3 4 2 5 1: 1 2 4 5 2: 3 4 5 1 2 3: 2 3 5 1 0: 1 -> 1 1: 3 -> -12 2: 4 -> -1 3: 3 -> 13 + 2*v0 -2*v1 <= 0; value: -2 + -5*v1 -5*v2 + 9 <= 0; value: -21 + 3*v0 -7 < 0; value: -4 + 3*v2 -2*v3 -7 <= 0; value: -1 + -5*v2 -6*v3 + 38 = 0; value: 0 + 4*v0 + 4*v3 -47 <= 0; value: -31 0: 2 5 1: 1 2: 1 3 4 3: 3 4 5 optimal: (997/105 -e*1) + + 997/105 < 0; value: 997/105 - -5*v1 -5*v2 + 9 <= 0; value: 0 - 3*v0 -7 < 0; value: -2 - -28/5*v3 + 79/5 <= 0; value: 0 - -5*v2 -6*v3 + 38 = 0; value: 0 + -554/21 <= 0; value: -554/21 0: 2 5 1: 1 2: 1 3 4 3: 3 4 5 0: 1 -> 5/3 1: 2 -> -169/70 2: 4 -> 59/14 3: 3 -> 79/28 + 2*v0 -2*v1 <= 0; value: 6 + 5*v3 -13 < 0; value: -3 + -3*v2 + 6 = 0; value: 0 + 5*v1 -6*v3 -5 < 0; value: -12 + 6*v2 + 3*v3 -44 <= 0; value: -26 + v1 + 2*v2 -5 = 0; value: 0 0: 1: 3 5 2: 2 4 5 3: 1 3 4 optimal: oo + 2*v0 -2 <= 0; value: 6 + 5*v3 -13 < 0; value: -3 - -3*v2 + 6 = 0; value: 0 + -6*v3 < 0; value: -12 + 3*v3 -32 <= 0; value: -26 - v1 + 2*v2 -5 = 0; value: 0 0: 1: 3 5 2: 2 4 5 3 3: 1 3 4 0: 4 -> 4 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -3*v3 -6 < 0; value: -21 + -1*v2 <= 0; value: -3 + 3*v1 -6*v2 -5*v3 + 5 <= 0; value: -29 + 2*v1 + v3 -29 <= 0; value: -18 + 4*v1 -6*v3 + 1 <= 0; value: -17 0: 1: 3 4 5 2: 2 3 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -3*v3 -6 < 0; value: -21 + -1*v2 <= 0; value: -3 + 3*v1 -6*v2 -5*v3 + 5 <= 0; value: -29 + 2*v1 + v3 -29 <= 0; value: -18 + 4*v1 -6*v3 + 1 <= 0; value: -17 0: 1: 3 4 5 2: 2 3 3: 1 3 4 5 0: 4 -> 4 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 6*v2 -43 <= 0; value: -25 + 3*v0 + 3*v1 -32 <= 0; value: -17 + 5*v1 + v2 -18 <= 0; value: -4 + 3*v1 + v2 -16 < 0; value: -6 + -1*v0 + 3 = 0; value: 0 0: 1 2 5 1: 2 3 4 2: 1 3 4 3: optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 6*v2 -43 <= 0; value: -25 + 3*v0 + 3*v1 -32 <= 0; value: -17 + 5*v1 + v2 -18 <= 0; value: -4 + 3*v1 + v2 -16 < 0; value: -6 + -1*v0 + 3 = 0; value: 0 0: 1 2 5 1: 2 3 4 2: 1 3 4 3: 0: 3 -> 3 1: 2 -> 2 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 5*v2 -37 <= 0; value: -17 + -4*v0 -2*v2 -6 <= 0; value: -18 + 3*v0 -4*v2 + 5*v3 -4 < 0; value: -17 + -3*v3 <= 0; value: 0 + -1*v0 -1*v1 + 5 <= 0; value: -1 0: 2 3 5 1: 5 2: 1 2 3 3: 3 4 optimal: (174/5 -e*1) + + 174/5 < 0; value: 174/5 - 5*v2 -37 <= 0; value: 0 + -328/5 < 0; value: -328/5 - 3*v0 -4*v2 + 5*v3 -4 < 0; value: -3 - -3*v3 <= 0; value: 0 - -1*v0 -1*v1 + 5 <= 0; value: 0 0: 2 3 5 1: 5 2: 1 2 3 3: 3 4 2 0: 1 -> 51/5 1: 5 -> -26/5 2: 4 -> 37/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -4*v1 + 2*v2 -23 < 0; value: -13 + 6*v1 -2*v2 -1 <= 0; value: -11 + 5*v1 + 6*v2 + v3 -73 <= 0; value: -39 + -2*v0 -5*v1 + 10 <= 0; value: 0 + -3*v1 + 6*v2 + 2*v3 -39 <= 0; value: -1 0: 4 1: 1 2 3 4 5 2: 1 2 3 5 3: 3 5 optimal: oo + -7/2*v2 + 201/4 < 0; value: 131/4 - -6*v2 -8/3*v3 + 29 < 0; value: -8/3 + v2 -71/2 < 0; value: -61/2 + 25/4*v2 -727/8 < 0; value: -477/8 - -2*v0 -5*v1 + 10 <= 0; value: 0 - 6/5*v0 + 6*v2 + 2*v3 -45 <= 0; value: 0 0: 4 1 5 2 3 1: 1 2 3 4 5 2: 1 2 3 5 3: 3 5 1 2 0: 5 -> 275/24 1: 0 -> -31/12 2: 5 -> 5 3: 4 -> 5/8 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 6*v1 -6 = 0; value: 0 + 4*v1 + v3 -7 = 0; value: 0 + v2 + 6*v3 -46 <= 0; value: -25 + 6*v2 + 5*v3 -85 <= 0; value: -52 + v1 + v2 + 3*v3 -13 = 0; value: 0 0: 1 1: 1 2 5 2: 3 4 5 3: 2 3 4 5 optimal: 84/13 + + 84/13 <= 0; value: 84/13 - 5*v0 + 6*v1 -6 = 0; value: 0 - -10/3*v0 + v3 -3 = 0; value: 0 - -13/11*v2 -236/11 <= 0; value: 0 + -1826/13 <= 0; value: -1826/13 - v2 + 11/4*v3 -45/4 = 0; value: 0 0: 1 2 5 1: 1 2 5 2: 3 4 5 3: 2 3 4 5 0: 0 -> 30/13 1: 1 -> -12/13 2: 3 -> -236/13 3: 3 -> 139/13 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 -28 < 0; value: -58 + -3*v0 + 3*v3 + 9 <= 0; value: 0 + 2*v0 + 4*v2 -19 <= 0; value: -3 + 6*v0 + 3*v3 -27 = 0; value: 0 + -2*v0 + v2 -4 <= 0; value: -10 0: 2 3 4 5 1: 1 2: 3 5 3: 2 4 optimal: oo + -4*v2 + 85/3 < 0; value: 61/3 - -6*v1 -28 < 0; value: -6 + 18*v2 -99/2 <= 0; value: -27/2 - 4*v2 -1*v3 -10 <= 0; value: 0 - 6*v0 + 3*v3 -27 = 0; value: 0 + 5*v2 -23 <= 0; value: -13 0: 2 3 4 5 1: 1 2: 3 5 2 3: 2 4 3 5 0: 4 -> 11/2 1: 5 -> -11/3 2: 2 -> 2 3: 1 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + -6*v3 -3 <= 0; value: -9 + 5*v0 -5*v1 + 3*v3 -3 <= 0; value: -10 + -4*v0 + 4*v2 -6*v3 -3 < 0; value: -9 + -1*v1 + 4*v2 -1 < 0; value: -3 + 4*v2 <= 0; value: 0 0: 2 3 1: 2 4 2: 3 4 5 3: 1 2 3 optimal: (9/5 -e*1) + + 9/5 < 0; value: 9/5 - 4*v0 -4*v2 <= 0; value: 0 - 5*v0 -5*v1 + 3*v3 -3 <= 0; value: 0 - -4*v0 + 4*v2 -6*v3 -3 < 0; value: -9/2 + 3*v0 -1/10 <= 0; value: -1/10 + 4*v0 <= 0; value: 0 0: 2 3 4 1 5 1: 2 4 2: 3 4 5 1 3: 1 2 3 4 0: 0 -> 0 1: 2 -> -9/20 2: 0 -> 0 3: 1 -> 1/4 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 + 5*v2 -9 < 0; value: -4 + 3*v2 -1*v3 -7 < 0; value: -4 + 6*v1 -52 <= 0; value: -28 + 2*v0 + 5*v2 -14 <= 0; value: -9 + -3*v1 + 2 < 0; value: -10 0: 1 4 1: 3 5 2: 1 2 4 3: 2 optimal: oo + -5*v2 + 38/3 < 0; value: 23/3 + 15/2*v2 -16 < 0; value: -17/2 + 3*v2 -1*v3 -7 < 0; value: -4 + -48 < 0; value: -48 - 2*v0 + 5*v2 -14 <= 0; value: 0 - -3*v1 + 2 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 4 3: 2 0: 0 -> 9/2 1: 4 -> 5/3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 + 4*v1 -47 <= 0; value: -29 + -4*v1 + 6*v2 -3*v3 -27 <= 0; value: -8 + -1*v0 + 6*v2 -41 <= 0; value: -13 + -2*v0 -6*v1 + 4*v3 + 11 < 0; value: -1 + -6*v1 + v2 + 3 <= 0; value: -4 0: 1 3 4 1: 1 2 4 5 2: 2 3 5 3: 2 4 optimal: oo + 2*v0 -1/3*v2 -1 < 0; value: 4/3 + 5*v0 + 2/3*v2 -45 < 0; value: -95/3 + -3/2*v0 + 55/12*v2 -23 <= 0; value: -37/12 + -1*v0 + 6*v2 -41 <= 0; value: -13 - -2*v0 -6*v1 + 4*v3 + 11 < 0; value: -2 - 2*v0 + v2 -4*v3 -8 <= 0; value: 0 0: 1 3 4 2 5 1: 1 2 4 5 2: 2 3 5 1 3: 2 4 5 1 0: 2 -> 2 1: 2 -> 5/3 2: 5 -> 5 3: 1 -> 1/4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -1*v1 + 5*v2 <= 0; value: 0 + -6*v0 + 5*v3 + 1 <= 0; value: -2 + v3 -7 <= 0; value: -4 + -5*v0 + 4*v1 + 7 = 0; value: 0 + -6*v1 -5 < 0; value: -17 0: 1 2 4 1: 1 4 5 2: 1 3: 2 3 optimal: (47/15 -e*1) + + 47/15 < 0; value: 47/15 - -6*v0 -1*v1 + 5*v2 <= 0; value: 0 - -6*v0 + 5*v3 + 1 <= 0; value: 0 + -158/25 < 0; value: -158/25 - -29*v0 + 20*v2 + 7 = 0; value: 0 - -25/4*v3 + 17/4 < 0; value: -25/4 0: 1 2 4 5 1: 1 4 5 2: 1 4 5 3: 2 3 5 0: 3 -> 47/30 1: 2 -> 5/24 2: 4 -> 1153/600 3: 3 -> 42/25 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v3 -3 <= 0; value: -1 + 2*v0 + 6*v2 + 3*v3 -40 < 0; value: -17 + -3*v3 + 7 <= 0; value: -8 + 2*v0 + 6*v2 -4*v3 + 12 = 0; value: 0 + -3*v0 + 3*v2 + 12 = 0; value: 0 0: 1 2 4 5 1: 2: 2 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v3 -3 <= 0; value: -1 + 2*v0 + 6*v2 + 3*v3 -40 < 0; value: -17 + -3*v3 + 7 <= 0; value: -8 + 2*v0 + 6*v2 -4*v3 + 12 = 0; value: 0 + -3*v0 + 3*v2 + 12 = 0; value: 0 0: 1 2 4 5 1: 2: 2 4 5 3: 1 2 3 4 0: 4 -> 4 1: 3 -> 3 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -11 + -1*v0 -1*v3 -1 <= 0; value: -6 + -5*v1 -6*v2 + 50 = 0; value: 0 + 6*v1 -28 <= 0; value: -4 0: 3 1: 2 4 5 2: 2 4 3: 3 optimal: oo + 2*v0 + 12/5*v2 -20 <= 0; value: -2 + <= 0; value: 0 + -7/5*v2 -4 < 0; value: -11 + -1*v0 -1*v3 -1 <= 0; value: -6 - -5*v1 -6*v2 + 50 = 0; value: 0 + -36/5*v2 + 32 <= 0; value: -4 0: 3 1: 2 4 5 2: 2 4 5 3: 3 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 5*v3 -23 <= 0; value: -7 + 2*v1 + 5*v2 -12 = 0; value: 0 + 5*v0 + 4*v2 -68 <= 0; value: -45 + -5*v0 -3*v3 + 5 <= 0; value: -16 + 6*v0 + 2*v3 -61 <= 0; value: -39 0: 1 3 4 5 1: 2 2: 2 3 3: 1 4 5 optimal: 1574/19 + + 1574/19 <= 0; value: 1574/19 - 19/5*v3 -21 <= 0; value: 0 - 2*v1 + 5*v2 -12 = 0; value: 0 - 5*v0 + 4*v2 -68 <= 0; value: 0 - -5*v0 -3*v3 + 5 <= 0; value: 0 + -1213/19 <= 0; value: -1213/19 0: 1 3 4 5 1: 2 2: 2 3 3: 1 4 5 0: 3 -> -44/19 1: 1 -> -831/19 2: 2 -> 378/19 3: 2 -> 105/19 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v3 -11 <= 0; value: -7 + v0 + v1 + v2 -14 <= 0; value: -8 + = 0; value: 0 + 2*v0 + v1 + 2*v3 -15 <= 0; value: -9 + -2*v2 -2*v3 -8 <= 0; value: -18 0: 1 2 4 1: 2 4 2: 2 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v3 -11 <= 0; value: -7 + v0 + v1 + v2 -14 <= 0; value: -8 + = 0; value: 0 + 2*v0 + v1 + 2*v3 -15 <= 0; value: -9 + -2*v2 -2*v3 -8 <= 0; value: -18 0: 1 2 4 1: 2 4 2: 2 5 3: 1 4 5 0: 2 -> 2 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 + 4 <= 0; value: -14 + v1 -6*v2 -4 <= 0; value: 0 + -5*v0 + 2*v2 + 6*v3 -13 = 0; value: 0 + 3*v2 <= 0; value: 0 + 4*v0 + 6*v1 -6*v2 -41 < 0; value: -13 0: 3 5 1: 2 5 2: 2 3 4 5 3: 1 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 + 4 <= 0; value: -14 + v1 -6*v2 -4 <= 0; value: 0 + -5*v0 + 2*v2 + 6*v3 -13 = 0; value: 0 + 3*v2 <= 0; value: 0 + 4*v0 + 6*v1 -6*v2 -41 < 0; value: -13 0: 3 5 1: 2 5 2: 2 3 4 5 3: 1 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + v0 + 3*v1 -15 = 0; value: 0 + -6*v0 + 4*v2 <= 0; value: 0 + 5*v0 -5*v2 = 0; value: 0 + -2*v1 -4*v2 + 2*v3 + 2 = 0; value: 0 + 4*v1 -38 < 0; value: -18 0: 1 2 3 1: 1 4 5 2: 2 3 4 3: 4 optimal: oo + 8/5*v3 -82/5 <= 0; value: -10 - v0 + 3*v1 -15 = 0; value: 0 + -6/5*v3 + 24/5 <= 0; value: 0 - 5*v0 -5*v2 = 0; value: 0 - -10/3*v2 + 2*v3 -8 = 0; value: 0 + -4/5*v3 -74/5 < 0; value: -18 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 4 2 5 0: 0 -> 0 1: 5 -> 5 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 -5*v2 -2*v3 + 21 = 0; value: 0 + -6*v1 -4*v2 + 4*v3 -8 < 0; value: -24 + -2*v0 + 2*v1 -6*v3 -6 <= 0; value: -16 + 3*v0 -5 <= 0; value: -2 + 3*v0 -3 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3: 1 2 3 optimal: (534/25 -e*1) + + 534/25 < 0; value: 534/25 - -1*v1 -5*v2 -2*v3 + 21 = 0; value: 0 - 26*v2 + 16*v3 -134 < 0; value: -16 - -2*v0 + 25/4*v2 -191/4 < 0; value: -25/4 + -2 <= 0; value: -2 - 3*v0 -3 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3 3: 1 2 3 0: 1 -> 1 1: 2 -> -593/100 2: 3 -> 174/25 3: 2 -> -787/200 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 5*v3 -81 <= 0; value: -42 + 3*v0 + 6*v2 -36 = 0; value: 0 + -1*v1 -2*v3 -5 <= 0; value: -15 + v0 -5*v1 + 16 = 0; value: 0 + 6*v0 -6*v2 -3*v3 + 9 = 0; value: 0 0: 2 4 5 1: 1 3 4 2: 2 5 3: 1 3 5 optimal: 112/27 + + 112/27 <= 0; value: 112/27 - 27/5*v3 -291/5 <= 0; value: 0 - 3*v0 + 6*v2 -36 = 0; value: 0 + -839/27 <= 0; value: -839/27 - v0 -5*v1 + 16 = 0; value: 0 - -18*v2 -3*v3 + 81 = 0; value: 0 0: 2 4 5 3 1 1: 1 3 4 2: 2 5 1 3 3: 1 3 5 0: 4 -> 178/27 1: 4 -> 122/27 2: 4 -> 73/27 3: 3 -> 97/9 + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 <= 0; value: 0 + -4*v0 -4*v3 -2 <= 0; value: -18 + 5*v1 -5*v2 -1*v3 -2 <= 0; value: -1 + 5*v0 <= 0; value: 0 + 5*v3 -29 <= 0; value: -9 0: 1 2 4 1: 3 2: 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 <= 0; value: 0 + -4*v0 -4*v3 -2 <= 0; value: -18 + 5*v1 -5*v2 -1*v3 -2 <= 0; value: -1 + 5*v0 <= 0; value: 0 + 5*v3 -29 <= 0; value: -9 0: 1 2 4 1: 3 2: 3 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 4*v1 -3*v3 -61 <= 0; value: -39 + -6*v0 -5*v1 -3*v3 + 18 <= 0; value: -27 + 4*v1 -4*v3 -22 <= 0; value: -10 + -1*v0 -2*v3 -1 < 0; value: -6 + 5*v1 -39 < 0; value: -24 0: 1 2 4 1: 1 2 3 5 2: 3: 1 2 3 4 optimal: oo + 22/5*v0 + 6/5*v3 -36/5 <= 0; value: 74/5 + -14/5*v0 -27/5*v3 -233/5 <= 0; value: -303/5 - -6*v0 -5*v1 -3*v3 + 18 <= 0; value: 0 + -24/5*v0 -32/5*v3 -38/5 <= 0; value: -158/5 + -1*v0 -2*v3 -1 < 0; value: -6 + -6*v0 -3*v3 -21 < 0; value: -51 0: 1 2 4 3 5 1: 1 2 3 5 2: 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> -12/5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + 5*v0 <= 0; value: 0 + -3*v3 < 0; value: -6 + -3*v1 + v2 -11 < 0; value: -26 + 5*v0 -6*v1 + 6 <= 0; value: -24 + = 0; value: 0 0: 1 4 1: 3 4 2: 3 3: 2 optimal: -2 + -2 <= 0; value: -2 - 5*v0 <= 0; value: 0 + -3*v3 < 0; value: -6 + v2 -14 < 0; value: -14 - 5*v0 -6*v1 + 6 <= 0; value: 0 + = 0; value: 0 0: 1 4 3 1: 3 4 2: 3 3: 2 0: 0 -> 0 1: 5 -> 1 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 -6*v2 -24 <= 0; value: -66 + -5*v1 -1*v3 + 14 < 0; value: -11 + 3*v0 + 6*v1 -92 <= 0; value: -59 + 2*v1 -1*v3 -12 <= 0; value: -2 + v2 -6*v3 -5 <= 0; value: -3 0: 3 1: 1 2 3 4 2: 1 5 3: 2 4 5 optimal: oo + 2*v0 + 2*v2 + 8 < 0; value: 14 - -6*v2 + 6/5*v3 -204/5 <= 0; value: 0 - -5*v1 -1*v3 + 14 < 0; value: -5 + 3*v0 -6*v2 -116 < 0; value: -125 + -7*v2 -54 < 0; value: -68 + -29*v2 -209 <= 0; value: -267 0: 3 1: 1 2 3 4 2: 1 5 4 3 3: 2 4 5 1 3 0: 1 -> 1 1: 5 -> -5 2: 2 -> 2 3: 0 -> 44 + 2*v0 -2*v1 <= 0; value: 8 + 2*v0 -6*v1 + 3*v3 -19 < 0; value: -8 + 4*v0 -2*v2 + 2*v3 -33 < 0; value: -15 + 6*v1 = 0; value: 0 + -5*v1 -4*v3 + 4 = 0; value: 0 + 6*v0 + 4*v1 -45 < 0; value: -21 0: 1 2 5 1: 1 3 4 5 2: 2 3: 1 2 4 optimal: (15 -e*1) + + 15 < 0; value: 15 + 3*v3 -4 <= 0; value: -1 + -2*v2 + 2*v3 -3 <= 0; value: -1 - 6*v1 = 0; value: 0 + -4*v3 + 4 = 0; value: 0 - 6*v0 -45 < 0; value: -6 0: 1 2 5 1: 1 3 4 5 2: 2 3: 1 2 4 0: 4 -> 13/2 1: 0 -> 0 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v2 -4*v3 + 3 < 0; value: -5 + -3*v1 -3*v2 = 0; value: 0 + 6*v2 -2*v3 -1 <= 0; value: -5 + -1*v1 + v2 <= 0; value: 0 + -3*v0 + 2*v2 -2*v3 -7 < 0; value: -20 0: 5 1: 2 4 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 <= 0; value: 6 + -4*v3 + 3 < 0; value: -5 - -3*v1 -3*v2 = 0; value: 0 + -2*v3 -1 <= 0; value: -5 - 2*v2 <= 0; value: 0 + -3*v0 -2*v3 -7 < 0; value: -20 0: 5 1: 2 4 2: 1 2 3 4 5 3: 1 3 5 0: 3 -> 3 1: 0 -> 0 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -5*v0 -1*v1 + 22 < 0; value: -4 + 2*v2 + 4*v3 -9 < 0; value: -3 + 6*v1 -2*v2 -6 <= 0; value: -2 + -1*v0 + v3 + 4 = 0; value: 0 + -3*v1 + 4*v2 -2 < 0; value: -1 0: 1 4 1: 1 3 5 2: 2 3 5 3: 2 4 optimal: oo + 12*v3 + 4 < 0; value: 16 - -5*v0 -4/3*v2 + 68/3 <= 0; value: 0 + -7/2*v3 -5 < 0; value: -17/2 + -45/2*v3 + 2 < 0; value: -41/2 - -1*v0 + v3 + 4 = 0; value: 0 - -3*v1 + 4*v2 -2 < 0; value: -3 0: 1 4 2 3 1: 1 3 5 2: 2 3 5 1 3: 2 4 3 0: 5 -> 5 1: 1 -> -2 2: 1 -> -7/4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v2 -6*v3 + 5 <= 0; value: -10 + -2*v1 + 3*v3 -11 <= 0; value: -6 + 3*v1 -2*v3 <= 0; value: 0 + -5*v0 -2*v3 + 5 <= 0; value: -1 + -6*v2 -1*v3 -7 <= 0; value: -16 0: 4 1: 2 3 2: 1 5 3: 1 2 3 4 5 optimal: 788/65 + + 788/65 <= 0; value: 788/65 - 15*v0 + 3*v2 -10 <= 0; value: 0 - -2*v1 + 3*v3 -11 <= 0; value: 0 + -207/13 <= 0; value: -207/13 - -5*v0 -2*v3 + 5 <= 0; value: 0 - -13/2*v2 -47/6 <= 0; value: 0 0: 4 1 5 3 1: 2 3 2: 1 5 3 3: 1 2 3 4 5 0: 0 -> 59/65 1: 2 -> -67/13 2: 1 -> -47/39 3: 3 -> 3/13 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 + 2 <= 0; value: -1 + -2*v2 + 4*v3 -4 <= 0; value: -2 + -5*v1 + 3*v2 + 11 = 0; value: 0 + 2*v0 -6 = 0; value: 0 + 4*v0 + 5*v3 -63 < 0; value: -41 0: 4 5 1: 3 2: 1 2 3 3: 2 5 optimal: -4/5 + -4/5 <= 0; value: -4/5 - -1*v2 + 2 <= 0; value: 0 + 4*v3 -8 <= 0; value: 0 - -5*v1 + 3*v2 + 11 = 0; value: 0 - 2*v0 -6 = 0; value: 0 + 5*v3 -51 < 0; value: -41 0: 4 5 1: 3 2: 1 2 3 3: 2 5 0: 3 -> 3 1: 4 -> 17/5 2: 3 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -1*v3 + 1 <= 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 3*v1 + 4*v2 -14 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + <= 0; value: 0 0: 4 1: 3 2: 3 4 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -1*v3 + 1 <= 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 3*v1 + 4*v2 -14 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + <= 0; value: 0 0: 4 1: 3 2: 3 4 3: 1 2 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 2 <= 0; value: -3 + 5*v2 -14 <= 0; value: -9 + -1*v1 -1*v2 + 5*v3 -14 <= 0; value: 0 + -4*v1 + v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 -5*v3 + 16 = 0; value: 0 0: 1 5 1: 3 4 2: 2 3 4 3: 3 4 5 optimal: oo + 58/25*v0 + 2/25 <= 0; value: 12/5 + -5*v0 + 2 <= 0; value: -3 + -21/5*v0 -19/5 <= 0; value: -8 - -1*v1 -1*v2 + 5*v3 -14 <= 0; value: 0 - 21/5*v0 + 5*v2 -51/5 <= 0; value: 0 - -1*v0 -5*v3 + 16 = 0; value: 0 0: 1 5 4 2 1: 3 4 2: 2 3 4 3: 3 4 5 0: 1 -> 1 1: 0 -> -1/5 2: 1 -> 6/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 -6*v3 -6 <= 0; value: -27 + -5*v0 -6*v1 + 23 = 0; value: 0 + -6*v0 -1*v3 + 2 < 0; value: -8 + 6*v0 -1*v3 -3 <= 0; value: -1 + 4*v0 -4 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 3: 1 3 4 optimal: -4 + -4 <= 0; value: -4 + -6*v3 -3 <= 0; value: -27 - -5*v0 -6*v1 + 23 = 0; value: 0 + -1*v3 -4 < 0; value: -8 + -1*v3 + 3 <= 0; value: -1 - 4*v0 -4 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 3: 1 3 4 0: 1 -> 1 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 -3*v2 + 6*v3 -28 <= 0; value: -10 + 6*v2 -52 <= 0; value: -28 + -1*v0 -3*v2 + 2*v3 -5 <= 0; value: -16 + 5*v0 -3*v1 + 6*v2 -75 <= 0; value: -38 + -4*v0 + v2 -3 < 0; value: -19 0: 3 4 5 1: 1 4 2: 1 2 3 4 5 3: 1 3 optimal: oo + -8/3*v3 + 170/3 <= 0; value: 146/3 + 4*v0 + 8*v3 -108 <= 0; value: -64 + -2*v0 + 4*v3 -62 <= 0; value: -60 - -1*v0 -3*v2 + 2*v3 -5 <= 0; value: 0 - 5*v0 -3*v1 + 6*v2 -75 <= 0; value: 0 + -13/3*v0 + 2/3*v3 -14/3 < 0; value: -73/3 0: 3 4 5 1 2 1: 1 4 2: 1 2 3 4 5 3: 1 3 2 5 0: 5 -> 5 1: 4 -> -58/3 2: 4 -> -4/3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 4*v2 + v3 -28 = 0; value: 0 + -3*v2 = 0; value: 0 + v1 -3*v3 + 2 <= 0; value: -6 + 5*v1 + 4*v3 -56 <= 0; value: -20 + -3*v0 -5*v1 + 32 = 0; value: 0 0: 5 1: 1 3 4 5 2: 1 2 3: 1 3 4 optimal: 320/57 + + 320/57 <= 0; value: 320/57 - 6*v1 + 4*v2 + v3 -28 = 0; value: 0 - -3*v2 = 0; value: 0 + -26 <= 0; value: -26 - 57/5*v0 -16*v2 -328/5 <= 0; value: 0 - -3*v0 + 10/3*v2 + 5/6*v3 + 26/3 = 0; value: 0 0: 5 4 3 1: 1 3 4 5 2: 1 2 5 3 4 3: 1 3 4 5 0: 4 -> 328/57 1: 4 -> 56/19 2: 0 -> 0 3: 4 -> 196/19 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 + 4*v1 + 5*v2 -12 = 0; value: 0 + -6*v2 <= 0; value: 0 + -4*v2 <= 0; value: 0 + <= 0; value: 0 + 2*v1 -10 <= 0; value: -2 0: 1 1: 1 5 2: 1 2 3 3: optimal: oo + v0 + 5/2*v2 -6 <= 0; value: -4 - -2*v0 + 4*v1 + 5*v2 -12 = 0; value: 0 + -6*v2 <= 0; value: 0 + -4*v2 <= 0; value: 0 + <= 0; value: 0 + v0 -5/2*v2 -4 <= 0; value: -2 0: 1 5 1: 1 5 2: 1 2 3 5 3: 0: 2 -> 2 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 3*v0 -2*v1 -11 = 0; value: 0 + 2*v1 -4*v2 + 3 <= 0; value: -1 + -5*v1 + 5*v3 <= 0; value: 0 + 3*v0 + 2*v2 -28 <= 0; value: -9 + 6*v0 -5*v2 -25 < 0; value: -5 0: 1 4 5 1: 1 2 3 2: 2 4 5 3: 3 optimal: oo + -2/3*v3 + 22/3 <= 0; value: 6 - 3*v0 -2*v1 -11 = 0; value: 0 + -4*v2 + 2*v3 + 3 <= 0; value: -1 - -15/2*v0 + 5*v3 + 55/2 <= 0; value: 0 + 2*v2 + 2*v3 -17 <= 0; value: -9 + -5*v2 + 4*v3 -3 < 0; value: -5 0: 1 4 5 3 2 1: 1 2 3 2: 2 4 5 3: 3 4 5 2 0: 5 -> 5 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 -4*v2 + 17 <= 0; value: -7 + 2*v0 + 3*v2 -6*v3 = 0; value: 0 + 4*v0 + 6*v1 -24 = 0; value: 0 + 4*v0 -4*v1 -6 <= 0; value: -22 + 6*v1 -2*v3 -52 <= 0; value: -30 0: 2 3 4 1: 1 3 4 5 2: 1 2 3: 2 5 optimal: 3 + + 3 <= 0; value: 3 - -8*v2 + 8*v3 + 1 <= 0; value: 0 - 2*v0 + 3*v2 -6*v3 = 0; value: 0 - 4*v0 + 6*v1 -24 = 0; value: 0 - 10*v2 -49/2 <= 0; value: 0 + -917/20 <= 0; value: -917/20 0: 2 3 4 1 5 1: 1 3 4 5 2: 1 2 4 5 3: 2 5 4 1 0: 0 -> 33/10 1: 4 -> 9/5 2: 2 -> 49/20 3: 1 -> 93/40 + 2*v0 -2*v1 <= 0; value: -6 + -6*v1 + 5 < 0; value: -13 + -4*v1 -3*v3 + 21 = 0; value: 0 + <= 0; value: 0 + 5*v0 <= 0; value: 0 + -1*v0 <= 0; value: 0 0: 4 5 1: 1 2 2: 3: 2 optimal: (-5/3 -e*1) + -5/3 < 0; value: -5/3 - 9/2*v3 -53/2 < 0; value: -9/2 - -4*v1 -3*v3 + 21 = 0; value: 0 + <= 0; value: 0 - 5*v0 <= 0; value: 0 + <= 0; value: 0 0: 4 5 1: 1 2 2: 3: 2 1 0: 0 -> 0 1: 3 -> 19/12 2: 1 -> 1 3: 3 -> 44/9 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -2*v1 -1*v2 <= 0; value: 0 + -2*v1 + 2*v3 + 2 <= 0; value: 0 + -3*v0 + 2*v2 -1*v3 -2 < 0; value: -11 + v0 -5*v3 + 7 <= 0; value: -10 + 2*v3 -8 = 0; value: 0 0: 1 3 4 1: 1 2 2: 1 3 3: 2 3 4 5 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 - 4*v0 -2*v1 -1*v2 <= 0; value: 0 - -4*v0 + v2 + 2*v3 + 2 <= 0; value: 0 - 5*v0 -26 < 0; value: -5 + -39/5 <= 0; value: -39/5 - 2*v3 -8 = 0; value: 0 0: 1 3 4 2 1: 1 2 2: 1 3 2 3: 2 3 4 5 0: 3 -> 21/5 1: 5 -> 5 2: 2 -> 34/5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 3*v2 + 2*v3 -25 <= 0; value: -16 + 3*v0 -21 < 0; value: -6 + -5*v0 + 5*v2 -1*v3 + 2 <= 0; value: -21 + -3*v0 -14 <= 0; value: -29 + -1*v1 + 1 < 0; value: -1 0: 2 3 4 1: 5 2: 1 3 3: 1 3 optimal: (12 -e*1) + + 12 < 0; value: 12 + 3*v2 + 2*v3 -25 <= 0; value: -16 - 3*v0 -21 < 0; value: -3 + 5*v2 -1*v3 -33 < 0; value: -31 + -35 < 0; value: -35 - -1*v1 + 1 < 0; value: -1/2 0: 2 3 4 1: 5 2: 1 3 3: 1 3 0: 5 -> 6 1: 2 -> 3/2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -1*v1 + 9 = 0; value: 0 + -6*v3 + 2 < 0; value: -22 + -1*v0 + 2*v1 + 4*v3 -23 < 0; value: -7 + 3*v3 -12 = 0; value: 0 + v1 -1 <= 0; value: 0 0: 1 3 1: 1 3 5 2: 3: 2 3 4 optimal: oo + 10*v0 -18 <= 0; value: 2 - -4*v0 -1*v1 + 9 = 0; value: 0 + -6*v3 + 2 < 0; value: -22 + -9*v0 + 4*v3 -5 < 0; value: -7 + 3*v3 -12 = 0; value: 0 + -4*v0 + 8 <= 0; value: 0 0: 1 3 5 1: 1 3 5 2: 3: 2 3 4 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 -7 <= 0; value: -3 + -2*v0 -5*v3 + 1 <= 0; value: -3 + 2*v0 + 4*v3 -7 <= 0; value: -3 + -5*v1 + 6*v3 + 8 <= 0; value: -12 + v0 + 3*v2 -3 < 0; value: -1 0: 1 2 3 5 1: 4 2: 1 5 3: 2 3 4 optimal: (631/100 -e*1) + + 631/100 < 0; value: 631/100 - -8*v2 -1 <= 0; value: 0 - -2*v0 -5*v3 + 1 <= 0; value: 0 + -97/20 <= 0; value: -97/20 - -5*v1 + 6*v3 + 8 <= 0; value: 0 - v0 + 3*v2 -3 < 0; value: -11/16 0: 1 2 3 5 1: 4 2: 1 5 3 3: 2 3 4 0: 2 -> 43/16 1: 4 -> 11/20 2: 0 -> -1/8 3: 0 -> -7/8 + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 -8 < 0; value: -2 + 4*v0 + 5*v1 + 3*v3 -54 < 0; value: -16 + 4*v3 -21 <= 0; value: -13 + 3*v2 -16 <= 0; value: -7 + 3*v1 -21 <= 0; value: -9 0: 2 1: 2 5 2: 1 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 -8 < 0; value: -2 + 4*v0 + 5*v1 + 3*v3 -54 < 0; value: -16 + 4*v3 -21 <= 0; value: -13 + 3*v2 -16 <= 0; value: -7 + 3*v1 -21 <= 0; value: -9 0: 2 1: 2 5 2: 1 4 3: 2 3 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 -2*v3 + 1 <= 0; value: -7 + -2*v1 + 2*v2 + 4*v3 -35 < 0; value: -21 + -5*v0 + v2 + 6 <= 0; value: -7 + 4*v0 -2*v3 -7 <= 0; value: -1 + -1*v2 + 2 = 0; value: 0 0: 3 4 1: 1 2 2: 2 3 5 3: 1 2 4 optimal: (37/2 -e*1) + + 37/2 < 0; value: 37/2 - -2*v1 -2*v3 + 1 <= 0; value: 0 - 2*v2 + 6*v3 -36 < 0; value: -6 + -169/12 < 0; value: -169/12 - 4*v0 -53/3 < 0; value: -17/6 - -1*v2 + 2 = 0; value: 0 0: 3 4 1: 1 2 2: 2 3 5 4 3: 1 2 4 0: 3 -> 89/24 1: 1 -> -23/6 2: 2 -> 2 3: 3 -> 13/3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v3 -6 <= 0; value: 0 + -1*v1 -3*v2 + 7 < 0; value: -10 + -2*v1 + 2*v3 -4 = 0; value: 0 + -4*v0 -6*v2 -38 <= 0; value: -80 + -6*v0 -2*v3 + 23 < 0; value: -3 0: 4 5 1: 1 2 3 2: 2 4 3: 1 3 5 optimal: oo + 8*v2 -37/3 < 0; value: 83/3 - -3*v1 + 3*v3 -6 <= 0; value: 0 - 3*v0 -3*v2 -5/2 <= 0; value: 0 + = 0; value: 0 + -10*v2 -124/3 <= 0; value: -274/3 - -6*v0 -2*v3 + 23 < 0; value: -2 0: 4 5 2 1: 1 2 3 2: 2 4 3: 1 3 5 2 0: 3 -> 35/6 1: 2 -> -7 2: 5 -> 5 3: 4 -> -5 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + v2 -3*v3 + 1 <= 0; value: -10 + -4*v0 -4*v2 + 3*v3 + 20 = 0; value: 0 + 2*v1 -1*v3 -6 <= 0; value: 0 + 6*v1 -44 <= 0; value: -26 + -3*v0 + 3*v1 + 3 <= 0; value: 0 0: 1 2 5 1: 3 4 5 2: 1 2 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + v2 -3*v3 + 1 <= 0; value: -10 + -4*v0 -4*v2 + 3*v3 + 20 = 0; value: 0 + 2*v1 -1*v3 -6 <= 0; value: 0 + 6*v1 -44 <= 0; value: -26 + -3*v0 + 3*v1 + 3 <= 0; value: 0 0: 1 2 5 1: 3 4 5 2: 1 2 3: 1 2 3 0: 4 -> 4 1: 3 -> 3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 2*v2 -3*v3 -9 = 0; value: 0 + 4*v1 -4*v3 <= 0; value: 0 + 6*v1 -6*v3 = 0; value: 0 + 3*v0 + 3*v1 + 3*v3 -9 = 0; value: 0 + v0 -3*v2 + 6*v3 + 4 <= 0; value: -1 0: 1 4 5 1: 2 3 4 2: 1 5 3: 1 2 3 4 5 optimal: 12/25 + + 12/25 <= 0; value: 12/25 - 4*v0 + 2*v2 -3*v3 -9 = 0; value: 0 + <= 0; value: 0 - 6*v1 -6*v3 = 0; value: 0 - 11*v0 + 4*v2 -27 = 0; value: 0 - 25/4*v0 -29/4 <= 0; value: 0 0: 1 4 5 1: 2 3 4 2: 1 5 4 3: 1 2 3 4 5 0: 1 -> 29/25 1: 1 -> 23/25 2: 4 -> 89/25 3: 1 -> 23/25 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 -3 <= 0; value: -9 + 6*v0 -4*v1 -1 <= 0; value: -7 + <= 0; value: 0 + <= 0; value: 0 + -4*v0 -3*v2 + 11 <= 0; value: -5 0: 2 5 1: 2 2: 1 5 3: 1 optimal: oo + 3/4*v2 -9/4 <= 0; value: 3/4 + -2*v2 + v3 -3 <= 0; value: -9 - 6*v0 -4*v1 -1 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 - -4*v0 -3*v2 + 11 <= 0; value: 0 0: 2 5 1: 2 2: 1 5 3: 1 0: 1 -> -1/4 1: 3 -> -5/8 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -24 = 0; value: 0 + v1 + 6*v3 -27 < 0; value: -3 + 3*v1 -4*v2 + 16 <= 0; value: 0 + -3*v1 + 5*v3 -34 <= 0; value: -14 + 3*v1 -5*v2 -3 <= 0; value: -23 0: 1 1: 2 3 4 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 -10/3*v3 + 68/3 <= 0; value: 52/3 + 6*v0 -24 = 0; value: 0 + 23/3*v3 -115/3 < 0; value: -23/3 + -4*v2 + 5*v3 -18 <= 0; value: -14 - -3*v1 + 5*v3 -34 <= 0; value: 0 + -5*v2 + 5*v3 -37 <= 0; value: -37 0: 1 1: 2 3 4 5 2: 3 5 3: 2 4 3 5 0: 4 -> 4 1: 0 -> -14/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + v1 -2 <= 0; value: -17 + -5*v0 -4*v1 + 15 = 0; value: 0 + -6*v1 -1*v2 -2*v3 + 13 = 0; value: 0 + 5*v1 <= 0; value: 0 + -3*v0 + 3*v2 + 3*v3 -52 <= 0; value: -34 0: 1 2 5 1: 1 2 3 4 2: 3 5 3: 3 5 optimal: oo + -9/11*v2 + 315/11 <= 0; value: 270/11 + 25/22*v2 -3197/66 <= 0; value: -1411/33 - -5*v0 -4*v1 + 15 = 0; value: 0 - 15/2*v0 -1*v2 -2*v3 -19/2 = 0; value: 0 + 25/22*v2 -2075/66 <= 0; value: -850/33 - 13/5*v2 + 11/5*v3 -279/5 <= 0; value: 0 0: 1 2 5 3 4 1: 1 2 3 4 2: 3 5 1 4 3: 3 5 1 4 0: 3 -> 235/33 1: 0 -> -170/33 2: 5 -> 5 3: 4 -> 214/11 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 + 2*v1 -2*v3 -23 <= 0; value: -14 + 3*v1 + v2 -22 <= 0; value: -14 + 4*v0 -1*v1 + 6*v2 -90 < 0; value: -49 + 4*v0 -2*v1 -15 < 0; value: -5 + -4*v1 -3*v2 -4*v3 -11 <= 0; value: -34 0: 1 3 4 1: 1 2 3 4 5 2: 2 3 5 3: 1 5 optimal: oo + 3/4*v2 + v3 + 41/4 < 0; value: 15 + -21/8*v2 -11/2*v3 -171/8 < 0; value: -40 + -5/4*v2 -3*v3 -121/4 < 0; value: -79/2 + 21/4*v2 -1*v3 -311/4 <= 0; value: -105/2 - 4*v0 -2*v1 -15 < 0; value: -2 - -8*v0 -3*v2 -4*v3 + 19 <= 0; value: 0 0: 1 3 4 5 2 1: 1 2 3 4 5 2: 2 3 5 1 3: 1 5 3 2 0: 3 -> 0 1: 1 -> -13/2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -5*v1 <= 0; value: 0 + -4*v0 -6*v1 + 3*v3 -4 <= 0; value: -42 + 5*v0 -25 = 0; value: 0 + -6*v0 + 5*v3 -28 <= 0; value: -58 + -3*v0 -4*v1 + 6 <= 0; value: -21 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 4 optimal: 4 + + 4 <= 0; value: 4 - 3*v0 -5*v1 <= 0; value: 0 + 3*v3 -42 <= 0; value: -42 - 5*v0 -25 = 0; value: 0 + 5*v3 -58 <= 0; value: -58 + -21 <= 0; value: -21 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 4 0: 5 -> 5 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -4*v2 + 5*v3 + 16 = 0; value: 0 + -2*v1 + 5*v2 -1*v3 -35 <= 0; value: -21 + -4*v0 -4*v2 -33 <= 0; value: -69 + 3*v1 -15 < 0; value: -6 + -6*v0 + 2*v1 -4 <= 0; value: -28 0: 3 5 1: 2 4 5 2: 1 2 3 3: 1 2 optimal: oo + 31/5*v0 + 1329/20 <= 0; value: 1949/20 - -4*v2 + 5*v3 + 16 = 0; value: 0 - -2*v1 + 5*v2 -1*v3 -35 <= 0; value: 0 - -4*v0 -4*v2 -33 <= 0; value: 0 + -63/10*v0 -4587/40 < 0; value: -5847/40 + -51/5*v0 -1409/20 <= 0; value: -2429/20 0: 3 5 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 4 5 0: 5 -> 5 1: 3 -> -1749/40 2: 4 -> -53/4 3: 0 -> -69/5 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 -32 < 0; value: -20 + -2*v2 + 3 < 0; value: -1 + -4*v0 -1*v1 + v3 -1 < 0; value: -3 + -3*v0 -4*v2 -3 <= 0; value: -11 + -3*v0 + 5*v2 -15 < 0; value: -5 0: 3 4 5 1: 3 2: 1 2 4 5 3: 3 optimal: oo + 10*v0 -2*v3 + 2 < 0; value: 2 + 6*v2 -32 < 0; value: -20 + -2*v2 + 3 < 0; value: -1 - -4*v0 -1*v1 + v3 -1 < 0; value: -1 + -3*v0 -4*v2 -3 <= 0; value: -11 + -3*v0 + 5*v2 -15 < 0; value: -5 0: 3 4 5 1: 3 2: 1 2 4 5 3: 3 0: 0 -> 0 1: 2 -> 0 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 + v2 -38 <= 0; value: -14 + -4*v0 -1*v1 -5 < 0; value: -24 + v2 -1*v3 -8 <= 0; value: -5 + -1*v0 + 2*v3 -1 <= 0; value: -3 + -2*v1 + 6 = 0; value: 0 0: 1 2 4 1: 2 5 2: 1 3 3: 3 4 optimal: oo + -2/5*v2 + 46/5 <= 0; value: 38/5 - 5*v0 + v2 -38 <= 0; value: 0 + 4/5*v2 -192/5 < 0; value: -176/5 + v2 -1*v3 -8 <= 0; value: -5 + 1/5*v2 + 2*v3 -43/5 <= 0; value: -29/5 - -2*v1 + 6 = 0; value: 0 0: 1 2 4 1: 2 5 2: 1 3 2 4 3: 3 4 0: 4 -> 34/5 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 + 5*v1 -29 < 0; value: -18 + v0 -3*v3 + 14 = 0; value: 0 + 4*v0 -1*v1 -5 < 0; value: -2 + -4*v1 -5*v3 + 29 = 0; value: 0 + -4*v1 + 3 < 0; value: -1 0: 1 2 3 1: 1 3 4 5 2: 3: 2 4 optimal: (68/53 -e*1) + + 68/53 < 0; value: 68/53 + -860/53 <= 0; value: -860/53 - v0 -3*v3 + 14 = 0; value: 0 - 53/12*v0 -77/12 < 0; value: -1 - -4*v1 -5*v3 + 29 = 0; value: 0 + -13/53 <= 0; value: -13/53 0: 1 2 3 5 1: 1 3 4 5 2: 3: 2 4 3 5 1 0: 1 -> 65/53 1: 1 -> 48/53 2: 2 -> 2 3: 5 -> 269/53 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 -1*v3 -1 < 0; value: -7 + -2*v2 + 1 <= 0; value: -9 + -6*v1 -1*v2 + v3 + 30 < 0; value: -4 + -4*v0 -1 <= 0; value: -17 + -2*v0 + 4*v2 -2*v3 -29 < 0; value: -19 0: 4 5 1: 3 2: 1 2 3 5 3: 1 3 5 optimal: oo + 20/9*v0 -20/3 < 0; value: 20/9 - -1*v2 -1*v3 -1 < 0; value: -1 + -2/3*v0 -8 <= 0; value: -32/3 - -6*v1 -1*v2 + v3 + 30 < 0; value: -35/6 + -4*v0 -1 <= 0; value: -17 - -2*v0 + 6*v2 -27 <= 0; value: 0 0: 4 5 2 1: 3 2: 1 2 3 5 3: 1 3 5 0: 4 -> 4 1: 5 -> 145/36 2: 5 -> 35/6 3: 1 -> -35/6 + 2*v0 -2*v1 <= 0; value: 4 + 2*v2 -2*v3 -5 <= 0; value: -3 + -4*v0 + 6*v1 + v2 <= 0; value: 0 + v0 -2*v1 + 1 = 0; value: 0 + 4*v2 -5*v3 -8 <= 0; value: -5 + -2*v2 + 6*v3 -2 <= 0; value: 0 0: 2 3 1: 2 3 2: 1 2 4 5 3: 1 4 5 optimal: oo + v0 -1 <= 0; value: 4 + 2*v2 -2*v3 -5 <= 0; value: -3 + -1*v0 + v2 + 3 <= 0; value: 0 - v0 -2*v1 + 1 = 0; value: 0 + 4*v2 -5*v3 -8 <= 0; value: -5 + -2*v2 + 6*v3 -2 <= 0; value: 0 0: 2 3 1: 2 3 2: 1 2 4 5 3: 1 4 5 0: 5 -> 5 1: 3 -> 3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 5*v1 -1*v2 -11 <= 0; value: -6 + 4*v0 -2*v2 -3*v3 -11 <= 0; value: -5 + 3*v2 -15 = 0; value: 0 + 6*v1 -5*v3 -33 <= 0; value: -21 + -2*v0 -4*v2 -1*v3 -6 < 0; value: -34 0: 2 5 1: 1 4 2: 1 2 3 5 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v1 -1*v2 -11 <= 0; value: -6 + 4*v0 -2*v2 -3*v3 -11 <= 0; value: -5 + 3*v2 -15 = 0; value: 0 + 6*v1 -5*v3 -33 <= 0; value: -21 + -2*v0 -4*v2 -1*v3 -6 < 0; value: -34 0: 2 5 1: 1 4 2: 1 2 3 5 3: 2 4 5 0: 4 -> 4 1: 2 -> 2 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 6*v2 -30 = 0; value: 0 + 2*v1 + 3*v2 -3*v3 -25 = 0; value: 0 + -6*v0 + 2 <= 0; value: -10 + 2*v0 -1*v1 -5*v2 -15 <= 0; value: -41 + -3*v0 + 5*v3 + 6 = 0; value: 0 0: 3 4 5 1: 2 4 2: 1 2 4 3: 2 5 optimal: 16/11 + + 16/11 <= 0; value: 16/11 - 6*v2 -30 = 0; value: 0 - 2*v1 + 3*v2 -3*v3 -25 = 0; value: 0 + -2570/11 <= 0; value: -2570/11 - 11/10*v0 -216/5 <= 0; value: 0 - -3*v0 + 5*v3 + 6 = 0; value: 0 0: 3 4 5 1: 2 4 2: 1 2 4 3: 2 5 4 0: 2 -> 432/11 1: 5 -> 424/11 2: 5 -> 5 3: 0 -> 246/11 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + 6*v2 -24 < 0; value: -13 + -5*v0 -5*v3 -15 < 0; value: -40 + 2*v0 -3*v2 = 0; value: 0 + -1*v2 -5*v3 + 12 = 0; value: 0 + 3*v3 -8 <= 0; value: -2 0: 2 3 1: 1 2: 1 3 4 3: 2 4 5 optimal: (60 -e*1) + + 60 < 0; value: 60 - -1*v1 + 6*v2 -24 < 0; value: -1 + -55/3 < 0; value: -55/3 - 2*v0 -3*v2 = 0; value: 0 - -2/3*v0 -5*v3 + 12 = 0; value: 0 - 3*v3 -8 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 3: 2 4 5 0: 3 -> -2 1: 1 -> -31 2: 2 -> -4/3 3: 2 -> 8/3 + 2*v0 -2*v1 <= 0; value: -6 + 4*v2 + 2*v3 -33 < 0; value: -19 + 2*v2 -4*v3 -3 <= 0; value: -11 + 6*v0 -6*v1 -7 < 0; value: -25 + v3 -3 <= 0; value: 0 + -1*v0 + 5*v3 -28 <= 0; value: -14 0: 3 5 1: 3 2: 1 2 3: 1 2 4 5 optimal: (7/3 -e*1) + + 7/3 < 0; value: 7/3 + 4*v2 + 2*v3 -33 < 0; value: -19 + 2*v2 -4*v3 -3 <= 0; value: -11 - 6*v0 -6*v1 -7 < 0; value: -6 + v3 -3 <= 0; value: 0 + -1*v0 + 5*v3 -28 <= 0; value: -14 0: 3 5 1: 3 2: 1 2 3: 1 2 4 5 0: 1 -> 1 1: 4 -> 5/6 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -37 < 0; value: -22 + v1 -6*v2 + 15 < 0; value: -4 + 3*v0 + 6*v1 + 2*v3 -63 <= 0; value: -8 + 4*v2 -3*v3 -1 = 0; value: 0 + -5*v1 -1*v3 + 30 = 0; value: 0 0: 1 3 1: 2 3 5 2: 2 4 3: 3 4 5 optimal: (256/47 -e*1) + + 256/47 < 0; value: 256/47 + -626/47 <= 0; value: -626/47 - 141/8*v0 -1113/8 < 0; value: -141/8 - 3*v0 + 16/15*v2 -409/15 <= 0; value: 0 - 4*v2 -3*v3 -1 = 0; value: 0 - -5*v1 -1*v3 + 30 = 0; value: 0 0: 1 3 2 1: 2 3 5 2: 2 4 3 3: 3 4 5 2 0: 5 -> 324/47 1: 5 -> 831/188 2: 4 -> 4643/752 3: 5 -> 1485/188 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -5*v2 + 5*v3 <= 0; value: -18 + -2*v3 <= 0; value: 0 + -2*v1 -4*v2 + 14 <= 0; value: -4 + 5*v1 -4*v3 -50 <= 0; value: -25 + -3*v1 + 6*v2 + 1 < 0; value: -2 0: 1 1: 3 4 5 2: 1 3 5 3: 1 2 4 optimal: oo + 2*v0 -22/3 < 0; value: 2/3 + -2*v0 + 5*v3 -25/3 <= 0; value: -49/3 + -2*v3 <= 0; value: 0 - -8*v2 + 40/3 <= 0; value: 0 + -4*v3 -95/3 < 0; value: -95/3 - -3*v1 + 6*v2 + 1 < 0; value: -2 0: 1 1: 3 4 5 2: 1 3 5 4 3: 1 2 4 0: 4 -> 4 1: 5 -> 13/3 2: 2 -> 5/3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -4*v3 + 4 <= 0; value: 0 + 6*v1 + 3*v2 + 2*v3 -35 < 0; value: -21 + -3*v1 -4*v2 -3*v3 + 9 <= 0; value: 0 + 4*v0 -1*v1 + 5*v3 -22 <= 0; value: -11 + 5*v0 -6*v1 + 5*v3 -3 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 2 3 3: 1 2 3 4 5 optimal: 22/19 + + 22/19 <= 0; value: 22/19 - 20/11*v0 + 32/11*v2 -40/11 <= 0; value: 0 + -771/76 < 0; value: -771/76 - -3*v1 -4*v2 -3*v3 + 9 <= 0; value: 0 - 19/6*v0 -52/3 <= 0; value: 0 - 5*v0 + 8*v2 + 11*v3 -21 = 0; value: 0 0: 4 5 1 2 1: 2 3 4 5 2: 2 3 4 5 1 3: 1 2 3 4 5 0: 2 -> 104/19 1: 2 -> 93/19 2: 0 -> -165/76 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 5*v1 + 5*v3 -45 < 0; value: -5 + -5*v0 -6*v1 + 5*v3 + 29 = 0; value: 0 + -3*v1 + 5*v2 -9 <= 0; value: -1 + -6*v1 + v3 -17 < 0; value: -37 + -6*v0 + 5*v3 + 6 <= 0; value: -4 0: 2 5 1: 1 2 3 4 2: 3 3: 1 2 4 5 optimal: (1292/35 -e*1) + + 1292/35 < 0; value: 1292/35 - 175/24*v0 -505/4 < 0; value: -175/24 - -5*v0 -6*v1 + 5*v3 + 29 = 0; value: 0 - 5/2*v0 + 5*v2 -5/2*v3 -47/2 <= 0; value: 0 - v0 -8*v2 -42/5 < 0; value: -8 + -1651/35 <= 0; value: -1651/35 0: 2 5 3 4 1 1: 1 2 3 4 2: 3 4 1 5 3: 1 2 4 5 3 0: 5 -> 571/35 1: 4 -> 53/168 2: 4 -> 557/280 3: 4 -> 305/28 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 -6*v2 + 6*v3 -57 <= 0; value: -24 + -2*v1 -1 <= 0; value: -3 + 6*v1 + 2*v2 -3*v3 + 7 <= 0; value: -2 + 2*v1 -5*v2 -2 <= 0; value: 0 + 3*v0 -4*v3 -9 <= 0; value: -20 0: 5 1: 1 2 3 4 2: 1 3 4 3: 1 3 5 optimal: oo + 8/3*v2 + 33 <= 0; value: 33 - -6*v2 + 6*v3 -117/2 <= 0; value: 0 - -2*v1 -1 <= 0; value: 0 + -1*v2 -101/4 <= 0; value: -101/4 + -5*v2 -3 <= 0; value: -3 - 3*v0 -4*v3 -9 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 3 4 3: 1 3 5 0: 3 -> 16 1: 1 -> -1/2 2: 0 -> 0 3: 5 -> 39/4 + 2*v0 -2*v1 <= 0; value: 6 + -4*v2 -8 <= 0; value: -24 + 2*v0 -1*v1 + 3*v2 -22 <= 0; value: -4 + 4*v1 <= 0; value: 0 + -4*v3 = 0; value: 0 + -6*v0 -4*v2 + 16 <= 0; value: -18 0: 2 5 1: 2 3 2: 1 2 5 3: 4 optimal: 48 + + 48 <= 0; value: 48 - 6*v0 -24 <= 0; value: 0 - 2*v0 -1*v1 + 3*v2 -22 <= 0; value: 0 + -80 <= 0; value: -80 + -4*v3 = 0; value: 0 - -6*v0 -4*v2 + 16 <= 0; value: 0 0: 2 5 3 1 1: 2 3 2: 1 2 5 3 3: 4 0: 3 -> 4 1: 0 -> -20 2: 4 -> -2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -6*v2 + 5*v3 -31 <= 0; value: -63 + -6*v2 -2*v3 + 5 <= 0; value: -17 + -2*v0 + 2*v1 + 4 = 0; value: 0 + 6*v0 -38 <= 0; value: -14 + 5*v0 + 2*v2 -1*v3 -31 <= 0; value: -7 0: 1 3 4 5 1: 3 2: 1 2 5 3: 1 2 5 optimal: 4 + + 4 <= 0; value: 4 + -6*v0 -6*v2 + 5*v3 -31 <= 0; value: -63 + -6*v2 -2*v3 + 5 <= 0; value: -17 - -2*v0 + 2*v1 + 4 = 0; value: 0 + 6*v0 -38 <= 0; value: -14 + 5*v0 + 2*v2 -1*v3 -31 <= 0; value: -7 0: 1 3 4 5 1: 3 2: 1 2 5 3: 1 2 5 0: 4 -> 4 1: 2 -> 2 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -34 < 0; value: -16 + 6*v1 + 6*v3 -8 < 0; value: -2 + -2*v1 + 5*v2 = 0; value: 0 + v1 + 6*v2 <= 0; value: 0 + -2*v0 + 3 <= 0; value: -3 0: 1 5 1: 2 3 4 2: 3 4 3: 2 optimal: oo + 2*v0 -5*v2 <= 0; value: 6 + 6*v0 -34 < 0; value: -16 + 15*v2 + 6*v3 -8 < 0; value: -2 - -2*v1 + 5*v2 = 0; value: 0 + 17/2*v2 <= 0; value: 0 + -2*v0 + 3 <= 0; value: -3 0: 1 5 1: 2 3 4 2: 3 4 2 3: 2 0: 3 -> 3 1: 0 -> 0 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -1*v0 -5*v1 -4*v3 + 28 <= 0; value: -2 + -1*v0 -2*v3 + 6 <= 0; value: -9 + 6*v1 -8 <= 0; value: -2 + -3*v0 + 4*v2 + 11 = 0; value: 0 + 5*v0 -4*v1 + 6*v3 -55 <= 0; value: -4 0: 1 2 4 5 1: 1 3 5 2: 4 3: 1 2 5 optimal: 284/21 + + 284/21 <= 0; value: 284/21 - -1*v0 -5*v1 -4*v3 + 28 <= 0; value: 0 + -61/7 <= 0; value: -61/7 - 56/23*v2 -186/23 <= 0; value: 0 - -3*v0 + 4*v2 + 11 = 0; value: 0 - 29/5*v0 + 46/5*v3 -387/5 <= 0; value: 0 0: 1 2 4 5 3 1: 1 3 5 2: 4 2 3 3: 1 2 5 3 0: 5 -> 170/21 1: 1 -> 4/3 2: 1 -> 93/28 3: 5 -> 139/42 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 <= 0; value: 0 + -2*v1 + 6*v2 + 8 <= 0; value: -2 + 3*v1 + v2 -32 < 0; value: -17 + 3*v2 <= 0; value: 0 + -2*v1 + 2*v2 -5*v3 + 6 < 0; value: -19 0: 1: 2 3 5 2: 1 2 3 4 5 3: 5 optimal: oo + 2*v0 -8 <= 0; value: -2 - -1*v2 <= 0; value: 0 - -2*v1 + 6*v2 + 8 <= 0; value: 0 + -20 < 0; value: -20 + <= 0; value: 0 + -5*v3 -2 < 0; value: -17 0: 1: 2 3 5 2: 1 2 3 4 5 3: 5 0: 3 -> 3 1: 5 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -2*v3 <= 0; value: 0 + 3*v2 -4*v3 -12 = 0; value: 0 + -2*v2 -1*v3 -2 <= 0; value: -10 + 5*v1 <= 0; value: 0 + v1 <= 0; value: 0 0: 1: 4 5 2: 2 3 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -2*v3 <= 0; value: 0 + 3*v2 -4*v3 -12 = 0; value: 0 + -2*v2 -1*v3 -2 <= 0; value: -10 + 5*v1 <= 0; value: 0 + v1 <= 0; value: 0 0: 1: 4 5 2: 2 3 3: 1 2 3 0: 2 -> 2 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 + 4*v2 + 2*v3 -37 < 0; value: -19 + -3*v0 -4*v1 -5*v3 + 18 <= 0; value: -9 + -5*v2 -5*v3 -11 <= 0; value: -31 + 6*v0 -25 <= 0; value: -7 + 2*v1 + 4*v3 -12 <= 0; value: 0 0: 2 4 1: 1 2 5 2: 1 3 3: 1 2 3 5 optimal: 21 + + 21 <= 0; value: 21 + 4*v2 -131/3 < 0; value: -107/3 - -3*v0 -4*v1 -5*v3 + 18 <= 0; value: 0 + -5*v2 -251/6 <= 0; value: -311/6 - 6*v0 -25 <= 0; value: 0 - -3/2*v0 + 3/2*v3 -3 <= 0; value: 0 0: 2 4 1 5 3 1: 1 2 5 2: 1 3 3: 1 2 3 5 0: 3 -> 25/6 1: 2 -> -19/3 2: 2 -> 2 3: 2 -> 37/6 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 = 0; value: 0 + 4*v0 -11 <= 0; value: -7 + 6*v2 + 4*v3 -84 < 0; value: -40 + 6*v1 <= 0; value: 0 + -2*v1 + 6*v3 -30 = 0; value: 0 0: 2 1: 1 4 5 2: 3 3: 3 5 optimal: 11/2 + + 11/2 <= 0; value: 11/2 - -3*v1 = 0; value: 0 - 4*v0 -11 <= 0; value: 0 + 6*v2 + 4*v3 -84 < 0; value: -40 + <= 0; value: 0 + 6*v3 -30 = 0; value: 0 0: 2 1: 1 4 5 2: 3 3: 3 5 0: 1 -> 11/4 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -3*v2 + 27 = 0; value: 0 + v2 + 4*v3 -71 < 0; value: -46 + -3*v1 + 6*v3 -79 <= 0; value: -52 + 2*v0 + v1 + 5*v3 -34 = 0; value: 0 + -6*v0 + v3 -9 <= 0; value: -28 0: 1 4 5 1: 3 4 2: 1 2 3: 2 3 4 5 optimal: oo + -22/7*v2 + 976/21 <= 0; value: 646/21 - -3*v0 -3*v2 + 27 = 0; value: 0 + 15/7*v2 -983/21 < 0; value: -758/21 - 6*v0 + 21*v3 -181 <= 0; value: 0 - 2*v0 + v1 + 5*v3 -34 = 0; value: 0 + 44/7*v2 -1196/21 <= 0; value: -536/21 0: 1 4 5 3 2 1: 3 4 2: 1 2 5 3: 2 3 4 5 0: 4 -> 4 1: 1 -> -239/21 2: 5 -> 5 3: 5 -> 157/21 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 + v1 + 4*v2 -11 <= 0; value: -7 + 4*v1 -6*v2 + v3 -39 <= 0; value: -23 + -2*v1 + 4*v2 -5*v3 + 3 <= 0; value: -5 + -2*v1 -4*v2 + 1 < 0; value: -7 + 4*v1 -1*v3 -19 <= 0; value: -3 0: 1 1: 1 2 3 4 5 2: 1 2 3 4 3: 2 3 5 optimal: oo + 8*v0 + 20 < 0; value: 20 - -3*v0 + 2*v2 -21/2 < 0; value: -2 + -93/5*v0 -1017/10 < 0; value: -1017/10 - -2*v1 + 4*v2 -5*v3 + 3 <= 0; value: 0 - -8*v2 + 5*v3 -2 < 0; value: -5 + -72/5*v0 -339/5 < 0; value: -339/5 0: 1 2 5 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 2 3 5 4 1 0: 0 -> 0 1: 4 -> -11/2 2: 0 -> 17/4 3: 0 -> 31/5 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -9 < 0; value: -33 + -1*v0 + 3*v2 + 5*v3 -7 = 0; value: 0 + 4*v3 -4 <= 0; value: 0 + v1 + 3*v2 -10 <= 0; value: 0 + 5*v1 -4*v2 + v3 -35 <= 0; value: -22 0: 1 2 1: 4 5 2: 2 4 5 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -9 < 0; value: -33 + -1*v0 + 3*v2 + 5*v3 -7 = 0; value: 0 + 4*v3 -4 <= 0; value: 0 + v1 + 3*v2 -10 <= 0; value: 0 + 5*v1 -4*v2 + v3 -35 <= 0; value: -22 0: 1 2 1: 4 5 2: 2 4 5 3: 2 3 5 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 -5*v2 + 5 <= 0; value: -14 + -1*v1 + 5*v3 -5 <= 0; value: -2 + 5*v0 + 6*v2 -18 <= 0; value: 0 + -5*v2 -2 <= 0; value: -17 + 3*v0 -2*v1 + 6*v2 -23 <= 0; value: -9 0: 3 5 1: 1 2 5 2: 1 3 4 5 3: 2 optimal: 305/37 + + 305/37 <= 0; value: 305/37 - -3*v0 -11*v2 + 28 <= 0; value: 0 - -1*v1 + 5*v3 -5 <= 0; value: 0 - 37/11*v0 -30/11 <= 0; value: 0 + -504/37 <= 0; value: -504/37 - 3*v0 + 6*v2 -10*v3 -13 <= 0; value: 0 0: 3 5 1 4 1: 1 2 5 2: 1 3 4 5 3: 2 1 5 0: 0 -> 30/37 1: 2 -> -245/74 2: 3 -> 86/37 3: 1 -> 25/74 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 = 0; value: 0 + -2*v2 -3*v3 + 8 < 0; value: -4 + 2*v3 -4 <= 0; value: 0 + -2*v0 -5*v1 -1 < 0; value: -11 + v2 + 3*v3 -20 <= 0; value: -11 0: 4 1: 1 4 2: 2 5 3: 2 3 5 optimal: oo + 2*v0 <= 0; value: 10 - -1*v1 = 0; value: 0 + -2*v2 -3*v3 + 8 < 0; value: -4 + 2*v3 -4 <= 0; value: 0 + -2*v0 -1 < 0; value: -11 + v2 + 3*v3 -20 <= 0; value: -11 0: 4 1: 1 4 2: 2 5 3: 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 3*v2 -5*v3 + 14 = 0; value: 0 + -6*v0 + 5*v2 -4 <= 0; value: -12 + -5*v1 + 5*v3 -14 < 0; value: -29 + 3*v3 -3 <= 0; value: 0 + -6*v0 + v1 -3*v2 + 20 = 0; value: 0 0: 1 2 5 1: 3 5 2: 1 2 5 3: 1 3 4 optimal: oo + 15/2*v0 -10 < 0; value: 25/2 - -5*v0 + 3*v2 -5*v3 + 14 = 0; value: 0 + -247/12*v0 + 113/3 < 0; value: -289/12 - -55*v0 -20*v3 + 156 < 0; value: -29/2 + -33/4*v0 + 102/5 < 0; value: -87/20 - -6*v0 + v1 -3*v2 + 20 = 0; value: 0 0: 1 2 5 3 4 1: 3 5 2: 1 2 5 3 3: 1 3 4 2 0: 3 -> 3 1: 4 -> 3/8 2: 2 -> 19/24 3: 1 -> 11/40 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 + 2 <= 0; value: -8 + 5*v2 -16 <= 0; value: -6 + 3*v0 -1*v2 + 1 < 0; value: -1 + 2*v1 + 3*v2 -25 <= 0; value: -15 + -1*v1 <= 0; value: -2 0: 3 1: 1 4 5 2: 2 3 4 3: optimal: (2/3 -e*1) + + 2/3 < 0; value: 2/3 - -5*v1 + 2 <= 0; value: 0 - 5*v2 -16 <= 0; value: 0 - 3*v0 -1*v2 + 1 < 0; value: -11/10 + -73/5 <= 0; value: -73/5 + -2/5 <= 0; value: -2/5 0: 3 1: 1 4 5 2: 2 3 4 3: 0: 0 -> 11/30 1: 2 -> 2/5 2: 2 -> 16/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -1*v3 + 3 <= 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -2*v1 -5*v3 -7 <= 0; value: -30 + 6*v0 -4*v2 -6*v3 + 4 <= 0; value: -18 + -3*v0 + v2 -1 <= 0; value: 0 0: 1 4 5 1: 3 2: 2 4 5 3: 1 3 4 optimal: oo + 2*v0 + 5*v3 + 7 <= 0; value: 22 + -5*v0 -1*v3 + 3 <= 0; value: 0 + -1*v2 + 1 <= 0; value: 0 - -2*v1 -5*v3 -7 <= 0; value: 0 + 6*v0 -4*v2 -6*v3 + 4 <= 0; value: -18 + -3*v0 + v2 -1 <= 0; value: 0 0: 1 4 5 1: 3 2: 2 4 5 3: 1 3 4 0: 0 -> 0 1: 4 -> -11 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 -27 <= 0; value: -15 + -2*v0 -6*v2 -5 < 0; value: -31 + 2*v1 -3*v3 -6 = 0; value: 0 + -3*v2 + 5*v3 + 7 < 0; value: -5 + v0 -6*v1 + 17 = 0; value: 0 0: 2 5 1: 1 3 5 2: 2 4 3: 3 4 optimal: (67/2 -e*1) + + 67/2 < 0; value: 67/2 - 18/5*v2 -117/5 <= 0; value: 0 + -91 < 0; value: -91 - 2*v1 -3*v3 -6 = 0; value: 0 - 5/9*v0 -3*v2 + 58/9 < 0; value: -5/9 - v0 -9*v3 -1 = 0; value: 0 0: 2 5 4 1 1: 1 3 5 2: 2 4 1 3: 3 4 5 1 0: 1 -> 45/2 1: 3 -> 79/12 2: 4 -> 13/2 3: 0 -> 43/18 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -2*v2 -3 = 0; value: 0 + 6*v0 -2*v1 -22 = 0; value: 0 + 3*v2 -4*v3 + 8 = 0; value: 0 + -5*v0 -3*v2 + 20 = 0; value: 0 + -5*v2 -3*v3 + 4 < 0; value: -2 0: 2 4 1: 1 2 2: 1 3 4 5 3: 3 5 optimal: 6 + + 6 <= 0; value: 6 - 3*v1 -2*v2 -3 = 0; value: 0 - 74/9*v0 -296/9 = 0; value: 0 - 3*v2 -4*v3 + 8 = 0; value: 0 - -5*v0 -4*v3 + 28 = 0; value: 0 + -2 < 0; value: -2 0: 2 4 5 1: 1 2 2: 1 3 4 5 2 3: 3 5 4 2 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 + v2 -1*v3 -3 <= 0; value: -10 + 6*v0 -5*v2 -1 <= 0; value: -3 + 3*v0 -4*v1 + 3 = 0; value: 0 + -1*v0 + v3 -5 < 0; value: -3 + 3*v0 -16 < 0; value: -7 0: 1 2 3 4 5 1: 3 2: 1 2 3: 1 4 optimal: (7/6 -e*1) + + 7/6 < 0; value: 7/6 + -1*v3 -112/15 < 0; value: -187/15 - 6*v0 -5*v2 -1 <= 0; value: 0 - 3*v0 -4*v1 + 3 = 0; value: 0 + v3 -31/3 < 0; value: -16/3 - 5/2*v2 -31/2 < 0; value: -5/2 0: 1 2 3 4 5 1: 3 2: 1 2 5 4 3: 1 4 0: 3 -> 9/2 1: 3 -> 33/8 2: 4 -> 26/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -33 <= 0; value: -15 + 3*v2 <= 0; value: 0 + 5*v0 -3*v1 -3*v3 -7 < 0; value: -16 + 6*v2 -3*v3 + 12 <= 0; value: 0 + -4*v1 -4*v2 + 16 = 0; value: 0 0: 1 3 1: 3 5 2: 2 4 5 3: 3 4 optimal: 3 + + 3 <= 0; value: 3 - 6*v0 -33 <= 0; value: 0 - 3*v2 <= 0; value: 0 + -3*v3 + 17/2 < 0; value: -7/2 + -3*v3 + 12 <= 0; value: 0 - -4*v1 -4*v2 + 16 = 0; value: 0 0: 1 3 1: 3 5 2: 2 4 5 3 3: 3 4 0: 3 -> 11/2 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 -5*v3 -14 <= 0; value: -34 + -6*v0 -5*v3 <= 0; value: -5 + 2*v1 -6*v3 <= 0; value: 0 + 4*v0 -3*v1 -3*v3 -10 < 0; value: -22 + 2*v0 + 6*v1 -1*v2 -17 = 0; value: 0 0: 2 4 5 1: 1 3 4 5 2: 5 3: 1 2 3 4 optimal: oo + 2*v0 + 2*v3 + 28/5 <= 0; value: 38/5 - 5/3*v0 -5/6*v2 -5*v3 -169/6 <= 0; value: 0 + -6*v0 -5*v3 <= 0; value: -5 + -8*v3 -28/5 <= 0; value: -68/5 + 4*v0 -8/5 < 0; value: -8/5 - 2*v0 + 6*v1 -1*v2 -17 = 0; value: 0 0: 2 4 5 1 3 1: 1 3 4 5 2: 5 4 1 3 3: 1 2 3 4 0: 0 -> 0 1: 3 -> -19/5 2: 1 -> -199/5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 2*v1 -1 <= 0; value: -9 + -2*v2 -1 < 0; value: -3 + -1*v0 -1*v1 -2*v2 + 4 = 0; value: 0 + 4*v1 -1*v3 + 2 <= 0; value: 0 + -2*v2 + 4*v3 -6 = 0; value: 0 0: 1 3 1: 1 3 4 2: 2 3 5 3: 4 5 optimal: oo + 4*v0 + 8*v3 -20 <= 0; value: 4 + -6*v0 -8*v3 + 19 <= 0; value: -9 + -4*v3 + 5 < 0; value: -3 - -1*v0 -1*v1 -2*v2 + 4 = 0; value: 0 + -4*v0 -17*v3 + 42 <= 0; value: 0 - -2*v2 + 4*v3 -6 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 2 3 5 1 4 3: 4 5 2 1 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -6*v3 -20 <= 0; value: -68 + -6*v3 + 26 < 0; value: -4 + -6*v0 -2*v1 -2*v3 -18 <= 0; value: -54 + v1 -5*v3 + 1 < 0; value: -20 + 2*v0 + 5*v3 -49 <= 0; value: -18 0: 1 3 5 1: 3 4 2: 3: 1 2 3 4 5 optimal: (136 -e*1) + + 136 < 0; value: 136 + -128 < 0; value: -128 - 12/5*v0 -164/5 < 0; value: -12/5 - -6*v0 -2*v1 -2*v3 -18 <= 0; value: 0 + -75 < 0; value: -75 - 2*v0 + 5*v3 -49 <= 0; value: 0 0: 1 3 5 4 2 1: 3 4 2: 3: 1 2 3 4 5 0: 3 -> 38/3 1: 4 -> -776/15 2: 2 -> 2 3: 5 -> 71/15 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 2*v2 -2*v3 -12 <= 0; value: -4 + -6*v0 -4 < 0; value: -22 + 4*v1 -5*v2 -4*v3 + 10 <= 0; value: 0 + 3*v3 -19 < 0; value: -7 + 4*v0 -1*v1 -2*v3 <= 0; value: 0 0: 2 5 1: 1 3 5 2: 1 3 3: 1 3 4 5 optimal: (88/3 -e*1) + + 88/3 < 0; value: 88/3 + 2*v2 -212/3 < 0; value: -200/3 - -6*v0 -4 < 0; value: -6 + -5*v2 -230/3 < 0; value: -260/3 - 3*v3 -19 < 0; value: -3 - 4*v0 -1*v1 -2*v3 <= 0; value: 0 0: 2 5 1 3 1: 1 3 5 2: 1 3 3: 1 3 4 5 0: 3 -> 1/3 1: 4 -> -28/3 2: 2 -> 2 3: 4 -> 16/3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v2 + 2 < 0; value: -6 + 2*v1 + 4*v3 -20 < 0; value: -10 + 6*v1 + v2 + 4*v3 -97 < 0; value: -63 + -4*v1 + 20 = 0; value: 0 + <= 0; value: 0 0: 1: 2 3 4 2: 1 3 3: 2 3 optimal: oo + 2*v0 -10 <= 0; value: -2 + -2*v2 + 2 < 0; value: -6 + 4*v3 -10 < 0; value: -10 + v2 + 4*v3 -67 < 0; value: -63 - -4*v1 + 20 = 0; value: 0 + <= 0; value: 0 0: 1: 2 3 4 2: 1 3 3: 2 3 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 -1*v3 -36 <= 0; value: -21 + 6*v1 + 6*v2 -36 = 0; value: 0 + 4*v0 -4*v2 -3 <= 0; value: -7 + -1*v2 -1*v3 -3 < 0; value: -8 + 6*v1 + 5*v2 -42 <= 0; value: -10 0: 3 1: 2 5 2: 1 2 3 4 5 3: 1 4 optimal: oo + 2*v0 + 1/2*v3 + 6 <= 0; value: 25/2 - 4*v2 -1*v3 -36 <= 0; value: 0 - 6*v1 + 6*v2 -36 = 0; value: 0 + 4*v0 -1*v3 -39 <= 0; value: -28 + -5/4*v3 -12 < 0; value: -53/4 + -1/4*v3 -15 <= 0; value: -61/4 0: 3 1: 2 5 2: 1 2 3 4 5 3: 1 4 3 5 0: 3 -> 3 1: 2 -> -13/4 2: 4 -> 37/4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + 2*v2 + 4 < 0; value: -6 + -5*v1 -6*v3 -4 < 0; value: -33 + 5*v0 -6*v3 < 0; value: -4 + 2*v0 -6*v3 -8 <= 0; value: -24 + 4*v0 + v2 -5*v3 -1 <= 0; value: 0 0: 1 3 4 5 1: 2 2: 1 5 3: 2 3 4 5 optimal: oo + 2*v0 + 12/5*v3 + 8/5 < 0; value: 96/5 + -5*v0 + 2*v2 + 4 < 0; value: -6 - -5*v1 -6*v3 -4 < 0; value: -5 + 5*v0 -6*v3 < 0; value: -4 + 2*v0 -6*v3 -8 <= 0; value: -24 + 4*v0 + v2 -5*v3 -1 <= 0; value: 0 0: 1 3 4 5 1: 2 2: 1 5 3: 2 3 4 5 0: 4 -> 4 1: 1 -> -23/5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -2*v2 + 2*v3 -26 = 0; value: 0 + -4*v0 -6*v1 -2*v2 + 8 <= 0; value: -8 + 4*v1 -6*v2 -6*v3 -5 < 0; value: -11 + -5*v0 + 5*v1 -8 <= 0; value: -28 + 2*v0 -3*v1 -15 <= 0; value: -7 0: 1 2 4 5 1: 2 3 4 5 2: 1 2 3 3: 1 3 optimal: (1361/103 -e*1) + + 1361/103 < 0; value: 1361/103 - 6*v0 -2*v2 + 2*v3 -26 = 0; value: 0 - -4*v0 -6*v1 -2*v2 + 8 <= 0; value: 0 - 206/3*v0 -331 < 0; value: -169/6 + -8453/206 < 0; value: -8453/206 - 7*v0 + v3 -32 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 4 5 2: 1 2 3 5 4 3: 1 3 5 4 0: 4 -> 1817/412 1: 0 -> -1273/618 2: 0 -> 140/103 3: 1 -> 465/412 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 5*v2 + 4*v3 + 16 = 0; value: 0 + 5*v1 -2*v2 + 4*v3 -29 = 0; value: 0 + -3*v0 -2*v2 + 9 <= 0; value: -3 + 2*v1 + 2*v2 -28 <= 0; value: -18 + -4*v1 -12 < 0; value: -32 0: 1 3 1: 2 4 5 2: 1 2 3 4 3: 1 2 optimal: (552/31 -e*1) + + 552/31 < 0; value: 552/31 - -5*v0 + 5*v2 + 4*v3 + 16 = 0; value: 0 - 5*v1 -2*v2 + 4*v3 -29 = 0; value: 0 - -3*v0 -2*v2 + 9 <= 0; value: 0 + -1324/31 < 0; value: -1324/31 - 62/5*v0 -366/5 < 0; value: -59/5 0: 1 3 5 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 5 4 0: 4 -> 307/62 1: 5 -> -1/20 2: 0 -> -363/124 3: 1 -> 2901/496 + 2*v0 -2*v1 <= 0; value: -8 + -2*v2 -3*v3 -1 <= 0; value: -10 + 2*v0 -5*v1 -1*v3 + 24 = 0; value: 0 + -5*v1 -1*v3 -9 <= 0; value: -35 + -6*v1 -1*v3 + 31 = 0; value: 0 + -2*v1 -5*v2 + 5*v3 + 20 = 0; value: 0 0: 2 1: 2 3 4 5 2: 1 5 3: 1 2 3 4 5 optimal: oo + 15/32*v2 -301/32 <= 0; value: -8 + -77/16*v2 + 71/16 <= 0; value: -10 - 2*v0 -5*v1 -1*v3 + 24 = 0; value: 0 + -5/32*v2 -1105/32 <= 0; value: -35 - -12/5*v0 + 1/5*v3 + 11/5 = 0; value: 0 - 64*v0 -5*v2 -49 = 0; value: 0 0: 2 3 4 5 1 1: 2 3 4 5 2: 1 5 3 3: 1 2 3 4 5 0: 1 -> 1 1: 5 -> 5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -4*v1 + 8 = 0; value: 0 + -4*v1 -6 <= 0; value: -14 + 2*v0 <= 0; value: 0 + -3*v1 + 1 <= 0; value: -5 + -4*v0 + 4*v3 -20 <= 0; value: -4 0: 1 3 5 1: 1 2 4 2: 3: 5 optimal: -26/9 + -26/9 <= 0; value: -26/9 - 6*v0 -4*v1 + 8 = 0; value: 0 + -22/3 <= 0; value: -22/3 + -20/9 <= 0; value: -20/9 - -9/2*v3 + 35/2 <= 0; value: 0 - -4*v0 + 4*v3 -20 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 4 2: 3: 5 2 4 3 0: 0 -> -10/9 1: 2 -> 1/3 2: 1 -> 1 3: 4 -> 35/9 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v3 + 6 <= 0; value: -4 + -4*v1 -1 < 0; value: -5 + -4*v0 + 4*v1 -3 < 0; value: -19 + -5*v1 -2 < 0; value: -7 + 5*v0 -6*v3 -25 = 0; value: 0 0: 1 3 5 1: 2 3 4 2: 3: 1 5 optimal: (53/2 -e*1) + + 53/2 < 0; value: 53/2 - 3/5*v3 -4 <= 0; value: 0 - -4*v1 -1 < 0; value: -5/2 + -56 < 0; value: -56 + -3/4 <= 0; value: -3/4 - 5*v0 -6*v3 -25 = 0; value: 0 0: 1 3 5 1: 2 3 4 2: 3: 1 5 3 0: 5 -> 13 1: 1 -> 3/8 2: 2 -> 2 3: 0 -> 20/3 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 -2*v1 + 13 <= 0; value: -1 + 4*v1 + 4*v2 -24 = 0; value: 0 + 5*v2 -11 <= 0; value: -6 + 5*v2 -9 < 0; value: -4 + -1*v0 -4*v2 + 3 <= 0; value: -5 0: 1 5 1: 1 2 2: 2 3 4 5 3: optimal: (4/5 -e*1) + + 4/5 < 0; value: 4/5 - -1*v0 + 2*v2 + 1 <= 0; value: 0 - 4*v1 + 4*v2 -24 = 0; value: 0 + -2 <= 0; value: -2 - 5/2*v0 -23/2 < 0; value: -3/4 + -44/5 < 0; value: -44/5 0: 1 5 3 4 1: 1 2 2: 2 3 4 5 1 3: 0: 4 -> 43/10 1: 5 -> 87/20 2: 1 -> 33/20 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -3*v1 + 1 <= 0; value: -2 + 3*v0 + 5*v1 -1*v2 -8 = 0; value: 0 + 2*v0 -6*v3 + 19 < 0; value: -3 + -4*v0 -4*v3 -14 <= 0; value: -34 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 2 2: 2 3: 3 4 5 optimal: -2/3 + -2/3 <= 0; value: -2/3 - 24/5*v0 -3/5*v2 -19/5 <= 0; value: 0 - 3*v0 + 5*v1 -1*v2 -8 = 0; value: 0 + 2*v0 -6*v3 + 19 < 0; value: -3 + -4*v0 -4*v3 -14 <= 0; value: -34 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 2 2: 2 1 3: 3 4 5 0: 1 -> 1 1: 2 -> 4/3 2: 5 -> 5/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 -1*v2 -13 < 0; value: -5 + 5*v0 -5*v2 + 4*v3 -28 <= 0; value: -17 + -5*v0 -1*v2 -14 < 0; value: -33 + 3*v2 -19 < 0; value: -7 + -1*v0 + 5*v2 -35 < 0; value: -18 0: 1 2 3 5 1: 2: 1 2 3 4 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 -1*v2 -13 < 0; value: -5 + 5*v0 -5*v2 + 4*v3 -28 <= 0; value: -17 + -5*v0 -1*v2 -14 < 0; value: -33 + 3*v2 -19 < 0; value: -7 + -1*v0 + 5*v2 -35 < 0; value: -18 0: 1 2 3 5 1: 2: 1 2 3 4 5 3: 2 0: 3 -> 3 1: 0 -> 0 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -1*v1 -1*v3 -14 < 0; value: -29 + 2*v0 + 6*v3 -21 <= 0; value: -5 + 5*v2 -1*v3 -13 <= 0; value: 0 + -3*v1 + 4*v2 -3*v3 -5 < 0; value: -2 + 6*v0 -1*v2 -9 = 0; value: 0 0: 1 2 5 1: 1 4 2: 3 4 5 3: 1 2 3 4 optimal: (2185/63 -e*1) + + 2185/63 < 0; value: 2185/63 - -14*v0 -1/3 <= 0; value: 0 - 2*v0 + 6*v3 -21 <= 0; value: 0 + -560/9 <= 0; value: -560/9 - -3*v1 + 4*v2 -3*v3 -5 < 0; value: -3 - 6*v0 -1*v2 -9 = 0; value: 0 0: 1 2 5 3 1: 1 4 2: 3 4 5 1 3: 1 2 3 4 0: 2 -> -1/42 1: 1 -> -1031/63 2: 3 -> -64/7 3: 2 -> 221/63 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 <= 0; value: -4 + -6*v1 + v2 + 8 < 0; value: -2 + v0 -1*v3 <= 0; value: 0 + = 0; value: 0 + -6*v0 -4*v1 + 15 <= 0; value: -17 0: 3 5 1: 1 2 5 2: 2 3: 3 optimal: oo + 2*v3 < 0; value: 8 - -1/3*v2 -8/3 <= 0; value: 0 - -6*v1 + v2 + 8 < 0; value: -6 - v0 -1*v3 <= 0; value: 0 + = 0; value: 0 + -6*v3 + 15 <= 0; value: -9 0: 3 5 1: 1 2 5 2: 2 1 5 3: 3 5 0: 4 -> 4 1: 2 -> 1 2: 2 -> -8 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -18 = 0; value: 0 + 4*v0 -1*v3 -20 < 0; value: -8 + -4*v1 + 5*v3 <= 0; value: 0 + v2 -8 <= 0; value: -3 + -4*v0 + 2*v1 + 3*v3 + 5 <= 0; value: -7 0: 1 2 5 1: 3 5 2: 4 3: 2 3 5 optimal: (26 -e*1) + + 26 < 0; value: 26 - 6*v0 -18 = 0; value: 0 - 4*v0 -1*v3 -20 < 0; value: -1 - -4*v1 + 5*v3 <= 0; value: 0 + v2 -8 <= 0; value: -3 + -51 < 0; value: -51 0: 1 2 5 1: 3 5 2: 4 3: 2 3 5 0: 3 -> 3 1: 0 -> -35/4 2: 5 -> 5 3: 0 -> -7 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 6*v1 -17 <= 0; value: -5 + 3*v2 + 5*v3 -16 = 0; value: 0 + -3*v3 + 6 = 0; value: 0 + 3*v1 + v3 -14 = 0; value: 0 + 4*v1 -5*v2 -6 = 0; value: 0 0: 1 1: 1 4 5 2: 2 5 3: 2 3 4 optimal: oo + 2*v0 -8 <= 0; value: -2 + -4*v0 + 7 <= 0; value: -5 - 3*v2 + 5*v3 -16 = 0; value: 0 + = 0; value: 0 - 3*v1 + v3 -14 = 0; value: 0 - -21/5*v2 + 42/5 = 0; value: 0 0: 1 1: 1 4 5 2: 2 5 3 1 3: 2 3 4 5 1 0: 3 -> 3 1: 4 -> 4 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 6*v2 -64 <= 0; value: -38 + 3*v2 -15 = 0; value: 0 + -1*v0 -5*v1 -8 < 0; value: -18 + -1*v1 -1*v3 + 3 <= 0; value: 0 + -5*v3 + 5 = 0; value: 0 0: 3 1: 1 3 4 2: 1 2 3: 4 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + 6*v2 -68 <= 0; value: -38 + 3*v2 -15 = 0; value: 0 + -1*v0 -18 < 0; value: -18 - -1*v1 -1*v3 + 3 <= 0; value: 0 - -5*v3 + 5 = 0; value: 0 0: 3 1: 1 3 4 2: 1 2 3: 4 5 1 3 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + v2 -5 <= 0; value: 0 + -3*v0 + 3 = 0; value: 0 + -1*v0 -5*v1 <= 0; value: -1 + -4*v3 -2 <= 0; value: -22 + -6*v1 -3*v2 + 15 = 0; value: 0 0: 2 3 1: 1 3 5 2: 1 5 3: 4 optimal: 2 + + 2 <= 0; value: 2 - -3*v1 + v2 -5 <= 0; value: 0 - -3*v0 + 3 = 0; value: 0 + -1 <= 0; value: -1 + -4*v3 -2 <= 0; value: -22 - -5*v2 + 25 = 0; value: 0 0: 2 3 1: 1 3 5 2: 1 5 3 3: 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 + v2 -4*v3 -1 < 0; value: -13 + 6*v0 + 6*v1 -2*v3 -10 = 0; value: 0 + 6*v0 -5*v1 + 5*v3 -46 < 0; value: -19 + -1*v0 -6*v1 + 4*v3 -9 <= 0; value: -1 + -3*v2 + 2 < 0; value: -4 0: 2 3 4 1: 1 2 3 4 2: 1 5 3: 1 2 3 4 optimal: (911/57 -e*1) + + 911/57 < 0; value: 911/57 - -2*v0 + v2 -10/3*v3 + 7/3 < 0; value: -10/3 - 6*v0 + 6*v1 -2*v3 -10 = 0; value: 0 + -604/57 <= 0; value: -604/57 - 19/5*v0 -86/5 < 0; value: -19/5 - -3*v2 + 2 < 0; value: -2 0: 2 3 4 1 1: 1 2 3 4 2: 1 5 3 4 3: 1 2 3 4 0: 2 -> 67/19 1: 1 -> -1063/570 2: 2 -> 4/3 3: 4 -> -3/190 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -3*v1 -1*v3 -6 <= 0; value: -15 + -1*v0 + 2*v1 -14 <= 0; value: -8 + v0 + 4*v2 -5*v3 -4 <= 0; value: -15 + 5*v1 -6*v2 -2 = 0; value: 0 + -6*v0 -3*v1 -1*v2 -8 <= 0; value: -35 0: 1 2 3 5 1: 1 2 4 5 2: 3 4 5 3: 1 3 optimal: oo + 118/23*v0 + 4 <= 0; value: 328/23 - 4*v0 -18/5*v2 -1*v3 -36/5 <= 0; value: 0 + -95/23*v0 -18 <= 0; value: -604/23 + -1097/23*v0 -12 <= 0; value: -2470/23 - 5*v1 -6*v2 -2 = 0; value: 0 - -100/9*v0 + 23/18*v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2 4 5 2: 3 4 5 1 2 3: 1 3 5 2 0: 2 -> 2 1: 4 -> -118/23 2: 3 -> -106/23 3: 5 -> 400/23 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v1 + 2 <= 0; value: -10 + <= 0; value: 0 + 2*v0 -6*v3 -10 <= 0; value: -2 + 6*v0 -3*v2 + 2*v3 -45 <= 0; value: -24 + -4*v0 + 4*v1 <= 0; value: 0 0: 1 3 4 5 1: 1 5 2: 4 3: 3 4 optimal: oo + 9/20*v2 + 79/12 <= 0; value: 211/30 - 3*v0 -6*v1 + 2 <= 0; value: 0 + <= 0; value: 0 - 2*v0 -6*v3 -10 <= 0; value: 0 - -3*v2 + 20*v3 -15 <= 0; value: 0 + -9/10*v2 -79/6 <= 0; value: -211/15 0: 1 3 4 5 1: 1 5 2: 4 5 3: 3 4 5 0: 4 -> 77/10 1: 4 -> 251/60 2: 1 -> 1 3: 0 -> 9/10 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 2*v2 + 4*v3 + 2 <= 0; value: -2 + -4*v1 -3*v2 + 31 = 0; value: 0 + -4*v0 -5*v2 + 3*v3 + 16 <= 0; value: -17 + -1*v1 -6*v3 + 28 = 0; value: 0 + -2*v0 + v2 -2*v3 + 13 = 0; value: 0 0: 1 3 5 1: 2 4 2: 1 2 3 5 3: 1 3 4 5 optimal: 20 + + 20 <= 0; value: 20 - 2/3*v0 -16/3 <= 0; value: 0 - -4*v1 -3*v2 + 31 = 0; value: 0 + -66 <= 0; value: -66 - 3/2*v0 -9/2*v3 + 21/2 = 0; value: 0 - -2*v0 + v2 -2*v3 + 13 = 0; value: 0 0: 1 3 5 4 1: 2 4 2: 1 2 3 5 4 3: 1 3 4 5 0: 5 -> 8 1: 4 -> -2 2: 5 -> 13 3: 4 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 4*v2 -8 = 0; value: 0 + -4*v3 -1 <= 0; value: -13 + -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v2 + 5*v3 -58 < 0; value: -31 + 6*v2 -31 < 0; value: -19 0: 1: 3 2: 1 4 5 3: 2 3 4 optimal: oo + 2*v0 + 17/12 <= 0; value: 113/12 + 4*v2 -8 = 0; value: 0 - -4*v3 -1 <= 0; value: 0 - -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v2 -237/4 < 0; value: -189/4 + 6*v2 -31 < 0; value: -19 0: 1: 3 2: 1 4 5 3: 2 3 4 0: 4 -> 4 1: 2 -> -17/24 2: 2 -> 2 3: 3 -> -1/4 + 2*v0 -2*v1 <= 0; value: 10 + 3*v0 + v3 -19 < 0; value: -2 + 6*v1 -3*v2 -2*v3 + 7 <= 0; value: 0 + 6*v0 + 4*v3 -41 <= 0; value: -3 + 4*v1 + 6*v2 + 4*v3 -14 = 0; value: 0 + -3*v0 -6*v1 + 11 <= 0; value: -4 0: 1 3 5 1: 2 4 5 2: 2 4 3: 1 2 3 4 optimal: (83/6 -e*1) + + 83/6 < 0; value: 83/6 - 9/8*v2 -37/16 < 0; value: -19/32 + -26/3 < 0; value: -26/3 - 8*v0 -6*v2 -103/3 <= 0; value: 0 - 4*v1 + 6*v2 + 4*v3 -14 = 0; value: 0 - -3*v0 + 9*v2 + 6*v3 -10 <= 0; value: 0 0: 1 3 5 2 1: 2 4 5 2: 2 4 5 1 3 2 3: 1 2 3 4 5 0: 5 -> 87/16 1: 0 -> -85/96 2: 1 -> 55/36 3: 2 -> 67/32 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 -6*v3 -2 <= 0; value: -17 + -4*v0 + 5*v2 -6*v3 + 9 < 0; value: -27 + -4*v0 + 3*v1 -4*v3 -11 <= 0; value: -30 + 6*v3 -25 < 0; value: -1 + 2*v2 + 3*v3 -18 < 0; value: -6 0: 2 3 1: 1 3 2: 1 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 -6*v3 -2 <= 0; value: -17 + -4*v0 + 5*v2 -6*v3 + 9 < 0; value: -27 + -4*v0 + 3*v1 -4*v3 -11 <= 0; value: -30 + 6*v3 -25 < 0; value: -1 + 2*v2 + 3*v3 -18 < 0; value: -6 0: 2 3 1: 1 3 2: 1 2 5 3: 1 2 3 4 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -1*v2 + 2*v3 + 8 <= 0; value: 0 + -5*v0 + 6*v1 + 6*v2 -13 < 0; value: -4 + 3*v1 -6*v3 <= 0; value: 0 + 4*v1 -2*v2 + 2*v3 -20 = 0; value: 0 + -4*v0 + 4*v1 -4 = 0; value: 0 0: 2 5 1: 1 2 3 4 5 2: 1 2 4 3: 1 3 4 optimal: -2 + -2 <= 0; value: -2 - -3*v1 -1*v2 + 2*v3 + 8 <= 0; value: 0 + -4 < 0; value: -4 - -1*v2 -4*v3 + 8 <= 0; value: 0 - -9/2*v2 = 0; value: 0 - -4*v0 + 12 = 0; value: 0 0: 2 5 1: 1 2 3 4 5 2: 1 2 4 5 3 3: 1 3 4 5 2 0: 3 -> 3 1: 4 -> 4 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -3*v1 -6*v2 + 35 < 0; value: -1 + v1 -3*v2 + 1 < 0; value: -12 + -2*v0 -1*v2 + 6*v3 -16 < 0; value: -1 + 2*v1 -5*v3 -5 <= 0; value: -21 + v1 -4*v3 -11 <= 0; value: -25 0: 3 1: 1 2 4 5 2: 1 2 3 3: 3 4 5 optimal: oo + 2*v0 + 4*v2 -70/3 < 0; value: 2/3 - -3*v1 -6*v2 + 35 < 0; value: -1/2 + -5*v2 + 38/3 < 0; value: -37/3 + -2*v0 -1*v2 + 6*v3 -16 < 0; value: -1 + -4*v2 -5*v3 + 55/3 < 0; value: -65/3 + -2*v2 -4*v3 + 2/3 < 0; value: -76/3 0: 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 3 4 5 0: 2 -> 2 1: 2 -> 11/6 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 5*v2 -2*v3 -3 <= 0; value: 0 + -1*v1 + 5*v2 + 6*v3 -5 = 0; value: 0 + -2*v0 + 6*v1 + 2*v2 -8 < 0; value: -4 + 4*v0 -1*v3 -5 < 0; value: -2 + 5*v0 -6*v1 + 4*v2 + 1 <= 0; value: 0 0: 3 4 5 1: 1 2 3 5 2: 1 2 3 5 3: 1 2 4 optimal: oo + 1/3*v0 -4/3*v2 -1/3 <= 0; value: 0 + 35/9*v0 + 88/9*v2 -35/9 <= 0; value: 0 - -1*v1 + 5*v2 + 6*v3 -5 = 0; value: 0 + 3*v0 + 6*v2 -7 < 0; value: -4 + 139/36*v0 + 13/18*v2 -211/36 < 0; value: -2 - 5*v0 -26*v2 -36*v3 + 31 <= 0; value: 0 0: 3 4 5 1 1: 1 2 3 5 2: 1 2 3 5 4 3: 1 2 4 5 3 0: 1 -> 1 1: 1 -> 1 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -6*v2 + 5*v3 -15 < 0; value: -32 + -1*v1 + 5*v3 -13 = 0; value: 0 + 4*v1 -4*v2 -6*v3 + 20 < 0; value: -6 + -2*v0 -6*v1 + 22 = 0; value: 0 + v1 -3*v2 + 10 = 0; value: 0 0: 4 1: 1 2 3 4 5 2: 1 3 5 3: 1 2 3 optimal: (286/5 -e*1) + + 286/5 < 0; value: 286/5 - -15*v2 + 28 < 0; value: -15 - -1*v1 + 5*v3 -13 = 0; value: 0 + -1154/75 < 0; value: -1154/75 - -2*v0 -30*v3 + 100 = 0; value: 0 - -1/3*v0 -3*v2 + 41/3 = 0; value: 0 0: 4 1 5 3 1: 1 2 3 4 5 2: 1 3 5 3: 1 2 3 4 5 0: 5 -> 76/5 1: 2 -> -7/5 2: 4 -> 43/15 3: 3 -> 58/25 + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 -6 = 0; value: 0 + -6*v0 -1*v3 + 7 = 0; value: 0 + -4*v0 -3*v2 + 3 <= 0; value: -7 + -3*v2 -3*v3 + 9 = 0; value: 0 + v1 -1 = 0; value: 0 0: 2 3 1: 5 2: 1 3 4 3: 2 4 optimal: 0 + <= 0; value: 0 - 3*v2 -6 = 0; value: 0 - -6*v0 -1*v3 + 7 = 0; value: 0 + -7 <= 0; value: -7 - -3*v2 -3*v3 + 9 = 0; value: 0 - v1 -1 = 0; value: 0 0: 2 3 1: 5 2: 1 3 4 3: 2 4 3 0: 1 -> 1 1: 1 -> 1 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v0 + 2*v1 -12 = 0; value: 0 + <= 0; value: 0 + 4*v0 -4*v2 -28 <= 0; value: -12 + -6*v0 -12 <= 0; value: -36 + -1*v3 < 0; value: -2 0: 1 3 4 1: 1 2: 3 3: 5 optimal: oo + 3*v2 + 9 <= 0; value: 9 - v0 + 2*v1 -12 = 0; value: 0 + <= 0; value: 0 - 4*v0 -4*v2 -28 <= 0; value: 0 + -6*v2 -54 <= 0; value: -54 + -1*v3 < 0; value: -2 0: 1 3 4 1: 1 2: 3 4 3: 5 0: 4 -> 7 1: 4 -> 5/2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + v1 -1*v2 -1*v3 -6 < 0; value: -14 + -3*v0 + 2*v1 + 3*v3 <= 0; value: -1 + 2*v1 + 5*v3 -25 < 0; value: -3 + -4*v0 + 6*v1 -4 < 0; value: -18 + -3*v0 + 6*v3 -16 <= 0; value: -7 0: 2 4 5 1: 1 2 3 4 2: 1 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v1 -1*v2 -1*v3 -6 < 0; value: -14 + -3*v0 + 2*v1 + 3*v3 <= 0; value: -1 + 2*v1 + 5*v3 -25 < 0; value: -3 + -4*v0 + 6*v1 -4 < 0; value: -18 + -3*v0 + 6*v3 -16 <= 0; value: -7 0: 2 4 5 1: 1 2 3 4 2: 1 3: 1 2 3 5 0: 5 -> 5 1: 1 -> 1 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 2*v3 <= 0; value: -2 + 2*v0 + 5*v3 -19 = 0; value: 0 + 6*v0 + 4*v1 -1*v3 -31 <= 0; value: -10 + = 0; value: 0 + -4*v0 -4 <= 0; value: -12 0: 1 2 3 5 1: 3 2: 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 2*v3 <= 0; value: -2 + 2*v0 + 5*v3 -19 = 0; value: 0 + 6*v0 + 4*v1 -1*v3 -31 <= 0; value: -10 + = 0; value: 0 + -4*v0 -4 <= 0; value: -12 0: 1 2 3 5 1: 3 2: 3: 1 2 3 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + v0 + 6*v1 -1*v2 -30 = 0; value: 0 + -1*v0 < 0; value: -2 + -3*v0 -1*v2 + 7 < 0; value: -1 + -5*v1 -6*v2 + v3 + 17 <= 0; value: -20 + 4*v0 -1*v1 -5 <= 0; value: -2 0: 1 2 3 5 1: 1 4 5 2: 1 3 4 3: 4 optimal: (-61/14 -e*1) + -61/14 < 0; value: -61/14 - v0 + 6*v1 -1*v2 -30 = 0; value: 0 + -67/28 < 0; value: -67/28 - -3*v0 -1*v2 + 7 < 0; value: -1 + v3 -67/14 <= 0; value: -67/14 - 14/3*v0 -67/6 <= 0; value: 0 0: 1 2 3 5 4 1: 1 4 5 2: 1 3 4 5 3: 4 0: 2 -> 67/28 1: 5 -> 199/42 2: 2 -> 23/28 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 -2*v2 -22 <= 0; value: 0 + -2*v2 + 8 = 0; value: 0 + 6*v1 + 6*v2 -94 < 0; value: -52 + v1 + 3*v2 -44 <= 0; value: -29 + -3*v1 + 6*v2 -34 < 0; value: -19 0: 1 1: 3 4 5 2: 1 2 3 4 5 3: optimal: (50/3 -e*1) + + 50/3 < 0; value: 50/3 - 6*v0 -2*v2 -22 <= 0; value: 0 - -6*v0 + 30 = 0; value: 0 + -90 < 0; value: -90 + -106/3 < 0; value: -106/3 - -3*v1 + 6*v2 -34 < 0; value: -3 0: 1 2 3 4 1: 3 4 5 2: 1 2 3 4 5 3: 0: 5 -> 5 1: 3 -> -7/3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -4*v3 -10 <= 0; value: -30 + -6*v0 -23 <= 0; value: -47 + -6*v0 -5*v1 < 0; value: -29 + 4*v0 -6*v1 -4*v3 + 6 = 0; value: 0 + 4*v1 -1*v3 <= 0; value: 0 0: 2 3 4 1: 1 3 4 5 2: 3: 1 4 5 optimal: oo + 22/5*v0 < 0; value: 88/5 + -32/5*v0 -16 < 0; value: -208/5 + -6*v0 -23 <= 0; value: -47 - -28/3*v0 + 10/3*v3 -5 < 0; value: -10/3 - 4*v0 -6*v1 -4*v3 + 6 = 0; value: 0 + -38/5*v0 -3/2 < 0; value: -319/10 0: 2 3 4 1 5 1: 1 3 4 5 2: 3: 1 4 5 3 0: 4 -> 4 1: 1 -> -62/15 2: 1 -> 1 3: 4 -> 117/10 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -4*v3 + 12 = 0; value: 0 + 5*v1 -56 <= 0; value: -36 + -2*v3 + 2 < 0; value: -4 + 2*v0 -4*v2 -10 <= 0; value: -30 + -5*v0 -2*v2 + v3 + 7 = 0; value: 0 0: 1 4 5 1: 2 2: 4 5 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -4*v3 + 12 = 0; value: 0 + 5*v1 -56 <= 0; value: -36 + -2*v3 + 2 < 0; value: -4 + 2*v0 -4*v2 -10 <= 0; value: -30 + -5*v0 -2*v2 + v3 + 7 = 0; value: 0 0: 1 4 5 1: 2 2: 4 5 3: 1 3 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -5*v3 + 5 = 0; value: 0 + 4*v2 -2*v3 -2 <= 0; value: 0 + -5*v0 -1*v1 + 10 = 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -1*v0 + v1 -7 <= 0; value: -3 0: 3 5 1: 3 5 2: 2 4 3: 1 2 optimal: oo + 12*v0 -20 <= 0; value: -8 + -5*v3 + 5 = 0; value: 0 + 4*v2 -2*v3 -2 <= 0; value: 0 - -5*v0 -1*v1 + 10 = 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -6*v0 + 3 <= 0; value: -3 0: 3 5 1: 3 5 2: 2 4 3: 1 2 0: 1 -> 1 1: 5 -> 5 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + v0 -3*v1 + 4*v3 -14 < 0; value: -1 + -6*v0 + 3*v3 -4 <= 0; value: -10 + v1 -2*v2 + 6*v3 -16 = 0; value: 0 + -1*v0 -4*v1 + 2 < 0; value: -9 + -6*v0 -2*v3 + 10 < 0; value: -16 0: 1 2 4 5 1: 1 3 4 2: 3 3: 1 2 3 5 optimal: oo + 5/2*v0 -1 < 0; value: 13/2 - v0 -6*v2 + 22*v3 -62 < 0; value: -253/16 + -117/16*v0 + 61/8 <= 0; value: -229/16 - v1 -2*v2 + 6*v3 -16 = 0; value: 0 - -23/11*v0 -16/11*v2 + 62/11 <= 0; value: 0 + -41/8*v0 + 9/4 < 0; value: -105/8 0: 1 2 4 5 1: 1 3 4 2: 3 1 4 2 5 3: 1 2 3 5 4 0: 3 -> 3 1: 2 -> 65/16 2: 5 -> -7/16 3: 4 -> 59/32 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 -1*v1 -1*v2 -1 < 0; value: -21 + 2*v2 + v3 -18 <= 0; value: -3 + -2*v1 -6*v3 + 30 = 0; value: 0 + 5*v1 -5*v2 + v3 + 3 <= 0; value: -17 + 5*v1 -4*v2 -4*v3 + 2 <= 0; value: -38 0: 1 1: 1 3 4 5 2: 1 2 4 5 3: 2 3 4 5 optimal: oo + 74/7*v0 + 90/7 < 0; value: 312/7 - -5*v0 -7*v2 + 38 < 0; value: -6 - 2*v2 + v3 -18 <= 0; value: 0 - -2*v1 -6*v3 + 30 = 0; value: 0 + -115/7*v0 -344/7 < 0; value: -689/7 + -170/7*v0 -563/7 < 0; value: -1073/7 0: 1 4 5 1: 1 3 4 5 2: 1 2 4 5 3: 2 3 4 5 1 0: 3 -> 3 1: 0 -> -99/7 2: 5 -> 29/7 3: 5 -> 68/7 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 4*v2 -13 < 0; value: -31 + 5*v2 -40 <= 0; value: -25 + -2*v2 + 6 <= 0; value: 0 + 6*v0 -6*v2 -35 < 0; value: -23 + 6*v3 -24 < 0; value: -12 0: 4 1: 1 2: 1 2 3 4 3: 5 optimal: (18 -e*1) + + 18 < 0; value: 18 - -6*v1 + 4*v2 -13 < 0; value: -6 + -25 <= 0; value: -25 - -2*v2 + 6 <= 0; value: 0 - 6*v0 -53 < 0; value: -6 + 6*v3 -24 < 0; value: -12 0: 4 1: 1 2: 1 2 3 4 3: 5 0: 5 -> 47/6 1: 5 -> 5/6 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 2*v1 + v2 -32 <= 0; value: -21 + 3*v1 -2*v3 -26 < 0; value: -15 + -5*v0 + 3*v1 + 2*v2 -31 <= 0; value: -19 + -6*v2 + 5 <= 0; value: -1 + -4*v0 -5*v1 + 13 < 0; value: -16 0: 3 5 1: 1 2 3 5 2: 1 3 4 3: 2 optimal: oo + 18/5*v0 -26/5 < 0; value: -8/5 + -8/5*v0 + v2 -134/5 < 0; value: -137/5 + -12/5*v0 -2*v3 -91/5 < 0; value: -123/5 + -37/5*v0 + 2*v2 -116/5 < 0; value: -143/5 + -6*v2 + 5 <= 0; value: -1 - -4*v0 -5*v1 + 13 < 0; value: -5 0: 3 5 1 2 1: 1 2 3 5 2: 1 3 4 3: 2 0: 1 -> 1 1: 5 -> 14/5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -3*v2 + 4 <= 0; value: -2 + 2*v1 -5*v2 -10 = 0; value: 0 + <= 0; value: 0 + -6*v0 + v3 + 1 < 0; value: -2 + -4*v1 + 8 <= 0; value: -12 0: 1 4 1: 2 5 2: 1 2 3: 4 optimal: -22/15 + -22/15 <= 0; value: -22/15 - -6*v0 -3*v2 + 4 <= 0; value: 0 - 2*v1 -5*v2 -10 = 0; value: 0 + <= 0; value: 0 + v3 -33/5 < 0; value: -18/5 - 20*v0 -76/3 <= 0; value: 0 0: 1 4 5 1: 2 5 2: 1 2 5 3: 4 0: 1 -> 19/15 1: 5 -> 2 2: 0 -> -6/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + v2 -10 < 0; value: -5 + -5*v0 -1*v2 + 2*v3 + 1 <= 0; value: -1 + -5*v1 -4*v3 + 8 < 0; value: -10 + -1*v0 + 2*v3 -3 = 0; value: 0 + 4*v0 -5*v1 + 6 = 0; value: 0 0: 2 4 5 1: 1 3 5 2: 1 2 3: 2 3 4 optimal: oo + -1/4*v2 -1/2 < 0; value: -3/4 - v2 + 16/5*v3 -62/5 < 0; value: -5/2 + 3/2*v2 -15 < 0; value: -27/2 + 15/4*v2 -65/2 < 0; value: -115/4 - -1*v0 + 2*v3 -3 = 0; value: 0 - 4*v0 -5*v1 + 6 = 0; value: 0 0: 2 4 5 3 1 1: 1 3 5 2: 1 2 3 3: 2 3 4 1 0: 1 -> 41/16 1: 2 -> 13/4 2: 1 -> 1 3: 2 -> 89/32 + 2*v0 -2*v1 <= 0; value: 10 + v1 + 2*v2 -5 <= 0; value: -3 + v2 -1*v3 <= 0; value: 0 + v0 -5*v1 -13 <= 0; value: -8 + <= 0; value: 0 + -3*v1 + v3 -1 = 0; value: 0 0: 3 1: 1 3 5 2: 1 2 3: 2 5 optimal: 206/7 + + 206/7 <= 0; value: 206/7 - 7/5*v0 -106/5 <= 0; value: 0 - v2 -1*v3 <= 0; value: 0 - v0 -5/3*v2 -34/3 <= 0; value: 0 + <= 0; value: 0 - -3*v1 + v3 -1 = 0; value: 0 0: 3 1 1: 1 3 5 2: 1 2 3 3: 2 5 3 1 0: 5 -> 106/7 1: 0 -> 3/7 2: 1 -> 16/7 3: 1 -> 16/7 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -4*v1 -2*v2 -7 <= 0; value: -39 + 6*v0 -3*v1 -7 <= 0; value: -4 + 3*v0 -21 <= 0; value: -12 + 2*v2 + 2*v3 -20 < 0; value: -6 + -2*v1 -3*v2 + 19 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 1 4 5 3: 4 optimal: (25/3 -e*1) + + 25/3 < 0; value: 25/3 - -11/2*v3 -11/6 <= 0; value: 0 - 6*v0 + 9/2*v2 -71/2 <= 0; value: 0 + -53/2 < 0; value: -53/2 - -8/3*v0 + 2*v3 -38/9 < 0; value: -8/3 - -2*v1 -3*v2 + 19 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 5 2 3: 4 1 3 0: 3 -> -5/6 1: 5 -> -4 2: 3 -> 9 3: 4 -> -1/3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -4*v2 -4 <= 0; value: -14 + -5*v0 + 10 <= 0; value: 0 + -2*v0 -3*v1 -3*v3 + 18 <= 0; value: -4 + -2*v1 + 6*v3 -59 <= 0; value: -39 + v1 -2 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 3: 3 4 optimal: oo + 8/3*v2 -4/3 <= 0; value: 28/3 - 3*v0 -4*v2 -4 <= 0; value: 0 + -20/3*v2 + 10/3 <= 0; value: -70/3 + -8/3*v2 -3*v3 + 28/3 <= 0; value: -40/3 + 6*v3 -63 <= 0; value: -39 - v1 -2 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 2 3 3: 3 4 0: 2 -> 20/3 1: 2 -> 2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -2*v2 -2 < 0; value: -6 + -6*v1 + 4*v3 -18 <= 0; value: -44 + 5*v0 -10 = 0; value: 0 + -4*v0 + 4*v3 + 4 = 0; value: 0 + v0 + 6*v3 -8 = 0; value: 0 0: 3 4 5 1: 2 2: 1 3: 2 4 5 optimal: 26/3 + + 26/3 <= 0; value: 26/3 + -2*v2 -2 < 0; value: -6 - -6*v1 + 4*v3 -18 <= 0; value: 0 - 5*v0 -10 = 0; value: 0 - -4*v0 + 4*v3 + 4 = 0; value: 0 + = 0; value: 0 0: 3 4 5 1: 2 2: 1 3: 2 4 5 0: 2 -> 2 1: 5 -> -7/3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 + 6*v3 -24 = 0; value: 0 + -3*v1 -1*v2 -2*v3 -4 < 0; value: -12 + -1*v0 + 1 < 0; value: -2 + 4*v0 -2*v2 -3*v3 <= 0; value: 0 + -6*v1 -3*v3 + 6 < 0; value: -6 0: 3 4 1: 1 2 5 2: 2 4 3: 1 2 4 5 optimal: oo + 2*v0 + 3/2 < 0; value: 15/2 - -4*v1 + 6*v3 -24 = 0; value: 0 + -2*v0 -7/2 <= 0; value: -19/2 + -1*v0 + 1 < 0; value: -2 - 4*v0 -2*v2 -3*v3 <= 0; value: 0 - -16*v0 + 8*v2 + 42 < 0; value: -3 0: 3 4 2 5 1: 1 2 5 2: 2 4 5 3: 1 2 4 5 0: 3 -> 3 1: 0 -> -3/8 2: 0 -> 3/8 3: 4 -> 15/4 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 + v1 + 4*v3 -7 <= 0; value: -2 + 3*v0 -6*v2 -1*v3 + 10 = 0; value: 0 + 2*v0 + 5*v2 + 4*v3 -52 <= 0; value: -27 + 4*v0 -3*v3 -9 = 0; value: 0 + 5*v0 + v1 -5*v2 -4 = 0; value: 0 0: 1 2 3 4 5 1: 1 5 2: 2 3 5 3: 1 2 3 4 optimal: 306/13 + + 306/13 <= 0; value: 306/13 - 13/18*v0 -25/6 <= 0; value: 0 - 3*v0 -6*v2 -1*v3 + 10 = 0; value: 0 + -37/13 <= 0; value: -37/13 - 4*v0 -3*v3 -9 = 0; value: 0 - 5*v0 + v1 -5*v2 -4 = 0; value: 0 0: 1 2 3 4 5 1: 1 5 2: 2 3 5 1 3: 1 2 3 4 0: 3 -> 75/13 1: 4 -> -6 2: 3 -> 49/13 3: 1 -> 61/13 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -1*v1 -2*v2 + 2 = 0; value: 0 + -2*v1 -3*v2 + 4 <= 0; value: -10 + -1*v3 + 4 = 0; value: 0 + 2*v1 + 6*v2 -46 <= 0; value: -26 + -3*v0 + 3*v1 -8 < 0; value: -5 0: 1 5 1: 1 2 4 5 2: 1 2 4 3: 3 optimal: 45 + + 45 <= 0; value: 45 - 2*v0 -1*v1 -2*v2 + 2 = 0; value: 0 - -4*v0 + v2 <= 0; value: 0 + -1*v3 + 4 = 0; value: 0 - 12*v0 -42 <= 0; value: 0 + -151/2 < 0; value: -151/2 0: 1 5 2 4 1: 1 2 4 5 2: 1 2 4 5 3: 3 0: 3 -> 7/2 1: 4 -> -19 2: 2 -> 14 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -1*v3 -9 <= 0; value: -5 + 5*v0 -3*v2 -4*v3 + 1 <= 0; value: -1 + -5*v0 -6*v2 -10 < 0; value: -43 + -2*v2 -1*v3 + 8 = 0; value: 0 + v0 -2*v1 -5*v2 + 7 <= 0; value: -13 0: 1 2 3 5 1: 5 2: 2 3 4 5 3: 1 2 4 optimal: oo + -4*v0 + 24 <= 0; value: 12 + -23/5 <= 0; value: -23/5 - 5*v0 -5/2*v3 -11 <= 0; value: 0 + v0 -236/5 < 0; value: -221/5 - -2*v2 -1*v3 + 8 = 0; value: 0 - v0 -2*v1 -5*v2 + 7 <= 0; value: 0 0: 1 2 3 5 1: 5 2: 2 3 4 5 3: 1 2 4 3 0: 3 -> 3 1: 4 -> -3 2: 3 -> 16/5 3: 2 -> 8/5 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 + 3*v3 + 10 = 0; value: 0 + 2*v0 + v1 + 2*v2 -23 = 0; value: 0 + -3*v0 -3*v1 + 3*v2 + 18 = 0; value: 0 + 4*v0 -3*v2 -23 < 0; value: -15 + -4*v0 + 3*v3 + 5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 2: 2 3 4 3: 1 5 optimal: 0 + <= 0; value: 0 - -5*v1 + 3*v3 + 10 = 0; value: 0 - 14/5*v0 + 2*v2 -22 = 0; value: 0 - 48/7*v2 -192/7 = 0; value: 0 + -15 < 0; value: -15 - -4*v0 + 3*v3 + 5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 2: 2 3 4 3: 1 5 2 3 0: 5 -> 5 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 + 17 <= 0; value: -13 + -3*v0 -6*v3 -21 <= 0; value: -45 + 5*v0 -6*v1 + 18 = 0; value: 0 + -1*v1 + 5*v3 -18 < 0; value: -1 + -6*v1 + 6*v2 -21 <= 0; value: -9 0: 2 3 1: 3 4 5 2: 1 5 3: 2 4 optimal: oo + 1/3*v0 -6 <= 0; value: -6 + -6*v2 + 17 <= 0; value: -13 + -3*v0 -6*v3 -21 <= 0; value: -45 - 5*v0 -6*v1 + 18 = 0; value: 0 + -5/6*v0 + 5*v3 -21 < 0; value: -1 + -5*v0 + 6*v2 -39 <= 0; value: -9 0: 2 3 4 5 1: 3 4 5 2: 1 5 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + -3*v1 + 6*v3 -22 < 0; value: -13 + 6*v3 -24 = 0; value: 0 + v0 + v2 -6*v3 + 6 < 0; value: -18 + -5*v0 -2*v1 <= 0; value: -10 + v2 -3*v3 + 12 = 0; value: 0 0: 3 4 1: 1 4 2: 3 5 3: 1 2 3 5 optimal: (104/3 -e*1) + + 104/3 < 0; value: 104/3 - -3*v1 + 6*v3 -22 < 0; value: -3 - 6*v3 -24 = 0; value: 0 - v0 + v2 -18 < 0; value: -1 + -274/3 < 0; value: -274/3 - v2 = 0; value: 0 0: 3 4 1: 1 4 2: 3 5 4 3: 1 2 3 5 4 0: 0 -> 17 1: 5 -> 5/3 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 -3 <= 0; value: -7 + -1*v0 -3*v1 + 2 <= 0; value: 0 + 3*v0 -6*v1 -15 <= 0; value: -9 + 5*v0 -6*v1 -11 <= 0; value: -1 + -5*v0 -4*v3 + 16 < 0; value: -2 0: 1 2 3 4 5 1: 2 3 4 2: 1 3: 5 optimal: 92/21 + + 92/21 <= 0; value: 92/21 + -2*v2 + 9/7 <= 0; value: -47/7 - -1*v0 -3*v1 + 2 <= 0; value: 0 + -58/7 <= 0; value: -58/7 - 7*v0 -15 <= 0; value: 0 + -4*v3 + 37/7 < 0; value: -19/7 0: 1 2 3 4 5 1: 2 3 4 2: 1 3: 5 0: 2 -> 15/7 1: 0 -> -1/21 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 22 <= 0; value: -2 + 4*v1 + 3*v2 + 4*v3 -77 <= 0; value: -40 + -4*v2 + 1 <= 0; value: -11 + -3*v1 + 2*v3 + 6 = 0; value: 0 + <= 0; value: 0 0: 1 1: 2 4 2: 2 3 3: 2 4 optimal: oo + 2*v0 -4/3*v3 -4 <= 0; value: 0 + -6*v0 + 22 <= 0; value: -2 + 3*v2 + 20/3*v3 -69 <= 0; value: -40 + -4*v2 + 1 <= 0; value: -11 - -3*v1 + 2*v3 + 6 = 0; value: 0 + <= 0; value: 0 0: 1 1: 2 4 2: 2 3 3: 2 4 0: 4 -> 4 1: 4 -> 4 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -5*v1 -4*v3 = 0; value: 0 + -4*v1 -1*v3 <= 0; value: 0 + v1 -4*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + 4*v1 -6*v2 + 7 < 0; value: -17 0: 1: 1 2 3 5 2: 5 3: 1 2 3 4 optimal: oo + 2*v0 <= 0; value: 8 - -5*v1 -4*v3 = 0; value: 0 - 11/5*v3 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 + -6*v2 + 7 < 0; value: -17 0: 1: 1 2 3 5 2: 5 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -23 <= 0; value: -13 + -1*v1 + 4*v3 -4 <= 0; value: -1 + -4*v0 -4*v1 + 2*v2 + 1 <= 0; value: -1 + 3*v0 + 6*v1 -6*v3 -10 <= 0; value: -4 + -6*v0 + 4*v2 -21 < 0; value: -13 0: 1 3 4 5 1: 2 3 4 2: 3 5 3: 2 4 optimal: oo + 2*v0 -8*v3 + 8 <= 0; value: 4 + 5*v0 -23 <= 0; value: -13 - v0 -1/2*v2 + 4*v3 -17/4 <= 0; value: 0 - -4*v0 -4*v1 + 2*v2 + 1 <= 0; value: 0 + 3*v0 + 18*v3 -34 <= 0; value: -10 + 2*v0 + 32*v3 -55 < 0; value: -19 0: 1 3 4 5 2 1: 2 3 4 2: 3 5 2 4 3: 2 4 5 0: 2 -> 2 1: 1 -> 0 2: 5 -> 7/2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + = 0; value: 0 + -6*v0 -6*v1 + v3 + 1 <= 0; value: 0 + -4*v0 -3*v2 -5*v3 + 13 <= 0; value: -25 + -4*v0 + 5*v1 -6*v3 + 34 = 0; value: 0 + 3*v1 + 3*v2 -9 = 0; value: 0 0: 2 3 4 1: 2 4 5 2: 3 5 3: 2 3 4 optimal: 1801/13 + + 1801/13 <= 0; value: 1801/13 + = 0; value: 0 - -6*v0 -6*v1 + v3 + 1 <= 0; value: 0 - 13/20*v2 -539/20 <= 0; value: 0 - -9*v0 -31/6*v3 + 209/6 = 0; value: 0 - -120/31*v0 + 3*v2 -159/31 = 0; value: 0 0: 2 3 4 5 1: 2 4 5 2: 3 5 3: 2 3 4 5 0: 1 -> 801/26 1: 0 -> -500/13 2: 3 -> 539/13 3: 5 -> -610/13 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -6*v2 <= 0; value: 0 + 6*v0 -4*v1 + v2 -29 < 0; value: -18 + -3*v3 <= 0; value: -3 + -5*v0 + v3 + 2 < 0; value: -12 + v3 -2 <= 0; value: -1 0: 1 2 4 1: 2 2: 1 2 3: 3 4 5 optimal: (421/30 -e*1) + + 421/30 < 0; value: 421/30 - 2*v0 -6*v2 <= 0; value: 0 - 6*v0 -4*v1 + v2 -29 < 0; value: -4 - -3*v3 <= 0; value: 0 - -5*v0 + v3 + 2 < 0; value: -5 + -2 <= 0; value: -2 0: 1 2 4 1: 2 2: 1 2 3: 3 4 5 0: 3 -> 7/5 1: 2 -> -121/30 2: 1 -> 7/15 3: 1 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -4*v1 -4*v2 + 7 <= 0; value: -13 + -5*v2 -5*v3 + 13 <= 0; value: -17 + -4*v1 -1 <= 0; value: -5 + 3*v0 -5*v3 -12 <= 0; value: -7 + -2*v0 -4*v3 + 18 <= 0; value: 0 0: 4 5 1: 1 3 2: 1 2 3: 2 4 5 optimal: oo + 10/3*v3 + 17/2 <= 0; value: 91/6 + -4*v2 + 8 <= 0; value: -8 + -5*v2 -5*v3 + 13 <= 0; value: -17 - -4*v1 -1 <= 0; value: 0 - 3*v0 -5*v3 -12 <= 0; value: 0 + -22/3*v3 + 10 <= 0; value: -14/3 0: 4 5 1: 1 3 2: 1 2 3: 2 4 5 0: 5 -> 22/3 1: 1 -> -1/4 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -6*v2 + 2*v3 -6 < 0; value: -14 + -2*v0 -2*v2 + 3 <= 0; value: -5 + 3*v1 + 6*v2 + 2*v3 -58 < 0; value: -33 + 4*v1 -33 <= 0; value: -21 + -1*v0 + 2*v3 -4 <= 0; value: -2 0: 2 5 1: 3 4 2: 1 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -6*v2 + 2*v3 -6 < 0; value: -14 + -2*v0 -2*v2 + 3 <= 0; value: -5 + 3*v1 + 6*v2 + 2*v3 -58 < 0; value: -33 + 4*v1 -33 <= 0; value: -21 + -1*v0 + 2*v3 -4 <= 0; value: -2 0: 2 5 1: 3 4 2: 1 2 3 3: 1 3 5 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -5*v0 + 6*v1 -30 = 0; value: 0 + 2*v0 -1*v1 -1*v3 + 1 < 0; value: -5 + -6*v0 + v2 -7 < 0; value: -3 + -3*v2 + 5*v3 + 7 = 0; value: 0 + -3*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 2 2: 3 4 3: 2 4 optimal: oo + 6/35*v2 -324/35 < 0; value: -60/7 - -5*v0 + 6*v1 -30 = 0; value: 0 - 7/6*v0 -1*v3 -4 < 0; value: -7/6 + -73/35*v2 -713/35 < 0; value: -201/7 - -3*v2 + 5*v3 + 7 = 0; value: 0 + -54/35*v2 -234/35 < 0; value: -90/7 0: 1 2 3 5 1: 1 2 2: 3 4 5 3: 2 4 3 5 0: 0 -> 23/7 1: 5 -> 325/42 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + 2*v2 -33 <= 0; value: -16 + v1 + 3*v2 + 3*v3 -30 < 0; value: -7 + -6*v2 + 3*v3 -11 <= 0; value: -26 + -3*v1 -2*v3 -10 <= 0; value: -22 + -5*v2 + 16 < 0; value: -4 0: 1 1: 2 4 2: 1 2 3 5 3: 2 3 4 optimal: (7838/207 -e*1) + + 7838/207 < 0; value: 7838/207 - 3*v0 -1831/69 <= 0; value: 0 - 3*v2 + 7/3*v3 -100/3 < 0; value: -7/3 - -69/7*v2 + 223/7 <= 0; value: 0 - -3*v1 -2*v3 -10 <= 0; value: 0 + -11/69 < 0; value: -11/69 0: 1 1: 2 4 2: 1 2 3 5 3: 2 3 4 0: 3 -> 1831/207 1: 2 -> -650/69 2: 4 -> 223/69 3: 3 -> 210/23 + 2*v0 -2*v1 <= 0; value: 6 + v1 -1*v3 -1 <= 0; value: -6 + v0 + v2 -5 <= 0; value: -2 + -5*v0 + v1 -8 <= 0; value: -23 + -6*v1 + 2*v2 + 3*v3 -23 < 0; value: -8 + 6*v3 -65 <= 0; value: -35 0: 2 3 1: 1 3 4 2: 2 4 3: 1 4 5 optimal: oo + 2*v0 -4/3*v2 + 52/3 < 0; value: 70/3 - 1/3*v2 -1/2*v3 -29/6 < 0; value: -1/2 + v0 + v2 -5 <= 0; value: -2 + -5*v0 + 2/3*v2 -50/3 < 0; value: -95/3 - -6*v1 + 2*v2 + 3*v3 -23 < 0; value: -6 + 4*v2 -123 < 0; value: -123 0: 2 3 1: 1 3 4 2: 2 4 1 3 5 3: 1 4 5 3 0: 3 -> 3 1: 0 -> -43/6 2: 0 -> 0 3: 5 -> -26/3 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 4*v2 + 3*v3 -6 = 0; value: 0 + -1*v1 -4*v3 -7 <= 0; value: -16 + -5*v3 + 2 <= 0; value: -3 + 2*v2 <= 0; value: 0 + -2*v1 -2*v2 + 4 <= 0; value: -6 0: 1 1: 2 5 2: 1 4 5 3: 1 2 3 optimal: 28/5 + + 28/5 <= 0; value: 28/5 - v0 + 4*v2 + 3*v3 -6 = 0; value: 0 + -53/5 <= 0; value: -53/5 - 5/3*v0 -8 <= 0; value: 0 - -1/2*v0 -3/2*v3 + 3 <= 0; value: 0 - -2*v1 -2*v2 + 4 <= 0; value: 0 0: 1 4 2 3 1: 2 5 2: 1 4 5 2 3: 1 2 3 4 0: 3 -> 24/5 1: 5 -> 2 2: 0 -> 0 3: 1 -> 2/5 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 + 3*v1 -6*v2 -18 <= 0; value: -54 + 6*v0 + 3*v2 + v3 -65 <= 0; value: -29 + -6*v0 -3*v1 -1*v2 + 12 <= 0; value: -14 + -2*v1 + 6*v2 -45 <= 0; value: -17 + 4*v0 + 2*v2 + 3*v3 -52 <= 0; value: -21 0: 1 2 3 5 1: 1 3 4 2: 1 2 3 4 5 3: 2 5 optimal: oo + -4/3*v3 + 313/6 <= 0; value: 289/6 + 8/7*v3 -3043/28 <= 0; value: -421/4 - 21/5*v0 + v3 -823/20 <= 0; value: 0 - -6*v0 -3*v1 -1*v2 + 12 <= 0; value: 0 - 4*v0 + 20/3*v2 -53 <= 0; value: 0 + 7/3*v3 -26/3 <= 0; value: -5/3 0: 1 2 3 5 4 1: 1 3 4 2: 1 2 3 4 5 3: 2 5 1 0: 3 -> 109/12 1: 1 -> -15 2: 5 -> 5/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 5*v3 -10 <= 0; value: 0 + 5*v0 + 6*v3 -12 = 0; value: 0 + -4*v2 -5*v3 -15 <= 0; value: -33 + 2*v0 + 2*v3 -9 < 0; value: -5 + -6*v0 -3*v2 -2 <= 0; value: -8 0: 2 4 5 1: 2: 3 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 5*v3 -10 <= 0; value: 0 + 5*v0 + 6*v3 -12 = 0; value: 0 + -4*v2 -5*v3 -15 <= 0; value: -33 + 2*v0 + 2*v3 -9 < 0; value: -5 + -6*v0 -3*v2 -2 <= 0; value: -8 0: 2 4 5 1: 2: 3 5 3: 1 2 3 4 0: 0 -> 0 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 2*v1 + 6*v2 -48 = 0; value: 0 + v0 -5*v2 + 2 <= 0; value: -21 + 5*v2 -1*v3 -22 = 0; value: 0 + <= 0; value: 0 + -2*v1 -5*v3 -16 <= 0; value: -37 0: 1 2 1: 1 5 2: 1 2 3 3: 3 5 optimal: oo + 8*v0 + 6/5*v3 -108/5 <= 0; value: -2 - 6*v0 + 2*v1 + 6*v2 -48 = 0; value: 0 + v0 -1*v3 -20 <= 0; value: -21 - 5*v2 -1*v3 -22 = 0; value: 0 + <= 0; value: 0 + 6*v0 -19/5*v3 -188/5 <= 0; value: -37 0: 1 2 5 1: 1 5 2: 1 2 3 5 3: 3 5 2 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -1*v1 -6*v2 -4 < 0; value: -10 + -5*v0 -4*v2 -17 < 0; value: -41 + -5*v0 + v2 -6*v3 + 25 = 0; value: 0 + -2*v1 -3*v3 + 3 = 0; value: 0 + 6*v1 -2*v2 -1 < 0; value: -3 0: 2 3 1: 1 4 5 2: 1 2 3 5 3: 3 4 optimal: oo + -1/2*v0 + 1/2*v2 + 19/2 <= 0; value: 8 + -5/4*v0 -23/4*v2 + 3/4 < 0; value: -10 + -5*v0 -4*v2 -17 < 0; value: -41 - -5*v0 + v2 -6*v3 + 25 = 0; value: 0 - -2*v1 -3*v3 + 3 = 0; value: 0 + 15/2*v0 -7/2*v2 -59/2 < 0; value: -3 0: 2 3 1 5 1: 1 4 5 2: 1 2 3 5 3: 3 4 1 5 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -2*v3 + 8 = 0; value: 0 + -3*v1 -5*v2 + 25 = 0; value: 0 + -5*v1 -6*v2 -4*v3 + 50 = 0; value: 0 + 5*v2 -25 = 0; value: 0 + 5*v0 -1*v3 <= 0; value: 0 0: 1 5 1: 2 3 2: 2 3 4 3: 1 3 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 -2*v3 + 8 = 0; value: 0 - -3*v1 -5*v2 + 25 = 0; value: 0 - 7/3*v2 -4*v3 + 25/3 = 0; value: 0 + = 0; value: 0 - 4*v0 -4 <= 0; value: 0 0: 1 5 4 1: 2 3 2: 2 3 4 3: 1 3 5 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 + 4*v3 -40 <= 0; value: -20 + -6*v1 + 12 = 0; value: 0 + -6*v1 -6*v2 -3*v3 -43 <= 0; value: -88 + -1*v3 -1 <= 0; value: -6 + -5*v0 = 0; value: 0 0: 1 5 1: 2 3 2: 3 3: 1 3 4 optimal: -4 + -4 <= 0; value: -4 + 4*v3 -40 <= 0; value: -20 - -6*v1 + 12 = 0; value: 0 + -6*v2 -3*v3 -55 <= 0; value: -88 + -1*v3 -1 <= 0; value: -6 - -5*v0 = 0; value: 0 0: 1 5 1: 2 3 2: 3 3: 1 3 4 0: 0 -> 0 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 + 2*v3 -1 <= 0; value: -9 + -1*v0 -2*v1 + 7 = 0; value: 0 + 3*v0 -4*v1 -4*v3 + 7 <= 0; value: 0 + -3*v1 + 6*v3 -13 <= 0; value: -7 + -4*v0 -3*v1 -6*v3 + 28 < 0; value: -2 0: 2 3 5 1: 1 2 3 4 5 2: 3: 1 3 4 5 optimal: 13/3 + + 13/3 <= 0; value: 13/3 + -85/18 <= 0; value: -85/18 - -1*v0 -2*v1 + 7 = 0; value: 0 - 5*v0 -4*v3 -7 <= 0; value: 0 - 36/5*v3 -107/5 <= 0; value: 0 + -88/9 < 0; value: -88/9 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 3: 1 3 4 5 0: 3 -> 34/9 1: 2 -> 29/18 2: 3 -> 3 3: 2 -> 107/36 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v1 -5*v2 -7 < 0; value: -20 + v1 -5*v3 + 6 < 0; value: -3 + 5*v1 -6*v3 + 7 = 0; value: 0 + 6*v0 + 2*v2 -17 <= 0; value: -11 + 4*v0 -2*v1 -4*v3 + 10 = 0; value: 0 0: 1 4 5 1: 1 2 3 5 2: 1 4 3: 2 3 5 optimal: (-61/78 -e*1) + -61/78 < 0; value: -61/78 - -13/2*v2 + 31/4 < 0; value: -47/8 + -2741/312 < 0; value: -2741/312 - 5*v1 -6*v3 + 7 = 0; value: 0 - 6*v0 + 2*v2 -17 <= 0; value: 0 - 4*v0 -32/5*v3 + 64/5 = 0; value: 0 0: 1 4 5 2 1: 1 2 3 5 2: 1 4 2 3: 2 3 5 1 0: 0 -> 111/52 1: 1 -> 541/208 2: 3 -> 109/52 3: 2 -> 1387/416 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -18 <= 0; value: -9 + -4*v0 -8 <= 0; value: -20 + 2*v3 -8 = 0; value: 0 + -3*v2 + 3 = 0; value: 0 + -2*v0 + 5*v3 -16 <= 0; value: -2 0: 1 2 5 1: 2: 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -18 <= 0; value: -9 + -4*v0 -8 <= 0; value: -20 + 2*v3 -8 = 0; value: 0 + -3*v2 + 3 = 0; value: 0 + -2*v0 + 5*v3 -16 <= 0; value: -2 0: 1 2 5 1: 2: 4 3: 3 5 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 -4*v3 = 0; value: 0 + -4*v0 + 4 <= 0; value: -4 + v1 <= 0; value: 0 + 6*v3 <= 0; value: 0 + 5*v2 -63 <= 0; value: -38 0: 2 1: 1 3 2: 5 3: 1 4 optimal: oo + 2*v0 -8/3*v3 <= 0; value: 4 - 3*v1 -4*v3 = 0; value: 0 + -4*v0 + 4 <= 0; value: -4 + 4/3*v3 <= 0; value: 0 + 6*v3 <= 0; value: 0 + 5*v2 -63 <= 0; value: -38 0: 2 1: 1 3 2: 5 3: 1 4 3 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -1*v0 + v2 -3 <= 0; value: 0 + -6*v1 + v2 + 2*v3 + 5 <= 0; value: 0 + -6*v1 -4*v3 + 38 = 0; value: 0 + -3*v0 <= 0; value: 0 + -6*v0 -1*v1 + 6*v2 -15 = 0; value: 0 0: 1 4 5 1: 2 3 5 2: 1 2 5 3: 2 3 optimal: -6 + -6 <= 0; value: -6 - 1/53*v0 <= 0; value: 0 - -6*v1 + v2 + 2*v3 + 5 <= 0; value: 0 - -1*v2 -6*v3 + 33 = 0; value: 0 + <= 0; value: 0 - -6*v0 + 53/9*v2 -53/3 = 0; value: 0 0: 1 4 5 1: 2 3 5 2: 1 2 5 3 3: 2 3 5 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 + 4*v2 -37 < 0; value: -9 + -3*v0 -8 < 0; value: -23 + <= 0; value: 0 + 6*v1 + 5*v2 -10 = 0; value: 0 + -2*v2 + v3 = 0; value: 0 0: 1 2 1: 4 2: 1 4 5 3: 5 optimal: oo + 1/3*v0 + 145/12 < 0; value: 55/4 - 4*v0 + 2*v3 -37 < 0; value: -2 + -3*v0 -8 < 0; value: -23 + <= 0; value: 0 - 6*v1 + 5*v2 -10 = 0; value: 0 - -2*v2 + v3 = 0; value: 0 0: 1 2 1: 4 2: 1 4 5 3: 5 1 0: 5 -> 5 1: 0 -> -35/24 2: 2 -> 15/4 3: 4 -> 15/2 + 2*v0 -2*v1 <= 0; value: -8 + -3*v1 -1*v2 -9 <= 0; value: -21 + 4*v0 + 4*v3 -35 <= 0; value: -19 + 4*v1 -16 = 0; value: 0 + 2*v0 -1*v2 <= 0; value: 0 + -2*v0 -5*v2 -3*v3 + 12 = 0; value: 0 0: 2 4 5 1: 1 3 2: 1 4 5 3: 2 5 optimal: oo + -1/2*v3 -6 <= 0; value: -8 + 1/2*v3 -23 <= 0; value: -21 + 3*v3 -31 <= 0; value: -19 - 4*v1 -16 = 0; value: 0 - 2*v0 -1*v2 <= 0; value: 0 - -6*v2 -3*v3 + 12 = 0; value: 0 0: 2 4 5 1: 1 3 2: 1 4 5 2 3: 2 5 1 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -2*v3 + 17 = 0; value: 0 + v1 + v2 -5 = 0; value: 0 + -5*v1 <= 0; value: 0 + 2*v3 -3 <= 0; value: -1 + v0 -5*v1 -6*v2 + 30 = 0; value: 0 0: 5 1: 2 3 5 2: 1 2 5 3: 1 4 optimal: 0 + <= 0; value: 0 - -3*v2 -2*v3 + 17 = 0; value: 0 - v1 + v2 -5 = 0; value: 0 - 5*v0 <= 0; value: 0 + -1 <= 0; value: -1 - v0 + 2/3*v3 -2/3 = 0; value: 0 0: 5 3 4 1: 2 3 5 2: 1 2 5 3 3: 1 4 5 3 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 + 8 <= 0; value: 0 + 3*v0 + 6*v2 + 5*v3 -28 <= 0; value: -16 + -3*v0 + 6*v1 + 3*v3 -8 <= 0; value: -20 + 2*v1 + 6*v3 <= 0; value: 0 + -4*v0 + 6*v2 + 16 = 0; value: 0 0: 1 2 3 5 1: 3 4 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 + 8 <= 0; value: 0 + 3*v0 + 6*v2 + 5*v3 -28 <= 0; value: -16 + -3*v0 + 6*v1 + 3*v3 -8 <= 0; value: -20 + 2*v1 + 6*v3 <= 0; value: 0 + -4*v0 + 6*v2 + 16 = 0; value: 0 0: 1 2 3 5 1: 3 4 2: 1 2 5 3: 1 2 3 4 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 2*v2 + 2*v3 -2 <= 0; value: 0 + 2*v1 -3*v2 + 2*v3 -13 = 0; value: 0 + 2*v2 + 5*v3 -51 <= 0; value: -24 + 2*v1 + 6*v2 -20 <= 0; value: -8 + v0 -6*v1 -12 < 0; value: -28 0: 1 5 1: 2 4 5 2: 1 2 3 4 3: 1 2 3 optimal: (2966/279 -e*1) + + 2966/279 < 0; value: 2966/279 - -5*v0 + 2*v2 + 2*v3 -2 <= 0; value: 0 - 2*v1 -3*v2 + 2*v3 -13 = 0; value: 0 - 93/10*v0 -37 <= 0; value: 0 + -4244/279 < 0; value: -4244/279 - 16*v0 -15*v2 -45 < 0; value: -170/93 0: 1 5 3 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 3 5 4 0: 2 -> 370/93 1: 3 -> -32/31 2: 1 -> 127/93 3: 5 -> 297/31 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 2*v1 + 2 = 0; value: 0 + -1*v2 + 4 = 0; value: 0 + 2*v0 + 2*v1 -17 <= 0; value: -11 + 6*v0 -4*v1 <= 0; value: -2 + 2*v0 -2 = 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3: optimal: -2 + -2 <= 0; value: -2 - -6*v0 + 2*v1 + 2 = 0; value: 0 + -1*v2 + 4 = 0; value: 0 + -11 <= 0; value: -11 + -2 <= 0; value: -2 - 2*v0 -2 = 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3: 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 6 = 0; value: 0 + -1*v1 -4*v3 <= 0; value: 0 + 3*v0 -6*v1 <= 0; value: 0 + 3*v0 -4*v2 + 2 <= 0; value: -2 + 4*v2 + 4*v3 -4 <= 0; value: 0 0: 3 4 1: 2 3 2: 1 4 5 3: 2 5 optimal: 0 + <= 0; value: 0 - -6*v2 + 6 = 0; value: 0 - -1*v1 -4*v3 <= 0; value: 0 - 3*v0 <= 0; value: 0 + -2 <= 0; value: -2 - 4*v2 + 4*v3 -4 <= 0; value: 0 0: 3 4 1: 2 3 2: 1 4 5 3 3: 2 5 3 0: 0 -> 0 1: 0 -> 0 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 6*v1 -3*v3 <= 0; value: 0 + -3*v1 + 3*v3 -12 <= 0; value: -6 + v2 -4 <= 0; value: -2 + -1*v1 <= 0; value: -2 + -3*v1 + 6*v2 -10 < 0; value: -4 0: 1: 1 2 4 5 2: 3 5 3: 1 2 optimal: oo + 2*v0 < 0; value: 10 + -3*v3 < 0; value: -12 + 3*v3 -12 <= 0; value: 0 + -7/3 <= 0; value: -7/3 - -2*v2 + 10/3 <= 0; value: 0 - -3*v1 + 6*v2 -10 < 0; value: -3 0: 1: 1 2 4 5 2: 3 5 4 2 1 3: 1 2 0: 5 -> 5 1: 2 -> 1 2: 2 -> 5/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + v0 -4*v3 < 0; value: -8 + -3*v1 -2*v2 + 5 <= 0; value: -4 + 4*v3 -35 <= 0; value: -23 + 2*v1 -5*v3 -7 <= 0; value: -16 + -4*v0 -1*v1 + 3 <= 0; value: -16 0: 1 5 1: 2 4 5 2: 2 3: 1 3 4 optimal: (344 -e*1) + + 344 < 0; value: 344 - v0 -4*v3 < 0; value: -1 - -3*v1 -2*v2 + 5 <= 0; value: 0 - 4*v3 -35 <= 0; value: 0 + -1299/4 < 0; value: -1299/4 - -4*v0 + 2/3*v2 + 4/3 <= 0; value: 0 0: 1 5 4 1: 2 4 5 2: 2 5 4 3: 1 3 4 0: 4 -> 34 1: 3 -> -133 2: 0 -> 202 3: 3 -> 35/4 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 -1 < 0; value: -4 + -5*v1 -2*v3 <= 0; value: -2 + 5*v0 -4*v2 -3*v3 -4 <= 0; value: 0 + v0 -3 <= 0; value: 0 + 2*v0 + 3*v1 -14 < 0; value: -8 0: 1 3 4 5 1: 2 5 2: 3 3: 2 3 optimal: oo + 2*v0 + 4/5*v3 <= 0; value: 34/5 + -1*v0 -1 < 0; value: -4 - -5*v1 -2*v3 <= 0; value: 0 + 5*v0 -4*v2 -3*v3 -4 <= 0; value: 0 + v0 -3 <= 0; value: 0 + 2*v0 -6/5*v3 -14 < 0; value: -46/5 0: 1 3 4 5 1: 2 5 2: 3 3: 2 3 5 0: 3 -> 3 1: 0 -> -2/5 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -1 <= 0; value: -5 + v1 -2*v2 + 1 <= 0; value: 0 + 3*v0 -5*v3 + 11 <= 0; value: -8 + 5*v2 -6*v3 + 20 = 0; value: 0 + -5*v1 -3*v3 + 5 <= 0; value: -25 0: 1 3 1: 2 5 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 + v2 + 2 <= 0; value: 8 + -2*v0 -1 <= 0; value: -5 + -5/2*v2 <= 0; value: -5 + 3*v0 -25/6*v2 -17/3 <= 0; value: -8 - 5*v2 -6*v3 + 20 = 0; value: 0 - -5*v1 -3*v3 + 5 <= 0; value: 0 0: 1 3 1: 2 5 2: 2 4 3 3: 3 4 5 2 0: 2 -> 2 1: 3 -> -2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 2*v0 -2*v1 + 3 < 0; value: -5 + -2*v0 -4*v3 -5 <= 0; value: -11 + -4*v1 + 2*v3 + 6 <= 0; value: -12 + 4*v1 -1*v2 -30 <= 0; value: -11 + -2*v2 + 2 = 0; value: 0 0: 1 2 1: 1 3 4 2: 4 5 3: 2 3 optimal: (-3 -e*1) + -3 < 0; value: -3 - 2*v0 -2*v1 + 3 < 0; value: -2 + -2*v0 -4*v3 -5 <= 0; value: -11 + -4*v0 + 2*v3 <= 0; value: -2 + 4*v0 -1*v2 -24 < 0; value: -21 + -2*v2 + 2 = 0; value: 0 0: 1 2 3 4 1: 1 3 4 2: 4 5 3: 2 3 0: 1 -> 1 1: 5 -> 7/2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + <= 0; value: 0 + -5*v1 -10 <= 0; value: -30 + -3*v0 -5*v3 + 28 = 0; value: 0 + 4*v0 -4 <= 0; value: 0 + -2*v0 -5*v1 + 15 <= 0; value: -7 0: 3 4 5 1: 2 5 2: 3: 3 optimal: -16/5 + -16/5 <= 0; value: -16/5 + <= 0; value: 0 + -23 <= 0; value: -23 - -3*v0 -5*v3 + 28 = 0; value: 0 - -20/3*v3 + 100/3 <= 0; value: 0 - -2*v0 -5*v1 + 15 <= 0; value: 0 0: 3 4 5 2 1: 2 5 2: 3: 3 4 2 0: 1 -> 1 1: 4 -> 13/5 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 6*v3 -78 < 0; value: -42 + 2*v0 -3*v1 + 4*v2 -1 <= 0; value: 0 + -5*v0 + 4*v1 + 3 = 0; value: 0 + -1*v0 + 3*v1 -6*v3 + 12 <= 0; value: -12 + 5*v0 -2*v1 -4*v2 -5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 5 3: 1 4 optimal: 0 + <= 0; value: 0 + 6*v3 -72 < 0; value: -42 - 2*v0 -3*v1 + 4*v2 -1 <= 0; value: 0 - 3/5*v0 -9/5 = 0; value: 0 + -6*v3 + 18 <= 0; value: -12 - 11/3*v0 -20/3*v2 -13/3 = 0; value: 0 0: 2 3 4 5 1 1: 1 2 3 4 5 2: 2 5 3 1 4 3: 1 4 0: 3 -> 3 1: 3 -> 3 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 -1*v2 + 6*v3 + 17 = 0; value: 0 + 5*v0 + 6*v2 + v3 -54 <= 0; value: -28 + 3*v3 = 0; value: 0 + -3*v1 -6*v3 + 6 = 0; value: 0 + -3*v0 + 2*v2 -6*v3 + 10 = 0; value: 0 0: 1 2 5 1: 4 2: 1 2 5 3: 1 2 3 4 5 optimal: 4 + + 4 <= 0; value: 4 - -4*v0 -1*v2 + 6*v3 + 17 = 0; value: 0 + -28 <= 0; value: -28 - 11/2*v0 -22 = 0; value: 0 - -3*v1 -6*v3 + 6 = 0; value: 0 - -7*v0 + v2 + 27 = 0; value: 0 0: 1 2 5 3 1: 4 2: 1 2 5 3 3: 1 2 3 4 5 0: 4 -> 4 1: 2 -> 2 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -3*v2 -3*v3 + 16 = 0; value: 0 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 5*v2 -2*v3 -1 <= 0; value: 0 + -3*v1 + 3*v2 -4 <= 0; value: -1 + v0 -4*v3 + 3 <= 0; value: -13 0: 2 3 5 1: 1 4 2: 1 3 4 3: 1 3 5 optimal: 66/13 + + 66/13 <= 0; value: 66/13 - 4*v1 -3*v2 -3*v3 + 16 = 0; value: 0 - -6*v0 + 24 = 0; value: 0 - -1*v0 + 5*v2 -2*v3 -1 <= 0; value: 0 - 9/8*v0 -39/8*v2 + 73/8 <= 0; value: 0 + -427/39 <= 0; value: -427/39 0: 2 3 5 4 1: 1 4 2: 1 3 4 5 3: 1 3 5 4 0: 4 -> 4 1: 2 -> 19/13 2: 3 -> 109/39 3: 5 -> 175/39 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -6*v2 -1*v3 + 14 = 0; value: 0 + 3*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + 6*v2 -9 < 0; value: -3 + 5*v0 -2*v2 -54 < 0; value: -31 0: 5 1: 1 2: 1 4 5 3: 1 2 3 optimal: (203/10 -e*1) + + 203/10 < 0; value: 203/10 - -4*v1 -6*v2 -1*v3 + 14 = 0; value: 0 - 3*v3 <= 0; value: 0 + <= 0; value: 0 - 6*v2 -9 < 0; value: -3/2 - 5*v0 -57 < 0; value: -5 0: 5 1: 1 2: 1 4 5 3: 1 2 3 0: 5 -> 52/5 1: 2 -> 13/8 2: 1 -> 5/4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 -58 <= 0; value: -34 + v0 + 3*v2 -6*v3 -5 = 0; value: 0 + v0 + 4*v1 -21 = 0; value: 0 + -4*v0 + 2*v2 -4*v3 -16 <= 0; value: -36 + -3*v1 + 4 < 0; value: -8 0: 2 3 4 1: 3 5 2: 1 2 4 3: 2 4 optimal: (86/3 -e*1) + + 86/3 < 0; value: 86/3 + 6*v2 -58 <= 0; value: -34 - v0 + 3*v2 -6*v3 -5 = 0; value: 0 - v0 + 4*v1 -21 = 0; value: 0 + -772/9 < 0; value: -772/9 - -9/4*v2 + 9/2*v3 -8 < 0; value: -4 0: 2 3 4 5 1: 3 5 2: 1 2 4 5 3: 2 4 5 0: 5 -> 31/3 1: 4 -> 8/3 2: 4 -> 4 3: 2 -> 26/9 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -1*v1 + 6*v2 + 16 = 0; value: 0 + 4*v1 -34 <= 0; value: -18 + v0 + 3*v1 -16 = 0; value: 0 + 4*v0 + 4*v3 -38 < 0; value: -22 + 5*v1 + 5*v3 -49 < 0; value: -29 0: 1 3 4 1: 1 2 3 5 2: 1 3: 4 5 optimal: oo + -8/3*v3 + 44/3 < 0; value: 44/3 - -3*v0 -1*v1 + 6*v2 + 16 = 0; value: 0 + 4/3*v3 -76/3 < 0; value: -76/3 - -8*v0 + 18*v2 + 32 = 0; value: 0 - 4*v0 + 4*v3 -38 < 0; value: -4 + 20/3*v3 -229/6 < 0; value: -229/6 0: 1 3 4 2 5 1: 1 2 3 5 2: 1 3 2 5 3: 4 5 2 0: 4 -> 17/2 1: 4 -> 5/2 2: 0 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 6*v3 <= 0; value: 0 + -5*v2 <= 0; value: 0 + -2*v0 + 6*v3 + 1 < 0; value: -7 + 4*v3 <= 0; value: 0 + -6*v1 = 0; value: 0 0: 3 1: 5 2: 2 3: 1 3 4 optimal: oo + 2*v0 <= 0; value: 8 + 6*v3 <= 0; value: 0 + -5*v2 <= 0; value: 0 + -2*v0 + 6*v3 + 1 < 0; value: -7 + 4*v3 <= 0; value: 0 - -6*v1 = 0; value: 0 0: 3 1: 5 2: 2 3: 1 3 4 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + v2 + v3 -12 < 0; value: -6 + 3*v1 = 0; value: 0 + 3*v1 -6*v2 + 24 = 0; value: 0 + 6*v0 + 5*v1 -2*v3 -28 <= 0; value: -14 + 4*v0 -5*v1 -1*v3 -10 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 1 3 3: 1 4 5 optimal: (9 -e*1) + + 9 < 0; value: 9 - v2 + v3 -12 < 0; value: -1 - 3*v1 = 0; value: 0 - -6*v2 + 24 = 0; value: 0 + -17 < 0; value: -17 - 4*v0 -1*v3 -10 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 1 3 4 3: 1 4 5 0: 3 -> 17/4 1: 0 -> 0 2: 4 -> 4 3: 2 -> 7 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -5*v3 -25 = 0; value: 0 + -2*v2 + v3 -8 < 0; value: -17 + -1*v2 + 5*v3 <= 0; value: 0 + 4*v1 -36 < 0; value: -20 + v2 -5 = 0; value: 0 0: 1 1: 4 2: 2 3 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -5*v3 -25 = 0; value: 0 + -2*v2 + v3 -8 < 0; value: -17 + -1*v2 + 5*v3 <= 0; value: 0 + 4*v1 -36 < 0; value: -20 + v2 -5 = 0; value: 0 0: 1 1: 4 2: 2 3 5 3: 1 2 3 0: 5 -> 5 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -1*v2 -15 < 0; value: -4 + v3 -10 < 0; value: -5 + -5*v0 -4*v1 -3*v3 -27 <= 0; value: -56 + 4*v2 + v3 -25 <= 0; value: -16 + -2*v0 -1*v3 -1 <= 0; value: -10 0: 1 3 5 1: 3 2: 1 4 3: 2 3 4 5 optimal: (681/16 -e*1) + + 681/16 < 0; value: 681/16 - 6*v0 -1*v2 -15 < 0; value: -27/8 - v3 -10 < 0; value: -1 - -5*v0 -4*v1 -3*v3 -27 <= 0; value: 0 - 4*v2 -15 <= 0; value: 0 + -69/4 < 0; value: -69/4 0: 1 3 5 1: 3 2: 1 4 5 3: 2 3 4 5 0: 2 -> 41/16 1: 1 -> -1069/64 2: 1 -> 15/4 3: 5 -> 9 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -5*v1 -1*v3 + 15 <= 0; value: -5 + -3*v2 + 2*v3 <= 0; value: 0 + -2*v0 + 3*v3 <= 0; value: 0 + -6*v1 + 5*v3 + 24 = 0; value: 0 + -6*v0 + 5*v1 + 5*v2 -38 <= 0; value: -18 0: 1 3 5 1: 1 4 5 2: 2 5 3: 1 2 3 4 optimal: oo + 112/31*v0 -198/31 <= 0; value: -198/31 - -5*v0 -31/6*v3 -5 <= 0; value: 0 + -60/31*v0 -3*v2 -60/31 <= 0; value: -60/31 + -152/31*v0 -90/31 <= 0; value: -90/31 - -6*v1 + 5*v3 + 24 = 0; value: 0 + -311/31*v0 + 5*v2 -683/31 <= 0; value: -683/31 0: 1 3 5 2 1: 1 4 5 2: 2 5 3: 1 2 3 4 5 0: 0 -> 0 1: 4 -> 99/31 2: 0 -> 0 3: 0 -> -30/31 + 2*v0 -2*v1 <= 0; value: -8 + -2*v1 -3*v2 + 3 <= 0; value: -13 + v1 + 6*v2 -40 <= 0; value: -23 + 6*v0 + 5*v1 -31 = 0; value: 0 + -1*v1 -3*v2 + 11 = 0; value: 0 + 5*v1 -4*v2 -1*v3 -26 <= 0; value: -11 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3: 5 optimal: 119/3 + + 119/3 <= 0; value: 119/3 - 3*v2 -19 <= 0; value: 0 + -10 <= 0; value: -10 - 6*v0 + 5*v1 -31 = 0; value: 0 - 6/5*v0 -3*v2 + 24/5 = 0; value: 0 + -1*v3 -274/3 <= 0; value: -280/3 0: 3 1 4 2 5 1: 1 2 3 4 5 2: 1 2 4 5 3: 5 0: 1 -> 71/6 1: 5 -> -8 2: 2 -> 19/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + 2*v2 + 2*v3 -5 < 0; value: -15 + -4*v2 + 4*v3 -1 <= 0; value: -5 + -1*v0 -6*v1 -1*v2 + 13 = 0; value: 0 + 4*v0 + 2*v1 -18 = 0; value: 0 + -2*v1 + v3 <= 0; value: 0 0: 1 3 4 1: 3 4 5 2: 1 2 3 3: 1 2 5 optimal: (16 -e*1) + + 16 < 0; value: 16 - -9/4*v3 -21/2 < 0; value: -9/4 + -105 < 0; value: -105 - -1*v0 -6*v1 -1*v2 + 13 = 0; value: 0 - 11/3*v0 -1/3*v2 -41/3 = 0; value: 0 - 4*v0 + v3 -18 <= 0; value: 0 0: 1 3 4 5 2 1: 3 4 5 2: 1 2 3 4 5 3: 1 2 5 0: 4 -> 65/12 1: 1 -> -11/6 2: 3 -> 223/12 3: 2 -> -11/3 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 6*v1 -13 <= 0; value: -5 + -5*v1 + 2 < 0; value: -18 + 4*v0 + 6*v3 -69 <= 0; value: -41 + -1*v1 + 4 <= 0; value: 0 + 4*v1 -4*v2 + 5*v3 -19 < 0; value: -5 0: 1 3 1: 1 2 4 5 2: 5 3: 3 5 optimal: oo + -3*v3 + 53/2 <= 0; value: 41/2 + 6*v3 -58 <= 0; value: -46 + -18 < 0; value: -18 - 4*v0 + 6*v3 -69 <= 0; value: 0 - -1*v1 + 4 <= 0; value: 0 + -4*v2 + 5*v3 -3 < 0; value: -5 0: 1 3 1: 1 2 4 5 2: 5 3: 3 5 1 0: 4 -> 57/4 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -47 < 0; value: -27 + v0 -7 <= 0; value: -4 + 5*v3 -48 <= 0; value: -28 + -1*v0 + v1 -3*v2 + 9 < 0; value: -1 + -6*v1 -1*v3 -31 <= 0; value: -65 0: 2 4 1: 4 5 2: 1 4 3: 3 5 optimal: 413/15 + + 413/15 <= 0; value: 413/15 + 5*v2 -47 < 0; value: -27 - v0 -7 <= 0; value: 0 - 5*v3 -48 <= 0; value: 0 + -3*v2 -143/30 < 0; value: -503/30 - -6*v1 -1*v3 -31 <= 0; value: 0 0: 2 4 1: 4 5 2: 1 4 3: 3 5 4 0: 3 -> 7 1: 5 -> -203/30 2: 4 -> 4 3: 4 -> 48/5 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 + 6*v1 -5*v2 + 1 <= 0; value: 0 + -4*v1 -5*v2 -17 <= 0; value: -36 + -6*v1 + 3*v2 -8 <= 0; value: -5 + -6*v3 -2 <= 0; value: -32 + 6*v1 -3*v2 -6*v3 -17 <= 0; value: -50 0: 1 1: 1 2 3 5 2: 1 2 3 5 3: 4 5 optimal: oo + v0 + 37/6 <= 0; value: 61/6 - 2*v0 -2*v2 -7 <= 0; value: 0 + -7*v0 + 77/6 <= 0; value: -91/6 - -6*v1 + 3*v2 -8 <= 0; value: 0 + -6*v3 -2 <= 0; value: -32 + -6*v3 -25 <= 0; value: -55 0: 1 2 1: 1 2 3 5 2: 1 2 3 5 3: 4 5 0: 4 -> 4 1: 1 -> -13/12 2: 3 -> 1/2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 + 6*v2 + 2 = 0; value: 0 + -4*v0 + 2*v2 + 6 <= 0; value: -4 + -3*v0 -4*v3 + 9 < 0; value: -12 + -1*v0 + v2 + 2 = 0; value: 0 + 5*v1 -2*v2 -8 <= 0; value: 0 0: 2 3 4 1: 1 5 2: 1 2 4 5 3: 3 optimal: 4 + + 4 <= 0; value: 4 - -4*v1 + 6*v2 + 2 = 0; value: 0 - -2*v0 + 2 <= 0; value: 0 + -4*v3 + 6 < 0; value: -6 - -1*v0 + v2 + 2 = 0; value: 0 + -11 <= 0; value: -11 0: 2 3 4 5 1: 1 5 2: 1 2 4 5 3: 3 0: 3 -> 1 1: 2 -> -1 2: 1 -> -1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + v2 -1*v3 + 2 = 0; value: 0 + 3*v0 + 6*v2 -46 <= 0; value: -13 + 4*v1 + 3*v2 -62 <= 0; value: -41 + 5*v0 -5*v1 + 5*v2 -66 <= 0; value: -41 + 5*v0 + v1 + 5*v3 -113 <= 0; value: -75 0: 2 4 5 1: 1 3 4 5 2: 1 2 3 4 3: 1 5 optimal: oo + -2*v2 + 132/5 <= 0; value: 102/5 - -1*v1 + v2 -1*v3 + 2 = 0; value: 0 + 3*v0 + 6*v2 -46 <= 0; value: -13 + 4*v0 + 7*v2 -574/5 <= 0; value: -369/5 - 5*v0 + 5*v3 -76 <= 0; value: 0 + v0 + v2 -251/5 <= 0; value: -211/5 0: 2 4 5 3 1: 1 3 4 5 2: 1 2 3 4 5 3: 1 5 4 3 0: 5 -> 5 1: 3 -> -26/5 2: 3 -> 3 3: 2 -> 51/5 + 2*v0 -2*v1 <= 0; value: 8 + -6*v0 + v1 -14 < 0; value: -38 + 2*v2 <= 0; value: 0 + -2*v1 -3*v3 -4 < 0; value: -10 + -6*v3 + 12 <= 0; value: 0 + v0 -6*v2 -7 <= 0; value: -3 0: 1 5 1: 1 3 2: 2 5 3: 3 4 optimal: oo + 2*v0 + 3*v3 + 4 < 0; value: 18 + -6*v0 -3/2*v3 -16 < 0; value: -43 + 2*v2 <= 0; value: 0 - -2*v1 -3*v3 -4 < 0; value: -2 + -6*v3 + 12 <= 0; value: 0 + v0 -6*v2 -7 <= 0; value: -3 0: 1 5 1: 1 3 2: 2 5 3: 3 4 1 0: 4 -> 4 1: 0 -> -4 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 -6 < 0; value: -1 + 2*v3 -6 < 0; value: -2 + -5*v1 -4*v3 -20 <= 0; value: -43 + -6*v0 + 4*v1 + 2*v3 <= 0; value: -2 + 2*v1 -2*v2 -5*v3 + 6 = 0; value: 0 0: 4 1: 3 4 5 2: 1 5 3: 2 3 4 5 optimal: oo + 2*v0 + 64/5 < 0; value: 94/5 + -121/2 < 0; value: -121/2 - -20/33*v2 -218/33 < 0; value: -20/33 - -5*v2 -33/2*v3 -5 <= 0; value: 0 + -6*v0 -98/5 < 0; value: -188/5 - 2*v1 -2*v2 -5*v3 + 6 = 0; value: 0 0: 4 1: 3 4 5 2: 1 5 3 4 2 3: 2 3 4 5 0: 3 -> 3 1: 3 -> -1016/165 2: 1 -> -99/10 3: 2 -> 89/33 + 2*v0 -2*v1 <= 0; value: 10 + -2*v0 + 4*v3 -29 <= 0; value: -19 + -3*v0 -2*v1 -3 <= 0; value: -18 + -2*v1 -6*v2 + 3 <= 0; value: -15 + -1*v0 + 3*v1 + 4 < 0; value: -1 + 3*v0 -3*v1 -4*v3 -2 <= 0; value: -7 0: 1 2 4 5 1: 2 3 4 5 2: 3 3: 1 5 optimal: oo + 4/3*v0 + 62/3 <= 0; value: 82/3 - v0 + 9*v2 -71/2 <= 0; value: 0 + -11/3*v0 + 53/3 <= 0; value: -2/3 - -2*v0 -6*v2 + 8/3*v3 + 13/3 <= 0; value: 0 + -27 < 0; value: -27 - 3*v0 -3*v1 -4*v3 -2 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 4 5 2: 3 2 1 4 3: 1 5 2 3 4 0: 5 -> 5 1: 0 -> -26/3 2: 3 -> 61/18 3: 5 -> 39/4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + 6*v3 -9 <= 0; value: -3 + 4*v1 + 4*v3 -10 <= 0; value: -6 + 2*v0 + 6*v3 -7 <= 0; value: -3 + -5*v1 + v2 + 2 = 0; value: 0 + -2*v0 + 4 = 0; value: 0 0: 1 3 5 1: 2 4 2: 4 3: 1 2 3 optimal: oo + 2*v0 -2/5*v2 -4/5 <= 0; value: 2 + 3*v0 + 6*v3 -9 <= 0; value: -3 + 4/5*v2 + 4*v3 -42/5 <= 0; value: -6 + 2*v0 + 6*v3 -7 <= 0; value: -3 - -5*v1 + v2 + 2 = 0; value: 0 + -2*v0 + 4 = 0; value: 0 0: 1 3 5 1: 2 4 2: 4 2 3: 1 2 3 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -2*v2 + 15 = 0; value: 0 + 4*v1 -2*v3 + 2 <= 0; value: -4 + -4*v2 + 4*v3 + 4 <= 0; value: -4 + <= 0; value: 0 + v3 -3 = 0; value: 0 0: 1 1: 2 2: 1 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -2*v2 + 15 = 0; value: 0 + 4*v1 -2*v3 + 2 <= 0; value: -4 + -4*v2 + 4*v3 + 4 <= 0; value: -4 + <= 0; value: 0 + v3 -3 = 0; value: 0 0: 1 1: 2 2: 1 3 3: 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -4*v1 -3*v2 -4 <= 0; value: -23 + 6*v0 + 5*v1 + 2*v3 -39 = 0; value: 0 + 3*v0 -6*v2 + 12 = 0; value: 0 + 6*v1 + 3*v2 -60 < 0; value: -21 + -5*v0 + 3*v2 + 1 <= 0; value: 0 0: 1 2 3 5 1: 1 2 4 2: 1 3 4 5 3: 2 optimal: (68/9 -e*1) + + 68/9 < 0; value: 68/9 - 49/5*v0 -3*v2 + 8/5*v3 -176/5 <= 0; value: 0 - 6*v0 + 5*v1 + 2*v3 -39 = 0; value: 0 - 3*v0 -6*v2 + 12 = 0; value: 0 - 27/4*v0 -69 < 0; value: -27/4 + -259/9 < 0; value: -259/9 0: 1 2 3 5 4 1: 1 2 4 2: 1 3 4 5 3: 2 1 4 0: 2 -> 83/9 1: 5 -> 401/72 2: 3 -> 119/18 3: 1 -> -3181/144 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + 2*v2 + v3 -36 <= 0; value: -20 + -1*v0 + 3*v2 -5*v3 -2 < 0; value: -1 + 2*v1 + 3*v2 -37 < 0; value: -18 + -3*v1 + 3*v3 <= 0; value: 0 + -4*v1 -1*v2 + 3 <= 0; value: -10 0: 2 1: 1 3 4 5 2: 1 2 3 5 3: 1 2 4 optimal: (574/5 -e*1) + + 574/5 < 0; value: 574/5 + -16 <= 0; value: -16 - -1*v0 + 3*v2 -5*v3 -2 < 0; value: -5 - 10/17*v0 -546/17 < 0; value: -10/17 - -3*v1 + 3*v3 <= 0; value: 0 - 4/5*v0 -17/5*v2 + 23/5 <= 0; value: 0 0: 2 5 1 3 1: 1 3 4 5 2: 1 2 3 5 3: 1 2 4 5 3 0: 4 -> 268/5 1: 2 -> -148/85 2: 5 -> 1187/85 3: 2 -> -148/85 + 2*v0 -2*v1 <= 0; value: -8 + 2*v2 + v3 -9 <= 0; value: -4 + -5*v1 + 6*v2 -6*v3 + 19 = 0; value: 0 + 4*v1 -20 = 0; value: 0 + 5*v2 -1*v3 -22 <= 0; value: -13 + 6*v0 + 2*v2 + v3 -29 <= 0; value: -18 0: 5 1: 2 3 2: 1 2 4 5 3: 1 2 4 5 optimal: oo + -1*v2 <= 0; value: -2 + 3*v2 -10 <= 0; value: -4 - -5*v1 + 6*v2 -6*v3 + 19 = 0; value: 0 - 24/5*v2 -24/5*v3 -24/5 = 0; value: 0 + 4*v2 -21 <= 0; value: -13 - 6*v0 + 3*v2 -30 <= 0; value: 0 0: 5 1: 2 3 2: 1 2 4 5 3 3: 1 2 4 5 3 0: 1 -> 4 1: 5 -> 5 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -16 <= 0; value: -8 + -3*v0 + 4*v1 + 4*v2 -38 < 0; value: -21 + -4*v0 + v1 -4*v2 -18 <= 0; value: -55 + v1 -1*v2 -4*v3 -8 < 0; value: -18 + 3*v1 -6*v2 + 6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 2 3 4 5 3: 1 4 5 optimal: oo + 2*v0 -4*v2 + 4*v3 + 6 <= 0; value: 4 + 4*v2 -3*v3 -22 <= 0; value: -8 + -3*v0 + 12*v2 -8*v3 -50 < 0; value: -21 + -4*v0 -2*v2 -2*v3 -21 <= 0; value: -55 + v2 -6*v3 -11 < 0; value: -18 - 3*v1 -6*v2 + 6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 2 3 4 5 1 3: 1 4 5 2 3 0: 5 -> 5 1: 3 -> 3 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 + 5*v3 -28 <= 0; value: -18 + -3*v0 <= 0; value: 0 + 6*v0 + 6*v1 -68 < 0; value: -38 + 5*v2 -5*v3 -5 < 0; value: -15 + 5*v2 + 4*v3 -21 <= 0; value: -13 0: 1 2 3 1: 3 2: 4 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 + 5*v3 -28 <= 0; value: -18 + -3*v0 <= 0; value: 0 + 6*v0 + 6*v1 -68 < 0; value: -38 + 5*v2 -5*v3 -5 < 0; value: -15 + 5*v2 + 4*v3 -21 <= 0; value: -13 0: 1 2 3 1: 3 2: 4 5 3: 1 4 5 0: 0 -> 0 1: 5 -> 5 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 -6 < 0; value: -3 + 5*v1 -2*v3 -7 <= 0; value: -2 + -3*v0 -2*v1 < 0; value: -2 + -3*v1 -6*v2 + 4*v3 + 31 <= 0; value: -2 + 2*v1 -3*v3 -4 <= 0; value: -2 0: 3 1: 1 2 3 4 5 2: 4 3: 2 4 5 optimal: oo + 60*v2 -770/3 < 0; value: 130/3 + -54*v2 + 225 < 0; value: -45 + -66*v2 + 278 < 0; value: -52 - -3*v0 + 4*v2 -8/3*v3 -62/3 < 0; value: -8/3 - -3*v1 -6*v2 + 4*v3 + 31 <= 0; value: 0 - 3/8*v0 -9/2*v2 + 77/4 <= 0; value: 0 0: 3 5 2 1 1: 1 2 3 4 5 2: 4 3 1 2 5 1 3: 2 4 5 3 1 0: 0 -> 26/3 1: 1 -> -35/3 2: 5 -> 5 3: 0 -> -9 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 5*v1 + 6*v2 -100 <= 0; value: -45 + -4*v0 -1*v1 + 4 < 0; value: -17 + v0 -5*v2 + 3*v3 + 1 < 0; value: -1 + 4*v0 -23 <= 0; value: -7 + 2*v0 -6*v3 -3 < 0; value: -13 0: 1 2 3 4 5 1: 1 2 2: 1 3 3: 3 5 optimal: (99/2 -e*1) + + 99/2 < 0; value: 99/2 + 6*v2 -711/4 < 0; value: -639/4 - -4*v0 -1*v1 + 4 < 0; value: -1 - v0 -5*v2 + 3*v3 + 1 < 0; value: -7/8 - 20*v2 -12*v3 -27 <= 0; value: 0 + -10*v2 + 22 <= 0; value: -8 0: 1 2 3 4 5 1: 1 2 2: 1 3 4 5 3: 3 5 4 1 0: 4 -> 39/8 1: 5 -> -29/2 2: 3 -> 3 3: 3 -> 11/4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -15 <= 0; value: -33 + 4*v1 -34 < 0; value: -22 + 2*v0 -5*v3 -3 <= 0; value: -7 + -6*v0 + 3*v2 + 1 <= 0; value: -17 + 6*v3 -22 < 0; value: -10 0: 1 3 4 1: 2 2: 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -15 <= 0; value: -33 + 4*v1 -34 < 0; value: -22 + 2*v0 -5*v3 -3 <= 0; value: -7 + -6*v0 + 3*v2 + 1 <= 0; value: -17 + 6*v3 -22 < 0; value: -10 0: 1 3 4 1: 2 2: 4 3: 3 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -4*v3 -3 < 0; value: -18 + 4*v0 -30 <= 0; value: -10 + 4*v1 -4*v2 -3*v3 -8 = 0; value: 0 + v0 -6*v2 -6*v3 -6 < 0; value: -1 + 3*v0 + v2 -15 = 0; value: 0 0: 1 2 4 5 1: 3 2: 3 4 5 3: 1 3 4 optimal: (115/8 -e*1) + + 115/8 < 0; value: 115/8 + -113/2 <= 0; value: -113/2 - 4*v0 -30 <= 0; value: 0 - 4*v1 -4*v2 -3*v3 -8 = 0; value: 0 - v0 -6*v2 -6*v3 -6 < 0; value: -6 - 3*v0 + v2 -15 = 0; value: 0 0: 1 2 4 5 1: 3 2: 3 4 5 1 3: 1 3 4 0: 5 -> 15/2 1: 2 -> 17/16 2: 0 -> -15/2 3: 0 -> 35/4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -4*v2 -5*v3 + 1 <= 0; value: -8 + 3*v0 -17 <= 0; value: -2 + -1*v0 + 2*v2 + 3*v3 -20 <= 0; value: -11 + -5*v0 + 4*v2 -1*v3 + 25 = 0; value: 0 + -2*v0 + 6*v1 -1*v3 -10 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 1 3 4 3: 1 3 4 5 optimal: 92/27 + + 92/27 <= 0; value: 92/27 - 28*v0 -24*v2 -124 <= 0; value: 0 - 3*v0 -17 <= 0; value: 0 + -139/9 <= 0; value: -139/9 - -5*v0 + 4*v2 -1*v3 + 25 = 0; value: 0 - -2*v0 + 6*v1 -1*v3 -10 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 1 3 4 3: 1 3 4 5 0: 5 -> 17/3 1: 4 -> 107/27 2: 1 -> 13/9 3: 4 -> 22/9 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 -2*v2 + 3 < 0; value: -19 + 4*v0 -1*v1 -17 = 0; value: 0 + -1*v2 -2*v3 + 7 <= 0; value: 0 + v0 + 6*v1 -45 <= 0; value: -22 + 4*v2 + v3 -33 < 0; value: -12 0: 2 4 1: 1 2 4 2: 1 3 5 3: 3 5 optimal: (767/56 -e*1) + + 767/56 < 0; value: 767/56 - -16*v0 -2*v2 + 71 < 0; value: -82/7 - 4*v0 -1*v1 -17 = 0; value: 0 - -7/4*v3 -5/4 < 0; value: -3/2 + -6989/112 < 0; value: -6989/112 - 4*v2 + v3 -33 < 0; value: -4 0: 2 4 1 1: 1 2 4 2: 1 3 5 4 3: 3 5 4 0: 5 -> 239/56 1: 3 -> 1/14 2: 5 -> 101/14 3: 1 -> 1/7 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 -1*v2 -4 < 0; value: -36 + -5*v0 + 5*v1 + 2*v2 -14 = 0; value: 0 + 6*v1 -70 < 0; value: -40 + -1*v0 + 2 <= 0; value: -1 + 3*v0 -9 = 0; value: 0 0: 2 4 5 1: 1 2 3 2: 1 2 3: optimal: (116/7 -e*1) + + 116/7 < 0; value: 116/7 - -6*v0 + 7/5*v2 -104/5 < 0; value: -7/5 - -5*v0 + 5*v1 + 2*v2 -14 = 0; value: 0 + -712/7 < 0; value: -712/7 + -1 <= 0; value: -1 - 3*v0 -9 = 0; value: 0 0: 2 4 5 1 3 1: 1 2 3 2: 1 2 3 3: 0: 3 -> 3 1: 5 -> -171/35 2: 2 -> 187/7 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 4*v2 -11 = 0; value: 0 + -4*v0 + 5*v3 -16 <= 0; value: -36 + 4*v1 -3*v2 -8 = 0; value: 0 + -4*v0 + 4*v1 <= 0; value: 0 + 5*v1 + v2 -68 <= 0; value: -39 0: 1 2 4 1: 3 4 5 2: 1 3 5 3: 2 optimal: 1014/19 + + 1014/19 <= 0; value: 1014/19 - -1*v0 + 4*v2 -11 = 0; value: 0 + 5*v3 -3180/19 <= 0; value: -3180/19 - 4*v1 -3*v2 -8 = 0; value: 0 + -2028/19 <= 0; value: -2028/19 - 19/16*v0 -719/16 <= 0; value: 0 0: 1 2 4 5 1: 3 4 5 2: 1 3 5 4 3: 2 0: 5 -> 719/19 1: 5 -> 212/19 2: 4 -> 232/19 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 + 4*v2 -26 <= 0; value: -14 + 6*v2 + 5*v3 -94 < 0; value: -56 + -6*v1 -1*v3 + 2 < 0; value: -20 + 2*v1 -6 = 0; value: 0 + 5*v0 -1*v1 + 3*v2 -6 <= 0; value: 0 0: 1 5 1: 3 4 5 2: 1 2 5 3: 2 3 optimal: oo + -6/5*v2 -12/5 <= 0; value: -6 + v2 -17 <= 0; value: -14 + 6*v2 + 5*v3 -94 < 0; value: -56 + -1*v3 -16 < 0; value: -20 - 2*v1 -6 = 0; value: 0 - 5*v0 + 3*v2 -9 <= 0; value: 0 0: 1 5 1: 3 4 5 2: 1 2 5 3: 2 3 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v2 -6*v3 + 1 <= 0; value: -5 + 3*v0 -5*v2 + 6 <= 0; value: -2 + 5*v1 + 3*v2 + 6*v3 -74 <= 0; value: -34 + 3*v2 + 2*v3 -47 <= 0; value: -29 + -6*v0 -2*v1 -3*v3 -9 <= 0; value: -46 0: 2 5 1: 3 5 2: 1 2 3 4 3: 1 3 4 5 optimal: 1499/9 + + 1499/9 <= 0; value: 1499/9 - 36/5*v0 -628/5 <= 0; value: 0 - 3*v0 -5*v2 + 6 <= 0; value: 0 + -1993/6 <= 0; value: -1993/6 - 3*v2 + 2*v3 -47 <= 0; value: 0 - -6*v0 -2*v1 -3*v3 -9 <= 0; value: 0 0: 2 5 3 1 1: 3 5 2: 1 2 3 4 3: 1 3 4 5 0: 4 -> 157/9 1: 2 -> -395/6 2: 4 -> 35/3 3: 3 -> 6 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 4*v1 + 3*v3 -10 <= 0; value: 0 + -4*v1 -2*v3 + 24 = 0; value: 0 + -3*v1 -3 <= 0; value: -15 + -6*v2 + 4*v3 -6 < 0; value: -14 + -1*v0 <= 0; value: -3 0: 1 5 1: 1 2 3 2: 4 3: 1 2 4 optimal: (34/3 -e*1) + + 34/3 < 0; value: 34/3 - -6*v0 + v3 + 14 <= 0; value: 0 - -4*v1 -2*v3 + 24 = 0; value: 0 - 9/4*v2 -75/4 <= 0; value: 0 - 24*v0 -6*v2 -62 < 0; value: -20 + -14/3 < 0; value: -14/3 0: 1 5 4 3 1: 1 2 3 2: 4 3 5 3: 1 2 4 3 0: 3 -> 23/6 1: 4 -> 3/2 2: 4 -> 25/3 3: 4 -> 9 + 2*v0 -2*v1 <= 0; value: -4 + -1*v3 + 2 <= 0; value: 0 + 4*v1 + 4*v2 -52 <= 0; value: -16 + -5*v1 -2*v3 + 29 = 0; value: 0 + 5*v0 -21 <= 0; value: -6 + -5*v1 -2*v2 -7 <= 0; value: -40 0: 4 1: 2 3 5 2: 2 5 3: 1 3 optimal: 152/5 + + 152/5 <= 0; value: 152/5 + -40 <= 0; value: -40 - 12/5*v2 -288/5 <= 0; value: 0 - -5*v1 -2*v3 + 29 = 0; value: 0 - 5*v0 -21 <= 0; value: 0 - -2*v2 + 2*v3 -36 <= 0; value: 0 0: 4 1: 2 3 5 2: 2 5 1 3: 1 3 5 2 0: 3 -> 21/5 1: 5 -> -11 2: 4 -> 24 3: 2 -> 42 + 2*v0 -2*v1 <= 0; value: 4 + 4*v0 -4*v1 + 5*v2 -31 <= 0; value: -3 + -2*v1 -6*v2 + 16 <= 0; value: -12 + 6*v2 -3*v3 -13 <= 0; value: -4 + 6*v1 + v2 + 3*v3 -31 = 0; value: 0 + -3*v1 -1*v3 + 9 <= 0; value: -2 0: 1 1: 1 2 4 5 2: 1 2 3 4 3: 3 4 5 optimal: 321/22 + + 321/22 <= 0; value: 321/22 - 4*v0 + 17/3*v2 + 2*v3 -155/3 <= 0; value: 0 - -2*v0 -17/2*v2 + 63/2 <= 0; value: 0 - 44/17*v0 -625/17 <= 0; value: 0 - 6*v1 + v2 + 3*v3 -31 = 0; value: 0 + -268/33 <= 0; value: -268/33 0: 1 2 5 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 3 4 5 2 1 0: 4 -> 625/44 1: 2 -> 76/11 2: 4 -> 4/11 3: 5 -> -119/33 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 6 = 0; value: 0 + -1*v0 -5*v3 -5 <= 0; value: -22 + 3*v1 -3*v2 + 2*v3 -9 = 0; value: 0 + 5*v0 + v2 + 5*v3 -36 <= 0; value: -10 + -3*v0 -5*v1 + 5*v2 -9 <= 0; value: -20 0: 1 2 4 5 1: 3 5 2: 3 4 5 3: 2 3 4 optimal: 48 + + 48 <= 0; value: 48 - -3*v0 + 6 = 0; value: 0 + -52 <= 0; value: -52 - 3*v1 -3*v2 + 2*v3 -9 = 0; value: 0 - 5*v0 + v2 + 5*v3 -36 <= 0; value: 0 - -19/3*v0 -2/3*v2 <= 0; value: 0 0: 1 2 4 5 1: 3 5 2: 3 4 5 5 2 3: 2 3 4 5 0: 2 -> 2 1: 2 -> -22 2: 1 -> -19 3: 3 -> 9 + 2*v0 -2*v1 <= 0; value: 0 + -3*v3 + 9 = 0; value: 0 + 6*v0 + 2*v1 -14 <= 0; value: -6 + -2*v1 -2*v2 + 2 < 0; value: -6 + -5*v1 + 4 < 0; value: -1 + 5*v0 + 6*v2 + v3 -29 <= 0; value: -3 0: 2 5 1: 2 3 4 2: 3 5 3: 1 5 optimal: (38/15 -e*1) + + 38/15 < 0; value: 38/15 - -3*v3 + 9 = 0; value: 0 - -36/5*v2 + 94/5 < 0; value: -7/5 + -217/45 <= 0; value: -217/45 - -5*v1 + 4 < 0; value: -1/2 - 5*v0 + 6*v2 + v3 -29 <= 0; value: 0 0: 2 5 1: 2 3 4 2: 3 5 2 3: 1 5 2 0: 1 -> 11/6 1: 1 -> 9/10 2: 3 -> 101/36 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 + 4*v2 + 3*v3 <= 0; value: 0 + -2*v1 + 2*v2 + 4 <= 0; value: 0 + -6*v1 + 5 <= 0; value: -7 + -4*v0 -6*v3 + 5 < 0; value: -11 + 2*v1 -4 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 2 3: 1 4 optimal: oo + 2*v0 -4 <= 0; value: -2 - -3*v1 + 4*v2 + 3*v3 <= 0; value: 0 - -2/3*v2 -2*v3 + 4 <= 0; value: 0 + -7 <= 0; value: -7 + -4*v0 -7 < 0; value: -11 - 2*v2 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 2 3 5 4 3: 1 4 2 3 5 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + v2 -3*v3 + 8 <= 0; value: -7 + -6*v1 + 5*v2 + 4*v3 -20 = 0; value: 0 + -4*v2 -1*v3 + 4 <= 0; value: -1 + -4*v1 <= 0; value: 0 + 6*v0 + v2 -36 <= 0; value: -18 0: 5 1: 2 4 2: 1 2 3 5 3: 1 2 3 optimal: 400/33 + + 400/33 <= 0; value: 400/33 + -96/11 <= 0; value: -96/11 - -6*v1 + 5*v2 + 4*v3 -20 = 0; value: 0 - -11/4*v2 -1 <= 0; value: 0 - -10/3*v2 -8/3*v3 + 40/3 <= 0; value: 0 - 6*v0 + v2 -36 <= 0; value: 0 0: 5 1: 2 4 2: 1 2 3 5 4 3: 1 2 3 4 0: 3 -> 200/33 1: 0 -> 0 2: 0 -> -4/11 3: 5 -> 60/11 + 2*v0 -2*v1 <= 0; value: -8 + -1*v1 -6*v2 + 11 = 0; value: 0 + 2*v2 -6*v3 + 28 = 0; value: 0 + -4*v1 -2*v3 + 16 <= 0; value: -14 + 5*v2 -14 < 0; value: -9 + 4*v1 -3*v2 -47 < 0; value: -30 0: 1: 1 3 5 2: 1 2 4 5 3: 2 3 optimal: oo + 2*v0 -14/5 <= 0; value: -4/5 - -1*v1 -6*v2 + 11 = 0; value: 0 - 2*v2 -6*v3 + 28 = 0; value: 0 - 70*v3 -364 <= 0; value: 0 + -6 < 0; value: -6 + -231/5 < 0; value: -231/5 0: 1: 1 3 5 2: 1 2 4 5 3 3: 2 3 4 5 0: 1 -> 1 1: 5 -> 7/5 2: 1 -> 8/5 3: 5 -> 26/5 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 + 3 = 0; value: 0 + -5*v0 + 5*v1 -11 <= 0; value: -1 + 4*v2 -3*v3 -16 <= 0; value: -5 + -2*v1 + 2*v2 -11 <= 0; value: -7 0: 1 2 3 1: 2 3 5 2: 4 5 3: 4 optimal: -4 + -4 <= 0; value: -4 - -4*v0 + 4 = 0; value: 0 - -6*v0 + v1 + 3 = 0; value: 0 + -1 <= 0; value: -1 + 4*v2 -3*v3 -16 <= 0; value: -5 + 2*v2 -17 <= 0; value: -7 0: 1 2 3 5 1: 2 3 5 2: 4 5 3: 4 0: 1 -> 1 1: 3 -> 3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -4*v1 + 4 = 0; value: 0 + 5*v1 -1*v2 + 2*v3 -11 <= 0; value: -3 + -6*v1 + 3*v2 <= 0; value: 0 + -4*v1 -1*v2 -6*v3 + 6 <= 0; value: -18 + -3*v1 <= 0; value: 0 0: 1 1: 1 2 3 4 5 2: 2 3 4 3: 2 4 optimal: 2 + + 2 <= 0; value: 2 - -4*v0 -4*v1 + 4 = 0; value: 0 + 2*v3 -11 <= 0; value: -3 - 6*v0 + 3*v2 -6 <= 0; value: 0 + -6*v3 + 6 <= 0; value: -18 - -3/2*v2 <= 0; value: 0 0: 1 3 4 5 2 1: 1 2 3 4 5 2: 2 3 4 5 3: 2 4 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -2*v3 -4 < 0; value: -40 + -4*v1 -1*v2 + 3*v3 -1 <= 0; value: -13 + -3*v0 + 2*v2 -3*v3 + 14 = 0; value: 0 + -1*v0 + 4*v1 -5*v2 -7 <= 0; value: -21 + 3*v3 -16 <= 0; value: -7 0: 1 3 4 1: 2 4 2: 2 3 4 3: 1 2 3 5 optimal: oo + 4*v0 -29/4 <= 0; value: 51/4 + -8/3*v0 -46/3 < 0; value: -86/3 - -4*v1 -1*v2 + 3*v3 -1 <= 0; value: 0 - -3*v0 + 2*v2 -3*v3 + 14 = 0; value: 0 - -4*v0 -4*v2 + 6 <= 0; value: 0 + -5*v0 + 1 <= 0; value: -24 0: 1 3 4 5 1: 2 4 2: 2 3 4 1 5 3: 1 2 3 5 4 0: 5 -> 5 1: 4 -> -11/8 2: 5 -> -7/2 3: 3 -> -8/3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + v2 + 3 = 0; value: 0 + v0 + 3*v1 + 2*v3 -24 <= 0; value: 0 + 2*v1 -4*v2 + v3 -6 <= 0; value: -2 + v0 -9 <= 0; value: -4 + -3*v0 + 5*v2 -3 < 0; value: -8 0: 2 4 5 1: 1 2 3 2: 1 3 5 3: 2 3 optimal: oo + 2*v0 -1*v3 -6 <= 0; value: 2 - -1*v1 + v2 + 3 = 0; value: 0 + v0 + 7/2*v3 -15 <= 0; value: -3 - -2*v2 + v3 <= 0; value: 0 + v0 -9 <= 0; value: -4 + -3*v0 + 5/2*v3 -3 < 0; value: -13 0: 2 4 5 1: 1 2 3 2: 1 3 5 2 3: 2 3 5 0: 5 -> 5 1: 5 -> 4 2: 2 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 + 5*v2 -41 < 0; value: -18 + 2*v0 + 4*v3 -45 < 0; value: -25 + 5*v0 -4*v3 -14 <= 0; value: -6 + -2*v1 + 4*v2 -10 = 0; value: 0 + -5*v2 -8 < 0; value: -23 0: 1 2 3 1: 4 2: 1 4 5 3: 2 3 optimal: (1164/35 -e*1) + + 1164/35 < 0; value: 1164/35 + -225/7 <= 0; value: -225/7 - 28/5*v3 -197/5 < 0; value: -28/5 - 5*v0 -4*v3 -14 <= 0; value: 0 - -2*v1 + 4*v2 -10 = 0; value: 0 - -5*v2 -8 < 0; value: -5 0: 1 2 3 1: 4 2: 1 4 5 3: 2 3 1 0: 4 -> 267/35 1: 1 -> -31/5 2: 3 -> -3/5 3: 3 -> 169/28 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 -25 < 0; value: -15 + -5*v0 + 3*v1 + 6*v2 -57 <= 0; value: -33 + -3*v2 + 15 = 0; value: 0 + v1 -1*v3 -3 = 0; value: 0 + 3*v1 -5*v2 -13 <= 0; value: -29 0: 2 1: 2 4 5 2: 1 2 3 5 3: 4 optimal: oo + 2*v0 -2*v3 -6 <= 0; value: 0 + 2*v2 -25 < 0; value: -15 + -5*v0 + 6*v2 + 3*v3 -48 <= 0; value: -33 + -3*v2 + 15 = 0; value: 0 - v1 -1*v3 -3 = 0; value: 0 + -5*v2 + 3*v3 -4 <= 0; value: -29 0: 2 1: 2 4 5 2: 1 2 3 5 3: 4 2 5 0: 3 -> 3 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 -20 = 0; value: 0 + 2*v0 -6*v3 + 20 <= 0; value: 0 + -4*v0 -6*v1 -5*v2 + 25 = 0; value: 0 + -5*v2 + v3 <= 0; value: 0 + -3*v0 -3*v1 + 2*v3 -4 < 0; value: -9 0: 1 2 3 5 1: 3 5 2: 3 4 3: 2 4 5 optimal: (16 -e*1) + + 16 < 0; value: 16 - 4*v0 -20 = 0; value: 0 - 2*v0 -6*v3 + 20 <= 0; value: 0 - -4*v0 -6*v1 -5*v2 + 25 = 0; value: 0 + -18 < 0; value: -18 - -1*v0 + 5/2*v2 + 2*v3 -33/2 < 0; value: -5/2 0: 1 2 3 5 4 1: 3 5 2: 3 4 5 3: 2 4 5 0: 5 -> 5 1: 0 -> -13/6 2: 1 -> 18/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 -10 <= 0; value: -40 + -3*v1 + v2 -3*v3 -8 < 0; value: -24 + -4*v0 -5*v2 -3*v3 + 39 = 0; value: 0 + -4*v2 -1*v3 -12 <= 0; value: -34 + -1*v1 -6*v2 + 2*v3 + 17 < 0; value: -14 0: 3 1: 2 5 2: 1 2 3 4 5 3: 2 3 4 5 optimal: (1289/55 -e*1) + + 1289/55 < 0; value: 1289/55 + -256/55 <= 0; value: -256/55 - -3*v1 + v2 -3*v3 -8 < 0; value: -39/55 - -4*v0 -5*v2 -3*v3 + 39 = 0; value: 0 - 110/51*v0 -1891/51 <= 0; value: 0 - -4*v0 -34/3*v2 + 176/3 <= 0; value: 0 0: 3 5 4 1 1: 2 5 2: 1 2 3 4 5 3: 2 3 4 5 0: 2 -> 1891/110 1: 5 -> 314/55 2: 5 -> -49/55 3: 2 -> -464/55 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 6*v2 -14 = 0; value: 0 + v0 -3*v1 -6*v2 + 17 = 0; value: 0 + 6*v0 -2*v2 -23 <= 0; value: -5 + -3*v1 -4*v2 + 15 = 0; value: 0 + 4*v2 -3*v3 -6 <= 0; value: -3 0: 1 2 3 1: 2 4 2: 1 2 3 4 5 3: 5 optimal: 6 + + 6 <= 0; value: 6 - -1*v0 + 6*v2 -14 = 0; value: 0 - v0 -3*v1 -6*v2 + 17 = 0; value: 0 + -5 <= 0; value: -5 - -2/3*v0 + 8/3 = 0; value: 0 + -3*v3 + 6 <= 0; value: -3 0: 1 2 3 4 5 1: 2 4 2: 1 2 3 4 5 3: 5 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + v1 <= 0; value: 0 + -5*v0 + 4*v3 <= 0; value: 0 + -2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 4*v1 + 4*v3 <= 0; value: 0 + 6*v0 <= 0; value: 0 0: 1 2 3 4 5 1: 1 3 4 2: 3: 2 4 optimal: 0 + <= 0; value: 0 + <= 0; value: 0 + 4*v3 <= 0; value: 0 - -2*v0 -2*v1 <= 0; value: 0 + 4*v3 <= 0; value: 0 - 6*v0 <= 0; value: 0 0: 1 2 3 4 5 1: 1 3 4 2: 3: 2 4 0: 0 -> 0 1: 0 -> 0 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 2*v1 -3*v3 + 1 < 0; value: -2 + -5*v0 + 3*v3 -3 <= 0; value: -15 + -2*v0 -2*v2 -12 < 0; value: -26 + -2*v0 + 4*v1 + 3 <= 0; value: -3 + -4*v1 + v3 -2 < 0; value: -1 0: 2 3 4 1: 1 4 5 2: 3 3: 1 2 5 optimal: oo + 2*v0 + 1 < 0; value: 7 - -5/2*v3 < 0; value: -5/4 + -5*v0 -3 < 0; value: -18 + -2*v0 -2*v2 -12 < 0; value: -26 + -2*v0 + 1 < 0; value: -5 - -4*v1 + v3 -2 < 0; value: -3/4 0: 2 3 4 1: 1 4 5 2: 3 3: 1 2 5 4 0: 3 -> 3 1: 0 -> -3/16 2: 4 -> 4 3: 1 -> 1/2 + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 2*v2 -36 <= 0; value: -6 + 2*v0 + 6*v2 + 6*v3 -88 <= 0; value: -56 + -4*v0 -1*v2 -4*v3 -7 <= 0; value: -16 + 2*v0 -2 <= 0; value: 0 + 3*v2 -2*v3 -15 = 0; value: 0 0: 2 3 4 1: 1 2: 1 2 3 5 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 2*v2 -36 <= 0; value: -6 + 2*v0 + 6*v2 + 6*v3 -88 <= 0; value: -56 + -4*v0 -1*v2 -4*v3 -7 <= 0; value: -16 + 2*v0 -2 <= 0; value: 0 + 3*v2 -2*v3 -15 = 0; value: 0 0: 2 3 4 1: 1 2: 1 2 3 5 3: 2 3 5 0: 1 -> 1 1: 5 -> 5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 + 5*v3 -14 = 0; value: 0 + -3*v2 -5*v3 -31 <= 0; value: -66 + 3*v2 -2*v3 -16 <= 0; value: -9 + -1*v0 -4*v1 + 23 = 0; value: 0 + -2*v1 + 10 = 0; value: 0 0: 1 4 1: 4 5 2: 2 3 3: 1 2 3 optimal: -4 + -4 <= 0; value: -4 - -2*v0 + 5*v3 -14 = 0; value: 0 + -3*v2 -51 <= 0; value: -66 + 3*v2 -24 <= 0; value: -9 - -1*v0 -4*v1 + 23 = 0; value: 0 - 5/4*v3 -5 = 0; value: 0 0: 1 4 5 1: 4 5 2: 2 3 3: 1 2 3 5 0: 3 -> 3 1: 5 -> 5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 2*v2 -18 < 0; value: -11 + 4*v2 -6 <= 0; value: -2 + -3*v1 + 2*v2 -2 <= 0; value: -9 + -6*v0 -5*v1 -2*v3 < 0; value: -23 + -1*v2 < 0; value: -1 0: 1 4 1: 3 4 2: 1 2 3 5 3: 4 optimal: (128/15 -e*1) + + 128/15 < 0; value: 128/15 - 5*v0 -18 < 0; value: -5 + -6 < 0; value: -6 - -3*v1 + 2*v2 -2 <= 0; value: 0 + -2*v3 -274/15 < 0; value: -304/15 - -1*v2 < 0; value: -1/2 0: 1 4 1: 3 4 2: 1 2 3 5 4 3: 4 0: 1 -> 13/5 1: 3 -> -1/3 2: 1 -> 1/2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -6*v3 -14 < 0; value: -68 + -1*v0 -6*v1 + 2*v2 + 19 = 0; value: 0 + 6*v1 -31 < 0; value: -13 + -3*v1 + 2*v2 -1 <= 0; value: -6 + -3*v3 + 11 <= 0; value: -1 0: 1 2 1: 2 3 4 2: 2 4 3: 1 5 optimal: oo + 7/3*v0 -2/3*v2 -19/3 <= 0; value: 4 + -6*v0 -6*v3 -14 < 0; value: -68 - -1*v0 -6*v1 + 2*v2 + 19 = 0; value: 0 + -1*v0 + 2*v2 -12 < 0; value: -13 + 1/2*v0 + v2 -21/2 <= 0; value: -6 + -3*v3 + 11 <= 0; value: -1 0: 1 2 4 3 1: 2 3 4 2: 2 4 3 3: 1 5 0: 5 -> 5 1: 3 -> 3 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v2 -3 <= 0; value: -9 + -6*v0 + 3*v1 + v3 + 8 = 0; value: 0 + -6*v0 -6*v1 -21 <= 0; value: -51 + -5*v2 + 4 < 0; value: -11 + 3*v0 + v2 -13 <= 0; value: -1 0: 1 2 3 5 1: 2 3 2: 1 4 5 3: 2 optimal: 239/11 + + 239/11 <= 0; value: 239/11 - -22/3*v2 + 43/3 <= 0; value: 0 - -6*v0 + 3*v1 + v3 + 8 = 0; value: 0 - -18*v0 + 2*v3 -5 <= 0; value: 0 + -127/22 < 0; value: -127/22 - 3*v0 + v2 -13 <= 0; value: 0 0: 1 2 3 5 1: 2 3 2: 1 4 5 3: 2 3 0: 3 -> 81/22 1: 2 -> -79/11 2: 3 -> 43/22 3: 4 -> 392/11 + 2*v0 -2*v1 <= 0; value: 8 + v0 + 2*v1 + 5*v3 -34 <= 0; value: -10 + 4*v2 -14 <= 0; value: -6 + -5*v0 -1*v2 + 22 = 0; value: 0 + v0 -3*v2 -4*v3 + 5 <= 0; value: -13 + -6*v3 + 8 < 0; value: -16 0: 1 3 4 1: 1 2: 2 3 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v0 + 2*v1 + 5*v3 -34 <= 0; value: -10 + 4*v2 -14 <= 0; value: -6 + -5*v0 -1*v2 + 22 = 0; value: 0 + v0 -3*v2 -4*v3 + 5 <= 0; value: -13 + -6*v3 + 8 < 0; value: -16 0: 1 3 4 1: 1 2: 2 3 4 3: 1 4 5 0: 4 -> 4 1: 0 -> 0 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 -3*v1 <= 0; value: -12 + 2*v1 -2*v2 = 0; value: 0 + 6*v0 -1*v2 -1 <= 0; value: -5 + 5*v0 -5*v2 + 19 <= 0; value: -1 + -6*v2 -6*v3 + 19 <= 0; value: -17 0: 1 3 4 1: 1 2 2: 2 3 4 5 3: 5 optimal: -38/5 + -38/5 <= 0; value: -38/5 + v0 -57/5 <= 0; value: -57/5 - 2*v1 -2*v2 = 0; value: 0 + 5*v0 -24/5 <= 0; value: -24/5 - 5*v0 -5*v2 + 19 <= 0; value: 0 + -6*v0 -6*v3 -19/5 <= 0; value: -79/5 0: 1 3 4 5 1: 1 2 2: 2 3 4 5 1 3: 5 0: 0 -> 0 1: 4 -> 19/5 2: 4 -> 19/5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -2*v3 -3 <= 0; value: -7 + v3 -2 <= 0; value: -1 + v1 + 5*v2 -22 < 0; value: -11 + -5*v0 + v2 + 7 <= 0; value: -1 + -5*v0 -1*v2 -6*v3 -16 < 0; value: -34 0: 1 4 5 1: 3 2: 3 4 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -2*v3 -3 <= 0; value: -7 + v3 -2 <= 0; value: -1 + v1 + 5*v2 -22 < 0; value: -11 + -5*v0 + v2 + 7 <= 0; value: -1 + -5*v0 -1*v2 -6*v3 -16 < 0; value: -34 0: 1 4 5 1: 3 2: 3 4 5 3: 1 2 5 0: 2 -> 2 1: 1 -> 1 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -1*v1 -4*v3 -4 <= 0; value: -23 + -6*v0 -1*v1 + 3 = 0; value: 0 + -2*v1 -6*v2 -5*v3 + 7 <= 0; value: -19 + -1*v0 + 3*v3 -33 <= 0; value: -21 + -2*v0 + 6*v1 -33 < 0; value: -15 0: 1 2 4 5 1: 1 2 3 5 2: 3 3: 1 3 4 optimal: 1011/10 + + 1011/10 <= 0; value: 1011/10 - 120/31*v2 -501/31 <= 0; value: 0 - -6*v0 -1*v1 + 3 = 0; value: 0 - 12*v0 -6*v2 -5*v3 + 1 <= 0; value: 0 - -1/2*v2 + 31/12*v3 -395/12 <= 0; value: 0 + -3057/10 < 0; value: -3057/10 0: 1 2 4 5 3 1: 1 2 3 5 2: 3 1 4 5 3: 1 3 4 5 0: 0 -> 153/20 1: 3 -> -429/10 2: 0 -> 167/40 3: 4 -> 271/20 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 -3*v2 + 30 = 0; value: 0 + v0 -5*v2 + 2*v3 -7 < 0; value: -15 + 5*v0 -1*v2 -16 <= 0; value: 0 + 4*v1 -34 <= 0; value: -22 + 3*v3 -21 < 0; value: -9 0: 2 3 1: 1 4 2: 1 2 3 3: 2 5 optimal: oo + 2*v0 + v2 -10 <= 0; value: 2 - -6*v1 -3*v2 + 30 = 0; value: 0 + v0 -5*v2 + 2*v3 -7 < 0; value: -15 + 5*v0 -1*v2 -16 <= 0; value: 0 + -2*v2 -14 <= 0; value: -22 + 3*v3 -21 < 0; value: -9 0: 2 3 1: 1 4 2: 1 2 3 4 3: 2 5 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 -4*v2 + 31 = 0; value: 0 + -6*v0 + 5*v1 -5*v2 -5 <= 0; value: -40 + 4*v0 + v2 + 4*v3 -24 = 0; value: 0 + 6*v0 + v2 -5*v3 -34 = 0; value: 0 + -3*v1 + 5*v2 -11 = 0; value: 0 0: 1 2 3 4 1: 2 5 2: 1 2 3 4 5 3: 3 4 optimal: 4 + + 4 <= 0; value: 4 - -3*v0 -4*v2 + 31 = 0; value: 0 + -40 <= 0; value: -40 - 13/4*v0 + 4*v3 -65/4 = 0; value: 0 - -149/13*v3 = 0; value: 0 - -3*v1 + 5*v2 -11 = 0; value: 0 0: 1 2 3 4 1: 2 5 2: 1 2 3 4 5 3: 3 4 2 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -2*v0 -6*v1 + 2*v3 + 16 < 0; value: -4 + 2*v0 + 2*v1 -22 <= 0; value: -12 + -3*v0 + 5*v1 -5*v3 -5 < 0; value: -3 + 6*v1 + 5*v2 -80 <= 0; value: -41 + -1*v3 + 3 = 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 4 3: 1 3 5 optimal: (22 -e*1) + + 22 < 0; value: 22 - -2*v0 -6*v1 + 2*v3 + 16 < 0; value: -6 - 4/3*v0 -44/3 < 0; value: -4/3 + -53 < 0; value: -53 + 5*v2 -80 < 0; value: -65 - -1*v3 + 3 = 0; value: 0 0: 1 2 3 4 1: 1 2 3 4 2: 4 3: 1 3 5 2 4 0: 1 -> 10 1: 4 -> 4/3 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 3*v3 -67 < 0; value: -40 + -5*v2 -5*v3 -26 <= 0; value: -76 + 5*v3 -56 <= 0; value: -31 + 4*v1 + 3*v3 -27 = 0; value: 0 + -3*v3 -13 < 0; value: -28 0: 1: 1 4 2: 2 3: 1 2 3 4 5 optimal: oo + 2*v0 + 33/10 <= 0; value: 33/10 + -40 < 0; value: -40 + -5*v2 -82 <= 0; value: -107 - 5*v3 -56 <= 0; value: 0 - 4*v1 + 3*v3 -27 = 0; value: 0 + -233/5 < 0; value: -233/5 0: 1: 1 4 2: 2 3: 1 2 3 4 5 0: 0 -> 0 1: 3 -> -33/20 2: 5 -> 5 3: 5 -> 56/5 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 -1*v1 + 6*v3 -90 < 0; value: -52 + 5*v0 + 2*v1 + 5*v3 -55 < 0; value: -20 + -6*v0 + 2*v1 + 5*v2 + 9 = 0; value: 0 + 3*v0 + 2*v2 + 6*v3 -49 < 0; value: -13 + 4*v0 + 5*v3 -31 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 2: 3 4 3: 1 2 4 5 optimal: (51 -e*1) + + 51 < 0; value: 51 + -473/10 < 0; value: -473/10 - 5/2*v0 -125/2 < 0; value: -5/2 - -6*v0 + 2*v1 + 5*v2 + 9 = 0; value: 0 - 3*v0 + 2*v2 + 6*v3 -49 < 0; value: -2 - 4*v0 + 5*v3 -31 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 2: 3 4 1 2 3: 1 2 4 5 0: 4 -> 24 1: 0 -> 5/4 2: 3 -> 53/2 3: 3 -> -13 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -4*v1 -5*v3 + 6 = 0; value: 0 + -4*v1 -5*v3 + 2 <= 0; value: -6 + -2*v3 <= 0; value: 0 + 4*v1 + 2*v2 + 2*v3 -38 <= 0; value: -24 + -5*v0 -6*v3 + 5 = 0; value: 0 0: 1 5 1: 1 2 4 2: 4 3: 1 2 3 4 5 optimal: 5/4 + + 5/4 <= 0; value: 5/4 - 2*v0 -4*v1 -5*v3 + 6 = 0; value: 0 - -2*v0 -4 <= 0; value: 0 + -5 <= 0; value: -5 + 2*v2 -87/2 <= 0; value: -75/2 - -5*v0 -6*v3 + 5 = 0; value: 0 0: 1 5 2 4 3 1: 1 2 4 2: 4 3: 1 2 3 4 5 0: 1 -> -2 1: 2 -> -21/8 2: 3 -> 3 3: 0 -> 5/2 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 + 6*v3 -25 = 0; value: 0 + 5*v1 -6*v3 + 20 = 0; value: 0 + v0 -3*v3 + 15 = 0; value: 0 + -2*v0 -4*v1 + v3 + 3 = 0; value: 0 + v2 + 3*v3 -20 = 0; value: 0 0: 3 4 1: 2 4 2: 1 5 3: 1 2 3 4 5 optimal: -4 + -4 <= 0; value: -4 - -1*v2 + 6*v3 -25 = 0; value: 0 - 5*v1 -6*v3 + 20 = 0; value: 0 - v0 = 0; value: 0 + = 0; value: 0 - 3/2*v2 -15/2 = 0; value: 0 0: 3 4 1: 2 4 2: 1 5 3 4 3: 1 2 3 4 5 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 3*v1 -5*v3 + 9 = 0; value: 0 + -3*v3 <= 0; value: 0 + v0 -7 <= 0; value: -3 + -2*v0 + 6 <= 0; value: -2 + v0 + 6*v2 + 6*v3 -41 <= 0; value: -7 0: 1 3 4 5 1: 1 2: 5 3: 1 2 5 optimal: 6 + + 6 <= 0; value: 6 - -3*v0 + 3*v1 -5*v3 + 9 = 0; value: 0 - -3*v3 <= 0; value: 0 + v0 -7 <= 0; value: -3 + -2*v0 + 6 <= 0; value: -2 + v0 + 6*v2 -41 <= 0; value: -7 0: 1 3 4 5 1: 1 2: 5 3: 1 2 5 0: 4 -> 4 1: 1 -> 1 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 = 0; value: 0 + <= 0; value: 0 + -3*v0 + 2*v3 -5 < 0; value: -3 + -2*v2 -1 < 0; value: -3 + -4*v0 -2*v1 -2*v2 + 3 < 0; value: -7 0: 1 3 5 1: 5 2: 4 5 3: 3 optimal: oo + 6*v0 + 2*v2 -3 < 0; value: -1 + -1*v0 = 0; value: 0 + <= 0; value: 0 + -3*v0 + 2*v3 -5 < 0; value: -3 + -2*v2 -1 < 0; value: -3 - -4*v0 -2*v1 -2*v2 + 3 < 0; value: -2 0: 1 3 5 1: 5 2: 4 5 3: 3 0: 0 -> 0 1: 4 -> 3/2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -5*v3 -23 <= 0; value: -63 + 2*v1 + 4*v3 -38 <= 0; value: -20 + -5*v2 -2 <= 0; value: -17 + 3*v0 + 4*v1 -28 < 0; value: -9 + -5*v0 -3*v2 -5*v3 + 3 <= 0; value: -51 0: 1 4 5 1: 2 4 2: 3 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -5*v3 -23 <= 0; value: -63 + 2*v1 + 4*v3 -38 <= 0; value: -20 + -5*v2 -2 <= 0; value: -17 + 3*v0 + 4*v1 -28 < 0; value: -9 + -5*v0 -3*v2 -5*v3 + 3 <= 0; value: -51 0: 1 4 5 1: 2 4 2: 3 5 3: 1 2 5 0: 5 -> 5 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + 2*v2 + 6*v3 -105 <= 0; value: -65 + 2*v0 -4*v1 + 2*v3 -6 = 0; value: 0 + -2*v0 -2*v1 + 3*v2 -13 = 0; value: 0 + -2*v1 -3*v2 -6*v3 + 47 = 0; value: 0 + -4*v1 + v2 -1 <= 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 1 3 4 5 3: 1 2 4 optimal: 577/4 + + 577/4 <= 0; value: 577/4 - 2/3*v0 -65 <= 0; value: 0 - 2*v0 -4*v1 + 2*v3 -6 = 0; value: 0 - -20/7*v0 + 24/7*v2 -120/7 = 0; value: 0 - -1*v0 -3*v2 -7*v3 + 50 = 0; value: 0 + -65/4 <= 0; value: -65/4 0: 1 2 3 4 5 1: 2 3 4 5 2: 1 3 4 5 3: 1 2 4 3 5 0: 0 -> 195/2 1: 1 -> 203/8 2: 5 -> 345/4 3: 5 -> -175/4 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -2*v2 + 2 < 0; value: -6 + -6*v1 + 5*v2 -16 < 0; value: -8 + 3*v1 + 2*v2 -23 < 0; value: -9 + -1*v1 + 4*v2 -31 < 0; value: -17 + -5*v0 + 3*v1 -11 < 0; value: -5 0: 1 5 1: 2 3 4 5 2: 1 2 3 4 3: optimal: oo + 11/3*v0 + 11/3 < 0; value: 11/3 - -2*v0 -2*v2 + 2 < 0; value: -2 - -6*v1 + 5*v2 -16 < 0; value: -6 + -9/2*v0 -53/2 < 0; value: -53/2 + -19/6*v0 -151/6 < 0; value: -151/6 + -15/2*v0 -33/2 < 0; value: -33/2 0: 1 5 3 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 0: 0 -> 0 1: 2 -> 0 2: 4 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -2*v2 -6*v3 + 22 <= 0; value: -14 + v1 -4*v2 -6*v3 + 5 <= 0; value: -11 + -5*v3 + 10 <= 0; value: 0 + 6*v0 -5*v2 -39 < 0; value: -25 + 5*v0 + 2*v1 + v3 -72 <= 0; value: -42 0: 4 5 1: 1 2 5 2: 1 2 4 3: 1 2 3 5 optimal: oo + 2*v0 + 4/5*v2 + 12/5*v3 -44/5 <= 0; value: 28/5 - -5*v1 -2*v2 -6*v3 + 22 <= 0; value: 0 + -22/5*v2 -36/5*v3 + 47/5 <= 0; value: -69/5 + -5*v3 + 10 <= 0; value: 0 + 6*v0 -5*v2 -39 < 0; value: -25 + 5*v0 -4/5*v2 -7/5*v3 -316/5 <= 0; value: -238/5 0: 4 5 1: 1 2 5 2: 1 2 4 5 3: 1 2 3 5 0: 4 -> 4 1: 4 -> 6/5 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 -1*v2 + 18 = 0; value: 0 + -6*v0 -6*v1 + 4*v2 + 23 <= 0; value: -25 + 3*v0 -5*v1 + 6*v2 = 0; value: 0 + 6*v0 -38 < 0; value: -8 + -5*v2 + 3*v3 -18 <= 0; value: -6 0: 2 3 4 1: 1 2 3 2: 1 2 3 5 3: 5 optimal: (796/123 -e*1) + + 796/123 < 0; value: 796/123 - -6*v1 -1*v2 + 18 = 0; value: 0 + -1473/41 < 0; value: -1473/41 - 3*v0 + 41/6*v2 -15 = 0; value: 0 - 6*v0 -38 < 0; value: -4 + 3*v3 -618/41 <= 0; value: -126/41 0: 2 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 0: 5 -> 17/3 1: 3 -> 125/41 2: 0 -> -12/41 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -3*v2 -6*v3 -4 <= 0; value: -16 + 4*v0 + 5*v1 -59 <= 0; value: -22 + -4*v3 <= 0; value: 0 + 3*v1 -2*v2 -15 < 0; value: -8 + 6*v0 -2*v1 -11 <= 0; value: -3 0: 2 5 1: 2 4 5 2: 1 4 3: 1 3 optimal: oo + -4*v0 + 11 <= 0; value: -1 + -3*v2 -6*v3 -4 <= 0; value: -16 + 19*v0 -173/2 <= 0; value: -59/2 + -4*v3 <= 0; value: 0 + 9*v0 -2*v2 -63/2 < 0; value: -25/2 - 6*v0 -2*v1 -11 <= 0; value: 0 0: 2 5 4 1: 2 4 5 2: 1 4 3: 1 3 0: 3 -> 3 1: 5 -> 7/2 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 + 2*v2 + 10 <= 0; value: -4 + v0 + 2*v1 -16 <= 0; value: -8 + -4*v0 -6*v3 + 18 < 0; value: -6 + 3*v2 + 6*v3 -62 < 0; value: -23 + -1*v0 -2*v1 + 4*v3 -8 <= 0; value: 0 0: 2 3 5 1: 1 2 5 2: 1 4 3: 3 4 5 optimal: oo + 17/3*v0 -4 < 0; value: -4 - 3*v0 + 2*v2 -12*v3 + 34 <= 0; value: 0 + -8/3*v0 -12 < 0; value: -12 - -11/2*v0 -1*v2 + 1 < 0; value: -1 + -41/2*v0 -41 < 0; value: -41 - -1*v0 -2*v1 + 4*v3 -8 <= 0; value: 0 0: 2 3 5 1 4 2 1: 1 2 5 2: 1 4 3 2 3: 3 4 5 1 2 0: 0 -> 0 1: 4 -> 7/3 2: 5 -> 2 3: 4 -> 19/6 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 3*v2 + 2*v3 = 0; value: 0 + v3 = 0; value: 0 + 6*v2 -57 <= 0; value: -33 + -6*v1 -5*v2 -18 < 0; value: -38 + 5*v1 -3*v2 + 9 < 0; value: -3 0: 1 1: 4 5 2: 1 3 4 5 3: 1 2 optimal: (245/6 -e*1) + + 245/6 < 0; value: 245/6 - -3*v0 + 3*v2 + 2*v3 = 0; value: 0 - v3 = 0; value: 0 - 6*v0 -57 <= 0; value: 0 - -6*v1 -5*v2 -18 < 0; value: -6 + -889/12 < 0; value: -889/12 0: 1 3 5 1: 4 5 2: 1 3 4 5 3: 1 2 3 5 0: 4 -> 19/2 1: 0 -> -119/12 2: 4 -> 19/2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + 2*v0 -3*v3 + 13 = 0; value: 0 + -4*v1 + 5*v3 -8 < 0; value: -3 + 3*v1 + 3*v2 + 3*v3 -59 < 0; value: -29 + 4*v1 + 2*v3 -63 <= 0; value: -33 + -3*v0 + 3*v3 -17 <= 0; value: -5 0: 1 5 1: 2 3 4 2: 3 3: 1 2 3 4 5 optimal: (-55/14 -e*1) + -55/14 < 0; value: -55/14 - 2*v0 -3*v3 + 13 = 0; value: 0 - -4*v1 + 5*v3 -8 < 0; value: -4 - 9/2*v0 + 3*v2 -143/4 < 0; value: -9/2 - -28/9*v2 -97/27 <= 0; value: 0 + -89/7 < 0; value: -89/7 0: 1 5 3 4 1: 2 3 4 2: 3 4 5 3: 1 2 3 4 5 0: 1 -> 54/7 1: 5 -> 911/84 2: 0 -> -97/84 3: 5 -> 199/21 + 2*v0 -2*v1 <= 0; value: 4 + 5*v3 -15 = 0; value: 0 + 5*v0 + 2*v1 -36 <= 0; value: -19 + -4*v0 + 2*v1 + 8 <= 0; value: -2 + -3*v1 -1*v2 + 2*v3 <= 0; value: -2 + v0 -2*v1 -6*v3 + 17 = 0; value: 0 0: 2 3 5 1: 2 3 4 5 2: 4 3: 1 4 5 optimal: 43/6 + + 43/6 <= 0; value: 43/6 - 5*v3 -15 = 0; value: 0 - 6*v0 -37 <= 0; value: 0 + -23/2 <= 0; value: -23/2 + -1*v2 -7/4 <= 0; value: -27/4 - v0 -2*v1 -6*v3 + 17 = 0; value: 0 0: 2 3 5 4 1: 2 3 4 5 2: 4 3: 1 4 5 2 3 0: 3 -> 37/6 1: 1 -> 31/12 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6*v3 -10 = 0; value: 0 + 6*v0 -1*v2 -1*v3 -4 <= 0; value: 0 + -2*v3 + 4 = 0; value: 0 + 5*v1 + v2 -27 <= 0; value: -17 + -3*v0 + 4*v1 -5 = 0; value: 0 0: 1 2 5 1: 4 5 2: 2 4 3: 1 2 3 optimal: -2 + -2 <= 0; value: -2 - -2*v0 + 6*v3 -10 = 0; value: 0 - -1*v2 + 17*v3 -34 <= 0; value: 0 - -2/17*v2 = 0; value: 0 + -17 <= 0; value: -17 - -3*v0 + 4*v1 -5 = 0; value: 0 0: 1 2 5 4 1: 4 5 2: 2 4 3 3: 1 2 3 4 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + v1 + 2*v3 -9 = 0; value: 0 + 6*v2 -50 < 0; value: -26 + 4*v0 + 3*v1 -25 = 0; value: 0 + 2*v0 -5*v2 -11 <= 0; value: -23 + 5*v1 -2*v3 -10 <= 0; value: -1 0: 3 4 1: 1 3 5 2: 2 4 3: 1 5 optimal: (956/9 -e*1) + + 956/9 < 0; value: 956/9 - v1 + 2*v3 -9 = 0; value: 0 - 6*v2 -50 < 0; value: -6 - 4*v0 -6*v3 + 2 = 0; value: 0 - 2*v0 -5*v2 -11 <= 0; value: 0 + -539/3 < 0; value: -539/3 0: 3 4 5 1: 1 3 5 2: 2 4 5 3: 1 5 3 0: 4 -> 143/6 1: 3 -> -211/9 2: 4 -> 22/3 3: 3 -> 146/9 + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 -14 <= 0; value: -44 + 3*v2 + 3*v3 -37 <= 0; value: -7 + 6*v2 + v3 -35 = 0; value: 0 + -6*v0 -1*v1 -1*v2 -7 <= 0; value: -25 + -3*v1 + 3*v2 -12 <= 0; value: 0 0: 4 1: 4 5 2: 2 3 4 5 3: 1 2 3 optimal: oo + 2*v0 -16/15 <= 0; value: 44/15 + -304/5 <= 0; value: -304/5 - 5/2*v3 -39/2 <= 0; value: 0 - 6*v2 + v3 -35 = 0; value: 0 + -6*v0 -181/15 <= 0; value: -361/15 - -3*v1 + 3*v2 -12 <= 0; value: 0 0: 4 1: 4 5 2: 2 3 4 5 3: 1 2 3 4 0: 2 -> 2 1: 1 -> 8/15 2: 5 -> 68/15 3: 5 -> 39/5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -6*v3 <= 0; value: 0 + 5*v1 -2*v2 + v3 + 6 = 0; value: 0 + -1*v3 <= 0; value: 0 + 3*v1 -3*v2 + 6*v3 + 8 < 0; value: -1 + = 0; value: 0 0: 1: 1 2 4 2: 2 4 3: 1 2 3 4 optimal: oo + 2*v0 + 4/9 < 0; value: 4/9 + -8/9 <= 0; value: -8/9 - 5*v1 -2*v2 + v3 + 6 = 0; value: 0 - -1/3*v2 + 22/27 < 0; value: -5/54 - -9/5*v2 + 27/5*v3 + 22/5 < 0; value: -1/4 + = 0; value: 0 0: 1: 1 2 4 2: 2 4 1 3 3: 1 2 3 4 0: 0 -> 0 1: 0 -> -13/108 2: 3 -> 49/18 3: 0 -> 5/108 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 -3*v3 + 27 = 0; value: 0 + -2*v0 -4*v1 -6*v2 -9 <= 0; value: -41 + 5*v0 + v3 -23 = 0; value: 0 + v0 -3*v2 -1 <= 0; value: -3 + -2*v2 + 5*v3 -11 = 0; value: 0 0: 2 3 4 1: 1 2 2: 2 4 5 3: 1 3 5 optimal: oo + 6/25*v2 + 38/25 <= 0; value: 2 - -6*v1 -3*v3 + 27 = 0; value: 0 + -126/25*v2 -773/25 <= 0; value: -41 - 5*v0 + v3 -23 = 0; value: 0 + -77/25*v2 + 79/25 <= 0; value: -3 - -25*v0 -2*v2 + 104 = 0; value: 0 0: 2 3 4 5 1: 1 2 2: 2 4 5 3: 1 3 5 2 0: 4 -> 4 1: 3 -> 3 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -20 = 0; value: 0 + 5*v0 + 5*v1 -2*v3 -67 <= 0; value: -37 + v1 + 2*v2 + 2*v3 -8 <= 0; value: -2 + -6*v0 -5*v1 + 4*v3 -21 <= 0; value: -55 + 5*v0 -52 < 0; value: -32 0: 1 2 4 5 1: 2 3 4 2: 3 3: 2 3 4 optimal: oo + 22/5*v0 -8/5*v3 + 42/5 <= 0; value: 26 + 5*v0 -20 = 0; value: 0 + -1*v0 + 2*v3 -88 <= 0; value: -92 + -6/5*v0 + 2*v2 + 14/5*v3 -61/5 <= 0; value: -13 - -6*v0 -5*v1 + 4*v3 -21 <= 0; value: 0 + 5*v0 -52 < 0; value: -32 0: 1 2 4 5 3 1: 2 3 4 2: 3 3: 2 3 4 0: 4 -> 4 1: 2 -> -9 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 8 = 0; value: 0 + 6*v0 -6*v3 + 12 = 0; value: 0 + -5*v1 + v3 -11 <= 0; value: -7 + -1*v3 + 4 = 0; value: 0 + 5*v2 -11 < 0; value: -6 0: 1 2 1: 3 2: 5 3: 2 3 4 optimal: 34/5 + + 34/5 <= 0; value: 34/5 - -4*v0 + 8 = 0; value: 0 - 6*v0 -6*v3 + 12 = 0; value: 0 - -5*v1 + v3 -11 <= 0; value: 0 + = 0; value: 0 + 5*v2 -11 < 0; value: -6 0: 1 2 4 1: 3 2: 5 3: 2 3 4 0: 2 -> 2 1: 0 -> -7/5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 11 <= 0; value: -7 + -5*v1 -6*v2 + 33 = 0; value: 0 + 6*v1 -6*v2 -2*v3 -1 <= 0; value: -11 + -3*v1 -4*v2 + 17 < 0; value: -4 + 4*v2 -2*v3 -2 = 0; value: 0 0: 1: 1 2 3 4 2: 2 3 4 5 3: 3 5 optimal: oo + 2*v0 -11/3 <= 0; value: 7/3 - 18/5*v3 -25 <= 0; value: 0 - -5*v1 -6*v2 + 33 = 0; value: 0 + -499/18 <= 0; value: -499/18 + -79/18 < 0; value: -79/18 - 4*v2 -2*v3 -2 = 0; value: 0 0: 1: 1 2 3 4 2: 2 3 4 5 1 3: 3 5 1 4 0: 3 -> 3 1: 3 -> 11/6 2: 3 -> 143/36 3: 5 -> 125/18 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 -3*v3 -49 <= 0; value: -28 + v2 -5*v3 <= 0; value: -1 + 5*v1 -43 < 0; value: -23 + -1*v1 + v2 -1*v3 <= 0; value: -1 + 2*v1 -2*v2 -4*v3 + 1 <= 0; value: -3 0: 1: 1 3 4 5 2: 2 4 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v2 + 2*v3 <= 0; value: -4 + 6*v2 -9*v3 -49 <= 0; value: -34 + v2 -5*v3 <= 0; value: -1 + 5*v2 -5*v3 -43 < 0; value: -28 - -1*v1 + v2 -1*v3 <= 0; value: 0 + -6*v3 + 1 <= 0; value: -5 0: 1: 1 3 4 5 2: 2 4 5 1 3 3: 1 2 4 5 3 0: 1 -> 1 1: 4 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 -5 <= 0; value: -17 + 2*v0 + 2*v2 -15 <= 0; value: -3 + -1*v0 -5*v1 -4*v2 + 22 = 0; value: 0 + 6*v1 + 4*v2 -1*v3 -19 = 0; value: 0 + 3*v0 + 5*v1 + 4*v3 -30 < 0; value: -4 0: 2 3 5 1: 1 3 4 5 2: 2 3 4 3: 4 5 optimal: (100/11 -e*1) + + 100/11 < 0; value: 100/11 + -241/11 < 0; value: -241/11 - -1*v0 -5/2*v3 + 7/2 <= 0; value: 0 - -1*v0 -5*v1 -4*v2 + 22 = 0; value: 0 - -6/5*v0 -4/5*v2 -1*v3 + 37/5 = 0; value: 0 - 22/5*v0 -162/5 < 0; value: -22/5 0: 2 3 5 1 4 1: 1 3 4 5 2: 2 3 4 1 5 3: 4 5 2 1 0: 4 -> 70/11 1: 2 -> 122/55 2: 2 -> 25/22 3: 1 -> -63/55 + 2*v0 -2*v1 <= 0; value: -10 + 6*v0 -4*v1 -6*v3 + 50 = 0; value: 0 + 6*v2 + 4*v3 -107 < 0; value: -57 + -5*v0 -4*v1 + 3*v2 + 5 = 0; value: 0 + v1 + 2*v3 -41 < 0; value: -26 + -5*v2 -5*v3 + 50 = 0; value: 0 0: 1 3 1: 1 3 4 2: 2 3 5 3: 1 2 4 5 optimal: (68 -e*1) + + 68 < 0; value: 68 - 6*v0 -4*v1 -6*v3 + 50 = 0; value: 0 + -571/5 < 0; value: -571/5 - -11*v0 -3*v2 + 15 = 0; value: 0 - 10/3*v0 -26 < 0; value: -10/3 - -5*v2 -5*v3 + 50 = 0; value: 0 0: 1 3 4 2 1: 1 3 4 2: 2 3 5 4 3: 1 2 4 5 3 0: 0 -> 34/5 1: 5 -> -111/5 2: 5 -> -299/15 3: 5 -> 449/15 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + 5*v2 -1*v3 -22 = 0; value: 0 + -1*v0 <= 0; value: 0 + -1*v2 + 5 = 0; value: 0 + 6*v0 -6*v1 -4*v2 + 44 = 0; value: 0 + -6*v1 + 5*v2 -1 <= 0; value: 0 0: 1 2 4 1: 4 5 2: 1 3 4 5 3: 1 optimal: -8 + -8 <= 0; value: -8 - -4*v0 + 5*v2 -1*v3 -22 = 0; value: 0 + -1*v0 <= 0; value: 0 - -4/5*v0 -1/5*v3 + 3/5 = 0; value: 0 - 6*v0 -6*v1 -4*v2 + 44 = 0; value: 0 + -6*v0 <= 0; value: 0 0: 1 2 4 5 3 1: 4 5 2: 1 3 4 5 3: 1 3 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + 6*v0 -2*v1 -5*v3 -5 <= 0; value: -20 + = 0; value: 0 + -6*v3 -1 < 0; value: -7 + -2*v0 -6*v3 -2 <= 0; value: -8 + -1*v1 -6*v2 + 24 <= 0; value: -5 0: 1 4 1: 1 5 2: 5 3: 1 3 4 optimal: oo + -4*v0 + 5*v3 + 5 <= 0; value: 10 - 6*v0 + 12*v2 -5*v3 -53 <= 0; value: 0 + = 0; value: 0 + -6*v3 -1 < 0; value: -7 + -2*v0 -6*v3 -2 <= 0; value: -8 - -1*v1 -6*v2 + 24 <= 0; value: 0 0: 1 4 1: 1 5 2: 5 1 3: 1 3 4 0: 0 -> 0 1: 5 -> -5 2: 4 -> 29/6 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 4*v2 -58 <= 0; value: -22 + 5*v0 + v2 -24 = 0; value: 0 + -3*v1 + 5*v2 + 6*v3 -49 <= 0; value: -26 + 5*v1 + 4*v2 -41 = 0; value: 0 + -1*v1 + 5*v3 -27 <= 0; value: -17 0: 1 2 1: 3 4 5 2: 1 2 3 4 3: 3 5 optimal: 34/5 + + 34/5 <= 0; value: 34/5 - -90/37*v3 -154/37 <= 0; value: 0 - 5*v0 + v2 -24 = 0; value: 0 - -37*v0 + 6*v3 + 104 <= 0; value: 0 - 5*v1 + 4*v2 -41 = 0; value: 0 + -1561/45 <= 0; value: -1561/45 0: 1 2 3 5 1: 3 4 5 2: 1 2 3 4 5 3: 3 5 1 0: 4 -> 38/15 1: 5 -> -13/15 2: 4 -> 34/3 3: 3 -> -77/45 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -6*v2 <= 0; value: 0 + 5*v0 -3*v2 -12 <= 0; value: -2 + -5*v0 + 3*v1 + 5*v3 + 3 < 0; value: -7 + -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 2 5 3: 3 optimal: 24/5 + + 24/5 <= 0; value: 24/5 + <= 0; value: 0 - 5*v0 -3*v2 -12 <= 0; value: 0 + 5*v3 -9 < 0; value: -9 - -2*v1 <= 0; value: 0 - 5*v2 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 2 5 3 3: 3 0: 2 -> 12/5 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v2 -8 = 0; value: 0 + -2*v0 -2*v3 + 14 = 0; value: 0 + -3*v1 -6*v2 + 2*v3 -18 < 0; value: -38 + 3*v0 -17 <= 0; value: -2 + -2*v0 -1*v1 -6 <= 0; value: -20 0: 1 2 4 5 1: 3 5 2: 1 3 3: 2 3 optimal: (94/3 -e*1) + + 94/3 < 0; value: 94/3 - 4*v0 -6*v2 -8 = 0; value: 0 - -2*v0 -2*v3 + 14 = 0; value: 0 - -3*v1 -6*v2 + 2*v3 -18 < 0; value: -3 - 3*v0 -17 <= 0; value: 0 + -22/3 <= 0; value: -22/3 0: 1 2 4 5 1: 3 5 2: 1 3 5 3: 2 3 5 0: 5 -> 17/3 1: 4 -> -9 2: 2 -> 22/9 3: 2 -> 4/3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v3 -6 < 0; value: -2 + -3*v0 -4*v1 -1*v3 -7 <= 0; value: -32 + -2*v0 -4 < 0; value: -12 + v0 + 2*v2 -8 <= 0; value: 0 + 2*v0 -6*v1 -5*v2 -14 <= 0; value: -34 0: 2 3 4 5 1: 2 5 2: 4 5 3: 1 2 optimal: oo + 1/2*v0 + 34/3 <= 0; value: 40/3 + 4*v3 -6 < 0; value: -2 + -6*v0 -1*v3 + 47/3 <= 0; value: -28/3 + -2*v0 -4 < 0; value: -12 - v0 + 2*v2 -8 <= 0; value: 0 - 2*v0 -6*v1 -5*v2 -14 <= 0; value: 0 0: 2 3 4 5 1: 2 5 2: 4 5 2 3: 1 2 0: 4 -> 4 1: 3 -> -8/3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 -3*v3 + 7 <= 0; value: -14 + -4*v3 + 8 = 0; value: 0 + 3*v0 -4*v3 -16 <= 0; value: -9 + -3*v0 -6*v2 + 21 = 0; value: 0 + 6*v0 -50 < 0; value: -20 0: 3 4 5 1: 1 2: 4 3: 1 2 3 optimal: 78/5 + + 78/5 <= 0; value: 78/5 - -5*v1 -3*v3 + 7 <= 0; value: 0 - -4*v3 + 8 = 0; value: 0 - -6*v2 -3 <= 0; value: 0 - -3*v0 -6*v2 + 21 = 0; value: 0 + -2 < 0; value: -2 0: 3 4 5 1: 1 2: 4 3 5 3: 1 2 3 0: 5 -> 8 1: 3 -> 1/5 2: 1 -> -1/2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 = 0; value: 0 + -3*v1 + v2 -4*v3 + 2 <= 0; value: -5 + 6*v1 -4*v2 + 3 <= 0; value: -1 + 5*v1 + 4*v3 -17 <= 0; value: -9 + -3*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3 3: 2 4 5 optimal: oo + 2*v0 -2/3*v2 + 8/3*v3 -4/3 <= 0; value: 34/3 + 2*v2 -2 = 0; value: 0 - -3*v1 + v2 -4*v3 + 2 <= 0; value: 0 + -2*v2 -8*v3 + 7 <= 0; value: -11 + 5/3*v2 -8/3*v3 -41/3 <= 0; value: -52/3 + -3*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3 4 3: 2 4 5 3 0: 4 -> 4 1: 0 -> -5/3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + v2 -3*v3 + 10 = 0; value: 0 + -6*v1 -4*v3 -3 <= 0; value: -53 + 3*v0 + 3*v1 -2*v2 -50 <= 0; value: -33 + -5*v0 + 5*v1 -9 < 0; value: -4 + 3*v0 -4*v1 <= 0; value: -8 0: 3 4 5 1: 2 3 4 5 2: 1 3 3: 1 2 optimal: oo + 4/7*v3 + 20/7 <= 0; value: 40/7 - v2 -3*v3 + 10 = 0; value: 0 + -64/7*v3 -201/7 <= 0; value: -521/7 - 21/4*v0 -2*v2 -50 <= 0; value: 0 + -10/7*v3 -113/7 < 0; value: -163/7 - 3*v0 -4*v1 <= 0; value: 0 0: 3 4 5 2 1: 2 3 4 5 2: 1 3 4 2 3: 1 2 4 0: 4 -> 80/7 1: 5 -> 60/7 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 -1*v2 + 6*v3 -31 < 0; value: -19 + -6*v1 + 3*v2 <= 0; value: 0 + -5*v0 -5*v3 -26 < 0; value: -56 + -4*v0 + v1 < 0; value: -6 + 4*v2 + 6*v3 -104 <= 0; value: -64 0: 1 3 4 1: 2 4 2: 1 2 5 3: 1 3 5 optimal: oo + 12*v0 + 311/5 < 0; value: 431/5 - -4*v0 -1*v2 + 6*v3 -31 < 0; value: -1 - -6*v1 + 3*v2 <= 0; value: 0 - -5*v0 -5*v3 -26 < 0; value: -5 + -9*v0 -311/10 < 0; value: -491/10 + -46*v0 -384 < 0; value: -476 0: 1 3 4 5 1: 2 4 2: 1 2 5 4 3: 1 3 5 4 0: 2 -> 2 1: 2 -> -188/5 2: 4 -> -376/5 3: 4 -> -31/5 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 2*v1 -6 <= 0; value: -2 + 6*v2 -2*v3 + 2 <= 0; value: 0 + <= 0; value: 0 + v2 -5*v3 + 1 < 0; value: -4 + -3*v1 -2*v3 + 8 = 0; value: 0 0: 1 1: 1 5 2: 2 4 3: 2 4 5 optimal: oo + 2*v0 + 4/3*v3 -16/3 <= 0; value: -4 + 5*v0 -4/3*v3 -2/3 <= 0; value: -2 + 6*v2 -2*v3 + 2 <= 0; value: 0 + <= 0; value: 0 + v2 -5*v3 + 1 < 0; value: -4 - -3*v1 -2*v3 + 8 = 0; value: 0 0: 1 1: 1 5 2: 2 4 3: 2 4 5 1 0: 0 -> 0 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -3*v1 -5*v3 <= 0; value: 0 + 6*v0 -4*v2 -3*v3 + 1 <= 0; value: -1 + 3*v0 + 2*v1 -4*v2 -3 < 0; value: -8 + -4*v1 + 12 = 0; value: 0 + 4*v1 -2*v3 -29 < 0; value: -17 0: 1 2 3 1: 1 3 4 5 2: 2 3 3: 1 2 5 optimal: oo + 40/21*v2 -190/21 <= 0; value: 10/21 - 3*v0 -3*v1 -5*v3 <= 0; value: 0 - 21/5*v0 -4*v2 + 32/5 <= 0; value: 0 + -8/7*v2 -11/7 < 0; value: -51/7 - -4*v0 + 20/3*v3 + 12 = 0; value: 0 + -8/7*v2 -81/7 < 0; value: -121/7 0: 1 2 3 4 5 1: 1 3 4 5 2: 2 3 5 3: 1 2 5 4 3 0: 3 -> 68/21 1: 3 -> 3 2: 5 -> 5 3: 0 -> 1/7 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 + 6*v3 + 13 <= 0; value: -7 + -1*v2 + 2 < 0; value: -1 + -3*v0 -2*v1 -12 <= 0; value: -32 + -4*v1 + 6*v2 -2 <= 0; value: 0 + v0 -11 < 0; value: -7 0: 3 5 1: 1 3 4 2: 2 4 3: 1 optimal: (17 -e*1) + + 17 < 0; value: 17 - -15/2*v2 + 6*v3 + 31/2 <= 0; value: 0 - -4/5*v3 -1/15 < 0; value: -1/30 + -50 < 0; value: -50 - -4*v1 + 6*v2 -2 <= 0; value: 0 - v0 -11 < 0; value: -1 0: 3 5 1: 1 3 4 2: 2 4 3 1 3: 1 3 2 0: 4 -> 10 1: 4 -> 51/20 2: 3 -> 61/30 3: 0 -> -1/24 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -1*v1 -6*v3 + 18 = 0; value: 0 + 3*v0 -20 <= 0; value: -11 + -4*v1 + 6*v2 -11 < 0; value: -5 + -3*v1 + 2*v3 -1 <= 0; value: 0 + 6*v0 -6*v2 <= 0; value: 0 0: 1 2 5 1: 1 3 4 2: 3 5 3: 1 4 optimal: (5/4 -e*1) + + 5/4 < 0; value: 5/4 - 5*v0 -1*v1 -6*v3 + 18 = 0; value: 0 + -29/4 <= 0; value: -29/4 - 4*v2 -17 < 0; value: -5/2 - -15*v0 + 20*v3 -55 <= 0; value: 0 - 6*v0 -6*v2 <= 0; value: 0 0: 1 2 5 3 4 1: 1 3 4 2: 3 5 2 3: 1 4 3 0: 3 -> 29/8 1: 3 -> 53/16 2: 3 -> 29/8 3: 5 -> 175/32 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 2*v1 + v2 -12 <= 0; value: -6 + -6*v0 + 4*v2 -34 <= 0; value: -18 + -6*v0 -3*v2 + 12 = 0; value: 0 + -6*v0 -3*v1 + 6*v2 -40 <= 0; value: -19 + 6*v1 -12 < 0; value: -6 0: 1 2 3 4 1: 1 4 5 2: 1 2 3 4 3: optimal: oo + 14*v0 + 32/3 <= 0; value: 32/3 + -16*v0 -56/3 <= 0; value: -56/3 + -14*v0 -18 <= 0; value: -18 - -6*v0 -3*v2 + 12 = 0; value: 0 - -6*v0 -3*v1 + 6*v2 -40 <= 0; value: 0 + -36*v0 -44 < 0; value: -44 0: 1 2 3 4 5 1: 1 4 5 2: 1 2 3 4 5 3: 0: 0 -> 0 1: 1 -> -16/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -6*v1 -1*v3 -1 <= 0; value: -12 + -3*v1 -5*v2 + 5*v3 -17 <= 0; value: -10 + -4*v2 -1 < 0; value: -13 + v1 -1*v2 + 6*v3 -48 <= 0; value: -20 + 6*v0 -5*v2 + 15 = 0; value: 0 0: 1 5 1: 1 2 4 2: 2 3 4 5 3: 1 2 4 optimal: 1579/328 + + 1579/328 <= 0; value: 1579/328 - 4*v0 -6*v1 -1*v3 -1 <= 0; value: 0 - -2*v0 -5*v2 + 11/2*v3 -33/2 <= 0; value: 0 + -1945/82 < 0; value: -1945/82 - 1312/165*v0 -586/33 <= 0; value: 0 - 6*v0 -5*v2 + 15 = 0; value: 0 0: 1 5 2 4 3 1: 1 2 4 2: 2 3 4 5 3: 1 2 4 0: 0 -> 1465/656 1: 1 -> -57/328 2: 3 -> 1863/328 3: 5 -> 368/41 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 -5*v2 + 4*v3 -3 <= 0; value: -9 + -1*v0 + 5*v1 + 6*v3 -8 <= 0; value: -4 + <= 0; value: 0 + -5*v0 + 4*v3 + 1 <= 0; value: -4 + 3*v1 + v2 + 5*v3 -3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 1 5 3: 1 2 4 5 optimal: oo + 181/18*v0 -101/18 <= 0; value: 40/9 - -3*v2 + 14*v3 -9 <= 0; value: 0 + -491/36*v0 + 163/36 <= 0; value: -82/9 + <= 0; value: 0 - -5*v0 + 6/7*v2 + 25/7 <= 0; value: 0 - 3*v1 + v2 + 5*v3 -3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 1 5 2 4 3: 1 2 4 5 0: 1 -> 1 1: 1 -> -11/9 2: 0 -> 5/3 3: 0 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -3*v3 + 11 < 0; value: -1 + 4*v0 -5*v2 + 2 <= 0; value: -3 + 5*v1 -4*v2 -3*v3 -5 < 0; value: -27 + -3*v2 + 3*v3 -1 <= 0; value: -4 + -4*v0 -18 <= 0; value: -38 0: 2 5 1: 3 2: 2 3 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -3*v3 + 11 < 0; value: -1 + 4*v0 -5*v2 + 2 <= 0; value: -3 + 5*v1 -4*v2 -3*v3 -5 < 0; value: -27 + -3*v2 + 3*v3 -1 <= 0; value: -4 + -4*v0 -18 <= 0; value: -38 0: 2 5 1: 3 2: 2 3 4 3: 1 3 4 0: 5 -> 5 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -6*v1 + 1 <= 0; value: 0 + 3*v0 -1*v2 + 2 <= 0; value: 0 + 5*v3 -10 = 0; value: 0 + -6*v0 -6*v1 + 2*v3 + 8 = 0; value: 0 + 4*v1 -4*v2 + 5*v3 -3 < 0; value: -9 0: 1 2 4 1: 1 4 5 2: 2 5 3: 3 4 5 optimal: 0 + <= 0; value: 0 - 5*v0 -6*v1 + 1 <= 0; value: 0 - 3*v0 -1*v2 + 2 <= 0; value: 0 - 5*v3 -10 = 0; value: 0 - -11/3*v2 + 2*v3 + 43/3 = 0; value: 0 + -9 < 0; value: -9 0: 1 2 4 5 1: 1 4 5 2: 2 5 4 3: 3 4 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -5*v2 -6*v3 + 19 = 0; value: 0 + -1*v2 -1*v3 + 2 = 0; value: 0 + -4*v2 -1*v3 -2 <= 0; value: -7 + -3*v0 -8 <= 0; value: -23 + 3*v0 + 3*v1 + 5*v2 -46 <= 0; value: -20 0: 4 5 1: 1 5 2: 1 2 3 5 3: 1 2 3 optimal: 265/9 + + 265/9 <= 0; value: 265/9 - -4*v1 -5*v2 -6*v3 + 19 = 0; value: 0 - -1*v2 -1*v3 + 2 = 0; value: 0 - -3*v2 -4 <= 0; value: 0 + -677/12 <= 0; value: -677/12 - 3*v0 -581/12 <= 0; value: 0 0: 4 5 1: 1 5 2: 1 2 3 5 3: 1 2 3 5 0: 5 -> 581/36 1: 2 -> 17/12 2: 1 -> -4/3 3: 1 -> 10/3 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + -5*v1 -5*v3 -9 < 0; value: -39 + 6*v0 + 5*v2 -71 < 0; value: -40 + -4*v2 + v3 + 16 = 0; value: 0 + -4*v1 -5*v2 + 33 = 0; value: 0 0: 3 1: 2 5 2: 3 4 5 3: 2 4 optimal: oo + -1*v0 + 19 < 0; value: 18 + <= 0; value: 0 + 33/2*v0 -331/2 < 0; value: -149 - 6*v0 + 5/4*v3 -51 < 0; value: -5/4 - -4*v2 + v3 + 16 = 0; value: 0 - -4*v1 -5*v2 + 33 = 0; value: 0 0: 3 2 1: 2 5 2: 3 4 5 2 3: 2 4 3 0: 1 -> 1 1: 2 -> -123/16 2: 5 -> 51/4 3: 4 -> 35 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 -45 <= 0; value: -29 + 5*v0 -25 = 0; value: 0 + -3*v0 -5*v2 + 35 = 0; value: 0 + -6*v1 -2*v2 + 2*v3 -1 < 0; value: -13 + -6*v1 -4*v2 -2 <= 0; value: -24 0: 2 3 1: 4 5 2: 1 3 4 5 3: 4 optimal: (16 -e*1) + + 16 < 0; value: 16 + -29 <= 0; value: -29 - 5*v0 -25 = 0; value: 0 - -3*v0 -5*v2 + 35 = 0; value: 0 - -6*v1 -2*v2 + 2*v3 -1 < 0; value: -6 - -2*v2 -2*v3 -1 <= 0; value: 0 0: 2 3 1 1: 4 5 2: 1 3 4 5 3: 4 5 0: 5 -> 5 1: 1 -> -2 2: 4 -> 4 3: 1 -> -9/2 + 2*v0 -2*v1 <= 0; value: -4 + -6*v0 + 2*v2 -2 = 0; value: 0 + -3*v0 -4*v1 -3*v2 + 4 < 0; value: -7 + -5*v0 <= 0; value: 0 + -2*v0 -6*v2 -3 <= 0; value: -9 + 3*v0 + 2*v1 -2*v3 + 4 = 0; value: 0 0: 1 2 3 4 5 1: 2 5 2: 1 2 4 3: 5 optimal: oo + 8*v0 -1/2 < 0; value: -1/2 - -6*v0 + 2*v2 -2 = 0; value: 0 - 3*v0 -3*v2 -4*v3 + 12 < 0; value: -7/2 + -5*v0 <= 0; value: 0 + -20*v0 -9 <= 0; value: -9 - 3*v0 + 2*v1 -2*v3 + 4 = 0; value: 0 0: 1 2 3 4 5 1: 2 5 2: 1 2 4 3: 5 2 0: 0 -> 0 1: 2 -> 9/8 2: 1 -> 1 3: 4 -> 25/8 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 4*v2 + 2*v3 -99 <= 0; value: -55 + -3*v0 -2*v2 -12 <= 0; value: -33 + 5*v2 + v3 -31 <= 0; value: -15 + 6*v0 + 4*v1 -5*v2 -40 <= 0; value: -13 + -4*v1 + 2*v3 -7 <= 0; value: -17 0: 1 2 4 1: 4 5 2: 1 2 3 4 3: 1 3 5 optimal: oo + 2*v0 -1*v3 + 7/2 <= 0; value: 25/2 + 6*v0 + 4*v2 + 2*v3 -99 <= 0; value: -55 + -3*v0 -2*v2 -12 <= 0; value: -33 + 5*v2 + v3 -31 <= 0; value: -15 + 6*v0 -5*v2 + 2*v3 -47 <= 0; value: -30 - -4*v1 + 2*v3 -7 <= 0; value: 0 0: 1 2 4 1: 4 5 2: 1 2 3 4 3: 1 3 5 4 0: 5 -> 5 1: 3 -> -5/4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 3*v2 + 7 < 0; value: -1 + -4*v0 -5*v2 -13 < 0; value: -53 + 3*v1 -22 <= 0; value: -7 + -2*v0 + 3*v1 -13 <= 0; value: -8 + 2*v3 -7 <= 0; value: -1 0: 2 4 1: 1 3 4 2: 1 2 3: 5 optimal: oo + 16/5*v0 + 2/5 < 0; value: 82/5 - -4*v1 + 3*v2 + 7 < 0; value: -4 - -4*v0 -5*v2 -13 < 0; value: -5 + -9/5*v0 -113/5 < 0; value: -158/5 + -19/5*v0 -68/5 < 0; value: -163/5 + 2*v3 -7 <= 0; value: -1 0: 2 4 3 1: 1 3 4 2: 1 2 3 4 3: 5 0: 5 -> 5 1: 5 -> -29/20 2: 4 -> -28/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 + 5*v3 + 1 <= 0; value: -1 + -1*v0 + 5 = 0; value: 0 + 5*v1 + 2*v2 + v3 -51 <= 0; value: -32 + -4*v1 + 3*v2 -5*v3 -7 <= 0; value: -26 + 3*v0 + 4*v2 -19 = 0; value: 0 0: 2 5 1: 1 3 4 2: 3 4 5 3: 1 3 4 optimal: 43/4 + + 43/4 <= 0; value: 43/4 - -4*v1 + 5*v3 + 1 <= 0; value: 0 - -1*v0 + 5 = 0; value: 0 + -411/8 <= 0; value: -411/8 - 3*v2 -10*v3 -8 <= 0; value: 0 - 3*v0 + 4*v2 -19 = 0; value: 0 0: 2 5 3 1: 1 3 4 2: 3 4 5 3: 1 3 4 0: 5 -> 5 1: 3 -> -3/8 2: 1 -> 1 3: 2 -> -1/2 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + -5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 5*v0 -5*v1 -6 <= 0; value: -16 + 6*v0 -3*v2 < 0; value: -3 + -2*v0 -3*v2 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 3 2: 2 4 5 3: 2 5 optimal: 12/5 + + 12/5 <= 0; value: 12/5 + <= 0; value: 0 + -5*v0 + v2 + 6*v3 -13 = 0; value: 0 - 5*v0 -5*v1 -6 <= 0; value: 0 + 6*v0 -3*v2 < 0; value: -3 + -2*v0 -3*v2 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 3 2: 2 4 5 3: 2 5 0: 0 -> 0 1: 2 -> -6/5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -5*v2 + 15 = 0; value: 0 + -1*v1 + 4*v2 -27 <= 0; value: -15 + -5*v0 + 3*v2 + 11 = 0; value: 0 + -5*v0 + 6*v1 + 13 < 0; value: -7 + 2*v0 -21 < 0; value: -13 0: 3 4 5 1: 1 2 4 2: 1 2 3 3: optimal: 290/13 + + 290/13 <= 0; value: 290/13 - -2*v1 -5*v2 + 15 = 0; value: 0 - 65/6*v0 -175/3 <= 0; value: 0 - -5*v0 + 3*v2 + 11 = 0; value: 0 + -631/13 < 0; value: -631/13 + -133/13 < 0; value: -133/13 0: 3 4 5 2 1: 1 2 4 2: 1 2 3 4 3: 0: 4 -> 70/13 1: 0 -> -75/13 2: 3 -> 69/13 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -6*v2 -4*v3 + 4 < 0; value: -10 + 6*v0 -4*v3 -4 = 0; value: 0 + <= 0; value: 0 + -3*v0 + v3 + 4 <= 0; value: 0 + -5*v0 -4*v1 + 4*v2 < 0; value: -6 0: 2 4 5 1: 5 2: 1 5 3: 1 2 4 optimal: oo + 13/2*v0 -8/3 < 0; value: 31/3 - -6*v2 -4*v3 + 4 < 0; value: -5 - 6*v0 -4*v3 -4 = 0; value: 0 + <= 0; value: 0 + -3/2*v0 + 3 <= 0; value: 0 - -5*v0 -4*v1 + 4*v2 < 0; value: -4 0: 2 4 5 1: 5 2: 1 5 3: 1 2 4 0: 2 -> 2 1: 0 -> -4/3 2: 1 -> 1/6 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + v1 + 3*v3 -20 <= 0; value: -4 + <= 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 6*v0 -4*v3 + 16 = 0; value: 0 + 6*v1 + 6*v3 -48 = 0; value: 0 0: 3 4 1: 1 5 2: 3 3: 1 4 5 optimal: -4/3 + -4/3 <= 0; value: -4/3 - 9/2*v2 -4 <= 0; value: 0 + <= 0; value: 0 - -4*v0 + 6*v2 = 0; value: 0 - 6*v0 -4*v3 + 16 = 0; value: 0 - 6*v1 + 6*v3 -48 = 0; value: 0 0: 3 4 1 1: 1 5 2: 3 1 3: 1 4 5 0: 0 -> 4/3 1: 4 -> 2 2: 0 -> 8/9 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: 2 + -4*v2 <= 0; value: 0 + 5*v0 -2*v1 -5*v2 -8 <= 0; value: 0 + 2*v0 + 4*v1 -4*v2 -19 <= 0; value: -11 + -3*v3 <= 0; value: -12 + 3*v0 + 3*v3 -37 < 0; value: -19 0: 2 3 5 1: 2 3 2: 1 2 3 3: 4 5 optimal: oo + -3*v0 + 5*v2 + 8 <= 0; value: 2 + -4*v2 <= 0; value: 0 - 5*v0 -2*v1 -5*v2 -8 <= 0; value: 0 + 12*v0 -14*v2 -35 <= 0; value: -11 + -3*v3 <= 0; value: -12 + 3*v0 + 3*v3 -37 < 0; value: -19 0: 2 3 5 1: 2 3 2: 1 2 3 3: 4 5 0: 2 -> 2 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + -6*v0 -6*v3 + 1 <= 0; value: -11 + 6*v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 4*v2 + 5*v3 -58 <= 0; value: -33 + 2*v0 + 3*v1 + 4*v3 -15 = 0; value: 0 0: 2 3 4 5 1: 5 2: 4 3: 2 3 4 5 optimal: oo + 6/5*v0 -32/15*v2 + 314/15 <= 0; value: 68/5 + <= 0; value: 0 + -6/5*v0 + 24/5*v2 -343/5 <= 0; value: -253/5 + 42/5*v0 + 12/5*v2 -194/5 <= 0; value: -104/5 - 4*v0 + 4*v2 + 5*v3 -58 <= 0; value: 0 - 2*v0 + 3*v1 + 4*v3 -15 = 0; value: 0 0: 2 3 4 5 1: 5 2: 4 2 3 3: 2 3 4 5 0: 1 -> 1 1: 3 -> -29/5 2: 4 -> 4 3: 1 -> 38/5 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 5*v1 + 6*v2 -16 = 0; value: 0 + 5*v0 + v3 -27 < 0; value: -11 + -2*v0 -2*v1 + 2*v2 -1 <= 0; value: -7 + -3*v1 -5*v2 + 6*v3 + 6 < 0; value: -4 + 2*v0 + 2*v1 -12 <= 0; value: -2 0: 1 2 3 5 1: 1 3 4 5 2: 1 3 4 3: 2 4 optimal: (128/7 -e*1) + + 128/7 < 0; value: 128/7 - -2*v0 + 5*v1 + 6*v2 -16 = 0; value: 0 - 5*v0 + v3 -27 < 0; value: -5 - -14/5*v0 + 22/5*v2 -37/5 <= 0; value: 0 + -1217/14 < 0; value: -1217/14 - -14/55*v3 -152/55 <= 0; value: 0 0: 1 2 3 5 4 1: 1 3 4 5 2: 1 3 4 5 3: 2 4 5 0: 3 -> 46/7 1: 2 -> -93/77 2: 2 -> 129/22 3: 1 -> -76/7 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v2 + 3*v3 -2 < 0; value: -1 + 2*v1 + 5*v3 -33 < 0; value: -8 + -4*v2 + 2 <= 0; value: -2 + -2*v0 -6*v2 + 5 <= 0; value: -7 + 4*v0 + 4*v3 -24 = 0; value: 0 0: 1 4 5 1: 2 2: 1 3 4 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v2 + 3*v3 -2 < 0; value: -1 + 2*v1 + 5*v3 -33 < 0; value: -8 + -4*v2 + 2 <= 0; value: -2 + -2*v0 -6*v2 + 5 <= 0; value: -7 + 4*v0 + 4*v3 -24 = 0; value: 0 0: 1 4 5 1: 2 2: 1 3 4 3: 1 2 5 0: 3 -> 3 1: 5 -> 5 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 -4*v2 -6*v3 + 2 <= 0; value: 0 + 2*v0 -2*v3 -8 = 0; value: 0 + -4*v0 -2*v1 + 4*v2 + 4 = 0; value: 0 + -2*v1 <= 0; value: 0 + 5*v0 -4*v2 -15 <= 0; value: -6 0: 1 2 3 5 1: 3 4 2: 1 3 5 3: 1 2 optimal: 10 + + 10 <= 0; value: 10 - 4*v0 -4*v2 -6*v3 + 2 <= 0; value: 0 - 2*v0 -2*v3 -8 = 0; value: 0 - -4*v0 -2*v1 + 4*v2 + 4 = 0; value: 0 - 6*v0 -30 <= 0; value: 0 + -6 <= 0; value: -6 0: 1 2 3 5 4 4 1: 3 4 2: 1 3 5 4 3: 1 2 5 4 0: 5 -> 5 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -11 <= 0; value: -23 + -6*v1 -7 <= 0; value: -25 + 5*v0 + v2 -15 <= 0; value: 0 + v1 -6*v3 + 21 = 0; value: 0 + 3*v0 -2*v1 <= 0; value: 0 0: 1 3 5 1: 2 4 5 2: 3 3: 4 optimal: 7/9 + + 7/9 <= 0; value: 7/9 + -19/3 <= 0; value: -19/3 - -9*v0 -7 <= 0; value: 0 + v2 -170/9 <= 0; value: -125/9 - v1 -6*v3 + 21 = 0; value: 0 - 3*v0 -12*v3 + 42 <= 0; value: 0 0: 1 3 5 2 1: 2 4 5 2: 3 3: 4 2 5 0: 2 -> -7/9 1: 3 -> -7/6 2: 5 -> 5 3: 4 -> 119/36 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 -5*v1 + 1 <= 0; value: -24 + -3*v2 + 4*v3 -2 <= 0; value: -5 + 2*v2 -13 <= 0; value: -3 + -5*v1 + v3 -7 <= 0; value: -19 + 5*v1 -5*v2 + 10 = 0; value: 0 0: 1 1: 1 4 5 2: 2 3 5 3: 2 4 optimal: oo + 2*v0 + 40/17 <= 0; value: 108/17 + -5*v0 + 117/17 <= 0; value: -53/17 - -3*v2 + 4*v3 -2 <= 0; value: 0 + -193/17 <= 0; value: -193/17 - -17/3*v3 + 19/3 <= 0; value: 0 - 5*v1 -5*v2 + 10 = 0; value: 0 0: 1 1: 1 4 5 2: 2 3 5 1 4 3: 2 4 1 3 0: 2 -> 2 1: 3 -> -20/17 2: 5 -> 14/17 3: 3 -> 19/17 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 2*v3 -16 = 0; value: 0 + -6*v1 -3*v3 + 8 <= 0; value: -10 + 5*v1 + v2 -45 <= 0; value: -29 + v0 -3*v3 -6 <= 0; value: -2 + -5*v1 -5*v2 + 20 = 0; value: 0 0: 1 4 1: 2 3 5 2: 3 5 3: 1 2 4 optimal: 16/3 + + 16/3 <= 0; value: 16/3 - 4*v0 + 2*v3 -16 = 0; value: 0 - 6*v2 -3*v3 -16 <= 0; value: 0 + 4*v0 -155/3 <= 0; value: -107/3 + 7*v0 -30 <= 0; value: -2 - -5*v1 -5*v2 + 20 = 0; value: 0 0: 1 4 3 1: 2 3 5 2: 3 5 2 3: 1 2 4 3 0: 4 -> 4 1: 3 -> 4/3 2: 1 -> 8/3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -5*v1 -1*v2 + 1 <= 0; value: 0 + -3*v0 -3*v1 -1*v2 -2 < 0; value: -6 + -1*v1 + v3 -2 <= 0; value: -1 + 2*v1 + 5*v2 -13 <= 0; value: -8 + 4*v0 + 4*v2 -15 <= 0; value: -7 0: 2 5 1: 1 2 3 4 2: 1 2 4 5 3: 3 optimal: 125/46 + + 125/46 <= 0; value: 125/46 - -5*v1 -1*v2 + 1 <= 0; value: 0 + -619/92 < 0; value: -619/92 + v3 -38/23 <= 0; value: -15/23 - 23/5*v2 -63/5 <= 0; value: 0 - 4*v0 -93/23 <= 0; value: 0 0: 2 5 1: 1 2 3 4 2: 1 2 4 5 3 3: 3 0: 1 -> 93/92 1: 0 -> -8/23 2: 1 -> 63/23 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + 2 <= 0; value: 0 + 4*v0 -6*v1 -4 < 0; value: -16 + v2 -2*v3 < 0; value: -1 + 3*v2 + 3*v3 -7 <= 0; value: -1 + 4*v0 + 5*v2 -14 < 0; value: -9 0: 2 5 1: 2 2: 1 3 4 5 3: 3 4 optimal: (17/6 -e*1) + + 17/6 < 0; value: 17/6 - -2*v2 + 2 <= 0; value: 0 - 4*v0 -6*v1 -4 < 0; value: -11/2 + -2*v3 + 1 < 0; value: -1 + 3*v3 -4 <= 0; value: -1 - 4*v0 + 5*v2 -14 < 0; value: -4 0: 2 5 1: 2 2: 1 3 4 5 3: 3 4 0: 0 -> 5/4 1: 2 -> 13/12 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -5*v2 + 4*v3 + 12 = 0; value: 0 + 3*v0 -6*v2 + 4*v3 + 10 = 0; value: 0 + -2*v1 + 4*v2 + 2*v3 -16 <= 0; value: -6 + 2*v0 + 5*v2 + v3 -74 <= 0; value: -48 + -1*v3 + 1 < 0; value: -1 0: 2 4 1: 3 2: 1 2 3 4 3: 1 2 3 4 5 optimal: (14/3 -e*1) + + 14/3 < 0; value: 14/3 - -5*v2 + 4*v3 + 12 = 0; value: 0 - 3*v0 -1*v2 -2 = 0; value: 0 - -2*v1 + 4*v2 + 2*v3 -16 <= 0; value: 0 + -803/15 < 0; value: -803/15 - -15/4*v0 + 13/2 < 0; value: -1/2 0: 2 4 5 1: 3 2: 1 2 3 4 5 3: 1 2 3 4 5 0: 2 -> 28/15 1: 5 -> 7/10 2: 4 -> 18/5 3: 2 -> 3/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v2 -6*v3 -3 <= 0; value: -23 + -2*v0 + 5*v3 -1 < 0; value: -5 + -1*v3 <= 0; value: 0 + -6*v0 + 5*v2 -3*v3 -37 <= 0; value: -24 + -3*v0 + 2 <= 0; value: -4 0: 2 4 5 1: 2: 1 4 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -4*v2 -6*v3 -3 <= 0; value: -23 + -2*v0 + 5*v3 -1 < 0; value: -5 + -1*v3 <= 0; value: 0 + -6*v0 + 5*v2 -3*v3 -37 <= 0; value: -24 + -3*v0 + 2 <= 0; value: -4 0: 2 4 5 1: 2: 1 4 3: 1 2 3 4 0: 2 -> 2 1: 4 -> 4 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -5*v1 + 11 < 0; value: -2 + -4*v3 -8 < 0; value: -28 + -2*v1 + 2*v3 <= 0; value: 0 + 5*v1 -33 < 0; value: -8 + -2*v0 + 4*v2 -3*v3 -16 < 0; value: -35 0: 1 5 1: 1 3 4 2: 5 3: 2 3 5 optimal: (22/15 -e*1) + + 22/15 < 0; value: 22/15 - 3*v0 -5*v3 + 11 < 0; value: -5/2 + -172/5 < 0; value: -172/5 - -2*v1 + 2*v3 <= 0; value: 0 - 3*v0 -22 < 0; value: -3 + 4*v2 -757/15 < 0; value: -697/15 0: 1 5 2 4 1: 1 3 4 2: 5 3: 2 3 5 1 4 0: 4 -> 19/3 1: 5 -> 13/2 2: 1 -> 1 3: 5 -> 13/2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + -6*v0 -3*v2 -5*v3 + 22 <= 0; value: -27 + -4*v0 + 3*v2 + 5 <= 0; value: -6 + 3*v0 -3*v3 -19 <= 0; value: -10 + -3*v2 -4*v3 -13 < 0; value: -30 0: 2 3 4 1: 2: 2 3 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + -6*v0 -3*v2 -5*v3 + 22 <= 0; value: -27 + -4*v0 + 3*v2 + 5 <= 0; value: -6 + 3*v0 -3*v3 -19 <= 0; value: -10 + -3*v2 -4*v3 -13 < 0; value: -30 0: 2 3 4 1: 2: 2 3 5 3: 1 2 4 5 0: 5 -> 5 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -5*v2 + 3*v3 -6 < 0; value: -14 + -2*v1 + v2 + 4*v3 -23 <= 0; value: -3 + 4*v0 + 3*v3 -20 <= 0; value: -8 + 3*v3 -12 = 0; value: 0 + -6*v0 -4*v1 = 0; value: 0 0: 1 3 5 1: 2 5 2: 1 2 3: 1 2 3 4 optimal: 10 + + 10 <= 0; value: 10 + -3 < 0; value: -3 - 3*v0 + v2 + 4*v3 -23 <= 0; value: 0 - -4/3*v2 + 4/3 <= 0; value: 0 - 3*v3 -12 = 0; value: 0 - -6*v0 -4*v1 = 0; value: 0 0: 1 3 5 2 1: 2 5 2: 1 2 3 3: 1 2 3 4 0: 0 -> 2 1: 0 -> -3 2: 4 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 6*v2 -3*v3 -21 <= 0; value: -45 + 5*v1 + 2*v2 -45 < 0; value: -28 + -6*v2 -4*v3 -16 <= 0; value: -38 + -5*v1 + 3*v2 + 3 <= 0; value: -9 + = 0; value: 0 0: 1: 1 2 4 2: 1 2 3 4 3: 1 3 optimal: oo + 2*v0 + 4/5*v3 + 2 <= 0; value: 56/5 + -23/5*v3 -31 <= 0; value: -247/5 + -10/3*v3 -166/3 < 0; value: -206/3 - -6*v2 -4*v3 -16 <= 0; value: 0 - -5*v1 + 3*v2 + 3 <= 0; value: 0 + = 0; value: 0 0: 1: 1 2 4 2: 1 2 3 4 3: 1 3 2 0: 3 -> 3 1: 3 -> -13/5 2: 1 -> -16/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 2 = 0; value: 0 + -1*v0 -1*v3 -1 <= 0; value: -7 + 5*v0 -1*v2 + 2*v3 -39 < 0; value: -24 + -5*v0 + v2 + 1 < 0; value: -6 + -4*v0 + 4*v1 -4*v2 + 12 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 3 4 5 3: 2 3 optimal: (76 -e*1) + + 76 < 0; value: 76 - -1*v0 + 2 = 0; value: 0 - -1*v0 -1*v3 -1 <= 0; value: 0 - 5*v0 -1*v2 + 2*v3 -39 < 0; value: -1 + -44 < 0; value: -44 - -4*v0 + 4*v1 -4*v2 + 12 = 0; value: 0 0: 1 2 3 4 5 4 1: 5 2: 3 4 5 3: 2 3 4 0: 2 -> 2 1: 2 -> -35 2: 3 -> -34 3: 4 -> -3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 + 6*v3 -34 <= 0; value: -2 + -2*v0 + 5*v3 = 0; value: 0 + -6*v1 -4*v2 + 5*v3 + 16 <= 0; value: -4 + -1*v0 -4*v1 -3*v3 + 18 <= 0; value: -13 + 5*v0 + 5*v1 + 4*v3 -151 <= 0; value: -93 0: 2 4 5 1: 1 3 4 5 2: 3 3: 1 2 3 4 5 optimal: 7274/77 + + 7274/77 <= 0; value: 7274/77 + -718/77 <= 0; value: -718/77 - -2*v0 + 5*v3 = 0; value: 0 - -6*v1 -4*v2 + 5*v3 + 16 <= 0; value: 0 - -53/15*v0 + 8/3*v2 + 22/3 <= 0; value: 0 - 77/20*v0 -257/2 <= 0; value: 0 0: 2 4 5 1 1: 1 3 4 5 2: 3 4 1 5 3: 1 2 3 4 5 0: 5 -> 2570/77 1: 5 -> -97/7 2: 0 -> 6387/154 3: 2 -> 1028/77 + 2*v0 -2*v1 <= 0; value: 2 + 4*v3 -6 < 0; value: -2 + -6*v1 -6*v2 -9 < 0; value: -39 + -4*v0 -1*v2 + 3 <= 0; value: -6 + v0 -3*v1 -1 <= 0; value: 0 + 3*v1 + 4*v2 + 3*v3 -28 <= 0; value: -5 0: 3 4 1: 2 4 5 2: 2 3 5 3: 1 5 optimal: oo + -16/3*v2 -4*v3 + 118/3 <= 0; value: 26/3 + 4*v3 -6 < 0; value: -2 + 2*v2 + 6*v3 -65 < 0; value: -49 + 15*v2 + 12*v3 -113 <= 0; value: -26 - v0 -3*v1 -1 <= 0; value: 0 - v0 + 4*v2 + 3*v3 -29 <= 0; value: 0 0: 3 4 2 5 1: 2 4 5 2: 2 3 5 3: 1 5 3 2 0: 1 -> 6 1: 0 -> 5/3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 6*v3 -34 = 0; value: 0 + v1 -2*v3 + 6 = 0; value: 0 + -3*v0 + 5*v1 -3*v2 -2 = 0; value: 0 + -5*v3 -8 <= 0; value: -33 + 2*v1 -2*v2 -10 <= 0; value: -4 0: 3 1: 2 3 5 2: 1 3 5 3: 1 2 4 optimal: 110/21 + + 110/21 <= 0; value: 110/21 - 4*v2 + 6*v3 -34 = 0; value: 0 - v1 -2*v3 + 6 = 0; value: 0 - -3*v0 -29/3*v2 + 74/3 = 0; value: 0 + -251/7 <= 0; value: -251/7 - 42/29*v0 -326/29 <= 0; value: 0 0: 3 4 5 1: 2 3 5 2: 1 3 5 4 3: 1 2 4 3 5 0: 5 -> 163/21 1: 4 -> 36/7 2: 1 -> 1/7 3: 5 -> 39/7 + 2*v0 -2*v1 <= 0; value: 8 + 4*v1 <= 0; value: 0 + 2*v0 -3*v2 -3 <= 0; value: -1 + -6*v1 <= 0; value: 0 + 2*v0 + 4*v2 -3*v3 -1 <= 0; value: 0 + -3*v0 + 2 <= 0; value: -10 0: 2 4 5 1: 1 3 2: 2 4 3: 4 optimal: oo + 3*v2 + 3 <= 0; value: 9 + <= 0; value: 0 - -7*v2 + 3*v3 -2 <= 0; value: 0 - -6*v1 <= 0; value: 0 - 2*v0 + 4*v2 -3*v3 -1 <= 0; value: 0 + -9/2*v2 -5/2 <= 0; value: -23/2 0: 2 4 5 1: 1 3 2: 2 4 5 3: 4 2 5 0: 4 -> 9/2 1: 0 -> 0 2: 2 -> 2 3: 5 -> 16/3 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 <= 0; value: -20 + -2*v0 -6*v1 + 20 = 0; value: 0 + -3*v0 + 2*v2 + 10 <= 0; value: 0 + = 0; value: 0 + 3*v0 + v3 -44 <= 0; value: -29 0: 1 2 3 5 1: 2 2: 3 3: 5 optimal: oo + -8/9*v3 + 292/9 <= 0; value: 268/9 + 5/3*v3 -220/3 <= 0; value: -205/3 - -2*v0 -6*v1 + 20 = 0; value: 0 + 2*v2 + v3 -34 <= 0; value: -29 + = 0; value: 0 - 3*v0 + v3 -44 <= 0; value: 0 0: 1 2 3 5 1: 2 2: 3 3: 5 1 3 0: 4 -> 41/3 1: 2 -> -11/9 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 -3*v3 + 9 = 0; value: 0 + 2*v0 <= 0; value: 0 + -1*v0 -6*v3 + 18 = 0; value: 0 + 3*v3 -9 = 0; value: 0 + v0 + 2*v2 + v3 -5 = 0; value: 0 0: 1 2 3 5 1: 2: 5 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 -3*v3 + 9 = 0; value: 0 + 2*v0 <= 0; value: 0 + -1*v0 -6*v3 + 18 = 0; value: 0 + 3*v3 -9 = 0; value: 0 + v0 + 2*v2 + v3 -5 = 0; value: 0 0: 1 2 3 5 1: 2: 5 3: 1 3 4 5 0: 0 -> 0 1: 3 -> 3 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 3*v1 -21 <= 0; value: -7 + -5*v1 -5 <= 0; value: -15 + -4*v1 + 2*v2 + 6*v3 -26 = 0; value: 0 + -3*v0 + 6*v3 -28 < 0; value: -4 + 3*v0 + 5*v2 -16 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 3 5 3: 3 4 optimal: 14 + + 14 <= 0; value: 14 - -20/3*v2 -8/3 <= 0; value: 0 - -5/2*v2 -15/2*v3 + 55/2 <= 0; value: 0 - -4*v1 + 2*v2 + 6*v3 -26 = 0; value: 0 + -116/5 < 0; value: -116/5 - 3*v0 + 5*v2 -16 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 3 5 2 1 4 1 3: 3 4 2 1 0: 2 -> 6 1: 2 -> -1 2: 2 -> -2/5 3: 5 -> 19/5 + 2*v0 -2*v1 <= 0; value: 6 + 6*v2 <= 0; value: 0 + -5*v1 + 4*v3 + 6 = 0; value: 0 + -6*v0 + v1 + 23 <= 0; value: -5 + 3*v0 + 2*v3 -33 <= 0; value: -16 + -3*v1 -6*v2 -4*v3 + 6 <= 0; value: -4 0: 3 4 1: 2 3 5 2: 1 5 3: 2 4 5 optimal: 37/2 + + 37/2 <= 0; value: 37/2 - 6*v2 <= 0; value: 0 - -5*v1 + 4*v3 + 6 = 0; value: 0 + -40 <= 0; value: -40 - 3*v0 -129/4 <= 0; value: 0 - -6*v2 -32/5*v3 + 12/5 <= 0; value: 0 0: 3 4 1: 2 3 5 2: 1 5 4 3 3: 2 4 5 3 0: 5 -> 43/4 1: 2 -> 3/2 2: 0 -> 0 3: 1 -> 3/8 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 6*v2 + 4*v3 -41 <= 0; value: -25 + -2*v0 + 4*v3 <= 0; value: 0 + -4*v0 + 6*v1 -1*v3 < 0; value: -9 + v2 -2 = 0; value: 0 + 6*v0 + 6*v1 + 3*v2 -33 <= 0; value: -15 0: 2 3 5 1: 1 3 5 2: 1 4 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 6*v2 + 4*v3 -41 <= 0; value: -25 + -2*v0 + 4*v3 <= 0; value: 0 + -4*v0 + 6*v1 -1*v3 < 0; value: -9 + v2 -2 = 0; value: 0 + 6*v0 + 6*v1 + 3*v2 -33 <= 0; value: -15 0: 2 3 5 1: 1 3 5 2: 1 4 5 3: 1 2 3 0: 2 -> 2 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -27 <= 0; value: -57 + v0 -5*v1 -3 <= 0; value: -13 + 3*v0 + 3*v2 + 4*v3 -55 < 0; value: -29 + -5*v2 -3 <= 0; value: -8 + -2*v0 + 4*v3 + 1 <= 0; value: -1 0: 1 2 3 5 1: 2 2: 3 4 3: 3 5 optimal: oo + -8/5*v2 -32/15*v3 + 458/15 < 0; value: 74/3 + 6*v2 + 8*v3 -137 < 0; value: -115 - v0 -5*v1 -3 <= 0; value: 0 - 3*v0 + 3*v2 + 4*v3 -55 < 0; value: -3 + -5*v2 -3 <= 0; value: -8 + 2*v2 + 20/3*v3 -107/3 < 0; value: -61/3 0: 1 2 3 5 1: 2 2: 3 4 1 5 3: 3 5 1 0: 5 -> 41/3 1: 3 -> 32/15 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -40 <= 0; value: -22 + 3*v2 -3*v3 + 1 <= 0; value: -2 + 3*v0 -1*v1 + 6*v2 -6 = 0; value: 0 + 2*v1 -2*v2 -6*v3 <= 0; value: 0 + -4*v0 + v1 -2*v2 + 7 <= 0; value: -2 0: 1 3 5 1: 3 4 5 2: 2 3 4 5 3: 2 4 optimal: oo + -4*v0 -12*v2 + 12 <= 0; value: 0 + 6*v0 -40 <= 0; value: -22 + 3*v2 -3*v3 + 1 <= 0; value: -2 - 3*v0 -1*v1 + 6*v2 -6 = 0; value: 0 + 6*v0 + 10*v2 -6*v3 -12 <= 0; value: 0 + -1*v0 + 4*v2 + 1 <= 0; value: -2 0: 1 3 5 4 1: 3 4 5 2: 2 3 4 5 3: 2 4 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 3*v3 -3 = 0; value: 0 + 4*v2 -22 <= 0; value: -10 + -6*v2 + 4*v3 + 14 = 0; value: 0 + -6*v0 -3*v1 -5 <= 0; value: -23 + -2*v0 -1*v1 + 4*v2 -11 <= 0; value: -5 0: 4 5 1: 4 5 2: 2 3 5 3: 1 3 optimal: oo + 6*v0 -2 <= 0; value: 4 - 3*v3 -3 = 0; value: 0 + -10 <= 0; value: -10 - -6*v2 + 4*v3 + 14 = 0; value: 0 + -8 <= 0; value: -8 - -2*v0 -1*v1 + 4*v2 -11 <= 0; value: 0 0: 4 5 1: 4 5 2: 2 3 5 4 3: 1 3 4 2 0: 1 -> 1 1: 4 -> -1 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -1*v3 -4 <= 0; value: 0 + 2*v0 + 3*v2 -5*v3 -4 <= 0; value: -1 + -3*v2 -5*v3 -5 <= 0; value: -24 + 3*v1 -11 <= 0; value: -2 + v0 -2*v1 + 2 <= 0; value: -2 0: 1 2 5 1: 4 5 2: 2 3 3: 1 2 3 optimal: 10/3 + + 10/3 <= 0; value: 10/3 - 3*v0 -1*v3 -4 <= 0; value: 0 + 3*v2 -160/3 <= 0; value: -133/3 + -3*v2 -65 <= 0; value: -74 - 1/2*v3 -6 <= 0; value: 0 - v0 -2*v1 + 2 <= 0; value: 0 0: 1 2 5 4 1: 4 5 2: 2 3 3: 1 2 3 4 0: 2 -> 16/3 1: 3 -> 11/3 2: 3 -> 3 3: 2 -> 12 + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 + 6*v3 -1 <= 0; value: -8 + -6*v0 + 2*v3 <= 0; value: 0 + 5*v1 + 6*v3 -25 <= 0; value: -7 + v0 + 4*v1 -1 <= 0; value: 0 + 2*v2 -17 <= 0; value: -7 0: 2 4 1: 3 4 2: 1 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 + 6*v3 -1 <= 0; value: -8 + -6*v0 + 2*v3 <= 0; value: 0 + 5*v1 + 6*v3 -25 <= 0; value: -7 + v0 + 4*v1 -1 <= 0; value: 0 + 2*v2 -17 <= 0; value: -7 0: 2 4 1: 3 4 2: 1 5 3: 1 2 3 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -2*v2 -4 <= 0; value: -2 + 4*v0 + 6*v1 -58 < 0; value: -30 + v3 -8 < 0; value: -3 + -6*v0 + 6 = 0; value: 0 + -2*v0 -4*v2 + 8 <= 0; value: -2 0: 1 2 4 5 1: 2 2: 1 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -2*v2 -4 <= 0; value: -2 + 4*v0 + 6*v1 -58 < 0; value: -30 + v3 -8 < 0; value: -3 + -6*v0 + 6 = 0; value: 0 + -2*v0 -4*v2 + 8 <= 0; value: -2 0: 1 2 4 5 1: 2 2: 1 5 3: 3 0: 1 -> 1 1: 4 -> 4 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6*v1 -19 <= 0; value: -9 + 6*v1 + 2*v3 -22 = 0; value: 0 + 6*v0 + 4*v1 -16 < 0; value: -2 + -4*v3 + 11 < 0; value: -9 + -4*v1 + 3 < 0; value: -5 0: 1 3 1: 1 2 3 5 2: 3: 2 4 optimal: (17/6 -e*1) + + 17/6 < 0; value: 17/6 + -113/6 < 0; value: -113/6 - 6*v1 + 2*v3 -22 = 0; value: 0 - 6*v0 -13 < 0; value: -7/2 + -24 < 0; value: -24 - 4/3*v3 -35/3 < 0; value: -4/3 0: 1 3 1: 1 2 3 5 2: 3: 2 4 5 1 3 0: 1 -> 19/12 1: 2 -> 13/12 2: 1 -> 1 3: 5 -> 31/4 + 2*v0 -2*v1 <= 0; value: 8 + v1 + 4*v2 -2 < 0; value: -1 + -2*v2 -3*v3 -4 < 0; value: -19 + 3*v2 <= 0; value: 0 + 2*v0 + v1 -4*v2 -14 <= 0; value: -3 + -5*v0 + 2*v3 + 12 <= 0; value: -3 0: 4 5 1: 1 4 2: 1 2 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v1 + 4*v2 -2 < 0; value: -1 + -2*v2 -3*v3 -4 < 0; value: -19 + 3*v2 <= 0; value: 0 + 2*v0 + v1 -4*v2 -14 <= 0; value: -3 + -5*v0 + 2*v3 + 12 <= 0; value: -3 0: 4 5 1: 1 4 2: 1 2 3 4 3: 2 5 0: 5 -> 5 1: 1 -> 1 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 5*v2 -3*v3 + 5 < 0; value: -4 + 2*v0 + 6*v2 -24 = 0; value: 0 + -4*v0 + 2*v1 + 7 <= 0; value: -3 + 4*v2 -6*v3 + 10 < 0; value: -2 + -4*v3 -3 <= 0; value: -19 0: 1 2 3 1: 3 2: 1 2 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 5*v2 -3*v3 + 5 < 0; value: -4 + 2*v0 + 6*v2 -24 = 0; value: 0 + -4*v0 + 2*v1 + 7 <= 0; value: -3 + 4*v2 -6*v3 + 10 < 0; value: -2 + -4*v3 -3 <= 0; value: -19 0: 1 2 3 1: 3 2: 1 2 4 3: 1 4 5 0: 3 -> 3 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 3*v1 -2 <= 0; value: -1 + 4*v2 -1*v3 -19 = 0; value: 0 + 2*v0 -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v0 -3*v1 + 2*v3 -76 <= 0; value: -50 + 2*v1 + 3*v3 -10 <= 0; value: -3 0: 1 3 4 1: 1 3 4 5 2: 2 3: 2 3 4 5 optimal: oo + -46/3*v0 + 748/3 <= 0; value: 518/3 + 25*v0 -376 <= 0; value: -251 - 4*v2 -1*v3 -19 = 0; value: 0 - 2*v0 -6*v1 + 5*v3 -3 <= 0; value: 0 - 5*v0 -2*v2 -65 <= 0; value: 0 + 142/3*v0 -2119/3 <= 0; value: -1409/3 0: 1 3 4 5 1 1: 1 3 4 5 2: 2 4 5 1 3: 2 3 4 5 1 0: 5 -> 5 1: 2 -> -244/3 2: 5 -> -20 3: 1 -> -99 + 2*v0 -2*v1 <= 0; value: -6 + -2*v0 -3*v1 + 6 < 0; value: -3 + -5*v1 + 6*v3 + 1 <= 0; value: -14 + -1*v1 -2 < 0; value: -5 + 2*v0 + 2*v1 -6 = 0; value: 0 + -2*v3 <= 0; value: 0 0: 1 4 1: 1 2 3 4 2: 3: 2 5 optimal: 26/5 + + 26/5 <= 0; value: 26/5 + -1/5 < 0; value: -1/5 - 5*v0 + 6*v3 -14 <= 0; value: 0 + -11/5 < 0; value: -11/5 - 2*v0 + 2*v1 -6 = 0; value: 0 - -2*v3 <= 0; value: 0 0: 1 4 2 3 1: 1 2 3 4 2: 3: 2 5 1 3 0: 0 -> 14/5 1: 3 -> 1/5 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 -5*v3 + 17 = 0; value: 0 + v2 + 2*v3 -10 < 0; value: -5 + -3*v2 + 9 <= 0; value: 0 + -2*v1 -1*v2 -9 <= 0; value: -22 + v0 + 3*v1 -33 <= 0; value: -16 0: 1 5 1: 4 5 2: 2 3 4 3: 1 2 optimal: oo + 22/5*v0 + 61/5 < 0; value: 21 - -6*v0 -5*v3 + 17 = 0; value: 0 - v2 + 2*v3 -10 < 0; value: -1 + -36/5*v0 -3/5 < 0; value: -15 - -2*v1 -1*v2 -9 <= 0; value: 0 + -13/5*v0 -513/10 < 0; value: -113/2 0: 1 5 3 1: 4 5 2: 2 3 4 5 3: 1 2 3 5 0: 2 -> 2 1: 5 -> -8 2: 3 -> 7 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + v1 + 2*v3 -9 = 0; value: 0 + 6*v3 -51 <= 0; value: -33 + 3*v1 + 4*v2 -44 <= 0; value: -27 + 2*v1 + 5*v2 -40 <= 0; value: -24 + -2*v3 -5 <= 0; value: -11 0: 1: 1 3 4 2: 3 4 3: 1 2 5 optimal: oo + 2*v0 + 16 <= 0; value: 18 - v1 + 2*v3 -9 = 0; value: 0 - 6*v3 -51 <= 0; value: 0 + 4*v2 -68 <= 0; value: -60 + 5*v2 -56 <= 0; value: -46 + -22 <= 0; value: -22 0: 1: 1 3 4 2: 3 4 3: 1 2 5 3 4 0: 1 -> 1 1: 3 -> -8 2: 2 -> 2 3: 3 -> 17/2 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 -4*v3 + 2 <= 0; value: -10 + -1*v0 + 2*v1 -4*v2 + 13 = 0; value: 0 + -6*v3 -18 < 0; value: -48 + -3*v1 + 9 = 0; value: 0 + 5*v0 + 2*v1 -6*v3 + 9 = 0; value: 0 0: 2 5 1: 2 4 5 2: 1 2 3: 1 3 5 optimal: oo + 12/5*v3 -12 <= 0; value: 0 + -23/5*v3 + 13 <= 0; value: -10 - -1*v0 + 2*v1 -4*v2 + 13 = 0; value: 0 + -6*v3 -18 < 0; value: -48 - -3/2*v0 -6*v2 + 57/2 = 0; value: 0 - 5*v0 -6*v3 + 15 = 0; value: 0 0: 2 5 4 1 1: 2 4 5 2: 1 2 4 5 3: 1 3 5 0: 3 -> 3 1: 3 -> 3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -1*v2 + v3 -13 < 0; value: -8 + <= 0; value: 0 + 4*v0 -5*v2 -3*v3 + 31 = 0; value: 0 + -6*v0 + 3*v2 -14 <= 0; value: -8 + 2*v0 + 2*v1 + 6*v3 -56 < 0; value: -22 0: 1 3 4 5 1: 5 2: 1 3 4 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -1*v2 + v3 -13 < 0; value: -8 + <= 0; value: 0 + 4*v0 -5*v2 -3*v3 + 31 = 0; value: 0 + -6*v0 + 3*v2 -14 <= 0; value: -8 + 2*v0 + 2*v1 + 6*v3 -56 < 0; value: -22 0: 1 3 4 5 1: 5 2: 1 3 4 3: 1 3 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 -3*v2 + v3 + 5 = 0; value: 0 + -2*v0 + 3*v3 + 2 = 0; value: 0 + -6*v3 + 2 < 0; value: -10 + -3*v0 + 3*v1 <= 0; value: 0 + 3*v1 -4*v2 + 8 <= 0; value: 0 0: 2 4 1: 1 4 5 2: 1 5 3: 1 2 3 optimal: oo + 8/3*v0 -3*v2 + 13/3 <= 0; value: 0 - 2*v1 -3*v2 + v3 + 5 = 0; value: 0 - -2*v0 + 3*v3 + 2 = 0; value: 0 + -4*v0 + 6 < 0; value: -10 + -4*v0 + 9/2*v2 -13/2 <= 0; value: 0 + -1*v0 + 1/2*v2 + 3/2 <= 0; value: 0 0: 2 4 3 5 1: 1 4 5 2: 1 5 4 3: 1 2 3 4 5 0: 4 -> 4 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 <= 0; value: 0 + 5*v0 + v1 -5*v2 + 7 <= 0; value: -2 + -2*v0 -3*v1 + 3 <= 0; value: 0 + -3*v0 -5*v1 + v2 + 2 <= 0; value: -1 + -6*v1 -3*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 2 4 3: 5 optimal: 17/9 + + 17/9 <= 0; value: 17/9 + -35/6 <= 0; value: -35/6 - -5*v2 + 13/4*v3 -7/4 <= 0; value: 0 - -2*v0 -3*v1 + 3 <= 0; value: 0 - 18/13*v2 -47/13 <= 0; value: 0 - 4*v0 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 4 5 2: 2 4 1 3: 5 4 2 1 0: 0 -> 7/6 1: 1 -> 2/9 2: 2 -> 47/18 3: 3 -> 41/9 + 2*v0 -2*v1 <= 0; value: 0 + -5*v2 + 4*v3 + 1 < 0; value: -11 + v0 + v2 -3*v3 -2 < 0; value: -1 + 2*v3 -4 = 0; value: 0 + 5*v0 -2*v2 -13 < 0; value: -6 + -3*v1 + 3*v3 <= 0; value: -3 0: 2 4 1: 5 2: 1 2 4 3: 1 2 3 5 optimal: (30/7 -e*1) + + 30/7 < 0; value: 30/7 + -72/7 < 0; value: -72/7 - v0 + v2 -8 < 0; value: -4/7 - 2*v3 -4 = 0; value: 0 - -7*v2 + 27 <= 0; value: 0 - -3*v1 + 3*v3 <= 0; value: 0 0: 2 4 1: 5 2: 1 2 4 3: 1 2 3 5 0: 3 -> 25/7 1: 3 -> 2 2: 4 -> 27/7 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 -1*v3 -1 <= 0; value: -8 + 6*v3 -44 <= 0; value: -26 + -3*v2 -2*v3 + 13 <= 0; value: -8 + -4*v1 -4*v3 + 15 < 0; value: -5 + -3*v0 + v1 -5*v2 + 29 <= 0; value: -6 0: 5 1: 1 4 5 2: 3 5 3: 1 2 3 4 optimal: oo + 2*v0 + 43/6 < 0; value: 91/6 + -7/6 <= 0; value: -7/6 - 6*v3 -44 <= 0; value: 0 + -3*v2 -5/3 <= 0; value: -50/3 - -4*v1 -4*v3 + 15 < 0; value: -4 + -3*v0 -5*v2 + 305/12 < 0; value: -139/12 0: 5 1: 1 4 5 2: 3 5 3: 1 2 3 4 5 0: 4 -> 4 1: 2 -> -31/12 2: 5 -> 5 3: 3 -> 22/3 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 -5*v3 -9 <= 0; value: -5 + 6*v0 -49 <= 0; value: -25 + 5*v0 -6*v2 + v3 -45 <= 0; value: -25 + -3*v0 -6*v1 + 3*v2 + 17 <= 0; value: -7 + v0 -6*v1 -3*v3 < 0; value: -8 0: 2 3 4 5 1: 1 4 5 2: 3 4 3: 1 3 5 optimal: (1177/63 -e*1) + + 1177/63 < 0; value: 1177/63 + -4625/126 < 0; value: -4625/126 - 6*v0 -49 <= 0; value: 0 - -3*v0 + 7*v3 -11 <= 0; value: 0 - -3*v0 -6*v1 + 3*v2 + 17 <= 0; value: 0 - 4*v0 -3*v2 -3*v3 -17 < 0; value: -19/84 0: 2 3 4 5 1 1: 1 4 5 2: 3 4 5 1 3: 1 3 5 0: 4 -> 49/6 1: 2 -> -191/168 2: 0 -> 19/84 3: 0 -> 71/14 + 2*v0 -2*v1 <= 0; value: 10 + 5*v0 -1*v1 -5*v2 -40 <= 0; value: -25 + 2*v0 + 2*v1 -2*v3 -19 <= 0; value: -9 + 5*v2 -2*v3 -27 <= 0; value: -17 + -3*v0 + v3 <= 0; value: -15 + 5*v3 <= 0; value: 0 0: 1 2 4 1: 1 2 2: 1 3 3: 2 3 4 5 optimal: 134 + + 134 <= 0; value: 134 - 5*v0 -1*v1 -5*v2 -40 <= 0; value: 0 + -153 <= 0; value: -153 - 5*v2 -2*v3 -27 <= 0; value: 0 - -3*v0 <= 0; value: 0 - 5*v3 <= 0; value: 0 0: 1 2 4 1: 1 2 2: 1 3 2 3: 2 3 4 5 0: 5 -> 0 1: 0 -> -67 2: 2 -> 27/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 5*v1 -6*v2 + 18 = 0; value: 0 + -2*v0 + v2 -5 <= 0; value: -12 + -1*v1 + 2*v2 -1*v3 -6 <= 0; value: 0 + -4*v2 -6*v3 + 12 = 0; value: 0 + -5*v0 + 3*v3 + 25 = 0; value: 0 0: 2 5 1: 1 3 2: 1 2 3 4 3: 3 4 5 optimal: oo + 8*v0 -30 <= 0; value: 10 - 5*v1 -6*v2 + 18 = 0; value: 0 + -9/2*v0 + 21/2 <= 0; value: -12 + -11/3*v0 + 55/3 <= 0; value: 0 - -4*v2 -6*v3 + 12 = 0; value: 0 - -5*v0 + 3*v3 + 25 = 0; value: 0 0: 2 5 3 1: 1 3 2: 1 2 3 4 3: 3 4 5 2 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v1 -4*v2 -2 <= 0; value: -1 + -1*v1 + 1 <= 0; value: 0 + 5*v0 + 6*v2 -22 <= 0; value: -6 + -6*v0 + 10 <= 0; value: -2 + -4*v1 + 5*v2 -2 < 0; value: -1 0: 3 4 1: 1 2 5 2: 1 3 5 3: optimal: 5 + + 5 <= 0; value: 5 - -4*v2 + 3 <= 0; value: 0 - -1*v1 + 1 <= 0; value: 0 - 5*v0 + 6*v2 -22 <= 0; value: 0 + -11 <= 0; value: -11 + -9/4 < 0; value: -9/4 0: 3 4 1: 1 2 5 2: 1 3 5 4 3: 0: 2 -> 7/2 1: 1 -> 1 2: 1 -> 3/4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -6*v3 + 15 <= 0; value: -20 + 5*v0 -5 = 0; value: 0 + -6*v2 <= 0; value: 0 + 4*v2 <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -1 0: 1 2 5 1: 2: 3 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -6*v3 + 15 <= 0; value: -20 + 5*v0 -5 = 0; value: 0 + -6*v2 <= 0; value: 0 + 4*v2 <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -1 0: 1 2 5 1: 2: 3 4 5 3: 1 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + 2*v3 -10 = 0; value: 0 + -2*v0 -1*v1 + 5*v3 -30 <= 0; value: -11 + -3*v1 -5*v2 + 12 = 0; value: 0 + 2*v0 -5 <= 0; value: -3 + 2*v1 -3*v3 + 7 = 0; value: 0 0: 2 4 1: 2 3 5 2: 3 3: 1 2 5 optimal: -3 + -3 <= 0; value: -3 - 2*v3 -10 = 0; value: 0 + -14 <= 0; value: -14 - -3*v1 -5*v2 + 12 = 0; value: 0 - 2*v0 -5 <= 0; value: 0 - -10/3*v2 -3*v3 + 15 = 0; value: 0 0: 2 4 1: 2 3 5 2: 3 2 5 3: 1 2 5 0: 1 -> 5/2 1: 4 -> 4 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 + 6*v3 -17 <= 0; value: -7 + 2*v0 + v3 -21 <= 0; value: -12 + v0 + 5*v2 -36 <= 0; value: -19 + -4*v1 -1*v2 -3 < 0; value: -26 + -2*v0 -1*v1 + 6*v3 -21 = 0; value: 0 0: 2 3 5 1: 1 4 5 2: 3 4 3: 1 2 5 optimal: 45/22 + + 45/22 <= 0; value: 45/22 - 8*v0 -18*v3 + 67 <= 0; value: 0 - 22/9*v0 -311/18 <= 0; value: 0 + 5*v2 -1273/44 <= 0; value: -613/44 + -1*v2 -299/11 < 0; value: -332/11 - -2*v0 -1*v1 + 6*v3 -21 = 0; value: 0 0: 2 3 5 4 1 1: 1 4 5 2: 3 4 3: 1 2 5 4 0: 2 -> 311/44 1: 5 -> 133/22 2: 3 -> 3 3: 5 -> 151/22 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 6*v3 -31 = 0; value: 0 + 4*v2 -5*v3 -20 < 0; value: -13 + -6*v0 -5*v1 -6*v2 + 40 <= 0; value: -33 + 6*v0 + 2*v1 -90 <= 0; value: -50 + -4*v1 -3*v2 + 17 <= 0; value: -12 0: 3 4 1: 1 3 4 5 2: 2 3 5 3: 1 2 optimal: (1742/21 -e*1) + + 1742/21 < 0; value: 1742/21 - 5*v1 + 6*v3 -31 = 0; value: 0 - 7/8*v2 -225/8 < 0; value: -7/8 + -1283/7 < 0; value: -1283/7 - 6*v0 -908/7 < 0; value: -6 - -3*v2 + 24/5*v3 -39/5 <= 0; value: 0 0: 3 4 1: 1 3 4 5 2: 2 3 5 4 3: 1 2 3 5 4 0: 5 -> 433/21 1: 5 -> -535/28 2: 3 -> 218/7 3: 1 -> 1181/56 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 -4*v3 + 11 < 0; value: -21 + -5*v0 + v2 -4*v3 + 13 < 0; value: -3 + 4*v0 + 6*v3 -22 = 0; value: 0 + -3*v0 + 3*v1 -6*v3 -4 <= 0; value: -10 + 3*v0 + 3*v1 + v2 -19 = 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 2 5 3: 1 2 3 4 optimal: (161/44 -e*1) + + 161/44 < 0; value: 161/44 - 88/9*v0 -241/9 <= 0; value: 0 - -5*v0 + v2 -4*v3 + 13 < 0; value: -1 - 4*v0 + 6*v3 -22 = 0; value: 0 + -1807/88 < 0; value: -1807/88 - 3*v0 + 3*v1 + v2 -19 = 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 2 5 1 4 3: 1 2 3 4 0: 1 -> 241/88 1: 5 -> 41/33 2: 1 -> 621/88 3: 3 -> 81/44 + 2*v0 -2*v1 <= 0; value: -10 + -2*v0 + v1 -6*v2 -22 <= 0; value: -47 + v0 + 5*v1 -25 = 0; value: 0 + -1*v1 -2*v2 + 5 <= 0; value: -10 + 2*v2 + 5*v3 -80 < 0; value: -50 + 5*v0 + 4*v1 + 2*v3 -65 <= 0; value: -37 0: 1 2 5 1: 1 2 3 5 2: 1 3 4 3: 4 5 optimal: oo + 24*v2 -10 <= 0; value: 110 + -28*v2 -17 <= 0; value: -157 - v0 + 5*v1 -25 = 0; value: 0 - -2*v2 -2/21*v3 + 15/7 <= 0; value: 0 + -103*v2 + 65/2 < 0; value: -965/2 - 21/5*v0 + 2*v3 -45 <= 0; value: 0 0: 1 2 5 3 1: 1 2 3 5 2: 1 3 4 3: 4 5 3 1 0: 0 -> 50 1: 5 -> -5 2: 5 -> 5 3: 4 -> -165/2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -4*v3 -22 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -25 <= 0; value: 0 + -3*v0 -2*v2 -9 <= 0; value: -24 + -5*v0 + 13 <= 0; value: -12 0: 1 3 4 5 1: 2: 4 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -4*v3 -22 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -25 <= 0; value: 0 + -3*v0 -2*v2 -9 <= 0; value: -24 + -5*v0 + 13 <= 0; value: -12 0: 1 3 4 5 1: 2: 4 3: 1 2 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 5*v3 + 5 <= 0; value: 0 + 4*v0 + 2*v3 -6 = 0; value: 0 + -5*v0 -1*v3 + 4 < 0; value: -2 + -4*v2 + 5*v3 + 11 <= 0; value: -4 + 6*v0 -3*v3 -3 = 0; value: 0 0: 2 3 5 1: 2: 1 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 5*v3 + 5 <= 0; value: 0 + 4*v0 + 2*v3 -6 = 0; value: 0 + -5*v0 -1*v3 + 4 < 0; value: -2 + -4*v2 + 5*v3 + 11 <= 0; value: -4 + 6*v0 -3*v3 -3 = 0; value: 0 0: 2 3 5 1: 2: 1 4 3: 1 2 3 4 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + v0 -4*v1 + 4 = 0; value: 0 + -3*v0 + 6*v1 -6*v3 + 11 < 0; value: -13 + -3*v1 + 2*v3 -3 <= 0; value: -1 + v3 -4 = 0; value: 0 + -1*v1 -1*v2 + 7 = 0; value: 0 0: 1 2 1: 1 2 3 5 2: 5 3: 2 3 4 optimal: oo + -6*v2 + 34 <= 0; value: 4 - v0 -4*v1 + 4 = 0; value: 0 + 6*v2 -6*v3 -19 < 0; value: -13 + 3*v2 + 2*v3 -24 <= 0; value: -1 + v3 -4 = 0; value: 0 - -1/4*v0 -1*v2 + 6 = 0; value: 0 0: 1 2 3 5 1: 1 2 3 5 2: 5 2 3 3: 2 3 4 0: 4 -> 4 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v0 + 2*v1 -4 = 0; value: 0 + 5*v0 -4*v1 -4*v2 + 7 = 0; value: 0 + 2*v0 -3 <= 0; value: -1 + -6*v0 + 2*v3 <= 0; value: -4 + 5*v2 -2*v3 -21 <= 0; value: -13 0: 1 2 3 4 1: 1 2 2: 2 5 3: 4 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 + 2*v1 -4 = 0; value: 0 - 9*v0 -4*v2 -1 = 0; value: 0 - 8/9*v2 -25/9 <= 0; value: 0 + 2*v3 -9 <= 0; value: -7 + -2*v3 -43/8 <= 0; value: -59/8 0: 1 2 3 4 1: 1 2 2: 2 5 3 4 3: 4 5 0: 1 -> 3/2 1: 1 -> 1/2 2: 2 -> 25/8 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 -8 < 0; value: -4 + 6*v0 -3*v1 + 2*v2 <= 0; value: 0 + v0 + 6*v2 -1*v3 -36 <= 0; value: -20 + 4*v1 -1*v2 -13 = 0; value: 0 + v2 -4*v3 < 0; value: -9 0: 1 2 3 1: 2 4 2: 2 3 4 5 3: 3 5 optimal: (-8/5 -e*1) + -8/5 < 0; value: -8/5 - 4*v0 -8 < 0; value: -2 - 6*v0 -3*v1 + 2*v2 <= 0; value: 0 + -1*v3 -224/5 < 0; value: -239/5 - 8*v0 + 5/3*v2 -13 = 0; value: 0 + -4*v3 -9/5 < 0; value: -69/5 0: 1 2 3 4 5 1: 2 4 2: 2 3 4 5 3: 3 5 0: 1 -> 3/2 1: 4 -> 17/5 2: 3 -> 3/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -5*v0 -6*v3 + 10 <= 0; value: -30 + -6*v1 -9 < 0; value: -33 + -5*v0 -4*v1 + 26 <= 0; value: 0 + -2*v2 + 10 = 0; value: 0 + 3*v0 -6*v2 -17 <= 0; value: -41 0: 1 3 5 1: 2 3 2: 4 5 3: 1 optimal: (79/5 -e*1) + + 79/5 < 0; value: 79/5 + -6*v3 -22 < 0; value: -52 - 15/2*v0 -48 < 0; value: -15/2 - -5*v0 -4*v1 + 26 <= 0; value: 0 + -2*v2 + 10 = 0; value: 0 + -6*v2 + 11/5 <= 0; value: -139/5 0: 1 3 5 2 1: 2 3 2: 4 5 3: 1 0: 2 -> 27/5 1: 4 -> -1/4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v3 -20 < 0; value: -8 + 5*v2 -22 <= 0; value: -12 + -3*v0 + 4*v3 + 4 <= 0; value: 0 + -2*v0 -4*v1 + 6*v2 -2 <= 0; value: -14 + -5*v0 -2*v2 + 21 < 0; value: -3 0: 3 4 5 1: 1 4 2: 2 4 5 3: 1 3 optimal: oo + 21/2*v0 -61/2 < 0; value: 23/2 + -17*v0 -2*v3 + 41 < 0; value: -31 + -25/2*v0 + 61/2 < 0; value: -39/2 + -3*v0 + 4*v3 + 4 <= 0; value: 0 - -2*v0 -4*v1 + 6*v2 -2 <= 0; value: 0 - -5*v0 -2*v2 + 21 < 0; value: -3/2 0: 3 4 5 1 2 1: 1 4 2: 2 4 5 1 3: 1 3 0: 4 -> 4 1: 4 -> -5/8 2: 2 -> 5/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + <= 0; value: 0 + v0 -1*v3 = 0; value: 0 + -6*v1 + v3 -8 < 0; value: -33 + 6*v2 + 3*v3 -39 = 0; value: 0 + -2*v3 -2 < 0; value: -12 0: 2 1: 3 2: 4 3: 2 3 4 5 optimal: oo + -10/3*v2 + 73/3 < 0; value: 11 + <= 0; value: 0 - v0 -1*v3 = 0; value: 0 - -6*v1 + v3 -8 < 0; value: -6 - 3*v0 + 6*v2 -39 = 0; value: 0 + 4*v2 -28 < 0; value: -12 0: 2 4 5 1: 3 2: 4 5 3: 2 3 4 5 0: 5 -> 5 1: 5 -> 1/2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 3*v2 -9 = 0; value: 0 + 2*v0 + 6*v1 -4*v3 -7 <= 0; value: -19 + 3*v1 + 4*v2 -12 = 0; value: 0 + -4*v3 -2 <= 0; value: -14 + -6*v1 <= 0; value: 0 0: 2 1: 1 2 3 5 2: 1 3 3: 2 4 optimal: oo + 4*v3 + 7 <= 0; value: 19 - -6*v1 + 3*v2 -9 = 0; value: 0 - 2*v0 -4*v3 -7 <= 0; value: 0 - 11/2*v2 -33/2 = 0; value: 0 + -4*v3 -2 <= 0; value: -14 + <= 0; value: 0 0: 2 1: 1 2 3 5 2: 1 3 5 2 3: 2 4 0: 0 -> 19/2 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -5*v1 -8 <= 0; value: -39 + 5*v0 + v1 -25 <= 0; value: -2 + -3*v1 + 5*v3 -1 = 0; value: 0 + -2*v0 + 2*v2 + 6*v3 -25 <= 0; value: -13 + -5*v1 + 4*v2 -1 <= 0; value: 0 0: 1 2 4 1: 1 2 3 5 2: 4 5 3: 3 4 optimal: 26 + + 26 <= 0; value: 26 - -4*v0 -4*v2 -7 <= 0; value: 0 - 21/5*v0 -133/5 <= 0; value: 0 - -3*v1 + 5*v3 -1 = 0; value: 0 + -2299/30 <= 0; value: -2299/30 - 4*v2 -25/3*v3 + 2/3 <= 0; value: 0 0: 1 2 4 1: 1 2 3 5 2: 4 5 1 2 3: 3 4 1 5 2 0: 4 -> 19/3 1: 3 -> -20/3 2: 4 -> -97/12 3: 2 -> -19/5 + 2*v0 -2*v1 <= 0; value: 10 + 2*v1 + 4*v3 -16 <= 0; value: -4 + -6*v3 -17 < 0; value: -35 + 4*v2 -27 < 0; value: -15 + -2*v2 -5*v3 -8 < 0; value: -29 + 5*v1 + v2 -6 <= 0; value: -3 0: 1: 1 5 2: 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + 2*v1 + 4*v3 -16 <= 0; value: -4 + -6*v3 -17 < 0; value: -35 + 4*v2 -27 < 0; value: -15 + -2*v2 -5*v3 -8 < 0; value: -29 + 5*v1 + v2 -6 <= 0; value: -3 0: 1: 1 5 2: 3 4 5 3: 1 2 4 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 + 6*v2 -109 < 0; value: -71 + -6*v0 -6*v1 <= 0; value: -24 + 4*v0 + 2*v2 -61 <= 0; value: -39 + 4*v0 + 4*v1 -18 <= 0; value: -2 + 5*v0 + 2*v1 + 3*v3 -26 <= 0; value: 0 0: 1 2 3 4 5 1: 2 4 5 2: 1 3 3: 5 optimal: oo + -2*v2 + 61 <= 0; value: 55 + 7/2*v2 -131/4 < 0; value: -89/4 - -6*v0 -6*v1 <= 0; value: 0 - 2*v2 -4*v3 -79/3 <= 0; value: 0 + -18 <= 0; value: -18 - 3*v0 + 3*v3 -26 <= 0; value: 0 0: 1 2 3 4 5 1: 2 4 5 2: 1 3 3: 5 1 3 0: 4 -> 55/4 1: 0 -> -55/4 2: 3 -> 3 3: 2 -> -61/12 + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 = 0; value: 0 + -1*v2 -4*v3 + 1 <= 0; value: -2 + 3*v2 + 6*v3 -16 <= 0; value: -7 + 4*v1 + 5*v2 -5*v3 -37 <= 0; value: -10 + 6*v3 = 0; value: 0 0: 1: 4 2: 2 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 = 0; value: 0 + -1*v2 -4*v3 + 1 <= 0; value: -2 + 3*v2 + 6*v3 -16 <= 0; value: -7 + 4*v1 + 5*v2 -5*v3 -37 <= 0; value: -10 + 6*v3 = 0; value: 0 0: 1: 4 2: 2 3 4 3: 1 2 3 4 5 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -6*v1 -6 = 0; value: 0 + -5*v0 + 5*v3 -6 <= 0; value: -16 + -6*v0 -3*v2 -24 <= 0; value: -51 + 4*v2 -20 = 0; value: 0 + v2 -3*v3 -6 < 0; value: -1 0: 1 2 3 1: 1 2: 3 4 5 3: 2 5 optimal: oo + v0 + 2 <= 0; value: 4 - 3*v0 -6*v1 -6 = 0; value: 0 + -5*v0 + 5*v3 -6 <= 0; value: -16 + -6*v0 -3*v2 -24 <= 0; value: -51 + 4*v2 -20 = 0; value: 0 + v2 -3*v3 -6 < 0; value: -1 0: 1 2 3 1: 1 2: 3 4 5 3: 2 5 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -1*v1 + 5 <= 0; value: 0 + -5*v1 + 11 <= 0; value: -14 + 3*v0 -2*v3 -1 <= 0; value: -7 + v0 + 6*v2 -38 <= 0; value: -14 + <= 0; value: 0 0: 3 4 1: 1 2 2: 4 3: 3 optimal: oo + -12*v2 + 66 <= 0; value: 18 - -1*v1 + 5 <= 0; value: 0 + -14 <= 0; value: -14 - 3*v0 -2*v3 -1 <= 0; value: 0 - 6*v2 + 2/3*v3 -113/3 <= 0; value: 0 + <= 0; value: 0 0: 3 4 1: 1 2 2: 4 3: 3 4 0: 0 -> 14 1: 5 -> 5 2: 4 -> 4 3: 3 -> 41/2 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 3*v2 -9 = 0; value: 0 + 2*v0 -1*v2 + 1 = 0; value: 0 + -4*v0 < 0; value: -8 + 2*v1 -3*v2 <= 0; value: -9 + 2*v1 -6 = 0; value: 0 0: 2 3 1: 1 4 5 2: 1 2 4 3: optimal: -2 + -2 <= 0; value: -2 - -2*v1 + 3*v2 -9 = 0; value: 0 - 2*v0 -1*v2 + 1 = 0; value: 0 + -8 < 0; value: -8 + -9 <= 0; value: -9 - 6*v0 -12 = 0; value: 0 0: 2 3 5 1: 1 4 5 2: 1 2 4 5 3: 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + v0 + 4*v3 -7 = 0; value: 0 + 4*v3 -10 <= 0; value: -6 + 2*v3 -3 <= 0; value: -1 + -6*v2 + 6*v3 -5 <= 0; value: -11 + 6*v0 + 3*v2 -24 <= 0; value: 0 0: 1 5 1: 2: 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + v0 + 4*v3 -7 = 0; value: 0 + 4*v3 -10 <= 0; value: -6 + 2*v3 -3 <= 0; value: -1 + -6*v2 + 6*v3 -5 <= 0; value: -11 + 6*v0 + 3*v2 -24 <= 0; value: 0 0: 1 5 1: 2: 4 5 3: 1 2 3 4 0: 3 -> 3 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v1 -6 = 0; value: 0 + -5*v0 + 3*v1 -3*v3 <= 0; value: 0 + 5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 4*v2 + 4*v3 -33 <= 0; value: -21 + -5*v0 + 5*v3 -10 = 0; value: 0 0: 2 3 5 1: 1 2 2: 3 4 3: 2 3 4 5 optimal: oo + -2/11*v2 -42/11 <= 0; value: -4 - 3*v1 -6 = 0; value: 0 + 8/11*v2 -8/11 <= 0; value: 0 - 5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 40/11*v2 -271/11 <= 0; value: -21 - v2 + 11*v3 -23 = 0; value: 0 0: 2 3 5 1: 1 2 2: 3 4 5 2 3: 2 3 4 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -22 < 0; value: -4 + v0 -5*v1 -2*v3 + 18 = 0; value: 0 + -5*v1 + 2*v3 -6 <= 0; value: -13 + 3*v1 + 6*v3 -33 = 0; value: 0 + -3*v2 -5*v3 + 31 <= 0; value: -1 0: 2 1: 1 2 3 4 2: 5 3: 2 3 4 5 optimal: (8 -e*1) + + 8 < 0; value: 8 - 36/5*v2 -152/5 < 0; value: -4/5 - v0 -5*v1 -2*v3 + 18 = 0; value: 0 + -17 < 0; value: -17 - 3/5*v0 + 24/5*v3 -111/5 = 0; value: 0 - 5/8*v0 -3*v2 + 63/8 <= 0; value: 0 0: 2 3 4 1 5 1: 1 2 3 4 2: 5 1 3 3: 2 3 4 5 1 0: 5 -> 107/15 1: 3 -> 53/15 2: 4 -> 37/9 3: 4 -> 56/15 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -6*v2 -1 < 0; value: -4 + -6*v3 -15 < 0; value: -45 + 4*v0 -5*v2 -8 < 0; value: -4 + 5*v0 -1*v2 -14 <= 0; value: -9 + 4*v1 + 2*v3 -32 <= 0; value: -14 0: 1 3 4 1: 5 2: 1 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -6*v2 -1 < 0; value: -4 + -6*v3 -15 < 0; value: -45 + 4*v0 -5*v2 -8 < 0; value: -4 + 5*v0 -1*v2 -14 <= 0; value: -9 + 4*v1 + 2*v3 -32 <= 0; value: -14 0: 1 3 4 1: 5 2: 1 3 4 3: 2 5 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -4*v1 -1*v2 + 3*v3 -6 <= 0; value: -13 + -1*v0 <= 0; value: -1 + 5*v1 + 6*v2 -46 < 0; value: -25 + -1*v2 -1*v3 + 2 <= 0; value: -1 + -3*v0 + 6*v3 -22 <= 0; value: -13 0: 2 5 1: 1 3 2: 1 3 4 3: 1 4 5 optimal: oo + 2*v0 + 92 < 0; value: 94 - -4*v1 -1*v2 + 3*v3 -6 <= 0; value: 0 + -1*v0 <= 0; value: -1 - v2 -46 < 0; value: -1 - -1*v2 -1*v3 + 2 <= 0; value: 0 + -3*v0 -286 < 0; value: -289 0: 2 5 1: 1 3 2: 1 3 4 5 3: 1 4 5 3 0: 1 -> 1 1: 3 -> -45 2: 1 -> 45 3: 2 -> -43 + 2*v0 -2*v1 <= 0; value: -8 + -2*v0 -2*v2 + 5*v3 -51 < 0; value: -31 + 4*v2 -1*v3 + 4 = 0; value: 0 + -5*v0 + 3*v1 -12 <= 0; value: 0 + -3*v2 -6*v3 + 24 = 0; value: 0 + -4*v0 -1*v3 -3 <= 0; value: -7 0: 1 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -2*v0 -2*v2 + 5*v3 -51 < 0; value: -31 + 4*v2 -1*v3 + 4 = 0; value: 0 + -5*v0 + 3*v1 -12 <= 0; value: 0 + -3*v2 -6*v3 + 24 = 0; value: 0 + -4*v0 -1*v3 -3 <= 0; value: -7 0: 1 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 3*v3 -29 <= 0; value: -14 + -4*v0 -6*v1 + 4*v2 <= 0; value: -28 + -1*v2 + 1 = 0; value: 0 + -1*v1 + 5*v2 -1 <= 0; value: 0 + -6*v0 + 2*v2 + 10 = 0; value: 0 0: 2 5 1: 2 4 2: 2 3 4 5 3: 1 optimal: -4 + -4 <= 0; value: -4 + 3*v3 -29 <= 0; value: -14 + -28 <= 0; value: -28 - -1*v2 + 1 = 0; value: 0 - -1*v1 + 5*v2 -1 <= 0; value: 0 - -6*v0 + 12 = 0; value: 0 0: 2 5 1: 2 4 2: 2 3 4 5 3: 1 0: 2 -> 2 1: 4 -> 4 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 3*v3 -16 <= 0; value: -9 + -5*v0 -6*v1 + 14 < 0; value: -3 + -4*v0 -2*v3 -8 < 0; value: -20 + -1*v0 + 5*v1 -3*v3 + 1 <= 0; value: -2 + 5*v1 + 2*v2 -6*v3 + 2 <= 0; value: -2 0: 1 2 3 4 1: 2 4 5 2: 5 3: 1 3 4 5 optimal: oo + 11/3*v0 -14/3 < 0; value: -1 + -5*v0 + 3*v3 -16 <= 0; value: -9 - -5*v0 -6*v1 + 14 < 0; value: -3/2 + -4*v0 -2*v3 -8 < 0; value: -20 + -31/6*v0 -3*v3 + 38/3 < 0; value: -9/2 + -25/6*v0 + 2*v2 -6*v3 + 41/3 < 0; value: -9/2 0: 1 2 3 4 5 1: 2 4 5 2: 5 3: 1 3 4 5 0: 1 -> 1 1: 2 -> 7/4 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 + v3 -9 < 0; value: -3 + -2*v0 -2*v1 + 2 <= 0; value: -2 + -6*v0 + 2*v2 -2 < 0; value: -6 + 4*v0 -5*v1 + 1 <= 0; value: 0 + -2*v1 -1 < 0; value: -3 0: 2 3 4 1: 2 4 5 2: 1 3 3: 1 optimal: oo + 2/5*v0 -2/5 <= 0; value: 0 + 2*v2 + v3 -9 < 0; value: -3 + -18/5*v0 + 8/5 <= 0; value: -2 + -6*v0 + 2*v2 -2 < 0; value: -6 - 4*v0 -5*v1 + 1 <= 0; value: 0 + -8/5*v0 -7/5 < 0; value: -3 0: 2 3 4 5 1: 2 4 5 2: 1 3 3: 1 0: 1 -> 1 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -5*v2 -1*v3 <= 0; value: -29 + v0 + 4*v1 + 2*v3 -59 <= 0; value: -39 + 6*v1 -5*v2 + 5 <= 0; value: -2 + v0 -1*v1 + 3 = 0; value: 0 + 4*v2 -53 <= 0; value: -33 0: 1 2 4 1: 2 3 4 2: 1 3 5 3: 1 2 optimal: -6 + -6 <= 0; value: -6 + 6*v0 -5*v2 -1*v3 <= 0; value: -29 + 5*v0 + 2*v3 -47 <= 0; value: -39 + 6*v0 -5*v2 + 23 <= 0; value: -2 - v0 -1*v1 + 3 = 0; value: 0 + 4*v2 -53 <= 0; value: -33 0: 1 2 4 3 1: 2 3 4 2: 1 3 5 3: 1 2 0: 0 -> 0 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 5*v1 -15 <= 0; value: -3 + v0 -3*v3 -3 < 0; value: -1 + 4*v2 -38 <= 0; value: -22 + 2*v0 -4*v1 -5*v3 -7 <= 0; value: -3 + -2*v1 -4*v2 -7 <= 0; value: -23 0: 1 2 4 1: 1 4 5 2: 3 5 3: 2 4 optimal: 175/2 + + 175/2 <= 0; value: 175/2 - 6*v0 -255/2 <= 0; value: 0 + -1141/20 < 0; value: -1141/20 - 4*v2 -38 <= 0; value: 0 - 2*v0 -4*v1 -5*v3 -7 <= 0; value: 0 - -1*v0 -4*v2 + 5/2*v3 -7/2 <= 0; value: 0 0: 1 2 4 5 1: 1 4 5 2: 3 5 2 1 3: 2 4 5 1 0: 2 -> 85/4 1: 0 -> -45/2 2: 4 -> 19/2 3: 0 -> 251/10 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 2*v3 -4 < 0; value: -2 + 6*v1 + 2*v3 -92 <= 0; value: -60 + 5*v0 -15 <= 0; value: 0 + 4*v0 + 2*v2 -4*v3 -18 < 0; value: -10 + 3*v0 + 4*v2 + 2*v3 -12 < 0; value: -1 0: 3 4 5 1: 2 2: 1 4 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 2*v3 -4 < 0; value: -2 + 6*v1 + 2*v3 -92 <= 0; value: -60 + 5*v0 -15 <= 0; value: 0 + 4*v0 + 2*v2 -4*v3 -18 < 0; value: -10 + 3*v0 + 4*v2 + 2*v3 -12 < 0; value: -1 0: 3 4 5 1: 2 2: 1 4 5 3: 1 2 4 5 0: 3 -> 3 1: 5 -> 5 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 + 4*v3 -31 < 0; value: -19 + 4*v0 -4*v3 + 6 <= 0; value: -2 + 3*v0 + 3*v2 + 5*v3 -48 <= 0; value: -30 + -1*v0 -6*v1 + 6*v3 + 12 <= 0; value: -1 + -4*v1 + 20 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 3 3: 1 2 3 4 optimal: -32/5 + -32/5 <= 0; value: -32/5 + 3*v2 -89/5 < 0; value: -89/5 - 4*v0 -4*v3 + 6 <= 0; value: 0 + 3*v2 -261/10 <= 0; value: -261/10 - 5*v3 -33/2 <= 0; value: 0 - -4*v1 + 20 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 3 3: 1 2 3 4 0: 1 -> 9/5 1: 5 -> 5 2: 0 -> 0 3: 3 -> 33/10 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 + 4*v3 -59 < 0; value: -27 + -5*v0 + 4*v1 -1*v3 + 25 = 0; value: 0 + -3*v1 -2 < 0; value: -5 + v0 + 6*v1 + 3*v2 -59 <= 0; value: -36 + -4*v1 + v2 = 0; value: 0 0: 2 4 1: 2 3 4 5 2: 1 4 5 3: 1 2 optimal: (430/3 -e*1) + + 430/3 < 0; value: 430/3 + -4201/3 < 0; value: -4201/3 - -5*v0 + 4*v1 -1*v3 + 25 = 0; value: 0 - -3/4*v2 -2 < 0; value: -3/4 - v0 -71 < 0; value: -1 - -5*v0 + v2 -1*v3 + 25 = 0; value: 0 0: 2 4 3 5 1 1: 2 3 4 5 2: 1 4 5 3 3: 1 2 3 5 4 0: 5 -> 70 1: 1 -> -5/12 2: 4 -> -5/3 3: 4 -> -980/3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v2 -4*v3 -5 <= 0; value: -1 + 3*v1 -12 = 0; value: 0 + -4*v0 + v2 + 11 <= 0; value: -5 + -4*v1 <= 0; value: -16 + -3*v2 + 6*v3 -1 < 0; value: -7 0: 3 1: 2 4 2: 1 3 5 3: 1 5 optimal: oo + 2*v0 -8 <= 0; value: 2 + 2*v2 -4*v3 -5 <= 0; value: -1 - 3*v1 -12 = 0; value: 0 + -4*v0 + v2 + 11 <= 0; value: -5 + -16 <= 0; value: -16 + -3*v2 + 6*v3 -1 < 0; value: -7 0: 3 1: 2 4 2: 1 3 5 3: 1 5 0: 5 -> 5 1: 4 -> 4 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 4 = 0; value: 0 + -5*v0 -3*v1 -4*v3 -20 <= 0; value: -42 + 3*v0 + 4*v2 -2*v3 -14 <= 0; value: -2 + 2*v2 -25 <= 0; value: -15 + 3*v3 -12 = 0; value: 0 0: 2 3 1: 1 2 2: 3 4 3: 2 3 5 optimal: oo + -8/3*v2 + 32/3 <= 0; value: -8/3 - -2*v1 + 4 = 0; value: 0 + 20/3*v2 -236/3 <= 0; value: -136/3 - 3*v0 + 4*v2 -2*v3 -14 <= 0; value: 0 + 2*v2 -25 <= 0; value: -15 - 3*v3 -12 = 0; value: 0 0: 2 3 1: 1 2 2: 3 4 2 3: 2 3 5 0: 0 -> 2/3 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 + 5*v3 -23 = 0; value: 0 + 4*v0 -5*v2 -4 < 0; value: -9 + 6*v1 -2*v3 -17 <= 0; value: -1 + -4*v1 + 6*v2 + 8 <= 0; value: -2 + -5*v1 -6*v3 + 22 <= 0; value: -22 0: 2 1: 3 4 5 2: 1 2 4 3: 1 3 5 optimal: (0 -e*1) + < 0; value: 0 - 3*v2 + 5*v3 -23 = 0; value: 0 - 4*v0 + 25/3*v3 -127/3 < 0; value: -25/3 + -55 < 0; value: -55 - -4*v1 + 6*v2 + 8 <= 0; value: 0 - -78/25*v0 -312/25 <= 0; value: 0 0: 2 5 3 1: 3 4 5 2: 1 2 4 5 3 3: 1 3 5 2 0: 0 -> -4 1: 4 -> -3/2 2: 1 -> -7/3 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: 6 + 4*v1 -14 <= 0; value: -6 + -2*v2 + 5*v3 -15 <= 0; value: -8 + -4*v3 + 12 = 0; value: 0 + -1*v2 -1 <= 0; value: -5 + 3*v1 -2*v3 <= 0; value: 0 0: 1: 1 5 2: 2 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 4*v1 -14 <= 0; value: -6 + -2*v2 + 5*v3 -15 <= 0; value: -8 + -4*v3 + 12 = 0; value: 0 + -1*v2 -1 <= 0; value: -5 + 3*v1 -2*v3 <= 0; value: 0 0: 1: 1 5 2: 2 4 3: 2 3 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 -1*v1 + 7 < 0; value: -1 + 3*v0 -12 = 0; value: 0 + -1*v0 -1*v2 + 1 < 0; value: -3 + -4*v1 -4*v3 + 20 = 0; value: 0 + 6*v0 -4*v2 -29 < 0; value: -5 0: 1 2 3 5 1: 1 4 2: 3 5 3: 4 optimal: (2 -e*1) + + 2 < 0; value: 2 - -1*v0 + v3 + 2 < 0; value: -1/2 - 3*v0 -12 = 0; value: 0 + -1*v2 -3 < 0; value: -3 - -4*v1 -4*v3 + 20 = 0; value: 0 + -4*v2 -5 < 0; value: -5 0: 1 2 3 5 1: 1 4 2: 3 5 3: 4 1 0: 4 -> 4 1: 4 -> 7/2 2: 0 -> 0 3: 1 -> 3/2 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 + 5*v2 + 2*v3 + 23 = 0; value: 0 + 5*v0 -19 <= 0; value: -9 + v1 + 3*v3 -12 <= 0; value: -4 + -2*v2 <= 0; value: 0 + 5*v0 -6*v2 -24 < 0; value: -14 0: 2 5 1: 1 3 2: 1 4 5 3: 1 3 optimal: oo + 2*v0 -2*v2 -4/5*v3 -46/5 <= 0; value: -6 - -5*v1 + 5*v2 + 2*v3 + 23 = 0; value: 0 + 5*v0 -19 <= 0; value: -9 + v2 + 17/5*v3 -37/5 <= 0; value: -4 + -2*v2 <= 0; value: 0 + 5*v0 -6*v2 -24 < 0; value: -14 0: 2 5 1: 1 3 2: 1 4 5 3 3: 1 3 0: 2 -> 2 1: 5 -> 5 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v1 + 6*v3 -41 < 0; value: -14 + -2*v0 -5*v3 + 26 = 0; value: 0 + <= 0; value: 0 + -5*v0 + 2*v1 + 9 <= 0; value: 0 + 2*v1 -1*v2 -1 = 0; value: 0 0: 2 4 1: 1 4 5 2: 5 3: 1 2 optimal: oo + 2*v0 -1*v2 -1 <= 0; value: 0 + 1/2*v2 + 6*v3 -81/2 < 0; value: -14 + -2*v0 -5*v3 + 26 = 0; value: 0 + <= 0; value: 0 + -5*v0 + v2 + 10 <= 0; value: 0 - 2*v1 -1*v2 -1 = 0; value: 0 0: 2 4 1: 1 4 5 2: 5 1 4 3: 1 2 0: 3 -> 3 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 6*v2 -19 <= 0; value: -5 + <= 0; value: 0 + -3*v0 -4*v2 -2 < 0; value: -24 + -1*v2 -6*v3 + 2 < 0; value: -20 + -2*v1 -5*v2 + 26 <= 0; value: 0 0: 1 3 1: 5 2: 1 3 4 5 3: 4 optimal: oo + 37/6*v0 -61/6 <= 0; value: 13/6 - -5*v0 + 6*v2 -19 <= 0; value: 0 + <= 0; value: 0 + -19/3*v0 -44/3 < 0; value: -82/3 + -5/6*v0 -6*v3 -7/6 < 0; value: -125/6 - -2*v1 -5*v2 + 26 <= 0; value: 0 0: 1 3 4 1: 5 2: 1 3 4 5 3: 4 0: 2 -> 2 1: 3 -> 11/12 2: 4 -> 29/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -6*v3 -2 <= 0; value: -14 + -5*v0 + 10 = 0; value: 0 + -4*v0 -2*v1 + 2*v3 + 6 < 0; value: -2 + 4*v3 -18 <= 0; value: -10 + 5*v0 + 4*v1 -21 <= 0; value: -3 0: 2 3 5 1: 3 5 2: 1 3: 1 3 4 optimal: oo + 6*v0 + v2 -16/3 < 0; value: 20/3 - -3*v2 -6*v3 -2 <= 0; value: 0 + -5*v0 + 10 = 0; value: 0 - -4*v0 -2*v1 + 2*v3 + 6 < 0; value: -2 + -2*v2 -58/3 <= 0; value: -58/3 + -3*v0 -2*v2 -31/3 < 0; value: -49/3 0: 2 3 5 1: 3 5 2: 1 4 5 3: 1 3 4 5 0: 2 -> 2 1: 2 -> -1/3 2: 0 -> 0 3: 2 -> -1/3 + 2*v0 -2*v1 <= 0; value: 4 + 6*v2 + 2*v3 -29 <= 0; value: -1 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v0 + 2*v2 -34 <= 0; value: -18 + -3*v2 -4*v3 + 11 < 0; value: -9 + 3*v0 + 4*v1 + 3*v2 -47 <= 0; value: -15 0: 3 5 1: 2 5 2: 1 3 4 5 3: 1 2 4 optimal: (919/45 -e*1) + + 919/45 < 0; value: 919/45 - 9/2*v2 -47/2 < 0; value: -11/4 - 5*v1 -3*v3 -4 = 0; value: 0 + -44/15 <= 0; value: -44/15 - -3*v2 -4*v3 + 11 < 0; value: -4 - 3*v0 -464/15 <= 0; value: 0 0: 3 5 1: 2 5 2: 1 3 4 5 3: 1 2 4 5 0: 4 -> 464/45 1: 2 -> 39/40 2: 4 -> 83/18 3: 2 -> 7/24 + 2*v0 -2*v1 <= 0; value: 10 + -5*v2 <= 0; value: 0 + 2*v0 + 5*v2 -10 = 0; value: 0 + 4*v0 -2*v1 -3*v2 -32 <= 0; value: -12 + 2*v0 + 2*v1 -22 < 0; value: -12 + -4*v0 -5*v1 + 4*v2 + 7 <= 0; value: -13 0: 2 3 4 5 1: 3 4 5 2: 1 2 3 5 3: optimal: 76/5 + + 76/5 <= 0; value: 76/5 - -5*v2 <= 0; value: 0 - 2*v0 -10 = 0; value: 0 + -34/5 <= 0; value: -34/5 + -86/5 < 0; value: -86/5 - -4*v0 -5*v1 + 4*v2 + 7 <= 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 2 3 5 4 3: 0: 5 -> 5 1: 0 -> -13/5 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 2*v2 + 8 <= 0; value: -2 + -6*v1 + 24 = 0; value: 0 + 6*v0 + v1 -32 <= 0; value: -10 + 6*v1 -4*v2 -20 <= 0; value: -12 + -1*v1 + 6*v2 -6*v3 -14 = 0; value: 0 0: 1 3 1: 2 3 4 5 2: 1 4 5 3: 5 optimal: 4/3 + + 4/3 <= 0; value: 4/3 + 2*v2 -20 <= 0; value: -12 - -6*v1 + 24 = 0; value: 0 - 6*v0 -28 <= 0; value: 0 + -4*v2 + 4 <= 0; value: -12 + 6*v2 -6*v3 -18 = 0; value: 0 0: 1 3 1: 2 3 4 5 2: 1 4 5 3: 5 0: 3 -> 14/3 1: 4 -> 4 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v1 -1*v3 -6 < 0; value: -15 + -1*v0 + 2*v1 + 1 <= 0; value: 0 + 3*v0 -2*v3 + 5 = 0; value: 0 + 5*v2 + 6*v3 -49 = 0; value: 0 + 3*v1 -2*v3 -2 < 0; value: -10 0: 1 2 3 1: 1 2 5 2: 4 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v1 -1*v3 -6 < 0; value: -15 + -1*v0 + 2*v1 + 1 <= 0; value: 0 + 3*v0 -2*v3 + 5 = 0; value: 0 + 5*v2 + 6*v3 -49 = 0; value: 0 + 3*v1 -2*v3 -2 < 0; value: -10 0: 1 2 3 1: 1 2 5 2: 4 3: 1 3 4 5 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + 5*v0 -2*v2 -37 <= 0; value: -23 + -4*v0 -2*v2 + 7 <= 0; value: -15 + -3*v0 + 2*v1 -2*v2 -2 <= 0; value: -10 + -2*v1 -8 < 0; value: -18 0: 2 3 4 1: 4 5 2: 2 3 4 3: optimal: oo + 4/5*v2 + 114/5 < 0; value: 126/5 + <= 0; value: 0 - 5*v0 -2*v2 -37 <= 0; value: 0 + -18/5*v2 -113/5 <= 0; value: -167/5 + -16/5*v2 -161/5 < 0; value: -209/5 - -2*v1 -8 < 0; value: -2 0: 2 3 4 1: 4 5 2: 2 3 4 3: 0: 4 -> 43/5 1: 5 -> -3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 6*v3 -3 < 0; value: -18 + -1*v0 -5*v2 + 26 <= 0; value: 0 + -5*v0 -2 <= 0; value: -7 + <= 0; value: 0 + 6*v0 + 4*v3 -8 <= 0; value: -2 0: 2 3 5 1: 2: 1 2 3: 1 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 6*v3 -3 < 0; value: -18 + -1*v0 -5*v2 + 26 <= 0; value: 0 + -5*v0 -2 <= 0; value: -7 + <= 0; value: 0 + 6*v0 + 4*v3 -8 <= 0; value: -2 0: 2 3 5 1: 2: 1 2 3: 1 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 6*v0 -1*v1 + 6*v2 -59 < 0; value: -11 + -4*v0 -3*v2 + 22 <= 0; value: -7 + v0 + 5*v1 -5 = 0; value: 0 + -3*v1 -4*v3 + 3 <= 0; value: -13 + -5*v0 + 5*v3 <= 0; value: -5 0: 1 2 3 5 1: 1 3 4 2: 1 2 3: 4 5 optimal: oo + 16*v3 -2 < 0; value: 62 - 31/5*v0 + 6*v2 -60 < 0; value: -31/5 + -6*v3 -8 < 0; value: -32 - v0 + 5*v1 -5 = 0; value: 0 - -18/31*v2 -4*v3 + 180/31 <= 0; value: 0 + -85/3*v3 < 0; value: -340/3 0: 1 2 3 5 4 1: 1 3 4 2: 1 2 4 5 3: 4 5 2 0: 5 -> 77/3 1: 0 -> -62/15 2: 3 -> -158/9 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 + 2*v3 <= 0; value: -2 + -2*v1 + 2*v2 -9 <= 0; value: -3 + -1*v0 -6*v3 + 6 = 0; value: 0 + v0 -5*v1 + 2 < 0; value: -3 + 2*v0 <= 0; value: 0 0: 3 4 5 1: 1 2 4 2: 2 3: 1 3 optimal: -1 + -1 <= 0; value: -1 - -4*v1 + 2*v3 <= 0; value: 0 + 2*v2 -10 <= 0; value: -2 - -1*v0 -6*v3 + 6 = 0; value: 0 + -1/2 < 0; value: -1/2 - 2*v0 <= 0; value: 0 0: 3 4 5 2 1: 1 2 4 2: 2 3: 1 3 2 4 0: 0 -> 0 1: 1 -> 1/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 -4*v2 + 32 <= 0; value: 0 + 5*v1 -1*v2 + v3 -28 <= 0; value: -18 + 3*v0 -6*v1 -14 < 0; value: -32 + 3*v1 -4*v2 -3*v3 + 11 = 0; value: 0 + -6*v1 + 4*v2 -5 <= 0; value: -3 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3: 2 4 optimal: (221/15 -e*1) + + 221/15 < 0; value: 221/15 - -4*v1 -4*v2 + 32 <= 0; value: 0 + -41/2 <= 0; value: -41/2 - 3*v0 -151/5 < 0; value: -3 - -7*v2 -3*v3 + 35 = 0; value: 0 - -30/7*v3 -3 <= 0; value: 0 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3 3: 2 4 5 3 0: 0 -> 136/15 1: 3 -> 27/10 2: 5 -> 53/10 3: 0 -> -7/10 + 2*v0 -2*v1 <= 0; value: 0 + 6*v2 + 3*v3 -35 < 0; value: -17 + -5*v1 -6*v2 -1 <= 0; value: -23 + 4*v0 + 6*v3 -41 <= 0; value: -21 + 5*v0 -10 = 0; value: 0 + -4*v3 -3 <= 0; value: -11 0: 3 4 1: 2 2: 1 2 3: 1 3 5 optimal: (193/10 -e*1) + + 193/10 < 0; value: 193/10 - 6*v2 + 3*v3 -35 < 0; value: -6 - -5*v1 -6*v2 -1 <= 0; value: 0 + -75/2 <= 0; value: -75/2 - 5*v0 -10 = 0; value: 0 - -4*v3 -3 <= 0; value: 0 0: 3 4 1: 2 2: 1 2 3: 1 3 5 0: 2 -> 2 1: 2 -> -129/20 2: 2 -> 125/24 3: 2 -> -3/4 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -6*v3 + 10 <= 0; value: -14 + 6*v3 -35 <= 0; value: -11 + -5*v0 -1*v3 + 2 <= 0; value: -2 + 6*v0 -1*v1 < 0; value: -1 + -1*v0 -5*v1 -5*v2 + 15 < 0; value: -10 0: 1 3 4 5 1: 4 5 2: 5 3: 1 2 3 optimal: (23/3 -e*1) + + 23/3 < 0; value: 23/3 + -173/6 <= 0; value: -173/6 - 6*v3 -35 <= 0; value: 0 - 25/31*v2 -1*v3 -13/31 <= 0; value: 0 - 6*v0 -1*v1 < 0; value: -1 - -31*v0 -5*v2 + 15 <= 0; value: 0 0: 1 3 4 5 1: 4 5 2: 5 3 1 3: 1 2 3 0: 0 -> -23/30 1: 1 -> -18/5 2: 4 -> 1163/150 3: 4 -> 35/6 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 + 4*v2 -1 < 0; value: -5 + -3*v0 + 4*v1 + v2 -50 <= 0; value: -31 + -4*v0 + 3*v1 + v3 -31 < 0; value: -19 + 6*v0 -2*v1 + 3 < 0; value: -5 + 3*v1 + 5*v2 -27 = 0; value: 0 0: 2 3 4 1: 1 2 3 4 5 2: 1 2 5 3: 3 optimal: (-127/24 -e*1) + -127/24 < 0; value: -127/24 - 32/3*v2 -37 < 0; value: -5/2 + -283/8 < 0; value: -283/8 + v3 -2269/96 < 0; value: -2269/96 - 6*v0 -55/16 <= 0; value: 0 - 3*v1 + 5*v2 -27 = 0; value: 0 0: 2 3 4 1: 1 2 3 4 5 2: 1 2 5 4 3 3: 3 0: 0 -> 55/96 1: 4 -> 231/64 2: 3 -> 207/64 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -30 = 0; value: 0 + -1*v0 -2*v2 + 3*v3 <= 0; value: -2 + -6*v1 -1*v2 -2 <= 0; value: -8 + 3*v1 + 3*v2 -4*v3 <= 0; value: -1 + -6*v0 + 3*v2 -3*v3 + 31 <= 0; value: -2 0: 1 2 5 1: 3 4 2: 2 3 4 5 3: 2 4 5 optimal: 12 + + 12 <= 0; value: 12 - 6*v0 -30 = 0; value: 0 - -5*v0 + v3 + 62/3 <= 0; value: 0 - -6*v1 -1*v2 -2 <= 0; value: 0 + -25/3 <= 0; value: -25/3 - -6*v0 + 3*v2 -3*v3 + 31 <= 0; value: 0 0: 1 2 5 4 1: 3 4 2: 2 3 4 5 3: 2 4 5 0: 5 -> 5 1: 1 -> -1 2: 0 -> 4 3: 1 -> 13/3 + 2*v0 -2*v1 <= 0; value: -8 + -1*v3 + 3 = 0; value: 0 + 6*v2 -28 < 0; value: -4 + -2*v0 -1*v3 -3 <= 0; value: -8 + 2*v0 -3*v1 + 3 <= 0; value: -10 + -3*v0 -4*v2 -3*v3 + 28 = 0; value: 0 0: 3 4 5 1: 4 2: 2 5 3: 1 3 5 optimal: oo + -8/9*v2 + 20/9 <= 0; value: -4/3 - -1*v3 + 3 = 0; value: 0 + 6*v2 -28 < 0; value: -4 + 8/3*v2 -56/3 <= 0; value: -8 - 2*v0 -3*v1 + 3 <= 0; value: 0 - -3*v0 -4*v2 -3*v3 + 28 = 0; value: 0 0: 3 4 5 1: 4 2: 2 5 3 3: 1 3 5 0: 1 -> 1 1: 5 -> 5/3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -2*v2 + 8 <= 0; value: 0 + -5*v1 + 4 < 0; value: -1 + 5*v0 -16 < 0; value: -6 + 6*v1 + 5*v2 -44 <= 0; value: -18 + 2*v1 + 2*v2 -10 = 0; value: 0 0: 3 1: 2 4 5 2: 1 4 5 3: optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 + -2/5 < 0; value: -2/5 - 5*v2 -21 < 0; value: -1/2 - 5*v0 -16 < 0; value: -3 + -91/5 < 0; value: -91/5 - 2*v1 + 2*v2 -10 = 0; value: 0 0: 3 1: 2 4 5 2: 1 4 5 2 3: 0: 2 -> 13/5 1: 1 -> 9/10 2: 4 -> 41/10 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 3*v1 + 5*v3 -35 <= 0; value: -20 + -1*v0 -2*v3 + 4 <= 0; value: -2 + -1*v0 -5*v3 -13 <= 0; value: -28 + 6*v1 + 5*v2 -25 = 0; value: 0 + -1*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 4 2: 4 3: 1 2 3 optimal: oo + 2*v0 + 5/3*v2 -25/3 <= 0; value: 0 + -6*v0 -5/2*v2 + 5*v3 -45/2 <= 0; value: -20 + -1*v0 -2*v3 + 4 <= 0; value: -2 + -1*v0 -5*v3 -13 <= 0; value: -28 - 6*v1 + 5*v2 -25 = 0; value: 0 + -1*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 4 2: 4 1 3: 1 2 3 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v2 -5 <= 0; value: -2 + 6*v0 -4*v3 -6 = 0; value: 0 + -6*v0 -2*v1 -6*v3 -30 <= 0; value: -74 + 2*v3 -7 <= 0; value: -1 + -5*v1 -4*v2 -3 < 0; value: -27 0: 2 3 1: 3 5 2: 1 5 3: 2 3 4 optimal: (158/15 -e*1) + + 158/15 < 0; value: 158/15 - 3*v2 -5 <= 0; value: 0 - 6*v0 -4*v3 -6 = 0; value: 0 + -1007/15 <= 0; value: -1007/15 - 2*v3 -7 <= 0; value: 0 - -5*v1 -4*v2 -3 < 0; value: -5 0: 2 3 1: 3 5 2: 1 5 3 3: 2 3 4 0: 3 -> 10/3 1: 4 -> -14/15 2: 1 -> 5/3 3: 3 -> 7/2 + 2*v0 -2*v1 <= 0; value: -2 + v0 + v1 + 3*v3 -65 < 0; value: -43 + 2*v0 -5*v1 + 3*v2 -5 < 0; value: -19 + 5*v0 + 2*v3 -66 <= 0; value: -41 + 2*v1 + v3 -36 < 0; value: -23 + -2*v0 -1*v2 -3 <= 0; value: -9 0: 1 2 3 5 1: 1 2 4 2: 2 5 3: 1 3 4 optimal: oo + -36/25*v3 + 1328/25 < 0; value: 1148/25 + 73/25*v3 -1629/25 < 0; value: -1264/25 - 2*v0 -5*v1 + 3*v2 -5 < 0; value: -5 - 5*v0 + 2*v3 -66 <= 0; value: 0 + 41/25*v3 -1568/25 < 0; value: -1363/25 - -2*v0 -1*v2 -3 <= 0; value: 0 0: 1 2 3 5 4 1: 1 2 4 2: 2 5 1 4 3: 1 3 4 0: 3 -> 56/5 1: 4 -> -269/25 2: 0 -> -127/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 + 3*v3 -10 = 0; value: 0 + -4*v1 + 5 <= 0; value: -3 + -6*v0 -1*v3 + 20 = 0; value: 0 + -2*v0 + 4*v2 + 2*v3 -16 <= 0; value: -6 + -3*v1 -5*v2 -5*v3 + 10 <= 0; value: -21 0: 3 4 1: 1 2 5 2: 4 5 3: 1 3 4 5 optimal: 10/3 + + 10/3 <= 0; value: 10/3 - 2*v1 + 3*v3 -10 = 0; value: 0 - -36*v0 + 105 <= 0; value: 0 - -6*v0 -1*v3 + 20 = 0; value: 0 + 4*v2 -101/6 <= 0; value: -29/6 + -5*v2 -25/4 <= 0; value: -85/4 0: 3 4 2 5 1: 1 2 5 2: 4 5 3: 1 3 4 5 2 0: 3 -> 35/12 1: 2 -> 5/4 2: 3 -> 3 3: 2 -> 5/2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -4*v1 -3*v2 -7 <= 0; value: -2 + 4*v1 + 6*v2 -4*v3 -2 = 0; value: 0 + -2*v2 + 5*v3 -18 = 0; value: 0 + -3*v0 -3*v2 -12 <= 0; value: -27 + -1*v0 + 4*v3 -34 <= 0; value: -22 0: 1 4 5 1: 1 2 2: 1 2 3 4 3: 2 3 5 optimal: 1050/47 + + 1050/47 <= 0; value: 1050/47 - 5*v0 + 7/5*v2 -117/5 <= 0; value: 0 - 4*v1 + 6*v2 -4*v3 -2 = 0; value: 0 - -2*v2 + 5*v3 -18 = 0; value: 0 + -2535/47 <= 0; value: -2535/47 - -47/7*v0 + 50/7 <= 0; value: 0 0: 1 4 5 1: 1 2 2: 1 2 3 4 5 3: 2 3 5 1 0: 4 -> 50/47 1: 3 -> -475/47 2: 1 -> 607/47 3: 4 -> 412/47 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -6*v3 -10 <= 0; value: -22 + 2*v1 + 3*v2 -21 = 0; value: 0 + 2*v0 <= 0; value: 0 + 6*v1 + 5*v2 -79 <= 0; value: -36 + 4*v2 -3*v3 -21 < 0; value: -7 0: 1 3 1: 2 4 2: 2 4 5 3: 1 5 optimal: oo + 2*v0 + 9/4*v3 -21/4 < 0; value: -3/4 + -3*v0 -6*v3 -10 <= 0; value: -22 - 2*v1 + 3*v2 -21 = 0; value: 0 + 2*v0 <= 0; value: 0 + -3*v3 -37 < 0; value: -43 - 4*v2 -3*v3 -21 < 0; value: -7/2 0: 1 3 1: 2 4 2: 2 4 5 3: 1 5 4 0: 0 -> 0 1: 3 -> 27/16 2: 5 -> 47/8 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v1 -3*v3 + 12 = 0; value: 0 + 4*v0 + 3*v2 -53 < 0; value: -21 + -4*v0 + 2*v3 + 16 <= 0; value: -4 + -3*v0 + v2 + 2*v3 -10 < 0; value: -21 + 2*v1 -6*v2 + 20 = 0; value: 0 0: 2 3 4 1: 1 5 2: 2 4 5 3: 1 3 4 optimal: (112/3 -e*1) + + 112/3 < 0; value: 112/3 - -6*v1 -3*v3 + 12 = 0; value: 0 - 3*v0 -37 < 0; value: -3 - -4*v0 -12*v2 + 64 <= 0; value: 0 + -112/9 <= 0; value: -112/9 - -6*v2 -1*v3 + 24 = 0; value: 0 0: 2 3 4 1: 1 5 2: 2 4 5 3 3: 1 3 4 5 0: 5 -> 34/3 1: 2 -> -16/3 2: 4 -> 14/9 3: 0 -> 44/3 + 2*v0 -2*v1 <= 0; value: -2 + -6*v3 -10 <= 0; value: -40 + v0 -1*v3 + 2 = 0; value: 0 + -5*v0 + 6*v1 -9 <= 0; value: 0 + -6*v1 + 3 <= 0; value: -21 + 6*v1 -62 < 0; value: -38 0: 2 3 1: 3 4 5 2: 3: 1 2 optimal: oo + 2*v3 -5 <= 0; value: 5 + -6*v3 -10 <= 0; value: -40 - v0 -1*v3 + 2 = 0; value: 0 + -5*v3 + 4 <= 0; value: -21 - -6*v1 + 3 <= 0; value: 0 + -59 < 0; value: -59 0: 2 3 1: 3 4 5 2: 3: 1 2 3 0: 3 -> 3 1: 4 -> 1/2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -3*v2 + 9 = 0; value: 0 + -1*v1 + 4*v2 -6*v3 + 1 <= 0; value: 0 + -4*v2 + 6*v3 + 1 <= 0; value: -1 + 6*v0 + 4*v2 + 2*v3 -73 <= 0; value: -35 + -5*v0 + 4*v2 -29 <= 0; value: -19 0: 1 4 5 1: 2 2: 1 2 3 4 5 3: 2 3 4 optimal: 104/17 + + 104/17 <= 0; value: 104/17 - 3*v0 -3*v2 + 9 = 0; value: 0 - -1*v1 + 4*v2 -6*v3 + 1 <= 0; value: 0 - -4*v2 + 6*v3 + 1 <= 0; value: 0 - 34/3*v2 -274/3 <= 0; value: 0 + -375/17 <= 0; value: -375/17 0: 1 4 5 1: 2 2: 1 2 3 4 5 3: 2 3 4 0: 2 -> 86/17 1: 3 -> 2 2: 5 -> 137/17 3: 3 -> 177/34 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + 6*v2 + 2 = 0; value: 0 + -4*v0 -5*v1 -18 <= 0; value: -44 + v3 -3 <= 0; value: 0 + -6*v0 -6*v1 + 5*v3 + 21 <= 0; value: 0 + v0 -3*v1 -2*v3 -4 <= 0; value: -12 0: 2 4 5 1: 1 2 4 5 2: 1 3: 3 4 5 optimal: 16 + + 16 <= 0; value: 16 - -1*v1 + 6*v2 + 2 = 0; value: 0 + -41 <= 0; value: -41 - 8/9*v0 -56/9 <= 0; value: 0 - -6*v0 -36*v2 + 5*v3 + 9 <= 0; value: 0 - 4*v0 -9/2*v3 -29/2 <= 0; value: 0 0: 2 4 5 3 1: 1 2 4 5 2: 1 2 4 5 3: 3 4 5 2 0: 4 -> 7 1: 2 -> -1 2: 0 -> -1/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 -4*v3 + 8 = 0; value: 0 + -4*v0 -1*v2 -2*v3 + 24 = 0; value: 0 + -5*v0 + 3*v1 -5*v3 + 35 = 0; value: 0 + 3*v1 + 2*v3 -4 <= 0; value: 0 + 3*v0 + 4*v3 -43 <= 0; value: -20 0: 2 3 5 1: 1 3 4 2: 2 3: 1 2 3 4 5 optimal: oo + -6/17*v0 + 200/17 <= 0; value: 10 - -1*v1 -4*v3 + 8 = 0; value: 0 - -4*v0 -1*v2 -2*v3 + 24 = 0; value: 0 - 29*v0 + 17/2*v2 -145 = 0; value: 0 + 50/17*v0 -250/17 <= 0; value: 0 + 31/17*v0 -495/17 <= 0; value: -20 0: 2 3 5 4 1: 1 3 4 2: 2 3 5 4 3: 1 2 3 4 5 0: 5 -> 5 1: 0 -> 0 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 -6*v1 -6*v2 + 4 <= 0; value: -53 + -6*v3 + 12 = 0; value: 0 + -5*v0 -1*v1 + 6*v2 + 2 <= 0; value: 0 + -1*v1 -4*v2 -3*v3 + 23 = 0; value: 0 + -6*v0 -3*v1 + 14 < 0; value: -19 0: 1 3 5 1: 1 3 4 5 2: 1 3 4 3: 2 4 optimal: 49 + + 49 <= 0; value: 49 - 6*v0 -71 <= 0; value: 0 - -6*v3 + 12 = 0; value: 0 - -5*v0 -1*v1 + 6*v2 + 2 <= 0; value: 0 - 5*v0 -10*v2 -3*v3 + 21 = 0; value: 0 + -19 < 0; value: -19 0: 1 3 5 4 1: 1 3 4 5 2: 1 3 4 5 3: 2 4 1 5 0: 3 -> 71/6 1: 5 -> -38/3 2: 3 -> 89/12 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + 4*v1 -1*v2 -12 = 0; value: 0 + -1*v0 + 4*v1 -6*v3 -20 < 0; value: -9 + <= 0; value: 0 + v0 -2*v3 -2 <= 0; value: -1 0: 3 5 1: 2 3 2: 2 3: 3 5 optimal: oo + 2*v0 -1/2*v2 -6 <= 0; value: -4 + <= 0; value: 0 - 4*v1 -1*v2 -12 = 0; value: 0 + -1*v0 + v2 -6*v3 -8 < 0; value: -9 + <= 0; value: 0 + v0 -2*v3 -2 <= 0; value: -1 0: 3 5 1: 2 3 2: 2 3 3: 3 5 0: 1 -> 1 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -4*v2 + 20 = 0; value: 0 + -1*v1 + 2*v2 -9 = 0; value: 0 + -4*v1 -2 <= 0; value: -6 + 6*v1 + v3 -23 <= 0; value: -14 + 6*v2 + 2*v3 -104 <= 0; value: -68 0: 1: 2 3 4 2: 1 2 5 3: 4 5 optimal: oo + 2*v0 -2 <= 0; value: -2 - -4*v2 + 20 = 0; value: 0 - -1*v1 + 2*v2 -9 = 0; value: 0 + -6 <= 0; value: -6 + v3 -17 <= 0; value: -14 + 2*v3 -74 <= 0; value: -68 0: 1: 2 3 4 2: 1 2 5 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 1 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 + 1 = 0; value: 0 + -5*v0 -4*v2 + 9 = 0; value: 0 + -3*v1 -5*v2 + 11 <= 0; value: -9 + -4*v0 -4*v1 -3*v2 + 10 <= 0; value: -17 + 5*v1 -2*v2 -33 <= 0; value: -10 0: 1 2 4 1: 3 4 5 2: 2 3 4 5 3: optimal: -2 + -2 <= 0; value: -2 - -1*v0 + 1 = 0; value: 0 - -5*v0 -4*v2 + 9 = 0; value: 0 - -3*v1 -5*v2 + 11 <= 0; value: 0 + -5 <= 0; value: -5 + -25 <= 0; value: -25 0: 1 2 4 5 1: 3 4 5 2: 2 3 4 5 3: 0: 1 -> 1 1: 5 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 + 4*v1 -4*v3 -9 <= 0; value: -4 + -2*v1 + 6*v2 -1*v3 -49 < 0; value: -29 + -3*v1 -6*v2 + 18 < 0; value: -12 + 3*v0 + 5*v2 -2*v3 -72 < 0; value: -43 + 2*v0 -1*v3 -6 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 2 3 4 3: 1 2 4 5 optimal: oo + 14/5*v0 + 10 < 0; value: 92/5 + -53/5*v0 -5 < 0; value: -184/5 - 10*v2 -1*v3 -61 <= 0; value: 0 - -3*v1 -6*v2 + 18 < 0; value: -3 + -65/2 < 0; value: -65/2 - 2*v0 -1*v3 -6 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 2 3 4 1 3: 1 2 4 5 0: 3 -> 3 1: 2 -> -26/5 2: 4 -> 61/10 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -6*v1 -3*v2 -1 <= 0; value: -7 + v0 + 6*v1 -1*v2 -6 <= 0; value: -3 + -2*v0 -3*v1 -2*v2 + 14 = 0; value: 0 + 6*v1 + 2*v3 -6 <= 0; value: -2 + 2*v1 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 1 2 3 3: 4 optimal: 13 + + 13 <= 0; value: 13 + -5/2 <= 0; value: -5/2 - 2*v0 -13 <= 0; value: 0 - -2*v0 -3*v1 -2*v2 + 14 = 0; value: 0 + 2*v3 -6 <= 0; value: -2 - -4/3*v0 -4/3*v2 + 28/3 = 0; value: 0 0: 2 3 1 5 4 1: 1 2 3 4 5 2: 1 2 3 5 4 3: 4 0: 5 -> 13/2 1: 0 -> 0 2: 2 -> 1/2 3: 2 -> 2 10 x: 5 y: 5 z: 5 u: 6 10 oo (10 -e*1) x: 4 y: 5 z: 5 u: 6 v3 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v2 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v2 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 v3 -1 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 - v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 2 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -2 + v1 -1*v2 <= 0; value: -1 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 + v2 -1*v6 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 v1 - <= 0; value: 0 + v0 -1*v1 <= 0; value: -1 - v1 -1*v2 <= 0; value: -1 + v1 -1*v4 <= 0; value: -3 + v1 -1*v3 + 1 <= 0; value: -1 + v1 -1*v5 + 1 <= 0; value: -3 + v1 -1*v6 + 1 <= 0; value: -3 0: 1 1: 2 3 4 5 6 1 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 < 0; value: -2 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 + v2 -1*v6 + 1 < 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 v0 - <= 0; value: 0 - v0 -1*v2 <= 0; value: -1 + -1*v0 + v1 < 0; value: -1 + v0 -1*v4 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -1 + v0 -1*v5 + 1 <= 0; value: -3 + v0 -1*v6 + 1 < 0; value: -3 0: 1 3 4 5 6 2 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 < 0; value: -2 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 - <= 0; value: 0 + v0 -1*v5 + 1 <= 0; value: -3 + v1 -1*v5 + 1 < 0; value: -4 - v2 -1*v4 <= 0; value: -2 - v2 -1*v3 + 1 <= 0; value: 0 - v2 -1*v5 + 1 <= 0; value: -2 + v0 -1*v4 <= 0; value: -3 + v1 -1*v4 < 0; value: -4 + v0 -1*v3 + 1 <= 0; value: -1 + v1 -1*v3 + 1 < 0; value: -2 0: 1 6 8 1: 2 7 9 2: 1 2 3 4 5 6 7 8 9 3: 4 8 9 4: 3 6 7 5: 5 1 2 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 + 1 <= 0; value: -1 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 - <= 0; value: 0 - v0 -1*v2 <= 0; value: -1 + -1*v0 + v1 + 1 <= 0; value: 0 + v0 -1*v4 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -1 + v0 -1*v5 + 1 <= 0; value: -3 0: 1 3 4 5 2 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 - <= 0; value: 0 + v0 -2*v1 <= 0; value: 0 + 2*v1 -1*v2 <= 0; value: -1 0: 1 1: 1 2 2: 2 v2 / 2 - <= 0; value: 0 + 2*v0 -2*v2 + 1 <= 0; value: -1 - 2*v1 -1*v2 <= 0; value: -1 0: 1 1: 1 2 2: 2 1 - <= 0; value: 0 + v0 -2*v1 <= 0; value: -1 + 2*v1 -1*v2 <= 0; value: 0 0: 1 1: 1 2 2: 2 v2 / 2 - <= 0; value: 0 + 2*v0 -2*v2 + 1 <= 0; value: -1 - 2*v1 -1*v2 <= 0; value: 0 0: 1 1: 1 2 2: 2 1 PASS (test model_based_opt :time 0.11 :before-memory 4.68 :after-memory 4.68) - <= 0; value: 0 + v0 -2*v2 <= 0; value: -4 + v1 -2*v2 + 1 <= 0; value: -4 + 3*v2 -4*v4 <= 0; value: -11 + 3*v2 -5*v3 + 1 <= 0; value: -10 + 3*v2 -6*v5 + 1 <= 0; value: -26 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 + 1 / 2 - <= 0; value: 0 - v0 -2*v2 <= 0; value: -4 + -1*v0 + v1 + 1 <= 0; value: 0 + 3*v0 -8*v4 + 2 <= 0; value: -32 + 3*v0 -10*v3 + 4 <= 0; value: -30 + 3*v0 -12*v5 + 4 <= 0; value: -62 0: 1 3 4 5 2 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v1 + 1 - <= 0; value: 0 - v0 -2*v2 <= 0; value: -4 - -1*v0 + v1 + 1 <= 0; value: 0 + 3*v1 -8*v4 + 5 <= 0; value: -32 + 3*v1 -10*v3 + 7 <= 0; value: -30 + 3*v1 -12*v5 + 7 <= 0; value: -62 0: 1 3 4 5 2 1: 2 3 4 5 2: 1 2 3 4 5 3: 4 4: 3 5: 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 5*v2 -31 < 0; value: -1 + -1*v1 + 4*v2 + 2*v3 -45 <= 0; value: -26 + 5*v1 + v3 -42 <= 0; value: -13 + -3*v2 -9 < 0; value: -21 + v3 -4 = 0; value: 0 0: 1: 1 2 3 2: 1 2 4 3: 2 3 5 optimal: oo + 2*v0 + 98 < 0; value: 108 + -144 < 0; value: -144 - -1*v1 + 4*v2 + 2*v3 -45 <= 0; value: 0 + -283 < 0; value: -283 - -3*v2 -9 < 0; value: -3 - v3 -4 = 0; value: 0 0: 1: 1 2 3 2: 1 2 4 3 3: 2 3 5 1 0: 5 -> 5 1: 5 -> -45 2: 4 -> -2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -3*v2 -4*v3 + 11 <= 0; value: -2 + 3*v0 + 5*v2 -43 <= 0; value: -16 + -6*v1 + 4*v3 + 14 = 0; value: 0 + 3*v0 + 2*v3 -25 <= 0; value: -11 + 4*v2 -19 < 0; value: -7 0: 2 4 1: 3 2: 1 2 5 3: 1 3 4 optimal: (37/4 -e*1) + + 37/4 < 0; value: 37/4 - -3*v2 -4*v3 + 11 <= 0; value: 0 - 3*v0 -77/4 <= 0; value: 0 - -6*v1 + 4*v3 + 14 = 0; value: 0 + -59/8 < 0; value: -59/8 - 4*v2 -19 < 0; value: -7/2 0: 2 4 1: 3 2: 1 2 5 4 3: 1 3 4 0: 4 -> 77/12 1: 3 -> 107/48 2: 3 -> 31/8 3: 1 -> -5/32 + 2*v0 -2*v1 <= 0; value: 0 + = 0; value: 0 + -5*v0 -5*v1 <= 0; value: 0 + 5*v2 -1*v3 -27 <= 0; value: -14 + v2 -8 <= 0; value: -5 + -1*v1 <= 0; value: 0 0: 2 1: 2 5 2: 3 4 3: 3 optimal: 0 + <= 0; value: 0 + = 0; value: 0 - -5*v0 -5*v1 <= 0; value: 0 + 5*v2 -1*v3 -27 <= 0; value: -14 + v2 -8 <= 0; value: -5 - v0 <= 0; value: 0 0: 2 5 1: 2 5 2: 3 4 3: 3 0: 0 -> 0 1: 0 -> 0 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 5*v2 -77 <= 0; value: -40 + -2*v1 + 3*v2 + 2*v3 -28 <= 0; value: -17 + -5*v0 -6*v1 + 2*v2 -4 <= 0; value: -11 + -4*v0 + v2 -1 <= 0; value: 0 + -2*v2 -6*v3 -6 <= 0; value: -16 0: 3 4 1: 1 2 3 2: 1 2 3 4 5 3: 2 5 optimal: oo + 11/3*v0 + 2*v3 + 10/3 <= 0; value: 7 + -5*v0 -21*v3 -102 <= 0; value: -107 + 5/3*v0 -5*v3 -101/3 <= 0; value: -32 - -5*v0 -6*v1 + 2*v2 -4 <= 0; value: 0 + -4*v0 -3*v3 -4 <= 0; value: -8 - -2*v2 -6*v3 -6 <= 0; value: 0 0: 3 4 2 1 1: 1 2 3 2: 1 2 3 4 5 3: 2 5 1 4 0: 1 -> 1 1: 2 -> -5/2 2: 5 -> -3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 18 = 0; value: 0 + 2*v1 -3*v3 -2 <= 0; value: -1 + 4*v0 -12 = 0; value: 0 + -1*v1 + 2 = 0; value: 0 + 2*v2 -4*v3 -17 < 0; value: -11 0: 1 3 1: 2 4 2: 5 3: 2 5 optimal: 2 + + 2 <= 0; value: 2 - -6*v0 + 18 = 0; value: 0 + -3*v3 + 2 <= 0; value: -1 + = 0; value: 0 - -1*v1 + 2 = 0; value: 0 + 2*v2 -4*v3 -17 < 0; value: -11 0: 1 3 1: 2 4 2: 5 3: 2 5 0: 3 -> 3 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v0 -3*v2 + 2 <= 0; value: -3 + v1 + 2*v2 -4*v3 -2 <= 0; value: 0 + -1*v0 + 1 <= 0; value: -3 + -2*v1 + v3 + 4 <= 0; value: -2 + -3*v0 + 4*v1 -5 <= 0; value: -1 0: 1 3 5 1: 2 4 5 2: 1 2 3: 2 4 optimal: oo + 38/21*v0 -92/21 <= 0; value: 20/7 - v0 -3*v2 + 2 <= 0; value: 0 - 2*v2 -7/2*v3 <= 0; value: 0 + -1*v0 + 1 <= 0; value: -3 - -2*v1 + v3 + 4 <= 0; value: 0 + -55/21*v0 + 79/21 <= 0; value: -47/7 0: 1 3 5 1: 2 4 5 2: 1 2 5 3: 2 4 5 0: 4 -> 4 1: 4 -> 18/7 2: 3 -> 2 3: 2 -> 8/7 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 -18 = 0; value: 0 + -1*v2 + 4*v3 + 3 <= 0; value: -1 + <= 0; value: 0 + 4*v1 -18 < 0; value: -6 + -5*v1 -6*v2 -15 <= 0; value: -54 0: 1: 1 4 5 2: 2 5 3: 2 optimal: oo + 2*v0 -6 <= 0; value: -2 - 6*v1 -18 = 0; value: 0 + -1*v2 + 4*v3 + 3 <= 0; value: -1 + <= 0; value: 0 + -6 < 0; value: -6 + -6*v2 -30 <= 0; value: -54 0: 1: 1 4 5 2: 2 5 3: 2 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -3*v2 + 4 < 0; value: -1 + v0 + v2 + 5*v3 -19 <= 0; value: -12 + -5*v1 + v2 -5 < 0; value: -25 + 4*v0 + 4*v1 -3*v3 -28 = 0; value: 0 + 3*v3 <= 0; value: 0 0: 1 2 4 1: 3 4 2: 1 2 3 3: 2 4 5 optimal: (46/5 -e*1) + + 46/5 < 0; value: 46/5 - 5*v0 -3*v2 + 4 < 0; value: -3 + -11/5 <= 0; value: -11/5 - 5*v0 + v2 -15/4*v3 -40 < 0; value: -17/6 - 4*v0 + 4*v1 -3*v3 -28 = 0; value: 0 - 16/3*v0 -464/15 < 0; value: -16/3 0: 1 2 4 3 5 1: 3 4 2: 1 2 3 5 3: 2 4 5 3 0: 2 -> 24/5 1: 5 -> 49/30 2: 5 -> 31/3 3: 0 -> -34/45 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 4*v1 -21 < 0; value: -7 + -6*v0 -6*v3 + 30 = 0; value: 0 + -6*v1 + 3*v2 + v3 -7 = 0; value: 0 + 4*v2 -2*v3 -19 <= 0; value: -7 + -5*v0 + 1 <= 0; value: -4 0: 1 2 5 1: 1 3 2: 3 4 3: 2 3 4 optimal: oo + 7/3*v0 -1*v2 + 2/3 <= 0; value: -2 + 16/3*v0 + 2*v2 -67/3 < 0; value: -7 - -6*v0 -6*v3 + 30 = 0; value: 0 - -6*v1 + 3*v2 + v3 -7 = 0; value: 0 + 2*v0 + 4*v2 -29 <= 0; value: -7 + -5*v0 + 1 <= 0; value: -4 0: 1 2 5 4 1: 1 3 2: 3 4 1 3: 2 3 4 1 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 -44 <= 0; value: -24 + 4*v2 + v3 -18 <= 0; value: 0 + 6*v0 -4*v2 + 3*v3 + 2 < 0; value: -2 + v3 -5 <= 0; value: -3 + -3*v1 + 2 <= 0; value: -4 0: 3 1: 1 5 2: 1 2 3 3: 2 3 4 optimal: oo + 4/3*v2 -1*v3 -2 < 0; value: 4/3 + 4*v2 -128/3 <= 0; value: -80/3 + 4*v2 + v3 -18 <= 0; value: 0 - 6*v0 -4*v2 + 3*v3 + 2 < 0; value: -1 + v3 -5 <= 0; value: -3 - -3*v1 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 3 3: 2 3 4 0: 1 -> 7/6 1: 2 -> 2/3 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v3 -18 = 0; value: 0 + -2*v1 -1*v2 -2 < 0; value: -7 + 2*v0 -5*v1 -6*v2 + 14 <= 0; value: -1 + = 0; value: 0 + 3*v0 -4*v3 <= 0; value: 0 0: 3 5 1: 2 3 2: 2 3 3: 1 5 optimal: (124/7 -e*1) + + 124/7 < 0; value: 124/7 - 6*v3 -18 = 0; value: 0 - -4/5*v0 + 7/5*v2 -38/5 < 0; value: -7/5 - 2*v0 -5*v1 -6*v2 + 14 <= 0; value: 0 + = 0; value: 0 - 3*v0 -4*v3 <= 0; value: 0 0: 3 5 2 1: 2 3 2: 2 3 3: 1 5 0: 4 -> 4 1: 1 -> -128/35 2: 3 -> 47/7 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -1*v2 -6*v3 + 18 = 0; value: 0 + -6*v1 + 7 <= 0; value: -5 + -1*v0 + v1 + 4*v2 -3 <= 0; value: -1 + -3*v3 + 3 <= 0; value: -6 + 4*v2 -5*v3 + 10 <= 0; value: -5 0: 1 3 1: 2 3 2: 1 3 5 3: 1 4 5 optimal: 131/12 + + 131/12 <= 0; value: 131/12 - -2*v0 -1*v2 -6*v3 + 18 = 0; value: 0 - -6*v1 + 7 <= 0; value: 0 + -323/24 <= 0; value: -323/24 - -12/5*v2 -3 <= 0; value: 0 - 4*v2 -5*v3 + 10 <= 0; value: 0 0: 1 3 1: 2 3 2: 1 3 5 4 3: 1 4 5 3 0: 0 -> 53/8 1: 2 -> 7/6 2: 0 -> -5/4 3: 3 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 + v3 -1 <= 0; value: 0 + 5*v0 + 4*v1 -10 = 0; value: 0 + -2*v1 + 3*v3 -3 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + -1*v2 -2*v3 + 4 = 0; value: 0 0: 2 4 1: 1 2 3 2: 4 5 3: 1 3 5 optimal: 4 + + 4 <= 0; value: 4 + <= 0; value: 0 - 5*v0 + 4*v1 -10 = 0; value: 0 - -1/3*v3 + 1/3 <= 0; value: 0 - 3*v0 -2*v2 -2 = 0; value: 0 - -1*v2 -2*v3 + 4 = 0; value: 0 0: 2 4 3 1 1: 1 2 3 2: 4 5 3 1 3: 1 3 5 0: 2 -> 2 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 + 3*v2 + 18 = 0; value: 0 + 3*v0 -6*v1 -6*v2 + 14 < 0; value: -28 + -4*v0 -1*v3 + 19 = 0; value: 0 + -5*v1 -3*v3 + 34 = 0; value: 0 + v0 + 3*v3 -13 = 0; value: 0 0: 2 3 5 1: 1 2 4 2: 1 2 3: 3 4 5 optimal: -2 + -2 <= 0; value: -2 - -6*v1 + 3*v2 + 18 = 0; value: 0 + -28 < 0; value: -28 - -4*v0 -1*v3 + 19 = 0; value: 0 - -5/2*v2 -3*v3 + 19 = 0; value: 0 - -11*v0 + 44 = 0; value: 0 0: 2 3 5 1: 1 2 4 2: 1 2 4 3: 3 4 5 2 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 + 5*v3 -30 <= 0; value: -10 + 5*v1 -3*v2 + 5*v3 -20 = 0; value: 0 + -5*v2 + 2*v3 -8 <= 0; value: 0 + 3*v0 -1*v1 -3 <= 0; value: 0 + -2*v1 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 3: 1 2 3 optimal: 2 + + 2 <= 0; value: 2 + -10 <= 0; value: -10 - 5*v1 -3*v2 + 5*v3 -20 = 0; value: 0 - -5*v2 + 2*v3 -8 <= 0; value: 0 - 3*v0 + 19/10*v2 -3 <= 0; value: 0 - -6*v0 + 6 = 0; value: 0 0: 4 5 1 1: 1 2 4 5 2: 2 3 4 5 1 3: 1 2 3 4 5 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -3*v2 + 6*v3 -66 < 0; value: -39 + -4*v0 -1*v1 + 6*v3 = 0; value: 0 + 5*v1 -2*v3 + 4 <= 0; value: 0 + 4*v0 -17 < 0; value: -5 + 5*v0 + 3*v3 -45 <= 0; value: -24 0: 1 2 4 5 1: 2 3 2: 1 3: 1 2 3 5 optimal: oo + 10*v0 -12*v3 <= 0; value: 6 + 6*v0 -3*v2 + 6*v3 -66 < 0; value: -39 - -4*v0 -1*v1 + 6*v3 = 0; value: 0 + -20*v0 + 28*v3 + 4 <= 0; value: 0 + 4*v0 -17 < 0; value: -5 + 5*v0 + 3*v3 -45 <= 0; value: -24 0: 1 2 4 5 3 1: 2 3 2: 1 3: 1 2 3 5 0: 3 -> 3 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -1*v2 + v3 -17 <= 0; value: -9 + -6*v0 -4*v2 -18 < 0; value: -52 + -1*v1 <= 0; value: -4 + 3*v1 + 2*v2 -20 = 0; value: 0 + 3*v0 -5*v2 -1*v3 -3 <= 0; value: -17 0: 1 2 5 1: 3 4 2: 1 2 4 5 3: 1 5 optimal: 80/3 + + 80/3 <= 0; value: 80/3 - 3*v0 + v3 -27 <= 0; value: 0 + -138 < 0; value: -138 - 2/3*v2 -20/3 <= 0; value: 0 - 3*v1 + 2*v2 -20 = 0; value: 0 - -2*v3 -26 <= 0; value: 0 0: 1 2 5 1: 3 4 2: 1 2 4 5 3 3: 1 5 2 0: 3 -> 40/3 1: 4 -> 0 2: 4 -> 10 3: 3 -> -13 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 + v2 -50 <= 0; value: -26 + v0 -6*v1 -4 = 0; value: 0 + 3*v0 -5*v2 -4 < 0; value: -12 + -1*v0 -6*v1 <= 0; value: -4 + v2 -2*v3 + 1 < 0; value: -3 0: 1 2 3 4 1: 2 4 2: 1 3 5 3: 5 optimal: (691/42 -e*1) + + 691/42 < 0; value: 691/42 - 28/3*v2 -130/3 <= 0; value: 0 - v0 -6*v1 -4 = 0; value: 0 - 3*v0 -5*v2 -4 < 0; value: -3 + -99/7 < 0; value: -99/7 + -2*v3 + 79/14 < 0; value: -33/14 0: 1 2 3 4 1: 2 4 2: 1 3 5 4 3: 5 0: 4 -> 113/14 1: 0 -> 19/28 2: 4 -> 65/14 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 -2*v2 -10 <= 0; value: -26 + -4*v1 -6*v3 -10 < 0; value: -36 + -4*v0 + 3*v3 -5 = 0; value: 0 + 5*v0 + 4*v1 -1*v2 -18 <= 0; value: -7 + -3*v0 -4*v1 + 2*v3 -3 <= 0; value: -8 0: 3 4 5 1: 1 2 4 5 2: 1 4 3: 2 3 5 optimal: oo + 13/28*v2 + 225/28 <= 0; value: 251/28 + -53/28*v2 -241/28 <= 0; value: -347/28 + -23/14*v2 -691/14 < 0; value: -737/14 - -4*v0 + 3*v3 -5 = 0; value: 0 - 14/3*v0 -1*v2 -53/3 <= 0; value: 0 - -3*v0 -4*v1 + 2*v3 -3 <= 0; value: 0 0: 3 4 5 2 1 1: 1 2 4 5 2: 1 4 2 3: 2 3 5 1 4 0: 1 -> 59/14 1: 2 -> -15/56 2: 2 -> 2 3: 3 -> 51/7 + 2*v0 -2*v1 <= 0; value: 6 + 5*v0 + 2*v3 -47 <= 0; value: -19 + 5*v0 -5*v2 -3*v3 -1 < 0; value: -8 + 4*v1 -3*v3 + 8 <= 0; value: 0 + 6*v0 + 3*v3 -81 <= 0; value: -45 + -1*v0 -2*v1 -3*v3 -1 < 0; value: -19 0: 1 2 4 5 1: 3 5 2: 2 3: 1 2 3 4 5 optimal: (103 -e*1) + + 103 < 0; value: 103 - 5*v0 + 2*v3 -47 <= 0; value: 0 + -5*v2 -159 < 0; value: -174 + -349 < 0; value: -349 - -3/2*v0 -21/2 <= 0; value: 0 - -1*v0 -2*v1 -3*v3 -1 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 2 3: 1 2 3 4 5 0: 4 -> -7 1: 1 -> -115/2 2: 3 -> 3 3: 4 -> 41 + 2*v0 -2*v1 <= 0; value: -8 + 3*v0 + 6*v2 -3*v3 + 12 = 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 3*v2 -6*v3 + 24 = 0; value: 0 + 5*v2 -2*v3 -3 <= 0; value: -11 + 6*v1 -32 <= 0; value: -8 0: 1 2 1: 5 2: 1 2 3 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 3*v0 + 6*v2 -3*v3 + 12 = 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 3*v2 -6*v3 + 24 = 0; value: 0 + 5*v2 -2*v3 -3 <= 0; value: -11 + 6*v1 -32 <= 0; value: -8 0: 1 2 1: 5 2: 1 2 3 4 3: 1 3 4 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 3*v3 -11 = 0; value: 0 + v0 + 4*v3 -9 = 0; value: 0 + 5*v0 -2*v1 -4*v2 -8 <= 0; value: -25 + -6*v0 -3*v2 + 16 < 0; value: -2 + 4*v0 + 6*v2 -4*v3 -55 < 0; value: -35 0: 1 2 3 4 5 1: 3 2: 3 4 5 3: 1 2 5 optimal: (133/3 -e*1) + + 133/3 < 0; value: 133/3 - 5*v0 + 3*v3 -11 = 0; value: 0 - -17/3*v0 + 17/3 = 0; value: 0 - 5*v0 -2*v1 -4*v2 -8 <= 0; value: 0 + -39/2 < 0; value: -39/2 - 4*v0 + 6*v2 -4*v3 -55 < 0; value: -6 0: 1 2 3 4 5 1: 3 2: 3 4 5 3: 1 2 5 4 0: 1 -> 1 1: 3 -> -115/6 2: 4 -> 53/6 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -4*v1 + 1 < 0; value: -3 + 4*v2 <= 0; value: 0 + 6*v1 -33 <= 0; value: -9 + -6*v0 + 2*v2 + 7 <= 0; value: -5 + 5*v0 + v1 -38 <= 0; value: -24 0: 1 4 5 1: 1 3 5 2: 2 4 3: optimal: oo + -1/3*v2 -5/3 < 0; value: -5/3 - 6*v0 -4*v1 + 1 < 0; value: -4 + 4*v2 <= 0; value: 0 + 3*v2 -21 < 0; value: -21 - -6*v0 + 2*v2 + 7 <= 0; value: 0 + 13/6*v2 -181/6 < 0; value: -181/6 0: 1 4 5 3 1: 1 3 5 2: 2 4 5 3 3: 0: 2 -> 7/6 1: 4 -> 3 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 + 5 = 0; value: 0 + -3*v0 -5*v2 + 10 < 0; value: -4 + 6*v0 -42 <= 0; value: -24 + 6*v2 + 5*v3 -60 <= 0; value: -39 + 4*v0 + 6*v2 + v3 -52 < 0; value: -31 0: 2 3 5 1: 1 2: 2 4 5 3: 4 5 optimal: 12 + + 12 <= 0; value: 12 - -5*v1 + 5 = 0; value: 0 + -5*v2 -11 < 0; value: -16 - 6*v0 -42 <= 0; value: 0 + 6*v2 + 5*v3 -60 <= 0; value: -39 + 6*v2 + v3 -24 < 0; value: -15 0: 2 3 5 1: 1 2: 2 4 5 3: 4 5 0: 3 -> 7 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -5*v3 + 9 = 0; value: 0 + 3*v2 -4*v3 <= 0; value: 0 + -2*v0 + 2*v2 + 6 = 0; value: 0 + v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 6*v2 -3*v3 -34 < 0; value: -22 0: 1 3 4 5 1: 2: 2 3 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -5*v3 + 9 = 0; value: 0 + 3*v2 -4*v3 <= 0; value: 0 + -2*v0 + 2*v2 + 6 = 0; value: 0 + v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 6*v2 -3*v3 -34 < 0; value: -22 0: 1 3 4 5 1: 2: 2 3 5 3: 1 2 4 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -2*v1 + 4*v2 -34 <= 0; value: -16 + -6*v0 -2*v2 -8 < 0; value: -28 + 4*v0 + 3*v1 -3*v2 -7 <= 0; value: -2 + -2*v1 + 6*v2 -3*v3 -43 <= 0; value: -25 + 3*v1 -12 <= 0; value: -3 0: 1 2 3 1: 1 3 4 5 2: 1 2 3 4 3: 4 optimal: (750 -e*1) + + 750 < 0; value: 750 - 4*v0 -2*v1 + 4*v2 -34 <= 0; value: 0 - -6*v0 -2*v2 -8 < 0; value: -2 - v0 -70 < 0; value: -1 + -3*v3 -717 < 0; value: -717 + -927 < 0; value: -927 0: 1 2 3 4 5 1: 1 3 4 5 2: 1 2 3 4 5 3: 4 0: 2 -> 69 1: 3 -> -299 2: 4 -> -210 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -71 <= 0; value: -40 + 3*v2 + 6*v3 -33 = 0; value: 0 + -3*v0 -4*v1 -3*v2 + 20 < 0; value: -2 + -3*v2 -3*v3 -19 <= 0; value: -43 + 3*v0 + 2*v1 + 5*v3 -20 <= 0; value: 0 0: 3 5 1: 3 5 2: 1 2 3 4 3: 1 2 4 5 optimal: (335/3 -e*1) + + 335/3 < 0; value: 335/3 - -8*v3 -16 <= 0; value: 0 - 3*v2 + 6*v3 -33 = 0; value: 0 - -3*v0 -4*v1 -3*v2 + 20 < 0; value: -4 + -58 <= 0; value: -58 - 3/2*v0 -85/2 < 0; value: -3/2 0: 3 5 1: 3 5 2: 1 2 3 4 5 3: 1 2 4 5 0: 1 -> 82/3 1: 1 -> -103/4 2: 5 -> 15 3: 3 -> -2 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 3*v1 + 1 <= 0; value: 0 + 6*v0 -3*v1 + 5*v3 -35 < 0; value: -9 + 2*v0 + v1 + 6*v3 -15 <= 0; value: 0 + -5*v0 + 5*v1 + 2*v2 -6 < 0; value: -13 + 5*v0 + 6*v3 -55 <= 0; value: -29 0: 1 2 3 4 5 1: 1 2 3 4 2: 4 3: 2 3 5 optimal: oo + -2*v0 -10/3*v3 + 70/3 < 0; value: 12 + 5*v0 + 5*v3 -34 < 0; value: -9 - 6*v0 -3*v1 + 5*v3 -35 < 0; value: -3 + 4*v0 + 23/3*v3 -80/3 < 0; value: -3 + 5*v0 + 2*v2 + 25/3*v3 -193/3 < 0; value: -28 + 5*v0 + 6*v3 -55 <= 0; value: -29 0: 1 2 3 4 5 1: 1 2 3 4 2: 4 3: 2 3 5 1 4 0: 4 -> 4 1: 1 -> -1 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 -3*v3 -39 <= 0; value: -22 + 2*v2 -6*v3 -6 <= 0; value: 0 + 6*v0 -2*v3 -39 < 0; value: -15 + -2*v2 + 5*v3 + 3 < 0; value: -3 + -5*v1 + v2 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 4 5 3: 1 2 3 4 optimal: (63/5 -e*1) + + 63/5 < 0; value: 63/5 + -58 < 0; value: -58 - -1*v3 -3 < 0; value: -1 - 6*v0 -33 <= 0; value: 0 - -2*v2 + 5*v3 + 3 < 0; value: -2 - -5*v1 + v2 + 2 <= 0; value: 0 0: 3 1: 1 5 2: 1 2 4 5 3: 1 2 3 4 0: 4 -> 11/2 1: 1 -> -1/10 2: 3 -> -5/2 3: 0 -> -2 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 + 3*v1 -4 <= 0; value: -2 + 5*v0 + v1 -6*v3 -13 <= 0; value: -8 + -1*v1 = 0; value: 0 + 4*v1 = 0; value: 0 + -1*v0 -4*v2 + 2*v3 + 1 = 0; value: 0 0: 1 2 5 1: 1 2 3 4 2: 5 3: 2 5 optimal: 4 + + 4 <= 0; value: 4 - -8*v2 + 4*v3 -2 <= 0; value: 0 + -12*v2 -6 <= 0; value: -6 - -1*v1 = 0; value: 0 + = 0; value: 0 - -1*v0 -4*v2 + 2*v3 + 1 = 0; value: 0 0: 1 2 5 1: 1 2 3 4 2: 5 2 1 3: 2 5 1 0: 1 -> 2 1: 0 -> 0 2: 0 -> 0 3: 0 -> 1/2 + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -1*v1 + 5 = 0; value: 0 + 5*v0 -5*v2 -6*v3 -22 <= 0; value: -7 + -4*v0 -1*v2 + 17 < 0; value: -5 + -5*v0 -2*v1 + v2 + 21 <= 0; value: -2 + v0 + 5*v1 + v2 -9 <= 0; value: -2 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 2 optimal: oo + 4*v2 + 24/5*v3 + 38/5 <= 0; value: 78/5 - -1*v0 -1*v1 + 5 = 0; value: 0 - 5*v0 -5*v2 -6*v3 -22 <= 0; value: 0 + -5*v2 -24/5*v3 -3/5 < 0; value: -53/5 + -2*v2 -18/5*v3 -11/5 <= 0; value: -31/5 + -3*v2 -24/5*v3 -8/5 <= 0; value: -38/5 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 2 3 4 5 0: 5 -> 32/5 1: 0 -> -7/5 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 + 1 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -18 < 0; value: -11 + v0 -2*v2 + 4 <= 0; value: -1 + -3*v0 + 6*v3 -59 <= 0; value: -32 + 5*v0 -2*v2 + v3 -6 <= 0; value: -2 0: 2 3 4 5 1: 2 2: 1 2 3 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 + 1 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -18 < 0; value: -11 + v0 -2*v2 + 4 <= 0; value: -1 + -3*v0 + 6*v3 -59 <= 0; value: -32 + 5*v0 -2*v2 + v3 -6 <= 0; value: -2 0: 2 3 4 5 1: 2 2: 1 2 3 5 3: 1 4 5 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + 5*v1 -27 <= 0; value: -15 + -2*v0 -2*v2 + 12 = 0; value: 0 + 6*v0 + v1 + 6*v3 -104 <= 0; value: -65 + v2 + v3 -10 <= 0; value: 0 + -1*v1 + 3*v2 -19 < 0; value: -7 0: 1 2 3 1: 1 3 5 2: 2 4 5 3: 3 4 optimal: oo + -16*v3 + 282 < 0; value: 202 + 36*v3 -662 < 0; value: -482 - -2*v0 -2*v2 + 12 = 0; value: 0 - 3*v0 + 6*v3 -105 < 0; value: -3 + 3*v3 -39 < 0; value: -24 - -1*v1 + 3*v2 -19 < 0; value: -1 0: 1 2 3 4 1: 1 3 5 2: 2 4 5 1 3 3: 3 4 1 0: 1 -> 24 1: 3 -> -72 2: 5 -> -18 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 4*v3 -8 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -2 <= 0; value: 0 + 3*v0 + 3*v2 -4*v3 + 1 <= 0; value: -1 + 2*v1 + 5*v2 -6*v3 <= 0; value: -2 + 3*v1 -3*v3 -3 < 0; value: -9 0: 2 3 1: 1 4 5 2: 2 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 2/3 <= 0; value: 2/3 - 6*v1 + 4*v3 -8 = 0; value: 0 - -1*v0 -1*v2 + 2*v3 -2 <= 0; value: 0 - v0 + v2 -3 <= 0; value: 0 + -5*v0 -2/3 <= 0; value: -2/3 + -23/2 < 0; value: -23/2 0: 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 1 2 3 4 5 0: 0 -> 0 1: 0 -> -1/3 2: 2 -> 3 3: 2 -> 5/2 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v3 -65 <= 0; value: -38 + -5*v0 + 4*v1 -1 <= 0; value: 0 + 5*v3 -34 <= 0; value: -9 + -2*v0 -6*v2 + 36 = 0; value: 0 + -6*v3 + 18 < 0; value: -12 0: 1 2 4 1: 1 2 2: 4 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v3 -65 <= 0; value: -38 + -5*v0 + 4*v1 -1 <= 0; value: 0 + 5*v3 -34 <= 0; value: -9 + -2*v0 -6*v2 + 36 = 0; value: 0 + -6*v3 + 18 < 0; value: -12 0: 1 2 4 1: 1 2 2: 4 3: 1 3 5 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 3*v1 + 3*v2 -38 < 0; value: -23 + -6*v0 -4*v1 -6*v2 + 26 <= 0; value: -2 + -6*v3 + 2 <= 0; value: -4 + -2*v3 + 2 = 0; value: 0 + 6*v0 + 5*v1 -3*v2 -6 <= 0; value: -13 0: 1 2 5 1: 1 2 5 2: 1 2 5 3: 3 4 optimal: oo + 5*v0 + 3*v2 -13 <= 0; value: -1 + 3/2*v0 -3/2*v2 -37/2 < 0; value: -49/2 - -6*v0 -4*v1 -6*v2 + 26 <= 0; value: 0 + -6*v3 + 2 <= 0; value: -4 + -2*v3 + 2 = 0; value: 0 + -3/2*v0 -21/2*v2 + 53/2 <= 0; value: -31/2 0: 1 2 5 1: 1 2 5 2: 1 2 5 3: 3 4 0: 0 -> 0 1: 1 -> 1/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + 6*v1 -6*v3 -13 <= 0; value: -43 + -4*v0 + 8 = 0; value: 0 + -6*v1 -5*v3 + 1 <= 0; value: -30 + 3*v2 -4*v3 -10 < 0; value: -27 + 6*v2 + 2*v3 -24 <= 0; value: -8 0: 1 2 1: 1 3 2: 4 5 3: 1 3 4 5 optimal: oo + 2*v0 -5*v2 + 59/3 <= 0; value: 56/3 + -3*v0 + 33*v2 -144 <= 0; value: -117 + -4*v0 + 8 = 0; value: 0 - -6*v1 -5*v3 + 1 <= 0; value: 0 + 15*v2 -58 < 0; value: -43 - 6*v2 + 2*v3 -24 <= 0; value: 0 0: 1 2 1: 1 3 2: 4 5 1 3: 1 3 4 5 0: 2 -> 2 1: 1 -> -22/3 2: 1 -> 1 3: 5 -> 9 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 -2*v2 -4*v3 -5 <= 0; value: -25 + 2*v0 + 4*v2 -17 <= 0; value: -11 + -3*v0 -4*v1 -6*v3 + 32 < 0; value: -1 + -4*v1 -4*v2 -3 < 0; value: -15 + 5*v0 + 5*v2 + 4*v3 -23 = 0; value: 0 0: 2 3 5 1: 1 3 4 2: 1 2 4 5 3: 1 3 5 optimal: (391/26 -e*1) + + 391/26 < 0; value: 391/26 - 52/23*v0 -582/23 <= 0; value: 0 + -160/13 <= 0; value: -160/13 - -3*v0 -4*v1 -6*v3 + 32 < 0; value: -35/26 - -9/2*v0 -23/2*v2 -1/2 <= 0; value: 0 - 5*v0 + 5*v2 + 4*v3 -23 = 0; value: 0 0: 2 3 5 1 4 1: 1 3 4 2: 1 2 4 5 3: 1 3 5 4 0: 3 -> 291/26 1: 3 -> 417/104 2: 0 -> -115/26 3: 2 -> -141/52 + 2*v0 -2*v1 <= 0; value: -2 + -3*v2 <= 0; value: 0 + 3*v1 -2*v2 -8 <= 0; value: -5 + -4*v0 -2*v3 + 8 <= 0; value: 0 + -3*v0 + 6*v2 = 0; value: 0 + 3*v1 -4*v3 + 8 < 0; value: -5 0: 3 4 1: 2 5 2: 1 2 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -3*v2 <= 0; value: 0 + 3*v1 -2*v2 -8 <= 0; value: -5 + -4*v0 -2*v3 + 8 <= 0; value: 0 + -3*v0 + 6*v2 = 0; value: 0 + 3*v1 -4*v3 + 8 < 0; value: -5 0: 3 4 1: 2 5 2: 1 2 4 3: 3 5 0: 0 -> 0 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 + 2 <= 0; value: -4 + 2*v1 + 2*v3 -50 <= 0; value: -30 + -5*v1 -12 <= 0; value: -37 + -3*v1 -4*v3 + 35 = 0; value: 0 + -5*v0 -1*v3 -6 <= 0; value: -21 0: 1 5 1: 2 3 4 2: 3: 2 4 5 optimal: oo + 2*v0 + 24/5 <= 0; value: 44/5 + -3*v0 + 2 <= 0; value: -4 + -337/10 <= 0; value: -337/10 - 20/3*v3 -211/3 <= 0; value: 0 - -3*v1 -4*v3 + 35 = 0; value: 0 + -5*v0 -331/20 <= 0; value: -531/20 0: 1 5 1: 2 3 4 2: 3: 2 4 5 3 0: 2 -> 2 1: 5 -> -12/5 2: 4 -> 4 3: 5 -> 211/20 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -5*v2 -1*v3 -11 < 0; value: -3 + 3*v0 + 5*v1 -4*v3 -25 <= 0; value: -3 + -1*v0 + 4*v2 + 2 <= 0; value: -2 + -6*v0 + v2 -1*v3 -6 <= 0; value: -30 + -3*v3 <= 0; value: 0 0: 2 3 4 1: 1 2 2: 1 3 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -5*v2 -1*v3 -11 < 0; value: -3 + 3*v0 + 5*v1 -4*v3 -25 <= 0; value: -3 + -1*v0 + 4*v2 + 2 <= 0; value: -2 + -6*v0 + v2 -1*v3 -6 <= 0; value: -30 + -3*v3 <= 0; value: 0 0: 2 3 4 1: 1 2 2: 1 3 4 3: 1 2 4 5 0: 4 -> 4 1: 2 -> 2 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 2*v1 + 2 <= 0; value: -1 + 2*v3 -8 = 0; value: 0 + -3*v0 + 4*v1 -2*v3 + 9 <= 0; value: -8 + 4*v1 -1*v2 -4*v3 -8 < 0; value: -27 + -5*v0 -4*v1 + 2 < 0; value: -13 0: 1 3 5 1: 1 3 4 5 2: 4 3: 2 3 4 optimal: oo + 9/2*v0 -1 < 0; value: 25/2 + -7/2*v0 + 3 < 0; value: -15/2 + 2*v3 -8 = 0; value: 0 + -8*v0 -2*v3 + 11 < 0; value: -21 + -5*v0 -1*v2 -4*v3 -6 < 0; value: -40 - -5*v0 -4*v1 + 2 < 0; value: -4 0: 1 3 5 4 1: 1 3 4 5 2: 4 3: 2 3 4 0: 3 -> 3 1: 0 -> -9/4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 -4*v2 -4*v3 -1 <= 0; value: -21 + <= 0; value: 0 + -5*v0 -3*v1 + 2*v2 -4 <= 0; value: -16 + v0 + 6*v1 -40 < 0; value: -16 + -2*v2 + 3*v3 -37 <= 0; value: -22 0: 1 3 4 1: 3 4 2: 1 3 5 3: 1 5 optimal: oo + 68/15*v0 + 191/15 <= 0; value: 191/15 - 4*v0 -4*v2 -4*v3 -1 <= 0; value: 0 + <= 0; value: 0 - -5*v0 -3*v1 + 2*v2 -4 <= 0; value: 0 + -33/5*v0 -391/5 < 0; value: -391/5 - -2*v0 + 5*v3 -73/2 <= 0; value: 0 0: 1 3 4 5 1: 3 4 2: 1 3 5 4 3: 1 5 4 0: 0 -> 0 1: 4 -> -191/30 2: 0 -> -151/20 3: 5 -> 73/10 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 + 4*v3 -26 <= 0; value: -16 + -2*v0 -5*v2 -1*v3 + 16 <= 0; value: -2 + 2*v0 + 4*v1 -75 <= 0; value: -49 + v1 -4*v2 -2*v3 -1 <= 0; value: -8 + -5*v0 + 3*v1 -4*v3 + 6 <= 0; value: -2 0: 1 2 3 5 1: 3 4 5 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 + 4*v3 -26 <= 0; value: -16 + -2*v0 -5*v2 -1*v3 + 16 <= 0; value: -2 + 2*v0 + 4*v1 -75 <= 0; value: -49 + v1 -4*v2 -2*v3 -1 <= 0; value: -8 + -5*v0 + 3*v1 -4*v3 + 6 <= 0; value: -2 0: 1 2 3 5 1: 3 4 5 2: 1 2 4 3: 1 2 4 5 0: 3 -> 3 1: 5 -> 5 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 6*v1 -7 <= 0; value: -19 + -1*v1 -6*v2 + 2 <= 0; value: -16 + -4*v2 + 3*v3 -2 <= 0; value: -5 + -6*v1 -5*v2 -5*v3 + 3 < 0; value: -27 + 3*v0 + 4*v2 -43 < 0; value: -22 0: 1 5 1: 1 2 4 2: 2 3 4 5 3: 3 4 optimal: oo + -11/12*v0 + 503/12 < 0; value: 235/6 + 19/4*v0 -531/4 < 0; value: -237/2 + 73/24*v0 -997/24 < 0; value: -389/12 - -4*v2 + 3*v3 -2 <= 0; value: 0 - -6*v1 -5*v2 -5*v3 + 3 < 0; value: -6 - 3*v0 + 4*v2 -43 < 0; value: -4 0: 1 5 2 1: 1 2 4 2: 2 3 4 5 1 3: 3 4 2 1 0: 3 -> 3 1: 0 -> -491/36 2: 3 -> 15/2 3: 3 -> 32/3 + 2*v0 -2*v1 <= 0; value: 6 + -6*v2 + 6*v3 <= 0; value: 0 + -2*v0 + 3*v2 -14 <= 0; value: -8 + -5*v1 -5*v2 -13 <= 0; value: -33 + -4*v1 <= 0; value: 0 + v2 -4 <= 0; value: 0 0: 2 1: 3 4 2: 1 2 3 5 3: 1 optimal: oo + 2*v0 <= 0; value: 6 + -6*v2 + 6*v3 <= 0; value: 0 + -2*v0 + 3*v2 -14 <= 0; value: -8 + -5*v2 -13 <= 0; value: -33 - -4*v1 <= 0; value: 0 + v2 -4 <= 0; value: 0 0: 2 1: 3 4 2: 1 2 3 5 3: 1 0: 3 -> 3 1: 0 -> 0 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 5*v1 -5 <= 0; value: -3 + -4*v0 -3*v1 -1*v3 + 16 = 0; value: 0 + 3*v0 + v3 -24 <= 0; value: -14 + 6*v2 + 6*v3 -33 < 0; value: -21 + 3*v0 -4*v1 -5*v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2 5 2: 4 3: 2 3 4 5 optimal: (592/29 -e*1) + + 592/29 < 0; value: 592/29 + -969/29 < 0; value: -969/29 - -4*v0 -3*v1 -1*v3 + 16 = 0; value: 0 - 3*v0 -1*v2 -37/2 <= 0; value: 0 - 6*v2 + 6*v3 -33 < 0; value: -6 - 58/3*v0 -328/3 < 0; value: -58/3 0: 1 2 3 5 1: 1 2 5 2: 4 3 5 1 3: 2 3 4 5 1 0: 3 -> 135/29 1: 1 -> -338/87 2: 1 -> -263/58 3: 1 -> 262/29 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -4*v2 <= 0; value: 0 + 2*v2 + 6*v3 <= 0; value: 0 + -6*v0 -6*v2 <= 0; value: 0 + -3*v1 = 0; value: 0 + -2*v1 <= 0; value: 0 0: 1 3 1: 4 5 2: 1 2 3 3: 2 optimal: oo + 2*v0 <= 0; value: 0 + -6*v0 -4*v2 <= 0; value: 0 + 2*v2 + 6*v3 <= 0; value: 0 + -6*v0 -6*v2 <= 0; value: 0 - -3*v1 = 0; value: 0 + <= 0; value: 0 0: 1 3 1: 4 5 2: 1 2 3 3: 2 0: 0 -> 0 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -1*v2 + 1 <= 0; value: 0 + -6*v1 -6*v3 + 54 = 0; value: 0 + 2*v2 -5 <= 0; value: -3 + -4*v2 -5*v3 + 9 <= 0; value: -15 + 3*v0 + 2*v1 -12 <= 0; value: -2 0: 5 1: 2 5 2: 1 3 4 3: 2 4 optimal: oo + 2*v0 + 2*v3 -18 <= 0; value: -10 + -1*v2 + 1 <= 0; value: 0 - -6*v1 -6*v3 + 54 = 0; value: 0 + 2*v2 -5 <= 0; value: -3 + -4*v2 -5*v3 + 9 <= 0; value: -15 + 3*v0 -2*v3 + 6 <= 0; value: -2 0: 5 1: 2 5 2: 1 3 4 3: 2 4 5 0: 0 -> 0 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 6*v1 -10 <= 0; value: -1 + 4*v0 + v1 -4*v3 + 1 = 0; value: 0 + -4*v0 -1*v1 + 5*v3 -13 <= 0; value: -8 + -2*v0 -4*v1 + 15 <= 0; value: -3 + -1*v1 -6*v3 + 27 = 0; value: 0 0: 1 2 3 4 1: 1 2 3 4 5 2: 3: 2 3 5 optimal: 51/19 + + 51/19 <= 0; value: 51/19 + -299/38 <= 0; value: -299/38 - 4*v0 + v1 -4*v3 + 1 = 0; value: 0 + -149/19 <= 0; value: -149/19 - 38/5*v0 -129/5 <= 0; value: 0 - 4*v0 -10*v3 + 28 = 0; value: 0 0: 1 2 3 4 5 3 1: 1 2 3 4 5 2: 3: 2 3 5 4 1 0: 3 -> 129/38 1: 3 -> 39/19 2: 5 -> 5 3: 4 -> 79/19 + 2*v0 -2*v1 <= 0; value: -10 + 5*v0 <= 0; value: 0 + 2*v0 + 2*v1 -2*v2 -21 < 0; value: -13 + -4*v0 -6*v1 -14 <= 0; value: -44 + 4*v1 -6*v2 -36 < 0; value: -22 + 5*v1 + 4*v2 -29 = 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 2 4 5 3: optimal: 14/3 + + 14/3 <= 0; value: 14/3 - 5*v0 <= 0; value: 0 + -46 < 0; value: -46 - -4*v0 + 24/5*v2 -244/5 <= 0; value: 0 + -319/3 < 0; value: -319/3 - 5*v1 + 4*v2 -29 = 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 2 4 5 3 3: 0: 0 -> 0 1: 5 -> -7/3 2: 1 -> 61/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + v0 + 2*v2 + 3*v3 -11 = 0; value: 0 + 2*v0 + v3 -16 <= 0; value: -10 + 5*v1 + 4*v2 -21 = 0; value: 0 + 6*v1 -14 < 0; value: -8 + -1*v1 + 5*v2 -56 <= 0; value: -37 0: 1 2 1: 3 4 5 2: 1 3 5 3: 1 2 optimal: 908/29 + + 908/29 <= 0; value: 908/29 - v0 + 2*v2 + 3*v3 -11 = 0; value: 0 - 5/3*v0 -1675/87 <= 0; value: 0 - 5*v1 + 4*v2 -21 = 0; value: 0 + -1120/29 < 0; value: -1120/29 - -29/10*v0 -87/10*v3 -283/10 <= 0; value: 0 0: 1 2 5 4 1: 3 4 5 2: 1 3 5 4 3: 1 2 5 4 0: 3 -> 335/29 1: 1 -> -119/29 2: 4 -> 301/29 3: 0 -> -206/29 + 2*v0 -2*v1 <= 0; value: 2 + -1*v1 + 4*v3 -15 <= 0; value: -7 + -4*v1 + 6*v2 -1*v3 -16 = 0; value: 0 + -5*v0 + 2*v1 -1*v2 + 8 = 0; value: 0 + -2*v0 -4*v3 -3 < 0; value: -13 + 6*v0 + 2*v2 -3*v3 -17 <= 0; value: -11 0: 3 4 5 1: 1 2 3 2: 2 3 5 3: 1 2 4 5 optimal: (1941/91 -e*1) + + 1941/91 < 0; value: 1941/91 - -91/16*v0 -445/32 < 0; value: -91/16 - -4*v1 + 6*v2 -1*v3 -16 = 0; value: 0 - -5*v0 + 2*v2 -1/2*v3 = 0; value: 0 - 38*v0 -16*v2 -3 < 0; value: -16 + -586/13 < 0; value: -586/13 0: 3 4 5 1 1: 1 2 3 2: 2 3 5 1 4 3: 1 2 4 5 3 0: 1 -> -263/182 1: 0 -> -12991/1456 2: 3 -> -1907/728 3: 2 -> 723/182 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 -6*v3 -18 = 0; value: 0 + -1*v0 -3*v2 + 14 <= 0; value: -5 + -4*v3 + 4 <= 0; value: -4 + 4*v0 -5*v1 -4*v3 + 17 = 0; value: 0 + 6*v0 -4*v1 + 3*v2 -54 <= 0; value: -35 0: 2 4 5 1: 1 4 5 2: 2 5 3: 1 3 4 optimal: 342/29 + + 342/29 <= 0; value: 342/29 - 6*v1 -6*v3 -18 = 0; value: 0 - -87/38*v2 -35/19 <= 0; value: 0 + -756/29 <= 0; value: -756/29 - 4*v0 -9*v3 + 2 = 0; value: 0 - 38/9*v0 + 3*v2 -602/9 <= 0; value: 0 0: 2 4 5 3 1: 1 4 5 2: 2 5 3 3: 1 3 4 5 0: 4 -> 476/29 1: 5 -> 305/29 2: 5 -> -70/87 3: 2 -> 218/29 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + 2*v2 + 2*v3 -29 = 0; value: 0 + 3*v0 -1*v2 -11 = 0; value: 0 + -2*v1 -3*v3 -7 <= 0; value: -26 + 4*v2 -38 <= 0; value: -22 + -5*v2 + 8 <= 0; value: -12 0: 1 2 1: 3 2: 1 2 4 5 3: 1 3 optimal: 176/5 + + 176/5 <= 0; value: 176/5 - 3*v0 + 2*v2 + 2*v3 -29 = 0; value: 0 - 3*v0 -1*v2 -11 = 0; value: 0 - -2*v1 -3*v3 -7 <= 0; value: 0 + -158/5 <= 0; value: -158/5 - -15*v0 + 63 <= 0; value: 0 0: 1 2 5 4 1: 3 2: 1 2 4 5 3: 1 3 0: 5 -> 21/5 1: 5 -> -67/5 2: 4 -> 8/5 3: 3 -> 33/5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -15 <= 0; value: -9 + 6*v0 -6*v2 + 1 <= 0; value: -5 + -5*v1 + 2*v3 -2 < 0; value: -7 + 4*v1 -5*v2 -6 < 0; value: -19 + -4*v0 -4*v1 + 28 = 0; value: 0 0: 2 5 1: 1 3 4 5 2: 2 4 3: 3 optimal: oo + -8/5*v3 + 78/5 < 0; value: 38/5 + 4/5*v3 -79/5 < 0; value: -59/5 - 6*v0 -6*v2 + 1 <= 0; value: 0 - 5*v2 + 2*v3 -227/6 < 0; value: -17/12 + 18/5*v3 -1363/30 < 0; value: -823/30 - -4*v0 -4*v1 + 28 = 0; value: 0 0: 2 5 3 1 4 1: 1 3 4 5 2: 2 4 3 1 3: 3 4 1 0: 4 -> 307/60 1: 3 -> 113/60 2: 5 -> 317/60 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + v1 -1 = 0; value: 0 + -3*v3 + 6 <= 0; value: 0 + -4*v0 -5*v2 -4 <= 0; value: -14 + 2*v0 -6*v1 -5*v3 + 3 <= 0; value: -13 + -2*v1 + 2 = 0; value: 0 0: 1 3 4 1: 1 4 5 2: 3 3: 2 4 optimal: -2 + -2 <= 0; value: -2 - -2*v0 + v1 -1 = 0; value: 0 + -3*v3 + 6 <= 0; value: 0 + -5*v2 -4 <= 0; value: -14 + -5*v3 -3 <= 0; value: -13 - -4*v0 = 0; value: 0 0: 1 3 4 5 1: 1 4 5 2: 3 3: 2 4 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v2 + 6 < 0; value: -2 + -1*v1 -1*v3 -1 <= 0; value: -5 + v1 + 3*v3 -19 <= 0; value: -7 + -5*v0 + 4*v2 -44 <= 0; value: -28 + -2*v1 + 6*v2 -24 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 4 5 3: 2 3 optimal: oo + 2*v0 + 22 <= 0; value: 22 + -116/3 < 0; value: -116/3 - -3*v2 -1*v3 + 11 <= 0; value: 0 - 2*v3 -20 <= 0; value: 0 + -5*v0 -128/3 <= 0; value: -128/3 - -2*v1 + 6*v2 -24 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 4 5 2 3 3: 2 3 1 4 0: 0 -> 0 1: 0 -> -11 2: 4 -> 1/3 3: 4 -> 10 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 -4*v2 -6*v3 -55 < 0; value: -113 + 6*v0 + 5*v1 -40 <= 0; value: -16 + 6*v0 -4*v3 -8 <= 0; value: -4 + 6*v1 -1*v3 -4 <= 0; value: -9 + -3*v1 + v3 -5 = 0; value: 0 0: 1 2 3 1: 2 4 5 2: 1 3: 1 3 4 5 optimal: 548/51 + + 548/51 <= 0; value: 548/51 + -4*v2 -5603/51 < 0; value: -6623/51 - 17/2*v0 -155/3 <= 0; value: 0 - 6*v0 -4*v3 -8 <= 0; value: 0 + -117/17 <= 0; value: -117/17 - -3*v1 + v3 -5 = 0; value: 0 0: 1 2 3 4 1: 2 4 5 2: 1 3: 1 3 4 5 2 0: 4 -> 310/51 1: 0 -> 12/17 2: 5 -> 5 3: 5 -> 121/17 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v2 + 4*v3 -34 = 0; value: 0 + 3*v0 + 2*v3 -49 <= 0; value: -30 + 2*v0 + 5*v1 -1*v2 -25 = 0; value: 0 + 4*v2 + 5*v3 -48 <= 0; value: -19 + v0 -6*v1 -5*v2 -7 <= 0; value: -33 0: 1 2 3 5 1: 3 5 2: 1 3 4 5 3: 1 2 4 optimal: 1628/17 + + 1628/17 <= 0; value: 1628/17 - 6*v0 -4*v2 + 4*v3 -34 = 0; value: 0 - 34/31*v0 -1362/31 <= 0; value: 0 - 2*v0 + 5*v1 -1*v2 -25 = 0; value: 0 + -2753/17 <= 0; value: -2753/17 - -59/10*v0 -31/5*v3 + 157/10 <= 0; value: 0 0: 1 2 3 5 4 1: 3 5 2: 1 3 4 5 3: 1 2 4 5 0: 3 -> 681/17 1: 4 -> -133/17 2: 1 -> 16 3: 5 -> -605/17 + 2*v0 -2*v1 <= 0; value: 10 + -6*v0 -3*v3 -9 <= 0; value: -42 + -2*v0 + 8 < 0; value: -2 + -5*v0 -5*v1 -2*v3 + 27 = 0; value: 0 + 6*v0 + v2 -60 < 0; value: -25 + 6*v0 + 3*v2 -85 <= 0; value: -40 0: 1 2 3 4 5 1: 3 2: 4 5 3: 1 3 optimal: oo + 4*v0 + 4/5*v3 -54/5 <= 0; value: 10 + -6*v0 -3*v3 -9 <= 0; value: -42 + -2*v0 + 8 < 0; value: -2 - -5*v0 -5*v1 -2*v3 + 27 = 0; value: 0 + 6*v0 + v2 -60 < 0; value: -25 + 6*v0 + 3*v2 -85 <= 0; value: -40 0: 1 2 3 4 5 1: 3 2: 4 5 3: 1 3 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -4*v3 -7 <= 0; value: -22 + <= 0; value: 0 + -1*v0 -4*v2 + 13 = 0; value: 0 + 6*v1 -5*v2 + 4*v3 -8 <= 0; value: -5 + -2*v1 -4*v2 + 18 = 0; value: 0 0: 3 1: 1 4 5 2: 3 4 5 3: 1 4 optimal: 80/7 + + 80/7 <= 0; value: 80/7 - -28/17*v3 -424/17 <= 0; value: 0 + <= 0; value: 0 - -1*v0 -4*v2 + 13 = 0; value: 0 - 17/4*v0 + 4*v3 -37/4 <= 0; value: 0 - -2*v1 -4*v2 + 18 = 0; value: 0 0: 3 1 4 1: 1 4 5 2: 3 4 5 1 3: 1 4 0: 1 -> 115/7 1: 3 -> 75/7 2: 3 -> -6/7 3: 0 -> -106/7 + 2*v0 -2*v1 <= 0; value: -8 + v0 -4*v2 -5*v3 -15 <= 0; value: -39 + 5*v2 + 2*v3 -67 <= 0; value: -40 + 5*v0 -1*v1 + 2*v3 -2 <= 0; value: 0 + -6*v0 -4*v1 + 26 = 0; value: 0 + -1*v1 -6*v2 -6*v3 + 38 < 0; value: -3 0: 1 3 4 1: 3 4 5 2: 1 2 5 3: 1 2 3 5 optimal: (249/22 -e*1) + + 249/22 < 0; value: 249/22 + -2151/88 <= 0; value: -2151/88 - 22/7*v2 -793/14 < 0; value: -22/7 - 5*v0 -1*v1 + 2*v3 -2 <= 0; value: 0 - -26*v0 -8*v3 + 34 = 0; value: 0 - 21*v0 -6*v2 + 6 < 0; value: -21 0: 1 3 4 5 2 1: 3 4 5 2: 1 2 5 3: 1 2 3 5 4 0: 1 -> 551/154 1: 5 -> 349/308 2: 5 -> 749/44 3: 1 -> -4545/616 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -5*v1 -1 < 0; value: -11 + 2*v2 -13 <= 0; value: -3 + 5*v0 + 3*v2 -21 <= 0; value: -6 + 6*v3 -41 <= 0; value: -11 + -2*v1 <= 0; value: -4 0: 1 3 1: 1 5 2: 2 3 3: 4 optimal: oo + -6/5*v2 + 42/5 <= 0; value: 12/5 + 6/5*v2 -47/5 < 0; value: -17/5 + 2*v2 -13 <= 0; value: -3 - 5*v0 + 3*v2 -21 <= 0; value: 0 + 6*v3 -41 <= 0; value: -11 - -2*v1 <= 0; value: 0 0: 1 3 1: 1 5 2: 2 3 1 3: 4 0: 0 -> 6/5 1: 2 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 3*v2 + 3 < 0; value: -1 + 2*v0 + 3*v3 -2 <= 0; value: 0 + 4*v3 <= 0; value: 0 + v0 -3*v2 -1 <= 0; value: 0 + 3*v1 -26 < 0; value: -14 0: 1 2 4 1: 5 2: 1 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 3*v2 + 3 < 0; value: -1 + 2*v0 + 3*v3 -2 <= 0; value: 0 + 4*v3 <= 0; value: 0 + v0 -3*v2 -1 <= 0; value: 0 + 3*v1 -26 < 0; value: -14 0: 1 2 4 1: 5 2: 1 4 3: 2 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 -1*v3 -1 <= 0; value: -4 + 5*v1 + 2*v2 -47 < 0; value: -16 + 2*v0 -6*v1 + 24 = 0; value: 0 + 2*v0 + v1 -22 <= 0; value: -11 + -5*v1 + 3*v3 + 2 <= 0; value: -23 0: 1 3 4 1: 2 3 4 5 2: 2 3: 1 5 optimal: 16/7 + + 16/7 <= 0; value: 16/7 + -1*v3 -61/7 <= 0; value: -61/7 + 2*v2 -99/7 < 0; value: -57/7 - 2*v0 -6*v1 + 24 = 0; value: 0 - 7/3*v0 -18 <= 0; value: 0 + 3*v3 -216/7 <= 0; value: -216/7 0: 1 3 4 5 2 1: 2 3 4 5 2: 2 3: 1 5 0: 3 -> 54/7 1: 5 -> 46/7 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -2*v2 + v3 + 4 <= 0; value: -3 + 5*v1 -15 = 0; value: 0 + -5*v0 + v3 -6 < 0; value: -15 + 6*v1 + 4*v3 -22 = 0; value: 0 + 5*v2 -36 <= 0; value: -16 0: 3 1: 2 4 2: 1 5 3: 1 3 4 optimal: oo + 2*v0 -6 <= 0; value: -2 + -2*v2 + v3 + 4 <= 0; value: -3 - 5*v1 -15 = 0; value: 0 + -5*v0 + v3 -6 < 0; value: -15 + 4*v3 -4 = 0; value: 0 + 5*v2 -36 <= 0; value: -16 0: 3 1: 2 4 2: 1 5 3: 1 3 4 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + v1 = 0; value: 0 + -6*v0 -3*v2 + 21 = 0; value: 0 + 2*v0 + v2 -7 <= 0; value: 0 + v0 -3*v2 -4*v3 + 15 < 0; value: -3 + -2*v0 + 5*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 1 5 2: 2 3 4 3: 4 optimal: 2 + + 2 <= 0; value: 2 - v1 = 0; value: 0 - -6*v0 -3*v2 + 21 = 0; value: 0 + <= 0; value: 0 + -4*v3 + 1 < 0; value: -3 - v2 -5 = 0; value: 0 0: 2 3 4 5 1: 1 5 2: 2 3 4 5 3: 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 5*v1 + 10 = 0; value: 0 + -4*v2 -4*v3 + 12 <= 0; value: 0 + -2*v0 + 2*v2 + 3*v3 <= 0; value: -2 + 3*v0 -6*v1 -5*v2 + 7 <= 0; value: -1 + 2*v2 + 6*v3 -26 <= 0; value: -12 0: 1 3 4 1: 1 4 2: 2 3 4 5 3: 2 3 5 optimal: 4 + + 4 <= 0; value: 4 - -5*v0 + 5*v1 + 10 = 0; value: 0 + -4*v2 -4*v3 + 12 <= 0; value: 0 + -2*v0 + 2*v2 + 3*v3 <= 0; value: -2 + -3*v0 -5*v2 + 19 <= 0; value: -1 + 2*v2 + 6*v3 -26 <= 0; value: -12 0: 1 3 4 1: 1 4 2: 2 3 4 5 3: 2 3 5 0: 5 -> 5 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v2 + 3*v3 -25 <= 0; value: -15 + 2*v1 -12 <= 0; value: -6 + 6*v0 -1*v2 -11 = 0; value: 0 + v1 -2*v2 -2 <= 0; value: -1 + -2*v1 -3*v2 + 5 <= 0; value: -4 0: 1 3 1: 2 4 5 2: 1 3 4 5 3: 1 optimal: oo + 20*v0 -38 <= 0; value: 2 + -13*v0 + 3*v3 + 8 <= 0; value: -15 + -18*v0 + 26 <= 0; value: -10 - 6*v0 -1*v2 -11 = 0; value: 0 + -21*v0 + 39 <= 0; value: -3 - -2*v1 -3*v2 + 5 <= 0; value: 0 0: 1 3 4 2 1: 2 4 5 2: 1 3 4 5 2 3: 1 0: 2 -> 2 1: 3 -> 1 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 10 + v0 -1*v1 + 6*v3 -11 = 0; value: 0 + v1 -5*v2 -5*v3 + 11 < 0; value: -4 + 3*v1 <= 0; value: 0 + -3*v0 -2*v2 + 19 = 0; value: 0 + 2*v1 -4*v2 -2 < 0; value: -10 0: 1 4 1: 1 2 3 5 2: 2 4 5 3: 1 2 optimal: oo + -12*v3 + 22 <= 0; value: 10 - v0 -1*v1 + 6*v3 -11 = 0; value: 0 + v0 -5*v2 + v3 < 0; value: -4 + 3*v0 + 18*v3 -33 <= 0; value: 0 + -3*v0 -2*v2 + 19 = 0; value: 0 + 2*v0 -4*v2 + 12*v3 -24 < 0; value: -10 0: 1 4 2 3 5 1: 1 2 3 5 2: 2 4 5 3: 1 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -10 + 3*v1 -15 = 0; value: 0 + -3*v0 -2*v2 + 8 = 0; value: 0 + 2*v0 + v1 -13 < 0; value: -8 + -4*v0 + 3*v3 -3 = 0; value: 0 + -2*v0 + 2*v2 -3*v3 -12 <= 0; value: -7 0: 2 3 4 5 1: 1 3 2: 2 5 3: 4 5 optimal: (-2 -e*1) + -2 < 0; value: -2 - 3*v1 -15 = 0; value: 0 - -3*v0 -2*v2 + 8 = 0; value: 0 - 3/2*v3 -19/2 < 0; value: -3/2 - 8/3*v2 + 3*v3 -41/3 = 0; value: 0 + -43 < 0; value: -43 0: 2 3 4 5 1: 1 3 2: 2 5 3 4 3: 4 5 3 0: 0 -> 13/4 1: 5 -> 5 2: 4 -> -7/8 3: 1 -> 16/3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 5*v2 + 6*v3 -105 <= 0; value: -64 + 5*v2 -3*v3 + 4 <= 0; value: 0 + 6*v0 + 6*v1 -5*v2 -25 = 0; value: 0 + 6*v0 -2*v3 -23 <= 0; value: -11 + -1*v2 + 4*v3 -24 < 0; value: -13 0: 1 3 4 1: 3 2: 1 2 3 5 3: 1 2 4 5 optimal: oo + -16*v0 + 325/3 < 0; value: 181/3 + 84*v0 -524 < 0; value: -272 + 51*v0 -623/2 < 0; value: -317/2 - 6*v0 + 6*v1 -5*v2 -25 = 0; value: 0 - 6*v0 -2*v3 -23 <= 0; value: 0 - -1*v2 + 4*v3 -24 < 0; value: -1 0: 1 3 4 2 1: 3 2: 1 2 3 5 3: 1 2 4 5 0: 3 -> 3 1: 2 -> -79/3 2: 1 -> -33 3: 3 -> -5/2 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 -1*v2 -1*v3 <= 0; value: -8 + 3*v0 -4*v1 + 5*v2 -21 <= 0; value: -7 + -3*v0 -3*v1 + v2 <= 0; value: -3 + 5*v1 + 2*v2 + 2*v3 -40 <= 0; value: -21 + -5*v0 -4*v1 -3*v2 -17 <= 0; value: -35 0: 2 3 5 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 optimal: 53/2 + + 53/2 <= 0; value: 53/2 - v0 -4/3*v2 -1*v3 <= 0; value: 0 - 80/13*v0 -460/13 <= 0; value: 0 - -3*v0 -3*v1 + v2 <= 0; value: 0 + -125/2 <= 0; value: -125/2 - -17/4*v0 + 13/4*v3 -17 <= 0; value: 0 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 5 2 0: 1 -> 23/4 1: 1 -> -15/2 2: 3 -> -21/4 3: 4 -> 51/4 + 2*v0 -2*v1 <= 0; value: -10 + 2*v0 + 3*v1 -3*v2 -7 < 0; value: -1 + 6*v0 + 5*v2 -26 <= 0; value: -11 + 4*v0 + v3 <= 0; value: 0 + -4*v1 + v3 + 20 = 0; value: 0 + 2*v1 + v3 -22 <= 0; value: -12 0: 1 2 3 1: 1 4 5 2: 1 2 3: 3 4 5 optimal: oo + 2*v0 -1/2*v3 -10 <= 0; value: -10 + 2*v0 -3*v2 + 3/4*v3 + 8 < 0; value: -1 + 6*v0 + 5*v2 -26 <= 0; value: -11 + 4*v0 + v3 <= 0; value: 0 - -4*v1 + v3 + 20 = 0; value: 0 + 3/2*v3 -12 <= 0; value: -12 0: 1 2 3 1: 1 4 5 2: 1 2 3: 3 4 5 1 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v2 <= 0; value: 0 + = 0; value: 0 + 6*v0 -50 <= 0; value: -26 + -4*v0 + v1 + 1 <= 0; value: -12 + -3*v0 + 6*v2 -10 <= 0; value: -4 0: 3 4 5 1: 1 4 2: 1 5 3: optimal: oo + 2*v0 -2*v2 <= 0; value: 2 - -3*v1 + 3*v2 <= 0; value: 0 + = 0; value: 0 + 6*v0 -50 <= 0; value: -26 + -4*v0 + v2 + 1 <= 0; value: -12 + -3*v0 + 6*v2 -10 <= 0; value: -4 0: 3 4 5 1: 1 4 2: 1 5 4 3: 0: 4 -> 4 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -5*v2 <= 0; value: 0 + -5*v0 + v3 -21 <= 0; value: -46 + -5*v1 -1*v2 -2*v3 + 5 <= 0; value: -10 + -2*v1 -4*v2 + 6 = 0; value: 0 + -6*v0 -4*v1 + 2*v2 + 7 <= 0; value: -35 0: 2 5 1: 3 4 5 2: 1 3 4 5 3: 2 3 optimal: oo + 22/5*v0 -4 <= 0; value: 18 + -3*v0 -5/2 <= 0; value: -35/2 + -23/10*v0 -95/4 <= 0; value: -141/4 - 9*v2 -2*v3 -10 <= 0; value: 0 - -2*v1 -4*v2 + 6 = 0; value: 0 - -6*v0 + 20/9*v3 + 55/9 <= 0; value: 0 0: 2 5 1 1: 3 4 5 2: 1 3 4 5 3: 2 3 5 1 0: 5 -> 5 1: 3 -> -4 2: 0 -> 7/2 3: 0 -> 43/4 + 2*v0 -2*v1 <= 0; value: 8 + 3*v1 + 6*v2 -40 <= 0; value: -16 + -1*v0 + 4*v2 -12 = 0; value: 0 + -2*v1 -5*v2 -2*v3 + 20 <= 0; value: -4 + -6*v0 -3 <= 0; value: -27 + 4*v0 + 2*v3 -53 < 0; value: -33 0: 2 4 5 1: 1 3 2: 1 2 3 3: 3 5 optimal: (387/8 -e*1) + + 387/8 < 0; value: 387/8 + -1549/16 < 0; value: -1549/16 - -1*v0 + 4*v2 -12 = 0; value: 0 - -2*v1 -5*v2 -2*v3 + 20 <= 0; value: 0 - -6*v0 -3 <= 0; value: 0 - 4*v0 + 2*v3 -53 < 0; value: -2 0: 2 4 5 1 1: 1 3 2: 1 2 3 3: 3 5 1 0: 4 -> -1/2 1: 0 -> -379/16 2: 4 -> 23/8 3: 2 -> 53/2 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -3*v3 + 19 < 0; value: -17 + 3*v0 -6*v2 -6 <= 0; value: -21 + 4*v1 + 4*v3 -45 <= 0; value: -17 + -5*v1 -2*v3 -11 < 0; value: -40 + -3*v0 + 2*v2 + 5 = 0; value: 0 0: 1 2 5 1: 3 4 2: 2 5 3: 1 3 4 optimal: oo + 4/3*v2 + 77/3 < 0; value: 97/3 + -4*v2 -233/4 < 0; value: -313/4 + -4*v2 -1 <= 0; value: -21 - 12/5*v3 -269/5 < 0; value: -12/5 - -5*v1 -2*v3 -11 < 0; value: -5 - -3*v0 + 2*v2 + 5 = 0; value: 0 0: 1 2 5 1: 3 4 2: 2 5 1 3: 1 3 4 0: 5 -> 5 1: 5 -> -293/30 2: 5 -> 5 3: 2 -> 257/12 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -6*v2 + 3 < 0; value: -5 + -4*v1 + 6*v2 -2*v3 -6 = 0; value: 0 + 5*v0 + v3 -8 <= 0; value: -2 + -5*v2 -3*v3 + 13 = 0; value: 0 + -4*v0 -2*v3 + 6 = 0; value: 0 0: 1 3 5 1: 2 2: 1 2 4 3: 2 3 4 5 optimal: (45/8 -e*1) + + 45/8 < 0; value: 45/8 - -16/5*v0 -9/5 < 0; value: -5/2 - -4*v1 + 6*v2 -2*v3 -6 = 0; value: 0 + -107/16 < 0; value: -107/16 - -5*v2 -3*v3 + 13 = 0; value: 0 - -4*v0 + 10/3*v2 -8/3 = 0; value: 0 0: 1 3 5 1: 2 2: 1 2 4 3 5 3: 2 3 4 5 0: 1 -> 7/32 1: 1 -> -19/16 2: 2 -> 17/16 3: 1 -> 41/16 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v3 -67 <= 0; value: -35 + -5*v0 + v2 + 19 = 0; value: 0 + -1*v0 + 1 < 0; value: -3 + 3*v0 + v1 + 4*v3 -67 <= 0; value: -39 + 5*v1 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v3 -67 <= 0; value: -35 + -5*v0 + v2 + 19 = 0; value: 0 + -1*v0 + 1 < 0; value: -3 + 3*v0 + v1 + 4*v3 -67 <= 0; value: -39 + 5*v1 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3: 1 4 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 <= 0; value: 0 + 5*v1 -6*v3 + 11 <= 0; value: -7 + 2*v0 -3*v1 + 3*v2 -4 = 0; value: 0 + 3*v2 + 2*v3 -14 <= 0; value: -8 + 3*v0 -4*v1 -4*v2 -6 = 0; value: 0 0: 3 5 1: 1 2 3 5 2: 3 4 5 3: 2 4 optimal: 4 + + 4 <= 0; value: 4 - 17/8*v0 -17/4 <= 0; value: 0 + -6*v3 + 11 <= 0; value: -7 - 2*v0 -3*v1 + 3*v2 -4 = 0; value: 0 + 2*v3 -14 <= 0; value: -8 - 1/3*v0 -8*v2 -2/3 = 0; value: 0 0: 3 5 1 2 4 1: 1 2 3 5 2: 3 4 5 1 2 3: 2 4 0: 2 -> 2 1: 0 -> 0 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v3 -31 <= 0; value: -19 + v0 + 2*v3 -15 <= 0; value: -7 + -4*v0 + 3*v2 <= 0; value: -4 + v1 + v2 -19 < 0; value: -12 + -3*v2 + 4*v3 -3 <= 0; value: -7 0: 2 3 1: 4 2: 3 4 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v3 -31 <= 0; value: -19 + v0 + 2*v3 -15 <= 0; value: -7 + -4*v0 + 3*v2 <= 0; value: -4 + v1 + v2 -19 < 0; value: -12 + -3*v2 + 4*v3 -3 <= 0; value: -7 0: 2 3 1: 4 2: 3 4 5 3: 1 2 5 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 -5*v2 -16 <= 0; value: -66 + -4*v3 + 8 = 0; value: 0 + -2*v0 + 4*v2 -14 < 0; value: -4 + -5*v1 -2*v2 + 7 <= 0; value: -13 + -2*v2 -5 <= 0; value: -15 0: 1 3 1: 4 2: 1 3 4 5 3: 2 optimal: oo + 12/5*v0 < 0; value: 12 + -15/2*v0 -67/2 < 0; value: -71 + -4*v3 + 8 = 0; value: 0 - -2*v0 + 4*v2 -14 < 0; value: -2 - -5*v1 -2*v2 + 7 <= 0; value: 0 + -1*v0 -12 < 0; value: -17 0: 1 3 5 1: 4 2: 1 3 4 5 3: 2 0: 5 -> 5 1: 2 -> -4/5 2: 5 -> 11/2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + 6*v3 -7 < 0; value: -1 + -2*v3 -1 <= 0; value: -3 + 4*v1 + 3*v3 -37 < 0; value: -18 + 6*v0 -3*v1 -4*v3 + 8 <= 0; value: -8 + -5*v0 -6*v2 + 5*v3 + 12 <= 0; value: -1 0: 1 4 5 1: 3 4 2: 5 3: 1 2 3 4 5 optimal: (-5/3 -e*1) + -5/3 < 0; value: -5/3 - -4*v0 + 6*v3 -7 < 0; value: -21/10 - 24/5*v2 -88/5 < 0; value: -8/5 + -271/6 < 0; value: -271/6 - 6*v0 -3*v1 -4*v3 + 8 <= 0; value: 0 - -5/3*v0 -6*v2 + 107/6 <= 0; value: 0 0: 1 4 5 3 2 1: 3 4 2: 5 2 3 3: 1 2 3 4 5 0: 0 -> -13/10 1: 4 -> 2/15 2: 3 -> 10/3 3: 1 -> -1/20 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 5*v2 -1*v3 -18 = 0; value: 0 + 3*v2 -12 = 0; value: 0 + -3*v0 + 2 <= 0; value: -1 + -4*v2 + 16 = 0; value: 0 + -5*v1 + 6*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 4 5 3: 1 5 optimal: oo + 28/5*v0 -38/5 <= 0; value: -2 - 3*v0 + 5*v2 -1*v3 -18 = 0; value: 0 - 3*v2 -12 = 0; value: 0 + -3*v0 + 2 <= 0; value: -1 + = 0; value: 0 - -5*v1 + 6*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 4 5 3: 1 5 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -2*v0 + 3*v3 -22 <= 0; value: -14 + 6*v0 + 3*v3 -56 <= 0; value: -32 + 6*v0 + 3*v2 -37 < 0; value: -13 + -6*v0 -4*v1 -4*v2 -11 <= 0; value: -39 + 2*v0 + 6*v2 -28 <= 0; value: 0 0: 1 2 3 4 5 1: 4 2: 3 4 5 3: 1 2 optimal: (1043/30 -e*1) + + 1043/30 < 0; value: 1043/30 + 3*v3 -156/5 < 0; value: -96/5 + 3*v3 -142/5 <= 0; value: -82/5 - 5*v0 -23 < 0; value: -5 - -6*v0 -4*v1 -4*v2 -11 <= 0; value: 0 - 2*v0 + 6*v2 -28 <= 0; value: 0 0: 1 2 3 4 5 1: 4 2: 3 4 5 3: 1 2 0: 2 -> 18/5 1: 0 -> -697/60 2: 4 -> 52/15 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + v0 -5*v2 + 25 = 0; value: 0 + 2*v1 + 5*v2 -35 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + -5*v0 -1*v3 <= 0; value: -2 + -4*v1 + 20 = 0; value: 0 0: 1 4 1: 2 5 2: 1 2 3: 3 4 optimal: -10 + -10 <= 0; value: -10 - v0 -5*v2 + 25 = 0; value: 0 - 2*v1 + 5*v2 -35 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + -1*v3 <= 0; value: -2 - 2*v0 = 0; value: 0 0: 1 4 5 1: 2 5 2: 1 2 5 3: 3 4 0: 0 -> 0 1: 5 -> 5 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -6*v2 -12 <= 0; value: 0 + v1 + 5*v2 -17 = 0; value: 0 + -5*v1 + 6*v3 -42 <= 0; value: -22 + -1*v1 + 6*v2 -22 <= 0; value: -6 + -3*v0 -3*v1 -3*v3 + 4 <= 0; value: -32 0: 1 5 1: 2 3 4 5 2: 1 2 4 3: 3 5 optimal: 138/11 + + 138/11 <= 0; value: 138/11 - 6*v0 -366/11 <= 0; value: 0 - v1 + 5*v2 -17 = 0; value: 0 + 6*v3 -422/11 <= 0; value: -92/11 - 11*v2 -39 <= 0; value: 0 + -3*v3 -115/11 <= 0; value: -280/11 0: 1 5 1: 2 3 4 5 2: 1 2 4 3 5 3: 3 5 0: 5 -> 61/11 1: 2 -> -8/11 2: 3 -> 39/11 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 + v1 -1*v3 + 21 = 0; value: 0 + v0 + v1 -6 = 0; value: 0 + 4*v0 -5*v1 -5*v2 -15 = 0; value: 0 + 5*v0 + 4*v1 -31 < 0; value: -2 + -3*v0 + 3*v1 -6*v2 + 1 <= 0; value: -11 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 3 5 3: 1 optimal: (16 -e*1) + + 16 < 0; value: 16 - -4*v0 + v1 -1*v3 + 21 = 0; value: 0 - 5*v0 + v3 -27 = 0; value: 0 - 9*v0 -5*v2 -45 = 0; value: 0 - 5/9*v2 -2 < 0; value: -5/9 + -223/5 < 0; value: -223/5 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 3 5 4 3: 1 2 3 4 5 0: 5 -> 58/9 1: 1 -> -4/9 2: 0 -> 13/5 3: 2 -> -47/9 + 2*v0 -2*v1 <= 0; value: 2 + -2*v1 -1*v3 + 6 = 0; value: 0 + 4*v3 -8 = 0; value: 0 + -2*v0 + 3*v2 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 0: 3 1: 1 2: 3 3: 1 2 optimal: oo + 2*v0 -4 <= 0; value: 2 - -2*v1 -1*v3 + 6 = 0; value: 0 - 4*v3 -8 = 0; value: 0 + -2*v0 + 3*v2 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 0: 3 1: 1 2: 3 3: 1 2 0: 3 -> 3 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 6*v2 -7 < 0; value: -1 + 2*v1 -7 <= 0; value: -3 + 3*v2 -3*v3 + 3 = 0; value: 0 + -2*v0 + 6*v3 -12 = 0; value: 0 + -5*v0 + 2*v1 -4 = 0; value: 0 0: 1 4 5 1: 2 5 2: 1 3 3: 3 4 optimal: oo + -9*v2 + 5 <= 0; value: -4 + 9*v2 -10 < 0; value: -1 + 15*v2 -18 <= 0; value: -3 - 3*v2 -3*v3 + 3 = 0; value: 0 - -2*v0 + 6*v3 -12 = 0; value: 0 - -5*v0 + 2*v1 -4 = 0; value: 0 0: 1 4 5 2 1: 2 5 2: 1 3 2 3: 3 4 1 2 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + v1 + 3*v3 -55 <= 0; value: -14 + -6*v0 + 3*v1 -1*v2 + 16 < 0; value: -3 + -6*v0 -1*v1 -5*v2 + 25 < 0; value: -6 + -4*v1 + 8 = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 2 3 3: 1 optimal: oo + -1*v3 + 41/3 <= 0; value: 26/3 - 6*v0 + 3*v3 -53 <= 0; value: 0 + -1*v2 + 3*v3 -31 < 0; value: -17 + -5*v2 + 3*v3 -30 < 0; value: -20 - -4*v1 + 8 = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 2 3 3: 1 2 3 0: 4 -> 19/3 1: 2 -> 2 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -5*v2 + 10 <= 0; value: 0 + 4*v0 -6*v1 + 6*v2 -7 < 0; value: -1 + -6*v0 -2*v1 -1*v2 + 1 < 0; value: -3 + 4*v2 -2*v3 -4 = 0; value: 0 + -2*v0 -3*v3 -1 <= 0; value: -7 0: 2 3 5 1: 2 3 2: 1 2 3 4 3: 4 5 optimal: oo + 2/3*v0 -5/3 < 0; value: -5/3 - -5*v2 + 10 <= 0; value: 0 - 4*v0 -6*v1 + 6*v2 -7 < 0; value: -1/2 + -22/3*v0 -8/3 <= 0; value: -8/3 + -2*v3 + 4 = 0; value: 0 + -2*v0 -3*v3 -1 <= 0; value: -7 0: 2 3 5 1: 2 3 2: 1 2 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 11/12 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v1 + 2*v2 -4 < 0; value: -1 + -5*v1 -4*v2 + 14 <= 0; value: -7 + 6*v1 + v2 -19 < 0; value: -9 + -2*v0 -1*v1 + 5*v3 -19 < 0; value: -10 + -5*v0 + v3 -4 < 0; value: -2 0: 4 5 1: 1 2 3 4 2: 1 2 3 3: 4 5 optimal: oo + 2*v0 -4/5 < 0; value: -4/5 - -5*v1 + 2*v2 -4 < 0; value: -3/2 - -6*v2 + 18 <= 0; value: 0 + -68/5 < 0; value: -68/5 + -2*v0 + 5*v3 -97/5 <= 0; value: -47/5 + -5*v0 + v3 -4 < 0; value: -2 0: 4 5 1: 1 2 3 4 2: 1 2 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 7/10 2: 4 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 <= 0; value: 0 + 3*v0 + 6*v3 -58 <= 0; value: -31 + 5*v1 + 2*v2 -6*v3 -8 = 0; value: 0 + 5*v0 + 5*v1 + 4*v2 -72 < 0; value: -27 + 5*v0 -4*v1 -14 < 0; value: -5 0: 2 4 5 1: 3 4 5 2: 1 3 4 3: 2 3 optimal: oo + -1/2*v0 + 7 < 0; value: 9/2 + 5*v2 <= 0; value: 0 + 37/4*v0 + 2*v2 -167/2 < 0; value: -149/4 - 5*v1 + 2*v2 -6*v3 -8 = 0; value: 0 + 45/4*v0 + 4*v2 -179/2 < 0; value: -133/4 - 5*v0 + 8/5*v2 -24/5*v3 -102/5 < 0; value: -5/2 0: 2 4 5 1: 3 4 5 2: 1 3 4 5 2 3: 2 3 5 4 0: 5 -> 5 1: 4 -> 27/8 2: 0 -> 0 3: 2 -> 71/48 + 2*v0 -2*v1 <= 0; value: -4 + 2*v1 + 5*v3 -75 <= 0; value: -40 + -6*v0 -1*v1 -2*v3 -24 <= 0; value: -57 + -3*v0 -5*v1 -4*v3 -46 <= 0; value: -100 + 3*v0 -3*v1 -2 < 0; value: -8 + -6*v0 -6*v2 + 36 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 2: 5 3: 1 2 3 optimal: (4/3 -e*1) + + 4/3 < 0; value: 4/3 + 2*v0 + 5*v3 -229/3 < 0; value: -136/3 + -7*v0 -2*v3 -70/3 <= 0; value: -163/3 + -8*v0 -4*v3 -128/3 <= 0; value: -260/3 - 3*v0 -3*v1 -2 < 0; value: -3 + -6*v0 -6*v2 + 36 = 0; value: 0 0: 2 3 4 5 1 1: 1 2 3 4 2: 5 3: 1 2 3 0: 3 -> 3 1: 5 -> 10/3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -3*v3 + 4 <= 0; value: -2 + -4*v0 + 5*v2 = 0; value: 0 + 5*v0 <= 0; value: 0 + -3*v1 + 3*v2 + 4*v3 + 2 < 0; value: -2 + v0 -6*v2 = 0; value: 0 0: 1 2 3 5 1: 4 2: 2 4 5 3: 1 4 optimal: (-44/9 -e*1) + -44/9 < 0; value: -44/9 - -6*v0 -3*v3 + 4 <= 0; value: 0 - -4*v0 + 5*v2 = 0; value: 0 - 5*v0 <= 0; value: 0 - -3*v1 + 3*v2 + 4*v3 + 2 < 0; value: -7/3 + = 0; value: 0 0: 1 2 3 5 1: 4 2: 2 4 5 3: 1 4 0: 0 -> 0 1: 4 -> 29/9 2: 0 -> 0 3: 2 -> 4/3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 6*v3 <= 0; value: 0 + -5*v0 + 4*v1 + 5 = 0; value: 0 + <= 0; value: 0 + v0 -2*v2 -1 = 0; value: 0 + 2*v1 -1*v3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 4 3: 1 5 optimal: 2 + + 2 <= 0; value: 2 - -3*v1 + 6*v3 <= 0; value: 0 - -5*v0 + 5 = 0; value: 0 + <= 0; value: 0 + -2*v2 = 0; value: 0 - 3*v3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 4 3: 1 5 2 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -4*v3 <= 0; value: 0 + -2*v0 + 6*v2 -24 <= 0; value: 0 + 2*v0 + 4*v2 -37 <= 0; value: -21 + -6*v1 + 4*v2 -1*v3 -16 = 0; value: 0 + v0 -3*v1 <= 0; value: 0 0: 2 3 5 1: 4 5 2: 2 3 4 3: 1 4 optimal: 0 + <= 0; value: 0 - 8*v0 -16*v2 + 64 <= 0; value: 0 - 2*v2 -8 <= 0; value: 0 + -21 <= 0; value: -21 - -6*v1 + 4*v2 -1*v3 -16 = 0; value: 0 - v0 -2*v2 + 1/2*v3 + 8 <= 0; value: 0 0: 2 3 5 1 1: 4 5 2: 2 3 4 5 1 3: 1 4 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -5*v3 + 20 = 0; value: 0 + 4*v0 -6*v1 + 2*v3 -69 <= 0; value: -45 + v2 -6*v3 + 19 = 0; value: 0 + -1*v0 + v1 -2*v2 -13 <= 0; value: -27 + 6*v1 -5*v2 -4*v3 -29 <= 0; value: -70 0: 2 4 1: 2 4 5 2: 3 4 5 3: 1 2 3 5 optimal: 253/6 + + 253/6 <= 0; value: 253/6 - -5*v3 + 20 = 0; value: 0 - 4*v0 -6*v1 + 2*v3 -69 <= 0; value: 0 - v2 -5 = 0; value: 0 + -529/12 <= 0; value: -529/12 - 4*v0 -5*v2 -106 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 3 4 5 3: 1 2 3 5 4 0: 4 -> 131/4 1: 0 -> 35/3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -1*v3 -26 < 0; value: -14 + 3*v2 -33 <= 0; value: -18 + -4*v0 -1*v2 + 3*v3 -8 <= 0; value: -4 + 5*v0 -2*v2 + 8 <= 0; value: -2 + 3*v1 + 5*v2 -2*v3 -57 < 0; value: -23 0: 3 4 1: 5 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -1*v3 -26 < 0; value: -14 + 3*v2 -33 <= 0; value: -18 + -4*v0 -1*v2 + 3*v3 -8 <= 0; value: -4 + 5*v0 -2*v2 + 8 <= 0; value: -2 + 3*v1 + 5*v2 -2*v3 -57 < 0; value: -23 0: 3 4 1: 5 2: 1 2 3 4 5 3: 1 3 5 0: 0 -> 0 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 4 <= 0; value: -2 + 4*v1 -31 <= 0; value: -19 + -6*v2 -2*v3 + 16 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: -2 + -1*v2 + 2 <= 0; value: 0 0: 1: 1 2 2: 3 4 5 3: 3 4 optimal: oo + 2*v0 -4 <= 0; value: 0 - -2*v1 + 4 <= 0; value: 0 + -23 <= 0; value: -23 + -6*v2 -2*v3 + 16 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: -2 + -1*v2 + 2 <= 0; value: 0 0: 1: 1 2 2: 3 4 5 3: 3 4 0: 2 -> 2 1: 3 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 + 2*v2 + 6*v3 -36 <= 0; value: -11 + 4*v2 -2*v3 <= 0; value: 0 + -3*v1 + 5*v2 -1 <= 0; value: 0 + -3*v1 -1*v2 <= 0; value: -11 + -4*v0 + 8 = 0; value: 0 0: 5 1: 1 3 4 2: 1 2 3 4 3: 1 2 optimal: 37/9 + + 37/9 <= 0; value: 37/9 + 6*v3 -641/18 <= 0; value: -209/18 + -2*v3 + 2/3 <= 0; value: -22/3 - -3*v1 + 5*v2 -1 <= 0; value: 0 - -6*v2 + 1 <= 0; value: 0 - -4*v0 + 8 = 0; value: 0 0: 5 1: 1 3 4 2: 1 2 3 4 3: 1 2 0: 2 -> 2 1: 3 -> -1/18 2: 2 -> 1/6 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -1*v1 + 4*v3 -4 = 0; value: 0 + -3*v0 -1*v3 + 4 < 0; value: -4 + 2*v1 -2*v2 -9 <= 0; value: -5 + -3*v0 + 4 <= 0; value: -2 + -1*v1 + 4*v3 -8 <= 0; value: -4 0: 2 4 1: 1 3 5 2: 3 3: 1 2 5 optimal: oo + 26*v0 -24 < 0; value: 28 - -1*v1 + 4*v3 -4 = 0; value: 0 - -3*v0 -1*v3 + 4 < 0; value: -1 + -24*v0 -2*v2 + 15 < 0; value: -37 + -3*v0 + 4 <= 0; value: -2 + -4 <= 0; value: -4 0: 2 4 3 1: 1 3 5 2: 3 3: 1 2 5 3 0: 2 -> 2 1: 4 -> -8 2: 2 -> 2 3: 2 -> -1 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -4*v1 + 5*v2 -5 < 0; value: -1 + 3*v0 + v1 + 2*v3 -51 <= 0; value: -30 + -4*v0 -4*v3 + 28 = 0; value: 0 + 4*v0 + 2*v2 -16 = 0; value: 0 + -1*v1 -2*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 3: 2 3 5 optimal: (-47/8 -e*1) + -47/8 < 0; value: -47/8 - 8*v2 -33 < 0; value: -1/2 + -483/16 < 0; value: -483/16 - -4*v0 -4*v3 + 28 = 0; value: 0 - 4*v0 + 2*v2 -16 = 0; value: 0 - -1*v1 -2*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 2 3: 2 3 5 1 0: 2 -> 63/32 1: 5 -> 79/16 2: 4 -> 65/16 3: 5 -> 161/32 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v1 + 4*v3 + 2 = 0; value: 0 + 2*v0 -8 = 0; value: 0 + -3*v1 -6*v2 -4*v3 -2 < 0; value: -17 + -2*v1 + 3 < 0; value: -3 + 6*v0 -2*v1 + 6*v2 -50 <= 0; value: -26 0: 1 2 5 1: 1 3 4 5 2: 3 5 3: 1 3 optimal: (5 -e*1) + + 5 < 0; value: 5 - 4*v0 -6*v1 + 4*v3 + 2 = 0; value: 0 - 2*v0 -8 = 0; value: 0 + -6*v2 + 5/2 <= 0; value: -7/2 - -4/3*v0 -4/3*v3 + 7/3 < 0; value: -4/3 + 6*v2 -29 <= 0; value: -23 0: 1 2 5 3 4 1: 1 3 4 5 2: 3 5 3: 1 3 4 5 0: 4 -> 4 1: 3 -> 13/6 2: 1 -> 1 3: 0 -> -5/4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v2 -2*v3 + 17 <= 0; value: -11 + 3*v0 + 5*v2 -36 <= 0; value: -13 + v1 -3*v2 -5 <= 0; value: -15 + -3*v0 + 3*v1 -6*v3 + 27 <= 0; value: 0 + 6*v0 + 6*v1 -21 <= 0; value: -3 0: 1 2 4 5 1: 3 4 5 2: 1 2 3 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v2 -2*v3 + 17 <= 0; value: -11 + 3*v0 + 5*v2 -36 <= 0; value: -13 + v1 -3*v2 -5 <= 0; value: -15 + -3*v0 + 3*v1 -6*v3 + 27 <= 0; value: 0 + 6*v0 + 6*v1 -21 <= 0; value: -3 0: 1 2 4 5 1: 3 4 5 2: 1 2 3 3: 1 4 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -5*v1 + v2 + 7 <= 0; value: -2 + 5*v1 + 3*v3 -26 <= 0; value: -16 + -3*v1 -4*v2 -5*v3 -1 <= 0; value: -11 + 4*v1 -5*v2 -2*v3 -3 <= 0; value: 0 + v0 + v2 -2*v3 -9 <= 0; value: -3 0: 5 1: 1 2 3 4 2: 1 3 4 5 3: 2 3 4 5 optimal: 2712/53 + + 2712/53 <= 0; value: 2712/53 - -5*v1 + v2 + 7 <= 0; value: 0 - 53/21*v3 -386/21 <= 0; value: 0 + -1511/53 <= 0; value: -1511/53 - -21/5*v2 -2*v3 + 13/5 <= 0; value: 0 - v0 -1400/53 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 3 4 5 2 3: 2 3 4 5 0: 5 -> 1400/53 1: 2 -> 44/53 2: 1 -> -151/53 3: 0 -> 386/53 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -10 <= 0; value: -4 + -5*v0 + 6*v3 + 19 = 0; value: 0 + 6*v1 -1*v2 -32 <= 0; value: -21 + -6*v0 + v1 + 3*v3 -2 <= 0; value: -27 + 5*v0 + v3 -43 <= 0; value: -17 0: 2 4 5 1: 1 3 4 2: 3 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -10 <= 0; value: -4 + -5*v0 + 6*v3 + 19 = 0; value: 0 + 6*v1 -1*v2 -32 <= 0; value: -21 + -6*v0 + v1 + 3*v3 -2 <= 0; value: -27 + 5*v0 + v3 -43 <= 0; value: -17 0: 2 4 5 1: 1 3 4 2: 3 3: 2 4 5 0: 5 -> 5 1: 2 -> 2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v1 + 4*v2 -4 <= 0; value: -9 + 5*v0 -1*v1 + 3 <= 0; value: 0 + -5*v0 + 4*v3 -16 <= 0; value: -4 + -3*v0 + 5*v1 -4*v2 -31 <= 0; value: -20 + -1*v0 + 4*v1 -33 < 0; value: -21 0: 2 3 4 5 1: 1 2 4 5 2: 1 4 3: 3 optimal: oo + -32/5*v3 + 98/5 <= 0; value: 2/5 - -15*v0 + 4*v2 -13 <= 0; value: 0 - 5*v0 -1*v1 + 3 <= 0; value: 0 - -4/3*v2 + 4*v3 -35/3 <= 0; value: 0 + 28/5*v3 -257/5 <= 0; value: -173/5 + 76/5*v3 -409/5 < 0; value: -181/5 0: 2 3 4 5 1 1: 1 2 4 5 2: 1 4 3 5 3: 3 4 5 0: 0 -> -4/5 1: 3 -> -1 2: 1 -> 1/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -5*v0 + 1 <= 0; value: -19 + -2*v0 + 4*v2 -12 = 0; value: 0 + -5*v0 + 6*v1 + 19 <= 0; value: -1 + -1*v1 <= 0; value: 0 + -5*v1 + 6*v2 -30 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 2 5 3: optimal: 8 + + 8 <= 0; value: 8 + -19 <= 0; value: -19 - -2*v0 + 4*v2 -12 = 0; value: 0 + -1 <= 0; value: -1 - -1*v1 <= 0; value: 0 - 6*v2 -30 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 2 5 1 3 3: 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -5*v2 -19 <= 0; value: -39 + -2*v0 -3*v2 + 4*v3 -3 <= 0; value: -7 + -3*v0 + v1 + 2 = 0; value: 0 + 5*v1 -6*v2 -2 <= 0; value: -6 + -1*v0 -5*v1 -3*v2 <= 0; value: -34 0: 2 3 5 1: 3 4 5 2: 1 2 4 5 3: 2 optimal: oo + 3/4*v2 + 3/2 <= 0; value: 9/2 + -5*v2 -19 <= 0; value: -39 + -21/8*v2 + 4*v3 -17/4 <= 0; value: -11/4 - -3*v0 + v1 + 2 = 0; value: 0 + -141/16*v2 -21/8 <= 0; value: -303/8 - -16*v0 -3*v2 + 10 <= 0; value: 0 0: 2 3 5 4 1: 3 4 5 2: 1 2 4 5 3: 2 0: 2 -> -1/8 1: 4 -> -19/8 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -6*v2 -9 <= 0; value: -19 + -3*v3 + 15 = 0; value: 0 + -1*v0 + 2 = 0; value: 0 + -4*v0 -5*v2 + 1 <= 0; value: -7 + -6*v1 + 3*v2 -3 <= 0; value: -15 0: 3 4 1: 1 5 2: 1 4 5 3: 2 optimal: 98/17 + + 98/17 <= 0; value: 98/17 - -17/2*v2 -13/2 <= 0; value: 0 + -3*v3 + 15 = 0; value: 0 - -1*v0 + 2 = 0; value: 0 + -54/17 <= 0; value: -54/17 - -6*v1 + 3*v2 -3 <= 0; value: 0 0: 3 4 1: 1 5 2: 1 4 5 3: 2 0: 2 -> 2 1: 2 -> -15/17 2: 0 -> -13/17 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 4*v1 + 5*v2 -114 <= 0; value: -69 + -1*v0 + 6*v2 -1*v3 -56 < 0; value: -34 + -3*v1 -5*v2 + 3*v3 -13 <= 0; value: -29 + -1*v0 -1*v1 -4*v3 -16 < 0; value: -41 + -1*v0 + 2*v2 -17 < 0; value: -10 0: 1 2 4 5 1: 1 3 4 2: 1 2 3 5 3: 2 3 4 optimal: (11071/67 -e*1) + + 11071/67 < 0; value: 11071/67 - 268/85*v0 -2445/17 < 0; value: -268/85 - -4/5*v0 + 17/3*v2 -161/3 <= 0; value: 0 - -3*v1 -5*v2 + 3*v3 -13 <= 0; value: 0 - -1*v0 + 5/3*v2 -5*v3 -35/3 < 0; value: -5 + -8253/268 < 0; value: -8253/268 0: 1 2 4 5 1: 1 3 4 2: 1 2 3 5 4 3: 2 3 4 1 0: 3 -> 11957/268 1: 2 -> -811321/22780 2: 5 -> 89806/5695 3: 5 -> -113901/22780 + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 + 3*v1 -32 <= 0; value: -11 + -3*v0 -5*v2 + 6 = 0; value: 0 + -1*v1 + 4*v2 + 2 < 0; value: -3 + -1*v0 -1*v1 < 0; value: -7 + -2*v0 + 5*v3 -11 <= 0; value: -5 0: 1 2 4 5 1: 1 3 4 2: 2 3 3: 5 optimal: (136/7 -e*1) + + 136/7 < 0; value: 136/7 + -32 < 0; value: -32 - -3*v0 -5*v2 + 6 = 0; value: 0 - -1*v1 + 4*v2 + 2 < 0; value: -1 - 7/5*v0 -34/5 <= 0; value: 0 + 5*v3 -145/7 <= 0; value: -75/7 0: 1 2 4 5 1: 1 3 4 2: 2 3 4 1 3: 5 0: 2 -> 34/7 1: 5 -> -27/7 2: 0 -> -12/7 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 -6*v3 -9 <= 0; value: -3 + 3*v0 -2*v1 -12 <= 0; value: -7 + -2*v0 + 6*v1 -6*v2 -12 <= 0; value: -6 + -2*v2 <= 0; value: 0 + -4*v1 -5*v3 -4 <= 0; value: -17 0: 2 3 1: 1 2 3 5 2: 3 4 3: 1 5 optimal: oo + 5/6*v3 + 26/3 <= 0; value: 19/2 + -27/2*v3 -15 <= 0; value: -57/2 - 3*v0 -2*v1 -12 <= 0; value: 0 + -6*v2 -35/6*v3 -74/3 <= 0; value: -61/2 + -2*v2 <= 0; value: 0 - -6*v0 -5*v3 + 20 <= 0; value: 0 0: 2 3 5 1 1: 1 2 3 5 2: 3 4 3: 1 5 3 0: 3 -> 5/2 1: 2 -> -9/4 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 <= 0; value: -9 + -4*v0 -5*v1 + v3 + 27 = 0; value: 0 + v0 -3*v2 + 6*v3 -18 <= 0; value: 0 + -6*v2 -5*v3 + 55 = 0; value: 0 + -6*v0 -5*v2 + 43 = 0; value: 0 0: 1 2 3 5 1: 2 2: 3 4 5 3: 2 3 4 optimal: -2 + -2 <= 0; value: -2 + -9 <= 0; value: -9 - -4*v0 -5*v1 + v3 + 27 = 0; value: 0 - 331/25*v0 -993/25 <= 0; value: 0 - -6*v2 -5*v3 + 55 = 0; value: 0 - -6*v0 -5*v2 + 43 = 0; value: 0 0: 1 2 3 5 1: 2 2: 3 4 5 3: 2 3 4 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 4*v0 + 3*v1 -22 = 0; value: 0 + 2*v0 -1*v1 -2*v3 -10 <= 0; value: -6 + 2*v0 -6*v1 -5*v3 + 9 = 0; value: 0 + v0 + 6*v1 -1*v3 -15 <= 0; value: 0 + -5*v0 -6*v2 + 24 < 0; value: -8 0: 1 2 3 4 5 1: 1 2 3 4 2: 5 3: 2 3 4 optimal: oo + 7/3*v3 + 5/3 <= 0; value: 4 - 4*v0 + 3*v1 -22 = 0; value: 0 + -1/3*v3 -17/3 <= 0; value: -6 - 10*v0 -5*v3 -35 = 0; value: 0 + -9/2*v3 + 9/2 <= 0; value: 0 + -6*v2 -5/2*v3 + 13/2 < 0; value: -8 0: 1 2 3 4 5 1: 1 2 3 4 2: 5 3: 2 3 4 5 0: 4 -> 4 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 2*v3 -12 <= 0; value: 0 + v0 + 6*v3 -32 = 0; value: 0 + -4*v1 -6*v2 + 15 <= 0; value: -31 + -6*v0 -4*v2 + 3*v3 + 17 = 0; value: 0 + -1*v0 -2*v1 -3*v2 + 12 < 0; value: -13 0: 1 2 4 5 1: 3 5 2: 3 4 5 3: 1 2 4 optimal: (9 -e*1) + + 9 < 0; value: 9 - v0 + 2*v3 -12 <= 0; value: 0 - -2*v0 + 4 = 0; value: 0 + -5 <= 0; value: -5 - -6*v0 -4*v2 + 3*v3 + 17 = 0; value: 0 - -1*v0 -2*v1 -3*v2 + 12 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 3 4 5 3: 1 2 4 0: 2 -> 2 1: 4 -> -3/2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -1*v2 -6*v3 + 2 < 0; value: -2 + -1*v2 -2*v3 + 4 <= 0; value: 0 + 3*v0 -5*v2 + 7 <= 0; value: -13 + -3*v0 -3*v1 + 2*v2 + 4 <= 0; value: 0 + v1 + 6*v3 -10 <= 0; value: -6 0: 3 4 1: 4 5 2: 1 2 3 4 3: 1 2 5 optimal: -40/9 + -40/9 <= 0; value: -40/9 + -43/6 < 0; value: -43/6 - -1*v2 -2*v3 + 4 <= 0; value: 0 - 36/7*v0 -1/7 <= 0; value: 0 - -3*v0 -3*v1 + 2*v2 + 4 <= 0; value: 0 - -1*v0 + 14/3*v3 -6 <= 0; value: 0 0: 3 4 5 1 1: 4 5 2: 1 2 3 4 5 3: 1 2 5 3 0: 0 -> 1/36 1: 4 -> 9/4 2: 4 -> 17/12 3: 0 -> 31/24 + 2*v0 -2*v1 <= 0; value: -4 + -3*v2 -4*v3 <= 0; value: 0 + -5*v0 -2*v1 + v2 -19 <= 0; value: -44 + 3*v3 <= 0; value: 0 + 4*v0 -5*v2 -16 <= 0; value: -4 + -1*v1 + 2*v3 -2 <= 0; value: -7 0: 2 4 1: 2 5 2: 1 2 4 3: 1 3 5 optimal: oo + 23/4*v0 + 61/4 <= 0; value: 65/2 - -3*v2 -4*v3 <= 0; value: 0 - -5*v0 + 4*v2 -15 <= 0; value: 0 + -45/16*v0 -135/16 <= 0; value: -135/8 + -9/4*v0 -139/4 <= 0; value: -83/2 - -1*v1 + 2*v3 -2 <= 0; value: 0 0: 2 4 3 1: 2 5 2: 1 2 4 3 3: 1 3 5 2 0: 3 -> 3 1: 5 -> -53/4 2: 0 -> 15/2 3: 0 -> -45/8 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 + 2*v2 -5*v3 -2 < 0; value: -1 + -6*v2 -2*v3 + 4 <= 0; value: -16 + -4*v0 -5*v1 -3*v3 + 2 < 0; value: -6 + v0 + 3*v3 -3 = 0; value: 0 + 6*v0 = 0; value: 0 0: 1 3 4 5 1: 3 2: 1 2 3: 1 2 3 4 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 + 2*v2 -7 < 0; value: -1 + -6*v2 + 2 <= 0; value: -16 - -4*v0 -5*v1 -3*v3 + 2 < 0; value: -3 - v0 + 3*v3 -3 = 0; value: 0 - 6*v0 = 0; value: 0 0: 1 3 4 5 2 1: 3 2: 1 2 3: 1 2 3 4 0: 0 -> 0 1: 1 -> 2/5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + v1 + 2*v2 -38 <= 0; value: -24 + 2*v2 -1*v3 -8 < 0; value: -2 + -5*v0 -6*v2 -7 <= 0; value: -42 + -3*v2 + 11 <= 0; value: -4 + 4*v0 -6*v1 -6 <= 0; value: -2 0: 1 3 5 1: 1 5 2: 1 2 3 4 3: 2 optimal: 137/21 + + 137/21 <= 0; value: 137/21 - 14/3*v0 + 2*v2 -39 <= 0; value: 0 + -1*v3 -2/3 < 0; value: -14/3 + -881/14 <= 0; value: -881/14 - -3*v2 + 11 <= 0; value: 0 - 4*v0 -6*v1 -6 <= 0; value: 0 0: 1 3 5 1: 1 5 2: 1 2 3 4 3: 2 0: 1 -> 95/14 1: 0 -> 74/21 2: 5 -> 11/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -2*v2 + 8 = 0; value: 0 + 3*v0 + 6*v1 -3*v3 -18 <= 0; value: -3 + -4*v1 -3*v2 -18 <= 0; value: -46 + -1*v0 + 6*v1 -3*v3 -43 <= 0; value: -28 + -5*v0 + 3*v3 -9 = 0; value: 0 0: 1 2 4 5 1: 2 3 4 2: 1 3 3: 2 4 5 optimal: oo + -3/2*v3 + 39/2 <= 0; value: 15 - -6*v0 -2*v2 + 8 = 0; value: 0 + 69/10*v3 -927/10 <= 0; value: -72 - -4*v1 -3*v2 -18 <= 0; value: 0 + 9/2*v3 -221/2 <= 0; value: -97 - -5*v0 + 3*v3 -9 = 0; value: 0 0: 1 2 4 5 1: 2 3 4 2: 1 3 2 4 3: 2 4 5 0: 0 -> 0 1: 4 -> -15/2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 2*v2 + 5*v3 -78 < 0; value: -46 + 3*v0 -5*v1 + v2 < 0; value: -7 + -6*v1 -4*v2 + 28 = 0; value: 0 + -4*v0 + 5*v1 + 4*v3 -21 <= 0; value: -9 + -3*v0 + 4*v1 -5*v3 + 1 <= 0; value: -5 0: 2 4 5 1: 1 2 3 4 5 2: 1 2 3 3: 1 4 5 optimal: oo + -35/6*v3 + 70 < 0; value: 175/3 - 12/13*v0 + 5*v3 -804/13 < 0; value: -12/13 - 3*v0 + 13/3*v2 -70/3 < 0; value: -13/3 - -6*v1 -4*v2 + 28 = 0; value: 0 + 79/6*v3 -129 < 0; value: -308/3 + 5/4*v3 -72 < 0; value: -139/2 0: 2 4 5 1 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 1 4 5 0: 4 -> 331/6 1: 4 -> 1061/39 2: 1 -> -879/26 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 6*v2 -6*v3 -34 = 0; value: 0 + -1*v1 + 4*v3 -4 = 0; value: 0 + 6*v2 -1*v3 -28 = 0; value: 0 + -6*v0 + 4*v1 -6*v2 + 9 <= 0; value: -11 + -1*v3 + 2 = 0; value: 0 0: 4 1: 1 2 4 2: 1 3 4 3: 1 2 3 5 optimal: oo + 2*v0 -8 <= 0; value: -6 - 4*v1 + 6*v2 -6*v3 -34 = 0; value: 0 - 3/2*v2 + 5/2*v3 -25/2 = 0; value: 0 - 33/5*v2 -33 = 0; value: 0 + -6*v0 -5 <= 0; value: -11 + = 0; value: 0 0: 4 1: 1 2 4 2: 1 3 4 2 5 3: 1 2 3 5 4 0: 1 -> 1 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 -4*v2 -3*v3 + 29 < 0; value: -3 + v1 = 0; value: 0 + 6*v1 + 3*v2 -25 <= 0; value: -10 + = 0; value: 0 + 6*v1 + 3*v2 -41 <= 0; value: -26 0: 1: 1 2 3 5 2: 1 3 5 3: 1 optimal: oo + 2*v0 <= 0; value: 0 + -4*v2 -3*v3 + 29 < 0; value: -3 - v1 = 0; value: 0 + 3*v2 -25 <= 0; value: -10 + = 0; value: 0 + 3*v2 -41 <= 0; value: -26 0: 1: 1 2 3 5 2: 1 3 5 3: 1 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -5*v3 -11 < 0; value: -29 + -2*v0 + 3*v1 + 2 < 0; value: -1 + -3*v2 + 3*v3 <= 0; value: 0 + -6*v2 -4*v3 <= 0; value: 0 + 3*v0 -3*v1 -15 < 0; value: -9 0: 1 2 5 1: 2 5 2: 3 4 3: 1 3 4 optimal: (10 -e*1) + + 10 < 0; value: 10 + -6*v0 -5*v3 -11 < 0; value: -29 + v0 -13 < 0; value: -10 + -3*v2 + 3*v3 <= 0; value: 0 + -6*v2 -4*v3 <= 0; value: 0 - 3*v0 -3*v1 -15 < 0; value: -3 0: 1 2 5 1: 2 5 2: 3 4 3: 1 3 4 0: 3 -> 3 1: 1 -> -1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 <= 0; value: 0 + -4*v3 + 9 < 0; value: -3 + 2*v1 <= 0; value: 0 + -6*v0 + v1 + 4 <= 0; value: -2 + 5*v1 + 6*v3 -37 < 0; value: -19 0: 4 1: 1 3 4 5 2: 3: 2 5 optimal: oo + 2*v0 <= 0; value: 2 - -6*v1 <= 0; value: 0 + -4*v3 + 9 < 0; value: -3 + <= 0; value: 0 + -6*v0 + 4 <= 0; value: -2 + 6*v3 -37 < 0; value: -19 0: 4 1: 1 3 4 5 2: 3: 2 5 0: 1 -> 1 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + v2 -14 < 0; value: -4 + -6*v2 + 6*v3 + 17 <= 0; value: -7 + v1 -4*v3 <= 0; value: -2 + -2*v0 + 2 = 0; value: 0 + 6*v1 -1*v3 -14 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + v2 -14 < 0; value: -4 + -6*v2 + 6*v3 + 17 <= 0; value: -7 + v1 -4*v3 <= 0; value: -2 + -2*v0 + 2 = 0; value: 0 + 6*v1 -1*v3 -14 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 3: 2 3 5 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + <= 0; value: 0 + 5*v3 -47 < 0; value: -27 + 5*v0 -4*v1 -5 < 0; value: -1 + 6*v0 + 4*v2 -108 < 0; value: -68 + -1*v1 -2*v2 -3*v3 + 24 = 0; value: 0 0: 3 4 1: 3 5 2: 4 5 3: 2 5 optimal: oo + 4/5*v2 + 92/25 < 0; value: 172/25 + <= 0; value: 0 - -25/12*v0 -10/3*v2 -59/12 <= 0; value: 0 - 5*v0 + 8*v2 + 12*v3 -101 < 0; value: -12 + -28/5*v2 -3054/25 < 0; value: -3614/25 - -1*v1 -2*v2 -3*v3 + 24 = 0; value: 0 0: 3 4 2 1: 3 5 2: 4 5 3 2 3: 2 5 3 0: 4 -> -219/25 1: 4 -> -46/5 2: 4 -> 4 3: 4 -> 42/5 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + v3 + 2 <= 0; value: 0 + 4*v0 -2*v1 -6*v2 + 12 < 0; value: -12 + 3*v1 + 3*v2 -26 <= 0; value: -2 + -6*v0 + 3*v2 -1*v3 -2 < 0; value: -1 + -1*v0 + 6*v3 -25 <= 0; value: -14 0: 1 2 4 5 1: 2 3 2: 2 3 4 3: 1 4 5 optimal: (390/23 -e*1) + + 390/23 < 0; value: 390/23 - -4*v0 + v3 + 2 <= 0; value: 0 - 4*v0 -2*v1 -6*v2 + 12 < 0; value: -2 + -702/23 < 0; value: -702/23 - -6*v0 + 3*v2 -1*v3 -2 < 0; value: -3 - 23*v0 -37 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 2: 2 3 4 3: 1 4 5 3 0: 1 -> 37/23 1: 5 -> -66/23 2: 3 -> 301/69 3: 2 -> 102/23 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 -4*v3 -14 < 0; value: -38 + v0 -1*v1 -3*v2 -1 <= 0; value: -10 + -2*v0 -2*v1 + 14 = 0; value: 0 + -1*v1 -1*v3 + 2 <= 0; value: -1 + -3*v0 + v3 -13 < 0; value: -27 0: 1 2 3 5 1: 2 3 4 2: 2 3: 1 4 5 optimal: oo + 6*v2 + 2 <= 0; value: 26 + -12*v2 -26 < 0; value: -74 - -3*v2 + 2*v3 + 2 <= 0; value: 0 - -2*v0 -2*v1 + 14 = 0; value: 0 - v0 -1*v3 -5 <= 0; value: 0 + -3*v2 -26 < 0; value: -38 0: 1 2 3 5 4 1: 2 3 4 2: 2 1 5 3: 1 4 5 2 0: 5 -> 10 1: 2 -> -3 2: 4 -> 4 3: 1 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 6*v1 <= 0; value: 0 + -6*v1 <= 0; value: 0 + -4*v2 -3 <= 0; value: -7 + 3*v0 + 3*v2 -7 <= 0; value: -4 + -1*v1 <= 0; value: 0 0: 1 4 1: 1 2 5 2: 3 4 3: optimal: 37/6 + + 37/6 <= 0; value: 37/6 + -37/3 <= 0; value: -37/3 - -6*v1 <= 0; value: 0 - -4*v2 -3 <= 0; value: 0 - 3*v0 + 3*v2 -7 <= 0; value: 0 + <= 0; value: 0 0: 1 4 1: 1 2 5 2: 3 4 1 3: 0: 0 -> 37/12 1: 0 -> 0 2: 1 -> -3/4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -1*v3 + 4 <= 0; value: -6 + -3*v0 + 9 = 0; value: 0 + 5*v0 -1*v2 -6*v3 -18 <= 0; value: -10 + -3*v0 -6*v1 -4*v2 + 32 <= 0; value: -5 + -3*v0 -4*v3 + 5 <= 0; value: -8 0: 1 2 3 4 5 1: 4 2: 3 4 3: 1 3 5 optimal: oo + 3*v0 + 4/3*v2 -32/3 <= 0; value: -1/3 + -3*v0 -1*v3 + 4 <= 0; value: -6 + -3*v0 + 9 = 0; value: 0 + 5*v0 -1*v2 -6*v3 -18 <= 0; value: -10 - -3*v0 -6*v1 -4*v2 + 32 <= 0; value: 0 + -3*v0 -4*v3 + 5 <= 0; value: -8 0: 1 2 3 4 5 1: 4 2: 3 4 3: 1 3 5 0: 3 -> 3 1: 4 -> 19/6 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 -3*v3 -2 <= 0; value: -11 + -1*v1 -4*v2 -5 < 0; value: -23 + -1*v2 + 1 <= 0; value: -3 + -2*v0 + 5*v1 -4 = 0; value: 0 + -4*v0 -4*v2 + 28 = 0; value: 0 0: 4 5 1: 1 2 4 2: 2 3 5 3: 1 optimal: 28/5 + + 28/5 <= 0; value: 28/5 + -3*v3 + 38/5 <= 0; value: -37/5 + -61/5 < 0; value: -61/5 - -1*v2 + 1 <= 0; value: 0 - -2*v0 + 5*v1 -4 = 0; value: 0 - -4*v0 -4*v2 + 28 = 0; value: 0 0: 4 5 2 1 1: 1 2 4 2: 2 3 5 1 3: 1 0: 3 -> 6 1: 2 -> 16/5 2: 4 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + 6*v0 -3*v1 -15 = 0; value: 0 + -5*v1 -6*v3 + 9 <= 0; value: -18 + 4*v0 -1*v3 -16 <= 0; value: -2 + -6*v0 + v2 + 18 < 0; value: -6 0: 2 4 5 1: 2 3 2: 5 3: 1 3 4 optimal: (194/25 -e*1) + + 194/25 < 0; value: 194/25 - 5*v3 -19 < 0; value: -9/2 - 6*v0 -3*v1 -15 = 0; value: 0 - -5/3*v2 -6*v3 + 4 <= 0; value: 0 + -383/25 < 0; value: -383/25 - -6*v0 + v2 + 18 < 0; value: -6 0: 2 4 5 3 1: 2 3 2: 5 3 4 3: 1 3 4 0: 4 -> 133/50 1: 3 -> 8/25 2: 0 -> -201/25 3: 2 -> 29/10 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 -5*v1 + 32 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -45 <= 0; value: -20 + 5*v0 -3*v1 -16 = 0; value: 0 + -1*v0 + 3*v1 + 5*v3 -66 < 0; value: -42 0: 1 3 4 5 1: 1 4 5 2: 3: 2 5 optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 - -40/3*v0 + 176/3 < 0; value: -4 + -6*v3 + 24 = 0; value: 0 + -23 < 0; value: -23 - 5*v0 -3*v1 -16 = 0; value: 0 + 5*v3 -322/5 < 0; value: -222/5 0: 1 3 4 5 1: 1 4 5 2: 3: 2 5 0: 5 -> 47/10 1: 3 -> 5/2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 3*v1 -95 <= 0; value: -59 + -6*v2 + 6 = 0; value: 0 + 5*v2 + 4*v3 -33 < 0; value: -16 + v0 -5*v3 + 10 <= 0; value: 0 + 2*v0 -10 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 3*v1 -95 <= 0; value: -59 + -6*v2 + 6 = 0; value: 0 + 5*v2 + 4*v3 -33 < 0; value: -16 + v0 -5*v3 + 10 <= 0; value: 0 + 2*v0 -10 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 3: 3 4 0: 5 -> 5 1: 2 -> 2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 + v3 -10 < 0; value: -2 + -3*v0 + 2*v1 + 5*v3 -6 = 0; value: 0 + v0 -1*v3 <= 0; value: 0 + 4*v0 + 4*v1 -5*v3 -3 <= 0; value: -1 + -1*v1 -6*v3 + 8 <= 0; value: -5 0: 2 3 4 1: 2 4 5 2: 1 3: 1 2 3 4 5 optimal: oo + -1*v0 -30*v2 + 44 < 0; value: 12 - 6*v2 + v3 -10 < 0; value: -1 - -3*v0 + 2*v1 + 5*v3 -6 = 0; value: 0 + v0 + 6*v2 -10 < 0; value: -2 + 10*v0 + 90*v2 -141 < 0; value: -31 + -3/2*v0 + 21*v2 -30 < 0; value: -12 0: 2 3 4 5 1: 2 4 5 2: 1 3 4 5 3: 1 2 3 4 5 0: 2 -> 2 1: 1 -> -3/2 2: 1 -> 1 3: 2 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + 4*v1 -6*v2 -7 <= 0; value: -37 + 2*v1 + 2*v2 -6*v3 -16 <= 0; value: -6 + v0 + 3*v1 -4*v3 -5 = 0; value: 0 + -5*v2 + 6*v3 + 3 <= 0; value: -22 + -1*v1 -6*v2 -19 <= 0; value: -49 0: 3 1: 1 2 3 5 2: 1 2 4 5 3: 2 3 4 optimal: oo + 52/17*v0 + 178/17 <= 0; value: 438/17 + -45/17*v0 -241/17 <= 0; value: -466/17 - -2/3*v0 + 2*v2 -10/3*v3 -38/3 <= 0; value: 0 - v0 + 3*v1 -4*v3 -5 = 0; value: 0 + -45/34*v0 -282/17 <= 0; value: -789/34 - 3/5*v0 -34/5*v2 -78/5 <= 0; value: 0 0: 3 5 1 2 4 1: 1 2 3 5 2: 1 2 4 5 3: 2 3 4 5 1 0: 5 -> 5 1: 0 -> -134/17 2: 5 -> -63/34 3: 0 -> -201/34 + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v2 -2*v3 + 1 <= 0; value: -10 + 6*v0 + 6*v1 + 3*v2 -71 <= 0; value: -44 + -3*v0 + 4 <= 0; value: -5 + 4*v0 + 2*v3 -39 <= 0; value: -25 + = 0; value: 0 0: 1 2 3 4 1: 2 2: 1 2 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v2 -2*v3 + 1 <= 0; value: -10 + 6*v0 + 6*v1 + 3*v2 -71 <= 0; value: -44 + -3*v0 + 4 <= 0; value: -5 + 4*v0 + 2*v3 -39 <= 0; value: -25 + = 0; value: 0 0: 1 2 3 4 1: 2 2: 1 2 3: 1 4 0: 3 -> 3 1: 0 -> 0 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 -6*v2 + 3*v3 + 24 < 0; value: -13 + -6*v2 -19 <= 0; value: -49 + -3*v0 + 4*v1 + 3*v2 -76 <= 0; value: -48 + -3*v0 + 1 < 0; value: -2 + v2 -5 <= 0; value: 0 0: 3 4 1: 1 3 2: 1 2 3 5 3: 1 optimal: oo + 2*v0 + 3*v2 -3/2*v3 -12 < 0; value: 1/2 - -4*v1 -6*v2 + 3*v3 + 24 < 0; value: -4 + -6*v2 -19 <= 0; value: -49 + -3*v0 -3*v2 + 3*v3 -52 < 0; value: -61 + -3*v0 + 1 < 0; value: -2 + v2 -5 <= 0; value: 0 0: 3 4 1: 1 3 2: 1 2 3 5 3: 1 3 0: 1 -> 1 1: 4 -> 7/4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + 3*v0 + 5*v1 -25 = 0; value: 0 + -6*v2 + 24 = 0; value: 0 + 3*v0 -3*v2 -3 = 0; value: 0 + -4*v0 -6*v3 + 18 <= 0; value: -20 + v3 -8 <= 0; value: -5 0: 1 3 4 1: 1 2: 2 3 3: 4 5 optimal: 6 + + 6 <= 0; value: 6 - 3*v0 + 5*v1 -25 = 0; value: 0 - -6*v2 + 24 = 0; value: 0 - 3*v0 -3*v2 -3 = 0; value: 0 + -6*v3 -2 <= 0; value: -20 + v3 -8 <= 0; value: -5 0: 1 3 4 1: 1 2: 2 3 4 3: 4 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 5*v1 <= 0; value: 0 + -2*v0 -2*v2 + 8 <= 0; value: 0 + 6*v0 -5*v1 -1 <= 0; value: 0 + -2*v1 -1 <= 0; value: -3 + 4*v2 + 5*v3 -12 = 0; value: 0 0: 1 2 3 1: 1 3 4 2: 2 5 3: 5 optimal: 1/2 + + 1/2 <= 0; value: 1/2 + -5/4 <= 0; value: -5/4 - -2*v0 -2*v2 + 8 <= 0; value: 0 - 6*v0 -5*v1 -1 <= 0; value: 0 - -3*v3 -3 <= 0; value: 0 - 4*v2 + 5*v3 -12 = 0; value: 0 0: 1 2 3 4 1: 1 3 4 2: 2 5 4 1 3: 5 4 1 0: 1 -> -1/4 1: 1 -> -1/2 2: 3 -> 17/4 3: 0 -> -1 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -6*v3 + 14 = 0; value: 0 + -2*v1 -4*v3 -9 <= 0; value: -19 + 4*v2 + 5*v3 -22 = 0; value: 0 + -2*v0 -5*v2 + 25 = 0; value: 0 + 4*v1 -9 < 0; value: -5 0: 4 1: 1 2 5 2: 3 4 3: 1 2 3 optimal: 995/8 + + 995/8 <= 0; value: 995/8 - -2*v1 -6*v3 + 14 = 0; value: 0 - 16/25*v0 -111/5 <= 0; value: 0 - 4*v2 + 5*v3 -22 = 0; value: 0 - -2*v0 -5*v2 + 25 = 0; value: 0 + -119 < 0; value: -119 0: 4 2 5 1: 1 2 5 2: 3 4 2 5 3: 1 2 3 5 0: 5 -> 555/16 1: 1 -> -55/2 2: 3 -> -71/8 3: 2 -> 23/2 + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 <= 0; value: 0 + -1*v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 + 6*v2 -5 <= 0; value: -3 + 4*v3 -4 = 0; value: 0 + -6*v0 + v2 -5*v3 + 28 = 0; value: 0 0: 3 5 1: 2: 1 2 3 5 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 <= 0; value: 0 + -1*v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 + 6*v2 -5 <= 0; value: -3 + 4*v3 -4 = 0; value: 0 + -6*v0 + v2 -5*v3 + 28 = 0; value: 0 0: 3 5 1: 2: 1 2 3 5 3: 2 4 5 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 4*v2 -45 <= 0; value: -9 + -3*v0 -4*v3 -4 <= 0; value: -10 + -1*v0 + 6*v2 -55 <= 0; value: -33 + v0 + 6*v3 -2 = 0; value: 0 + 6*v0 + v2 -39 <= 0; value: -23 0: 2 3 4 5 1: 1 2: 1 3 5 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 4*v2 -45 <= 0; value: -9 + -3*v0 -4*v3 -4 <= 0; value: -10 + -1*v0 + 6*v2 -55 <= 0; value: -33 + v0 + 6*v3 -2 = 0; value: 0 + 6*v0 + v2 -39 <= 0; value: -23 0: 2 3 4 5 1: 1 2: 1 3 5 3: 2 4 0: 2 -> 2 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 6*v1 + 5*v3 -98 < 0; value: -43 + -5*v0 -3*v3 + 28 <= 0; value: -2 + -4*v0 -5*v1 -13 < 0; value: -35 + -6*v0 + 2*v3 + 8 = 0; value: 0 + v2 <= 0; value: 0 0: 1 2 3 4 1: 1 3 2: 5 3: 1 2 4 optimal: (314/9 -e*1) + + 314/9 < 0; value: 314/9 - 27/5*v3 -112 < 0; value: -27/5 + -6112/81 < 0; value: -6112/81 - -4*v0 -5*v1 -13 < 0; value: -5 - -6*v0 + 2*v3 + 8 = 0; value: 0 + v2 <= 0; value: 0 0: 1 2 3 4 1: 1 3 2: 5 3: 1 2 4 0: 3 -> 641/81 1: 2 -> -3212/405 2: 0 -> 0 3: 5 -> 533/27 + 2*v0 -2*v1 <= 0; value: -2 + v0 -1*v1 + 6*v2 -20 <= 0; value: -3 + -1*v1 -2*v2 + 3*v3 + 6 <= 0; value: -1 + 2*v0 -6 = 0; value: 0 + 5*v1 -1*v2 -18 < 0; value: -1 + 4*v1 -1*v3 -30 < 0; value: -15 0: 1 3 1: 1 2 4 5 2: 1 2 4 3: 2 5 optimal: oo + -12*v2 + 40 <= 0; value: 4 - v0 + 8*v2 -3*v3 -26 <= 0; value: 0 - -1*v1 -2*v2 + 3*v3 + 6 <= 0; value: 0 + 2*v0 -6 = 0; value: 0 + 5*v0 + 29*v2 -118 < 0; value: -16 + 11/3*v0 + 64/3*v2 -304/3 < 0; value: -79/3 0: 1 3 5 4 1: 1 2 4 5 2: 1 2 4 5 3: 2 5 1 4 0: 3 -> 3 1: 4 -> 1 2: 3 -> 3 3: 1 -> 1/3 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -1 <= 0; value: -4 + -3*v1 + 4*v2 -2 < 0; value: -1 + 5*v0 + 4*v1 + v2 -34 <= 0; value: -5 + = 0; value: 0 + 5*v1 -70 <= 0; value: -45 0: 1 3 1: 2 3 5 2: 2 3 3: optimal: oo + 2*v0 -8/3*v2 + 4/3 < 0; value: -22/3 + -3*v0 -1 <= 0; value: -4 - -3*v1 + 4*v2 -2 < 0; value: -1/2 + 5*v0 + 19/3*v2 -110/3 < 0; value: -19/3 + = 0; value: 0 + 20/3*v2 -220/3 < 0; value: -140/3 0: 1 3 1: 2 3 5 2: 2 3 5 3: 0: 1 -> 1 1: 5 -> 29/6 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 3*v3 -12 <= 0; value: -6 + -4*v2 + 6*v3 + 2 <= 0; value: -6 + -2*v2 + 9 < 0; value: -1 + -4*v2 -3*v3 -9 < 0; value: -35 + -4*v0 + 6*v2 -21 <= 0; value: -11 0: 5 1: 2: 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + 3*v3 -12 <= 0; value: -6 + -4*v2 + 6*v3 + 2 <= 0; value: -6 + -2*v2 + 9 < 0; value: -1 + -4*v2 -3*v3 -9 < 0; value: -35 + -4*v0 + 6*v2 -21 <= 0; value: -11 0: 5 1: 2: 2 3 4 5 3: 1 2 4 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 = 0; value: 0 + -2*v1 + 6*v3 -18 <= 0; value: -6 + -6*v2 -5*v3 -35 < 0; value: -80 + 4*v0 + 3*v1 + 3*v3 -51 <= 0; value: -33 + -3*v0 -2*v2 -8 <= 0; value: -18 0: 1 4 5 1: 2 4 2: 3 5 3: 2 3 4 optimal: oo + 2*v0 + 36/5*v2 + 60 < 0; value: 96 + 4*v0 = 0; value: 0 - -2*v1 + 6*v3 -18 <= 0; value: 0 - -6*v2 -5*v3 -35 < 0; value: -5 + 4*v0 -72/5*v2 -162 < 0; value: -234 + -3*v0 -2*v2 -8 <= 0; value: -18 0: 1 4 5 1: 2 4 2: 3 5 4 3: 2 3 4 0: 0 -> 0 1: 3 -> -45 2: 5 -> 5 3: 3 -> -12 + 2*v0 -2*v1 <= 0; value: 4 + -2*v2 + 2*v3 <= 0; value: 0 + -1*v1 + 4*v3 + 3 = 0; value: 0 + -3*v2 + 2*v3 <= 0; value: 0 + 6*v1 -2*v3 -18 = 0; value: 0 + -6*v1 -4*v2 + 18 = 0; value: 0 0: 1: 2 4 5 2: 1 3 5 3: 1 2 3 4 optimal: oo + 2*v0 -6 <= 0; value: 4 + -2*v2 <= 0; value: 0 - -1*v1 + 4*v3 + 3 = 0; value: 0 + -3*v2 <= 0; value: 0 - 22*v3 = 0; value: 0 + -4*v2 = 0; value: 0 0: 1: 2 4 5 2: 1 3 5 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 6*v2 -44 < 0; value: -26 + v0 + 3*v2 -21 < 0; value: -11 + 3*v0 + 5*v2 -3*v3 -45 <= 0; value: -27 + -2*v0 + 6*v2 -22 < 0; value: -6 + -3*v0 + v1 + 3*v2 -13 < 0; value: -5 0: 2 3 4 5 1: 5 2: 1 2 3 4 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 6*v2 -44 < 0; value: -26 + v0 + 3*v2 -21 < 0; value: -11 + 3*v0 + 5*v2 -3*v3 -45 <= 0; value: -27 + -2*v0 + 6*v2 -22 < 0; value: -6 + -3*v0 + v1 + 3*v2 -13 < 0; value: -5 0: 2 3 4 5 1: 5 2: 1 2 3 4 5 3: 3 0: 1 -> 1 1: 2 -> 2 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v3 -12 = 0; value: 0 + 2*v0 + 2*v1 + 4*v3 -42 <= 0; value: -26 + 2*v1 + 4*v2 -5*v3 -45 <= 0; value: -29 + 2*v0 + v2 -19 < 0; value: -9 + v3 <= 0; value: 0 0: 1 2 4 1: 2 3 2: 3 4 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v3 -12 = 0; value: 0 + 2*v0 + 2*v1 + 4*v3 -42 <= 0; value: -26 + 2*v1 + 4*v2 -5*v3 -45 <= 0; value: -29 + 2*v0 + v2 -19 < 0; value: -9 + v3 <= 0; value: 0 0: 1 2 4 1: 2 3 2: 3 4 3: 1 2 3 5 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -2*v1 + 3*v2 -6*v3 + 1 < 0; value: -26 + -3*v1 + 4*v3 -18 <= 0; value: -11 + -4*v2 + 4 = 0; value: 0 + v1 + 6*v3 -64 < 0; value: -37 + 3*v0 + v1 -5*v3 + 5 = 0; value: 0 0: 5 1: 1 2 4 5 2: 1 3 3: 1 2 4 5 optimal: (478/39 -e*1) + + 478/39 < 0; value: 478/39 - -78/11*v0 + 3*v2 + 169/11 < 0; value: -5 - 9*v0 -11*v3 -3 <= 0; value: 0 - -4*v2 + 4 = 0; value: 0 + -734/13 < 0; value: -734/13 - 3*v0 + v1 -5*v3 + 5 = 0; value: 0 0: 5 1 2 4 1: 1 2 4 5 2: 1 3 4 3: 1 2 4 5 0: 4 -> 257/78 1: 3 -> -36/13 2: 1 -> 1 3: 4 -> 63/26 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -2*v2 + 9 = 0; value: 0 + 4*v1 -6*v3 + 6 = 0; value: 0 + -3*v0 + 2*v1 + 6*v3 -50 <= 0; value: -32 + 2*v1 -5*v2 -6 = 0; value: 0 + 2*v0 + 4*v1 -1*v2 -47 <= 0; value: -31 0: 3 5 1: 1 2 3 4 5 2: 1 4 5 3: 2 3 optimal: 29 + + 29 <= 0; value: 29 - -3*v1 -2*v2 + 9 = 0; value: 0 + -6*v3 + 18 = 0; value: 0 + 6*v3 -193/2 <= 0; value: -157/2 - -19/3*v2 = 0; value: 0 - 2*v0 -35 <= 0; value: 0 0: 3 5 1: 1 2 3 4 5 2: 1 4 5 2 3 3: 2 3 0: 2 -> 35/2 1: 3 -> 3 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v3 <= 0; value: 0 + -2*v2 -3*v3 + 4 < 0; value: -4 + -3*v2 -1*v3 + 10 < 0; value: -2 + 6*v1 -6 = 0; value: 0 + -3*v0 + 5*v2 -39 <= 0; value: -22 0: 5 1: 4 2: 2 3 5 3: 1 2 3 optimal: oo + 2*v0 -2 <= 0; value: 0 + -2*v3 <= 0; value: 0 + -2*v2 -3*v3 + 4 < 0; value: -4 + -3*v2 -1*v3 + 10 < 0; value: -2 - 6*v1 -6 = 0; value: 0 + -3*v0 + 5*v2 -39 <= 0; value: -22 0: 5 1: 4 2: 2 3 5 3: 1 2 3 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -4*v1 -5 < 0; value: -1 + 5*v1 -5*v3 -6 <= 0; value: -31 + 6*v0 -4*v2 -4 <= 0; value: -2 + v3 -7 <= 0; value: -2 + -2*v2 -1*v3 -2 <= 0; value: -9 0: 1 3 1: 1 2 2: 3 5 3: 2 4 5 optimal: (5/2 -e*1) + + 5/2 < 0; value: 5/2 - 4*v0 -4*v1 -5 < 0; value: -1/2 + 5*v0 -5*v3 -49/4 < 0; value: -129/4 + 6*v0 -4*v2 -4 <= 0; value: -2 + v3 -7 <= 0; value: -2 + -2*v2 -1*v3 -2 <= 0; value: -9 0: 1 3 2 1: 1 2 2: 3 5 3: 2 4 5 0: 1 -> 1 1: 0 -> -1/8 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 6*v0 + 4*v2 -16 = 0; value: 0 + -1*v0 + 4*v1 + 3*v2 -24 <= 0; value: -11 + -2*v0 + 5*v1 + 3*v3 -47 <= 0; value: -27 + 6*v0 -3*v2 -9 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 2 3 5 3: 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 6*v0 + 4*v2 -16 = 0; value: 0 + -1*v0 + 4*v1 + 3*v2 -24 <= 0; value: -11 + -2*v0 + 5*v1 + 3*v3 -47 <= 0; value: -27 + 6*v0 -3*v2 -9 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 2 3 5 3: 4 0: 2 -> 2 1: 3 -> 3 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v3 -4 = 0; value: 0 + 3*v0 + 2*v2 -19 <= 0; value: -7 + -3*v1 + 5*v2 -6 <= 0; value: -18 + -6*v1 + v3 -18 < 0; value: -38 + -4*v2 = 0; value: 0 0: 2 1: 3 4 2: 2 3 5 3: 1 4 optimal: 50/3 + + 50/3 <= 0; value: 50/3 + v3 -4 = 0; value: 0 - 3*v0 -19 <= 0; value: 0 - -3*v1 + 5*v2 -6 <= 0; value: 0 + v3 -6 < 0; value: -2 - -4*v2 = 0; value: 0 0: 2 1: 3 4 2: 2 3 5 4 3: 1 4 0: 4 -> 19/3 1: 4 -> -2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v3 -19 <= 0; value: -11 + 6*v1 -1*v2 + 2*v3 -37 <= 0; value: -22 + 4*v0 + 5*v3 -24 <= 0; value: -11 + 5*v2 + v3 -31 < 0; value: -5 + 6*v0 -1*v2 -6*v3 -2 <= 0; value: -1 0: 1 3 5 1: 2 2: 2 4 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -4*v3 -19 <= 0; value: -11 + 6*v1 -1*v2 + 2*v3 -37 <= 0; value: -22 + 4*v0 + 5*v3 -24 <= 0; value: -11 + 5*v2 + v3 -31 < 0; value: -5 + 6*v0 -1*v2 -6*v3 -2 <= 0; value: -1 0: 1 3 5 1: 2 2: 2 4 5 3: 1 2 3 4 5 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -4*v1 + v2 + 2 <= 0; value: -8 + -2*v0 + 3*v2 -4*v3 -2 <= 0; value: -12 + 4*v0 -4*v3 + 16 = 0; value: 0 + -5*v1 + 5 < 0; value: -5 + 2*v0 -2*v1 + 6*v3 -78 <= 0; value: -50 0: 1 2 3 5 1: 1 4 5 2: 1 2 3: 2 3 5 optimal: (12 -e*1) + + 12 < 0; value: 12 + v2 -44 <= 0; value: -40 + 3*v2 -60 <= 0; value: -48 - 4*v0 -4*v3 + 16 = 0; value: 0 - -5*v1 + 5 < 0; value: -5/2 - 8*v3 -88 <= 0; value: 0 0: 1 2 3 5 1: 1 4 5 2: 1 2 3: 2 3 5 1 0: 1 -> 7 1: 2 -> 3/2 2: 4 -> 4 3: 5 -> 11 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -1*v3 -14 <= 0; value: -3 + 4*v1 + 3*v2 -14 = 0; value: 0 + v0 + 5*v1 + 6*v3 -94 <= 0; value: -57 + 6*v0 + 3*v1 -60 < 0; value: -36 + -2*v2 -2 <= 0; value: -6 0: 1 3 4 1: 2 3 4 2: 2 5 3: 1 3 optimal: oo + 2*v0 + 3/2*v2 -7 <= 0; value: 2 + 5*v0 -1*v3 -14 <= 0; value: -3 - 4*v1 + 3*v2 -14 = 0; value: 0 + v0 -15/4*v2 + 6*v3 -153/2 <= 0; value: -57 + 6*v0 -9/4*v2 -99/2 < 0; value: -36 + -2*v2 -2 <= 0; value: -6 0: 1 3 4 1: 2 3 4 2: 2 5 3 4 3: 1 3 0: 3 -> 3 1: 2 -> 2 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 -3*v2 + 1 = 0; value: 0 + 2*v0 -6*v1 -6 <= 0; value: -18 + 2*v0 -6*v2 + 6*v3 + 18 <= 0; value: 0 + 3*v2 -9 = 0; value: 0 + 5*v2 -15 = 0; value: 0 0: 2 3 1: 1 2 2: 1 3 4 5 3: 3 optimal: 14 + + 14 <= 0; value: 14 - 4*v1 -3*v2 + 1 = 0; value: 0 - 2*v0 -18 <= 0; value: 0 - 2*v0 -6*v2 + 6*v3 + 18 <= 0; value: 0 - v0 + 3*v3 = 0; value: 0 + = 0; value: 0 0: 2 3 4 5 1: 1 2 2: 1 3 4 5 2 3: 3 4 5 2 0: 0 -> 9 1: 2 -> 2 2: 3 -> 3 3: 0 -> -3 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 + 3*v2 -3*v3 -35 <= 0; value: -14 + 2*v1 + 4*v2 -18 = 0; value: 0 + -6*v1 -5*v3 + 32 <= 0; value: -23 + -6*v0 -2*v1 -4*v3 + 42 = 0; value: 0 + -2*v0 + v3 -2 <= 0; value: -1 0: 4 5 1: 1 2 3 4 2: 1 2 3: 1 3 4 5 optimal: 6 + + 6 <= 0; value: 6 + -179/4 <= 0; value: -179/4 - 2*v1 + 4*v2 -18 = 0; value: 0 - 32*v0 -80 <= 0; value: 0 - -6*v0 + 4*v2 -4*v3 + 24 = 0; value: 0 - -2*v0 + v3 -2 <= 0; value: 0 0: 4 5 3 1 1: 1 2 3 4 2: 1 2 3 4 3: 1 3 4 5 0: 2 -> 5/2 1: 5 -> -1/2 2: 2 -> 19/4 3: 5 -> 7 + 2*v0 -2*v1 <= 0; value: 4 + -5*v2 + 5 = 0; value: 0 + -6*v0 -4*v1 -7 < 0; value: -19 + -1*v1 <= 0; value: 0 + 6*v1 + 6*v2 -3*v3 + 6 = 0; value: 0 + v2 -2 < 0; value: -1 0: 2 1: 2 3 4 2: 1 4 5 3: 4 optimal: oo + 2*v0 <= 0; value: 4 + -5*v2 + 5 = 0; value: 0 + -6*v0 -7 < 0; value: -19 - -1*v1 <= 0; value: 0 + 6*v2 -3*v3 + 6 = 0; value: 0 + v2 -2 < 0; value: -1 0: 2 1: 2 3 4 2: 1 4 5 3: 4 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -6*v2 + 4*v3 + 14 = 0; value: 0 + -1*v1 -4*v2 + 15 = 0; value: 0 + -2*v0 -1*v1 + 2*v3 + 1 <= 0; value: -2 + -4*v1 + 6*v2 -14 <= 0; value: -8 + -4*v0 + 6*v3 -3 < 0; value: -1 0: 3 5 1: 2 3 4 2: 1 2 4 3: 1 3 5 optimal: (1/22 -e*1) + + 1/22 < 0; value: 1/22 - -6*v2 + 4*v3 + 14 = 0; value: 0 - -1*v1 -4*v2 + 15 = 0; value: 0 + -13/22 <= 0; value: -13/22 - 88/9*v0 -46/3 <= 0; value: 0 - -4*v0 + 6*v3 -3 < 0; value: -18/11 0: 3 5 4 1: 2 3 4 2: 1 2 4 3 3: 1 3 5 4 0: 1 -> 69/44 1: 3 -> 25/11 2: 3 -> 35/11 3: 1 -> 14/11 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -3*v1 <= 0; value: 0 + -4*v0 -6*v1 + v2 + 28 = 0; value: 0 + 2*v0 -4*v1 -5*v2 -15 <= 0; value: -31 + 3*v0 -2*v2 + 6*v3 -35 < 0; value: -18 + -1*v0 -5*v1 + 9 < 0; value: -9 0: 1 2 3 4 5 1: 1 2 3 5 2: 2 3 4 3: 4 optimal: 0 + <= 0; value: 0 - 3*v0 -3*v1 <= 0; value: 0 + -10*v0 + v2 + 28 = 0; value: 0 + -2*v0 -5*v2 -15 <= 0; value: -31 + 3*v0 -2*v2 + 6*v3 -35 < 0; value: -18 + -6*v0 + 9 < 0; value: -9 0: 1 2 3 4 5 1: 1 2 3 5 2: 2 3 4 3: 4 0: 3 -> 3 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + v1 + 5*v2 + 4*v3 -47 <= 0; value: -29 + 6*v0 + 6*v1 -18 = 0; value: 0 + -2*v0 -3*v3 <= 0; value: 0 + 4*v1 -12 <= 0; value: 0 + -3*v0 + 3*v1 -3*v2 <= 0; value: 0 0: 2 3 5 1: 1 2 4 5 2: 1 5 3: 1 3 optimal: oo + 4*v0 -6 <= 0; value: -6 + -1*v0 + 5*v2 + 4*v3 -44 <= 0; value: -29 - 6*v0 + 6*v1 -18 = 0; value: 0 + -2*v0 -3*v3 <= 0; value: 0 + -4*v0 <= 0; value: 0 + -6*v0 -3*v2 + 9 <= 0; value: 0 0: 2 3 5 1 4 1: 1 2 4 5 2: 1 5 3: 1 3 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -6*v1 -2*v2 + 12 = 0; value: 0 + -6*v0 + 3*v1 -4*v3 + 13 = 0; value: 0 + <= 0; value: 0 + 2*v2 + 2*v3 -12 <= 0; value: -4 + v0 -6*v1 + 5*v3 -3 = 0; value: 0 0: 1 2 5 1: 1 2 5 2: 1 4 3: 2 4 5 optimal: -37/18 + -37/18 <= 0; value: -37/18 - 6*v0 -6*v1 -2*v2 + 12 = 0; value: 0 - -3*v0 -1*v2 -4*v3 + 19 = 0; value: 0 + <= 0; value: 0 - 16*v0 -20 <= 0; value: 0 - -11*v0 -3*v3 + 23 = 0; value: 0 0: 1 2 5 4 1: 1 2 5 2: 1 4 2 5 3: 2 4 5 0: 1 -> 5/4 1: 3 -> 41/18 2: 0 -> 35/12 3: 4 -> 37/12 + 2*v0 -2*v1 <= 0; value: -8 + v3 -8 <= 0; value: -5 + -3*v0 -6*v3 -2 <= 0; value: -20 + -4*v0 + 6*v3 -18 = 0; value: 0 + -3*v1 -2*v3 + 2 < 0; value: -16 + -1*v0 + 4*v1 + 4*v3 -29 <= 0; value: -1 0: 2 3 5 1: 4 5 2: 3: 1 2 3 4 5 optimal: (73/3 -e*1) + + 73/3 < 0; value: 73/3 - 2/3*v0 -5 <= 0; value: 0 + -145/2 <= 0; value: -145/2 - -4*v0 + 6*v3 -18 = 0; value: 0 - -3*v1 -2*v3 + 2 < 0; value: -3 + -139/6 < 0; value: -139/6 0: 2 3 5 1 1: 4 5 2: 3: 1 2 3 4 5 0: 0 -> 15/2 1: 4 -> -11/3 2: 2 -> 2 3: 3 -> 8 + 2*v0 -2*v1 <= 0; value: -6 + <= 0; value: 0 + <= 0; value: 0 + v0 + 6*v2 -50 <= 0; value: -24 + -3*v2 -1*v3 + 17 = 0; value: 0 + v1 -5 = 0; value: 0 0: 3 1: 5 2: 3 4 3: 4 optimal: oo + 4*v3 + 22 <= 0; value: 42 + <= 0; value: 0 + <= 0; value: 0 - v0 + 6*v2 -50 <= 0; value: 0 - -3*v2 -1*v3 + 17 = 0; value: 0 - v1 -5 = 0; value: 0 0: 3 1: 5 2: 3 4 3: 4 0: 2 -> 26 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 4*v3 -4 = 0; value: 0 + v0 + v3 -4 <= 0; value: -1 + -4*v0 -3*v3 -7 <= 0; value: -16 + 3*v1 -3*v3 -7 <= 0; value: -16 + v1 + 5*v3 -15 = 0; value: 0 0: 2 3 1: 4 5 2: 1 3: 1 2 3 4 5 optimal: 162 + + 162 <= 0; value: 162 - -2*v2 + 4*v3 -4 = 0; value: 0 - v0 + 1/2*v2 -3 <= 0; value: 0 - -1*v0 -19 <= 0; value: 0 + -376 <= 0; value: -376 - v1 + 5*v3 -15 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 2 3 4 3: 1 2 3 4 5 0: 0 -> -19 1: 0 -> -100 2: 4 -> 44 3: 3 -> 23 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -6*v3 -5 <= 0; value: -3 + -1*v0 + 5*v1 + v2 -10 <= 0; value: 0 + -5*v1 -6*v2 + v3 -12 < 0; value: -45 + -4*v1 + v2 -4*v3 -3 < 0; value: -11 + 2*v0 + v1 + 4*v2 -31 < 0; value: -5 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 3: 1 3 4 optimal: (8695/247 -e*1) + + 8695/247 < 0; value: 8695/247 - 494/73*v0 -6731/73 < 0; value: -494/73 + -20537/494 <= 0; value: -20537/494 - -29/4*v2 + 6*v3 -33/4 <= 0; value: 0 - -4*v1 + v2 -4*v3 -3 < 0; value: -4 - 2*v0 + 73/24*v2 -265/8 < 0; value: -25447/11856 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 1 3: 1 3 4 2 5 0: 4 -> 6237/494 1: 2 -> -2535535/865488 2: 4 -> 67907/36062 3: 1 -> 3159349/865488 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 + 5 = 0; value: 0 + -2*v1 + v3 -4 <= 0; value: -1 + 2*v0 -3*v1 -3*v2 -6 <= 0; value: -3 + -4*v0 + 12 = 0; value: 0 + -5*v0 -5*v1 -1*v2 + 18 <= 0; value: -2 0: 3 4 5 1: 1 2 3 5 2: 3 5 3: 2 optimal: 4 + + 4 <= 0; value: 4 - -5*v1 + 5 = 0; value: 0 + v3 -6 <= 0; value: -1 + -3*v2 -3 <= 0; value: -3 - -4*v0 + 12 = 0; value: 0 + -1*v2 -2 <= 0; value: -2 0: 3 4 5 1: 1 2 3 5 2: 3 5 3: 2 0: 3 -> 3 1: 1 -> 1 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -10 + -6*v1 + 5*v2 + 3*v3 -2 <= 0; value: -1 + 4*v1 + 4*v3 -28 = 0; value: 0 + -5*v1 -4*v2 + 45 = 0; value: 0 + -2*v0 + 5*v2 -62 < 0; value: -37 + -2*v0 + 3*v1 -4*v3 -17 <= 0; value: -10 0: 4 5 1: 1 2 3 5 2: 1 3 4 3: 1 2 5 optimal: oo + 2*v0 -602/61 <= 0; value: -602/61 - 61/5*v2 -62 <= 0; value: 0 - 4*v1 + 4*v3 -28 = 0; value: 0 - -4*v2 + 5*v3 + 10 = 0; value: 0 + -2*v0 -2232/61 < 0; value: -2232/61 + -2*v0 -638/61 <= 0; value: -638/61 0: 4 5 1: 1 2 3 5 2: 1 3 4 5 3: 1 2 5 3 0: 0 -> 0 1: 5 -> 301/61 2: 5 -> 310/61 3: 2 -> 126/61 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -3*v1 + 4*v3 + 26 < 0; value: -1 + -3*v1 + 1 <= 0; value: -14 + -4*v0 -2*v3 + 20 <= 0; value: -2 + -3*v1 -3*v2 + v3 -19 <= 0; value: -43 + 4*v2 -29 <= 0; value: -13 0: 1 3 1: 1 2 4 2: 4 5 3: 1 3 4 optimal: (181/21 -e*1) + + 181/21 < 0; value: 181/21 - -6*v0 -3*v1 + 4*v3 + 26 < 0; value: -3 - 14*v0 -65 <= 0; value: 0 - -4*v0 -2*v3 + 20 <= 0; value: 0 + -3*v2 -135/7 <= 0; value: -219/7 + 4*v2 -29 <= 0; value: -13 0: 1 3 2 4 1: 1 2 4 2: 4 5 3: 1 3 4 2 0: 4 -> 65/14 1: 5 -> 4/3 2: 4 -> 4 3: 3 -> 5/7 + 2*v0 -2*v1 <= 0; value: -4 + -3*v1 + 3*v3 + 5 <= 0; value: -10 + -4*v0 -1*v1 + 7 <= 0; value: -10 + 6*v0 + 2*v3 -26 <= 0; value: -8 + -5*v1 -5*v2 -14 < 0; value: -44 + -3*v0 + 6*v1 -2*v2 -37 <= 0; value: -18 0: 2 3 5 1: 1 2 4 5 2: 4 5 3: 1 3 optimal: oo + 10*v0 -14 < 0; value: 16 - -3*v1 + 3*v3 + 5 <= 0; value: 0 - -4*v0 + v2 + 49/5 <= 0; value: 0 + -2*v0 -46/3 < 0; value: -64/3 - -5*v2 -5*v3 -67/3 < 0; value: -5 + -35*v0 + 123/5 < 0; value: -402/5 0: 2 3 5 1: 1 2 4 5 2: 4 5 2 3 3: 1 3 2 4 5 0: 3 -> 3 1: 5 -> -4 2: 1 -> 11/5 3: 0 -> -17/3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -4*v1 = 0; value: 0 + 5*v0 -3*v1 + 6*v3 -50 <= 0; value: -32 + -5*v0 -1*v3 -2 <= 0; value: -5 + -1*v0 + 4*v3 -27 <= 0; value: -15 + 6*v1 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 3: 2 3 4 5 optimal: oo + -7/3*v3 + 7 <= 0; value: 0 - -3*v0 -4*v1 = 0; value: 0 + 7/6*v3 -71/2 <= 0; value: -32 + 7/3*v3 -12 <= 0; value: -5 + 14/3*v3 -29 <= 0; value: -15 - -9/2*v0 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 3 4 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 + v1 -2*v2 -11 = 0; value: 0 + -3*v0 -3*v3 + 3 < 0; value: -9 + 2*v0 -2*v1 -8 <= 0; value: -2 + 5*v0 -6*v1 + 6*v3 -14 = 0; value: 0 + 2*v2 -8 <= 0; value: -2 0: 1 2 3 4 1: 1 3 4 2: 1 5 3: 2 4 optimal: 8 + + 8 <= 0; value: 8 - 4*v0 + v1 -2*v2 -11 = 0; value: 0 + -7/2*v0 + 8 < 0; value: -6 - 1/3*v0 -2*v3 -10/3 <= 0; value: 0 - 29*v0 -12*v2 + 6*v3 -80 = 0; value: 0 + 5*v0 -23 <= 0; value: -3 0: 1 2 3 4 5 1: 1 3 4 2: 1 5 3 4 3: 2 4 3 5 0: 4 -> 4 1: 1 -> 0 2: 3 -> 5/2 3: 0 -> -1 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 + 4*v3 -38 <= 0; value: -4 + v2 -1 = 0; value: 0 + 2*v0 -19 <= 0; value: -11 + 6*v1 + 6*v3 -64 <= 0; value: -4 + -6*v0 + 6*v3 -6 <= 0; value: 0 0: 3 5 1: 1 4 2: 1 2 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 4*v2 + 4*v3 -38 <= 0; value: -4 + v2 -1 = 0; value: 0 + 2*v0 -19 <= 0; value: -11 + 6*v1 + 6*v3 -64 <= 0; value: -4 + -6*v0 + 6*v3 -6 <= 0; value: 0 0: 3 5 1: 1 4 2: 1 2 3: 1 4 5 0: 4 -> 4 1: 5 -> 5 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 6*v2 -38 < 0; value: -20 + 6*v0 -44 < 0; value: -26 + 5*v1 -1*v3 -35 <= 0; value: -21 + -4*v0 + 4*v3 -2 <= 0; value: -10 + -1*v0 -5*v1 -1 <= 0; value: -19 0: 2 4 5 1: 1 3 5 2: 1 3: 3 4 optimal: (18 -e*1) + + 18 < 0; value: 18 + 6*v2 -94/3 <= 0; value: -4/3 - 6*v0 -44 < 0; value: -6 + -1*v3 -130/3 < 0; value: -133/3 + 4*v3 -94/3 < 0; value: -82/3 - -1*v0 -5*v1 -1 <= 0; value: 0 0: 2 4 5 1 3 1: 1 3 5 2: 1 3: 3 4 0: 3 -> 19/3 1: 3 -> -22/15 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 -5*v2 + 10 <= 0; value: -20 + -6*v3 -11 < 0; value: -23 + -6*v2 + 5*v3 + 5 < 0; value: -3 + -5*v2 + 11 <= 0; value: -4 + 5*v0 + 5*v2 -5*v3 -5 = 0; value: 0 0: 5 1: 1 2: 1 3 4 5 3: 2 3 5 optimal: oo + 2*v3 -2 <= 0; value: 2 - -5*v1 -5*v2 + 10 <= 0; value: 0 + -6*v3 -11 < 0; value: -23 + 6*v0 -1*v3 -1 < 0; value: -3 + 5*v0 -5*v3 + 6 <= 0; value: -4 - 5*v0 + 5*v2 -5*v3 -5 = 0; value: 0 0: 5 3 4 1: 1 2: 1 3 4 5 3: 2 3 5 4 0: 0 -> 0 1: 3 -> -1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -1*v3 -4 < 0; value: -11 + 5*v2 + 4*v3 -27 < 0; value: -15 + -4*v0 + 16 = 0; value: 0 + -6*v0 + 5*v1 <= 0; value: -9 + 4*v1 -5*v2 + 5*v3 -62 <= 0; value: -35 0: 1 3 4 1: 4 5 2: 2 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -1*v3 -4 < 0; value: -11 + 5*v2 + 4*v3 -27 < 0; value: -15 + -4*v0 + 16 = 0; value: 0 + -6*v0 + 5*v1 <= 0; value: -9 + 4*v1 -5*v2 + 5*v3 -62 <= 0; value: -35 0: 1 3 4 1: 4 5 2: 2 5 3: 1 2 5 0: 4 -> 4 1: 3 -> 3 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + v1 -3*v3 -50 < 0; value: -30 + 4*v1 -5*v3 -17 <= 0; value: -9 + -5*v1 -1*v3 + 5 <= 0; value: -5 + 3*v1 + v2 -6*v3 -6 = 0; value: 0 + -2*v0 + 6*v2 -6*v3 -2 <= 0; value: -8 0: 1 5 1: 1 2 3 4 2: 4 5 3: 1 2 3 4 5 optimal: (3501/244 -e*1) + + 3501/244 < 0; value: 3501/244 - 122/21*v0 -997/21 < 0; value: -122/21 + -6373/488 < 0; value: -6373/488 - 5/3*v2 -11*v3 -5 <= 0; value: 0 - 3*v1 + v2 -6*v3 -6 = 0; value: 0 - -2*v0 + 56/11*v2 + 8/11 <= 0; value: 0 0: 1 5 2 1: 1 2 3 4 2: 4 5 3 1 2 3: 1 2 3 4 5 0: 3 -> 875/122 1: 2 -> 10349/10248 2: 0 -> 9137/3416 3: 0 -> -505/10248 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -2*v1 -2*v2 -68 <= 0; value: -44 + -3*v0 + 5*v3 -7 < 0; value: -2 + 5*v2 -5*v3 -2 <= 0; value: -17 + 6*v2 + 5*v3 -68 <= 0; value: -42 + -5*v1 + 5*v3 -22 <= 0; value: -12 0: 1 2 1: 1 5 2: 1 3 4 3: 2 3 4 5 optimal: oo + -1*v0 + 194/5 <= 0; value: 169/5 - 6*v0 -4*v2 -292/5 <= 0; value: 0 + 9/2*v0 -82 < 0; value: -119/2 - 5*v2 -5*v3 -2 <= 0; value: 0 + 33/2*v0 -1153/5 <= 0; value: -1481/10 - -5*v1 + 5*v3 -22 <= 0; value: 0 0: 1 2 4 1: 1 5 2: 1 3 4 2 3: 2 3 4 5 1 0: 5 -> 5 1: 2 -> -119/10 2: 1 -> -71/10 3: 4 -> -15/2 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 -3*v1 -2*v3 -7 < 0; value: -29 + 5*v0 + 5*v1 -39 <= 0; value: -14 + <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -3 + 2*v0 -1*v2 <= 0; value: 0 0: 1 2 4 5 1: 1 2 2: 4 5 3: 1 optimal: oo + 6*v0 + 4/3*v3 + 14/3 < 0; value: 40/3 - -6*v0 -3*v1 -2*v3 -7 < 0; value: -3 + -5*v0 -10/3*v3 -152/3 < 0; value: -187/3 + <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -3 + 2*v0 -1*v2 <= 0; value: 0 0: 1 2 4 5 1: 1 2 2: 4 5 3: 1 2 0: 1 -> 1 1: 4 -> -14/3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -6 < 0; value: -15 + 3*v0 -6*v1 + 6*v2 -18 < 0; value: -9 + 6*v0 -4*v2 -6 = 0; value: 0 + -2*v1 + 6*v3 = 0; value: 0 + 5*v2 -19 < 0; value: -4 0: 2 3 1: 2 4 2: 1 2 3 5 3: 4 optimal: (29/3 -e*1) + + 29/3 < 0; value: 29/3 - -9/2*v0 -3/2 < 0; value: -9/2 - 3*v0 + 6*v2 -18*v3 -18 < 0; value: -18 - 6*v0 -4*v2 -6 = 0; value: 0 - -2*v1 + 6*v3 = 0; value: 0 + -29 < 0; value: -29 0: 2 3 1 5 1: 2 4 2: 1 2 3 5 3: 4 2 0: 3 -> 2/3 1: 3 -> -1/6 2: 3 -> -1/2 3: 1 -> -1/18 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -5*v2 + 5*v3 + 3 <= 0; value: -2 + -2*v0 -6*v1 -2*v2 + 13 <= 0; value: -1 + 5*v1 -6*v2 + 14 < 0; value: -4 + -4*v0 -6*v1 + v3 + 12 < 0; value: -2 + 4*v3 -22 <= 0; value: -14 0: 2 4 1: 1 2 3 4 2: 1 2 3 3: 1 4 5 optimal: oo + 10/3*v0 -1/3*v3 -4 < 0; value: 26/3 + -11/3*v0 + 43/6*v3 -7/2 < 0; value: -23/6 - -2*v0 -6*v1 -2*v2 + 13 <= 0; value: 0 + -28/3*v0 + 23/6*v3 + 21 < 0; value: -26/3 - -2*v0 + 2*v2 + v3 -1 < 0; value: -1/2 + 4*v3 -22 <= 0; value: -14 0: 2 4 1 3 1: 1 2 3 4 2: 1 2 3 4 3: 1 4 5 3 0: 4 -> 4 1: 0 -> -1/4 2: 3 -> 13/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -15 = 0; value: 0 + 4*v0 -3*v3 -7 < 0; value: -1 + 2*v0 + 2*v1 -26 < 0; value: -10 + -3*v0 -4*v2 -17 < 0; value: -38 + 4*v0 + 4*v2 -4*v3 -42 <= 0; value: -26 0: 2 3 4 5 1: 3 2: 1 4 5 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -15 = 0; value: 0 + 4*v0 -3*v3 -7 < 0; value: -1 + 2*v0 + 2*v1 -26 < 0; value: -10 + -3*v0 -4*v2 -17 < 0; value: -38 + 4*v0 + 4*v2 -4*v3 -42 <= 0; value: -26 0: 2 3 4 5 1: 3 2: 1 4 5 3: 2 5 0: 3 -> 3 1: 5 -> 5 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v3 <= 0; value: 0 + -3*v1 -6*v2 <= 0; value: 0 + v0 + 4*v1 + v2 -3 <= 0; value: -1 + -3*v1 + v2 = 0; value: 0 + -2*v1 + 3*v2 + 5*v3 <= 0; value: 0 0: 3 1: 2 3 4 5 2: 2 3 4 5 3: 1 5 optimal: 6 + + 6 <= 0; value: 6 + -6*v3 <= 0; value: 0 - -3*v1 -6*v2 <= 0; value: 0 - v0 -3 <= 0; value: 0 - 7*v2 = 0; value: 0 + 5*v3 <= 0; value: 0 0: 3 1: 2 3 4 5 2: 2 3 4 5 3: 1 5 0: 2 -> 3 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + = 0; value: 0 + 2*v1 -1*v3 + 2 = 0; value: 0 + v0 + 2*v2 -6 = 0; value: 0 + -2*v1 <= 0; value: 0 + -4*v1 + 6*v3 -14 < 0; value: -2 0: 3 1: 2 4 5 2: 3 3: 2 5 optimal: oo + -4*v2 + 12 <= 0; value: 8 + = 0; value: 0 - 2*v1 -1*v3 + 2 = 0; value: 0 - v0 + 2*v2 -6 = 0; value: 0 - -1*v3 + 2 <= 0; value: 0 + -2 < 0; value: -2 0: 3 1: 2 4 5 2: 3 3: 2 5 4 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -69 <= 0; value: -44 + -3*v0 -5*v3 -8 <= 0; value: -38 + -5*v0 -2*v2 + 33 = 0; value: 0 + v0 + 4*v2 -27 < 0; value: -6 + -4*v0 + 20 = 0; value: 0 0: 1 2 3 4 5 1: 2: 3 4 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -69 <= 0; value: -44 + -3*v0 -5*v3 -8 <= 0; value: -38 + -5*v0 -2*v2 + 33 = 0; value: 0 + v0 + 4*v2 -27 < 0; value: -6 + -4*v0 + 20 = 0; value: 0 0: 1 2 3 4 5 1: 2: 3 4 3: 2 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -3*v1 = 0; value: 0 + 4*v0 -6*v3 <= 0; value: 0 + <= 0; value: 0 + 4*v1 -21 <= 0; value: -13 + 5*v1 -1*v2 -5 = 0; value: 0 0: 1 2 1: 1 4 5 2: 5 3: 2 optimal: 21/4 + + 21/4 <= 0; value: 21/4 - 2*v0 -3*v1 = 0; value: 0 - 4*v0 -6*v3 <= 0; value: 0 + <= 0; value: 0 - 4/5*v2 -17 <= 0; value: 0 - -1*v2 + 5*v3 -5 = 0; value: 0 0: 1 2 5 4 1: 1 4 5 2: 5 4 3: 2 5 4 0: 3 -> 63/8 1: 2 -> 21/4 2: 5 -> 85/4 3: 2 -> 21/4 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 4*v3 + 12 = 0; value: 0 + -1*v2 + 3*v3 + 2 = 0; value: 0 + 6*v1 -2*v2 -14 = 0; value: 0 + -6*v1 -6*v3 + 16 < 0; value: -14 + -2*v1 + 1 < 0; value: -7 0: 1: 1 3 4 5 2: 2 3 3: 1 2 4 optimal: oo + 2*v0 -17/3 < 0; value: 7/3 - -4*v1 + 4*v3 + 12 = 0; value: 0 - -1*v2 + 3*v3 + 2 = 0; value: 0 + = 0; value: 0 - -4*v2 + 6 < 0; value: -4 + -14/3 <= 0; value: -14/3 0: 1: 1 3 4 5 2: 2 3 4 5 3: 1 2 4 3 5 0: 4 -> 4 1: 4 -> 19/6 2: 5 -> 5/2 3: 1 -> 1/6 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -5*v1 -6 < 0; value: -18 + 5*v1 + 6*v2 -5*v3 -38 = 0; value: 0 + -4*v1 + 3*v3 -5 < 0; value: -21 + v1 + 4*v2 -2*v3 -38 < 0; value: -22 + -2*v0 -4*v1 -11 <= 0; value: -31 0: 1 5 1: 1 2 3 4 5 2: 2 4 3: 2 3 4 optimal: oo + 2/5*v0 + 12/5 < 0; value: 16/5 - 4*v0 + 6*v2 -5*v3 -44 < 0; value: -5 - 5*v1 + 6*v2 -5*v3 -38 = 0; value: 0 + -4/5*v0 + 18/5*v2 -133/5 <= 0; value: -87/5 + -4/5*v0 + 8/5*v2 -108/5 <= 0; value: -92/5 + -26/5*v0 -31/5 <= 0; value: -83/5 0: 1 5 4 3 1: 1 2 3 4 5 2: 2 4 1 3 5 3: 2 3 4 1 5 0: 2 -> 2 1: 4 -> 7/5 2: 3 -> 3 3: 0 -> -13/5 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 12 < 0; value: -4 + -5*v0 -2*v3 -11 <= 0; value: -42 + 2*v0 -1*v1 + v2 -18 <= 0; value: -5 + 4*v1 -8 <= 0; value: -4 + 6*v3 -18 = 0; value: 0 0: 2 3 1: 3 4 2: 1 3 3: 2 5 optimal: (184/5 -e*1) + + 184/5 < 0; value: 184/5 - -4*v2 + 12 < 0; value: -2 - -5*v0 -2*v3 -11 <= 0; value: 0 - 2*v0 -1*v1 + v2 -18 <= 0; value: 0 + -476/5 < 0; value: -476/5 - 6*v3 -18 = 0; value: 0 0: 2 3 4 1: 3 4 2: 1 3 4 3: 2 5 4 0: 5 -> -17/5 1: 1 -> -213/10 2: 4 -> 7/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 5*v3 -5 <= 0; value: -1 + 2*v0 -8 = 0; value: 0 + 3*v1 -3*v2 -3 <= 0; value: 0 + -4*v0 -5*v1 + 33 < 0; value: -3 + -3*v0 -4*v1 + 5*v2 + 6 < 0; value: -7 0: 1 2 4 5 1: 3 4 5 2: 3 5 3: 1 optimal: (6/5 -e*1) + + 6/5 < 0; value: 6/5 + 5*v3 -21 <= 0; value: -1 - 2*v0 -8 = 0; value: 0 + -3*v2 + 36/5 < 0; value: -9/5 - -4*v0 -5*v1 + 33 < 0; value: -3/2 + 5*v2 -98/5 <= 0; value: -23/5 0: 1 2 4 5 3 1: 3 4 5 2: 3 5 3: 1 0: 4 -> 4 1: 4 -> 37/10 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + v0 -5*v1 + 4 = 0; value: 0 + -2*v1 -2*v3 + 2 = 0; value: 0 + -4*v0 + 2*v2 -3 < 0; value: -1 + -4*v0 + 4*v3 <= 0; value: -4 + -5*v3 <= 0; value: 0 0: 1 3 4 1: 1 2 2: 3 3: 2 4 5 optimal: 0 + <= 0; value: 0 - v0 -5*v1 + 4 = 0; value: 0 - -2/5*v0 -2*v3 + 2/5 = 0; value: 0 + 2*v2 -7 < 0; value: -1 + -4 <= 0; value: -4 - -5*v3 <= 0; value: 0 0: 1 3 4 2 1: 1 2 2: 3 3: 2 4 5 3 0: 1 -> 1 1: 1 -> 1 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -4*v1 + v2 + v3 + 3 <= 0; value: -9 + -4*v0 + 4*v2 <= 0; value: 0 + v1 + v2 -16 <= 0; value: -10 + -4*v1 -6*v3 + 11 < 0; value: -17 + -6*v0 + v1 + 8 = 0; value: 0 0: 2 5 1: 1 3 4 5 2: 1 2 3 3: 1 4 optimal: (31/81 -e*1) + + 31/81 < 0; value: 31/81 - -23*v2 + v3 + 35 <= 0; value: 0 - -4*v0 + 4*v2 <= 0; value: 0 + -2117/162 < 0; value: -2117/162 - -162/23*v3 + 149/23 < 0; value: -175/46 - -6*v0 + v1 + 8 = 0; value: 0 0: 2 5 4 1 3 1: 1 3 4 5 2: 1 2 3 4 3: 1 4 3 0: 2 -> 11813/7452 1: 4 -> 1877/1242 2: 2 -> 11813/7452 3: 2 -> 473/324 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + 6*v2 -6 <= 0; value: -2 + -5*v0 -2*v2 -5*v3 -3 < 0; value: -28 + -2*v1 + 4*v2 + 4 = 0; value: 0 + 4*v0 -9 <= 0; value: -5 + -5*v0 + 4*v1 + 2*v3 -13 < 0; value: -2 0: 2 4 5 1: 1 3 5 2: 1 2 3 3: 2 5 optimal: oo + 12*v0 + 10*v3 + 2 < 0; value: 54 + -25*v0 -25*v3 -17 < 0; value: -142 - -5*v0 -2*v2 -5*v3 -3 < 0; value: -2 - -2*v1 + 4*v2 + 4 = 0; value: 0 + 4*v0 -9 <= 0; value: -5 + -25*v0 -18*v3 -17 < 0; value: -114 0: 2 4 5 1 1: 1 3 5 2: 1 2 3 5 3: 2 5 1 0: 1 -> 1 1: 2 -> -24 2: 0 -> -13 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -35 <= 0; value: -23 + -2*v0 + 2*v2 + 6*v3 -47 <= 0; value: -15 + -2*v0 + 5*v1 -11 <= 0; value: -7 + 4*v2 + v3 -21 = 0; value: 0 + -2*v0 + 3*v1 -5*v3 -14 < 0; value: -39 0: 1 2 3 5 1: 3 5 2: 2 4 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -35 <= 0; value: -23 + -2*v0 + 2*v2 + 6*v3 -47 <= 0; value: -15 + -2*v0 + 5*v1 -11 <= 0; value: -7 + 4*v2 + v3 -21 = 0; value: 0 + -2*v0 + 3*v1 -5*v3 -14 < 0; value: -39 0: 1 2 3 5 1: 3 5 2: 2 4 3: 2 4 5 0: 3 -> 3 1: 2 -> 2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 < 0; value: -4 + v0 + 3*v1 -15 = 0; value: 0 + 3*v0 -9 <= 0; value: 0 + -2*v0 -6*v2 + 2*v3 + 14 <= 0; value: -2 + -3*v1 + 4*v2 <= 0; value: 0 0: 2 3 4 1: 1 2 5 2: 4 5 3: 4 optimal: -2 + -2 <= 0; value: -2 + -4 < 0; value: -4 - v0 + 3*v1 -15 = 0; value: 0 - 3*v0 -9 <= 0; value: 0 + -6*v2 + 2*v3 + 8 <= 0; value: -2 + 4*v2 -12 <= 0; value: 0 0: 2 3 4 1 5 1: 1 2 5 2: 4 5 3: 4 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -6*v1 -27 <= 0; value: -9 + -6*v0 -6*v2 + 18 < 0; value: -24 + -6*v2 -5*v3 + 19 <= 0; value: -14 + v1 -1 <= 0; value: 0 + 6*v1 + 2*v2 -5*v3 -1 <= 0; value: -4 0: 1 2 1: 1 4 5 2: 2 3 5 3: 3 5 optimal: 9 + + 9 <= 0; value: 9 - 6*v0 -6*v1 -27 <= 0; value: 0 + -6*v0 -6*v2 + 18 < 0; value: -24 + -6*v2 -5*v3 + 19 <= 0; value: -14 + v0 -11/2 <= 0; value: -3/2 + 6*v0 + 2*v2 -5*v3 -28 <= 0; value: -13 0: 1 2 4 5 1: 1 4 5 2: 2 3 5 3: 3 5 0: 4 -> 4 1: 1 -> -1/2 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 3*v2 -60 <= 0; value: -39 + 4*v0 + 4*v1 -64 < 0; value: -36 + -2*v0 + 3*v2 -2*v3 -1 = 0; value: 0 + v1 -6*v2 -7 <= 0; value: -21 + -6*v0 + v1 -6 <= 0; value: -20 0: 2 3 5 1: 1 2 4 5 2: 1 3 4 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 3*v2 -60 <= 0; value: -39 + 4*v0 + 4*v1 -64 < 0; value: -36 + -2*v0 + 3*v2 -2*v3 -1 = 0; value: 0 + v1 -6*v2 -7 <= 0; value: -21 + -6*v0 + v1 -6 <= 0; value: -20 0: 2 3 5 1: 1 2 4 5 2: 1 3 4 3: 3 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 6*v2 -75 <= 0; value: -44 + -3*v0 -5*v3 -25 < 0; value: -60 + -2*v3 + 6 < 0; value: -2 + 3*v1 -5*v2 -4 = 0; value: 0 + -5*v3 + 20 = 0; value: 0 0: 1 2 1: 4 2: 1 4 3: 2 3 5 optimal: oo + 2*v0 -10/3*v2 -8/3 <= 0; value: 4 + 5*v0 + 6*v2 -75 <= 0; value: -44 + -3*v0 -5*v3 -25 < 0; value: -60 + -2*v3 + 6 < 0; value: -2 - 3*v1 -5*v2 -4 = 0; value: 0 + -5*v3 + 20 = 0; value: 0 0: 1 2 1: 4 2: 1 4 3: 2 3 5 0: 5 -> 5 1: 3 -> 3 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 + v1 + 2*v3 -8 <= 0; value: -3 + 4*v0 -5*v2 -3*v3 -12 <= 0; value: -32 + 4*v1 + 2*v3 -44 <= 0; value: -24 + v1 -1*v2 -2*v3 -1 <= 0; value: 0 + 5*v0 + 6*v1 + 6*v3 -33 <= 0; value: -3 0: 1 2 5 1: 1 3 4 5 2: 2 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 + v1 + 2*v3 -8 <= 0; value: -3 + 4*v0 -5*v2 -3*v3 -12 <= 0; value: -32 + 4*v1 + 2*v3 -44 <= 0; value: -24 + v1 -1*v2 -2*v3 -1 <= 0; value: 0 + 5*v0 + 6*v1 + 6*v3 -33 <= 0; value: -3 0: 1 2 5 1: 1 3 4 5 2: 2 4 3: 1 2 3 4 5 0: 0 -> 0 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + v0 -5*v3 + 1 <= 0; value: -2 + -3*v0 -6*v1 + 18 = 0; value: 0 + 2*v0 -1*v3 -3 = 0; value: 0 + -3*v1 -5*v3 + 11 = 0; value: 0 + -5*v0 -4*v3 + 2 <= 0; value: -12 0: 1 2 3 5 1: 2 4 2: 3: 1 3 4 5 optimal: 0 + <= 0; value: 0 + -2 <= 0; value: -2 - -3*v0 -6*v1 + 18 = 0; value: 0 - 2*v0 -1*v3 -3 = 0; value: 0 - -17/4*v3 + 17/4 = 0; value: 0 + -12 <= 0; value: -12 0: 1 2 3 5 4 1: 2 4 2: 3: 1 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 18 = 0; value: 0 + 5*v1 + v3 -56 <= 0; value: -35 + 3*v3 -3 = 0; value: 0 + 3*v2 -5*v3 -4 = 0; value: 0 + 2*v0 + 6*v1 + 4*v2 -56 <= 0; value: -20 0: 5 1: 2 5 2: 1 4 5 3: 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 18 = 0; value: 0 + 5*v1 + v3 -56 <= 0; value: -35 + 3*v3 -3 = 0; value: 0 + 3*v2 -5*v3 -4 = 0; value: 0 + 2*v0 + 6*v1 + 4*v2 -56 <= 0; value: -20 0: 5 1: 2 5 2: 1 4 5 3: 2 3 4 0: 0 -> 0 1: 4 -> 4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 4*v2 + 8 = 0; value: 0 + -5*v0 + 4*v1 <= 0; value: 0 + -3*v2 + 5*v3 <= 0; value: -4 + -1*v1 + 4*v2 -6*v3 -2 <= 0; value: -1 + = 0; value: 0 0: 1 2 1: 2 4 2: 1 3 4 3: 3 4 optimal: oo + v0 + 28/5 <= 0; value: 48/5 - -5*v0 + 4*v2 + 8 = 0; value: 0 + -3*v0 -56/5 <= 0; value: -116/5 - -3*v2 + 5*v3 <= 0; value: 0 - -1*v1 + 4*v2 -6*v3 -2 <= 0; value: 0 + = 0; value: 0 0: 1 2 1: 2 4 2: 1 3 4 2 3: 3 4 2 0: 4 -> 4 1: 5 -> -4/5 2: 3 -> 3 3: 1 -> 9/5 + 2*v0 -2*v1 <= 0; value: -10 + 3*v0 -6*v1 + 6*v2 -5 <= 0; value: -29 + 2*v2 -5 <= 0; value: -3 + -1*v1 -4*v2 + 6*v3 -1 <= 0; value: -10 + -5*v0 -4*v3 <= 0; value: 0 + -4*v1 + 2*v2 + 6*v3 + 9 < 0; value: -9 0: 1 4 1: 1 3 5 2: 1 2 3 5 3: 3 4 5 optimal: (10 -e*1) + + 10 < 0; value: 10 - 21/2*v0 -62/3 <= 0; value: 0 + -716/63 <= 0; value: -716/63 - -45/8*v0 -9/2*v2 -13/4 <= 0; value: 0 - -5*v0 -4*v3 <= 0; value: 0 - -4*v1 + 2*v2 + 6*v3 + 9 < 0; value: -4 0: 1 4 3 2 1: 1 3 5 2: 1 2 3 5 3: 3 4 5 1 0: 0 -> 124/63 1: 5 -> -128/63 2: 1 -> -401/126 3: 0 -> -155/63 + 2*v0 -2*v1 <= 0; value: -2 + v0 + 6*v2 -80 < 0; value: -49 + v0 -2*v1 < 0; value: -3 + 2*v0 -2*v1 + 2 = 0; value: 0 + 3*v2 -39 < 0; value: -24 + -3*v0 + 2*v1 + v3 -15 <= 0; value: -9 0: 1 2 3 5 1: 2 3 5 2: 1 4 3: 5 optimal: -2 + -2 <= 0; value: -2 + v0 + 6*v2 -80 < 0; value: -49 + -1*v0 -2 < 0; value: -3 - 2*v0 -2*v1 + 2 = 0; value: 0 + 3*v2 -39 < 0; value: -24 + -1*v0 + v3 -13 <= 0; value: -9 0: 1 2 3 5 1: 2 3 5 2: 1 4 3: 5 0: 1 -> 1 1: 2 -> 2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 -1*v2 -14 < 0; value: -7 + -6*v2 -5*v3 -36 < 0; value: -79 + 2*v0 + 4*v2 + 2*v3 -33 <= 0; value: -7 + 3*v0 -15 <= 0; value: -9 + 6*v3 -42 <= 0; value: -12 0: 3 4 1: 1 2: 1 2 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 -1*v2 -14 < 0; value: -7 + -6*v2 -5*v3 -36 < 0; value: -79 + 2*v0 + 4*v2 + 2*v3 -33 <= 0; value: -7 + 3*v0 -15 <= 0; value: -9 + 6*v3 -42 <= 0; value: -12 0: 3 4 1: 1 2: 1 2 3 3: 2 3 5 0: 2 -> 2 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 + v2 + 3*v3 -7 < 0; value: -3 + -2*v1 -1*v3 + 4 = 0; value: 0 + -1*v0 + 4*v2 -34 <= 0; value: -20 + 5*v0 -27 <= 0; value: -17 + <= 0; value: 0 0: 3 4 1: 1 2 2: 1 3 3: 1 2 optimal: oo + 2*v0 -1/6*v2 -5/6 < 0; value: 5/2 - v2 + 6*v3 -19 < 0; value: -3/2 - -2*v1 -1*v3 + 4 = 0; value: 0 + -1*v0 + 4*v2 -34 <= 0; value: -20 + 5*v0 -27 <= 0; value: -17 + <= 0; value: 0 0: 3 4 1: 1 2 2: 1 3 3: 1 2 0: 2 -> 2 1: 1 -> 7/8 2: 4 -> 4 3: 2 -> 9/4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 + 4*v3 -7 < 0; value: -3 + 6*v2 + 3*v3 -9 = 0; value: 0 + 6*v0 + 3*v1 + 2*v2 -16 < 0; value: -2 + 2*v3 -2 <= 0; value: 0 + 4*v1 <= 0; value: 0 0: 3 1: 1 3 5 2: 2 3 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 + 4*v3 -7 < 0; value: -3 + 6*v2 + 3*v3 -9 = 0; value: 0 + 6*v0 + 3*v1 + 2*v2 -16 < 0; value: -2 + 2*v3 -2 <= 0; value: 0 + 4*v1 <= 0; value: 0 0: 3 1: 1 3 5 2: 2 3 3: 1 2 4 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 + 3*v2 -17 = 0; value: 0 + -5*v1 + 4*v2 + 2 <= 0; value: -2 + 5*v1 -1*v2 -16 = 0; value: 0 + 5*v0 -14 <= 0; value: -9 + -6*v1 + 5*v2 -5*v3 + 29 <= 0; value: 0 0: 1 4 1: 2 3 5 2: 1 2 3 5 3: 5 optimal: -6/5 + -6/5 <= 0; value: -6/5 - 5*v0 + 3*v2 -17 = 0; value: 0 + -11 <= 0; value: -11 - 5*v1 -1*v2 -16 = 0; value: 0 - 5*v0 -14 <= 0; value: 0 + -5*v3 + 68/5 <= 0; value: -57/5 0: 1 4 2 5 1: 2 3 5 2: 1 2 3 5 3: 5 0: 1 -> 14/5 1: 4 -> 17/5 2: 4 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -3*v1 -21 <= 0; value: -3 + -4*v0 + 6*v2 -6*v3 + 20 = 0; value: 0 + -5*v0 -6*v2 + 24 <= 0; value: -19 + 5*v1 -26 <= 0; value: -6 + -6*v1 + v2 + 2 < 0; value: -19 0: 1 2 3 1: 1 4 5 2: 2 3 5 3: 2 optimal: (502/77 -e*1) + + 502/77 < 0; value: 502/77 - 6*v0 -3*v1 -21 <= 0; value: 0 - -4*v0 + 6*v2 -6*v3 + 20 = 0; value: 0 - -77/12*v2 + 17/3 <= 0; value: 0 + -1817/77 < 0; value: -1817/77 - -17*v2 + 18*v3 -16 < 0; value: -885/77 0: 1 2 3 5 4 1: 1 4 5 2: 2 3 5 4 3: 2 3 5 4 0: 5 -> 1447/308 1: 4 -> 369/154 2: 3 -> 68/77 3: 3 -> 167/154 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -1*v1 + v2 + 4 <= 0; value: 0 + -5*v0 -4*v1 + 18 = 0; value: 0 + -6*v1 + 6*v3 -5 <= 0; value: -11 + -3*v0 -2*v2 + 2*v3 + 8 = 0; value: 0 + 3*v0 -6*v2 -1 < 0; value: -7 0: 1 2 4 5 1: 1 2 3 2: 1 4 5 3: 3 4 optimal: 33/14 + + 33/14 <= 0; value: 33/14 - -2*v0 -1*v1 + v2 + 4 <= 0; value: 0 - 9*v0 -4*v3 -14 = 0; value: 0 - 21*v0 -53 <= 0; value: 0 - -3*v0 -2*v2 + 2*v3 + 8 = 0; value: 0 + -109/14 < 0; value: -109/14 0: 1 2 4 5 3 1: 1 2 3 2: 1 4 5 2 3 3: 3 4 5 2 0: 2 -> 53/21 1: 2 -> 113/84 2: 2 -> 67/28 3: 1 -> 61/28 + 2*v0 -2*v1 <= 0; value: 8 + v1 -4*v2 + 12 = 0; value: 0 + -2*v0 + 5 < 0; value: -3 + -5*v0 -4*v2 + 2*v3 -5 < 0; value: -31 + <= 0; value: 0 + v0 + v2 -20 < 0; value: -13 0: 2 3 5 1: 1 2: 1 3 5 3: 3 optimal: oo + 12*v0 -4*v3 + 34 < 0; value: 70 - v1 -4*v2 + 12 = 0; value: 0 + -2*v0 + 5 < 0; value: -3 - -5*v0 -4*v2 + 2*v3 -5 < 0; value: -4 + <= 0; value: 0 + -1/4*v0 + 1/2*v3 -85/4 < 0; value: -83/4 0: 2 3 5 1: 1 2: 1 3 5 3: 3 5 0: 4 -> 4 1: 0 -> -27 2: 3 -> -15/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -1*v3 + 1 <= 0; value: 0 + 6*v0 -4*v2 -19 < 0; value: -7 + -1*v1 + v2 -1 <= 0; value: -3 + -6*v0 + 3*v1 + 4*v2 -4 <= 0; value: -1 + <= 0; value: 0 0: 2 4 1: 3 4 2: 2 3 4 3: 1 optimal: oo + -1*v0 + 23/2 < 0; value: 15/2 + -1*v3 + 1 <= 0; value: 0 - 6*v0 -4*v2 -19 < 0; value: -7/2 - -1*v1 + v2 -1 <= 0; value: 0 + 9/2*v0 -161/4 < 0; value: -89/4 + <= 0; value: 0 0: 2 4 1: 3 4 2: 2 3 4 3: 1 0: 4 -> 4 1: 5 -> 9/8 2: 3 -> 17/8 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 5*v2 -2*v3 + 2 = 0; value: 0 + -5*v0 -4*v1 -6*v3 + 27 = 0; value: 0 + -6*v0 + 4*v1 -4*v3 -9 < 0; value: -3 + <= 0; value: 0 + 4*v0 -10 <= 0; value: -6 0: 2 3 5 1: 2 3 2: 1 3: 1 2 3 optimal: oo + 9/2*v0 + 15/2*v2 -21/2 <= 0; value: -6 - 5*v2 -2*v3 + 2 = 0; value: 0 - -5*v0 -4*v1 -6*v3 + 27 = 0; value: 0 + -11*v0 -25*v2 + 8 < 0; value: -3 + <= 0; value: 0 + 4*v0 -10 <= 0; value: -6 0: 2 3 5 1: 2 3 2: 1 3 3: 1 2 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -6*v1 + 2*v2 + 8 = 0; value: 0 + 5*v1 + 5*v2 -5*v3 -39 <= 0; value: -24 + -5*v1 -5*v2 + 33 <= 0; value: -2 + -4*v1 + v2 -4 <= 0; value: -17 + -2*v0 + 3*v2 + 5*v3 -32 <= 0; value: -13 0: 1 5 1: 1 2 3 4 2: 1 2 3 4 5 3: 2 5 optimal: oo + 3/2*v0 -53/10 <= 0; value: 11/5 - 2*v0 -6*v1 + 2*v2 + 8 = 0; value: 0 + -5*v3 -6 <= 0; value: -26 - -5/3*v0 -20/3*v2 + 79/3 <= 0; value: 0 + -5/4*v0 -213/20 <= 0; value: -169/10 + -11/4*v0 + 5*v3 -403/20 <= 0; value: -139/10 0: 1 5 3 4 2 1: 1 2 3 4 2: 1 2 3 4 5 3: 2 5 0: 5 -> 5 1: 4 -> 39/10 2: 3 -> 27/10 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 + 2*v2 -8 <= 0; value: -4 + 6*v0 -6*v3 + 10 <= 0; value: -8 + -1*v2 -1 <= 0; value: -3 + 2*v2 -4*v3 + 8 = 0; value: 0 + -4*v0 <= 0; value: 0 0: 1 2 5 1: 2: 1 3 4 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 + 2*v2 -8 <= 0; value: -4 + 6*v0 -6*v3 + 10 <= 0; value: -8 + -1*v2 -1 <= 0; value: -3 + 2*v2 -4*v3 + 8 = 0; value: 0 + -4*v0 <= 0; value: 0 0: 1 2 5 1: 2: 1 3 4 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 + 2*v2 -36 = 0; value: 0 + v1 -3*v3 -3 < 0; value: -8 + 6*v0 -37 <= 0; value: -7 + -4*v0 -6*v3 -27 <= 0; value: -59 + 6*v0 -6*v1 -44 <= 0; value: -20 0: 1 3 4 5 1: 2 5 2: 1 3: 2 4 optimal: 44/3 + + 44/3 <= 0; value: 44/3 + 6*v0 + 2*v2 -36 = 0; value: 0 + v0 -3*v3 -31/3 < 0; value: -34/3 + 6*v0 -37 <= 0; value: -7 + -4*v0 -6*v3 -27 <= 0; value: -59 - 6*v0 -6*v1 -44 <= 0; value: 0 0: 1 3 4 5 2 1: 2 5 2: 1 3: 2 4 0: 5 -> 5 1: 1 -> -7/3 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + <= 0; value: 0 + -2*v1 + 4 = 0; value: 0 + 3*v1 + 3*v2 + 3*v3 -55 <= 0; value: -34 + -3*v0 + 2*v1 -3*v3 -6 <= 0; value: -20 + -2*v0 -2*v3 + 9 < 0; value: -3 0: 4 5 1: 2 3 4 2: 3 3: 3 4 5 optimal: oo + 2*v0 -4 <= 0; value: 6 + <= 0; value: 0 - -2*v1 + 4 = 0; value: 0 + 3*v2 + 3*v3 -49 <= 0; value: -34 + -3*v0 -3*v3 -2 <= 0; value: -20 + -2*v0 -2*v3 + 9 < 0; value: -3 0: 4 5 1: 2 3 4 2: 3 3: 3 4 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 + 2*v3 -2 <= 0; value: -8 + v0 + 2*v2 -15 <= 0; value: -1 + -5*v0 -3*v3 <= 0; value: -26 + 3*v0 -1*v1 + 3*v2 -35 <= 0; value: -9 + -4*v2 + 3*v3 + 14 = 0; value: 0 0: 2 3 4 1: 4 2: 1 2 4 5 3: 1 3 5 optimal: oo + 7/2*v0 + 49 <= 0; value: 63 + -5/6*v0 -9 <= 0; value: -37/3 + -3/2*v0 -8 <= 0; value: -14 - -5*v0 -3*v3 <= 0; value: 0 - 3*v0 -1*v1 + 3*v2 -35 <= 0; value: 0 - -4*v2 + 3*v3 + 14 = 0; value: 0 0: 2 3 4 1 1: 4 2: 1 2 4 5 3: 1 3 5 2 0: 4 -> 4 1: 1 -> -55/2 2: 5 -> -3/2 3: 2 -> -20/3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 6*v2 + 6*v3 -70 <= 0; value: -38 + 4*v1 + v3 -54 < 0; value: -29 + -4*v0 -4*v3 -1 <= 0; value: -37 + v1 + 6*v3 -60 < 0; value: -25 + 6*v1 + 4*v3 -126 <= 0; value: -76 0: 3 1: 1 2 4 5 2: 1 3: 1 2 3 4 5 optimal: oo + 8*v0 -6*v2 + 143/2 <= 0; value: 183/2 - -2*v1 + 6*v2 + 6*v3 -70 <= 0; value: 0 + -13*v0 + 12*v2 -789/4 < 0; value: -901/4 - -4*v0 -4*v3 -1 <= 0; value: 0 + -9*v0 + 3*v2 -389/4 < 0; value: -509/4 + -22*v0 + 18*v2 -683/2 <= 0; value: -787/2 0: 3 2 4 5 1: 1 2 4 5 2: 1 2 4 5 3: 1 2 3 4 5 0: 4 -> 4 1: 5 -> -167/4 2: 2 -> 2 3: 5 -> -17/4 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 + 6*v2 -6 = 0; value: 0 + 4*v2 + 5*v3 -23 <= 0; value: -4 + 4*v2 -6*v3 + 14 = 0; value: 0 + 2*v1 + 2*v2 + 6*v3 -25 <= 0; value: -1 + <= 0; value: 0 0: 1 1: 4 2: 1 2 3 4 3: 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 + 6*v2 -6 = 0; value: 0 + 4*v2 + 5*v3 -23 <= 0; value: -4 + 4*v2 -6*v3 + 14 = 0; value: 0 + 2*v1 + 2*v2 + 6*v3 -25 <= 0; value: -1 + <= 0; value: 0 0: 1 1: 4 2: 1 2 3 4 3: 2 3 4 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 6*v3 -61 <= 0; value: -31 + 3*v1 <= 0; value: 0 + 4*v1 + 4*v3 -20 = 0; value: 0 + -6*v0 + 5*v3 -54 < 0; value: -29 + -5*v0 -5*v1 <= 0; value: 0 0: 1 4 5 1: 2 3 5 2: 3: 1 3 4 optimal: 124 + + 124 <= 0; value: 124 - v0 -31 <= 0; value: 0 + -93 <= 0; value: -93 - 4*v1 + 4*v3 -20 = 0; value: 0 + -60 < 0; value: -60 - -5*v0 + 5*v3 -25 <= 0; value: 0 0: 1 4 5 2 1: 2 3 5 2: 3: 1 3 4 5 2 0: 0 -> 31 1: 0 -> -31 2: 2 -> 2 3: 5 -> 36 + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -2*v1 + 4*v3 + 15 = 0; value: 0 + 6*v0 + 5*v2 -66 <= 0; value: -21 + 4*v2 -29 <= 0; value: -17 + 3*v0 -2*v3 -28 < 0; value: -13 + -1*v3 <= 0; value: 0 0: 1 2 4 1: 1 2: 2 3 3: 1 4 5 optimal: (95/3 -e*1) + + 95/3 < 0; value: 95/3 - -3*v0 -2*v1 + 4*v3 + 15 = 0; value: 0 - 6*v0 + 5*v2 -66 <= 0; value: 0 + -21 < 0; value: -21 - -5/2*v2 + 5 < 0; value: -5/4 - -1*v3 <= 0; value: 0 0: 1 2 4 1: 1 2: 2 3 4 3: 1 4 5 0: 5 -> 107/12 1: 0 -> -47/8 2: 3 -> 5/2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 -3*v1 + v3 + 1 <= 0; value: -3 + 6*v0 <= 0; value: 0 + v0 -1*v1 + 3*v2 -13 <= 0; value: 0 + -2*v0 + 4*v1 + 6*v2 -38 = 0; value: 0 + -3*v0 + 4*v1 -10 <= 0; value: -2 0: 1 2 3 4 5 1: 1 3 4 5 2: 3 4 3: 1 optimal: -4 + -4 <= 0; value: -4 + v3 -5 <= 0; value: -3 - 6*v0 <= 0; value: 0 - v0 -1*v1 + 3*v2 -13 <= 0; value: 0 - 2*v0 + 18*v2 -90 = 0; value: 0 + -2 <= 0; value: -2 0: 1 2 3 4 5 1: 1 3 4 5 2: 3 4 1 5 3: 1 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -6*v3 + 13 <= 0; value: -17 + v0 + 3*v2 -5*v3 -2 <= 0; value: -7 + 5*v0 + v1 + 3*v3 -31 = 0; value: 0 + 4*v3 -24 <= 0; value: -8 + 5*v3 -56 < 0; value: -36 0: 1 2 3 1: 3 2: 2 3: 1 2 3 4 5 optimal: oo + -36*v2 + 358 <= 0; value: 214 + 6*v2 -87 <= 0; value: -63 - v0 + 3*v2 -32 <= 0; value: 0 - 5*v0 + v1 + 3*v3 -31 = 0; value: 0 - 4*v3 -24 <= 0; value: 0 + -26 < 0; value: -26 0: 1 2 3 1: 3 2: 2 1 3: 1 2 3 4 5 0: 3 -> 20 1: 4 -> -87 2: 4 -> 4 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: -10 + 3*v2 -4*v3 -10 <= 0; value: -23 + 2*v2 + 2*v3 -26 <= 0; value: -16 + -3*v0 -2*v1 -7 < 0; value: -17 + 4*v1 -56 <= 0; value: -36 + 6*v0 <= 0; value: 0 0: 3 5 1: 3 4 2: 1 2 3: 1 2 optimal: (7 -e*1) + + 7 < 0; value: 7 + 3*v2 -4*v3 -10 <= 0; value: -23 + 2*v2 + 2*v3 -26 <= 0; value: -16 - -3*v0 -2*v1 -7 < 0; value: -2 + -70 < 0; value: -70 - 6*v0 <= 0; value: 0 0: 3 5 4 1: 3 4 2: 1 2 3: 1 2 0: 0 -> 0 1: 5 -> -5/2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 4*v3 + 1 < 0; value: -5 + 2*v1 + 2*v2 -34 <= 0; value: -18 + -3*v2 + 4*v3 -3 = 0; value: 0 + 5*v0 + 5*v1 -141 <= 0; value: -91 + 6*v0 -2*v3 -25 <= 0; value: -1 0: 4 5 1: 2 4 2: 1 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 4*v3 + 1 < 0; value: -5 + 2*v1 + 2*v2 -34 <= 0; value: -18 + -3*v2 + 4*v3 -3 = 0; value: 0 + 5*v0 + 5*v1 -141 <= 0; value: -91 + 6*v0 -2*v3 -25 <= 0; value: -1 0: 4 5 1: 2 4 2: 1 2 3 3: 1 3 5 0: 5 -> 5 1: 5 -> 5 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 5*v1 + 5*v2 + 2*v3 -62 < 0; value: -29 + -4*v1 -1*v2 + 4*v3 -8 <= 0; value: -3 + 5*v0 + 4*v1 -8 = 0; value: 0 + 3*v0 -6*v1 -2*v2 -4 <= 0; value: -22 + -6*v0 -2*v2 -6*v3 + 30 = 0; value: 0 0: 3 4 5 1: 1 2 3 4 2: 1 2 4 5 3: 1 2 5 optimal: (574/29 -e*1) + + 574/29 < 0; value: 574/29 - 58/21*v2 -382/7 < 0; value: -58/21 + -3203/87 < 0; value: -3203/87 - 5*v0 + 4*v1 -8 = 0; value: 0 - -11/2*v2 -21/2*v3 + 73/2 <= 0; value: 0 - -6*v0 -2*v2 -6*v3 + 30 = 0; value: 0 0: 3 4 5 2 1 1: 1 2 3 4 2: 1 2 4 5 3: 1 2 5 4 0: 0 -> 3104/609 1: 2 -> -2662/609 2: 3 -> 544/29 3: 4 -> -1289/203 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -6*v3 + 3 <= 0; value: -18 + v0 + 2*v1 + 4*v3 -53 <= 0; value: -31 + -6*v0 -14 <= 0; value: -38 + -1*v3 + 3 < 0; value: -1 + -3*v1 + 1 <= 0; value: -2 0: 2 3 1: 1 2 5 2: 3: 1 2 4 optimal: (80 -e*1) + + 80 < 0; value: 80 + -14 <= 0; value: -14 - v0 + 4*v3 -157/3 <= 0; value: 0 + -256 < 0; value: -256 - -1*v3 + 3 < 0; value: -1/2 - -3*v1 + 1 <= 0; value: 0 0: 2 3 1: 1 2 5 2: 3: 1 2 4 3 0: 4 -> 115/3 1: 1 -> 1/3 2: 1 -> 1 3: 4 -> 7/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 -1*v3 -3 <= 0; value: -11 + 3*v0 + 4*v1 + 5*v3 -53 < 0; value: -18 + v0 -2*v1 + 6*v3 -41 <= 0; value: -22 + 3*v0 + 2*v1 -1*v3 -8 <= 0; value: -3 + -3*v1 + 2*v3 <= 0; value: -1 0: 1 2 3 4 1: 2 3 4 5 2: 3: 1 2 3 4 5 optimal: 218/5 + + 218/5 <= 0; value: 218/5 - -4*v0 -1*v3 -3 <= 0; value: 0 + -1127/5 < 0; value: -1127/5 + -752/5 <= 0; value: -752/5 - 5/3*v0 -9 <= 0; value: 0 - -3*v1 + 2*v3 <= 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 3: 1 2 3 4 5 0: 1 -> 27/5 1: 3 -> -82/5 2: 5 -> 5 3: 4 -> -123/5 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 3*v1 -34 < 0; value: -15 + v1 + 4*v3 -13 < 0; value: -6 + -1*v3 + 1 <= 0; value: 0 + -2*v2 + 1 < 0; value: -9 + v0 + 2*v1 -23 <= 0; value: -15 0: 1 5 1: 1 2 5 2: 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 3*v1 -34 < 0; value: -15 + v1 + 4*v3 -13 < 0; value: -6 + -1*v3 + 1 <= 0; value: 0 + -2*v2 + 1 < 0; value: -9 + v0 + 2*v1 -23 <= 0; value: -15 0: 1 5 1: 1 2 5 2: 4 3: 2 3 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 -10 <= 0; value: -5 + -3*v1 -2*v2 + 8 = 0; value: 0 + -6*v1 -4*v3 + 24 = 0; value: 0 + -6*v1 + 2*v3 -4 < 0; value: -10 + -2*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3: 3 4 5 optimal: oo + 2*v0 -8/3 <= 0; value: -2/3 - 5*v3 -20 <= 0; value: 0 - -3*v1 -2*v2 + 8 = 0; value: 0 - 4*v2 -4*v3 + 8 = 0; value: 0 + -4 < 0; value: -4 + -11 <= 0; value: -11 0: 1: 2 3 4 2: 1 2 3 4 3: 3 4 5 1 0: 1 -> 1 1: 2 -> 4/3 2: 1 -> 2 3: 3 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 -4*v3 -34 < 0; value: -71 + -1*v0 -1*v2 + 7 = 0; value: 0 + -3*v1 + 2 < 0; value: -1 + 2*v0 -4*v2 + 16 = 0; value: 0 + -4*v3 + 8 <= 0; value: -4 0: 2 4 1: 3 2: 1 2 4 3: 1 5 optimal: (8/3 -e*1) + + 8/3 < 0; value: 8/3 + -4*v3 -59 < 0; value: -71 - -1*v0 -1*v2 + 7 = 0; value: 0 - -3*v1 + 2 < 0; value: -1/2 - -6*v2 + 30 = 0; value: 0 + -4*v3 + 8 <= 0; value: -4 0: 2 4 1: 3 2: 1 2 4 3: 1 5 0: 2 -> 2 1: 1 -> 5/6 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + 2*v1 + v2 -28 <= 0; value: -8 + -2*v3 <= 0; value: 0 + -5*v1 + 4*v2 + 18 < 0; value: -2 + -4*v0 -1*v1 + 5*v3 + 20 = 0; value: 0 + 4*v0 -2*v2 -2*v3 -30 <= 0; value: -14 0: 1 4 5 1: 1 3 4 2: 1 3 5 3: 2 4 5 optimal: (75/7 -e*1) + + 75/7 < 0; value: 75/7 + -255/14 < 0; value: -255/14 - -2*v3 <= 0; value: 0 - 20*v0 + 4*v2 -82 < 0; value: -75/7 - -4*v0 -1*v1 + 5*v3 + 20 = 0; value: 0 - -14/5*v2 -68/5 <= 0; value: 0 0: 1 4 5 3 1: 1 3 4 2: 1 3 5 3: 2 4 5 3 1 0: 4 -> 127/28 1: 4 -> 13/7 2: 0 -> -34/7 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 2*v1 -11 <= 0; value: -7 + 6*v0 + 6*v1 -45 < 0; value: -15 + -1*v0 -6*v2 -3 < 0; value: -16 + -2*v0 -1*v2 -1*v3 <= 0; value: -4 + -5*v0 + 2*v1 -2*v2 <= 0; value: -1 0: 1 2 3 4 5 1: 1 2 5 2: 3 4 5 3: 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -4*v0 + 2*v1 -11 <= 0; value: -7 + 6*v0 + 6*v1 -45 < 0; value: -15 + -1*v0 -6*v2 -3 < 0; value: -16 + -2*v0 -1*v2 -1*v3 <= 0; value: -4 + -5*v0 + 2*v1 -2*v2 <= 0; value: -1 0: 1 2 3 4 5 1: 1 2 5 2: 3 4 5 3: 4 0: 1 -> 1 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 + 2*v2 -14 = 0; value: 0 + -1*v3 <= 0; value: 0 + v0 -1*v1 -2 < 0; value: -1 + -1*v0 -1*v1 + 6 <= 0; value: -3 + -4*v0 -4*v1 + 3 < 0; value: -33 0: 3 4 5 1: 1 3 4 5 2: 1 3: 2 optimal: (4 -e*1) + + 4 < 0; value: 4 - 3*v1 + 2*v2 -14 = 0; value: 0 + -1*v3 <= 0; value: 0 - v0 + 2/3*v2 -20/3 < 0; value: -1/2 + -2*v0 + 8 <= 0; value: -2 + -8*v0 + 11 <= 0; value: -29 0: 3 4 5 1: 1 3 4 5 2: 1 3 4 5 3: 2 0: 5 -> 5 1: 4 -> 7/2 2: 1 -> 7/4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + v1 -6*v3 -1 = 0; value: 0 + -6*v0 + 3*v2 + 4 <= 0; value: -20 + -2*v0 -5*v1 -10 <= 0; value: -23 + -2*v3 <= 0; value: 0 + <= 0; value: 0 0: 2 3 1: 1 3 2: 2 3: 1 4 optimal: oo + 2*v0 -2 <= 0; value: 6 - v1 -6*v3 -1 = 0; value: 0 + -6*v0 + 3*v2 + 4 <= 0; value: -20 + -2*v0 -15 <= 0; value: -23 - -2*v3 <= 0; value: 0 + <= 0; value: 0 0: 2 3 1: 1 3 2: 2 3: 1 4 3 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 7 <= 0; value: -1 + -1*v2 + 4 <= 0; value: -1 + 3*v0 -1*v3 -11 <= 0; value: -4 + -3*v3 -14 <= 0; value: -29 + <= 0; value: 0 0: 1 3 1: 2: 2 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 7 <= 0; value: -1 + -1*v2 + 4 <= 0; value: -1 + 3*v0 -1*v3 -11 <= 0; value: -4 + -3*v3 -14 <= 0; value: -29 + <= 0; value: 0 0: 1 3 1: 2: 2 3: 3 4 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v2 -2*v3 + 1 <= 0; value: -3 + -6*v0 -4*v1 + 26 = 0; value: 0 + -3*v1 -1*v2 -4 < 0; value: -10 + 6*v0 + 4*v3 -55 <= 0; value: -29 + -1*v1 + 4*v2 + 2 <= 0; value: 0 0: 2 4 1: 2 3 5 2: 1 3 5 3: 1 4 optimal: (478/39 -e*1) + + 478/39 < 0; value: 478/39 - -6*v2 -2*v3 + 1 <= 0; value: 0 - -6*v0 -4*v1 + 26 = 0; value: 0 - 13/3*v3 -73/6 < 0; value: -7/4 + -175/13 <= 0; value: -175/13 - 3/2*v0 + 4*v2 -9/2 <= 0; value: 0 0: 2 4 3 5 1: 2 3 5 2: 1 3 5 4 3: 1 4 3 0: 3 -> 61/13 1: 2 -> -7/13 2: 0 -> -33/52 3: 2 -> 125/52 + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 <= 0; value: 0 + 6*v2 <= 0; value: 0 + -2*v2 + 3*v3 -22 <= 0; value: -10 + 2*v1 + 4*v2 -2*v3 -1 <= 0; value: -7 + 6*v0 + v2 + 6*v3 -106 < 0; value: -64 0: 5 1: 4 2: 1 2 3 4 5 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 <= 0; value: 0 + 6*v2 <= 0; value: 0 + -2*v2 + 3*v3 -22 <= 0; value: -10 + 2*v1 + 4*v2 -2*v3 -1 <= 0; value: -7 + 6*v0 + v2 + 6*v3 -106 < 0; value: -64 0: 5 1: 4 2: 1 2 3 4 5 3: 3 4 5 0: 3 -> 3 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 6*v3 -27 < 0; value: -9 + -4*v0 + v2 -1 <= 0; value: 0 + 3*v0 -3 <= 0; value: 0 + 3*v2 -37 <= 0; value: -22 + -2*v0 -4*v1 + 5*v2 -66 <= 0; value: -43 0: 2 3 5 1: 1 5 2: 2 4 5 3: 1 optimal: oo + 3*v0 -5/2*v2 + 33 < 0; value: 47/2 - -3*v1 + 6*v3 -27 < 0; value: -3 + -4*v0 + v2 -1 <= 0; value: 0 + 3*v0 -3 <= 0; value: 0 + 3*v2 -37 <= 0; value: -22 - -2*v0 + 5*v2 -8*v3 -30 <= 0; value: 0 0: 2 3 5 1: 1 5 2: 2 4 5 3: 1 5 0: 1 -> 1 1: 0 -> -39/4 2: 5 -> 5 3: 3 -> -7/8 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 -14 <= 0; value: -8 + 2*v0 -3*v3 -5 <= 0; value: -13 + -6*v0 + v3 -5 <= 0; value: -13 + -1*v0 -5*v1 + 3*v2 -2 <= 0; value: -6 + 2*v0 -5*v2 -2*v3 + 9 <= 0; value: 0 0: 2 3 4 5 1: 4 2: 1 4 5 3: 2 3 5 optimal: oo + 24/5*v0 + 26/25 <= 0; value: 266/25 + -12*v0 -76/5 <= 0; value: -196/5 + -16*v0 -20 <= 0; value: -52 - -6*v0 + v3 -5 <= 0; value: 0 - -1*v0 -5*v1 + 3*v2 -2 <= 0; value: 0 - 2*v0 -5*v2 -2*v3 + 9 <= 0; value: 0 0: 2 3 4 5 1 1: 4 2: 1 4 5 3: 2 3 5 1 0: 2 -> 2 1: 1 -> -83/25 2: 1 -> -21/5 3: 4 -> 17 + 2*v0 -2*v1 <= 0; value: 0 + 5*v3 -20 = 0; value: 0 + -5*v0 -4*v1 -3*v3 -10 < 0; value: -40 + 4*v1 + 2*v2 -25 <= 0; value: -11 + v1 + 3*v2 + 5*v3 -66 <= 0; value: -35 + -5*v0 -1*v3 + 14 = 0; value: 0 0: 2 5 1: 2 3 4 2: 3 4 3: 1 2 4 5 optimal: (20 -e*1) + + 20 < 0; value: 20 - 5*v3 -20 = 0; value: 0 - -5*v0 -4*v1 -3*v3 -10 < 0; value: -4 + 2*v2 -57 < 0; value: -51 + 3*v2 -54 < 0; value: -45 - -5*v0 + 10 = 0; value: 0 0: 2 5 3 4 1: 2 3 4 2: 3 4 3: 1 2 4 5 3 0: 2 -> 2 1: 2 -> -7 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -6 <= 0; value: -15 + -3*v3 + 7 <= 0; value: -5 + -4*v1 -6*v2 -36 <= 0; value: -78 + -4*v2 -9 <= 0; value: -29 + 3*v0 -3*v3 + 6 = 0; value: 0 0: 5 1: 1 3 2: 3 4 3: 2 5 optimal: oo + 2*v3 <= 0; value: 8 - -3*v1 -6 <= 0; value: 0 + -3*v3 + 7 <= 0; value: -5 + -6*v2 -28 <= 0; value: -58 + -4*v2 -9 <= 0; value: -29 - 3*v0 -3*v3 + 6 = 0; value: 0 0: 5 1: 1 3 2: 3 4 3: 2 5 0: 2 -> 2 1: 3 -> -2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -3*v3 -15 <= 0; value: -38 + 6*v3 -47 < 0; value: -17 + -3*v0 + v2 + 4 <= 0; value: -4 + -5*v0 + 3 <= 0; value: -17 + 2*v0 -2*v2 -4*v3 + 4 <= 0; value: -16 0: 1 3 4 5 1: 2: 3 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -3*v3 -15 <= 0; value: -38 + 6*v3 -47 < 0; value: -17 + -3*v0 + v2 + 4 <= 0; value: -4 + -5*v0 + 3 <= 0; value: -17 + 2*v0 -2*v2 -4*v3 + 4 <= 0; value: -16 0: 1 3 4 5 1: 2: 3 5 3: 1 2 5 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 5*v0 + v1 + 6*v2 -23 <= 0; value: -1 + v2 -3 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -5 = 0; value: 0 + -5*v2 -1*v3 + 19 = 0; value: 0 + -1*v0 -1*v2 <= 0; value: -3 0: 1 3 5 1: 1 2: 1 2 3 4 5 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 5*v0 + v1 + 6*v2 -23 <= 0; value: -1 + v2 -3 = 0; value: 0 + -1*v0 -1*v2 + 2*v3 -5 = 0; value: 0 + -5*v2 -1*v3 + 19 = 0; value: 0 + -1*v0 -1*v2 <= 0; value: -3 0: 1 3 5 1: 1 2: 1 2 3 4 5 3: 3 4 0: 0 -> 0 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 <= 0; value: -12 + -6*v0 + 6*v2 + 2 < 0; value: -4 + -5*v0 -2*v1 + 23 = 0; value: 0 + -2*v0 + 5*v1 -37 <= 0; value: -23 + -5*v2 + 6*v3 + 2 <= 0; value: -2 0: 2 3 4 1: 1 3 4 2: 2 5 3: 5 optimal: 46/5 + + 46/5 <= 0; value: 46/5 - 15/2*v0 -69/2 <= 0; value: 0 + 6*v2 -128/5 < 0; value: -68/5 - -5*v0 -2*v1 + 23 = 0; value: 0 + -231/5 <= 0; value: -231/5 + -5*v2 + 6*v3 + 2 <= 0; value: -2 0: 2 3 4 1 1: 1 3 4 2: 2 5 3: 5 0: 3 -> 23/5 1: 4 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 + 5*v2 -4*v3 + 1 <= 0; value: -25 + 2*v2 -1*v3 -1 = 0; value: 0 + -1*v3 + 3 <= 0; value: 0 + 5*v0 + 3*v3 -17 <= 0; value: -8 + v0 + 6*v3 -27 <= 0; value: -9 0: 4 5 1: 1 2: 1 2 3: 1 2 3 4 5 optimal: 139/54 + + 139/54 <= 0; value: 139/54 - -6*v1 + 5*v2 -4*v3 + 1 <= 0; value: 0 - 2*v2 -1*v3 -1 = 0; value: 0 + -37/27 <= 0; value: -37/27 - 9/2*v0 -7/2 <= 0; value: 0 - v0 + 12*v2 -33 <= 0; value: 0 0: 4 5 3 1: 1 2: 1 2 4 5 3 3: 1 2 3 4 5 0: 0 -> 7/9 1: 4 -> -55/108 2: 2 -> 145/54 3: 3 -> 118/27 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -16 = 0; value: 0 + 6*v2 -64 < 0; value: -40 + 3*v0 -4*v2 + 3 <= 0; value: -4 + v1 + 3*v3 -13 <= 0; value: -4 + -2*v0 -1*v1 -3*v3 -5 <= 0; value: -20 0: 3 5 1: 4 5 2: 1 2 3 3: 4 5 optimal: oo + 6*v0 + 6*v3 + 10 <= 0; value: 40 + 4*v2 -16 = 0; value: 0 + 6*v2 -64 < 0; value: -40 + 3*v0 -4*v2 + 3 <= 0; value: -4 + -2*v0 -18 <= 0; value: -24 - -2*v0 -1*v1 -3*v3 -5 <= 0; value: 0 0: 3 5 4 1: 4 5 2: 1 2 3 3: 4 5 0: 3 -> 3 1: 3 -> -17 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -5*v2 -1*v3 -5 < 0; value: -3 + -1*v1 -5*v3 + 4 = 0; value: 0 + 2*v1 -21 < 0; value: -13 + -4*v1 + 5*v3 -12 <= 0; value: -28 + -5*v0 + 5*v2 -3*v3 + 1 <= 0; value: -4 0: 1 5 1: 2 3 4 2: 1 5 3: 1 2 4 5 optimal: oo + 5*v2 + 233/25 < 0; value: 233/25 - 2*v0 -5*v2 -153/25 < 0; value: -2 - -1*v1 -5*v3 + 4 = 0; value: 0 + -121/5 < 0; value: -121/5 - 25*v3 -28 <= 0; value: 0 + -15/2*v2 -883/50 < 0; value: -883/50 0: 1 5 1: 2 3 4 2: 1 5 3: 1 2 4 5 3 0: 1 -> 103/50 1: 4 -> -8/5 2: 0 -> 0 3: 0 -> 28/25 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -6 <= 0; value: -16 + v1 -5*v2 + 6*v3 -5 < 0; value: -19 + 4*v3 -5 <= 0; value: -1 + -5*v1 -20 < 0; value: -45 + 4*v0 + 3*v3 -34 <= 0; value: -11 0: 5 1: 1 2 4 2: 2 3: 2 3 5 optimal: oo + -3/2*v3 + 23 <= 0; value: 43/2 - -2*v1 -6 <= 0; value: 0 + -5*v2 + 6*v3 -8 < 0; value: -27 + 4*v3 -5 <= 0; value: -1 + -5 < 0; value: -5 - 4*v0 + 3*v3 -34 <= 0; value: 0 0: 5 1: 1 2 4 2: 2 3: 2 3 5 0: 5 -> 31/4 1: 5 -> -3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 5*v2 -14 <= 0; value: -8 + 4*v1 + 4*v2 -46 < 0; value: -22 + 5*v1 + 2*v2 + 2*v3 -60 < 0; value: -39 + 4*v2 -20 <= 0; value: -8 + -3*v2 + 3 < 0; value: -6 0: 1 1: 2 3 2: 1 2 3 4 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 5*v2 -14 <= 0; value: -8 + 4*v1 + 4*v2 -46 < 0; value: -22 + 5*v1 + 2*v2 + 2*v3 -60 < 0; value: -39 + 4*v2 -20 <= 0; value: -8 + -3*v2 + 3 < 0; value: -6 0: 1 1: 2 3 2: 1 2 3 4 5 3: 3 0: 3 -> 3 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + 2*v1 + 4*v2 -4 <= 0; value: -9 + 4*v1 -6*v3 + 1 <= 0; value: -3 + v1 + 2*v2 + 2*v3 -6 = 0; value: 0 + -3*v1 + 5 <= 0; value: -1 + -6*v2 + 2*v3 -6 <= 0; value: -2 0: 1 1: 1 2 3 4 2: 1 3 5 3: 2 3 5 optimal: oo + 2*v0 -10/3 <= 0; value: 8/3 + -3*v0 + 4*v2 -2/3 <= 0; value: -29/3 + 6*v2 -16/3 <= 0; value: -16/3 - v1 + 2*v2 + 2*v3 -6 = 0; value: 0 - 6*v2 + 6*v3 -13 <= 0; value: 0 + -8*v2 -5/3 <= 0; value: -5/3 0: 1 1: 1 2 3 4 2: 1 3 5 4 2 1 3: 2 3 5 4 1 0: 3 -> 3 1: 2 -> 5/3 2: 0 -> 0 3: 2 -> 13/6 + 2*v0 -2*v1 <= 0; value: -2 + v1 -6*v2 -1*v3 -8 < 0; value: -5 + -2*v0 -3*v2 + 4 = 0; value: 0 + -6*v0 -1*v2 -3*v3 + 12 = 0; value: 0 + v0 -3*v1 + 5 < 0; value: -2 + 2*v0 + 5*v1 -19 = 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 1 2 3 3: 1 3 optimal: (6/11 -e*1) + + 6/11 < 0; value: 6/11 + -1/9 <= 0; value: -1/9 - -2*v0 -3*v2 + 4 = 0; value: 0 - 8*v2 -3*v3 = 0; value: 0 - -99/80*v3 -2 < 0; value: -1 - 2*v0 + 5*v1 -19 = 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 1 2 3 4 3: 1 3 4 0: 2 -> 27/11 1: 3 -> 31/11 2: 0 -> -10/33 3: 0 -> -80/99 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v2 -9 < 0; value: -1 + = 0; value: 0 + -6*v0 + v1 -1 = 0; value: 0 + -3*v0 -1*v2 -3*v3 + 7 = 0; value: 0 + -6*v1 -3*v2 + 9 <= 0; value: 0 0: 3 4 1: 1 3 5 2: 1 4 5 3: 4 optimal: (-1/3 -e*1) + -1/3 < 0; value: -1/3 - 1/2*v2 -3/2 < 0; value: -1/2 + = 0; value: 0 - -6*v0 + v1 -1 = 0; value: 0 - -3*v0 -1*v2 -3*v3 + 7 = 0; value: 0 - 9*v2 + 36*v3 -81 <= 0; value: 0 0: 3 4 5 1 1: 1 3 5 2: 1 4 5 3: 4 5 1 0: 0 -> -1/12 1: 1 -> 1/2 2: 1 -> 2 3: 2 -> 7/4 + 2*v0 -2*v1 <= 0; value: -6 + v0 -6*v1 -4*v3 + 8 < 0; value: -27 + 2*v0 -4*v1 -4*v3 -17 <= 0; value: -43 + -3*v1 -2*v2 + 20 = 0; value: 0 + -1*v0 -6*v2 -4*v3 + 23 < 0; value: -14 + 4*v0 -5*v1 -4*v3 -21 < 0; value: -49 0: 1 2 4 5 1: 1 2 3 5 2: 3 4 3: 1 2 4 5 optimal: oo + 5/3*v0 + 4/3*v3 -8/3 < 0; value: 3 - v0 + 4*v2 -4*v3 -32 < 0; value: -4 + 4/3*v0 -4/3*v3 -67/3 <= 0; value: -25 - -3*v1 -2*v2 + 20 = 0; value: 0 + 1/2*v0 -10*v3 -25 < 0; value: -109/2 + 19/6*v0 -2/3*v3 -83/3 <= 0; value: -53/2 0: 1 2 4 5 1: 1 2 3 5 2: 3 4 2 1 5 3: 1 2 4 5 0: 1 -> 1 1: 4 -> 1/6 2: 4 -> 39/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 2*v2 + v3 -57 <= 0; value: -18 + -6*v0 -3*v2 -38 < 0; value: -77 + 4*v1 + v2 -34 <= 0; value: -17 + 4*v1 -4*v2 + 1 <= 0; value: -7 + <= 0; value: 0 0: 1 2 1: 3 4 2: 1 2 3 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 + 2*v2 + v3 -57 <= 0; value: -18 + -6*v0 -3*v2 -38 < 0; value: -77 + 4*v1 + v2 -34 <= 0; value: -17 + 4*v1 -4*v2 + 1 <= 0; value: -7 + <= 0; value: 0 0: 1 2 1: 3 4 2: 1 2 3 4 3: 1 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 8 = 0; value: 0 + 5*v0 -1*v2 -1*v3 -4 <= 0; value: 0 + -4*v1 -6*v2 -28 <= 0; value: -66 + 3*v3 -6 <= 0; value: -3 + 3*v1 -13 <= 0; value: -7 0: 1 2 1: 3 5 2: 2 3 3: 2 4 optimal: oo + 2*v0 + 3*v2 + 14 <= 0; value: 33 + -4*v0 + 8 = 0; value: 0 + 5*v0 -1*v2 -1*v3 -4 <= 0; value: 0 - -4*v1 -6*v2 -28 <= 0; value: 0 + 3*v3 -6 <= 0; value: -3 + -9/2*v2 -34 <= 0; value: -113/2 0: 1 2 1: 3 5 2: 2 3 5 3: 2 4 0: 2 -> 2 1: 2 -> -29/2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 + 3*v3 -90 <= 0; value: -48 + 4*v2 -35 <= 0; value: -15 + 4*v2 -5*v3 <= 0; value: 0 + 2*v2 -6*v3 <= 0; value: -14 + 2*v0 + 6*v3 -50 <= 0; value: -16 0: 5 1: 1 2: 1 2 3 4 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 + 4*v2 + 3*v3 -90 <= 0; value: -48 + 4*v2 -35 <= 0; value: -15 + 4*v2 -5*v3 <= 0; value: 0 + 2*v2 -6*v3 <= 0; value: -14 + 2*v0 + 6*v3 -50 <= 0; value: -16 0: 5 1: 1 2: 1 2 3 4 3: 1 3 4 5 0: 5 -> 5 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 -1 <= 0; value: -3 + -3*v1 -1*v3 + 2 < 0; value: -8 + -3*v0 -4*v1 + 23 = 0; value: 0 + -2*v1 + 2*v3 -9 <= 0; value: -5 + -1*v3 -2 <= 0; value: -6 0: 3 1: 2 3 4 2: 1 3: 2 4 5 optimal: (73/4 -e*1) + + 73/4 < 0; value: 73/4 + -2*v2 -1 <= 0; value: -3 - -4*v3 + 31/2 < 0; value: -1/4 - -3*v0 -4*v1 + 23 = 0; value: 0 - 3/2*v0 + 2*v3 -41/2 <= 0; value: 0 + -47/8 <= 0; value: -47/8 0: 3 2 4 1: 2 3 4 2: 1 3: 2 4 5 0: 5 -> 101/12 1: 2 -> -9/16 2: 1 -> 1 3: 4 -> 63/16 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 <= 0; value: -1 + -3*v3 + 6 = 0; value: 0 + -3*v0 + 2*v2 -6 <= 0; value: -1 + -5*v0 + 5*v2 + 2*v3 -51 < 0; value: -32 + -1*v0 + 1 = 0; value: 0 0: 3 4 5 1: 1 2: 3 4 3: 2 4 optimal: 2 + + 2 <= 0; value: 2 - -1*v1 <= 0; value: 0 + -3*v3 + 6 = 0; value: 0 + 2*v2 -9 <= 0; value: -1 + 5*v2 + 2*v3 -56 < 0; value: -32 - -1*v0 + 1 = 0; value: 0 0: 3 4 5 1: 1 2: 3 4 3: 2 4 0: 1 -> 1 1: 1 -> 0 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 10 + -4*v0 -2*v1 + 15 <= 0; value: -5 + -4*v2 -5*v3 + 25 = 0; value: 0 + 2*v0 -4*v1 + 6*v2 -41 < 0; value: -1 + -6*v1 <= 0; value: 0 + -3*v1 + 2*v2 -5*v3 -10 < 0; value: -5 0: 1 3 1: 1 3 4 5 2: 2 3 5 3: 2 5 optimal: oo + 15/2*v3 + 7/2 < 0; value: 11 + -15*v3 + 8 < 0; value: -7 - -4*v2 -5*v3 + 25 = 0; value: 0 - 2*v0 + 6*v2 -41 < 0; value: -1/2 - -6*v1 <= 0; value: 0 + -15/2*v3 + 5/2 < 0; value: -5 0: 1 3 1: 1 3 4 5 2: 2 3 5 1 3: 2 5 1 0: 5 -> 21/4 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 15 = 0; value: 0 + -5*v1 -5*v2 -5 < 0; value: -15 + -4*v0 -3*v3 -20 <= 0; value: -41 + 5*v0 -3*v2 -33 <= 0; value: -21 + 6*v1 + 2*v2 -3*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 2 5 2: 2 4 5 3: 3 5 optimal: oo + 2*v0 + 2*v2 + 2 < 0; value: 10 + -5*v0 + 15 = 0; value: 0 - -5*v1 -5*v2 -5 < 0; value: -5 + -4*v0 -3*v3 -20 <= 0; value: -41 + 5*v0 -3*v2 -33 <= 0; value: -21 + -4*v2 -3*v3 -5 < 0; value: -18 0: 1 3 4 1: 2 5 2: 2 4 5 3: 3 5 0: 3 -> 3 1: 1 -> -1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 2*v3 -4 <= 0; value: -13 + -1*v1 -1*v2 + 2 = 0; value: 0 + -3*v1 + 3 = 0; value: 0 + 2*v0 -4*v2 -11 <= 0; value: -5 + -2*v1 + 1 <= 0; value: -1 0: 1 4 1: 2 3 5 2: 2 4 3: 1 optimal: 13 + + 13 <= 0; value: 13 + 2*v3 -53/2 <= 0; value: -41/2 - -1*v1 -1*v2 + 2 = 0; value: 0 - 3*v2 -3 = 0; value: 0 - 2*v0 -15 <= 0; value: 0 + -1 <= 0; value: -1 0: 1 4 1: 2 3 5 2: 2 4 3 5 3: 1 0: 5 -> 15/2 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + v1 + 5*v2 -17 <= 0; value: -3 + -3*v0 + 4*v1 + 4*v3 -7 <= 0; value: 0 + 4*v0 -6*v1 -1*v3 + 3 <= 0; value: -9 + 2*v1 -6*v3 -8 = 0; value: 0 + -1*v0 -5*v3 + 3 = 0; value: 0 0: 2 3 5 1: 1 2 3 4 2: 1 3: 2 3 4 5 optimal: 22/13 + + 22/13 <= 0; value: 22/13 + 5*v2 -178/13 <= 0; value: -48/13 + -93/13 <= 0; value: -93/13 - 39/5*v0 -162/5 <= 0; value: 0 - 2*v1 -6*v3 -8 = 0; value: 0 - -1*v0 -5*v3 + 3 = 0; value: 0 0: 2 3 5 1 1: 1 2 3 4 2: 1 3: 2 3 4 5 1 0: 3 -> 54/13 1: 4 -> 43/13 2: 2 -> 2 3: 0 -> -3/13 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 -5*v3 + 30 = 0; value: 0 + 5*v2 -20 = 0; value: 0 + -5*v1 + v2 + 21 = 0; value: 0 + -3*v0 -5*v1 -2*v2 + 48 = 0; value: 0 + -1*v0 + v1 = 0; value: 0 0: 1 4 5 1: 3 4 5 2: 2 3 4 3: 1 optimal: 0 + <= 0; value: 0 - -1*v0 -5*v3 + 30 = 0; value: 0 - 5*v2 -20 = 0; value: 0 - -5*v1 + v2 + 21 = 0; value: 0 - 15*v3 -75 = 0; value: 0 + = 0; value: 0 0: 1 4 5 1: 3 4 5 2: 2 3 4 5 3: 1 4 5 0: 5 -> 5 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 + 2*v1 -2*v3 -26 = 0; value: 0 + -1*v0 + 5*v1 -9 <= 0; value: -4 + <= 0; value: 0 + 6*v1 -31 <= 0; value: -19 + 2*v1 -3*v2 + 5 = 0; value: 0 0: 1 2 1: 1 2 4 5 2: 5 3: 1 optimal: oo + 2*v0 -3*v2 + 5 <= 0; value: 6 - 6*v0 + 2*v1 -2*v3 -26 = 0; value: 0 + -1*v0 + 15/2*v2 -43/2 <= 0; value: -4 + <= 0; value: 0 + 9*v2 -46 <= 0; value: -19 - -6*v0 -3*v2 + 2*v3 + 31 = 0; value: 0 0: 1 2 5 4 1: 1 2 4 5 2: 5 2 4 3: 1 5 2 4 0: 5 -> 5 1: 2 -> 2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 -3*v3 <= 0; value: 0 + -5*v1 -4*v3 -1 < 0; value: -6 + -6*v0 + 6*v1 + v2 -18 <= 0; value: -7 + 4*v0 -3*v3 <= 0; value: 0 + 2*v0 -2*v1 -3*v2 + 2 < 0; value: -15 0: 1 3 4 5 1: 2 3 5 2: 3 5 3: 1 2 4 optimal: oo + 3*v2 -2 < 0; value: 13 + -5/4*v0 -45/8*v2 + 9/2 <= 0; value: -189/8 - -5*v1 -4*v3 -1 < 0; value: -5 + -8*v2 -12 < 0; value: -52 + 31/4*v0 -45/8*v2 + 9/2 <= 0; value: -189/8 - 2*v0 -3*v2 + 8/5*v3 + 12/5 <= 0; value: 0 0: 1 3 4 5 1: 2 3 5 2: 3 5 1 4 3: 1 2 4 5 3 0: 0 -> 0 1: 1 -> -11/2 2: 5 -> 5 3: 0 -> 63/8 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 <= 0; value: 0 + v2 -2 <= 0; value: -1 + -6*v1 + 5*v2 <= 0; value: -1 + 6*v0 -6*v2 + v3 <= 0; value: -2 + -3*v0 + 4*v1 -11 <= 0; value: -7 0: 1 4 5 1: 3 5 2: 2 3 4 3: 4 optimal: oo + 1/3*v0 -5/18*v3 <= 0; value: -10/9 + -6*v0 <= 0; value: 0 + v0 + 1/6*v3 -2 <= 0; value: -4/3 - -6*v1 + 5*v2 <= 0; value: 0 - 6*v0 -6*v2 + v3 <= 0; value: 0 + 1/3*v0 + 5/9*v3 -11 <= 0; value: -79/9 0: 1 4 5 2 1: 3 5 2: 2 3 4 5 3: 4 2 5 0: 0 -> 0 1: 1 -> 5/9 2: 1 -> 2/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 2*v1 + 5*v3 + 7 <= 0; value: 0 + -5*v0 + 6*v1 -9 = 0; value: 0 + -1*v0 + 5*v2 -46 < 0; value: -24 + -1*v0 + v1 -2 <= 0; value: -1 + 2*v1 -8 = 0; value: 0 0: 1 2 3 4 1: 1 2 4 5 2: 3 3: 1 optimal: -2 + -2 <= 0; value: -2 + 5*v3 <= 0; value: 0 - -5*v0 + 6*v1 -9 = 0; value: 0 + 5*v2 -49 < 0; value: -24 + -1 <= 0; value: -1 - 5/3*v0 -5 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 4 5 2: 3 3: 1 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 2*v2 -6*v3 + 3 <= 0; value: -1 + -4*v2 -3 <= 0; value: -7 + v0 -1 <= 0; value: 0 + 6*v0 -5*v1 -8 < 0; value: -2 + -1*v2 + 1 <= 0; value: 0 0: 3 4 1: 4 2: 1 2 5 3: 1 optimal: oo + -2/5*v0 + 16/5 < 0; value: 14/5 + 2*v2 -6*v3 + 3 <= 0; value: -1 + -4*v2 -3 <= 0; value: -7 + v0 -1 <= 0; value: 0 - 6*v0 -5*v1 -8 < 0; value: -1 + -1*v2 + 1 <= 0; value: 0 0: 3 4 1: 4 2: 1 2 5 3: 1 0: 1 -> 1 1: 0 -> -1/5 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v2 + 3 <= 0; value: -21 + -5*v0 + 6*v1 + 4*v3 -13 = 0; value: 0 + 4*v0 -2*v3 -10 = 0; value: 0 + 2*v0 + 4*v1 -51 <= 0; value: -29 + -6*v2 + 24 = 0; value: 0 0: 2 3 4 1: 2 4 2: 1 5 3: 2 3 optimal: oo + 3*v0 -11 <= 0; value: 4 + -6*v2 + 3 <= 0; value: -21 - -5*v0 + 6*v1 + 4*v3 -13 = 0; value: 0 - 4*v0 -2*v3 -10 = 0; value: 0 + -29 <= 0; value: -29 + -6*v2 + 24 = 0; value: 0 0: 2 3 4 1: 2 4 2: 1 5 3: 2 3 4 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 4*v1 + v2 -43 < 0; value: -27 + v2 + 6*v3 -32 <= 0; value: -21 + -3*v0 -4*v1 + 19 = 0; value: 0 + 3*v0 + 4*v1 -38 < 0; value: -19 + 4*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 1 2 3: 2 5 optimal: oo + 7/2*v0 -19/2 <= 0; value: -6 + -8*v0 + v2 -24 < 0; value: -27 + v2 + 6*v3 -32 <= 0; value: -21 - -3*v0 -4*v1 + 19 = 0; value: 0 + -19 < 0; value: -19 + 4*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 1 2 3: 2 5 0: 1 -> 1 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 2*v2 + 2*v3 + 12 = 0; value: 0 + -3*v0 -2*v3 + 9 <= 0; value: -5 + 6*v1 -6*v2 -3*v3 -35 <= 0; value: -20 + v0 -3*v3 -1 <= 0; value: 0 + 5*v0 -2*v1 + 3*v3 -31 < 0; value: -16 0: 1 2 4 5 1: 3 5 2: 1 3 3: 1 2 3 4 5 optimal: (236/11 -e*1) + + 236/11 < 0; value: 236/11 - -4*v0 + 2*v2 + 2*v3 + 12 = 0; value: 0 - -11/3*v0 + 29/3 <= 0; value: 0 + -853/11 < 0; value: -853/11 - -5*v0 + 3*v2 + 17 <= 0; value: 0 - 5*v0 -2*v1 + 3*v3 -31 < 0; value: -2 0: 1 2 4 5 3 1: 3 5 2: 1 3 2 4 3: 1 2 3 4 5 0: 4 -> 29/11 1: 4 -> -78/11 2: 1 -> -14/11 3: 1 -> 6/11 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -19 < 0; value: -48 + -2*v0 -4*v2 -2 < 0; value: -24 + -6*v0 + 5*v2 -55 <= 0; value: -36 + = 0; value: 0 + 2*v0 -1*v1 + v2 -5 < 0; value: -3 0: 1 2 3 5 1: 5 2: 1 2 3 5 3: optimal: (302/17 -e*1) + + 302/17 < 0; value: 302/17 + -108/17 <= 0; value: -108/17 - -2*v0 -4*v2 -2 < 0; value: -4 - -17/2*v0 -115/2 < 0; value: -17/2 + = 0; value: 0 - 2*v0 -1*v1 + v2 -5 < 0; value: -1 0: 1 2 3 5 1: 5 2: 1 2 3 5 3: 0: 1 -> -98/17 1: 5 -> -413/34 2: 5 -> 115/34 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 2*v2 -5*v3 -16 = 0; value: 0 + -2*v0 + 3*v2 + 1 = 0; value: 0 + -4*v0 -5*v1 + 4*v3 + 45 = 0; value: 0 + -3*v1 -1*v3 -9 <= 0; value: -24 + -6*v0 + 4*v2 + 18 = 0; value: 0 0: 2 3 5 1: 1 3 4 2: 1 2 5 3: 1 3 4 optimal: 0 + <= 0; value: 0 - 2*v1 + 2*v2 -5*v3 -16 = 0; value: 0 - -2*v0 + 3*v2 + 1 = 0; value: 0 - -4*v0 + 5*v2 -17/2*v3 + 5 = 0; value: 0 + -24 <= 0; value: -24 - -10/3*v0 + 50/3 = 0; value: 0 0: 2 3 5 4 1: 1 3 4 2: 1 2 5 3 4 3: 1 3 4 0: 5 -> 5 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 + v1 + 3*v3 -17 <= 0; value: -11 + 5*v3 -12 < 0; value: -2 + -2*v0 + 6*v1 -6*v2 + 16 < 0; value: -14 + -3*v1 -1*v3 + 2 = 0; value: 0 + -2*v1 + v3 -5 <= 0; value: -3 0: 1 3 1: 1 3 4 5 2: 3 3: 1 2 4 5 optimal: (62/9 -e*1) + + 62/9 < 0; value: 62/9 - 3*v0 -149/15 <= 0; value: 0 - 5*v3 -12 < 0; value: -1 + -6*v2 + 386/45 < 0; value: -964/45 - -3*v1 -1*v3 + 2 = 0; value: 0 + -7/3 <= 0; value: -7/3 0: 1 3 1: 1 3 4 5 2: 3 3: 1 2 4 5 3 0: 0 -> 149/45 1: 0 -> -1/15 2: 5 -> 5 3: 2 -> 11/5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v2 <= 0; value: 0 + -4*v2 + 5*v3 -6 <= 0; value: -1 + v0 + 4*v2 -3 <= 0; value: -1 + 5*v1 -5*v2 -3*v3 -12 = 0; value: 0 + -3*v3 <= 0; value: -3 0: 3 1: 4 2: 1 2 3 4 3: 2 4 5 optimal: 81/5 + + 81/5 <= 0; value: 81/5 + -9/2 <= 0; value: -9/2 - -4*v2 -6 <= 0; value: 0 - v0 -9 <= 0; value: 0 - 5*v1 -5*v2 -3*v3 -12 = 0; value: 0 - -3*v3 <= 0; value: 0 0: 3 1: 4 2: 1 2 3 4 3: 2 4 5 0: 2 -> 9 1: 3 -> 9/10 2: 0 -> -3/2 3: 1 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v1 -5*v2 + 10 = 0; value: 0 + -4*v1 <= 0; value: 0 + -3*v0 -6*v2 -1*v3 + 26 = 0; value: 0 + -4*v0 -1*v2 -5*v3 + 39 = 0; value: 0 + 5*v1 -6*v2 -9 < 0; value: -21 0: 3 4 1: 1 2 5 2: 1 3 4 5 3: 3 4 optimal: (4182/473 -e*1) + + 4182/473 < 0; value: 4182/473 - -3*v1 -5*v2 + 10 = 0; value: 0 + -420/43 < 0; value: -420/43 - -3*v0 -6*v2 -1*v3 + 26 = 0; value: 0 - -7/2*v0 -29/6*v3 + 104/3 = 0; value: 0 - 473/87*v0 -1082/29 < 0; value: -473/87 0: 3 4 2 5 1: 1 2 5 2: 1 3 4 5 2 3: 3 4 2 5 0: 3 -> 2773/473 1: 0 -> 6770/3741 2: 2 -> 1140/1247 3: 5 -> 40151/13717 + 2*v0 -2*v1 <= 0; value: 8 + -3*v2 -4*v3 + 10 < 0; value: -7 + -2*v2 -1*v3 + 7 <= 0; value: -1 + 2*v1 + 5*v3 -29 < 0; value: -19 + -5*v3 + 3 <= 0; value: -7 + 2*v1 + 3*v2 -5*v3 + 1 = 0; value: 0 0: 1: 3 5 2: 1 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 + 38/5 <= 0; value: 78/5 + -2 < 0; value: -2 - -2*v2 -1*v3 + 7 <= 0; value: 0 + -168/5 < 0; value: -168/5 - 10*v2 -32 <= 0; value: 0 - 2*v1 + 3*v2 -5*v3 + 1 = 0; value: 0 0: 1: 3 5 2: 1 2 5 3 4 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> -19/5 2: 3 -> 16/5 3: 2 -> 3/5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 + v2 -29 <= 0; value: -12 + -3*v1 + 5*v2 + 4*v3 -80 <= 0; value: -48 + 4*v0 -3*v3 <= 0; value: 0 + 6*v1 + 6*v3 -89 < 0; value: -47 + -4*v2 + 20 = 0; value: 0 0: 3 1: 1 2 4 2: 1 2 5 3: 2 3 4 optimal: oo + -14/9*v0 + 110/3 <= 0; value: 32 + 64/9*v0 -292/3 <= 0; value: -76 - -3*v1 + 5*v2 + 4*v3 -80 <= 0; value: 0 - 4*v0 -3*v3 <= 0; value: 0 + 56/3*v0 -199 < 0; value: -143 - -4*v2 + 20 = 0; value: 0 0: 3 4 1 1: 1 2 4 2: 1 2 5 4 3: 2 3 4 1 0: 3 -> 3 1: 3 -> -13 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v1 -3*v3 + 3 <= 0; value: -12 + -5*v2 + 1 < 0; value: -4 + 3*v0 -6*v1 -22 <= 0; value: -13 + 5*v0 -1*v1 -1*v3 -28 < 0; value: -18 + 2*v0 + 6*v1 -4*v3 -1 <= 0; value: -15 0: 3 4 5 1: 1 3 4 5 2: 2 3: 1 4 5 optimal: oo + 2/9*v3 + 344/27 < 0; value: 374/27 + -7/3*v3 -25/9 <= 0; value: -130/9 + -5*v2 + 1 < 0; value: -4 - 3*v0 -6*v1 -22 <= 0; value: 0 - 9/2*v0 -1*v3 -73/3 < 0; value: -9/2 + -26/9*v3 + 109/27 <= 0; value: -281/27 0: 3 4 5 1 1: 1 3 4 5 2: 2 3: 1 4 5 0: 3 -> 149/27 1: 0 -> -49/54 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 6*v1 -9 < 0; value: -3 + -2*v2 -2 <= 0; value: -6 + 6*v0 + 3*v3 <= 0; value: 0 + -4*v0 + 2*v2 + v3 -9 < 0; value: -5 + -1*v1 + 6*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 1 5 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 -12*v3 -2 <= 0; value: -2 + -4*v0 + 36*v3 -3 < 0; value: -3 + -2*v2 -2 <= 0; value: -6 + 6*v0 + 3*v3 <= 0; value: 0 + -4*v0 + 2*v2 + v3 -9 < 0; value: -5 - -1*v1 + 6*v3 + 1 <= 0; value: 0 0: 1 3 4 1: 1 5 2: 2 4 3: 3 4 5 1 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -1*v3 + 1 <= 0; value: -1 + -6*v0 -1*v2 + 26 = 0; value: 0 + -4*v0 + 16 <= 0; value: 0 + 5*v1 + 2*v2 -14 < 0; value: -5 + 3*v2 -15 <= 0; value: -9 0: 2 3 1: 4 2: 2 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -1*v3 + 1 <= 0; value: -1 + -6*v0 -1*v2 + 26 = 0; value: 0 + -4*v0 + 16 <= 0; value: 0 + 5*v1 + 2*v2 -14 < 0; value: -5 + 3*v2 -15 <= 0; value: -9 0: 2 3 1: 4 2: 2 4 5 3: 1 0: 4 -> 4 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + 5*v1 -56 <= 0; value: -31 + 3*v0 -1*v2 -2*v3 + 6 = 0; value: 0 + v1 + 2*v3 -15 = 0; value: 0 + 4*v0 -6*v1 -4*v3 -39 <= 0; value: -81 + 3*v0 -2*v2 -5*v3 + 23 = 0; value: 0 0: 2 4 5 1: 1 3 4 2: 2 5 3: 2 3 4 5 optimal: 69/2 + + 69/2 <= 0; value: 69/2 + -305/2 <= 0; value: -305/2 - 3*v0 -1*v2 -2*v3 + 6 = 0; value: 0 - v1 + 2*v3 -15 = 0; value: 0 - -20*v0 -41 <= 0; value: 0 - -9/2*v0 + 1/2*v2 + 8 = 0; value: 0 0: 2 4 5 1 1: 1 3 4 2: 2 5 4 1 3: 2 3 4 5 1 0: 2 -> -41/20 1: 5 -> -193/10 2: 2 -> -689/20 3: 5 -> 343/20 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -3*v2 -1 < 0; value: -4 + 3*v0 -5*v1 + 1 <= 0; value: -1 + 6*v1 + 5*v2 -60 <= 0; value: -39 + -2*v0 + 6*v2 + v3 -17 = 0; value: 0 + 2*v1 -2*v2 -4*v3 + 8 = 0; value: 0 0: 1 2 4 1: 2 3 5 2: 1 3 4 5 3: 4 5 optimal: (290/279 -e*1) + + 290/279 < 0; value: 290/279 - 279/55*v0 -502/55 < 0; value: -223/110 - -17*v0 + 55*v2 -149 <= 0; value: 0 + -10043/279 <= 0; value: -10043/279 - -2*v0 + 6*v2 + v3 -17 = 0; value: 0 - 2*v1 -2*v2 -4*v3 + 8 = 0; value: 0 0: 1 2 4 3 1: 2 3 5 2: 1 3 4 5 2 3: 4 5 2 3 0: 1 -> 781/558 1: 1 -> 967/930 2: 3 -> 96419/30690 3: 1 -> 14563/15345 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -65 < 0; value: -41 + -5*v0 + 5*v3 + 18 <= 0; value: -2 + 6*v1 -4*v2 -20 < 0; value: -4 + v2 -3*v3 -4 < 0; value: -2 + -6*v0 + 6 < 0; value: -18 0: 1 2 5 1: 3 2: 3 4 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -65 < 0; value: -41 + -5*v0 + 5*v3 + 18 <= 0; value: -2 + 6*v1 -4*v2 -20 < 0; value: -4 + v2 -3*v3 -4 < 0; value: -2 + -6*v0 + 6 < 0; value: -18 0: 1 2 5 1: 3 2: 3 4 3: 2 4 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -2*v3 -8 = 0; value: 0 + 5*v1 -2*v2 -23 <= 0; value: -12 + 2*v0 -4*v2 -2 <= 0; value: 0 + -1*v2 -6*v3 + 22 <= 0; value: -10 + 2*v0 -2*v1 + 6*v2 -16 = 0; value: 0 0: 3 5 1: 1 2 5 2: 2 3 4 5 3: 1 4 optimal: 424/91 + + 424/91 <= 0; value: 424/91 - 6*v1 -2*v3 -8 = 0; value: 0 + -1322/91 <= 0; value: -1322/91 - 2*v0 -4*v2 -2 <= 0; value: 0 - -91/2*v0 + 435/2 <= 0; value: 0 - 2*v0 + 6*v2 -2/3*v3 -56/3 = 0; value: 0 0: 3 5 4 2 1: 1 2 5 2: 2 3 4 5 3: 1 4 5 2 0: 5 -> 435/91 1: 3 -> 223/91 2: 2 -> 172/91 3: 5 -> 305/91 + 2*v0 -2*v1 <= 0; value: -6 + = 0; value: 0 + 2*v0 -1*v2 + 5*v3 + 1 <= 0; value: 0 + -6*v1 + 3*v3 + 12 <= 0; value: -12 + -1*v0 + 2*v2 + 3*v3 -5 = 0; value: 0 + 3*v0 -2*v3 -7 <= 0; value: -4 0: 2 4 5 1: 3 2: 2 4 3: 2 3 4 5 optimal: 26/45 + + 26/45 <= 0; value: 26/45 + = 0; value: 0 - 45/4*v0 -97/4 <= 0; value: 0 - -6*v1 + 3*v3 + 12 <= 0; value: 0 - -1*v0 + 2*v2 + 3*v3 -5 = 0; value: 0 - 7/3*v0 + 4/3*v2 -31/3 <= 0; value: 0 0: 2 4 5 1: 3 2: 2 4 5 3: 2 3 4 5 0: 1 -> 97/45 1: 4 -> 28/15 2: 3 -> 179/45 3: 0 -> -4/15 + 2*v0 -2*v1 <= 0; value: 6 + -1*v2 + 3*v3 -19 <= 0; value: -10 + v0 -4*v2 + 6*v3 -17 = 0; value: 0 + -5*v0 -2*v1 + 3*v2 + 7 <= 0; value: -13 + -3*v3 -3 <= 0; value: -15 + -1*v3 + 4 <= 0; value: 0 0: 2 3 1: 3 2: 1 2 3 3: 1 2 4 5 optimal: oo + 25/4*v0 -49/4 <= 0; value: 19 + -1/4*v0 -35/4 <= 0; value: -10 - v0 -4*v2 + 6*v3 -17 = 0; value: 0 - -5*v0 -2*v1 + 3*v2 + 7 <= 0; value: 0 + -15 <= 0; value: -15 - -1*v3 + 4 <= 0; value: 0 0: 2 3 1 1: 3 2: 1 2 3 3: 1 2 4 5 0: 5 -> 5 1: 2 -> -9/2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 -6*v2 + 27 <= 0; value: -3 + v0 + 2*v1 -5*v2 + 7 <= 0; value: 0 + -2*v2 -1 <= 0; value: -7 + -3*v0 + 4*v2 -6 = 0; value: 0 + 3*v1 + 3*v3 -25 <= 0; value: -10 0: 2 4 1: 1 2 5 2: 1 2 3 4 3: 5 optimal: oo + 17/4*v0 -9 <= 0; value: -1/2 - -4*v1 -6*v2 + 27 <= 0; value: 0 + -5*v0 + 17/2 <= 0; value: -3/2 + -3/2*v0 -4 <= 0; value: -7 - -3*v0 + 4*v2 -6 = 0; value: 0 + -27/8*v0 + 3*v3 -23/2 <= 0; value: -49/4 0: 2 4 3 5 1: 1 2 5 2: 1 2 3 4 5 3: 5 0: 2 -> 2 1: 3 -> 9/4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 + 5 = 0; value: 0 + -2*v1 -4*v3 + 12 = 0; value: 0 + 6*v0 -15 < 0; value: -3 + -6*v1 -6*v2 + 48 < 0; value: -6 + v1 + 2*v2 + 6*v3 -29 <= 0; value: -9 0: 3 1: 2 4 5 2: 1 4 5 3: 2 5 optimal: (-1 -e*1) + -1 < 0; value: -1 - -1*v2 + 5 = 0; value: 0 - -2*v1 -4*v3 + 12 = 0; value: 0 - 6*v0 -15 < 0; value: -3/2 - -6*v2 + 12*v3 + 12 < 0; value: -3 + -7 <= 0; value: -7 0: 3 1: 2 4 5 2: 1 4 5 3: 2 5 4 0: 2 -> 9/4 1: 4 -> 7/2 2: 5 -> 5 3: 1 -> 5/4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -51 < 0; value: -27 + 6*v0 + 2*v3 -66 <= 0; value: -36 + -1*v1 -1*v2 + 3*v3 -3 <= 0; value: 0 + 5*v0 -20 = 0; value: 0 + -3*v2 -1*v3 + 17 <= 0; value: -1 0: 1 2 4 1: 3 2: 3 5 3: 2 3 5 optimal: oo + 2*v0 + 20*v2 -96 <= 0; value: 12 + 6*v0 -51 < 0; value: -27 + 6*v0 -6*v2 -32 <= 0; value: -38 - -1*v1 -1*v2 + 3*v3 -3 <= 0; value: 0 + 5*v0 -20 = 0; value: 0 - -3*v2 -1*v3 + 17 <= 0; value: 0 0: 1 2 4 1: 3 2: 3 5 2 3: 2 3 5 0: 4 -> 4 1: 1 -> -2 2: 5 -> 5 3: 3 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -4*v3 = 0; value: 0 + -3*v1 -1 <= 0; value: -4 + 6*v0 -6*v2 -5*v3 -17 < 0; value: -11 + -1*v2 + 3 <= 0; value: -1 + 6*v1 -6*v2 + 5 <= 0; value: -13 0: 3 1: 2 5 2: 3 4 5 3: 1 3 optimal: oo + 2*v2 + 19/3 < 0; value: 43/3 - -4*v3 = 0; value: 0 - -3*v1 -1 <= 0; value: 0 - 6*v0 -6*v2 -5*v3 -17 < 0; value: -11/2 + -1*v2 + 3 <= 0; value: -1 + -6*v2 + 3 <= 0; value: -21 0: 3 1: 2 5 2: 3 4 5 3: 1 3 0: 5 -> 71/12 1: 1 -> -1/3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 5*v2 <= 0; value: -10 + -1*v0 -1*v1 + 7 = 0; value: 0 + 2*v1 + 2*v2 -14 <= 0; value: -4 + 2*v0 + v2 -2*v3 -4 <= 0; value: -10 + 5*v1 + 6*v2 -6*v3 + 4 <= 0; value: -1 0: 1 2 4 1: 2 3 5 2: 1 3 4 5 3: 4 5 optimal: oo + -2*v2 + 4*v3 -6 <= 0; value: 14 + 15/2*v2 -5*v3 -10 <= 0; value: -35 - -1*v0 -1*v1 + 7 = 0; value: 0 + 3*v2 -2*v3 -4 <= 0; value: -14 - 2*v0 + v2 -2*v3 -4 <= 0; value: 0 + 17/2*v2 -11*v3 + 29 <= 0; value: -26 0: 1 2 4 3 5 1: 2 3 5 2: 1 3 4 5 3: 4 5 1 3 0: 2 -> 7 1: 5 -> 0 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 + 5*v2 -4*v3 <= 0; value: 0 + -2*v3 + 10 = 0; value: 0 + 3*v0 + 3*v1 + v2 -21 < 0; value: -7 + 6*v2 -12 = 0; value: 0 + 5*v0 -5*v1 -4*v2 + 8 = 0; value: 0 0: 1 3 5 1: 3 5 2: 1 3 4 5 3: 1 2 optimal: 0 + <= 0; value: 0 - 5*v0 + 5*v2 -4*v3 <= 0; value: 0 - -2*v3 + 10 = 0; value: 0 + -7 < 0; value: -7 - -6*v0 + 12 = 0; value: 0 - 5*v0 -5*v1 -4*v2 + 8 = 0; value: 0 0: 1 3 5 4 1: 3 5 2: 1 3 4 5 3: 1 2 4 3 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 5*v3 -38 <= 0; value: -18 + -4*v1 + 4*v2 -5*v3 + 3 <= 0; value: -9 + 3*v0 + 6*v1 -3*v2 -74 < 0; value: -47 + 2*v0 -4*v1 -11 <= 0; value: -29 + <= 0; value: 0 0: 3 4 1: 1 2 3 4 2: 2 3 3: 1 2 optimal: (599/24 -e*1) + + 599/24 < 0; value: 599/24 - 4*v2 -35 <= 0; value: 0 - -4*v1 + 4*v2 -5*v3 + 3 <= 0; value: 0 - 6*v0 -3*v2 -181/2 < 0; value: -6 - 2*v0 -4*v2 + 5*v3 -14 <= 0; value: 0 + <= 0; value: 0 0: 3 4 1: 1 2 3 4 2: 2 3 4 1 3: 1 2 4 3 0: 1 -> 443/24 1: 5 -> 311/48 2: 2 -> 35/4 3: 0 -> 29/12 + 2*v0 -2*v1 <= 0; value: -2 + 6*v3 -66 < 0; value: -36 + -4*v1 + 2*v3 -5 <= 0; value: -15 + -2*v1 + 4*v3 -10 = 0; value: 0 + -4*v1 -7 <= 0; value: -27 + 3*v0 + 4*v3 -92 < 0; value: -60 0: 5 1: 2 3 4 2: 3: 1 2 3 5 optimal: (164/3 -e*1) + + 164/3 < 0; value: 164/3 + -51 < 0; value: -51 - -6*v3 + 15 <= 0; value: 0 - -2*v1 + 4*v3 -10 = 0; value: 0 + -7 <= 0; value: -7 - 3*v0 -82 < 0; value: -3 0: 5 1: 2 3 4 2: 3: 1 2 3 5 4 0: 4 -> 79/3 1: 5 -> 0 2: 4 -> 4 3: 5 -> 5/2 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 2*v1 + 2 = 0; value: 0 + -5*v1 + 4*v2 + v3 -10 = 0; value: 0 + 5*v2 + 2*v3 -85 <= 0; value: -50 + v0 + 2*v2 -36 < 0; value: -22 + -2*v1 + 4 <= 0; value: -2 0: 1 4 1: 1 2 5 2: 2 3 4 3: 2 3 optimal: 2 + + 2 <= 0; value: 2 - -2*v0 + 2*v1 + 2 = 0; value: 0 + -5*v0 + 4*v2 + v3 -5 = 0; value: 0 + 5*v2 + 2*v3 -85 <= 0; value: -50 + v0 + 2*v2 -36 < 0; value: -22 + -2*v0 + 6 <= 0; value: -2 0: 1 4 2 5 1: 1 2 5 2: 2 3 4 3: 2 3 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -1 < 0; value: -5 + 5*v1 + 3*v3 -32 <= 0; value: -16 + -2*v0 + 5*v2 -24 < 0; value: -3 + 4*v0 -6*v1 + 3 < 0; value: -1 + 6*v1 -3*v3 -16 < 0; value: -10 0: 1 3 4 1: 2 4 5 2: 3 3: 2 5 optimal: (63/22 -e*1) + + 63/22 < 0; value: 63/22 + -277/22 < 0; value: -277/22 - 11/2*v3 -56/3 <= 0; value: 0 + 5*v2 -783/22 < 0; value: -233/22 - 4*v0 -6*v1 + 3 < 0; value: -56/11 - 4*v0 -3*v3 -13 < 0; value: -4 0: 1 3 4 2 5 1: 2 4 5 2: 3 3: 2 5 1 3 0: 2 -> 211/44 1: 2 -> 50/11 2: 5 -> 5 3: 2 -> 112/33 + 2*v0 -2*v1 <= 0; value: 0 + -5*v0 + 6*v3 + 3 < 0; value: -10 + v1 -4*v2 -4 <= 0; value: -11 + 6*v1 -78 <= 0; value: -48 + v1 + 4*v3 -13 = 0; value: 0 + 3*v1 + 5*v2 -30 = 0; value: 0 0: 1 1: 2 3 4 5 2: 2 5 3: 1 4 optimal: oo + 26/3*v0 -30 < 0; value: 40/3 - -5*v0 + 5/2*v2 + 15/2 < 0; value: -5/2 + -34/3*v0 + 23 < 0; value: -101/3 + -20*v0 + 12 < 0; value: -88 - v1 + 4*v3 -13 = 0; value: 0 - 5*v2 -12*v3 + 9 = 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 2 5 1 3 3: 1 4 5 2 3 0: 5 -> 5 1: 5 -> 0 2: 3 -> 6 3: 2 -> 13/4 + 2*v0 -2*v1 <= 0; value: -10 + -1*v1 -1*v2 -3*v3 -1 <= 0; value: -9 + -1*v1 + 5*v2 + 2 <= 0; value: -3 + v1 -3*v2 -5 = 0; value: 0 + -2*v1 + 2*v3 -5 < 0; value: -13 + 5*v0 -4*v2 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 2 3 5 3: 1 4 optimal: (-23/65 -e*1) + -23/65 < 0; value: -23/65 - -13/3*v3 + 4 <= 0; value: 0 + -96/13 < 0; value: -96/13 - v1 -3*v2 -5 = 0; value: 0 - -15/2*v0 + 2*v3 -15 < 0; value: -171/26 - 5*v0 -4*v2 <= 0; value: 0 0: 5 1 4 2 1: 1 2 3 4 2: 1 2 3 5 4 3: 1 4 2 0: 0 -> -57/65 1: 5 -> 89/52 2: 0 -> -57/52 3: 1 -> 12/13 + 2*v0 -2*v1 <= 0; value: 4 + v0 -4 = 0; value: 0 + 5*v0 -4*v1 -3*v2 -3 = 0; value: 0 + 3*v1 + 6*v2 + v3 -40 < 0; value: -13 + -1*v3 -2 <= 0; value: -5 + 6*v0 + v3 -27 <= 0; value: 0 0: 1 2 5 1: 2 3 2: 2 3 3: 3 4 5 optimal: (56/5 -e*1) + + 56/5 < 0; value: 56/5 - v0 -4 = 0; value: 0 - 5*v0 -4*v1 -3*v2 -3 = 0; value: 0 - 15/4*v0 + 15/4*v2 + v3 -169/4 < 0; value: -15/4 - -1*v3 -2 <= 0; value: 0 + -5 <= 0; value: -5 0: 1 2 5 3 1: 2 3 2: 2 3 3: 3 4 5 0: 4 -> 4 1: 2 -> -17/20 2: 3 -> 34/5 3: 3 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + -5*v2 -1*v3 + 7 <= 0; value: -13 + 3*v0 + 4*v1 -3*v3 -8 = 0; value: 0 + -1*v1 -1*v2 -3 <= 0; value: -9 + v0 + 3*v2 -21 < 0; value: -9 + 2*v0 + 6*v2 -5*v3 -38 <= 0; value: -14 0: 2 4 5 1: 2 3 2: 1 3 4 5 3: 1 2 5 optimal: 1636/71 + + 1636/71 <= 0; value: 1636/71 - -2/5*v0 -31/5*v2 + 73/5 <= 0; value: 0 - 3*v0 + 4*v1 -3*v3 -8 = 0; value: 0 - 71/124*v0 -117/31 <= 0; value: 0 + -612/71 < 0; value: -612/71 - 2*v0 + 6*v2 -5*v3 -38 <= 0; value: 0 0: 2 4 5 3 1 1: 2 3 2: 1 3 4 5 3: 1 2 5 3 0: 0 -> 468/71 1: 2 -> -350/71 2: 4 -> 137/71 3: 0 -> -188/71 + 2*v0 -2*v1 <= 0; value: -10 + 4*v0 -5*v2 + 6*v3 -1 <= 0; value: -16 + -6*v0 + v3 <= 0; value: 0 + -4*v2 + 3*v3 + 2 <= 0; value: -10 + 5*v1 -2*v3 -31 < 0; value: -6 + 3*v0 + 4*v1 + 4*v3 -20 = 0; value: 0 0: 1 2 5 1: 4 5 2: 1 3 3: 1 2 3 4 5 optimal: oo + 31/16*v2 -769/80 <= 0; value: -19/5 - 40*v0 -5*v2 -1 <= 0; value: 0 - -6*v0 + v3 <= 0; value: 0 + -7/4*v2 + 49/20 <= 0; value: -14/5 + -183/32*v2 -1143/160 < 0; value: -243/10 - 3*v0 + 4*v1 + 4*v3 -20 = 0; value: 0 0: 1 2 5 4 3 1: 4 5 2: 1 3 4 3: 1 2 3 4 5 0: 0 -> 2/5 1: 5 -> 23/10 2: 3 -> 3 3: 0 -> 12/5 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 2*v2 -1 <= 0; value: -3 + 3*v1 -3*v3 <= 0; value: 0 + 4*v1 -1*v3 -15 < 0; value: -6 + 6*v1 -18 <= 0; value: 0 + -5*v0 + 2*v3 -7 < 0; value: -1 0: 5 1: 1 2 3 4 2: 1 3: 2 3 5 optimal: oo + 2*v0 -2*v2 + 1 <= 0; value: -3 - -2*v1 + 2*v2 -1 <= 0; value: 0 + 3*v2 -3*v3 -3/2 <= 0; value: -9/2 + 4*v2 -1*v3 -17 < 0; value: -12 + 6*v2 -21 <= 0; value: -9 + -5*v0 + 2*v3 -7 < 0; value: -1 0: 5 1: 1 2 3 4 2: 1 2 3 4 3: 2 3 5 0: 0 -> 0 1: 3 -> 3/2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 + 4*v3 -5 <= 0; value: -1 + -3*v0 -5*v1 + v3 + 2 <= 0; value: -1 + 4*v0 -3*v3 + 5 < 0; value: -1 + v1 + 2*v3 -11 < 0; value: -6 + -2*v2 <= 0; value: 0 0: 2 3 1: 1 2 4 2: 5 3: 1 2 3 4 optimal: (-24/25 -e*1) + -24/25 < 0; value: -24/25 - 20/3*v0 -19/15 < 0; value: -19/30 - -3*v0 -5*v1 + v3 + 2 <= 0; value: 0 - 4*v0 -3*v3 + 5 < 0; value: -31/100 + -649/100 <= 0; value: -649/100 + -2*v2 <= 0; value: 0 0: 2 3 1 4 1: 1 2 4 2: 5 3: 1 2 3 4 0: 0 -> 19/200 1: 1 -> 2167/3000 2: 0 -> 0 3: 2 -> 569/300 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 3*v3 -45 <= 0; value: -25 + -5*v0 -4*v1 -1*v3 -37 < 0; value: -82 + v0 -3*v2 + 2*v3 + 1 < 0; value: -6 + -1*v0 + 2*v2 + 2*v3 -5 <= 0; value: -2 + -2*v2 + 2*v3 -6 <= 0; value: -14 0: 1 2 3 4 1: 2 2: 3 4 5 3: 1 2 3 4 5 optimal: (5387/86 -e*1) + + 5387/86 < 0; value: 5387/86 - 43/10*v0 -411/10 <= 0; value: 0 - -5*v0 -4*v1 -1*v3 -37 < 0; value: -4 - 2*v0 -5*v2 + 6 < 0; value: -110/43 - -1*v0 + 2*v2 + 2*v3 -5 <= 0; value: 0 + -496/43 <= 0; value: -496/43 0: 1 2 3 4 5 1: 2 2: 3 4 5 1 3: 1 2 3 4 5 0: 5 -> 411/43 1: 5 -> -3549/172 2: 4 -> 238/43 3: 0 -> 75/43 + 2*v0 -2*v1 <= 0; value: 8 + -6*v1 -3*v3 -1 <= 0; value: -19 + 5*v1 + 4*v3 -49 < 0; value: -28 + -3*v0 -1*v2 + 10 <= 0; value: -7 + 6*v3 -24 = 0; value: 0 + -2*v1 -3*v2 + 6*v3 -30 < 0; value: -14 0: 3 1: 1 2 5 2: 3 5 3: 1 2 4 5 optimal: oo + 2*v0 + 13/3 <= 0; value: 43/3 - -6*v1 -3*v3 -1 <= 0; value: 0 + -263/6 < 0; value: -263/6 + -3*v0 -1*v2 + 10 <= 0; value: -7 - 6*v3 -24 = 0; value: 0 + -3*v2 -5/3 < 0; value: -23/3 0: 3 1: 1 2 5 2: 3 5 3: 1 2 4 5 0: 5 -> 5 1: 1 -> -13/6 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -5*v2 + 3 <= 0; value: -22 + -1*v0 <= 0; value: 0 + v0 -6*v3 + 12 <= 0; value: 0 + v1 -4*v3 -4 < 0; value: -10 + -4*v0 + 4*v2 -27 <= 0; value: -15 0: 2 3 5 1: 1 4 2: 1 5 3: 3 4 optimal: oo + 24*v3 -357/10 <= 0; value: 123/10 - -5*v1 -5*v2 + 3 <= 0; value: 0 + -6*v3 + 12 <= 0; value: 0 - v0 -6*v3 + 12 <= 0; value: 0 + -10*v3 + 37/20 < 0; value: -363/20 - -4*v0 + 4*v2 -27 <= 0; value: 0 0: 2 3 5 4 1: 1 4 2: 1 5 4 3: 3 4 2 0: 0 -> 0 1: 2 -> -123/20 2: 3 -> 27/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -4*v3 + 4 <= 0; value: 0 + -3*v0 + 2*v1 + 3 <= 0; value: -1 + 2*v0 -6*v1 + 7 <= 0; value: -9 + -1*v1 -3 < 0; value: -7 + -4*v2 + 4 = 0; value: 0 0: 2 3 1: 2 3 4 2: 1 5 3: 1 optimal: oo + 4/3*v0 -7/3 <= 0; value: 3 + 4*v2 -4*v3 + 4 <= 0; value: 0 + -7/3*v0 + 16/3 <= 0; value: -4 - 2*v0 -6*v1 + 7 <= 0; value: 0 + -1/3*v0 -25/6 < 0; value: -11/2 + -4*v2 + 4 = 0; value: 0 0: 2 3 4 1: 2 3 4 2: 1 5 3: 1 0: 4 -> 4 1: 4 -> 5/2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 5*v2 -73 <= 0; value: -48 + 3*v1 -29 < 0; value: -17 + 3*v2 -4*v3 -8 <= 0; value: -5 + 2*v3 <= 0; value: 0 + -1*v0 + 5*v1 + 3*v2 -33 < 0; value: -13 0: 5 1: 1 2 5 2: 1 3 5 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 5*v2 -73 <= 0; value: -48 + 3*v1 -29 < 0; value: -17 + 3*v2 -4*v3 -8 <= 0; value: -5 + 2*v3 <= 0; value: 0 + -1*v0 + 5*v1 + 3*v2 -33 < 0; value: -13 0: 5 1: 1 2 5 2: 1 3 5 3: 3 4 0: 3 -> 3 1: 4 -> 4 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v1 + v2 + 1 <= 0; value: -3 + 3*v0 -5*v2 -2*v3 + 2 < 0; value: -6 + -4*v1 + v2 -1 <= 0; value: -6 + 3*v0 + 4*v2 -53 <= 0; value: -26 + 2*v1 -11 <= 0; value: -7 0: 1 2 4 1: 1 3 5 2: 1 2 3 4 3: 2 optimal: oo + 17/10*v0 + 1/5*v3 + 3/10 < 0; value: 48/5 + -9/5*v0 -4/5*v3 + 4/5 < 0; value: -57/5 - 3*v0 -5*v2 -2*v3 + 2 < 0; value: -3 - -4*v1 + v2 -1 <= 0; value: 0 + 27/5*v0 -8/5*v3 -257/5 < 0; value: -154/5 + 3/10*v0 -1/5*v3 -113/10 < 0; value: -53/5 0: 1 2 4 5 1: 1 3 5 2: 1 2 3 4 5 3: 2 1 4 5 0: 5 -> 5 1: 2 -> 7/20 2: 3 -> 12/5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 3*v0 -3*v3 -3 <= 0; value: 0 + -2*v0 -1*v3 -6 < 0; value: -17 + -6*v1 + 3*v2 -9 <= 0; value: 0 + -3*v2 -4*v3 + 21 = 0; value: 0 + -2*v3 + 6 <= 0; value: 0 0: 1 2 1: 3 2: 3 4 3: 1 2 4 5 optimal: oo + 2*v0 + 4/3*v3 -4 <= 0; value: 8 + 3*v0 -3*v3 -3 <= 0; value: 0 + -2*v0 -1*v3 -6 < 0; value: -17 - -6*v1 + 3*v2 -9 <= 0; value: 0 - -3*v2 -4*v3 + 21 = 0; value: 0 + -2*v3 + 6 <= 0; value: 0 0: 1 2 1: 3 2: 3 4 3: 1 2 4 5 0: 4 -> 4 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -6*v3 + 30 = 0; value: 0 + 5*v1 + v2 -37 < 0; value: -24 + 6*v0 + 2*v2 -6 = 0; value: 0 + -4*v1 -6*v2 + 21 <= 0; value: -5 + 2*v1 -3*v2 + 5 <= 0; value: 0 0: 1 3 1: 2 4 5 2: 2 3 4 5 3: 1 optimal: oo + 21*v3 -213/2 <= 0; value: -3/2 - -2*v0 -6*v3 + 30 = 0; value: 0 + -117/2*v3 + 1049/4 < 0; value: -121/4 - 6*v0 + 2*v2 -6 = 0; value: 0 - -4*v1 -6*v2 + 21 <= 0; value: 0 + -54*v3 + 535/2 <= 0; value: -5/2 0: 1 3 2 5 1: 2 4 5 2: 2 3 4 5 3: 1 2 5 0: 0 -> 0 1: 2 -> 3/4 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v1 + 3*v3 -3 = 0; value: 0 + -3*v1 -3 < 0; value: -9 + <= 0; value: 0 + 6*v1 + v3 -13 = 0; value: 0 + -1*v1 -3*v2 <= 0; value: -2 0: 1 1: 1 2 4 5 2: 5 3: 1 4 optimal: oo + 5/3*v0 -3 <= 0; value: 2 - 4*v0 -6*v1 + 3*v3 -3 = 0; value: 0 + -1/2*v0 -15/2 < 0; value: -9 + <= 0; value: 0 - 4*v0 + 4*v3 -16 = 0; value: 0 + -1/6*v0 -3*v2 -3/2 <= 0; value: -2 0: 1 2 4 5 1: 1 2 4 5 2: 5 3: 1 4 2 5 0: 3 -> 3 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -2*v1 + v2 -23 <= 0; value: -13 + 5*v1 + 6*v3 -88 <= 0; value: -51 + 3*v1 -20 <= 0; value: -5 + -4*v0 -6*v1 + 3*v2 + 41 <= 0; value: -9 + -6*v0 -5*v2 + 7 <= 0; value: -23 0: 1 4 5 1: 1 2 3 4 2: 1 4 5 3: 2 optimal: 161/10 + + 161/10 <= 0; value: 161/10 - 16/3*v0 -110/3 <= 0; value: 0 + 6*v3 -751/8 <= 0; value: -655/8 + -941/40 <= 0; value: -941/40 - -4*v0 -6*v1 + 3*v2 + 41 <= 0; value: 0 - -6*v0 -5*v2 + 7 <= 0; value: 0 0: 1 4 5 2 3 1: 1 2 3 4 2: 1 4 5 2 3 3: 2 0: 5 -> 55/8 1: 5 -> -47/40 2: 0 -> -137/20 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v2 -15 < 0; value: -8 + 5*v1 -4*v3 + 4 = 0; value: 0 + -3*v2 + 6 <= 0; value: 0 + 3*v1 -1*v3 + 1 <= 0; value: 0 + -3*v2 + 5*v3 + 1 <= 0; value: 0 0: 1 1: 2 4 2: 1 3 5 3: 2 4 5 optimal: oo + 2*v0 -8/5*v3 + 8/5 <= 0; value: 2 + -5*v0 + 6*v2 -15 < 0; value: -8 - 5*v1 -4*v3 + 4 = 0; value: 0 + -3*v2 + 6 <= 0; value: 0 + 7/5*v3 -7/5 <= 0; value: 0 + -3*v2 + 5*v3 + 1 <= 0; value: 0 0: 1 1: 2 4 2: 1 3 5 3: 2 4 5 0: 1 -> 1 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 -4*v1 -3*v3 + 7 <= 0; value: -1 + -2*v1 -2*v3 < 0; value: -2 + 4*v0 -3*v1 -13 = 0; value: 0 + 5*v1 + 5*v3 -8 < 0; value: -3 + -4*v0 -2*v3 + 5 <= 0; value: -11 0: 1 3 5 1: 1 2 3 4 2: 3: 1 2 4 5 optimal: (34/5 -e*1) + + 34/5 < 0; value: 34/5 - -19/3*v0 -3*v3 + 73/3 <= 0; value: 0 + -16/5 < 0; value: -16/5 - 4*v0 -3*v1 -13 = 0; value: 0 - 35/19*v3 -77/19 < 0; value: -35/19 + -53/5 < 0; value: -53/5 0: 1 3 5 2 4 1: 1 2 3 4 2: 3: 1 2 4 5 0: 4 -> 311/95 1: 1 -> 3/95 2: 3 -> 3 3: 0 -> 6/5 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 + 2*v3 -16 < 0; value: -10 + 4*v1 <= 0; value: 0 + -2*v0 + 2*v1 + 6*v3 -50 <= 0; value: -32 + -3*v1 -3*v3 + 9 <= 0; value: 0 + v0 + 6*v1 <= 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 3: 1 3 4 optimal: (94/7 -e*1) + + 94/7 < 0; value: 94/7 - 6*v0 + 2*v3 -16 < 0; value: -2 + -212/7 < 0; value: -212/7 - -14*v0 -12 <= 0; value: 0 - -3*v1 -3*v3 + 9 <= 0; value: 0 + -324/7 < 0; value: -324/7 0: 1 3 5 2 1: 2 3 4 5 2: 3: 1 3 4 2 5 0: 0 -> -6/7 1: 0 -> -46/7 2: 0 -> 0 3: 3 -> 67/7 + 2*v0 -2*v1 <= 0; value: -6 + = 0; value: 0 + 2*v0 + 3*v3 -32 < 0; value: -16 + -4*v1 + 3*v2 + 5 = 0; value: 0 + 3*v1 + 5*v3 -85 <= 0; value: -50 + -5*v0 -1*v1 -4*v2 + 20 < 0; value: -15 0: 2 5 1: 3 4 5 2: 3 5 3: 2 4 optimal: oo + -102/19*v3 + 928/19 < 0; value: 520/19 + = 0; value: 0 - 2*v0 + 3*v3 -32 < 0; value: -2 - -4*v1 + 3*v2 + 5 = 0; value: 0 + 325/38*v3 -2095/19 < 0; value: -1445/19 - -5*v0 -19/4*v2 + 75/4 < 0; value: -19/4 0: 2 5 4 1: 3 4 5 2: 3 5 4 3: 2 4 0: 2 -> 9 1: 5 -> -163/76 2: 5 -> -86/19 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v0 -3*v3 + 4 < 0; value: -3 + 6*v2 -3*v3 -19 <= 0; value: -10 + 2*v2 + 5*v3 -45 <= 0; value: -24 + 4*v0 -4*v1 + 3*v3 -14 <= 0; value: -5 + 2*v0 + 5*v1 -12 <= 0; value: -5 0: 1 4 5 1: 4 5 2: 2 3 3: 1 2 3 4 optimal: oo + -3*v2 + 33/2 < 0; value: 15/2 - 2*v0 -3*v3 + 4 < 0; value: -3 - -2*v0 + 6*v2 -23 <= 0; value: 0 + 12*v2 -230/3 < 0; value: -122/3 - 4*v0 -4*v1 + 3*v3 -14 <= 0; value: 0 + 57/2*v2 -535/4 < 0; value: -193/4 0: 1 4 5 2 3 1: 4 5 2: 2 3 5 3: 1 2 3 4 5 0: 1 -> -5/2 1: 1 -> -11/2 2: 3 -> 3 3: 3 -> 2/3 + 2*v0 -2*v1 <= 0; value: 0 + -6*v3 + 24 = 0; value: 0 + -3*v3 + 2 <= 0; value: -10 + -4*v0 -5*v1 -3*v3 -37 <= 0; value: -94 + 2*v2 -4 <= 0; value: -2 + -3*v1 -1*v3 + 19 = 0; value: 0 0: 3 1: 3 5 2: 4 3: 1 2 3 5 optimal: oo + 2*v0 -10 <= 0; value: 0 - -6*v3 + 24 = 0; value: 0 + -10 <= 0; value: -10 + -4*v0 -74 <= 0; value: -94 + 2*v2 -4 <= 0; value: -2 - -3*v1 -1*v3 + 19 = 0; value: 0 0: 3 1: 3 5 2: 4 3: 1 2 3 5 0: 5 -> 5 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -40 <= 0; value: -23 + v0 -3 <= 0; value: 0 + 3*v2 -14 <= 0; value: -5 + v2 + 4*v3 -10 <= 0; value: -3 + v0 + 2*v3 -7 <= 0; value: -2 0: 2 5 1: 2: 1 3 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 + 2*v3 -40 <= 0; value: -23 + v0 -3 <= 0; value: 0 + 3*v2 -14 <= 0; value: -5 + v2 + 4*v3 -10 <= 0; value: -3 + v0 + 2*v3 -7 <= 0; value: -2 0: 2 5 1: 2: 1 3 4 3: 1 4 5 0: 3 -> 3 1: 3 -> 3 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -5*v2 + 3*v3 + 3 <= 0; value: -2 + -2*v2 -1 <= 0; value: -3 + -4*v0 -5*v2 + 7 < 0; value: -6 + 2*v0 -3*v3 -4 <= 0; value: 0 + 6*v0 -3*v1 -3 = 0; value: 0 0: 3 4 5 1: 5 2: 1 2 3 3: 1 4 optimal: oo + 5/2*v2 -3/2 < 0; value: 1 + -5*v2 + 3*v3 + 3 <= 0; value: -2 + -2*v2 -1 <= 0; value: -3 - -4*v0 -5*v2 + 7 < 0; value: -3 + -5/2*v2 -3*v3 -1/2 < 0; value: -3 - 6*v0 -3*v1 -3 = 0; value: 0 0: 3 4 5 1: 5 2: 1 2 3 4 3: 1 4 0: 2 -> 5/4 1: 3 -> 3/2 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 + 2*v3 -2 <= 0; value: 0 + -6*v1 + 5*v3 -9 <= 0; value: -22 + <= 0; value: 0 + 2*v0 -6*v2 -17 <= 0; value: -41 + v1 + 3*v2 -5*v3 -12 < 0; value: -2 0: 1 4 1: 2 5 2: 4 5 3: 1 2 5 optimal: (114/7 -e*1) + + 114/7 < 0; value: 114/7 - 112/25*v0 -314/25 < 0; value: -112/25 - -6*v1 + 5*v3 -9 <= 0; value: 0 + <= 0; value: 0 - 2*v0 -6*v2 -17 <= 0; value: 0 - 3*v2 -25/6*v3 -27/2 < 0; value: -25/6 0: 1 4 1: 2 5 2: 4 5 1 3: 1 2 5 0: 0 -> 101/56 1: 3 -> -3953/840 2: 4 -> -125/56 3: 1 -> -2693/700 + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 -6*v2 -1 <= 0; value: -31 + 5*v0 + 2*v1 + 6*v2 -86 <= 0; value: -46 + -4*v0 -4*v1 + 20 = 0; value: 0 + -5*v1 + 5*v2 -1*v3 + 4 = 0; value: 0 + 4*v1 -28 <= 0; value: -8 0: 1 2 3 1: 2 3 4 5 2: 1 2 4 3: 4 optimal: oo + -8*v2 + 274/3 <= 0; value: 154/3 + -77 <= 0; value: -77 - 3*v2 + 3/5*v3 -317/5 <= 0; value: 0 - -4*v0 -4*v1 + 20 = 0; value: 0 - 5*v0 + 5*v2 -1*v3 -21 = 0; value: 0 + 8*v2 -328/3 <= 0; value: -208/3 0: 1 2 3 4 5 1: 2 3 4 5 2: 1 2 4 5 3: 4 2 1 5 0: 0 -> 46/3 1: 5 -> -31/3 2: 5 -> 5 3: 4 -> 242/3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -2*v1 + v2 -20 < 0; value: -10 + -6*v0 + v1 + 2*v2 + 11 <= 0; value: -10 + -4*v1 + 2*v3 -10 <= 0; value: -22 + 6*v1 + v2 + 6*v3 -33 < 0; value: -15 + -5*v1 + 15 = 0; value: 0 0: 1 2 1: 1 2 3 4 5 2: 1 2 4 3: 3 4 optimal: oo + -1/2*v2 + 7 < 0; value: 7 - 4*v0 + v2 -26 < 0; value: -4 + 7/2*v2 -25 < 0; value: -25 + 2*v3 -22 <= 0; value: -22 + v2 + 6*v3 -15 < 0; value: -15 - -5*v1 + 15 = 0; value: 0 0: 1 2 1: 1 2 3 4 5 2: 1 2 4 3: 3 4 0: 4 -> 11/2 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -2*v2 -2 <= 0; value: -10 + -1*v1 + 2*v2 + 5*v3 -22 = 0; value: 0 + 5*v0 -1*v1 -3*v3 -10 = 0; value: 0 + -4*v0 -2*v2 + 21 <= 0; value: -3 + 3*v1 + 4*v2 -49 <= 0; value: -30 0: 3 4 1: 2 3 5 2: 1 2 4 5 3: 2 3 optimal: 24 + + 24 <= 0; value: 24 + -287/5 <= 0; value: -287/5 - -1*v1 + 2*v2 + 5*v3 -22 = 0; value: 0 - 5*v0 -2*v2 -8*v3 + 12 = 0; value: 0 - -4*v0 -2*v2 + 21 <= 0; value: 0 - -25/8*v0 -215/8 <= 0; value: 0 0: 3 4 5 1 1: 2 3 5 2: 1 2 4 5 3 3: 2 3 5 0: 4 -> -43/5 1: 1 -> -103/5 2: 4 -> 277/10 3: 3 -> -54/5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + 6*v0 -12 = 0; value: 0 + v0 + 4*v2 -14 <= 0; value: -4 + -6*v0 -5*v2 + 10 <= 0; value: -12 0: 2 3 4 5 1: 2: 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + 6*v0 -12 = 0; value: 0 + v0 + 4*v2 -14 <= 0; value: -4 + -6*v0 -5*v2 + 10 <= 0; value: -12 0: 2 3 4 5 1: 2: 4 5 3: 1 0: 2 -> 2 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 + 5*v1 -9 = 0; value: 0 + -5*v3 + 10 = 0; value: 0 + v1 -3*v3 + 4 <= 0; value: 0 + 6*v1 -2*v3 -21 <= 0; value: -13 + v1 + 5*v2 -7 = 0; value: 0 0: 1 1: 1 3 4 5 2: 5 3: 2 3 4 optimal: -2 + -2 <= 0; value: -2 - -1*v0 + 5*v1 -9 = 0; value: 0 - -5*v3 + 10 = 0; value: 0 - -5*v2 -3*v3 + 11 <= 0; value: 0 + -13 <= 0; value: -13 - 1/5*v0 + 5*v2 -26/5 = 0; value: 0 0: 1 5 3 4 1: 1 3 4 5 2: 5 3 4 3: 2 3 4 0: 1 -> 1 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 -35 <= 0; value: -23 + -3*v0 + 4*v1 + 2*v3 -5 < 0; value: -3 + 4*v0 + 6*v2 -35 < 0; value: -21 + -3*v0 + 6*v1 -6 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 1: 1 2 4 2: 3 3: 2 optimal: (23/3 -e*1) + + 23/3 < 0; value: 23/3 - -9/2*v2 -11/4 <= 0; value: 0 + 2*v3 -32/3 < 0; value: -32/3 - 4*v0 + 6*v2 -35 < 0; value: -4 - -3*v0 + 6*v1 -6 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 1 1: 1 2 4 2: 3 1 2 3: 2 0: 2 -> 26/3 1: 2 -> 16/3 2: 1 -> -11/18 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + v1 + 6*v2 -20 = 0; value: 0 + -5*v0 + 5*v2 + 1 <= 0; value: -4 + -4*v1 + 5*v3 -48 <= 0; value: -31 + 3*v0 + 2*v1 -27 <= 0; value: -11 + 4*v1 -2*v2 -4 <= 0; value: -2 0: 2 4 1: 1 3 4 5 2: 1 2 5 3: 3 optimal: oo + -35/12*v3 + 526/15 <= 0; value: 1229/60 - v1 + 6*v2 -20 = 0; value: 0 - -5*v0 + 5*v2 + 1 <= 0; value: 0 - 24*v0 + 5*v3 -664/5 <= 0; value: 0 + 15/8*v3 -172/5 <= 0; value: -1001/40 + 65/12*v3 -188/3 <= 0; value: -427/12 0: 2 4 3 5 1: 1 3 4 5 2: 1 2 5 3 4 3: 3 4 5 0: 4 -> 539/120 1: 2 -> -23/4 2: 3 -> 103/24 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + 2*v1 + 4*v3 -50 <= 0; value: -30 + 2*v0 + 5*v3 -33 = 0; value: 0 + -1*v0 -6*v2 + 4*v3 -7 < 0; value: -15 + -6*v0 + 6*v3 -6 <= 0; value: 0 + -1*v1 + 4*v3 -39 <= 0; value: -19 0: 2 3 4 1: 1 5 2: 3 3: 1 2 3 4 5 optimal: oo + 26/5*v0 + 126/5 <= 0; value: 46 + -24/5*v0 -244/5 <= 0; value: -68 - 2*v0 + 5*v3 -33 = 0; value: 0 + -13/5*v0 -6*v2 + 97/5 < 0; value: -15 + -42/5*v0 + 168/5 <= 0; value: 0 - -1*v1 + 4*v3 -39 <= 0; value: 0 0: 2 3 4 1 1: 1 5 2: 3 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> -19 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 9 < 0; value: -11 + <= 0; value: 0 + -4*v0 + 5*v1 + 4 < 0; value: -6 + 3*v1 + 4*v2 -16 < 0; value: -10 + 4*v0 -5*v1 -2*v3 <= 0; value: 0 0: 1 3 5 1: 3 4 5 2: 4 3: 5 optimal: oo + 2/5*v0 + 4/5*v3 <= 0; value: 6 + -4*v0 + 9 < 0; value: -11 + <= 0; value: 0 + -2*v3 + 4 < 0; value: -6 + 12/5*v0 + 4*v2 -6/5*v3 -16 < 0; value: -10 - 4*v0 -5*v1 -2*v3 <= 0; value: 0 0: 1 3 5 4 1: 3 4 5 2: 4 3: 5 3 4 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -1*v1 = 0; value: 0 + 2*v0 -4*v1 -7 < 0; value: -1 + -3*v0 -5*v3 -13 < 0; value: -32 + 3*v1 + 4*v2 -4 = 0; value: 0 + -5*v0 + 5 < 0; value: -10 0: 2 3 5 1: 1 2 4 2: 4 3: 3 optimal: (7 -e*1) + + 7 < 0; value: 7 - -1*v1 = 0; value: 0 - 2*v0 -7 < 0; value: -1/2 + -5*v3 -47/2 < 0; value: -67/2 + 4*v2 -4 = 0; value: 0 + -25/2 < 0; value: -25/2 0: 2 3 5 1: 1 2 4 2: 4 3: 3 0: 3 -> 13/4 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 + 3 <= 0; value: -3 + 6*v0 -6*v3 -32 <= 0; value: -14 + -1*v0 -3*v3 + 2 < 0; value: -1 + -1*v2 + 5*v3 -2 <= 0; value: -5 + -3*v2 -6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2: 4 5 3: 2 3 4 5 optimal: 233/21 + + 233/21 <= 0; value: 233/21 - -6*v1 + 3 <= 0; value: 0 - 6*v0 -6*v3 -32 <= 0; value: 0 + -130/21 < 0; value: -130/21 - -7/2*v2 + 11/2 <= 0; value: 0 - -3*v2 -6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2: 4 5 3 3: 2 3 4 5 0: 3 -> 127/21 1: 1 -> 1/2 2: 3 -> 11/7 3: 0 -> 5/7 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -1*v1 + 3*v2 + 10 < 0; value: -7 + 6*v2 + 3*v3 -27 <= 0; value: 0 + 2*v3 -19 <= 0; value: -9 + -3*v2 + 5*v3 -41 <= 0; value: -22 + -1*v1 + 2*v2 -3*v3 + 6 <= 0; value: -8 0: 1 1: 1 5 2: 1 2 4 5 3: 2 3 4 5 optimal: (3176/65 -e*1) + + 3176/65 < 0; value: 3176/65 - -5*v0 -1*v1 + 3*v2 + 10 < 0; value: -1 - 195/14*v0 -1149/14 <= 0; value: 0 + -29/13 <= 0; value: -29/13 - -15*v0 + 14*v3 -29 <= 0; value: 0 - 5*v0 -1*v2 -3*v3 -4 <= 0; value: 0 0: 1 5 4 2 3 1: 1 5 2: 1 2 4 5 3: 2 3 4 5 0: 4 -> 383/65 1: 3 -> -228/13 2: 2 -> 4/13 3: 5 -> 109/13 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v3 + 12 = 0; value: 0 + v0 -5*v1 + 22 = 0; value: 0 + -4*v0 -4*v3 + 9 <= 0; value: -3 + 5*v1 -3*v3 -49 <= 0; value: -24 + 6*v0 + 6*v1 -5*v2 -105 < 0; value: -62 0: 1 2 3 5 1: 2 4 5 2: 5 3: 1 3 4 optimal: oo + 10/9*v2 + 26/3 < 0; value: 88/9 - -4*v0 + 4*v3 + 12 = 0; value: 0 - v0 -5*v1 + 22 = 0; value: 0 + -50/9*v2 -199/3 < 0; value: -647/9 + -25/18*v2 -239/6 < 0; value: -371/9 - -5*v2 + 36/5*v3 -57 < 0; value: -36/5 0: 1 2 3 5 4 1: 2 4 5 2: 5 3 4 3: 1 3 4 5 0: 3 -> 191/18 1: 5 -> 587/90 2: 1 -> 1 3: 0 -> 137/18 + 2*v0 -2*v1 <= 0; value: 4 + v1 + 4*v3 -32 < 0; value: -19 + -1*v1 -6*v3 -7 <= 0; value: -26 + -5*v1 -5*v2 + 5*v3 -23 <= 0; value: -13 + 2*v1 -1*v3 <= 0; value: -1 + 3*v3 -11 <= 0; value: -2 0: 1: 1 2 3 4 2: 3 3: 1 2 3 4 5 optimal: oo + 2*v0 + 58 <= 0; value: 64 + -139/3 < 0; value: -139/3 - v2 -7*v3 -12/5 <= 0; value: 0 - -5*v1 -5*v2 + 5*v3 -23 <= 0; value: 0 + -185/3 <= 0; value: -185/3 - 3/7*v2 -421/35 <= 0; value: 0 0: 1: 1 2 3 4 2: 3 2 1 4 5 3: 1 2 3 4 5 0: 3 -> 3 1: 1 -> -29 2: 0 -> 421/15 3: 3 -> 11/3 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 + 2*v2 -37 <= 0; value: -17 + -2*v0 + 3*v3 -35 <= 0; value: -22 + 2*v2 -4*v3 + 8 <= 0; value: -4 + 5*v0 + 5*v1 -41 <= 0; value: -21 + 5*v0 -6*v1 + 13 <= 0; value: 0 0: 2 4 5 1: 1 4 5 2: 1 3 3: 2 3 optimal: -178/55 + -178/55 <= 0; value: -178/55 + 2*v2 -191/11 <= 0; value: -103/11 + 3*v3 -2287/55 <= 0; value: -1462/55 + 2*v2 -4*v3 + 8 <= 0; value: -4 - 55/6*v0 -181/6 <= 0; value: 0 - 5*v0 -6*v1 + 13 <= 0; value: 0 0: 2 4 5 1 1: 1 4 5 2: 1 3 3: 2 3 0: 1 -> 181/55 1: 3 -> 54/11 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 + 5*v2 + 2*v3 -62 <= 0; value: -37 + -2*v1 + 5 <= 0; value: -1 + -5*v1 + 3*v2 + 12 = 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 4*v3 -5 < 0; value: -1 0: 1: 1 2 3 2: 1 3 3: 1 4 5 optimal: oo + 2*v0 -5 <= 0; value: -5 + 2*v3 -277/6 <= 0; value: -265/6 - -6/5*v2 + 1/5 <= 0; value: 0 - -5*v1 + 3*v2 + 12 = 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 4*v3 -5 < 0; value: -1 0: 1: 1 2 3 2: 1 3 2 3: 1 4 5 0: 0 -> 0 1: 3 -> 5/2 2: 1 -> 1/6 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 + 5*v1 + 5*v3 -42 = 0; value: 0 + -3*v0 + 4*v2 -3*v3 -5 <= 0; value: -11 + -4*v0 + 3*v3 -11 = 0; value: 0 + 6*v1 -5*v2 -17 <= 0; value: -8 + 4*v0 + 5*v1 -31 <= 0; value: -7 0: 1 2 3 5 1: 1 4 5 2: 2 4 3: 1 2 3 optimal: 334/5 + + 334/5 <= 0; value: 334/5 - -3*v0 + 5*v1 + 5*v3 -42 = 0; value: 0 + 4*v2 -170 <= 0; value: -158 - -4*v0 + 3*v3 -11 = 0; value: 0 + -5*v2 -427/5 <= 0; value: -502/5 - 1/3*v0 -22/3 <= 0; value: 0 0: 1 2 3 5 4 1: 1 4 5 2: 2 4 3: 1 2 3 4 5 0: 1 -> 22 1: 4 -> -57/5 2: 3 -> 3 3: 5 -> 33 + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 + 6*v3 -10 = 0; value: 0 + 4*v0 -2*v2 -9 <= 0; value: -5 + -6*v0 -4 < 0; value: -16 + -2*v2 -3*v3 -2 <= 0; value: -6 + -5*v0 + 2*v2 + 6 = 0; value: 0 0: 2 3 5 1: 2: 1 2 4 5 3: 1 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v2 + 6*v3 -10 = 0; value: 0 + 4*v0 -2*v2 -9 <= 0; value: -5 + -6*v0 -4 < 0; value: -16 + -2*v2 -3*v3 -2 <= 0; value: -6 + -5*v0 + 2*v2 + 6 = 0; value: 0 0: 2 3 5 1: 2: 1 2 4 5 3: 1 4 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -5*v0 + 3*v2 + v3 -18 <= 0; value: -4 + -6*v1 + 2*v3 + 13 <= 0; value: -13 + 3*v2 -2*v3 -18 <= 0; value: -10 + 5*v0 + 3*v1 -15 = 0; value: 0 + -6*v0 + v3 -4 <= 0; value: -2 0: 1 4 5 1: 2 4 2: 1 3 3: 1 2 3 5 optimal: oo + -8/5*v2 + 26/3 <= 0; value: 34/15 + 6*v2 -89/2 <= 0; value: -41/2 - 10*v0 + 2*v3 -17 <= 0; value: 0 - 3*v2 -2*v3 -18 <= 0; value: 0 - 5*v0 + 3*v1 -15 = 0; value: 0 + 33/10*v2 -34 <= 0; value: -104/5 0: 1 4 5 2 1: 2 4 2: 1 3 5 3: 1 2 3 5 0: 0 -> 23/10 1: 5 -> 7/6 2: 4 -> 4 3: 2 -> -3 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -3*v1 -2 = 0; value: 0 + v0 -5*v1 -3 <= 0; value: -7 + -6*v0 -5*v2 -2*v3 -15 < 0; value: -46 + -2*v2 -5 < 0; value: -11 + -6*v2 -3*v3 + 33 = 0; value: 0 0: 1 2 3 1: 1 2 2: 3 4 5 3: 3 5 optimal: 14/11 + + 14/11 <= 0; value: 14/11 - 5*v0 -3*v1 -2 = 0; value: 0 - -22/3*v0 + 1/3 <= 0; value: 0 + -5*v2 -2*v3 -168/11 < 0; value: -443/11 + -2*v2 -5 < 0; value: -11 + -6*v2 -3*v3 + 33 = 0; value: 0 0: 1 2 3 1: 1 2 2: 3 4 5 3: 3 5 0: 1 -> 1/22 1: 1 -> -13/22 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 <= 0; value: 0 + 2*v3 -17 <= 0; value: -7 + 6*v0 -3*v1 + 8 < 0; value: -1 + -3*v1 + 2*v2 + 5 = 0; value: 0 + -6*v0 -1*v1 -5*v3 + 28 = 0; value: 0 0: 1 3 5 1: 3 4 5 2: 4 3: 2 5 optimal: (-16/3 -e*1) + -16/3 < 0; value: -16/3 - -5*v0 <= 0; value: 0 + -103/15 <= 0; value: -103/15 - 24*v0 + 15*v3 -76 < 0; value: -1/2 - -3*v1 + 2*v2 + 5 = 0; value: 0 - -6*v0 -2/3*v2 -5*v3 + 79/3 = 0; value: 0 0: 1 3 5 2 1: 3 4 5 2: 4 3 5 3: 2 5 3 0: 0 -> 0 1: 3 -> 17/6 2: 2 -> 7/4 3: 5 -> 151/30 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 4*v2 -2*v3 -47 <= 0; value: -15 + -1*v1 + 4 <= 0; value: 0 + 6*v0 + v1 -5*v3 -32 < 0; value: -14 + -4*v1 + 4*v3 + 3 <= 0; value: -5 + -5*v2 + 24 <= 0; value: -1 0: 1 3 1: 2 3 4 2: 1 5 3: 1 3 4 optimal: (27/4 -e*1) + + 27/4 < 0; value: 27/4 + 4*v2 -24 <= 0; value: -4 - -1*v1 + 4 <= 0; value: 0 - 6*v0 -5*v3 -28 < 0; value: -6 - 4*v3 -13 <= 0; value: 0 + -5*v2 + 24 <= 0; value: -1 0: 1 3 1: 2 3 4 2: 1 5 3: 1 3 4 0: 4 -> 51/8 1: 4 -> 4 2: 5 -> 5 3: 2 -> 13/4 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v3 -10 = 0; value: 0 + 4*v1 -20 = 0; value: 0 + -5*v0 -4*v3 + 10 < 0; value: -35 + -1*v0 + 5*v3 -36 <= 0; value: -16 + -4*v1 + 4*v2 + 6*v3 -26 <= 0; value: -8 0: 3 4 1: 1 2 5 2: 5 3: 1 3 4 5 optimal: oo + 2*v0 -10 <= 0; value: 0 - 4*v1 -2*v3 -10 = 0; value: 0 - 2*v3 -10 = 0; value: 0 + -5*v0 -10 < 0; value: -35 + -1*v0 -11 <= 0; value: -16 + 4*v2 -16 <= 0; value: -8 0: 3 4 1: 1 2 5 2: 5 3: 1 3 4 5 2 0: 5 -> 5 1: 5 -> 5 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v2 -6 <= 0; value: -18 + -1*v0 + v2 -2 <= 0; value: 0 + 3*v0 + 2*v1 -5*v2 + 10 = 0; value: 0 + 4*v0 + 2*v1 + 5*v2 -53 < 0; value: -32 + 2*v0 -4*v2 -2*v3 + 10 = 0; value: 0 0: 2 3 4 5 1: 3 4 2: 1 2 3 4 5 3: 5 optimal: (815/2 -e*1) + + 815/2 < 0; value: 815/2 - -2*v0 + 2*v3 -16 <= 0; value: 0 + -163/2 < 0; value: -163/2 - 3*v0 + 2*v1 -5*v2 + 10 = 0; value: 0 - v0 -78 < 0; value: -1 - 2*v0 -4*v2 -2*v3 + 10 = 0; value: 0 0: 2 3 4 5 1 1: 3 4 2: 1 2 3 4 5 3: 5 1 2 4 0: 1 -> 77 1: 1 -> -497/4 2: 3 -> -3/2 3: 0 -> 85 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 -1*v2 + 3*v3 -10 <= 0; value: -22 + 5*v2 + 3*v3 -38 <= 0; value: -24 + 4*v3 -12 <= 0; value: 0 + -6*v1 -1*v2 + 6*v3 <= 0; value: -1 + 4*v1 -2*v3 -6 <= 0; value: 0 0: 1 1: 4 5 2: 1 2 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 1/3*v2 -2*v3 <= 0; value: 13/3 + -4*v0 -1*v2 + 3*v3 -10 <= 0; value: -22 + 5*v2 + 3*v3 -38 <= 0; value: -24 + 4*v3 -12 <= 0; value: 0 - -6*v1 -1*v2 + 6*v3 <= 0; value: 0 + -2/3*v2 + 2*v3 -6 <= 0; value: -2/3 0: 1 1: 4 5 2: 1 2 4 5 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> 17/6 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 -5*v1 + 19 = 0; value: 0 + -4*v0 -2*v3 + 18 = 0; value: 0 + 3*v2 -6*v3 + 2 <= 0; value: -4 + -4*v1 + 2*v3 < 0; value: -2 + -3*v1 -4*v2 -3*v3 -24 <= 0; value: -55 0: 1 2 1: 1 4 5 2: 3 5 3: 2 3 4 5 optimal: 3610/357 + + 3610/357 <= 0; value: 3610/357 - -3*v0 -5*v1 + 19 = 0; value: 0 - -4*v0 -2*v3 + 18 = 0; value: 0 - 3*v2 -6*v3 + 2 <= 0; value: 0 + -2162/357 < 0; value: -2162/357 - -119/20*v2 -143/5 <= 0; value: 0 0: 1 2 4 5 1: 1 4 5 2: 3 5 4 3: 2 3 4 5 0: 3 -> 1976/357 1: 2 -> 57/119 2: 4 -> -572/119 3: 3 -> -739/357 + 2*v0 -2*v1 <= 0; value: 2 + -1*v1 -5*v3 -17 <= 0; value: -40 + 2*v1 -4*v2 -1 <= 0; value: -3 + v2 -4*v3 + 14 = 0; value: 0 + v0 + 2*v1 -25 <= 0; value: -15 + -2*v1 -1*v2 -3*v3 + 20 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 5 3: 1 3 5 optimal: oo + 2*v0 + 7/4*v2 -19/2 <= 0; value: 2 + -3/8*v2 -157/4 <= 0; value: -40 + -23/4*v2 + 17/2 <= 0; value: -3 - v2 -4*v3 + 14 = 0; value: 0 + v0 -7/4*v2 -31/2 <= 0; value: -15 - -2*v1 -1*v2 -3*v3 + 20 = 0; value: 0 0: 4 1: 1 2 4 5 2: 2 3 5 1 4 3: 1 3 5 2 4 0: 4 -> 4 1: 3 -> 3 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 + 3 <= 0; value: -3 + -1*v1 -3*v2 + v3 + 4 = 0; value: 0 + v1 -1*v3 -1 <= 0; value: -3 + 5*v0 -26 <= 0; value: -1 + v0 + 5*v2 -2*v3 -8 < 0; value: -3 0: 4 5 1: 1 2 3 2: 2 5 3: 2 3 5 optimal: (37/5 -e*1) + + 37/5 < 0; value: 37/5 - -1*v0 + v2 + 3 <= 0; value: 0 - -1*v1 -3*v2 + v3 + 4 = 0; value: 0 + -18/5 <= 0; value: -18/5 - 5*v0 -26 <= 0; value: 0 - v0 + 5*v2 -2*v3 -8 < 0; value: -9/10 0: 4 5 1 3 1: 1 2 3 2: 2 5 1 3 3: 2 3 5 1 0: 5 -> 26/5 1: 3 -> 39/20 2: 2 -> 11/5 3: 5 -> 91/20 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -5*v3 + 1 < 0; value: -1 + -4*v1 + 3*v3 -3 <= 0; value: -8 + -1*v1 + 1 <= 0; value: -1 + -1*v0 -4*v1 -5*v3 + 7 <= 0; value: -7 + -3*v0 -3*v3 -1 <= 0; value: -7 0: 1 4 5 1: 2 3 4 2: 3: 1 2 4 5 optimal: (46/9 -e*1) + + 46/9 < 0; value: 46/9 - 3*v0 -5*v3 + 1 < 0; value: -3 - 3*v3 -7 <= 0; value: 0 - -1*v1 + 1 <= 0; value: 0 + -110/9 < 0; value: -110/9 + -56/3 < 0; value: -56/3 0: 1 4 5 1: 2 3 4 2: 3: 1 2 4 5 0: 1 -> 23/9 1: 2 -> 1 2: 0 -> 0 3: 1 -> 7/3 + 2*v0 -2*v1 <= 0; value: -2 + v0 + 5*v1 -1*v2 -19 <= 0; value: -11 + -3*v1 + 3*v2 + 2*v3 -5 = 0; value: 0 + -1*v2 + 6*v3 -8 <= 0; value: -5 + 3*v0 + 3*v1 -3*v2 = 0; value: 0 + -1*v0 + 2*v1 + 2*v3 -14 <= 0; value: -9 0: 1 4 5 1: 1 2 4 5 2: 1 2 3 4 3: 2 3 5 optimal: oo + 22*v0 -14 <= 0; value: 8 + -40*v0 + 9 <= 0; value: -31 - -3*v1 + 3*v2 + 2*v3 -5 = 0; value: 0 - -9*v0 -1*v2 + 7 <= 0; value: 0 - 3*v0 + 2*v3 -5 = 0; value: 0 + -24*v0 + 5 <= 0; value: -19 0: 1 4 5 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 2 3 5 4 1 0: 1 -> 1 1: 2 -> -3 2: 3 -> -2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 6 = 0; value: 0 + 3*v0 + 6*v2 -21 = 0; value: 0 + 4*v2 + 5*v3 -29 <= 0; value: -17 + -4*v1 -1*v3 + 12 = 0; value: 0 + -3*v0 -2*v1 + 5*v3 + 3 < 0; value: -6 0: 2 5 1: 1 4 5 2: 2 3 3: 3 4 5 optimal: oo + -4*v2 + 8 <= 0; value: -4 - -2*v1 + 6 = 0; value: 0 - 3*v0 + 6*v2 -21 = 0; value: 0 + 4*v2 + 5*v3 -29 <= 0; value: -17 + -1*v3 = 0; value: 0 + 6*v2 + 5*v3 -24 < 0; value: -6 0: 2 5 1: 1 4 5 2: 2 3 5 3: 3 4 5 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + = 0; value: 0 + 5*v0 + 4*v2 -12 <= 0; value: -4 + -1*v1 <= 0; value: -1 + -6*v1 + 2*v2 < 0; value: -2 + -6*v0 + 2*v1 + 6*v3 -5 < 0; value: -3 0: 2 5 1: 3 4 5 2: 2 4 3: 5 optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 + = 0; value: 0 - 5*v0 -12 <= 0; value: 0 - -1/3*v2 <= 0; value: 0 - -6*v1 + 2*v2 < 0; value: -3 + 6*v3 -97/5 < 0; value: -97/5 0: 2 5 1: 3 4 5 2: 2 4 3 5 3: 5 0: 0 -> 12/5 1: 1 -> 1/2 2: 2 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -2*v0 + 2*v3 -3 < 0; value: -9 + -5*v0 + v1 + 4*v3 + 1 < 0; value: -14 + 6*v1 + 4*v2 -30 < 0; value: -12 + 4*v0 + 4*v3 -20 = 0; value: 0 + -2*v1 + v3 <= 0; value: -1 0: 1 2 4 1: 2 3 5 2: 3 3: 1 2 4 5 optimal: oo + 3*v0 -5 <= 0; value: 7 + -4*v0 + 7 < 0; value: -9 + -19/2*v0 + 47/2 < 0; value: -29/2 + -3*v0 + 4*v2 -15 < 0; value: -15 - 4*v0 + 4*v3 -20 = 0; value: 0 - -2*v1 + v3 <= 0; value: 0 0: 1 2 4 3 1: 2 3 5 2: 3 3: 1 2 4 5 3 0: 4 -> 4 1: 1 -> 1/2 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 -4*v3 -11 < 0; value: -28 + 4*v2 -13 < 0; value: -1 + -6*v1 -4*v3 -20 <= 0; value: -46 + -1*v0 -1*v1 + 6*v2 -13 <= 0; value: -2 + -1*v3 < 0; value: -2 0: 4 1: 1 3 4 2: 2 4 3: 1 3 5 optimal: oo + 2*v0 + 4/3*v3 + 20/3 <= 0; value: 52/3 + -2*v3 -1 < 0; value: -5 + 2/3*v0 -4/9*v3 -59/9 < 0; value: -43/9 - 6*v0 -36*v2 -4*v3 + 58 <= 0; value: 0 - -1*v0 -1*v1 + 6*v2 -13 <= 0; value: 0 + -1*v3 < 0; value: -2 0: 4 1 3 2 1: 1 3 4 2: 2 4 1 3 3: 1 3 5 2 0: 4 -> 4 1: 3 -> -14/3 2: 3 -> 37/18 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -1*v1 + 3 <= 0; value: -1 + 6*v1 -2*v2 + 2*v3 -31 < 0; value: -1 + 3*v0 + 6*v3 -76 <= 0; value: -46 + 3*v1 -5*v2 -2 = 0; value: 0 + -6*v3 -13 < 0; value: -43 0: 1 3 1: 1 2 4 2: 2 4 3: 2 3 5 optimal: (1228/3 -e*1) + + 1228/3 < 0; value: 1228/3 - -6*v0 -5/3*v2 + 7/3 <= 0; value: 0 + -13118/15 < 0; value: -13118/15 - 3*v0 + 6*v3 -76 <= 0; value: 0 - 3*v1 -5*v2 -2 = 0; value: 0 - -6*v3 -13 < 0; value: -6 0: 1 3 2 1: 1 2 4 2: 2 4 1 3: 2 3 5 0: 0 -> 83/3 1: 4 -> -163 2: 2 -> -491/5 3: 5 -> -7/6 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 3*v2 + 5*v3 -47 <= 0; value: -27 + -1*v1 + 2*v2 -9 = 0; value: 0 + 3*v1 -2*v2 -1*v3 + 2 < 0; value: -6 + v1 + 4*v2 + 6*v3 -58 <= 0; value: -31 + 2*v0 -3*v1 + 5*v2 -48 <= 0; value: -26 0: 1 5 1: 2 3 4 5 2: 1 2 3 4 5 3: 1 3 4 optimal: oo + -6*v0 + 102 <= 0; value: 102 + 9*v0 + 5*v3 -110 <= 0; value: -105 - -1*v1 + 2*v2 -9 = 0; value: 0 + 8*v0 -1*v3 -109 < 0; value: -110 + 12*v0 + 6*v3 -193 <= 0; value: -187 - 2*v0 -1*v2 -21 <= 0; value: 0 0: 1 5 3 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 1 3 4 0: 0 -> 0 1: 1 -> -51 2: 5 -> -21 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v3 -12 <= 0; value: 0 + -3*v2 -2*v3 + 4 < 0; value: -14 + v0 -2 <= 0; value: -1 + -2*v0 + 5*v2 -35 <= 0; value: -17 + 5*v0 + 4*v3 -17 = 0; value: 0 0: 3 4 5 1: 2: 2 4 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v3 -12 <= 0; value: 0 + -3*v2 -2*v3 + 4 < 0; value: -14 + v0 -2 <= 0; value: -1 + -2*v0 + 5*v2 -35 <= 0; value: -17 + 5*v0 + 4*v3 -17 = 0; value: 0 0: 3 4 5 1: 2: 2 4 3: 1 2 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v1 + 3*v3 -7 <= 0; value: -4 + -3*v1 -6*v2 + 2 <= 0; value: -7 + 6*v1 + 3*v2 -18 = 0; value: 0 + 6*v0 -6*v2 + 4*v3 -31 < 0; value: -13 + -1*v0 -2*v1 -1*v3 -3 <= 0; value: -12 0: 4 5 1: 1 2 3 5 2: 2 3 4 3: 1 4 5 optimal: oo + 16/5*v0 + 32/5 <= 0; value: 16 - -1/2*v0 + 5/2*v3 -17/2 <= 0; value: 0 + -27/5*v0 -314/5 <= 0; value: -79 - 6*v1 + 3*v2 -18 = 0; value: 0 + -2/5*v0 -459/5 < 0; value: -93 - -1*v0 + v2 -1*v3 -9 <= 0; value: 0 0: 4 5 2 1 4 1: 1 2 3 5 2: 2 3 4 5 1 3: 1 4 5 2 0: 3 -> 3 1: 3 -> -5 2: 0 -> 16 3: 0 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -34 <= 0; value: -18 + -1*v0 + v1 + 2*v3 <= 0; value: 0 + -1*v2 + v3 = 0; value: 0 + 4*v0 -16 = 0; value: 0 + 5*v2 = 0; value: 0 0: 2 4 1: 1 2 2: 3 5 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -34 <= 0; value: -18 + -1*v0 + v1 + 2*v3 <= 0; value: 0 + -1*v2 + v3 = 0; value: 0 + 4*v0 -16 = 0; value: 0 + 5*v2 = 0; value: 0 0: 2 4 1: 1 2 2: 3 5 3: 2 3 0: 4 -> 4 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -4*v0 + 4*v1 -3 < 0; value: -15 + -6*v0 -1*v2 -2*v3 + 31 <= 0; value: -4 + 6*v0 + 2*v1 -26 = 0; value: 0 + -6*v0 -4*v2 + 20 <= 0; value: -16 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 3 2: 2 4 3: 2 5 optimal: oo + 8*v0 -26 <= 0; value: 6 + -16*v0 + 49 < 0; value: -15 + -6*v0 -1*v2 -2*v3 + 31 <= 0; value: -4 - 6*v0 + 2*v1 -26 = 0; value: 0 + -6*v0 -4*v2 + 20 <= 0; value: -16 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 3 2: 2 4 3: 2 5 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 2*v3 -25 <= 0; value: -13 + 5*v0 -6*v3 + 9 = 0; value: 0 + -2*v0 + v1 -5*v3 -13 < 0; value: -37 + 5*v2 -5 = 0; value: 0 + 6*v0 + 6*v3 -75 < 0; value: -33 0: 2 3 5 1: 3 2: 1 4 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 2*v3 -25 <= 0; value: -13 + 5*v0 -6*v3 + 9 = 0; value: 0 + -2*v0 + v1 -5*v3 -13 < 0; value: -37 + 5*v2 -5 = 0; value: 0 + 6*v0 + 6*v3 -75 < 0; value: -33 0: 2 3 5 1: 3 2: 1 4 3: 1 2 3 5 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -37 <= 0; value: -22 + = 0; value: 0 + -1*v0 -5*v2 + 2*v3 -7 <= 0; value: -20 + -4*v3 -14 < 0; value: -34 + 3*v0 + 5*v1 -34 < 0; value: -20 0: 1 3 5 1: 5 2: 3 3: 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -37 <= 0; value: -22 + = 0; value: 0 + -1*v0 -5*v2 + 2*v3 -7 <= 0; value: -20 + -4*v3 -14 < 0; value: -34 + 3*v0 + 5*v1 -34 < 0; value: -20 0: 1 3 5 1: 5 2: 3 3: 3 4 0: 3 -> 3 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + v1 -4*v2 + 7 = 0; value: 0 + <= 0; value: 0 + 2*v2 -1*v3 -1 = 0; value: 0 + 2*v0 -1*v1 -3*v3 + 8 <= 0; value: -2 + 5*v3 -17 < 0; value: -2 0: 4 1: 1 4 2: 1 3 3: 3 4 5 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 - v1 -4*v2 + 7 = 0; value: 0 + <= 0; value: 0 - 2*v2 -1*v3 -1 = 0; value: 0 - 2*v0 -5*v3 + 13 <= 0; value: 0 - 2*v0 -4 < 0; value: -2 0: 4 5 1: 1 4 2: 1 3 4 3: 3 4 5 0: 0 -> 1 1: 1 -> 1 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -20 < 0; value: -12 + -3*v2 -4*v3 + 2 <= 0; value: -19 + -2*v0 + v1 + 1 <= 0; value: 0 + -3*v0 -5*v1 + 4*v3 -6 <= 0; value: -15 + -3*v0 + 3*v1 + v2 -6 = 0; value: 0 0: 1 3 4 5 1: 3 4 5 2: 2 5 3: 2 4 optimal: oo + 16/5*v0 -8/5*v3 + 12/5 <= 0; value: 4 + 4*v0 -20 < 0; value: -12 + -72/5*v0 + 16/5*v3 -134/5 <= 0; value: -46 + -13/5*v0 + 4/5*v3 -1/5 <= 0; value: -3 - -8*v0 + 5/3*v2 + 4*v3 -16 <= 0; value: 0 - -3*v0 + 3*v1 + v2 -6 = 0; value: 0 0: 1 3 4 5 2 1: 3 4 5 2: 2 5 4 3 3: 2 4 3 0: 2 -> 2 1: 3 -> 0 2: 3 -> 12 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + 6*v1 + 2*v3 -37 < 0; value: -13 + 2*v0 + 3*v1 + 2*v3 -50 <= 0; value: -28 + -5*v0 -2 <= 0; value: -12 + = 0; value: 0 + -2*v1 + 3*v2 -4 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 5 3: 1 2 optimal: oo + 2*v0 -3*v2 + 4 <= 0; value: -4 + -3*v0 + 9*v2 + 2*v3 -49 < 0; value: -13 + 2*v0 + 9/2*v2 + 2*v3 -56 <= 0; value: -28 + -5*v0 -2 <= 0; value: -12 + = 0; value: 0 - -2*v1 + 3*v2 -4 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 5 1 2 3: 1 2 0: 2 -> 2 1: 4 -> 4 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -7 <= 0; value: -16 + -3*v0 + 4*v1 + v3 + 8 = 0; value: 0 + -1*v0 -4*v1 + 5*v2 -17 <= 0; value: -5 + -5*v2 + 6*v3 -7 <= 0; value: -16 + 5*v0 -1*v2 -28 <= 0; value: -16 0: 1 2 3 5 1: 2 3 2: 3 4 5 3: 2 4 optimal: 3167/302 + + 3167/302 <= 0; value: 3167/302 + -4138/151 <= 0; value: -4138/151 - -3*v0 + 4*v1 + v3 + 8 = 0; value: 0 - -4*v0 + 35/6*v2 -47/6 <= 0; value: 0 - -5*v2 + 6*v3 -7 <= 0; value: 0 - 151/35*v0 -1027/35 <= 0; value: 0 0: 1 2 3 5 1: 2 3 2: 3 4 5 3: 2 4 3 0: 3 -> 1027/151 1: 0 -> 941/604 2: 3 -> 907/151 3: 1 -> 932/151 + 2*v0 -2*v1 <= 0; value: 10 + -5*v0 + 2*v1 -4*v3 + 41 = 0; value: 0 + -5*v2 + 6*v3 + 1 <= 0; value: 0 + -5*v2 -5*v3 + 45 = 0; value: 0 + 4*v0 -31 <= 0; value: -11 + -5*v0 + 4*v2 + 5 = 0; value: 0 0: 1 4 5 1: 1 2: 2 3 5 3: 1 2 3 optimal: 31/2 + + 31/2 <= 0; value: 31/2 - -5*v0 + 2*v1 -4*v3 + 41 = 0; value: 0 + -605/16 <= 0; value: -605/16 - -5*v2 -5*v3 + 45 = 0; value: 0 - 4*v0 -31 <= 0; value: 0 - -5*v0 + 4*v2 + 5 = 0; value: 0 0: 1 4 5 2 1: 1 2: 2 3 5 3: 1 2 3 0: 5 -> 31/4 1: 0 -> 0 2: 5 -> 135/16 3: 4 -> 9/16 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 <= 0; value: 0 + -5*v0 + 2*v3 -1 <= 0; value: -13 + 2*v0 -22 <= 0; value: -14 + 3*v0 -12 <= 0; value: 0 + 3*v0 -3*v3 <= 0; value: 0 0: 2 3 4 5 1: 1 2: 3: 2 5 optimal: 8 + + 8 <= 0; value: 8 - -2*v1 <= 0; value: 0 + 2*v3 -21 <= 0; value: -13 + -14 <= 0; value: -14 - 3*v0 -12 <= 0; value: 0 + -3*v3 + 12 <= 0; value: 0 0: 2 3 4 5 1: 1 2: 3: 2 5 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 4*v2 <= 0; value: 0 + 4*v2 -20 = 0; value: 0 + -3*v1 + v2 + 10 = 0; value: 0 + -3*v1 -4*v3 + 13 <= 0; value: -2 + v1 -12 <= 0; value: -7 0: 1 1: 3 4 5 2: 1 2 3 3: 4 optimal: oo + 2*v0 -10 <= 0; value: -2 + -5*v0 + 20 <= 0; value: 0 - 4*v2 -20 = 0; value: 0 - -3*v1 + v2 + 10 = 0; value: 0 + -4*v3 -2 <= 0; value: -2 + -7 <= 0; value: -7 0: 1 1: 3 4 5 2: 1 2 3 4 5 3: 4 0: 4 -> 4 1: 5 -> 5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + 2*v0 -2*v2 -3 < 0; value: -7 + 4*v2 -4*v3 -8 < 0; value: -4 + -4*v1 -5*v2 + 30 = 0; value: 0 + <= 0; value: 0 + 5*v2 + 3*v3 -27 <= 0; value: -14 0: 1 1: 3 2: 1 2 3 5 3: 2 5 optimal: (105/16 -e*1) + + 105/16 < 0; value: 105/16 - 2*v0 -45/4 < 0; value: -2 - 4*v2 -4*v3 -8 < 0; value: -4 - -4*v1 -5*v2 + 30 = 0; value: 0 + <= 0; value: 0 - 8*v3 -17 <= 0; value: 0 0: 1 1: 3 2: 1 2 3 5 3: 2 5 1 0: 0 -> 37/8 1: 5 -> 115/32 2: 2 -> 25/8 3: 1 -> 17/8 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 6*v2 -37 < 0; value: -1 + -2*v0 -4*v1 -4*v2 + 1 <= 0; value: -21 + v0 + 5*v1 + v3 -18 <= 0; value: -9 + -4*v2 + 6*v3 + 6 = 0; value: 0 + 4*v3 -6 < 0; value: -2 0: 1 2 3 1: 2 3 2: 1 2 4 3: 3 4 5 optimal: (468/17 -e*1) + + 468/17 < 0; value: 468/17 - 6*v0 + 9*v3 -28 < 0; value: -9 - -2*v0 -4*v1 -4*v2 + 1 <= 0; value: 0 - 17/6*v0 -1601/36 < 0; value: -17/6 - -4*v2 + 6*v3 + 6 = 0; value: 0 + -602/17 < 0; value: -602/17 0: 1 2 3 5 1: 2 3 2: 1 2 4 3 3: 3 4 5 1 0: 3 -> 1499/102 1: 1 -> 299/102 2: 3 -> -341/34 3: 1 -> -392/51 + 2*v0 -2*v1 <= 0; value: -4 + v3 = 0; value: 0 + -6*v0 -6*v2 + 15 <= 0; value: -3 + v2 + 5*v3 -2 = 0; value: 0 + 3*v0 + v3 -7 <= 0; value: -4 + 5*v1 -22 < 0; value: -7 0: 2 4 1: 5 2: 2 3 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + v3 = 0; value: 0 + -6*v0 -6*v2 + 15 <= 0; value: -3 + v2 + 5*v3 -2 = 0; value: 0 + 3*v0 + v3 -7 <= 0; value: -4 + 5*v1 -22 < 0; value: -7 0: 2 4 1: 5 2: 2 3 3: 1 3 4 0: 1 -> 1 1: 3 -> 3 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 4*v2 -2*v3 -7 <= 0; value: -3 + <= 0; value: 0 + 6*v1 -2*v2 -3*v3 -59 <= 0; value: -37 + -5*v0 -2*v1 + 6*v2 + 18 < 0; value: -4 + 4*v0 + 6*v2 -23 < 0; value: -1 0: 4 5 1: 3 4 2: 1 3 4 5 3: 1 3 optimal: oo + 7*v0 -6*v2 -18 < 0; value: 4 + 4*v2 -2*v3 -7 <= 0; value: -3 + <= 0; value: 0 + -15*v0 + 16*v2 -3*v3 -5 < 0; value: -49 - -5*v0 -2*v1 + 6*v2 + 18 < 0; value: -2 + 4*v0 + 6*v2 -23 < 0; value: -1 0: 4 5 3 1: 3 4 2: 1 3 4 5 3: 1 3 0: 4 -> 4 1: 4 -> 3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 30 = 0; value: 0 + 5*v0 -6*v1 -5*v3 + 13 <= 0; value: -1 + -3*v0 + 4*v1 + 4*v2 -47 <= 0; value: -30 + 4*v0 -20 = 0; value: 0 + -1*v2 + v3 + 1 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 3 5 3: 2 5 optimal: 79 + + 79 <= 0; value: 79 - -6*v0 + 30 = 0; value: 0 - 5*v0 -6*v1 -5*v3 + 13 <= 0; value: 0 - 1/3*v0 + 2/3*v2 -35 <= 0; value: 0 + = 0; value: 0 - -1*v2 + v3 + 1 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 3 5 3: 2 5 3 0: 5 -> 5 1: 4 -> -69/2 2: 4 -> 50 3: 3 -> 49 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 <= 0; value: 0 + 2*v3 -11 < 0; value: -5 + 3*v0 -2*v3 -1 < 0; value: -7 + v0 -3*v2 -4 <= 0; value: -10 + 6*v0 + 4*v1 -5*v3 + 1 <= 0; value: -6 0: 1 3 4 5 1: 5 2: 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 <= 0; value: 0 + 2*v3 -11 < 0; value: -5 + 3*v0 -2*v3 -1 < 0; value: -7 + v0 -3*v2 -4 <= 0; value: -10 + 6*v0 + 4*v1 -5*v3 + 1 <= 0; value: -6 0: 1 3 4 5 1: 5 2: 4 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 5*v3 -67 <= 0; value: -40 + v1 -3*v3 + 1 <= 0; value: -5 + 6*v0 + 2*v2 + 2*v3 -71 <= 0; value: -31 + -4*v0 -6*v3 + 6 <= 0; value: -32 + -6*v1 + 5*v3 + 2 <= 0; value: -1 0: 3 4 1: 1 2 5 2: 3 3: 1 2 3 4 5 optimal: oo + -2/3*v2 + 841/39 <= 0; value: 263/13 + -787/13 <= 0; value: -787/13 - -13/6*v3 + 4/3 <= 0; value: 0 - 6*v0 + 2*v2 -907/13 <= 0; value: 0 + 4/3*v2 -1724/39 <= 0; value: -540/13 - -6*v1 + 5*v3 + 2 <= 0; value: 0 0: 3 4 1: 1 2 5 2: 3 4 3: 1 2 3 4 5 0: 5 -> 285/26 1: 3 -> 11/13 2: 2 -> 2 3: 3 -> 8/13 + 2*v0 -2*v1 <= 0; value: 2 + 3*v3 -18 <= 0; value: -9 + 4*v1 -5*v2 + 5 = 0; value: 0 + 4*v0 + 2*v1 -8 <= 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -3*v1 + 3*v2 + v3 -16 <= 0; value: -10 0: 3 1: 2 3 5 2: 2 5 3: 1 4 5 optimal: 54 + + 54 <= 0; value: 54 + -9 <= 0; value: -9 - 4*v1 -5*v2 + 5 = 0; value: 0 - 4*v0 -124/3 <= 0; value: 0 - -6*v3 + 18 = 0; value: 0 - -3/4*v2 + v3 -49/4 <= 0; value: 0 0: 3 1: 2 3 5 2: 2 5 3 3: 1 4 5 3 0: 1 -> 31/3 1: 0 -> -50/3 2: 1 -> -37/3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 -2*v2 -17 < 0; value: -5 + -2*v0 + 8 = 0; value: 0 + -2*v1 + 4*v2 + v3 < 0; value: -4 + 4*v0 + 6*v1 -63 <= 0; value: -29 + -5*v0 -1*v1 + 19 < 0; value: -4 0: 2 4 5 1: 1 3 4 5 2: 1 3 3: 3 optimal: (10 -e*1) + + 10 < 0; value: 10 + -2*v2 -21 < 0; value: -21 - -2*v0 + 8 = 0; value: 0 - -2*v1 + 4*v2 + v3 < 0; value: -2 + -53 < 0; value: -53 - -5*v0 -2*v2 -1/2*v3 + 19 <= 0; value: 0 0: 2 4 5 1 1: 1 3 4 5 2: 1 3 5 4 3: 3 5 1 4 0: 4 -> 4 1: 3 -> 0 2: 0 -> 0 3: 2 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 3*v3 -16 < 0; value: -7 + -3*v0 -6*v1 + 11 <= 0; value: -1 + -4*v1 -4*v2 -1*v3 + 11 = 0; value: 0 + -5*v1 + 10 = 0; value: 0 + 5*v1 + 3*v3 -27 < 0; value: -8 0: 2 1: 2 3 4 5 2: 1 3 3: 1 3 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + -6*v2 -7 < 0; value: -7 + -3*v0 -1 <= 0; value: -1 - -4*v1 -4*v2 -1*v3 + 11 = 0; value: 0 - 5*v2 + 5/4*v3 -15/4 = 0; value: 0 + -12*v2 -8 < 0; value: -8 0: 2 1: 2 3 4 5 2: 1 3 2 4 5 3: 1 3 5 2 4 0: 0 -> 0 1: 2 -> 2 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + -1*v1 + 4*v3 -5 = 0; value: 0 + 6*v0 + v1 -3*v2 <= 0; value: -9 + v0 -6*v1 + 3*v2 + 5 < 0; value: -1 + 4*v0 -1*v1 -2*v3 -3 < 0; value: -10 + -5*v0 -1*v1 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 3 3: 1 4 5 optimal: (-2 -e*1) + -2 < 0; value: -2 - -1*v1 + 4*v3 -5 = 0; value: 0 - 37/6*v0 -5/2*v2 + 5/6 < 0; value: -5/2 - v0 + 3*v2 -24*v3 + 35 < 0; value: -9/2 + -7 <= 0; value: -7 - -5*v0 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 3 4 3: 1 4 5 3 2 0: 0 -> 0 1: 3 -> 9/4 2: 4 -> 4/3 3: 2 -> 29/16 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -4*v2 + 2 < 0; value: -13 + v3 <= 0; value: 0 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 -6*v2 -2 <= 0; value: -22 + 6*v0 -2*v2 + 4*v3 = 0; value: 0 0: 1 3 4 5 1: 4 2: 1 4 5 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -4*v2 + 2 < 0; value: -13 + v3 <= 0; value: 0 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 -6*v2 -2 <= 0; value: -22 + 6*v0 -2*v2 + 4*v3 = 0; value: 0 0: 1 3 4 5 1: 4 2: 1 4 5 3: 2 5 0: 1 -> 1 1: 4 -> 4 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -6*v3 <= 0; value: -30 + 6*v0 -5*v1 + 1 <= 0; value: -1 + -5*v0 -6*v2 + 33 = 0; value: 0 + -6*v1 -3*v2 -5*v3 + 58 = 0; value: 0 + 6*v0 + 5*v2 -66 < 0; value: -33 0: 2 3 5 1: 2 4 2: 3 4 5 3: 1 4 optimal: oo + 12/25*v2 -76/25 <= 0; value: -8/5 + -846/125*v2 -1392/125 <= 0; value: -786/25 - 6*v0 + 5/2*v2 + 25/6*v3 -142/3 <= 0; value: 0 - -5*v0 -6*v2 + 33 = 0; value: 0 - -6*v1 -3*v2 -5*v3 + 58 = 0; value: 0 + -11/5*v2 -132/5 < 0; value: -33 0: 2 3 5 1 1: 2 4 2: 3 4 5 2 1 3: 1 4 2 0: 3 -> 3 1: 4 -> 19/5 2: 3 -> 3 3: 5 -> 131/25 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -1*v2 + 13 = 0; value: 0 + -2*v0 -6*v1 -1*v3 + 4 < 0; value: -31 + -6*v0 + 5*v1 -2*v2 + 14 = 0; value: 0 + -5*v0 -5*v1 + 30 <= 0; value: -10 + 5*v0 -6*v3 -5 < 0; value: -3 0: 2 3 4 5 1: 1 2 3 4 2: 1 3 3: 2 5 optimal: oo + 4/5*v3 -2 < 0; value: 2/5 - -2*v1 -1*v2 + 13 = 0; value: 0 + -41/5*v3 -10 < 0; value: -173/5 - -6*v0 -9/2*v2 + 93/2 = 0; value: 0 + -10*v3 + 15 < 0; value: -15 - 5*v0 -6*v3 -5 < 0; value: -3/2 0: 2 3 4 5 1: 1 2 3 4 2: 1 3 2 4 3: 2 5 4 0: 4 -> 43/10 1: 4 -> 21/5 2: 5 -> 23/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -3*v3 -12 < 0; value: -6 + -1*v0 -4*v3 -1 <= 0; value: -20 + -6*v0 -3 <= 0; value: -21 + -2*v0 -1*v3 -4 <= 0; value: -14 + 5*v0 -1*v1 -32 < 0; value: -19 0: 1 2 3 4 5 1: 5 2: 3: 1 2 4 optimal: (68 -e*1) + + 68 < 0; value: 68 + -3*v3 -15 < 0; value: -27 + -4*v3 -1/2 <= 0; value: -33/2 - -6*v0 -3 <= 0; value: 0 + -1*v3 -3 <= 0; value: -7 - 5*v0 -1*v1 -32 < 0; value: -1 0: 1 2 3 4 5 1: 5 2: 3: 1 2 4 0: 3 -> -1/2 1: 2 -> -67/2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -20 < 0; value: -12 + 5*v1 -15 = 0; value: 0 + 3*v3 -4 < 0; value: -1 + 6*v2 -6 = 0; value: 0 + 5*v2 + 4*v3 -22 <= 0; value: -13 0: 1 1: 2 2: 4 5 3: 3 5 optimal: (4 -e*1) + + 4 < 0; value: 4 - 4*v0 -20 < 0; value: -4 - 5*v1 -15 = 0; value: 0 + 3*v3 -4 < 0; value: -1 + 6*v2 -6 = 0; value: 0 + 5*v2 + 4*v3 -22 <= 0; value: -13 0: 1 1: 2 2: 4 5 3: 3 5 0: 2 -> 4 1: 3 -> 3 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + v2 -5 = 0; value: 0 + 4*v0 -4*v2 + 12 = 0; value: 0 + -5*v1 -6*v3 + 8 < 0; value: -23 + -4*v1 + 3*v3 + 14 < 0; value: -3 + -2*v0 + 4*v2 -36 <= 0; value: -20 0: 2 5 1: 3 4 2: 1 2 5 3: 3 4 optimal: (-20/13 -e*1) + -20/13 < 0; value: -20/13 - v2 -5 = 0; value: 0 - 4*v0 -4*v2 + 12 = 0; value: 0 - -39/4*v3 -19/2 <= 0; value: 0 - -4*v1 + 3*v3 + 14 < 0; value: -4 + -20 <= 0; value: -20 0: 2 5 1: 3 4 2: 1 2 5 3: 3 4 0: 2 -> 2 1: 5 -> 49/13 2: 5 -> 5 3: 1 -> -38/39 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -5*v1 + 20 = 0; value: 0 + -5*v1 + 6*v2 -6 <= 0; value: -14 + 3*v0 + 2*v1 -8 = 0; value: 0 + -1*v1 -5*v2 + 3 <= 0; value: -11 + 6*v1 -29 <= 0; value: -5 0: 1 3 1: 1 2 3 4 5 2: 2 4 3: optimal: -8 + -8 <= 0; value: -8 - -5*v0 -5*v1 + 20 = 0; value: 0 + 6*v2 -26 <= 0; value: -14 - v0 = 0; value: 0 + -5*v2 -1 <= 0; value: -11 + -5 <= 0; value: -5 0: 1 3 2 4 5 1: 1 2 3 4 5 2: 2 4 3: 0: 0 -> 0 1: 4 -> 4 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v1 -1*v3 -1 < 0; value: -12 + 5*v0 + v2 -32 < 0; value: -10 + -2*v0 -2*v1 -1 < 0; value: -17 + -6*v2 + 6*v3 -13 <= 0; value: -7 + -5*v2 <= 0; value: -10 0: 2 3 1: 1 3 2: 2 4 5 3: 1 4 optimal: (431/21 -e*1) + + 431/21 < 0; value: 431/21 - -2*v1 -1*v3 -1 < 0; value: -2 - 7*v0 -205/6 < 0; value: -37/12 - -2*v0 + v2 + 13/6 <= 0; value: 0 - -6*v2 + 6*v3 -13 <= 0; value: 0 + -1595/42 < 0; value: -1595/42 0: 2 3 5 1: 1 3 2: 2 4 5 3 3: 1 4 3 0: 4 -> 373/84 1: 4 -> -331/84 2: 2 -> 47/7 3: 3 -> 373/42 + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + v2 -1*v3 -2 < 0; value: -1 + -5*v2 -10 <= 0; value: -30 + 3*v0 + 5*v2 -63 < 0; value: -31 + -6*v0 -2*v2 -31 < 0; value: -63 + -5*v2 -11 <= 0; value: -31 0: 3 4 1: 1 2: 1 2 3 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + v2 -1*v3 -2 < 0; value: -1 + -5*v2 -10 <= 0; value: -30 + 3*v0 + 5*v2 -63 < 0; value: -31 + -6*v0 -2*v2 -31 < 0; value: -63 + -5*v2 -11 <= 0; value: -31 0: 3 4 1: 1 2: 1 2 3 4 5 3: 1 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + v2 -10 <= 0; value: -6 + -3*v1 + 5*v2 + 2*v3 -27 = 0; value: 0 + 4*v0 -7 <= 0; value: -3 + -3*v1 + 4*v2 -16 <= 0; value: -3 + -1*v0 + 5*v1 -1*v3 < 0; value: -1 0: 3 5 1: 2 4 5 2: 1 2 4 3: 2 5 optimal: oo + 2*v0 -8/3*v2 + 32/3 <= 0; value: 2 + v2 -10 <= 0; value: -6 - -3*v1 + 5*v2 + 2*v3 -27 = 0; value: 0 + 4*v0 -7 <= 0; value: -3 - -1*v2 -2*v3 + 11 <= 0; value: 0 + -1*v0 + 43/6*v2 -193/6 < 0; value: -9/2 0: 3 5 1: 2 4 5 2: 1 2 4 5 3: 2 5 4 0: 1 -> 1 1: 1 -> 0 2: 4 -> 4 3: 5 -> 7/2 + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 + 6*v3 -32 = 0; value: 0 + -1*v0 <= 0; value: 0 + -2*v0 + 6*v1 + 5*v2 -29 < 0; value: -18 + -5*v0 -6*v1 -5*v2 + 11 = 0; value: 0 + v0 -5*v3 -12 <= 0; value: -37 0: 2 3 4 5 1: 3 4 2: 1 3 4 3: 1 5 optimal: oo + 8/3*v0 + 35 <= 0; value: 35 - 2*v2 + 6*v3 -32 = 0; value: 0 + -1*v0 <= 0; value: 0 + -7*v0 -18 < 0; value: -18 - -5*v0 -6*v1 -5*v2 + 11 = 0; value: 0 - v0 -5*v3 -12 <= 0; value: 0 0: 2 3 4 5 1: 3 4 2: 1 3 4 3: 1 5 0: 0 -> 0 1: 1 -> -35/2 2: 1 -> 116/5 3: 5 -> -12/5 + 2*v0 -2*v1 <= 0; value: 2 + v0 -5*v1 + v3 -5 <= 0; value: 0 + 2*v1 + 4*v2 -16 = 0; value: 0 + v0 -2*v1 + 2*v3 -26 <= 0; value: -17 + 6*v1 + 3*v3 -35 < 0; value: -23 + -5*v0 -2*v1 + 4*v2 -28 <= 0; value: -17 0: 1 3 5 1: 1 2 3 4 5 2: 2 5 3: 1 3 4 optimal: oo + 9/2*v0 + 6 <= 0; value: 21/2 - v0 -5*v1 + v3 -5 <= 0; value: 0 - 2/5*v0 + 4*v2 + 2/5*v3 -18 = 0; value: 0 + -11*v0 -40 <= 0; value: -51 + -117/4*v0 -83 < 0; value: -449/4 - -5*v0 + 8*v2 -44 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 3 4 5 2: 2 5 3 4 3: 1 3 4 2 5 0: 1 -> 1 1: 0 -> -17/4 2: 4 -> 49/8 3: 4 -> -69/4 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 + 10 <= 0; value: -2 + -1*v0 -2*v1 -3*v3 + 18 <= 0; value: -5 + -5*v2 <= 0; value: 0 + 4*v0 -4*v3 -9 <= 0; value: -5 + 2*v0 -27 <= 0; value: -17 0: 2 4 5 1: 1 2 2: 3 3: 2 4 optimal: 22 + + 22 <= 0; value: 22 - -4*v1 + 10 <= 0; value: 0 + -137/4 <= 0; value: -137/4 + -5*v2 <= 0; value: 0 - 4*v0 -4*v3 -9 <= 0; value: 0 - 2*v3 -45/2 <= 0; value: 0 0: 2 4 5 1: 1 2 2: 3 3: 2 4 5 0: 5 -> 27/2 1: 3 -> 5/2 2: 0 -> 0 3: 4 -> 45/4 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 -4*v2 + 6*v3 + 20 = 0; value: 0 + -6*v0 -4*v1 + 4*v3 + 17 <= 0; value: -1 + -1*v0 -2*v2 -3*v3 -2 <= 0; value: -30 + 5*v0 -25 < 0; value: -10 + v0 + 3*v3 -27 <= 0; value: -9 0: 2 3 4 5 1: 1 2 2: 1 3 3: 1 2 3 5 optimal: (103/3 -e*1) + + 103/3 < 0; value: 103/3 - -6*v1 -4*v2 + 6*v3 + 20 = 0; value: 0 - -6*v0 + 8/3*v2 + 11/3 <= 0; value: 0 - -1*v0 -2*v2 -3*v3 -2 <= 0; value: 0 - 5*v0 -25 < 0; value: -5 + -195/4 < 0; value: -195/4 0: 2 3 4 5 5 1: 1 2 2: 1 3 2 5 3: 1 2 3 5 0: 3 -> 4 1: 5 -> -53/6 2: 5 -> 61/8 3: 5 -> -85/12 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 6*v1 -14 < 0; value: -9 + -6*v2 -5*v3 -1 <= 0; value: -25 + -2*v0 + 4*v1 -2*v2 -4 < 0; value: -10 + 2*v0 + 5*v1 -3*v2 <= 0; value: -5 + -1*v0 + 4*v3 + 1 <= 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 6*v1 -14 < 0; value: -9 + -6*v2 -5*v3 -1 <= 0; value: -25 + -2*v0 + 4*v1 -2*v2 -4 < 0; value: -10 + 2*v0 + 5*v1 -3*v2 <= 0; value: -5 + -1*v0 + 4*v3 + 1 <= 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3 4 3: 2 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 3*v1 -12 <= 0; value: -5 + 5*v0 + 4*v3 -39 < 0; value: -7 + 6*v0 -2*v2 -25 < 0; value: -11 + 6*v0 + 4*v2 -44 = 0; value: 0 + 6*v1 + 3*v2 -78 <= 0; value: -33 0: 1 2 3 4 1: 1 5 2: 3 4 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 3*v1 -12 <= 0; value: -5 + 5*v0 + 4*v3 -39 < 0; value: -7 + 6*v0 -2*v2 -25 < 0; value: -11 + 6*v0 + 4*v2 -44 = 0; value: 0 + 6*v1 + 3*v2 -78 <= 0; value: -33 0: 1 2 3 4 1: 1 5 2: 3 4 5 3: 2 0: 4 -> 4 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 + 3*v3 -44 < 0; value: -27 + 5*v2 <= 0; value: 0 + -6*v1 + 5*v2 -9 < 0; value: -21 + -6*v0 -3 <= 0; value: -21 + -4*v1 + 8 = 0; value: 0 0: 4 1: 1 3 5 2: 2 3 3: 1 optimal: oo + 2*v0 -4 <= 0; value: 2 + 3*v3 -36 < 0; value: -27 + 5*v2 <= 0; value: 0 + 5*v2 -21 < 0; value: -21 + -6*v0 -3 <= 0; value: -21 - -4*v1 + 8 = 0; value: 0 0: 4 1: 1 3 5 2: 2 3 3: 1 0: 3 -> 3 1: 2 -> 2 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + -5*v0 + 6*v3 -25 <= 0; value: -6 + 5*v0 -3*v1 <= 0; value: -7 + 3*v0 -2*v1 + 5 <= 0; value: 0 + -3*v1 + 2 < 0; value: -10 + -5*v1 -15 < 0; value: -35 0: 1 2 3 1: 2 3 4 5 2: 3: 1 optimal: (-34/9 -e*1) + -34/9 < 0; value: -34/9 - -5*v0 + 6*v3 -25 <= 0; value: 0 + -73/9 < 0; value: -73/9 - 3*v0 -2*v1 + 5 <= 0; value: 0 - -27/5*v3 + 17 < 0; value: -23/10 + -55/3 <= 0; value: -55/3 0: 1 2 3 4 5 1: 2 3 4 5 2: 3: 1 4 5 2 0: 1 -> -32/45 1: 4 -> 43/30 2: 0 -> 0 3: 4 -> 193/54 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 5*v2 + 5*v3 -10 = 0; value: 0 + -6*v3 = 0; value: 0 + -1*v1 + 6*v2 -48 <= 0; value: -29 + 2*v0 -4*v2 + 6 < 0; value: -6 + -5*v0 -2*v3 -4 <= 0; value: -14 0: 4 5 1: 1 3 2: 1 3 4 3: 1 2 5 optimal: (29/10 -e*1) + + 29/10 < 0; value: 29/10 - -2*v1 + 5*v2 + 5*v3 -10 = 0; value: 0 - -6*v3 = 0; value: 0 + -783/20 < 0; value: -783/20 - 2*v0 -4*v2 + 6 < 0; value: -4 - -5*v0 -4 <= 0; value: 0 0: 4 5 3 1: 1 3 2: 1 3 4 3: 1 2 5 3 0: 2 -> -4/5 1: 5 -> 1/4 2: 4 -> 21/10 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 6*v2 + 4*v3 -69 <= 0; value: -43 + -5*v0 -2 <= 0; value: -7 + -3*v0 -4*v1 < 0; value: -7 + 4*v0 + v1 + 2*v2 -16 < 0; value: -5 + 2*v0 -4*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 4 3: 1 optimal: oo + -4/9*v2 + 22/9 < 0; value: 10/9 + 6*v2 + 4*v3 -69 <= 0; value: -43 + 20/9*v2 -173/9 < 0; value: -113/9 + 20/9*v2 -173/9 < 0; value: -113/9 - 9/2*v0 + 2*v2 -31/2 < 0; value: -5/2 - 2*v0 -4*v1 + 2 = 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 4 2 3 3: 1 0: 1 -> 14/9 1: 1 -> 23/18 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -1*v1 + 5*v2 -31 <= 0; value: -15 + -4*v2 -1*v3 + 16 <= 0; value: -3 + v0 + 3*v2 -13 <= 0; value: 0 + -5*v0 -6*v1 -1*v2 + 33 = 0; value: 0 + 6*v1 + 4*v2 -2*v3 -66 < 0; value: -32 0: 3 4 1: 1 4 5 2: 1 2 3 4 5 3: 2 5 optimal: oo + 8/3*v3 -6 <= 0; value: 2 + -2/3*v3 -15 <= 0; value: -17 - 4/3*v0 -1*v3 -4/3 <= 0; value: 0 - v0 + 3*v2 -13 <= 0; value: 0 - -5*v0 -6*v1 -1*v2 + 33 = 0; value: 0 + -13/2*v3 -26 < 0; value: -91/2 0: 3 4 1 5 2 1: 1 4 5 2: 1 2 3 4 5 3: 2 5 1 0: 1 -> 13/4 1: 4 -> 9/4 2: 4 -> 13/4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 4*v3 -25 < 0; value: -11 + -2*v3 -3 <= 0; value: -7 + 4*v0 + v2 + 4*v3 -35 <= 0; value: -18 + 2*v1 -1*v3 -6 = 0; value: 0 + v1 -2*v2 -2*v3 -1 <= 0; value: -3 0: 3 1: 4 5 2: 1 3 5 3: 1 2 3 4 5 optimal: 239/16 + + 239/16 <= 0; value: 239/16 + -73/4 < 0; value: -73/4 - 8/3*v2 -17/3 <= 0; value: 0 - 4*v0 -311/8 <= 0; value: 0 - 2*v1 -1*v3 -6 = 0; value: 0 - -2*v2 -3/2*v3 + 2 <= 0; value: 0 0: 3 1: 4 5 2: 1 3 5 2 3: 1 2 3 4 5 0: 2 -> 311/32 1: 4 -> 9/4 2: 1 -> 17/8 3: 2 -> -3/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 -6*v2 -4*v3 + 48 = 0; value: 0 + -1*v1 -2 <= 0; value: -6 + <= 0; value: 0 + 5*v3 -20 = 0; value: 0 + -3*v0 -2*v1 + 12 <= 0; value: -2 0: 1 5 1: 2 5 2: 1 3: 1 4 optimal: 44/3 + + 44/3 <= 0; value: 44/3 - -4*v0 -6*v2 -4*v3 + 48 = 0; value: 0 - -9/4*v2 + 4 <= 0; value: 0 + <= 0; value: 0 - 5*v3 -20 = 0; value: 0 - -3*v0 -2*v1 + 12 <= 0; value: 0 0: 1 5 2 1: 2 5 2: 1 2 3: 1 4 2 0: 2 -> 16/3 1: 4 -> -2 2: 4 -> 16/9 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -1*v1 + 4*v3 -26 = 0; value: 0 + -2*v0 + v2 = 0; value: 0 + 2*v0 -6*v1 -5 < 0; value: -1 + 3*v0 -6*v3 -20 <= 0; value: -44 + -2*v1 + 4*v3 -34 <= 0; value: -14 0: 1 2 3 4 1: 1 3 5 2: 2 3: 1 4 5 optimal: (38/3 -e*1) + + 38/3 < 0; value: 38/3 - 3*v0 -1*v1 + 4*v3 -26 = 0; value: 0 - -2*v0 + v2 = 0; value: 0 - -16*v0 -24*v3 + 151 < 0; value: -24 - 7/2*v2 -231/4 <= 0; value: 0 + -104/3 <= 0; value: -104/3 0: 1 2 3 4 5 1: 1 3 5 2: 2 4 5 3: 1 4 5 3 0: 2 -> 33/4 1: 0 -> 71/12 2: 4 -> 33/2 3: 5 -> 43/24 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 -6*v1 + 5*v2 -1 = 0; value: 0 + -3*v0 + 6*v2 -3 = 0; value: 0 + v2 -2 = 0; value: 0 + 5*v1 + 5*v2 + 4*v3 -79 <= 0; value: -52 + -6*v1 + 3*v2 <= 0; value: 0 0: 1 2 1: 1 4 5 2: 1 2 3 4 5 3: 4 optimal: 4 + + 4 <= 0; value: 4 - -1*v0 -6*v1 + 5*v2 -1 = 0; value: 0 - -3*v0 + 6*v2 -3 = 0; value: 0 - 1/2*v0 -3/2 = 0; value: 0 + 4*v3 -64 <= 0; value: -52 + <= 0; value: 0 0: 1 2 5 4 3 1: 1 4 5 2: 1 2 3 4 5 3: 4 0: 3 -> 3 1: 1 -> 1 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 8 <= 0; value: -1 + 3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 -4 < 0; value: -19 + -3*v1 -5 <= 0; value: -20 + -3*v1 + 3*v2 + 2*v3 + 1 < 0; value: -1 0: 1: 4 5 2: 1 2 3 5 3: 2 5 optimal: oo + 2*v0 -80/9 < 0; value: 10/9 - -3*v2 + 8 <= 0; value: 0 - 3*v2 + 6*v3 -21 = 0; value: 0 + -52/3 < 0; value: -52/3 + -55/3 <= 0; value: -55/3 - -3*v1 + 3*v2 + 2*v3 + 1 < 0; value: -5/6 0: 1: 4 5 2: 1 2 3 5 4 3: 2 5 4 0: 5 -> 5 1: 5 -> 85/18 2: 3 -> 8/3 3: 2 -> 13/6 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 + 2*v2 -1*v3 + 29 = 0; value: 0 + 2*v1 -3*v2 -6*v3 -6 <= 0; value: -20 + -3*v0 -1*v3 + 10 < 0; value: -2 + -2*v2 -3*v3 + 12 <= 0; value: -1 + 5*v0 -5*v2 -11 <= 0; value: -6 0: 3 5 1: 1 2 2: 1 2 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2/3*v2 + 1/3*v3 -29/3 <= 0; value: -4 - -6*v1 + 2*v2 -1*v3 + 29 = 0; value: 0 + -7/3*v2 -19/3*v3 + 11/3 <= 0; value: -20 + -3*v0 -1*v3 + 10 < 0; value: -2 + -2*v2 -3*v3 + 12 <= 0; value: -1 + 5*v0 -5*v2 -11 <= 0; value: -6 0: 3 5 1: 1 2 2: 1 2 4 5 3: 1 2 3 4 0: 3 -> 3 1: 5 -> 5 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -5*v0 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v2 -7 <= 0; value: -1 + -5*v0 + v3 + 8 = 0; value: 0 + -1*v1 + v3 + 2 <= 0; value: 0 + 2*v0 -4*v3 + 4 = 0; value: 0 0: 1 3 5 1: 1 4 2: 2 3: 1 3 4 5 optimal: -4 + -4 <= 0; value: -4 - -5*v0 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v2 -7 <= 0; value: -1 - -5*v0 + v3 + 8 = 0; value: 0 + <= 0; value: 0 - -18*v0 + 36 = 0; value: 0 0: 1 3 5 4 1: 1 4 2: 2 3: 1 3 4 5 0: 2 -> 2 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -1*v0 + 1 = 0; value: 0 + -2*v1 <= 0; value: -8 + 5*v2 -20 = 0; value: 0 + 5*v1 + 2*v2 -2*v3 -40 <= 0; value: -18 + -3*v1 -4*v2 -12 <= 0; value: -40 0: 1 1: 2 4 5 2: 3 4 5 3: 4 optimal: 2 + + 2 <= 0; value: 2 - -1*v0 + 1 = 0; value: 0 - -2*v1 <= 0; value: 0 + 5*v2 -20 = 0; value: 0 + 2*v2 -2*v3 -40 <= 0; value: -38 + -4*v2 -12 <= 0; value: -28 0: 1 1: 2 4 5 2: 3 4 5 3: 4 0: 1 -> 1 1: 4 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -6*v3 -11 < 0; value: -32 + 5*v0 + 3*v2 -67 < 0; value: -30 + 6*v2 -58 < 0; value: -34 + 5*v3 -12 <= 0; value: -7 + 3*v0 + v2 -5*v3 -14 = 0; value: 0 0: 1 2 5 1: 2: 2 3 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -3*v0 -6*v3 -11 < 0; value: -32 + 5*v0 + 3*v2 -67 < 0; value: -30 + 6*v2 -58 < 0; value: -34 + 5*v3 -12 <= 0; value: -7 + 3*v0 + v2 -5*v3 -14 = 0; value: 0 0: 1 2 5 1: 2: 2 3 5 3: 1 4 5 0: 5 -> 5 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + 1 <= 0; value: 0 + -3*v2 -6*v3 -13 <= 0; value: -52 + 2*v1 + 3*v2 -17 = 0; value: 0 + 5*v1 -1*v3 -1 <= 0; value: 0 + 4*v0 -4*v2 -4*v3 -19 <= 0; value: -51 0: 5 1: 1 3 4 2: 2 3 5 3: 2 4 5 optimal: oo + 2*v2 + 2*v3 + 15/2 <= 0; value: 51/2 - -1*v1 + 1 <= 0; value: 0 + -3*v2 -6*v3 -13 <= 0; value: -52 + 3*v2 -15 = 0; value: 0 + -1*v3 + 4 <= 0; value: 0 - 4*v0 -4*v2 -4*v3 -19 <= 0; value: 0 0: 5 1: 1 3 4 2: 2 3 5 3: 2 4 5 0: 1 -> 55/4 1: 1 -> 1 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -4*v2 -6*v3 -2 <= 0; value: -24 + 6*v2 + 2*v3 -43 <= 0; value: -17 + 6*v0 + 3*v1 -33 = 0; value: 0 + 5*v2 -52 < 0; value: -32 + 5*v2 -32 < 0; value: -12 0: 3 1: 3 2: 1 2 4 5 3: 1 2 optimal: oo + 6*v0 -22 <= 0; value: 2 + -4*v2 -6*v3 -2 <= 0; value: -24 + 6*v2 + 2*v3 -43 <= 0; value: -17 - 6*v0 + 3*v1 -33 = 0; value: 0 + 5*v2 -52 < 0; value: -32 + 5*v2 -32 < 0; value: -12 0: 3 1: 3 2: 1 2 4 5 3: 1 2 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 -6*v2 + 3 < 0; value: -22 + 3*v1 -4*v2 + 3*v3 -56 <= 0; value: -29 + v0 -3*v3 -3 <= 0; value: -12 + -1*v1 -2*v2 + 5 = 0; value: 0 + -3*v0 -4*v1 + 4*v3 -12 < 0; value: -25 0: 3 5 1: 1 2 4 5 2: 1 2 4 3: 2 3 5 optimal: (108/5 -e*1) + + 108/5 < 0; value: 108/5 - 5/6*v0 -4 <= 0; value: 0 + -471/5 < 0; value: -471/5 - v0 -3*v3 -3 <= 0; value: 0 - -1*v1 -2*v2 + 5 = 0; value: 0 - -3*v0 + 8*v2 + 4*v3 -32 < 0; value: -8 0: 3 5 1 2 1: 1 2 4 5 2: 1 2 4 5 3: 2 3 5 1 0: 3 -> 24/5 1: 5 -> -4 2: 0 -> 9/2 3: 4 -> 3/5 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 -3*v3 + 8 <= 0; value: -7 + 5*v1 + 5*v3 -25 = 0; value: 0 + 5*v0 + 3*v1 -20 = 0; value: 0 + 5*v1 <= 0; value: 0 + -5*v0 + 5*v3 -9 <= 0; value: -4 0: 3 5 1: 2 3 4 2: 1 3: 1 2 5 optimal: 72/5 + + 72/5 <= 0; value: 72/5 + 4*v2 -13 <= 0; value: -13 - 5*v1 + 5*v3 -25 = 0; value: 0 - 5*v0 -3*v3 -5 = 0; value: 0 + -10 <= 0; value: -10 - 10/3*v0 -52/3 <= 0; value: 0 0: 3 5 1 4 1: 2 3 4 2: 1 3: 1 2 5 3 4 0: 4 -> 26/5 1: 0 -> -2 2: 0 -> 0 3: 5 -> 7 + 2*v0 -2*v1 <= 0; value: -4 + 2*v2 -3*v3 -2 <= 0; value: -1 + -6*v0 + 6*v3 = 0; value: 0 + 6*v2 -3*v3 -10 < 0; value: -1 + -3*v0 + 3*v2 + 5*v3 -17 <= 0; value: -9 + -2*v1 + 4*v2 + 2*v3 -6 <= 0; value: -2 0: 2 4 1: 5 2: 1 3 4 5 3: 1 2 3 4 5 optimal: oo + -4*v2 + 6 <= 0; value: -2 + -3*v0 + 2*v2 -2 <= 0; value: -1 - -6*v0 + 6*v3 = 0; value: 0 + -3*v0 + 6*v2 -10 < 0; value: -1 + 2*v0 + 3*v2 -17 <= 0; value: -9 - -2*v1 + 4*v2 + 2*v3 -6 <= 0; value: 0 0: 2 4 1 3 1: 5 2: 1 3 4 5 3: 1 2 3 4 5 0: 1 -> 1 1: 3 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -1*v1 + 7 = 0; value: 0 + -5*v2 + 5 <= 0; value: -20 + v2 + 6*v3 -82 <= 0; value: -53 + <= 0; value: 0 + 3*v1 + 6*v2 -42 = 0; value: 0 0: 1 1: 1 5 2: 2 3 5 3: 3 optimal: oo + -32*v3 + 1214/3 <= 0; value: 830/3 - -3*v0 -1*v1 + 7 = 0; value: 0 + 30*v3 -405 <= 0; value: -285 - v2 + 6*v3 -82 <= 0; value: 0 + <= 0; value: 0 - -9*v0 + 6*v2 -21 = 0; value: 0 0: 1 5 1: 1 5 2: 2 3 5 3: 3 2 0: 1 -> 109/3 1: 4 -> -102 2: 5 -> 58 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + 5*v2 -5 = 0; value: 0 + 4*v1 -5*v2 -23 <= 0; value: -12 + -2*v1 + 5 < 0; value: -3 + -6*v0 -2*v1 + 2*v3 + 11 < 0; value: -1 0: 5 1: 3 4 5 2: 2 3 3: 5 optimal: oo + 2*v0 -5 < 0; value: -1 + <= 0; value: 0 + 5*v2 -5 = 0; value: 0 + -5*v2 -13 < 0; value: -18 - 6*v0 -2*v3 -6 <= 0; value: 0 - -6*v0 -2*v1 + 2*v3 + 11 < 0; value: -3/2 0: 5 4 3 1: 3 4 5 2: 2 3 3: 5 4 3 0: 2 -> 2 1: 4 -> 13/4 2: 1 -> 1 3: 4 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -5*v2 -2*v3 -4 <= 0; value: -20 + 3*v2 -5*v3 -5 <= 0; value: -17 + -3*v0 + 2*v2 + 1 = 0; value: 0 + 5*v2 + 4*v3 -17 = 0; value: 0 + -3*v1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 3 4 3: 1 2 4 optimal: 494/111 + + 494/111 <= 0; value: 494/111 + -3410/111 <= 0; value: -3410/111 - -37/5*v3 + 26/5 <= 0; value: 0 - -3*v0 + 2*v2 + 1 = 0; value: 0 - 5*v2 + 4*v3 -17 = 0; value: 0 - -3*v1 <= 0; value: 0 0: 1 3 1: 5 2: 1 2 3 4 3: 1 2 4 0: 1 -> 247/111 1: 0 -> 0 2: 1 -> 105/37 3: 3 -> 26/37 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -25 <= 0; value: 0 + -4*v0 + 5*v1 + 2*v3 -33 <= 0; value: -16 + -4*v1 + 3*v2 -4 <= 0; value: -9 + -2*v0 -2*v1 -4*v2 + 36 = 0; value: 0 + -2*v2 + 2*v3 -4 < 0; value: -10 0: 2 4 1: 2 3 4 2: 1 3 4 5 3: 2 5 optimal: 5 + + 5 <= 0; value: 5 - 5*v2 -25 <= 0; value: 0 + 2*v3 -161/4 <= 0; value: -145/4 - 4*v0 -21 <= 0; value: 0 - -2*v0 -2*v1 -4*v2 + 36 = 0; value: 0 + 2*v3 -14 < 0; value: -10 0: 2 4 3 1: 2 3 4 2: 1 3 4 5 2 3: 2 5 0: 3 -> 21/4 1: 5 -> 11/4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + v2 -34 < 0; value: -17 + 6*v0 + 2*v3 -38 = 0; value: 0 + -1*v0 -2*v2 <= 0; value: -9 + -1*v1 -6*v2 -13 < 0; value: -29 + -5*v2 + 10 = 0; value: 0 0: 1 2 3 1: 4 2: 1 3 4 5 3: 2 optimal: (214/3 -e*1) + + 214/3 < 0; value: 214/3 - -1*v3 -13 < 0; value: -1 - 6*v0 + 2*v3 -38 = 0; value: 0 + -44/3 < 0; value: -44/3 - -1*v1 -6*v2 -13 < 0; value: -1 - -5*v2 + 10 = 0; value: 0 0: 1 2 3 1: 4 2: 1 3 4 5 3: 2 1 3 0: 5 -> 31/3 1: 4 -> -24 2: 2 -> 2 3: 4 -> -12 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 + 2*v3 + 10 <= 0; value: -18 + -6*v2 + 27 <= 0; value: -3 + 4*v3 -6 <= 0; value: -2 + 4*v0 -3*v1 -3*v3 + 12 = 0; value: 0 + -6*v0 = 0; value: 0 0: 4 5 1: 4 2: 1 2 3: 1 3 4 optimal: -5 + -5 <= 0; value: -5 + -6*v2 + 13 <= 0; value: -17 + -6*v2 + 27 <= 0; value: -3 - 4*v3 -6 <= 0; value: 0 - 4*v0 -3*v1 -3*v3 + 12 = 0; value: 0 - -6*v0 = 0; value: 0 0: 4 5 1: 4 2: 1 2 3: 1 3 4 0: 0 -> 0 1: 3 -> 5/2 2: 5 -> 5 3: 1 -> 3/2 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 -4*v3 -14 = 0; value: 0 + -6*v0 -6*v1 -6*v2 -23 <= 0; value: -89 + 2*v0 -3*v1 + 4*v3 + 5 = 0; value: 0 + 4*v1 -1*v3 -20 < 0; value: -1 + -1*v0 + 3*v2 -6 = 0; value: 0 0: 2 3 5 1: 2 3 4 2: 1 2 5 3: 1 3 4 optimal: -7/24 + -7/24 <= 0; value: -7/24 - 6*v2 -4*v3 -14 = 0; value: 0 - -16*v0 -41 <= 0; value: 0 - 2*v0 -3*v1 + 4*v3 + 5 = 0; value: 0 + -2677/96 < 0; value: -2677/96 - -1*v0 + 3*v2 -6 = 0; value: 0 0: 2 3 5 4 1: 2 3 4 2: 1 2 5 4 3: 1 3 4 2 0: 3 -> -41/16 1: 5 -> -29/12 2: 3 -> 55/48 3: 1 -> -57/32 + 2*v0 -2*v1 <= 0; value: -10 + -2*v0 + v3 -2 <= 0; value: 0 + 6*v0 -1*v2 + 3*v3 -2 = 0; value: 0 + 2*v1 -5*v2 -6 <= 0; value: -16 + -3*v1 + 5*v2 + 4*v3 -13 = 0; value: 0 + -5*v1 + 20 <= 0; value: -5 0: 1 2 1: 3 4 5 2: 2 3 4 3: 1 2 4 optimal: oo + 2*v0 -8 <= 0; value: -8 + -68/19*v0 -3/19 <= 0; value: -3/19 - 6*v0 -1*v2 + 3*v3 -2 = 0; value: 0 + -120/19*v0 -297/19 <= 0; value: -297/19 - -3*v1 + 5*v2 + 4*v3 -13 = 0; value: 0 - 40/3*v0 -95/9*v2 + 335/9 <= 0; value: 0 0: 1 2 5 3 1: 3 4 5 2: 2 3 4 5 1 3: 1 2 4 5 3 0: 0 -> 0 1: 5 -> 4 2: 4 -> 67/19 3: 2 -> 35/19 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -1*v2 + 8 <= 0; value: -5 + v0 -6*v1 + 5*v2 + 14 <= 0; value: -2 + 2*v0 + 4*v1 -5*v2 -40 <= 0; value: -23 + 4*v1 + 2*v2 -32 <= 0; value: -14 + 5*v0 -1*v1 + 6*v3 -54 < 0; value: -25 0: 1 2 3 5 1: 2 3 4 5 2: 1 2 3 4 3: 5 optimal: 149/7 + + 149/7 <= 0; value: 149/7 - -4*v0 -1*v2 + 8 <= 0; value: 0 - v0 -6*v1 + 5*v2 + 14 <= 0; value: 0 - 28/3*v0 -44 <= 0; value: 0 + -542/7 <= 0; value: -542/7 + 6*v3 -49/2 < 0; value: -13/2 0: 1 2 3 5 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 5 0: 3 -> 33/7 1: 4 -> -83/14 2: 1 -> -76/7 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 + 6*v1 -3*v3 -53 <= 0; value: -33 + -4*v1 + 3*v3 + 13 <= 0; value: -7 + -5*v0 -2*v1 + 6 < 0; value: -29 + 3*v0 + v1 -3*v2 -31 < 0; value: -14 + 4*v1 + 2*v3 -49 <= 0; value: -29 0: 1 3 4 1: 1 2 3 4 5 2: 4 3: 1 2 5 optimal: oo + 42*v2 + 386 < 0; value: 428 + -42*v2 -426 < 0; value: -468 - -4*v1 + 3*v3 + 13 <= 0; value: 0 - -5*v0 -3/2*v3 -1/2 < 0; value: -3/2 - 1/2*v0 -3*v2 -28 < 0; value: -1/2 + -100*v2 -971 < 0; value: -1071 0: 1 3 4 5 1: 1 2 3 4 5 2: 4 1 5 3: 1 2 5 3 4 0: 5 -> 61 1: 5 -> -595/4 2: 1 -> 1 3: 0 -> -608/3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4*v1 + 2 = 0; value: 0 + 2*v0 -4*v3 <= 0; value: -2 + 5*v0 + v3 -17 = 0; value: 0 + 2*v1 -4 = 0; value: 0 + 5*v0 + v1 -4*v3 -14 <= 0; value: -5 0: 1 2 3 5 1: 1 4 5 2: 3: 2 3 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 -4*v1 + 2 = 0; value: 0 + -2 <= 0; value: -2 - 5*v0 + v3 -17 = 0; value: 0 - -1/5*v3 + 2/5 = 0; value: 0 + -5 <= 0; value: -5 0: 1 2 3 5 4 1: 1 4 5 2: 3: 2 3 5 4 0: 3 -> 3 1: 2 -> 2 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 4*v2 -5 <= 0; value: -15 + -5*v1 -4*v3 + 11 < 0; value: -6 + -4*v0 + 4*v3 + 8 = 0; value: 0 + -1*v2 -5*v3 -1 <= 0; value: -16 + 3*v2 + 6*v3 -25 <= 0; value: -7 0: 1 3 1: 2 2: 1 4 5 3: 2 3 4 5 optimal: oo + -9/5*v2 + 73/5 < 0; value: 73/5 + 5*v2 -52/3 <= 0; value: -52/3 - -5*v1 -4*v3 + 11 < 0; value: -5 - -4*v0 + 4*v3 + 8 = 0; value: 0 + 3/2*v2 -131/6 <= 0; value: -131/6 - 6*v0 + 3*v2 -37 <= 0; value: 0 0: 1 3 5 4 1: 2 2: 1 4 5 3: 2 3 4 5 0: 5 -> 37/6 1: 1 -> -2/15 2: 0 -> 0 3: 3 -> 25/6 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 3*v1 -14 <= 0; value: 0 + 4*v0 + 3*v1 -2*v2 -28 <= 0; value: -14 + -3*v1 -6*v2 + 30 = 0; value: 0 + -3*v0 + 6*v1 + 3*v3 -12 = 0; value: 0 + 2*v1 + 6*v2 -49 <= 0; value: -21 0: 1 2 4 1: 1 2 3 4 5 2: 2 3 5 3: 4 optimal: 95 + + 95 <= 0; value: 95 + -14 <= 0; value: -14 - 4*v0 -114 <= 0; value: 0 - -3*v1 -6*v2 + 30 = 0; value: 0 - -3*v0 -12*v2 + 3*v3 + 48 = 0; value: 0 - -1/2*v0 + 1/2*v3 -21 <= 0; value: 0 0: 1 2 4 5 1: 1 2 3 4 5 2: 2 3 5 4 1 3: 4 5 2 1 0: 4 -> 57/2 1: 2 -> -19 2: 4 -> 29/2 3: 4 -> 141/2 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 + v2 + 2*v3 -12 = 0; value: 0 + -4*v2 -14 <= 0; value: -30 + -6*v1 -3*v3 -14 < 0; value: -38 + -6*v0 + 4*v2 -16 = 0; value: 0 + -5*v2 -5*v3 -6 <= 0; value: -46 0: 1 4 1: 3 2: 1 2 4 5 3: 1 3 5 optimal: oo + 11/4*v0 + 26/3 < 0; value: 26/3 - -3*v0 + v2 + 2*v3 -12 = 0; value: 0 + -6*v0 -30 <= 0; value: -30 - -6*v1 -3*v3 -14 < 0; value: -6 - -6*v0 + 4*v2 -16 = 0; value: 0 + -45/4*v0 -46 <= 0; value: -46 0: 1 4 5 2 1: 3 2: 1 2 4 5 3: 1 3 5 0: 0 -> 0 1: 2 -> -10/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 6*v1 + 6*v3 -78 <= 0; value: -48 + 5*v0 + 2*v1 -20 = 0; value: 0 + -2*v1 = 0; value: 0 + -3*v0 + 3*v1 -11 <= 0; value: -23 + 5*v0 -3*v1 + 3*v3 -70 <= 0; value: -35 0: 2 4 5 1: 1 2 3 4 5 2: 3: 1 5 optimal: 8 + + 8 <= 0; value: 8 + 6*v3 -78 <= 0; value: -48 - 5*v0 + 2*v1 -20 = 0; value: 0 - 5*v0 -20 = 0; value: 0 + -23 <= 0; value: -23 + 3*v3 -50 <= 0; value: -35 0: 2 4 5 3 1 1: 1 2 3 4 5 2: 3: 1 5 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -3*v1 + 4 <= 0; value: -3 + -3*v0 + 6*v2 <= 0; value: 0 + -3*v0 + 7 < 0; value: -5 + v0 + 3*v1 + v2 -54 < 0; value: -33 + 6*v1 -3*v3 -24 <= 0; value: -9 0: 1 2 3 4 1: 1 4 5 2: 2 4 3: 5 optimal: oo + -2/9*v2 + 76/9 < 0; value: 8 - 2*v0 -3*v1 + 4 <= 0; value: 0 + 7*v2 -50 < 0; value: -36 + v2 -43 < 0; value: -41 - v2 + 9/4*v3 -38 < 0; value: -9/4 - 4*v0 -3*v3 -16 <= 0; value: 0 0: 1 2 3 4 5 1: 1 4 5 2: 2 4 3 3: 5 4 2 3 0: 4 -> 61/4 1: 5 -> 23/2 2: 2 -> 2 3: 5 -> 15 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -5*v2 + 6 <= 0; value: -4 + -5*v2 -8 < 0; value: -18 + -2*v2 -6*v3 + 4 < 0; value: -12 + 2*v3 -6 <= 0; value: -2 + 6*v2 -3*v3 -17 <= 0; value: -11 0: 1 1: 2: 1 2 3 5 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 -5*v2 + 6 <= 0; value: -4 + -5*v2 -8 < 0; value: -18 + -2*v2 -6*v3 + 4 < 0; value: -12 + 2*v3 -6 <= 0; value: -2 + 6*v2 -3*v3 -17 <= 0; value: -11 0: 1 1: 2: 1 2 3 5 3: 3 4 5 0: 0 -> 0 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v1 -6*v2 + 6*v3 + 6 = 0; value: 0 + -2*v2 -1*v3 = 0; value: 0 + -3*v1 + 3 = 0; value: 0 + 4*v1 + 3*v2 -10 <= 0; value: -6 + -3*v1 + 4*v3 -1 <= 0; value: -4 0: 1: 1 3 4 5 2: 1 2 4 3: 1 2 5 optimal: oo + 2*v0 -2 <= 0; value: 6 - -6*v1 -6*v2 + 6*v3 + 6 = 0; value: 0 - -2*v2 -1*v3 = 0; value: 0 - 9*v2 = 0; value: 0 + -6 <= 0; value: -6 + -4 <= 0; value: -4 0: 1: 1 3 4 5 2: 1 2 4 3 5 3: 1 2 5 3 4 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -2*v1 + 2*v2 -6 < 0; value: -16 + 2*v0 + 6*v1 + 6*v3 -62 <= 0; value: -8 + -4*v0 -6*v2 <= 0; value: 0 + -1*v0 -5*v1 -2*v2 -8 < 0; value: -33 + -4*v1 + 17 < 0; value: -3 0: 2 3 4 1: 1 2 4 5 2: 1 3 4 3: 2 optimal: oo + -6*v3 + 28 < 0; value: 4 + 2*v2 -29/2 <= 0; value: -29/2 - 2*v0 + 6*v3 -73/2 < 0; value: -2 + -6*v2 + 12*v3 -73 < 0; value: -25 + -2*v2 + 3*v3 -95/2 < 0; value: -71/2 - -4*v1 + 17 < 0; value: -3/2 0: 2 3 4 1: 1 2 4 5 2: 1 3 4 3: 2 3 4 0: 0 -> 21/4 1: 5 -> 37/8 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 2*v2 -22 = 0; value: 0 + -6*v0 + 6*v2 <= 0; value: 0 + 4*v0 -4*v2 = 0; value: 0 + v0 + 3*v3 -42 <= 0; value: -25 + -2*v0 -6*v2 -1*v3 + 21 = 0; value: 0 0: 2 3 4 5 1: 1 2: 1 2 3 5 3: 4 5 optimal: oo + -1/3*v3 -1/3 <= 0; value: -2 - 6*v1 + 2*v2 -22 = 0; value: 0 - -6*v0 + 6*v2 <= 0; value: 0 + = 0; value: 0 + 23/8*v3 -315/8 <= 0; value: -25 - -8*v0 -1*v3 + 21 = 0; value: 0 0: 2 3 4 5 1: 1 2: 1 2 3 5 3: 4 5 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 + v3 -32 <= 0; value: -18 + -3*v0 + 7 <= 0; value: -2 + <= 0; value: 0 + 4*v0 -15 <= 0; value: -3 + 5*v0 -18 < 0; value: -3 0: 2 4 5 1: 1 2: 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 + v3 -32 <= 0; value: -18 + -3*v0 + 7 <= 0; value: -2 + <= 0; value: 0 + 4*v0 -15 <= 0; value: -3 + 5*v0 -18 < 0; value: -3 0: 2 4 5 1: 1 2: 3: 1 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + -2*v1 -2*v2 + 3*v3 + 4 <= 0; value: -7 + 3*v1 -5*v2 + 4 < 0; value: -6 + -3*v2 -4*v3 -17 <= 0; value: -44 + -5*v1 + 25 = 0; value: 0 0: 1 1: 1 2 3 5 2: 1 2 3 4 3: 2 4 optimal: oo + v2 -9/2 <= 0; value: 1/2 - 4*v0 -2*v2 -11 <= 0; value: 0 + -2*v2 + 3*v3 -6 <= 0; value: -7 + -5*v2 + 19 < 0; value: -6 + -3*v2 -4*v3 -17 <= 0; value: -44 - -5*v1 + 25 = 0; value: 0 0: 1 1: 1 2 3 5 2: 1 2 3 4 3: 2 4 0: 1 -> 21/4 1: 5 -> 5 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 + 6*v1 -31 <= 0; value: -7 + -1*v0 + 5*v1 + 6*v3 -61 <= 0; value: -29 + -1*v1 -4*v2 + 7 <= 0; value: -1 + 6*v0 -4*v3 + 3 <= 0; value: -5 + 6*v1 + 4*v2 -39 <= 0; value: -11 0: 1 2 4 1: 1 2 3 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 + 8*v2 -14 <= 0; value: -6 + -3*v0 -24*v2 + 11 <= 0; value: -13 + -1*v0 -20*v2 + 6*v3 -26 <= 0; value: -34 - -1*v1 -4*v2 + 7 <= 0; value: 0 + 6*v0 -4*v3 + 3 <= 0; value: -5 + -20*v2 + 3 <= 0; value: -17 0: 1 2 4 1: 1 2 3 5 2: 3 5 1 2 3: 2 4 0: 0 -> 0 1: 4 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v0 + v1 -1*v3 + 18 = 0; value: 0 + 5*v0 -6*v2 -22 <= 0; value: -13 + 6*v0 -3*v1 + 5*v3 -20 <= 0; value: -2 + -5*v1 -5*v2 + 2*v3 + 2 <= 0; value: -3 + -6*v0 -6*v1 + v3 + 14 <= 0; value: -4 0: 1 2 3 5 1: 1 3 4 5 2: 2 4 3: 1 3 4 5 optimal: oo + 204/25*v2 + 428/25 <= 0; value: 632/25 - -6*v0 + v1 -1*v3 + 18 = 0; value: 0 - 5*v0 -6*v2 -22 <= 0; value: 0 + -864/25*v2 -1098/25 <= 0; value: -1962/25 + -269/25*v2 -58/25 <= 0; value: -327/25 - -42*v0 -5*v3 + 122 <= 0; value: 0 0: 1 2 3 5 4 1: 1 3 4 5 2: 2 4 3 3: 1 3 4 5 0: 3 -> 28/5 1: 0 -> -176/25 2: 1 -> 1 3: 0 -> -566/25 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -6 <= 0; value: -3 + 4*v2 + 5*v3 -25 = 0; value: 0 + 4*v0 -4*v3 -8 <= 0; value: 0 + 6*v1 -6*v3 <= 0; value: 0 + v0 + v2 -8 = 0; value: 0 0: 3 5 1: 1 4 2: 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -6 <= 0; value: -3 + 4*v2 + 5*v3 -25 = 0; value: 0 + 4*v0 -4*v3 -8 <= 0; value: 0 + 6*v1 -6*v3 <= 0; value: 0 + v0 + v2 -8 = 0; value: 0 0: 3 5 1: 1 4 2: 2 5 3: 1 2 3 4 0: 3 -> 3 1: 1 -> 1 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 10 + -4*v1 + 5*v2 + 6*v3 -21 <= 0; value: -11 + -6*v3 <= 0; value: 0 + v0 + 3*v1 + 5*v2 -42 <= 0; value: -27 + -6*v1 -4*v2 + 4*v3 + 8 <= 0; value: 0 + 6*v2 -6*v3 -12 = 0; value: 0 0: 3 1: 1 3 4 2: 1 3 4 5 3: 1 2 4 5 optimal: 64 + + 64 <= 0; value: 64 + -11 <= 0; value: -11 - -6*v3 <= 0; value: 0 - v0 -32 <= 0; value: 0 - -6*v1 -4*v2 + 4*v3 + 8 <= 0; value: 0 - 6*v2 -12 = 0; value: 0 0: 3 1: 1 3 4 2: 1 3 4 5 3: 1 2 4 5 3 0: 5 -> 32 1: 0 -> 0 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + v2 -1*v3 + 1 <= 0; value: -3 + 2*v1 + 5*v2 -6*v3 -21 <= 0; value: -44 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + 6*v1 -7 < 0; value: -1 + 2*v0 + 2*v1 -6*v2 <= 0; value: 0 0: 3 5 1: 2 3 4 5 2: 1 2 3 5 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + v2 -1*v3 + 1 <= 0; value: -3 + 2*v1 + 5*v2 -6*v3 -21 <= 0; value: -44 + 4*v0 + 3*v1 -2*v2 -26 <= 0; value: -17 + 6*v1 -7 < 0; value: -1 + 2*v0 + 2*v1 -6*v2 <= 0; value: 0 0: 3 5 1: 2 3 4 5 2: 1 2 3 5 3: 1 2 0: 2 -> 2 1: 1 -> 1 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 + 3*v2 -5*v3 -1 <= 0; value: -4 + 4*v0 -3*v1 -27 <= 0; value: -17 + 5*v2 + v3 -4 <= 0; value: -1 + 4*v0 + 6*v1 + 6*v3 -136 <= 0; value: -90 + 4*v0 -6*v1 + 2*v3 -23 <= 0; value: -13 0: 2 4 5 1: 1 2 4 5 2: 1 3 3: 1 3 4 5 optimal: oo + -2/3*v0 + 18 <= 0; value: 46/3 - 4*v0 + 3*v2 -3*v3 -24 <= 0; value: 0 - 2/3*v0 -1*v2 -15/2 <= 0; value: 0 + 16/3*v0 -57 <= 0; value: -107/3 + 24*v0 -283 <= 0; value: -187 - 4*v0 -6*v1 + 2*v3 -23 <= 0; value: 0 0: 2 4 5 1 3 1: 1 2 4 5 2: 1 3 2 4 3: 1 3 4 5 2 0: 4 -> 4 1: 2 -> -11/3 2: 0 -> -29/6 3: 3 -> -15/2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 -28 < 0; value: -13 + 3*v1 -4*v2 < 0; value: -20 + -3*v1 + 6*v2 -37 < 0; value: -7 + -5*v1 -4*v2 + 10 < 0; value: -10 + 6*v0 + 4*v3 -77 < 0; value: -37 0: 1 5 1: 2 3 4 2: 1 2 3 4 3: 1 5 optimal: oo + -4/3*v3 + 209/7 < 0; value: 515/21 + 10/3*v3 -1609/42 < 0; value: -1049/42 + -562/21 < 0; value: -562/21 - 42/5*v2 -43 <= 0; value: 0 - -5*v1 -4*v2 + 10 < 0; value: -5 - 6*v0 + 4*v3 -77 < 0; value: -6 0: 1 5 1: 2 3 4 2: 1 2 3 4 3: 1 5 0: 4 -> 55/6 1: 0 -> -23/21 2: 5 -> 215/42 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + v0 -4*v1 -1*v2 + 8 = 0; value: 0 + -4*v0 + v1 + 18 = 0; value: 0 + 4*v2 -1*v3 -41 <= 0; value: -23 + -1*v2 -5*v3 -8 <= 0; value: -23 + -5*v0 + 4*v1 < 0; value: -17 0: 1 2 5 1: 1 2 5 2: 1 3 4 3: 3 4 optimal: oo + 1/10*v3 + 81/10 <= 0; value: 83/10 - v0 -4*v1 -1*v2 + 8 = 0; value: 0 - -15/4*v0 -1/4*v2 + 20 = 0; value: 0 - -60*v0 -1*v3 + 279 <= 0; value: 0 + -21/4*v3 -73/4 <= 0; value: -115/4 + -11/60*v3 -417/20 < 0; value: -1273/60 0: 1 2 5 3 4 1: 1 2 5 2: 1 3 4 2 5 3: 3 4 5 0: 5 -> 277/60 1: 2 -> 7/15 2: 5 -> 43/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 3*v2 -3*v3 + 14 <= 0; value: -6 + 6*v0 + 5*v3 -53 <= 0; value: -21 + -5*v1 -4*v2 -4 < 0; value: -14 + -2*v3 + 1 < 0; value: -7 + -3*v0 + 3*v1 <= 0; value: 0 0: 1 2 5 1: 3 5 2: 1 3 3: 1 2 4 optimal: (535/18 -e*1) + + 535/18 < 0; value: 535/18 - -4*v0 + 3*v2 -3*v3 + 14 <= 0; value: 0 - 6*v0 + 5*v3 -53 <= 0; value: 0 - -5*v1 -4*v2 -4 < 0; value: -5 - 12/5*v0 -101/5 < 0; value: -12/5 + -535/12 < 0; value: -535/12 0: 1 2 5 4 1: 3 5 2: 1 3 5 3: 1 2 4 5 0: 2 -> 89/12 1: 2 -> -1201/225 2: 0 -> 623/90 3: 4 -> 17/10 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 5*v1 + 3*v2 + 4 = 0; value: 0 + 2*v2 + v3 -9 = 0; value: 0 + 5*v1 + 3*v3 -26 <= 0; value: -6 + 4*v2 -20 < 0; value: -12 + 3*v0 + v3 -20 = 0; value: 0 0: 1 5 1: 1 3 2: 1 2 4 3: 2 3 5 optimal: (66/5 -e*1) + + 66/5 < 0; value: 66/5 - -3*v0 + 5*v1 + 3*v2 + 4 = 0; value: 0 - 2*v2 + v3 -9 = 0; value: 0 + -27 < 0; value: -27 - 6*v0 -42 < 0; value: -6 - 3*v0 + v3 -20 = 0; value: 0 0: 1 5 3 4 1: 1 3 2: 1 2 4 3 3: 2 3 5 4 0: 5 -> 6 1: 1 -> 7/10 2: 2 -> 7/2 3: 5 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 + 5*v2 -16 = 0; value: 0 + -1*v0 -5*v2 -2*v3 -11 <= 0; value: -35 + 6*v0 + 4*v2 + 2*v3 -88 <= 0; value: -58 + -1*v1 + 3*v3 -5 <= 0; value: -3 + 2*v0 + v3 -5 = 0; value: 0 0: 2 3 5 1: 1 4 2: 1 2 3 3: 2 3 4 5 optimal: 538/27 + + 538/27 <= 0; value: 538/27 - -4*v1 + 5*v2 -16 = 0; value: 0 - 27*v0 -77 <= 0; value: 0 + -11104/135 <= 0; value: -11104/135 - -5/4*v2 + 3*v3 -1 <= 0; value: 0 - 2*v0 + v3 -5 = 0; value: 0 0: 2 3 5 1: 1 4 2: 1 2 3 4 3: 2 3 4 5 0: 2 -> 77/27 1: 1 -> -64/9 2: 4 -> -112/45 3: 1 -> -19/27 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 + 3*v3 -29 < 0; value: -15 + 5*v1 -9 <= 0; value: -4 + 3*v2 -11 <= 0; value: -5 + v0 -6*v3 + 19 <= 0; value: -2 + v1 -5*v3 + 13 < 0; value: -6 0: 1 4 1: 2 5 2: 1 3 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 + 3*v3 -29 < 0; value: -15 + 5*v1 -9 <= 0; value: -4 + 3*v2 -11 <= 0; value: -5 + v0 -6*v3 + 19 <= 0; value: -2 + v1 -5*v3 + 13 < 0; value: -6 0: 1 4 1: 2 5 2: 1 3 3: 1 4 5 0: 3 -> 3 1: 1 -> 1 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 4*v1 + v2 -4 <= 0; value: 0 + -3*v3 + 2 <= 0; value: -1 + v1 -5*v2 -6*v3 + 26 = 0; value: 0 + 2*v0 + v3 -2 < 0; value: -1 + -4*v3 -3 < 0; value: -7 0: 1 4 1: 1 3 2: 1 3 3: 2 3 4 5 optimal: oo + 2*v0 -10*v2 + 44 <= 0; value: 4 + -6*v0 + 21*v2 -92 <= 0; value: -8 - -3*v3 + 2 <= 0; value: 0 - v1 -5*v2 -6*v3 + 26 = 0; value: 0 + 2*v0 -4/3 < 0; value: -4/3 + -17/3 < 0; value: -17/3 0: 1 4 1: 1 3 2: 1 3 3: 2 3 4 5 1 0: 0 -> 0 1: 0 -> -2 2: 4 -> 4 3: 1 -> 2/3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -5*v1 + 22 = 0; value: 0 + -6*v0 -3*v2 + 27 = 0; value: 0 + 5*v3 -24 <= 0; value: -14 + 5*v0 -5*v3 -8 <= 0; value: -3 + -1*v0 -2 < 0; value: -5 0: 1 2 4 5 1: 1 2: 2 3: 3 4 optimal: 356/25 + + 356/25 <= 0; value: 356/25 - -4*v0 -5*v1 + 22 = 0; value: 0 - -6*v0 -3*v2 + 27 = 0; value: 0 - 5*v3 -24 <= 0; value: 0 - -5/2*v2 -5*v3 + 29/2 <= 0; value: 0 + -42/5 < 0; value: -42/5 0: 1 2 4 5 1: 1 2: 2 4 5 3: 3 4 5 0: 3 -> 32/5 1: 2 -> -18/25 2: 3 -> -19/5 3: 2 -> 24/5 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -6*v3 + 37 = 0; value: 0 + -6*v0 + 4*v2 -4*v3 -21 <= 0; value: -55 + -5*v0 + 5*v2 + 7 < 0; value: -13 + -3*v2 -1*v3 <= 0; value: -5 + -1*v0 + v2 -1 < 0; value: -5 0: 2 3 5 1: 1 2: 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 + 12/5*v3 -74/5 <= 0; value: 0 - -5*v1 -6*v3 + 37 = 0; value: 0 + -6*v0 + 4*v2 -4*v3 -21 <= 0; value: -55 + -5*v0 + 5*v2 + 7 < 0; value: -13 + -3*v2 -1*v3 <= 0; value: -5 + -1*v0 + v2 -1 < 0; value: -5 0: 2 3 5 1: 1 2: 2 3 4 5 3: 1 2 4 0: 5 -> 5 1: 5 -> 5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + v2 -4*v3 -5 <= 0; value: -20 + 4*v0 -12 <= 0; value: -4 + -4*v2 -6*v3 -21 <= 0; value: -49 + -1*v0 + v2 -1*v3 + 2 < 0; value: -3 + 3*v0 -3*v1 -2 <= 0; value: -5 0: 2 4 5 1: 5 2: 1 3 4 3: 1 3 4 optimal: 4/3 + + 4/3 <= 0; value: 4/3 + v2 -4*v3 -5 <= 0; value: -20 + 4*v0 -12 <= 0; value: -4 + -4*v2 -6*v3 -21 <= 0; value: -49 + -1*v0 + v2 -1*v3 + 2 < 0; value: -3 - 3*v0 -3*v1 -2 <= 0; value: 0 0: 2 4 5 1: 5 2: 1 3 4 3: 1 3 4 0: 2 -> 2 1: 3 -> 4/3 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 6*v1 -1*v2 -8 < 0; value: -5 + 5*v0 -4*v3 -2 = 0; value: 0 + -5*v0 -1*v1 -2*v3 -9 <= 0; value: -24 + v1 -1*v2 + 2 <= 0; value: 0 + -5*v1 + 5 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 4 3: 2 3 optimal: oo + 8/5*v3 -6/5 <= 0; value: 2 + -1*v2 -2 < 0; value: -5 - 5*v0 -4*v3 -2 = 0; value: 0 + -6*v3 -12 <= 0; value: -24 + -1*v2 + 3 <= 0; value: 0 - -5*v1 + 5 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 4 3: 2 3 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + v2 -13 <= 0; value: -7 + v1 + 2*v2 -7 < 0; value: -4 + -2*v0 -5*v2 -3*v3 + 1 <= 0; value: -4 + v1 -2 <= 0; value: -1 + -2*v2 + 5*v3 + 2 <= 0; value: 0 0: 3 1: 1 2 4 2: 1 2 3 5 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + v2 -13 <= 0; value: -7 + v1 + 2*v2 -7 < 0; value: -4 + -2*v0 -5*v2 -3*v3 + 1 <= 0; value: -4 + v1 -2 <= 0; value: -1 + -2*v2 + 5*v3 + 2 <= 0; value: 0 0: 3 1: 1 2 4 2: 1 2 3 5 3: 3 5 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + <= 0; value: 0 + 3*v1 -6*v3 -12 < 0; value: -27 + 4*v1 + 5*v2 -5*v3 -49 <= 0; value: -32 + 5*v1 -1*v2 -5*v3 + 1 < 0; value: -9 + -1*v2 + 4*v3 -17 <= 0; value: -6 0: 1: 2 3 4 2: 3 4 5 3: 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + <= 0; value: 0 + 3*v1 -6*v3 -12 < 0; value: -27 + 4*v1 + 5*v2 -5*v3 -49 <= 0; value: -32 + 5*v1 -1*v2 -5*v3 + 1 < 0; value: -9 + -1*v2 + 4*v3 -17 <= 0; value: -6 0: 1: 2 3 4 2: 3 4 5 3: 2 3 4 5 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 5 <= 0; value: -7 + -2*v0 + v2 + 5 = 0; value: 0 + v1 -7 < 0; value: -4 + 6*v3 -22 < 0; value: -10 + 6*v0 + 3*v1 -34 < 0; value: -7 0: 2 5 1: 1 3 5 2: 2 3: 4 optimal: (91/12 -e*1) + + 91/12 < 0; value: 91/12 - -4*v1 + 5 <= 0; value: 0 - -2*v0 + v2 + 5 = 0; value: 0 + -23/4 < 0; value: -23/4 + 6*v3 -22 < 0; value: -10 - 3*v2 -61/4 < 0; value: -3 0: 2 5 1: 1 3 5 2: 2 5 3: 4 0: 3 -> 109/24 1: 3 -> 5/4 2: 1 -> 49/12 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -3*v2 -1*v3 + 3 <= 0; value: -2 + -4*v1 -5*v2 + 3 <= 0; value: -6 + -6*v0 -3*v3 + 18 < 0; value: -12 + -3*v1 + 2*v2 + 1 <= 0; value: 0 + 5*v0 -3*v1 -6*v2 -11 = 0; value: 0 0: 3 5 1: 2 4 5 2: 1 2 4 5 3: 1 3 optimal: oo + 7/6*v0 + 4/3 <= 0; value: 6 + -15/8*v0 -1*v3 + 15/2 <= 0; value: -2 + -115/24*v0 + 79/6 <= 0; value: -6 + -6*v0 -3*v3 + 18 < 0; value: -12 - -3*v1 + 2*v2 + 1 <= 0; value: 0 - 5*v0 -8*v2 -12 = 0; value: 0 0: 3 5 2 1 1: 2 4 5 2: 1 2 4 5 3: 1 3 0: 4 -> 4 1: 1 -> 1 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v3 -46 <= 0; value: -28 + -4*v0 -2*v1 -2 <= 0; value: -26 + -2*v0 + 8 = 0; value: 0 + 2*v2 -4*v3 -1 <= 0; value: -5 + -6*v0 + 4*v2 + 6*v3 -13 <= 0; value: -3 0: 2 3 5 1: 2 2: 4 5 3: 1 4 5 optimal: 26 + + 26 <= 0; value: 26 + 6*v3 -46 <= 0; value: -28 - -4*v0 -2*v1 -2 <= 0; value: 0 - -2*v0 + 8 = 0; value: 0 + 2*v2 -4*v3 -1 <= 0; value: -5 + 4*v2 + 6*v3 -37 <= 0; value: -3 0: 2 3 5 1: 2 2: 4 5 3: 1 4 5 0: 4 -> 4 1: 4 -> -9 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 -5 <= 0; value: -2 + -3*v2 -1 <= 0; value: -4 + -5*v2 + 3*v3 -18 <= 0; value: -11 + 6*v1 -30 = 0; value: 0 + 3*v0 -2*v2 -6*v3 -4 < 0; value: -27 0: 5 1: 4 2: 1 2 3 5 3: 3 5 optimal: (30 -e*1) + + 30 < 0; value: 30 - 3*v2 -5 <= 0; value: 0 + -6 <= 0; value: -6 - -5*v2 + 3*v3 -18 <= 0; value: 0 - 6*v1 -30 = 0; value: 0 - 3*v0 -2*v2 -6*v3 -4 < 0; value: -3 0: 5 1: 4 2: 1 2 3 5 3: 3 5 0: 1 -> 19 1: 5 -> 5 2: 1 -> 5/3 3: 4 -> 79/9 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 4*v1 + 4*v2 -11 <= 0; value: -7 + 3*v0 -4*v1 -12 <= 0; value: 0 + 6*v0 + 4*v1 + v2 -58 <= 0; value: -30 + v0 -5*v1 -1*v2 <= 0; value: 0 + 4*v1 + 4*v2 -21 <= 0; value: -5 0: 1 2 3 4 1: 1 2 3 4 5 2: 1 3 4 5 3: optimal: 643/66 + + 643/66 <= 0; value: 643/66 + -137/11 <= 0; value: -137/11 - 3*v0 -4*v1 -12 <= 0; value: 0 - -11*v2 + 29 <= 0; value: 0 + -1085/132 <= 0; value: -1085/132 - 3*v0 + 4*v2 -33 <= 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 4 5 2: 1 3 4 5 3: 0: 4 -> 247/33 1: 0 -> 115/44 2: 4 -> 29/11 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 + 3*v3 -8 < 0; value: -3 + v1 -4*v2 -5*v3 + 20 < 0; value: -25 + -5*v1 + 4*v2 -1*v3 -43 <= 0; value: -28 + 5*v0 -1*v2 -6 < 0; value: -1 + -6*v2 + 18 <= 0; value: -12 0: 1 4 1: 2 3 2: 2 3 4 5 3: 1 2 3 optimal: (274/15 -e*1) + + 274/15 < 0; value: 274/15 - -5*v0 + 3*v3 -8 < 0; value: -1 + -83/3 <= 0; value: -83/3 - -5*v1 + 4*v2 -1*v3 -43 <= 0; value: 0 - 5*v0 -1*v2 -6 < 0; value: -1 - -30*v0 + 54 <= 0; value: 0 0: 1 4 2 5 1: 2 3 2: 2 3 4 5 3: 1 2 3 0: 2 -> 9/5 1: 0 -> -97/15 2: 5 -> 4 3: 5 -> 16/3 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -6*v3 + 20 <= 0; value: 0 + 4*v1 -1*v3 -4 = 0; value: 0 + -2*v1 + 4*v2 -14 <= 0; value: -4 + -5*v0 -1*v2 + 2*v3 -26 < 0; value: -54 + 6*v3 <= 0; value: 0 0: 1 4 1: 2 3 2: 3 4 3: 1 2 4 5 optimal: oo + -28*v2 + 120 <= 0; value: 36 - -4*v0 -6*v3 + 20 <= 0; value: 0 - 4*v1 -1*v3 -4 = 0; value: 0 - 1/3*v0 + 4*v2 -53/3 <= 0; value: 0 + 75*v2 -355 < 0; value: -130 + 48*v2 -192 <= 0; value: -48 0: 1 4 3 5 1: 2 3 2: 3 4 5 3: 1 2 4 5 3 0: 5 -> 17 1: 1 -> -1 2: 3 -> 3 3: 0 -> -8 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + v2 -1 <= 0; value: -3 + -2*v0 + 1 <= 0; value: -7 + -4*v0 + 3*v1 + 2*v2 + 6 <= 0; value: 0 + 6*v0 -6*v1 + 4*v3 -34 < 0; value: -14 + -5*v1 + 10 = 0; value: 0 0: 1 2 3 4 1: 3 4 5 2: 1 3 3: 4 optimal: oo + -4/3*v3 + 34/3 < 0; value: 26/3 + v2 + 2/3*v3 -26/3 < 0; value: -16/3 + 4/3*v3 -43/3 < 0; value: -35/3 + 2*v2 + 8/3*v3 -56/3 < 0; value: -28/3 - 6*v0 + 4*v3 -46 < 0; value: -6 - -5*v1 + 10 = 0; value: 0 0: 1 2 3 4 1: 3 4 5 2: 1 3 3: 4 1 2 3 0: 4 -> 16/3 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -3*v3 -1 <= 0; value: 0 + -3*v1 -6*v2 + 4*v3 -1 <= 0; value: -6 + -5*v0 + 4 <= 0; value: -11 + -1*v1 -4*v2 -5*v3 + 7 <= 0; value: -3 + -4*v0 + 2*v2 -3 <= 0; value: -13 0: 3 5 1: 1 2 4 2: 2 4 5 3: 1 2 4 optimal: oo + 222/19*v0 + 92/19 <= 0; value: 758/19 + -332/19*v0 -242/19 <= 0; value: -1238/19 - -3*v1 -6*v2 + 4*v3 -1 <= 0; value: 0 + -5*v0 + 4 <= 0; value: -11 - -2*v2 -19/3*v3 + 22/3 <= 0; value: 0 - -4*v0 + 2*v2 -3 <= 0; value: 0 0: 3 5 1 1: 1 2 4 2: 2 4 5 1 3: 1 2 4 0: 3 -> 3 1: 1 -> -322/19 2: 1 -> 15/2 3: 1 -> -23/19 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 + 6*v3 -23 < 0; value: -9 + -6*v0 -3*v1 -4*v2 + 39 = 0; value: 0 + -4*v1 + 2*v2 + 8 <= 0; value: -6 + 3*v1 -6*v2 + 5*v3 -2 = 0; value: 0 + -4*v0 -3*v1 -1*v2 -19 <= 0; value: -45 0: 1 2 5 1: 2 3 4 5 2: 2 3 4 5 3: 1 4 optimal: (-129/52 -e*1) + -129/52 < 0; value: -129/52 - 4*v0 + 6*v3 -23 < 0; value: -189/52 - -6*v0 -3*v1 -4*v2 + 39 = 0; value: 0 - 52/45*v0 -253/90 <= 0; value: 0 - -6*v0 -10*v2 + 5*v3 + 37 = 0; value: 0 + -2241/52 <= 0; value: -2241/52 0: 1 2 5 3 4 1: 2 3 4 5 2: 2 3 4 5 3: 1 4 3 5 0: 2 -> 253/104 1: 5 -> 53/13 2: 3 -> 633/208 3: 1 -> 167/104 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 -2*v2 -2*v3 + 12 = 0; value: 0 + 2*v0 -4 = 0; value: 0 + -6*v0 -1*v2 + 7 <= 0; value: -9 + 5*v0 + v2 + 4*v3 -60 < 0; value: -30 + -6*v2 + 2*v3 + 16 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 5 3: 1 4 5 optimal: oo + 2*v0 -2*v2 -2*v3 + 12 <= 0; value: 0 - 2*v1 -2*v2 -2*v3 + 12 = 0; value: 0 + 2*v0 -4 = 0; value: 0 + -6*v0 -1*v2 + 7 <= 0; value: -9 + 5*v0 + v2 + 4*v3 -60 < 0; value: -30 + -6*v2 + 2*v3 + 16 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 5 3: 1 4 5 0: 2 -> 2 1: 2 -> 2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + v0 -4*v2 + 1 = 0; value: 0 + v0 + v1 + v3 -8 = 0; value: 0 + -6*v0 + 10 < 0; value: -8 + -5*v0 -9 <= 0; value: -24 + -1*v0 -6*v2 + 4*v3 + 1 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 1 5 3: 2 5 optimal: oo + 21/4*v0 -63/4 <= 0; value: 0 - v0 -4*v2 + 1 = 0; value: 0 - v0 + v1 + v3 -8 = 0; value: 0 + -6*v0 + 10 < 0; value: -8 + -5*v0 -9 <= 0; value: -24 - -1*v0 -6*v2 + 4*v3 + 1 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 1 5 3: 2 5 0: 3 -> 3 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -6 + -2*v1 + 6 = 0; value: 0 + -6*v1 -4*v3 + 21 <= 0; value: -5 + -6*v1 + v2 < 0; value: -17 + -5*v1 -1*v3 -2 <= 0; value: -19 + -5*v1 -2*v2 <= 0; value: -17 0: 1: 1 2 3 4 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 -6 <= 0; value: -6 - -2*v1 + 6 = 0; value: 0 + -4*v3 + 3 <= 0; value: -5 + v2 -18 < 0; value: -17 + -1*v3 -17 <= 0; value: -19 + -2*v2 -15 <= 0; value: -17 0: 1: 1 2 3 4 5 2: 3 5 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -6*v1 -4*v2 + 1 <= 0; value: -21 + 2*v0 -4*v1 -7 <= 0; value: -1 + 6*v0 -3*v1 -4*v2 -11 = 0; value: 0 + 6*v1 -2*v2 -1 <= 0; value: -3 + v0 -6*v1 + 1 = 0; value: 0 0: 2 3 5 1: 1 2 3 4 5 2: 1 3 4 3: optimal: 37/4 + + 37/4 <= 0; value: 37/4 + -207/8 <= 0; value: -207/8 - 4/3*v0 -23/3 <= 0; value: 0 - 6*v0 -3*v1 -4*v2 -11 = 0; value: 0 + -69/16 <= 0; value: -69/16 - -11*v0 + 8*v2 + 23 = 0; value: 0 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 1 3 4 2 5 3: 0: 5 -> 23/4 1: 1 -> 9/8 2: 4 -> 161/32 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 -12 = 0; value: 0 + 4*v0 -4*v1 + 4*v2 -20 = 0; value: 0 + 3*v0 -6*v1 + 12 = 0; value: 0 + 3*v2 -17 <= 0; value: -2 + 6*v0 -6*v3 -22 <= 0; value: -4 0: 2 3 5 1: 1 2 3 2: 2 4 3: 5 optimal: 0 + <= 0; value: 0 - 3*v1 -12 = 0; value: 0 - 4*v0 + 4*v2 -36 = 0; value: 0 - -3*v2 + 15 = 0; value: 0 + -2 <= 0; value: -2 + -6*v3 + 2 <= 0; value: -4 0: 2 3 5 1: 1 2 3 2: 2 4 3 5 3: 5 0: 4 -> 4 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v3 -35 <= 0; value: -20 + v2 -3 = 0; value: 0 + -5*v0 + 1 < 0; value: -4 + -5*v2 -1*v3 + 20 = 0; value: 0 + 4*v1 -3*v2 -3 = 0; value: 0 0: 3 1: 5 2: 2 4 5 3: 1 4 optimal: oo + 2*v0 -6 <= 0; value: -4 + 3*v3 -35 <= 0; value: -20 - v2 -3 = 0; value: 0 + -5*v0 + 1 < 0; value: -4 + -1*v3 + 5 = 0; value: 0 - 4*v1 -3*v2 -3 = 0; value: 0 0: 3 1: 5 2: 2 4 5 3: 1 4 0: 1 -> 1 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + -1*v1 + 5*v3 -5 <= 0; value: 0 + v0 -6*v1 -24 <= 0; value: -53 + -3*v0 -2*v1 + 6 <= 0; value: -7 + 5*v0 + 4*v3 -13 = 0; value: 0 + -6*v0 -6*v1 -19 <= 0; value: -55 0: 2 3 4 5 1: 1 2 3 5 2: 3: 1 4 optimal: 51/19 + + 51/19 <= 0; value: 51/19 - -1*v1 + 5*v3 -5 <= 0; value: 0 + -468/19 <= 0; value: -468/19 - 19/2*v0 -33/2 <= 0; value: 0 - 5*v0 + 4*v3 -13 = 0; value: 0 + -604/19 <= 0; value: -604/19 0: 2 3 4 5 1: 1 2 3 5 2: 3: 1 4 2 3 5 0: 1 -> 33/19 1: 5 -> 15/38 2: 2 -> 2 3: 2 -> 41/38 + 2*v0 -2*v1 <= 0; value: 0 + v2 -3*v3 -2 = 0; value: 0 + -1*v2 + 5*v3 = 0; value: 0 + -4*v0 + 1 < 0; value: -3 + 2*v1 + 4*v2 -55 < 0; value: -33 + 2*v0 -1*v1 -2*v3 + 1 = 0; value: 0 0: 3 5 1: 4 5 2: 1 2 4 3: 1 2 5 optimal: (3/2 -e*1) + + 3/2 < 0; value: 3/2 - v2 -3*v3 -2 = 0; value: 0 - 2/3*v2 -10/3 = 0; value: 0 - -4*v0 + 1 < 0; value: -3/2 + -36 < 0; value: -36 - 2*v0 -1*v1 -2*v3 + 1 = 0; value: 0 0: 3 5 4 1: 4 5 2: 1 2 4 3: 1 2 5 4 0: 1 -> 5/8 1: 1 -> 1/4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -3*v1 -6*v2 -4*v3 + 43 = 0; value: 0 + -3*v0 -5*v2 -4*v3 + 34 < 0; value: -17 + -1*v1 + 4*v3 -16 < 0; value: -1 + v1 -2*v3 + 7 = 0; value: 0 + 6*v1 -1*v2 -5 < 0; value: -3 0: 2 1: 1 3 4 5 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 + 12/5*v2 -58/5 <= 0; value: 8 - -3*v1 -6*v2 -4*v3 + 43 = 0; value: 0 + -3*v0 -13/5*v2 + 42/5 < 0; value: -17 + -6/5*v2 + 19/5 < 0; value: -1 - -2*v2 -10/3*v3 + 64/3 = 0; value: 0 + -41/5*v2 + 149/5 < 0; value: -3 0: 2 1: 1 3 4 5 2: 1 2 5 3 4 3: 1 2 3 4 5 0: 5 -> 5 1: 1 -> 1 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v3 <= 0; value: 0 + 4*v0 -5*v2 -2 <= 0; value: -1 + -6*v2 + 4*v3 -2 <= 0; value: -8 + v0 + 6*v1 + 6*v3 -52 < 0; value: -24 + -1*v0 + 4 <= 0; value: 0 0: 1 2 4 5 1: 4 2: 2 3 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 4*v3 <= 0; value: 0 + 4*v0 -5*v2 -2 <= 0; value: -1 + -6*v2 + 4*v3 -2 <= 0; value: -8 + v0 + 6*v1 + 6*v3 -52 < 0; value: -24 + -1*v0 + 4 <= 0; value: 0 0: 1 2 4 5 1: 4 2: 2 3 3: 1 3 4 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 + 5*v3 -90 < 0; value: -53 + -3*v2 -3*v3 -23 < 0; value: -50 + 5*v3 -25 = 0; value: 0 + v1 <= 0; value: 0 + -1*v0 + v3 -6 < 0; value: -1 0: 5 1: 4 2: 1 2 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 + 5*v3 -90 < 0; value: -53 + -3*v2 -3*v3 -23 < 0; value: -50 + 5*v3 -25 = 0; value: 0 + v1 <= 0; value: 0 + -1*v0 + v3 -6 < 0; value: -1 0: 5 1: 4 2: 1 2 3: 1 2 3 5 0: 0 -> 0 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 8 + 3*v1 + 4*v3 -23 < 0; value: -8 + 6*v0 -5*v2 -88 < 0; value: -58 + -2*v1 -6*v2 + 2 <= 0; value: 0 + -2*v1 < 0; value: -2 + -1*v0 + 5*v2 < 0; value: -5 0: 2 5 1: 1 3 4 2: 2 3 5 3: 1 optimal: (269/9 -e*1) + + 269/9 < 0; value: 269/9 + 4*v3 -23 < 0; value: -11 - 6*v0 -269/3 < 0; value: -6 - -2*v1 -6*v2 + 2 <= 0; value: 0 - 6*v2 -2 < 0; value: -1 + -239/18 < 0; value: -239/18 0: 2 5 1: 1 3 4 2: 2 3 5 4 1 3: 1 0: 5 -> 251/18 1: 1 -> 1/2 2: 0 -> 1/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v3 -6 = 0; value: 0 + 6*v0 -4*v2 -52 <= 0; value: -32 + -5*v2 + 5*v3 -5 = 0; value: 0 + -1*v0 + 3*v3 -5 <= 0; value: -3 + -1*v1 + 4*v2 -1*v3 -2 < 0; value: -5 0: 2 4 1: 5 2: 2 3 5 3: 1 3 4 5 optimal: (56/3 -e*1) + + 56/3 < 0; value: 56/3 - 3*v3 -6 = 0; value: 0 - 6*v0 -56 <= 0; value: 0 - -5*v2 + 5 = 0; value: 0 + -25/3 <= 0; value: -25/3 - -1*v1 + 4*v2 -1*v3 -2 < 0; value: -1 0: 2 4 1: 5 2: 2 3 5 3: 1 3 4 5 0: 4 -> 28/3 1: 5 -> 1 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 -6*v1 + 9 <= 0; value: -6 + -4*v1 + 2*v2 + 2 = 0; value: 0 + 3*v2 -6 < 0; value: -3 + 2*v0 + v2 -19 <= 0; value: -12 + -1*v2 + 1 <= 0; value: 0 0: 1 4 1: 1 2 2: 2 3 4 5 3: optimal: 16 + + 16 <= 0; value: 16 + -24 <= 0; value: -24 - -4*v1 + 2*v2 + 2 = 0; value: 0 + -3 < 0; value: -3 - 2*v0 -18 <= 0; value: 0 - -1*v2 + 1 <= 0; value: 0 0: 1 4 1: 1 2 2: 2 3 4 5 1 3: 0: 3 -> 9 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v2 -2*v3 -16 < 0; value: -10 + 3*v0 + 6*v2 + 5*v3 -121 <= 0; value: -72 + -3*v0 -6*v1 + v3 + 1 = 0; value: 0 + -2*v1 <= 0; value: 0 + -2*v1 -6*v2 + 18 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 2 5 3: 1 2 3 optimal: 12 + + 12 <= 0; value: 12 + -38 < 0; value: -38 - 18*v0 + 6*v2 -126 <= 0; value: 0 - -3*v0 -6*v1 + v3 + 1 = 0; value: 0 - v0 -1/3*v3 -1/3 <= 0; value: 0 - -6*v2 + 18 = 0; value: 0 0: 1 2 3 4 5 1: 3 4 5 2: 1 2 5 3: 1 2 3 4 5 0: 2 -> 6 1: 0 -> 0 2: 3 -> 3 3: 5 -> 17 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -6*v2 -6 <= 0; value: -14 + v0 -6*v1 -2*v2 + 16 = 0; value: 0 + 2*v0 + 6*v1 + 3*v3 -46 <= 0; value: -15 + 3*v0 + 6*v3 -106 < 0; value: -70 + -2*v0 + 2*v3 -6 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 2: 1 2 3: 3 4 5 optimal: oo + 5/3*v0 + 2/3*v2 -16/3 <= 0; value: 0 + 5*v0 -6*v2 -6 <= 0; value: -14 - v0 -6*v1 -2*v2 + 16 = 0; value: 0 + 3*v0 -2*v2 + 3*v3 -30 <= 0; value: -15 + 3*v0 + 6*v3 -106 < 0; value: -70 + -2*v0 + 2*v3 -6 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 2: 1 2 3 3: 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 10 + 5*v0 -6*v3 -7 = 0; value: 0 + 3*v2 + v3 -15 = 0; value: 0 + 6*v1 <= 0; value: 0 + -2*v1 -3*v2 -5*v3 -7 <= 0; value: -34 + -1*v0 + 3*v2 -3*v3 + 2 <= 0; value: 0 0: 1 5 1: 3 4 2: 2 4 5 3: 1 2 4 5 optimal: oo + 16/3*v0 + 52/3 <= 0; value: 44 - 5*v0 -6*v3 -7 = 0; value: 0 - 5/6*v0 + 3*v2 -97/6 = 0; value: 0 + -10*v0 -52 <= 0; value: -102 - -2*v1 -3*v2 -5*v3 -7 <= 0; value: 0 + -13/3*v0 + 65/3 <= 0; value: 0 0: 1 5 2 3 1: 3 4 2: 2 4 5 3 3: 1 2 4 5 3 0: 5 -> 5 1: 0 -> -17 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -5*v3 + 1 < 0; value: -14 + -2*v0 -2*v1 + 14 = 0; value: 0 + v1 + 3*v2 -26 <= 0; value: -9 + -4*v0 + 5*v1 + 5*v2 -15 = 0; value: 0 + 3*v1 -2*v3 <= 0; value: 0 0: 2 4 1: 2 3 4 5 2: 3 4 3: 1 5 optimal: 156/11 + + 156/11 <= 0; value: 156/11 + -5*v3 + 1 < 0; value: -14 - -2*v0 -2*v1 + 14 = 0; value: 0 - 22/9*v2 -191/9 <= 0; value: 0 - -9*v0 + 5*v2 + 20 = 0; value: 0 + -2*v3 -3/22 <= 0; value: -135/22 0: 2 4 3 5 1: 2 3 4 5 2: 3 4 5 3: 1 5 0: 5 -> 155/22 1: 2 -> -1/22 2: 5 -> 191/22 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + 6*v0 -5*v3 -4 < 0; value: -14 + -1*v0 + 3*v2 -14 <= 0; value: -5 + 5*v2 -4*v3 -16 < 0; value: -9 + 4*v1 + 3*v3 -60 <= 0; value: -38 + -1*v1 -4*v2 + 2 <= 0; value: -14 0: 1 2 1: 4 5 2: 2 3 5 3: 1 3 4 optimal: (2304/47 -e*1) + + 2304/47 < 0; value: 2304/47 - 47/5*v3 -152/5 <= 0; value: 0 - -1*v0 + 3*v2 -14 <= 0; value: 0 - 5/3*v0 -4*v3 + 22/3 < 0; value: -5/3 + -6340/47 < 0; value: -6340/47 - -1*v1 -4*v2 + 2 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 2 3 5 4 3: 1 3 4 0: 0 -> 111/47 1: 4 -> -2794/141 2: 3 -> 769/141 3: 2 -> 152/47 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 -4*v1 -2 = 0; value: 0 + 6*v1 + 5*v2 -12 = 0; value: 0 + 2*v2 <= 0; value: 0 + 6*v3 -14 <= 0; value: -8 + -5*v0 -2*v1 -21 <= 0; value: -50 0: 1 5 1: 1 2 5 2: 2 3 3: 4 optimal: oo + -5/3*v2 + 6 <= 0; value: 6 - 2*v0 -4*v1 -2 = 0; value: 0 - 3*v0 + 5*v2 -15 = 0; value: 0 + 2*v2 <= 0; value: 0 + 6*v3 -14 <= 0; value: -8 + 10*v2 -50 <= 0; value: -50 0: 1 5 2 1: 1 2 5 2: 2 3 5 3: 4 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -3*v3 <= 0; value: -1 + 4*v2 -25 < 0; value: -13 + 6*v2 + 4*v3 -30 = 0; value: 0 + -2*v0 + 4*v1 = 0; value: 0 + 6*v0 + 2*v3 -22 < 0; value: -4 0: 1 4 5 1: 4 2: 2 3 3: 1 3 5 optimal: (33/13 -e*1) + + 33/13 < 0; value: 33/13 - 4*v0 -3*v3 <= 0; value: 0 + -547/39 < 0; value: -547/39 - 6*v2 + 4*v3 -30 = 0; value: 0 - -2*v0 + 4*v1 = 0; value: 0 - -39/4*v2 + 107/4 < 0; value: -5/4 0: 1 4 5 1: 4 2: 2 3 5 3: 1 3 5 0: 2 -> 249/104 1: 1 -> 249/208 2: 3 -> 112/39 3: 3 -> 83/26 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 + 2*v1 + 12 = 0; value: 0 + -3*v0 + 6 = 0; value: 0 + -1*v0 -2*v2 -3*v3 + 10 = 0; value: 0 + -6*v0 -1*v2 + 13 = 0; value: 0 + -6*v0 -4*v3 -12 <= 0; value: -32 0: 1 2 3 4 5 1: 1 2: 3 4 3: 3 5 optimal: 4 + + 4 <= 0; value: 4 - -6*v0 + 2*v1 + 12 = 0; value: 0 - -3*v0 + 6 = 0; value: 0 + -2*v2 -3*v3 + 8 = 0; value: 0 + -1*v2 + 1 = 0; value: 0 + -4*v3 -24 <= 0; value: -32 0: 1 2 3 4 5 1: 1 2: 3 4 3: 3 5 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + v0 + 6*v1 -1*v2 <= 0; value: -1 + 3*v0 + 4*v2 + 2*v3 -78 < 0; value: -45 + 2*v0 -1*v2 -6*v3 + 22 = 0; value: 0 + -5*v2 + v3 -1 <= 0; value: -17 + -5*v1 + 2*v3 -18 < 0; value: -10 0: 1 2 3 1: 1 5 2: 1 2 3 4 3: 2 3 4 5 optimal: (294/11 -e*1) + + 294/11 < 0; value: 294/11 - 16/5*v0 -2188/55 < 0; value: -16/5 - 11/3*v0 + 11/3*v2 -212/3 < 0; value: -11/3 - 2*v0 -1*v2 -6*v3 + 22 = 0; value: 0 + -2511/88 <= 0; value: -2511/88 - -5*v1 + 2*v3 -18 < 0; value: -703/264 0: 1 2 3 4 1: 1 5 2: 1 2 3 4 3: 2 3 4 5 1 0: 3 -> 503/44 1: 0 -> -703/1320 2: 4 -> 301/44 3: 4 -> 1673/264 + 2*v0 -2*v1 <= 0; value: 2 + 4*v1 -4*v3 -12 = 0; value: 0 + 3*v2 -5*v3 -6 = 0; value: 0 + 5*v1 + 6*v2 -3*v3 -35 < 0; value: -8 + 2*v0 + 5*v3 -8 = 0; value: 0 + 2*v0 -18 < 0; value: -10 0: 4 5 1: 1 3 2: 2 3 3: 1 2 3 4 optimal: (16 -e*1) + + 16 < 0; value: 16 - 4*v1 -4*v3 -12 = 0; value: 0 - 3*v2 -5*v3 -6 = 0; value: 0 + -32 < 0; value: -32 - 2*v0 + 3*v2 -14 = 0; value: 0 - 2*v0 -18 < 0; value: -2 0: 4 5 3 1: 1 3 2: 2 3 4 3: 1 2 3 4 0: 4 -> 8 1: 3 -> 7/5 2: 2 -> -2/3 3: 0 -> -8/5 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 -3*v2 -4*v3 -3 <= 0; value: -30 + 4*v0 -5*v2 + 2*v3 + 17 = 0; value: 0 + 4*v0 -4*v3 -8 = 0; value: 0 + 3*v0 + 3*v1 -3*v3 -15 = 0; value: 0 + 6*v0 + 4*v1 -5*v2 + 1 <= 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -6 <= 0; value: -2 + -38/5*v0 -74/5 <= 0; value: -30 - 4*v0 -5*v2 + 2*v3 + 17 = 0; value: 0 - 12*v0 -10*v2 + 26 = 0; value: 0 - 3*v0 + 3*v1 -3*v3 -15 = 0; value: 0 + <= 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 1 2 5 3 3: 1 2 3 4 5 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -2*v1 -4*v3 -2 = 0; value: 0 + 2*v1 -23 <= 0; value: -13 + 5*v0 -5*v3 -11 <= 0; value: -6 + -5*v1 + v2 + v3 + 13 <= 0; value: -5 + 2*v2 + 2*v3 -39 < 0; value: -25 0: 1 3 1: 1 2 4 2: 4 5 3: 1 3 4 5 optimal: oo + 16/11*v0 -4/11*v2 -50/11 <= 0; value: -2/11 - 6*v0 -2*v1 -4*v3 -2 = 0; value: 0 + 6/11*v0 + 4/11*v2 -203/11 <= 0; value: -163/11 + -20/11*v0 + 5/11*v2 -31/11 <= 0; value: -91/11 - -15*v0 + v2 + 11*v3 + 18 <= 0; value: 0 + 30/11*v0 + 20/11*v2 -465/11 < 0; value: -265/11 0: 1 3 4 2 5 1: 1 2 4 2: 4 5 3 2 3: 1 3 4 5 2 0: 4 -> 4 1: 5 -> 45/11 2: 4 -> 4 3: 3 -> 38/11 + 2*v0 -2*v1 <= 0; value: -8 + -6*v2 + 5*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + -4*v0 + 4*v2 + 4 <= 0; value: 0 + v0 -5*v1 + 2*v3 -17 <= 0; value: -41 + 6*v1 -5*v2 -34 <= 0; value: -4 0: 3 4 1: 4 5 2: 1 3 5 3: 1 2 4 optimal: oo + 20/3*v2 + 238/3 <= 0; value: 238/3 + -6*v2 <= 0; value: 0 - -4*v3 <= 0; value: 0 + -38/3*v2 -532/3 <= 0; value: -532/3 - v0 -5*v1 + 2*v3 -17 <= 0; value: 0 - 6/5*v0 -5*v2 -272/5 <= 0; value: 0 0: 3 4 5 1: 4 5 2: 1 3 5 3: 1 2 4 5 0: 1 -> 136/3 1: 5 -> 17/3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 3*v1 -4*v2 -11 = 0; value: 0 + -1*v1 + 5*v3 -15 = 0; value: 0 + -5*v2 + 3 <= 0; value: -2 + 6*v1 -54 <= 0; value: -24 + -2*v1 + 4*v2 + 6 = 0; value: 0 0: 1: 1 2 4 5 2: 1 3 5 3: 2 optimal: oo + 2*v0 -10 <= 0; value: -6 - 3*v1 -4*v2 -11 = 0; value: 0 + 5*v3 -20 = 0; value: 0 + -2 <= 0; value: -2 + -24 <= 0; value: -24 - 4/3*v2 -4/3 = 0; value: 0 0: 1: 1 2 4 5 2: 1 3 5 2 4 3: 2 0: 2 -> 2 1: 5 -> 5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 3*v3 -15 = 0; value: 0 + 6*v0 + v1 -4*v2 -92 <= 0; value: -61 + -4*v1 -1*v2 + 3*v3 -14 < 0; value: -3 + 3*v1 -4 <= 0; value: -1 + -2*v0 + 1 < 0; value: -9 0: 2 5 1: 2 3 4 2: 1 2 3 3: 1 3 optimal: (539/13 -e*1) + + 539/13 < 0; value: 539/13 - -4*v2 + 3*v3 -15 = 0; value: 0 - 6*v0 -13/4*v2 -367/4 < 0; value: -13/4 - -4*v1 -1*v2 + 3*v3 -14 < 0; value: -4 + -841/13 < 0; value: -841/13 - -2*v0 + 1 < 0; value: -2 0: 2 5 4 1: 2 3 4 2: 1 2 3 4 3: 1 3 2 4 0: 5 -> 3/2 1: 1 -> -889/52 2: 0 -> -318/13 3: 5 -> -359/13 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v3 -1 <= 0; value: -4 + 2*v0 -21 <= 0; value: -13 + 6*v0 + 3*v2 + 6*v3 -47 <= 0; value: -2 + v1 -2*v3 <= 0; value: -1 + 3*v2 + 5*v3 -43 < 0; value: -24 0: 2 3 1: 1 4 2: 3 5 3: 1 3 4 5 optimal: 67/3 + + 67/3 <= 0; value: 67/3 - -3*v1 + 3*v3 -1 <= 0; value: 0 - -1*v2 -14/3 <= 0; value: 0 - 6*v0 + 3*v2 -49 <= 0; value: 0 - -1*v3 -1/3 <= 0; value: 0 + -176/3 < 0; value: -176/3 0: 2 3 1: 1 4 2: 3 5 2 3: 1 3 4 5 0: 4 -> 21/2 1: 3 -> -2/3 2: 3 -> -14/3 3: 2 -> -1/3 + 2*v0 -2*v1 <= 0; value: -2 + 6*v1 + 2*v2 -3*v3 -24 <= 0; value: -12 + 6*v1 -6*v3 -5 <= 0; value: -11 + 6*v1 + 2*v3 -26 = 0; value: 0 + -1*v0 -2*v1 + v2 + 5 = 0; value: 0 + 6*v1 + 2*v2 + 2*v3 -76 < 0; value: -44 0: 4 1: 1 2 3 4 5 2: 1 4 5 3: 1 2 3 5 optimal: oo + 3*v0 -1*v2 -5 <= 0; value: -2 + -15/2*v0 + 19/2*v2 -51/2 <= 0; value: -12 + -12*v0 + 12*v2 -23 <= 0; value: -11 - 6*v1 + 2*v3 -26 = 0; value: 0 - -1*v0 + v2 + 2/3*v3 -11/3 = 0; value: 0 + 2*v2 -50 < 0; value: -44 0: 4 1 2 1: 1 2 3 4 5 2: 1 4 5 2 3: 1 2 3 5 4 0: 2 -> 2 1: 3 -> 3 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + v2 -2 <= 0; value: -1 + -3*v0 + 4*v1 -3*v3 -3 <= 0; value: -10 + 6*v2 + 6*v3 -65 <= 0; value: -29 + 6*v2 -9 <= 0; value: -3 + 3*v3 -28 <= 0; value: -13 0: 2 1: 2 2: 1 3 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + v2 -2 <= 0; value: -1 + -3*v0 + 4*v1 -3*v3 -3 <= 0; value: -10 + 6*v2 + 6*v3 -65 <= 0; value: -29 + 6*v2 -9 <= 0; value: -3 + 3*v3 -28 <= 0; value: -13 0: 2 1: 2 2: 1 3 4 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -4*v3 < 0; value: -8 + 3*v0 + 6*v3 -36 = 0; value: 0 + 6*v0 + 3*v2 + 5*v3 -71 <= 0; value: -25 + -2*v1 -1*v3 + 7 <= 0; value: 0 + v0 + 2*v3 -12 = 0; value: 0 0: 1 2 3 5 1: 4 2: 3 3: 1 2 3 4 5 optimal: (7/2 -e*1) + + 7/2 < 0; value: 7/2 - 8*v0 -24 < 0; value: -4 - 3*v0 + 6*v3 -36 = 0; value: 0 + 3*v2 -61/2 <= 0; value: -43/2 - -2*v1 -1*v3 + 7 <= 0; value: 0 + = 0; value: 0 0: 1 2 3 5 1: 4 2: 3 3: 1 2 3 4 5 0: 2 -> 5/2 1: 1 -> 9/8 2: 3 -> 3 3: 5 -> 19/4 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 3*v1 + 9 <= 0; value: 0 + 3*v1 -1*v2 -3*v3 + 1 = 0; value: 0 + -4*v1 -1*v3 + 3 < 0; value: -21 + -2*v3 -3 <= 0; value: -11 + <= 0; value: 0 0: 1 1: 1 2 3 2: 2 3: 2 3 4 optimal: oo + 2*v0 -2/15*v2 -16/15 < 0; value: 32/5 + -6*v0 + 1/5*v2 + 53/5 < 0; value: -63/5 - 3*v1 -1*v2 -3*v3 + 1 = 0; value: 0 - -4/3*v2 -5*v3 + 13/3 < 0; value: -5 + 8/15*v2 -71/15 <= 0; value: -13/5 + <= 0; value: 0 0: 1 1: 1 2 3 2: 2 3 1 4 3: 2 3 4 1 0: 4 -> 4 1: 5 -> 9/5 2: 4 -> 4 3: 4 -> 4/5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 -1*v3 -25 <= 0; value: -6 + -3*v0 + 6*v2 -12 = 0; value: 0 + 3*v0 -31 <= 0; value: -19 + 3*v1 + 6*v2 -93 <= 0; value: -60 + 6*v0 -66 < 0; value: -42 0: 2 3 5 1: 4 2: 1 2 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 -1*v3 -25 <= 0; value: -6 + -3*v0 + 6*v2 -12 = 0; value: 0 + 3*v0 -31 <= 0; value: -19 + 3*v1 + 6*v2 -93 <= 0; value: -60 + 6*v0 -66 < 0; value: -42 0: 2 3 5 1: 4 2: 1 2 4 3: 1 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -4*v2 + 6 <= 0; value: -2 + v0 + 6*v1 + 4*v3 -11 = 0; value: 0 + -3*v2 < 0; value: -6 + -6*v1 + 6 <= 0; value: 0 + 6*v1 -6*v3 -15 <= 0; value: -9 0: 2 1: 2 4 5 2: 1 3 3: 2 5 optimal: 20 + + 20 <= 0; value: 20 + -4*v2 + 6 <= 0; value: -2 - v0 + 6*v1 + 4*v3 -11 = 0; value: 0 + -3*v2 < 0; value: -6 - v0 + 4*v3 -5 <= 0; value: 0 - 3/2*v0 -33/2 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 1 3 3: 2 5 4 0: 5 -> 11 1: 1 -> 1 2: 2 -> 2 3: 0 -> -3/2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 2*v2 -5*v3 -2 <= 0; value: -13 + v0 -1 = 0; value: 0 + -3*v1 + 2 <= 0; value: -4 + 3*v0 + v3 -8 <= 0; value: 0 + -2*v1 + 5*v2 -32 <= 0; value: -16 0: 1 2 4 1: 3 5 2: 1 5 3: 1 4 optimal: 2/3 + + 2/3 <= 0; value: 2/3 + 2*v2 -5*v3 + 4 <= 0; value: -13 - v0 -1 = 0; value: 0 - -3*v1 + 2 <= 0; value: 0 + v3 -5 <= 0; value: 0 + 5*v2 -100/3 <= 0; value: -40/3 0: 1 2 4 1: 3 5 2: 1 5 3: 1 4 0: 1 -> 1 1: 2 -> 2/3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -9 < 0; value: -3 + -1*v2 + 6*v3 -4 < 0; value: -9 + -5*v2 + 1 <= 0; value: -24 + 3*v3 <= 0; value: 0 + -4*v0 + 5*v1 <= 0; value: -1 0: 5 1: 1 5 2: 2 3 3: 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -9 < 0; value: -3 + -1*v2 + 6*v3 -4 < 0; value: -9 + -5*v2 + 1 <= 0; value: -24 + 3*v3 <= 0; value: 0 + -4*v0 + 5*v1 <= 0; value: -1 0: 5 1: 1 5 2: 2 3 3: 2 4 0: 4 -> 4 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 4*v1 -1*v2 + 4 = 0; value: 0 + -6*v0 + 6*v3 -3 <= 0; value: -9 + -2*v0 + 5*v3 -11 < 0; value: -4 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 2 <= 0; value: -2 0: 2 3 4 5 1: 1 2: 1 3: 2 3 optimal: oo + 2*v0 -1/2*v2 + 2 <= 0; value: 8 - 4*v1 -1*v2 + 4 = 0; value: 0 + -6*v0 + 6*v3 -3 <= 0; value: -9 + -2*v0 + 5*v3 -11 < 0; value: -4 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 2 <= 0; value: -2 0: 2 3 4 5 1: 1 2: 1 3: 2 3 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 <= 0; value: 0 + 2*v0 -2*v1 -1*v2 -9 <= 0; value: -3 + 3*v0 -2*v3 -27 < 0; value: -16 + -6*v3 + 4 < 0; value: -8 + -6*v0 -2*v2 -34 <= 0; value: -72 0: 2 3 5 1: 1 2 2: 2 5 3: 3 4 optimal: oo + 4/3*v3 + 18 < 0; value: 62/3 - -1*v1 <= 0; value: 0 - 2*v0 -1*v2 -9 <= 0; value: 0 - 3/2*v2 -2*v3 -27/2 < 0; value: -3/2 + -6*v3 + 4 < 0; value: -8 + -20/3*v3 -106 < 0; value: -358/3 0: 2 3 5 1: 1 2 2: 2 5 3 3: 3 4 5 0: 5 -> 59/6 1: 0 -> 0 2: 4 -> 32/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -6*v2 -5*v3 + 13 <= 0; value: -5 + 4*v0 = 0; value: 0 + 3*v1 + 5*v2 -64 <= 0; value: -34 + -2*v0 + 3*v2 -9 = 0; value: 0 + = 0; value: 0 0: 2 4 1: 3 2: 1 3 4 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + -6*v2 -5*v3 + 13 <= 0; value: -5 + 4*v0 = 0; value: 0 + 3*v1 + 5*v2 -64 <= 0; value: -34 + -2*v0 + 3*v2 -9 = 0; value: 0 + = 0; value: 0 0: 2 4 1: 3 2: 1 3 4 3: 1 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + v1 -6*v3 + 4 <= 0; value: -4 + 4*v1 -1*v3 -18 <= 0; value: -4 + v2 + v3 -18 < 0; value: -11 + -6*v2 -5*v3 -39 < 0; value: -79 + -4*v1 -6*v3 -1 <= 0; value: -29 0: 1: 1 2 5 2: 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 + 883/2 < 0; value: 891/2 + -4395/4 < 0; value: -4395/4 + -1048 < 0; value: -1048 - v2 + v3 -18 < 0; value: -1 - -1*v2 -129 < 0; value: -1 - -4*v1 -6*v3 -1 <= 0; value: 0 0: 1: 1 2 5 2: 3 4 1 2 3: 1 2 3 4 5 0: 2 -> 2 1: 4 -> -871/4 2: 5 -> -128 3: 2 -> 145 + 2*v0 -2*v1 <= 0; value: 4 + -3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 + 6*v3 -17 <= 0; value: -2 + -6*v2 -1*v3 + 8 <= 0; value: -15 + -6*v0 + 2*v1 -6 <= 0; value: -26 + 6*v0 -4*v1 -16 = 0; value: 0 0: 4 5 1: 4 5 2: 1 2 3 3: 1 2 3 optimal: 38/3 + + 38/3 <= 0; value: 38/3 + -3*v2 + 6*v3 -21 = 0; value: 0 + -5*v2 + 6*v3 -17 <= 0; value: -2 + -6*v2 -1*v3 + 8 <= 0; value: -15 - -3*v0 -14 <= 0; value: 0 - 6*v0 -4*v1 -16 = 0; value: 0 0: 4 5 1: 4 5 2: 1 2 3 3: 1 2 3 0: 4 -> -14/3 1: 2 -> -11 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 + 3*v2 + 5*v3 -71 < 0; value: -38 + 3*v1 -6*v2 + 6 = 0; value: 0 + 2*v0 + 6*v1 -66 < 0; value: -38 + 4*v1 -46 <= 0; value: -30 + v0 + 3*v1 -6*v2 + 4 = 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 1 2 5 3: 1 optimal: oo + 2*v0 -4*v2 + 4 <= 0; value: -4 + 2*v0 + 3*v2 + 5*v3 -71 < 0; value: -38 - 3*v1 -6*v2 + 6 = 0; value: 0 + 2*v0 + 12*v2 -78 < 0; value: -38 + 8*v2 -54 <= 0; value: -30 + v0 -2 = 0; value: 0 0: 1 3 5 1: 2 3 4 5 2: 1 2 5 3 4 3: 1 0: 2 -> 2 1: 4 -> 4 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 + 4*v3 <= 0; value: -1 + 3*v2 -3*v3 -9 = 0; value: 0 + -5*v1 -3*v3 -12 <= 0; value: -40 + -5*v0 + 3*v1 -21 <= 0; value: -11 + -1*v0 -3*v1 -3 <= 0; value: -19 0: 1 4 5 1: 3 4 5 2: 2 3: 1 2 3 optimal: oo + 24/5*v2 -6/5 <= 0; value: 18 + -5*v2 -6 <= 0; value: -26 - 3*v2 -3*v3 -9 = 0; value: 0 - 5/3*v0 -3*v3 -7 <= 0; value: 0 + -54/5*v2 -84/5 <= 0; value: -60 - -1*v0 -3*v1 -3 <= 0; value: 0 0: 1 4 5 3 1: 3 4 5 2: 2 1 4 3: 1 2 3 4 0: 1 -> 6 1: 5 -> -3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 -1*v3 -3 < 0; value: -10 + 3*v1 + v2 -5 <= 0; value: 0 + 2*v0 + 2*v2 -6 < 0; value: -2 + -5*v2 + 3*v3 -6 <= 0; value: -1 + -4*v1 + v3 -1 = 0; value: 0 0: 3 1: 2 5 2: 1 2 3 4 3: 1 4 5 optimal: (173/16 -e*1) + + 173/16 < 0; value: 173/16 - -1*v2 -1*v3 -3 < 0; value: -1 + -271/32 < 0; value: -271/32 - 2*v0 + 2*v2 -6 < 0; value: -2 - 8*v0 -39 < 0; value: -8 - -4*v1 + v3 -1 = 0; value: 0 0: 3 2 4 1: 2 5 2: 1 2 3 4 3: 1 4 5 2 0: 0 -> 31/8 1: 1 -> -9/32 2: 2 -> -15/8 3: 5 -> -1/8 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v3 <= 0; value: -9 + 4*v0 + 3*v2 -8 <= 0; value: -5 + v0 + 5*v1 + 3*v3 -26 < 0; value: -12 + 4*v2 + 4*v3 -41 < 0; value: -25 + -3*v0 + 3*v1 -8 <= 0; value: -5 0: 1 2 3 5 1: 3 5 2: 2 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -3*v3 <= 0; value: -9 + 4*v0 + 3*v2 -8 <= 0; value: -5 + v0 + 5*v1 + 3*v3 -26 < 0; value: -12 + 4*v2 + 4*v3 -41 < 0; value: -25 + -3*v0 + 3*v1 -8 <= 0; value: -5 0: 1 2 3 5 1: 3 5 2: 2 4 3: 1 3 4 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 6 + -6*v0 + 4*v2 + 2*v3 + 2 <= 0; value: -6 + 6*v0 + v1 -4*v3 -20 = 0; value: 0 + -3*v0 + 1 <= 0; value: -14 + v3 -6 < 0; value: -3 + v2 -6*v3 -5 <= 0; value: -19 0: 1 2 3 1: 2 2: 1 5 3: 1 2 4 5 optimal: oo + 14*v0 -4/3*v2 -100/3 <= 0; value: 94/3 + -6*v0 + 13/3*v2 + 1/3 <= 0; value: -37/3 - 6*v0 + v1 -4*v3 -20 = 0; value: 0 + -3*v0 + 1 <= 0; value: -14 + 1/6*v2 -41/6 < 0; value: -37/6 - v2 -6*v3 -5 <= 0; value: 0 0: 1 2 3 1: 2 2: 1 5 4 3: 1 2 4 5 0: 5 -> 5 1: 2 -> -32/3 2: 4 -> 4 3: 3 -> -1/6 + 2*v0 -2*v1 <= 0; value: 6 + 5*v1 -6*v2 -1*v3 -6 < 0; value: -17 + -3*v2 -4*v3 + 22 = 0; value: 0 + -2*v0 + 4*v1 -1 <= 0; value: -5 + 2*v2 + 5*v3 -48 < 0; value: -24 + -3*v1 + 3*v2 -4 <= 0; value: -1 0: 3 1: 1 3 5 2: 1 2 4 5 3: 1 2 4 optimal: oo + 2*v0 + 548/21 < 0; value: 716/21 + -320/21 <= 0; value: -320/21 - -3*v2 -4*v3 + 22 = 0; value: 0 + -2*v0 -1117/21 < 0; value: -1285/21 - 7/3*v3 -100/3 < 0; value: -7/3 - -3*v1 + 3*v2 -4 <= 0; value: 0 0: 3 1: 1 3 5 2: 1 2 4 5 3 3: 1 2 4 3 0: 4 -> 4 1: 1 -> -82/7 2: 2 -> -218/21 3: 4 -> 93/7 + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v3 -25 <= 0; value: -14 + -3*v2 + 9 = 0; value: 0 + -6*v2 + 5*v3 + 1 < 0; value: -7 + -1*v0 <= 0; value: 0 + 4*v3 -9 < 0; value: -1 0: 4 1: 1 2: 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v1 + 3*v3 -25 <= 0; value: -14 + -3*v2 + 9 = 0; value: 0 + -6*v2 + 5*v3 + 1 < 0; value: -7 + -1*v0 <= 0; value: 0 + 4*v3 -9 < 0; value: -1 0: 4 1: 1 2: 2 3 3: 1 3 5 0: 0 -> 0 1: 1 -> 1 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 10 + -6*v2 + 5*v3 -25 <= 0; value: -16 + -4*v0 + 2*v2 -8 <= 0; value: -26 + 5*v0 -5*v2 -1*v3 -17 = 0; value: 0 + v2 -1 <= 0; value: 0 + 5*v1 <= 0; value: 0 0: 2 3 1: 5 2: 1 2 3 4 3: 1 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -6*v2 + 5*v3 -25 <= 0; value: -16 + -4*v0 + 2*v2 -8 <= 0; value: -26 + 5*v0 -5*v2 -1*v3 -17 = 0; value: 0 + v2 -1 <= 0; value: 0 + 5*v1 <= 0; value: 0 0: 2 3 1: 5 2: 1 2 3 4 3: 1 3 0: 5 -> 5 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -4*v3 + 12 <= 0; value: -8 + v1 -4*v2 + v3 -5 <= 0; value: -3 + -2*v0 + v2 + 9 = 0; value: 0 + 2*v0 -3*v1 -13 <= 0; value: -6 + -3*v2 -6*v3 + 21 <= 0; value: -12 0: 3 4 1: 2 4 2: 2 3 5 3: 1 2 5 optimal: oo + 1/3*v2 + 35/3 <= 0; value: 12 + -4*v3 + 12 <= 0; value: -8 + -11/3*v2 + v3 -19/3 <= 0; value: -5 - -2*v0 + v2 + 9 = 0; value: 0 - 2*v0 -3*v1 -13 <= 0; value: 0 + -3*v2 -6*v3 + 21 <= 0; value: -12 0: 3 4 2 1: 2 4 2: 2 3 5 3: 1 2 5 0: 5 -> 5 1: 1 -> -1 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + 5*v1 -32 <= 0; value: -13 + -4*v1 -1*v3 + 2 <= 0; value: -11 + 6*v0 -2*v3 -10 = 0; value: 0 + -1*v1 + 3*v2 + 2 <= 0; value: -1 + 4*v2 + 5*v3 -14 <= 0; value: -9 0: 1 3 1: 1 2 4 2: 4 5 3: 2 3 5 optimal: 19/3 + + 19/3 <= 0; value: 19/3 + -169/6 <= 0; value: -169/6 - -12*v2 -1*v3 -6 <= 0; value: 0 - 6*v0 -2*v3 -10 = 0; value: 0 - -1*v1 + 3*v2 + 2 <= 0; value: 0 - 14*v0 -118/3 <= 0; value: 0 0: 1 3 5 1: 1 2 4 2: 4 5 2 1 3: 2 3 5 1 0: 2 -> 59/21 1: 3 -> -5/14 2: 0 -> -11/14 3: 1 -> 24/7 + 2*v0 -2*v1 <= 0; value: -4 + 6*v3 -16 <= 0; value: -10 + v0 + v1 -2 <= 0; value: 0 + -6*v2 + 25 < 0; value: -5 + -6*v0 + 5*v1 -28 < 0; value: -18 + 2*v0 + 3*v2 -35 < 0; value: -20 0: 2 4 5 1: 2 4 2: 3 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v3 -16 <= 0; value: -10 + v0 + v1 -2 <= 0; value: 0 + -6*v2 + 25 < 0; value: -5 + -6*v0 + 5*v1 -28 < 0; value: -18 + 2*v0 + 3*v2 -35 < 0; value: -20 0: 2 4 5 1: 2 4 2: 3 5 3: 1 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 -5*v3 + 14 < 0; value: -14 + -5*v1 -6*v2 + 34 = 0; value: 0 + -5*v3 -18 <= 0; value: -38 + -2*v0 -3*v2 -2*v3 -1 <= 0; value: -27 + = 0; value: 0 0: 4 1: 1 2 2: 2 4 3: 1 3 4 optimal: oo + 2*v0 + 5/2*v3 -7 < 0; value: 9 - 24/5*v2 -5*v3 -66/5 < 0; value: -24/5 - -5*v1 -6*v2 + 34 = 0; value: 0 + -5*v3 -18 <= 0; value: -38 + -2*v0 -41/8*v3 -37/4 < 0; value: -143/4 + = 0; value: 0 0: 4 1: 1 2 2: 2 4 1 3: 1 3 4 0: 3 -> 3 1: 2 -> -3/10 2: 4 -> 71/12 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 -4*v3 + 1 < 0; value: -15 + 5*v0 + 3*v3 -20 <= 0; value: -6 + -3*v1 -6*v3 + 19 <= 0; value: -5 + -1*v2 + 4*v3 -17 <= 0; value: -5 + -2*v1 + 4 = 0; value: 0 0: 2 1: 1 3 5 2: 4 3: 1 2 3 4 optimal: 7/5 + + 7/5 <= 0; value: 7/5 + -35/3 < 0; value: -35/3 - 5*v0 + 3*v3 -20 <= 0; value: 0 - -6*v3 + 13 <= 0; value: 0 + -1*v2 -25/3 <= 0; value: -25/3 - -2*v1 + 4 = 0; value: 0 0: 2 1: 1 3 5 2: 4 3: 1 2 3 4 0: 1 -> 27/10 1: 2 -> 2 2: 0 -> 0 3: 3 -> 13/6 + 2*v0 -2*v1 <= 0; value: -2 + -1*v3 <= 0; value: 0 + -6*v0 -3*v1 + 2 <= 0; value: -1 + 4*v2 -22 < 0; value: -14 + -1*v0 + 3*v1 -3 = 0; value: 0 + 2*v1 -6*v3 -4 <= 0; value: -2 0: 2 4 1: 2 4 5 2: 3 3: 1 5 optimal: oo + 12*v3 + 2 <= 0; value: 2 + -1*v3 <= 0; value: 0 + -63*v3 -22 <= 0; value: -22 + 4*v2 -22 < 0; value: -14 - -1*v0 + 3*v1 -3 = 0; value: 0 - 2/3*v0 -6*v3 -2 <= 0; value: 0 0: 2 4 5 1: 2 4 5 2: 3 3: 1 5 2 0: 0 -> 3 1: 1 -> 2 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + 3*v3 -13 = 0; value: 0 + -3*v2 + 6*v3 -24 = 0; value: 0 + -1*v1 -4*v3 + 22 = 0; value: 0 + 2*v3 -14 <= 0; value: -4 + 3*v2 -1*v3 -1 <= 0; value: 0 0: 1: 1 3 2: 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -4 <= 0; value: 0 - -1*v1 + 3*v3 -13 = 0; value: 0 - -3*v2 + 6*v3 -24 = 0; value: 0 - -7/2*v2 + 7 = 0; value: 0 + -4 <= 0; value: -4 + <= 0; value: 0 0: 1: 1 3 2: 2 5 3 4 3: 1 2 3 4 5 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 4*v3 -6 <= 0; value: -2 + -4*v1 + v2 + 2 <= 0; value: -10 + 5*v0 -4*v3 + 1 <= 0; value: -3 + -5*v2 + 4*v3 + 16 = 0; value: 0 + 2*v3 -3 < 0; value: -1 0: 3 1: 2 2: 2 4 3: 1 3 4 5 optimal: (-6/5 -e*1) + -6/5 < 0; value: -6/5 + <= 0; value: 0 - -4*v1 + v2 + 2 <= 0; value: 0 - 5*v0 -4*v3 + 1 <= 0; value: 0 - -5*v2 + 4*v3 + 16 = 0; value: 0 - 5/2*v0 -5/2 < 0; value: -5/4 0: 3 1 5 1: 2 2: 2 4 3: 1 3 4 5 0: 0 -> 1/2 1: 4 -> 59/40 2: 4 -> 39/10 3: 1 -> 7/8 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v2 -2 <= 0; value: 0 + 2*v0 + 3*v3 -12 <= 0; value: -3 + 5*v1 + 2*v2 -15 < 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -1*v3 -2 < 0; value: -5 0: 1 2 1: 1 3 2: 1 3 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 + 5*v1 -1*v2 -2 <= 0; value: 0 + 2*v0 + 3*v3 -12 <= 0; value: -3 + 5*v1 + 2*v2 -15 < 0; value: -4 + -6*v3 + 18 = 0; value: 0 + -1*v3 -2 < 0; value: -5 0: 1 2 1: 1 3 2: 1 3 3: 2 4 5 0: 0 -> 0 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 + 5*v2 + 4*v3 -78 <= 0; value: -47 + 5*v0 + 5*v3 -20 <= 0; value: 0 + -5*v0 + 6*v1 -35 < 0; value: -23 + 3*v3 -14 <= 0; value: -2 + -1*v0 -6*v2 + 10 <= 0; value: -8 0: 1 2 3 5 1: 3 2: 1 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -1*v0 + 5*v2 + 4*v3 -78 <= 0; value: -47 + 5*v0 + 5*v3 -20 <= 0; value: 0 + -5*v0 + 6*v1 -35 < 0; value: -23 + 3*v3 -14 <= 0; value: -2 + -1*v0 -6*v2 + 10 <= 0; value: -8 0: 1 2 3 5 1: 3 2: 1 5 3: 1 2 4 0: 0 -> 0 1: 2 -> 2 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -6*v2 + 3*v3 + 9 = 0; value: 0 + -3*v1 -2*v2 + 12 = 0; value: 0 + 4*v0 -3*v2 -5*v3 -17 <= 0; value: -11 + 5*v0 -4*v2 -17 <= 0; value: -4 + -5*v3 + 5 = 0; value: 0 0: 3 4 1: 1 2 2: 1 2 3 4 3: 1 3 5 optimal: 38/5 + + 38/5 <= 0; value: 38/5 - 3*v1 -6*v2 + 3*v3 + 9 = 0; value: 0 - -8*v2 + 24 = 0; value: 0 + -39/5 <= 0; value: -39/5 - 5*v0 -29 <= 0; value: 0 - -5*v3 + 5 = 0; value: 0 0: 3 4 1: 1 2 2: 1 2 3 4 3: 1 3 5 2 0: 5 -> 29/5 1: 2 -> 2 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6 <= 0; value: 0 + -3*v0 + 4*v1 + 6*v3 -9 <= 0; value: -2 + -5*v0 + 6*v1 -24 <= 0; value: -15 + v0 + 5*v1 -37 <= 0; value: -14 + -4*v2 + 7 <= 0; value: -5 0: 1 2 3 4 1: 2 3 4 2: 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6 <= 0; value: 0 + -3*v0 + 4*v1 + 6*v3 -9 <= 0; value: -2 + -5*v0 + 6*v1 -24 <= 0; value: -15 + v0 + 5*v1 -37 <= 0; value: -14 + -4*v2 + 7 <= 0; value: -5 0: 1 2 3 4 1: 2 3 4 2: 5 3: 2 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 3*v3 -53 <= 0; value: -34 + -2*v0 -4*v2 -3*v3 + 17 = 0; value: 0 + -4*v0 -3*v2 + 11 = 0; value: 0 + = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 2: 2 3 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 + 3*v3 -53 <= 0; value: -34 + -2*v0 -4*v2 -3*v3 + 17 = 0; value: 0 + -4*v0 -3*v2 + 11 = 0; value: 0 + = 0; value: 0 + <= 0; value: 0 0: 1 2 3 1: 2: 2 3 3: 1 2 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -6*v0 -5*v2 + v3 -25 <= 0; value: -73 + -2*v0 -2*v1 -2 < 0; value: -10 + -2*v0 -5*v1 + 8 = 0; value: 0 + -2*v0 -1 <= 0; value: -9 + -5*v2 + 25 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 1 5 3: 1 optimal: oo + 14/5*v0 -16/5 <= 0; value: 8 + -6*v0 -5*v2 + v3 -25 <= 0; value: -73 + -6/5*v0 -26/5 < 0; value: -10 - -2*v0 -5*v1 + 8 = 0; value: 0 + -2*v0 -1 <= 0; value: -9 + -5*v2 + 25 = 0; value: 0 0: 1 2 3 4 1: 2 3 2: 1 5 3: 1 0: 4 -> 4 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 + v1 + 1 <= 0; value: 0 + -2*v0 -6*v1 + 23 < 0; value: -3 + 3*v2 -3*v3 + 9 = 0; value: 0 + 4*v2 -3*v3 + 9 = 0; value: 0 + 5*v1 -4*v2 -37 < 0; value: -22 0: 1 2 1: 1 2 5 2: 3 4 5 3: 3 4 optimal: oo + 8/3*v0 -23/3 < 0; value: 3 + -4/3*v0 + 29/6 < 0; value: -1/2 - -2*v0 -6*v1 + 23 < 0; value: -3/2 + 3*v2 -3*v3 + 9 = 0; value: 0 + 4*v2 -3*v3 + 9 = 0; value: 0 + -5/3*v0 -4*v2 -107/6 < 0; value: -49/2 0: 1 2 5 1: 1 2 5 2: 3 4 5 3: 3 4 0: 4 -> 4 1: 3 -> 11/4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4 < 0; value: -2 + -5*v0 -6*v3 -2 <= 0; value: -37 + 3*v0 -2*v2 + 6 <= 0; value: -1 + -1*v1 -6*v2 -3*v3 + 8 <= 0; value: -37 + -6*v1 + 5*v3 -73 <= 0; value: -48 0: 1 2 3 1: 4 5 2: 3 4 3: 2 4 5 optimal: (95/3 -e*1) + + 95/3 < 0; value: 95/3 - 4/3*v2 -8 < 0; value: -2/3 - -5*v0 -6*v3 -2 <= 0; value: 0 - 3*v0 -2*v2 + 6 <= 0; value: 0 + -49/6 < 0; value: -49/6 - -6*v1 + 5*v3 -73 <= 0; value: 0 0: 1 2 3 4 1: 4 5 2: 3 4 1 3: 2 4 5 0: 1 -> 5/3 1: 0 -> -1469/108 2: 5 -> 11/2 3: 5 -> -31/18 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v2 + 3*v3 -34 <= 0; value: -20 + -6*v0 -6*v2 + 2 <= 0; value: -4 + -4*v2 -1 <= 0; value: -5 + = 0; value: 0 + -5*v0 -2*v3 + 4 < 0; value: -4 0: 1 2 5 1: 2: 1 2 3 3: 1 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v2 + 3*v3 -34 <= 0; value: -20 + -6*v0 -6*v2 + 2 <= 0; value: -4 + -4*v2 -1 <= 0; value: -5 + = 0; value: 0 + -5*v0 -2*v3 + 4 < 0; value: -4 0: 1 2 5 1: 2: 1 2 3 3: 1 5 0: 0 -> 0 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -6*v2 + 16 <= 0; value: -4 + -6*v0 + 3*v2 + 5*v3 -60 < 0; value: -35 + -4*v1 + 4*v2 < 0; value: -4 + -4*v0 + 4*v2 -1*v3 -3 = 0; value: 0 + v0 + 6*v2 -45 <= 0; value: -19 0: 1 2 4 5 1: 3 2: 1 2 3 4 5 3: 2 4 optimal: (68/9 -e*1) + + 68/9 < 0; value: 68/9 - -4*v0 -3/2*v3 + 23/2 <= 0; value: 0 + -1718/9 < 0; value: -1718/9 - -4*v1 + 4*v2 < 0; value: -16/9 - -4*v0 + 4*v2 -1*v3 -3 = 0; value: 0 - 3*v0 -29 <= 0; value: 0 0: 1 2 4 5 1: 3 2: 1 2 3 4 5 3: 2 4 1 5 0: 2 -> 29/3 1: 5 -> 19/3 2: 4 -> 53/9 3: 5 -> -163/9 + 2*v0 -2*v1 <= 0; value: -6 + 2*v2 -10 < 0; value: -4 + -6*v0 -2*v1 -6*v2 + 8 <= 0; value: -32 + -1*v0 < 0; value: -2 + -1*v2 + 1 < 0; value: -2 + 3*v2 -9 = 0; value: 0 0: 2 3 1: 2 2: 1 2 4 5 3: optimal: oo + 8*v0 + 10 <= 0; value: 26 + -4 < 0; value: -4 - -6*v0 -2*v1 -6*v2 + 8 <= 0; value: 0 + -1*v0 < 0; value: -2 + -2 < 0; value: -2 - 3*v2 -9 = 0; value: 0 0: 2 3 1: 2 2: 1 2 4 5 3: 0: 2 -> 2 1: 5 -> -11 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 6*v3 + 1 <= 0; value: -2 + 4*v0 -6*v3 -8 = 0; value: 0 + v0 -1*v1 -3 = 0; value: 0 + 5*v1 -4*v2 -2 = 0; value: 0 + 4*v2 + 2*v3 -13 <= 0; value: -1 0: 1 2 3 1: 3 4 2: 4 5 3: 1 2 5 optimal: 6 + + 6 <= 0; value: 6 + -3*v0 + 6*v3 + 1 <= 0; value: -2 + 4*v0 -6*v3 -8 = 0; value: 0 - v0 -1*v1 -3 = 0; value: 0 + 5*v0 -4*v2 -17 = 0; value: 0 + 4*v2 + 2*v3 -13 <= 0; value: -1 0: 1 2 3 4 1: 3 4 2: 4 5 3: 1 2 5 0: 5 -> 5 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 + 2*v3 + 2 <= 0; value: 0 + -6*v0 + 2*v1 + 12 = 0; value: 0 + 4*v0 + 6*v3 -32 <= 0; value: -12 + -6*v0 -6*v2 + 42 = 0; value: 0 + -2*v0 -3*v3 + 10 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 4 3: 1 3 5 optimal: 4 + + 4 <= 0; value: 4 - -3*v0 + 2*v3 + 2 <= 0; value: 0 - -6*v0 + 2*v1 + 12 = 0; value: 0 + -12 <= 0; value: -12 + -6*v2 + 30 = 0; value: 0 - -13/3*v3 + 26/3 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 4 3: 1 3 5 4 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 4*v2 + 2*v3 -14 <= 0; value: -8 + -3*v0 + 3*v3 <= 0; value: 0 + -6*v2 + v3 -3 <= 0; value: 0 + 6*v2 <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -14 0: 2 1: 5 2: 1 3 4 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 4*v2 + 2*v3 -14 <= 0; value: -8 + -3*v0 + 3*v3 <= 0; value: 0 + -6*v2 + v3 -3 <= 0; value: 0 + 6*v2 <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -14 0: 2 1: 5 2: 1 3 4 5 3: 1 2 3 0: 3 -> 3 1: 5 -> 5 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -6*v0 -2*v2 + 25 < 0; value: -3 + 6*v0 -3*v2 -1*v3 + 2 = 0; value: 0 + 2*v0 -11 <= 0; value: -5 + 2*v0 + 4*v1 -26 = 0; value: 0 + -4*v0 + 5*v1 -26 <= 0; value: -13 0: 1 2 3 4 5 1: 4 5 2: 1 2 3: 2 optimal: 7/2 + + 7/2 <= 0; value: 7/2 + -2*v2 -8 < 0; value: -18 - 6*v0 -3*v2 -1*v3 + 2 = 0; value: 0 - v2 + 1/3*v3 -35/3 <= 0; value: 0 - 2*v0 + 4*v1 -26 = 0; value: 0 + -117/4 <= 0; value: -117/4 0: 1 2 3 4 5 1: 4 5 2: 1 2 3 5 3: 2 3 1 5 0: 3 -> 11/2 1: 5 -> 15/4 2: 5 -> 5 3: 5 -> 20 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 3*v1 -32 = 0; value: 0 + -5*v1 + 20 = 0; value: 0 + -5*v0 -16 <= 0; value: -41 + -2*v0 + 4*v1 + 5*v2 -6 <= 0; value: 0 + 3*v1 -6*v2 -6*v3 -3 < 0; value: -9 0: 1 3 4 1: 1 2 4 5 2: 4 5 3: 5 optimal: 2 + + 2 <= 0; value: 2 - 4*v0 + 3*v1 -32 = 0; value: 0 - 20/3*v0 -100/3 = 0; value: 0 + -41 <= 0; value: -41 + 5*v2 <= 0; value: 0 + -6*v2 -6*v3 + 9 < 0; value: -9 0: 1 3 4 2 5 1: 1 2 4 5 2: 4 5 3: 5 0: 5 -> 5 1: 4 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 = 0; value: 0 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 2*v1 -2*v3 <= 0; value: 0 + 3*v2 -1*v3 -28 <= 0; value: -17 + -6*v0 + v3 -1 = 0; value: 0 0: 1 5 1: 2 3 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 = 0; value: 0 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 2*v1 -2*v3 <= 0; value: 0 + 3*v2 -1*v3 -28 <= 0; value: -17 + -6*v0 + v3 -1 = 0; value: 0 0: 1 5 1: 2 3 2: 2 4 3: 3 4 5 0: 0 -> 0 1: 1 -> 1 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -17 < 0; value: -11 + -4*v0 -5*v2 + 3*v3 + 10 = 0; value: 0 + <= 0; value: 0 + 3*v1 -3*v3 = 0; value: 0 + -3*v1 -2*v2 + 5 = 0; value: 0 0: 1 2 1: 4 5 2: 2 5 3: 2 4 optimal: (412/63 -e*1) + + 412/63 < 0; value: 412/63 - 3*v0 -17 < 0; value: -3 - -4*v0 -5*v2 + 3*v3 + 10 = 0; value: 0 + <= 0; value: 0 - 3*v1 -3*v3 = 0; value: 0 - -4*v0 -7*v2 + 15 = 0; value: 0 0: 1 2 5 1: 4 5 2: 2 5 3: 2 4 5 0: 2 -> 14/3 1: 1 -> 127/63 2: 1 -> -11/21 3: 1 -> 127/63 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 -1*v2 + 2 <= 0; value: 0 + 6*v1 -2*v2 + 2 = 0; value: 0 + -6*v0 -2*v1 + v2 -6 <= 0; value: -16 + -4*v0 -6 <= 0; value: -14 + 3*v0 + v2 + 4*v3 -69 <= 0; value: -39 0: 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 optimal: oo + -8/3*v3 + 124/3 <= 0; value: 28 - -1/3*v2 + 4/3 <= 0; value: 0 - 6*v1 -2*v2 + 2 = 0; value: 0 + 8*v3 -134 <= 0; value: -94 + 16/3*v3 -278/3 <= 0; value: -66 - 3*v0 + 4*v3 -65 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 3 4 0: 2 -> 15 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 + 4*v3 -46 < 0; value: -19 + -4*v2 + 3*v3 + 2 <= 0; value: -1 + v1 -2 <= 0; value: -1 + 2*v0 -3*v3 + 3 <= 0; value: -2 + 4*v3 -12 = 0; value: 0 0: 4 1: 3 2: 1 2 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v2 + 4*v3 -46 < 0; value: -19 + -4*v2 + 3*v3 + 2 <= 0; value: -1 + v1 -2 <= 0; value: -1 + 2*v0 -3*v3 + 3 <= 0; value: -2 + 4*v3 -12 = 0; value: 0 0: 4 1: 3 2: 1 2 3: 1 2 4 5 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -5*v2 + v3 <= 0; value: -1 + -2*v1 -5*v2 + 3*v3 -5 < 0; value: -20 + 6*v1 -6*v2 <= 0; value: 0 + 3*v2 + 3*v3 -35 <= 0; value: -20 + -4*v1 -4*v2 + 23 <= 0; value: -1 0: 1: 1 2 3 5 2: 1 2 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v3 + 71/6 <= 0; value: 83/6 + 10*v3 -82 <= 0; value: -62 + 6*v3 -103/2 < 0; value: -79/2 + 12*v3 -211/2 <= 0; value: -163/2 - 3*v2 + 3*v3 -35 <= 0; value: 0 - -4*v1 -4*v2 + 23 <= 0; value: 0 0: 1: 1 2 3 5 2: 1 2 3 4 5 3: 1 2 4 3 0: 3 -> 3 1: 3 -> -47/12 2: 3 -> 29/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + v1 -20 < 0; value: -13 + 2*v0 -2*v1 -1 < 0; value: -3 + -2*v2 -3*v3 -18 <= 0; value: -38 + 6*v1 -3*v2 -6 = 0; value: 0 + 6*v2 -4*v3 -16 < 0; value: -8 0: 1 2 1: 1 2 4 2: 3 4 5 3: 3 5 optimal: (1 -e*1) + + 1 < 0; value: 1 + 3*v0 -41/2 < 0; value: -29/2 - 2*v0 -1*v2 -3 < 0; value: -1 + -4*v0 -3*v3 -12 <= 0; value: -32 - 6*v1 -3*v2 -6 = 0; value: 0 + 12*v0 -4*v3 -34 < 0; value: -26 0: 1 2 3 5 1: 1 2 4 2: 3 4 5 2 1 3: 3 5 0: 2 -> 2 1: 3 -> 2 2: 4 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 5*v2 -2*v3 <= 0; value: -8 + -3*v1 + 5*v2 + 6 <= 0; value: -3 + -2*v2 + 3*v3 -35 <= 0; value: -23 + 3*v2 = 0; value: 0 + v1 + v2 -1*v3 + 1 <= 0; value: 0 0: 1: 2 5 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + -2*v3 <= 0; value: -8 - -3*v1 + 5*v2 + 6 <= 0; value: 0 + 3*v3 -35 <= 0; value: -23 - 3*v2 = 0; value: 0 + -1*v3 + 3 <= 0; value: -1 0: 1: 2 5 2: 1 2 3 4 5 3: 1 3 5 0: 0 -> 0 1: 3 -> 2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v1 + 6*v3 -3 = 0; value: 0 + 3*v0 + 6*v2 -33 = 0; value: 0 + -4*v0 -3*v2 + 9 <= 0; value: -10 + -5*v2 + 8 < 0; value: -17 + 5*v0 -1*v2 + v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2: 2 3 4 5 3: 1 5 optimal: oo + -1*v0 -6*v3 + 3 <= 0; value: 2 - 3*v0 -2*v1 + 6*v3 -3 = 0; value: 0 + 3*v0 + 6*v2 -33 = 0; value: 0 + -4*v0 -3*v2 + 9 <= 0; value: -10 + -5*v2 + 8 < 0; value: -17 + 5*v0 -1*v2 + v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2: 2 3 4 5 3: 1 5 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 3*v1 + 3 <= 0; value: 0 + -2*v2 -3 <= 0; value: -7 + 6*v0 + 4*v3 -17 < 0; value: -11 + 2*v1 -5*v2 -2*v3 + 5 < 0; value: -3 + 4*v1 + 3*v3 -4 = 0; value: 0 0: 1 3 1: 1 4 5 2: 2 4 3: 3 4 5 optimal: (33/7 -e*1) + + 33/7 < 0; value: 33/7 - -21/8*v0 -57/16 < 0; value: -21/8 + -2*v2 -3 <= 0; value: -7 - 6*v0 + 4*v3 -17 < 0; value: -4 + -5*v2 -15 < 0; value: -25 - 4*v1 + 3*v3 -4 = 0; value: 0 0: 1 3 4 1: 1 4 5 2: 2 4 3: 3 4 5 1 0: 1 -> -5/14 1: 1 -> -103/56 2: 2 -> 2 3: 0 -> 53/14 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 6 <= 0; value: -6 + 6*v1 -5*v2 -2 <= 0; value: -1 + -5*v0 + 5*v1 -1*v2 + 3 <= 0; value: -8 + 5*v0 + 6*v1 -47 <= 0; value: -26 + -1*v0 + 6*v1 + 2*v2 -5 = 0; value: 0 0: 1 3 4 5 1: 2 3 4 5 2: 2 3 5 3: optimal: oo + 5/3*v0 + 2/3*v2 -5/3 <= 0; value: 4 + -4*v0 + 6 <= 0; value: -6 + v0 -7*v2 + 3 <= 0; value: -1 + -25/6*v0 -8/3*v2 + 43/6 <= 0; value: -8 + 6*v0 -2*v2 -42 <= 0; value: -26 - -1*v0 + 6*v1 + 2*v2 -5 = 0; value: 0 0: 1 3 4 5 2 1: 2 3 4 5 2: 2 3 5 4 3: 0: 3 -> 3 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -4*v1 <= 0; value: -2 + v1 -2*v3 < 0; value: -4 + 2*v0 -5*v2 -11 <= 0; value: -30 + -2*v3 + 6 = 0; value: 0 + 6*v1 -1*v3 -23 <= 0; value: -14 0: 1 3 1: 1 2 5 2: 3 3: 2 4 5 optimal: 26/3 + + 26/3 <= 0; value: 26/3 - 2*v0 -4*v1 <= 0; value: 0 + -5/3 < 0; value: -5/3 + -5*v2 + 19/3 <= 0; value: -56/3 - -2*v3 + 6 = 0; value: 0 - 3*v0 -1*v3 -23 <= 0; value: 0 0: 1 3 2 5 1: 1 2 5 2: 3 3: 2 4 5 3 0: 3 -> 26/3 1: 2 -> 13/3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -1*v1 -4*v3 + 12 < 0; value: -5 + v2 + 3*v3 -32 <= 0; value: -12 + -5*v0 + 5*v3 -23 < 0; value: -3 + -4*v0 + 2*v2 -12 <= 0; value: -6 + 6*v0 -4*v3 -4 < 0; value: -18 0: 1 3 4 5 1: 1 2: 2 4 3: 1 2 3 5 optimal: (64/5 -e*1) + + 64/5 < 0; value: 64/5 - 5*v0 -1*v1 -4*v3 + 12 < 0; value: -1 + 3*v0 + v2 -91/5 <= 0; value: -51/5 - -5*v0 + 5*v3 -23 < 0; value: -3/2 + -4*v0 + 2*v2 -12 <= 0; value: -6 + 2*v0 -112/5 < 0; value: -102/5 0: 1 3 4 5 2 1: 1 2: 2 4 3: 1 2 3 5 0: 1 -> 1 1: 2 -> -16/5 2: 5 -> 5 3: 5 -> 53/10 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 4*v1 -6 = 0; value: 0 + 5*v1 + 5*v3 -25 = 0; value: 0 + -6*v0 -1*v3 -11 <= 0; value: -26 + 3*v1 -6 = 0; value: 0 + 2*v0 + 4*v1 -12 <= 0; value: 0 0: 1 3 5 1: 1 2 4 5 2: 3: 2 3 optimal: 0 + <= 0; value: 0 - -1*v0 + 4*v1 -6 = 0; value: 0 + 5*v3 -15 = 0; value: 0 + -1*v3 -23 <= 0; value: -26 + = 0; value: 0 - 3*v0 -6 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 4 5 2: 3: 2 3 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + 5*v2 -4*v3 -11 = 0; value: 0 + -1*v2 -1*v3 + 4 <= 0; value: 0 + v0 + 3*v1 -44 <= 0; value: -29 + -6*v2 -3*v3 + 12 < 0; value: -9 + v0 -6*v3 -5 < 0; value: -11 0: 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + 5*v2 -4*v3 -11 = 0; value: 0 + -1*v2 -1*v3 + 4 <= 0; value: 0 + v0 + 3*v1 -44 <= 0; value: -29 + -6*v2 -3*v3 + 12 < 0; value: -9 + v0 -6*v3 -5 < 0; value: -11 0: 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 0: 0 -> 0 1: 5 -> 5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -41 <= 0; value: -21 + -6*v0 + 2*v1 -4*v2 + 40 = 0; value: 0 + 3*v1 -5*v2 -1 < 0; value: -11 + 6*v2 -2*v3 -37 <= 0; value: -15 + -3*v0 + 6*v1 + 5*v3 -70 <= 0; value: -35 0: 1 2 5 1: 2 3 5 2: 2 3 4 3: 4 5 optimal: oo + -4*v0 -4*v2 + 40 <= 0; value: 0 + 4*v0 -41 <= 0; value: -21 - -6*v0 + 2*v1 -4*v2 + 40 = 0; value: 0 + 9*v0 + v2 -61 < 0; value: -11 + 6*v2 -2*v3 -37 <= 0; value: -15 + 15*v0 + 12*v2 + 5*v3 -190 <= 0; value: -35 0: 1 2 5 3 1: 2 3 5 2: 2 3 4 5 3: 4 5 0: 5 -> 5 1: 5 -> 5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 -4*v2 + 21 <= 0; value: -1 + 5*v2 -20 = 0; value: 0 + -5*v0 + 5*v2 -14 <= 0; value: -4 + 6*v2 -6*v3 -49 < 0; value: -31 + v0 -6*v1 -5*v2 + 23 <= 0; value: -13 0: 3 5 1: 1 5 2: 1 2 3 4 5 3: 4 optimal: 19 + + 19 <= 0; value: 19 - -2*v1 -4*v2 + 21 <= 0; value: 0 - 5*v2 -20 = 0; value: 0 + -54 <= 0; value: -54 + -6*v3 -25 < 0; value: -31 - v0 -12 <= 0; value: 0 0: 3 5 1: 1 5 2: 1 2 3 4 5 3: 4 0: 2 -> 12 1: 3 -> 5/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -10 <= 0; value: -35 + -5*v2 + 25 = 0; value: 0 + 6*v0 + 2*v1 -23 < 0; value: -15 + -3*v0 <= 0; value: 0 + -3*v2 -1*v3 -11 <= 0; value: -30 0: 1 3 4 1: 3 2: 1 2 5 3: 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 -5*v2 -10 <= 0; value: -35 + -5*v2 + 25 = 0; value: 0 + 6*v0 + 2*v1 -23 < 0; value: -15 + -3*v0 <= 0; value: 0 + -3*v2 -1*v3 -11 <= 0; value: -30 0: 1 3 4 1: 3 2: 1 2 5 3: 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -2*v1 <= 0; value: 0 + -5*v2 + 20 = 0; value: 0 + 2*v1 -1*v2 -6 = 0; value: 0 + -5*v0 -6*v2 + v3 -19 <= 0; value: -51 + -6*v2 -3*v3 + 14 < 0; value: -16 0: 1 4 1: 1 3 2: 2 3 4 5 3: 4 5 optimal: -6 + -6 <= 0; value: -6 - 5*v0 -2*v1 <= 0; value: 0 - -5*v2 + 20 = 0; value: 0 - 5*v0 -1*v2 -6 = 0; value: 0 + v3 -53 <= 0; value: -51 + -3*v3 -10 < 0; value: -16 0: 1 4 3 1: 1 3 2: 2 3 4 5 3: 4 5 0: 2 -> 2 1: 5 -> 5 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 4*v1 -27 <= 0; value: -10 + 3*v1 -1*v3 -6 <= 0; value: 0 + 3*v0 + 4*v2 + 2*v3 -25 = 0; value: 0 + -3*v0 -1*v1 + 3*v2 -6 = 0; value: 0 + 2*v1 -6*v2 + v3 + 5 <= 0; value: -10 0: 1 3 4 1: 1 2 4 5 2: 3 4 5 3: 2 3 5 optimal: oo + 61/2*v0 -9/2 <= 0; value: 26 + -52*v0 -18 <= 0; value: -70 + -195/4*v0 -25/4 <= 0; value: -55 - 3*v0 + 4*v2 + 2*v3 -25 = 0; value: 0 - -3*v0 -1*v1 + 3*v2 -6 = 0; value: 0 - -6*v0 + v3 -7 <= 0; value: 0 0: 1 3 4 2 5 1: 1 2 4 5 2: 3 4 5 1 2 3: 2 3 5 1 0: 1 -> 1 1: 3 -> -12 2: 4 -> -1 3: 3 -> 13 + 2*v0 -2*v1 <= 0; value: -2 + -5*v1 -5*v2 + 9 <= 0; value: -21 + 3*v0 -7 < 0; value: -4 + 3*v2 -2*v3 -7 <= 0; value: -1 + -5*v2 -6*v3 + 38 = 0; value: 0 + 4*v0 + 4*v3 -47 <= 0; value: -31 0: 2 5 1: 1 2: 1 3 4 3: 3 4 5 optimal: (997/105 -e*1) + + 997/105 < 0; value: 997/105 - -5*v1 -5*v2 + 9 <= 0; value: 0 - 3*v0 -7 < 0; value: -2 - -28/5*v3 + 79/5 <= 0; value: 0 - -5*v2 -6*v3 + 38 = 0; value: 0 + -554/21 <= 0; value: -554/21 0: 2 5 1: 1 2: 1 3 4 3: 3 4 5 0: 1 -> 5/3 1: 2 -> -169/70 2: 4 -> 59/14 3: 3 -> 79/28 + 2*v0 -2*v1 <= 0; value: 6 + 5*v3 -13 < 0; value: -3 + -3*v2 + 6 = 0; value: 0 + 5*v1 -6*v3 -5 < 0; value: -12 + 6*v2 + 3*v3 -44 <= 0; value: -26 + v1 + 2*v2 -5 = 0; value: 0 0: 1: 3 5 2: 2 4 5 3: 1 3 4 optimal: oo + 2*v0 -2 <= 0; value: 6 + 5*v3 -13 < 0; value: -3 - -3*v2 + 6 = 0; value: 0 + -6*v3 < 0; value: -12 + 3*v3 -32 <= 0; value: -26 - v1 + 2*v2 -5 = 0; value: 0 0: 1: 3 5 2: 2 4 5 3 3: 1 3 4 0: 4 -> 4 1: 1 -> 1 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -3*v3 -6 < 0; value: -21 + -1*v2 <= 0; value: -3 + 3*v1 -6*v2 -5*v3 + 5 <= 0; value: -29 + 2*v1 + v3 -29 <= 0; value: -18 + 4*v1 -6*v3 + 1 <= 0; value: -17 0: 1: 3 4 5 2: 2 3 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -3*v3 -6 < 0; value: -21 + -1*v2 <= 0; value: -3 + 3*v1 -6*v2 -5*v3 + 5 <= 0; value: -29 + 2*v1 + v3 -29 <= 0; value: -18 + 4*v1 -6*v3 + 1 <= 0; value: -17 0: 1: 3 4 5 2: 2 3 3: 1 3 4 5 0: 4 -> 4 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 6*v2 -43 <= 0; value: -25 + 3*v0 + 3*v1 -32 <= 0; value: -17 + 5*v1 + v2 -18 <= 0; value: -4 + 3*v1 + v2 -16 < 0; value: -6 + -1*v0 + 3 = 0; value: 0 0: 1 2 5 1: 2 3 4 2: 1 3 4 3: optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 6*v2 -43 <= 0; value: -25 + 3*v0 + 3*v1 -32 <= 0; value: -17 + 5*v1 + v2 -18 <= 0; value: -4 + 3*v1 + v2 -16 < 0; value: -6 + -1*v0 + 3 = 0; value: 0 0: 1 2 5 1: 2 3 4 2: 1 3 4 3: 0: 3 -> 3 1: 2 -> 2 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 5*v2 -37 <= 0; value: -17 + -4*v0 -2*v2 -6 <= 0; value: -18 + 3*v0 -4*v2 + 5*v3 -4 < 0; value: -17 + -3*v3 <= 0; value: 0 + -1*v0 -1*v1 + 5 <= 0; value: -1 0: 2 3 5 1: 5 2: 1 2 3 3: 3 4 optimal: (174/5 -e*1) + + 174/5 < 0; value: 174/5 - 5*v2 -37 <= 0; value: 0 + -328/5 < 0; value: -328/5 - 3*v0 -4*v2 + 5*v3 -4 < 0; value: -3 - -3*v3 <= 0; value: 0 - -1*v0 -1*v1 + 5 <= 0; value: 0 0: 2 3 5 1: 5 2: 1 2 3 3: 3 4 2 0: 1 -> 51/5 1: 5 -> -26/5 2: 4 -> 37/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -4*v1 + 2*v2 -23 < 0; value: -13 + 6*v1 -2*v2 -1 <= 0; value: -11 + 5*v1 + 6*v2 + v3 -73 <= 0; value: -39 + -2*v0 -5*v1 + 10 <= 0; value: 0 + -3*v1 + 6*v2 + 2*v3 -39 <= 0; value: -1 0: 4 1: 1 2 3 4 5 2: 1 2 3 5 3: 3 5 optimal: oo + -7/2*v2 + 201/4 < 0; value: 131/4 - -6*v2 -8/3*v3 + 29 < 0; value: -8/3 + v2 -71/2 < 0; value: -61/2 + 25/4*v2 -727/8 < 0; value: -477/8 - -2*v0 -5*v1 + 10 <= 0; value: 0 - 6/5*v0 + 6*v2 + 2*v3 -45 <= 0; value: 0 0: 4 1 5 2 3 1: 1 2 3 4 5 2: 1 2 3 5 3: 3 5 1 2 0: 5 -> 275/24 1: 0 -> -31/12 2: 5 -> 5 3: 4 -> 5/8 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 6*v1 -6 = 0; value: 0 + 4*v1 + v3 -7 = 0; value: 0 + v2 + 6*v3 -46 <= 0; value: -25 + 6*v2 + 5*v3 -85 <= 0; value: -52 + v1 + v2 + 3*v3 -13 = 0; value: 0 0: 1 1: 1 2 5 2: 3 4 5 3: 2 3 4 5 optimal: 84/13 + + 84/13 <= 0; value: 84/13 - 5*v0 + 6*v1 -6 = 0; value: 0 - -10/3*v0 + v3 -3 = 0; value: 0 - -13/11*v2 -236/11 <= 0; value: 0 + -1826/13 <= 0; value: -1826/13 - v2 + 11/4*v3 -45/4 = 0; value: 0 0: 1 2 5 1: 1 2 5 2: 3 4 5 3: 2 3 4 5 0: 0 -> 30/13 1: 1 -> -12/13 2: 3 -> -236/13 3: 3 -> 139/13 + 2*v0 -2*v1 <= 0; value: -2 + -6*v1 -28 < 0; value: -58 + -3*v0 + 3*v3 + 9 <= 0; value: 0 + 2*v0 + 4*v2 -19 <= 0; value: -3 + 6*v0 + 3*v3 -27 = 0; value: 0 + -2*v0 + v2 -4 <= 0; value: -10 0: 2 3 4 5 1: 1 2: 3 5 3: 2 4 optimal: oo + -4*v2 + 85/3 < 0; value: 61/3 - -6*v1 -28 < 0; value: -6 + 18*v2 -99/2 <= 0; value: -27/2 - 4*v2 -1*v3 -10 <= 0; value: 0 - 6*v0 + 3*v3 -27 = 0; value: 0 + 5*v2 -23 <= 0; value: -13 0: 2 3 4 5 1: 1 2: 3 5 2 3: 2 4 3 5 0: 4 -> 11/2 1: 5 -> -11/3 2: 2 -> 2 3: 1 -> -2 + 2*v0 -2*v1 <= 0; value: -4 + -6*v3 -3 <= 0; value: -9 + 5*v0 -5*v1 + 3*v3 -3 <= 0; value: -10 + -4*v0 + 4*v2 -6*v3 -3 < 0; value: -9 + -1*v1 + 4*v2 -1 < 0; value: -3 + 4*v2 <= 0; value: 0 0: 2 3 1: 2 4 2: 3 4 5 3: 1 2 3 optimal: (9/5 -e*1) + + 9/5 < 0; value: 9/5 - 4*v0 -4*v2 <= 0; value: 0 - 5*v0 -5*v1 + 3*v3 -3 <= 0; value: 0 - -4*v0 + 4*v2 -6*v3 -3 < 0; value: -9/2 + 3*v0 -1/10 <= 0; value: -1/10 + 4*v0 <= 0; value: 0 0: 2 3 4 1 5 1: 2 4 2: 3 4 5 1 3: 1 2 3 4 0: 0 -> 0 1: 2 -> -9/20 2: 0 -> 0 3: 1 -> 1/4 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 + 5*v2 -9 < 0; value: -4 + 3*v2 -1*v3 -7 < 0; value: -4 + 6*v1 -52 <= 0; value: -28 + 2*v0 + 5*v2 -14 <= 0; value: -9 + -3*v1 + 2 < 0; value: -10 0: 1 4 1: 3 5 2: 1 2 4 3: 2 optimal: oo + -5*v2 + 38/3 < 0; value: 23/3 + 15/2*v2 -16 < 0; value: -17/2 + 3*v2 -1*v3 -7 < 0; value: -4 + -48 < 0; value: -48 - 2*v0 + 5*v2 -14 <= 0; value: 0 - -3*v1 + 2 < 0; value: -3 0: 1 4 1: 3 5 2: 1 2 4 3: 2 0: 0 -> 9/2 1: 4 -> 5/3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 + 4*v1 -47 <= 0; value: -29 + -4*v1 + 6*v2 -3*v3 -27 <= 0; value: -8 + -1*v0 + 6*v2 -41 <= 0; value: -13 + -2*v0 -6*v1 + 4*v3 + 11 < 0; value: -1 + -6*v1 + v2 + 3 <= 0; value: -4 0: 1 3 4 1: 1 2 4 5 2: 2 3 5 3: 2 4 optimal: oo + 2*v0 -1/3*v2 -1 < 0; value: 4/3 + 5*v0 + 2/3*v2 -45 < 0; value: -95/3 + -3/2*v0 + 55/12*v2 -23 <= 0; value: -37/12 + -1*v0 + 6*v2 -41 <= 0; value: -13 - -2*v0 -6*v1 + 4*v3 + 11 < 0; value: -2 - 2*v0 + v2 -4*v3 -8 <= 0; value: 0 0: 1 3 4 2 5 1: 1 2 4 5 2: 2 3 5 1 3: 2 4 5 1 0: 2 -> 2 1: 2 -> 5/3 2: 5 -> 5 3: 1 -> 1/4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -1*v1 + 5*v2 <= 0; value: 0 + -6*v0 + 5*v3 + 1 <= 0; value: -2 + v3 -7 <= 0; value: -4 + -5*v0 + 4*v1 + 7 = 0; value: 0 + -6*v1 -5 < 0; value: -17 0: 1 2 4 1: 1 4 5 2: 1 3: 2 3 optimal: (47/15 -e*1) + + 47/15 < 0; value: 47/15 - -6*v0 -1*v1 + 5*v2 <= 0; value: 0 - -6*v0 + 5*v3 + 1 <= 0; value: 0 + -158/25 < 0; value: -158/25 - -29*v0 + 20*v2 + 7 = 0; value: 0 - -25/4*v3 + 17/4 < 0; value: -25/4 0: 1 2 4 5 1: 1 4 5 2: 1 4 5 3: 2 3 5 0: 3 -> 47/30 1: 2 -> 5/24 2: 4 -> 1153/600 3: 3 -> 42/25 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v3 -3 <= 0; value: -1 + 2*v0 + 6*v2 + 3*v3 -40 < 0; value: -17 + -3*v3 + 7 <= 0; value: -8 + 2*v0 + 6*v2 -4*v3 + 12 = 0; value: 0 + -3*v0 + 3*v2 + 12 = 0; value: 0 0: 1 2 4 5 1: 2: 2 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -2*v3 -3 <= 0; value: -1 + 2*v0 + 6*v2 + 3*v3 -40 < 0; value: -17 + -3*v3 + 7 <= 0; value: -8 + 2*v0 + 6*v2 -4*v3 + 12 = 0; value: 0 + -3*v0 + 3*v2 + 12 = 0; value: 0 0: 1 2 4 5 1: 2: 2 4 5 3: 1 2 3 4 0: 4 -> 4 1: 3 -> 3 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + 2*v1 + v2 -24 < 0; value: -11 + -1*v0 -1*v3 -1 <= 0; value: -6 + -5*v1 -6*v2 + 50 = 0; value: 0 + 6*v1 -28 <= 0; value: -4 0: 3 1: 2 4 5 2: 2 4 3: 3 optimal: oo + 2*v0 + 12/5*v2 -20 <= 0; value: -2 + <= 0; value: 0 + -7/5*v2 -4 < 0; value: -11 + -1*v0 -1*v3 -1 <= 0; value: -6 - -5*v1 -6*v2 + 50 = 0; value: 0 + -36/5*v2 + 32 <= 0; value: -4 0: 3 1: 2 4 5 2: 2 4 5 3: 3 0: 3 -> 3 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 5*v3 -23 <= 0; value: -7 + 2*v1 + 5*v2 -12 = 0; value: 0 + 5*v0 + 4*v2 -68 <= 0; value: -45 + -5*v0 -3*v3 + 5 <= 0; value: -16 + 6*v0 + 2*v3 -61 <= 0; value: -39 0: 1 3 4 5 1: 2 2: 2 3 3: 1 4 5 optimal: 1574/19 + + 1574/19 <= 0; value: 1574/19 - 19/5*v3 -21 <= 0; value: 0 - 2*v1 + 5*v2 -12 = 0; value: 0 - 5*v0 + 4*v2 -68 <= 0; value: 0 - -5*v0 -3*v3 + 5 <= 0; value: 0 + -1213/19 <= 0; value: -1213/19 0: 1 3 4 5 1: 2 2: 2 3 3: 1 4 5 0: 3 -> -44/19 1: 1 -> -831/19 2: 2 -> 378/19 3: 2 -> 105/19 + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v3 -11 <= 0; value: -7 + v0 + v1 + v2 -14 <= 0; value: -8 + = 0; value: 0 + 2*v0 + v1 + 2*v3 -15 <= 0; value: -9 + -2*v2 -2*v3 -8 <= 0; value: -18 0: 1 2 4 1: 2 4 2: 2 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -1*v0 + 6*v3 -11 <= 0; value: -7 + v0 + v1 + v2 -14 <= 0; value: -8 + = 0; value: 0 + 2*v0 + v1 + 2*v3 -15 <= 0; value: -9 + -2*v2 -2*v3 -8 <= 0; value: -18 0: 1 2 4 1: 2 4 2: 2 5 3: 1 4 5 0: 2 -> 2 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 + 4 <= 0; value: -14 + v1 -6*v2 -4 <= 0; value: 0 + -5*v0 + 2*v2 + 6*v3 -13 = 0; value: 0 + 3*v2 <= 0; value: 0 + 4*v0 + 6*v1 -6*v2 -41 < 0; value: -13 0: 3 5 1: 2 5 2: 2 3 4 5 3: 1 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 + 4 <= 0; value: -14 + v1 -6*v2 -4 <= 0; value: 0 + -5*v0 + 2*v2 + 6*v3 -13 = 0; value: 0 + 3*v2 <= 0; value: 0 + 4*v0 + 6*v1 -6*v2 -41 < 0; value: -13 0: 3 5 1: 2 5 2: 2 3 4 5 3: 1 3 0: 1 -> 1 1: 4 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + v0 + 3*v1 -15 = 0; value: 0 + -6*v0 + 4*v2 <= 0; value: 0 + 5*v0 -5*v2 = 0; value: 0 + -2*v1 -4*v2 + 2*v3 + 2 = 0; value: 0 + 4*v1 -38 < 0; value: -18 0: 1 2 3 1: 1 4 5 2: 2 3 4 3: 4 optimal: oo + 8/5*v3 -82/5 <= 0; value: -10 - v0 + 3*v1 -15 = 0; value: 0 + -6/5*v3 + 24/5 <= 0; value: 0 - 5*v0 -5*v2 = 0; value: 0 - -10/3*v2 + 2*v3 -8 = 0; value: 0 + -4/5*v3 -74/5 < 0; value: -18 0: 1 2 3 4 5 1: 1 4 5 2: 2 3 4 5 3: 4 2 5 0: 0 -> 0 1: 5 -> 5 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -1*v1 -5*v2 -2*v3 + 21 = 0; value: 0 + -6*v1 -4*v2 + 4*v3 -8 < 0; value: -24 + -2*v0 + 2*v1 -6*v3 -6 <= 0; value: -16 + 3*v0 -5 <= 0; value: -2 + 3*v0 -3 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3: 1 2 3 optimal: (534/25 -e*1) + + 534/25 < 0; value: 534/25 - -1*v1 -5*v2 -2*v3 + 21 = 0; value: 0 - 26*v2 + 16*v3 -134 < 0; value: -16 - -2*v0 + 25/4*v2 -191/4 < 0; value: -25/4 + -2 <= 0; value: -2 - 3*v0 -3 <= 0; value: 0 0: 3 4 5 1: 1 2 3 2: 1 2 3 3: 1 2 3 0: 1 -> 1 1: 2 -> -593/100 2: 3 -> 174/25 3: 2 -> -787/200 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 5*v3 -81 <= 0; value: -42 + 3*v0 + 6*v2 -36 = 0; value: 0 + -1*v1 -2*v3 -5 <= 0; value: -15 + v0 -5*v1 + 16 = 0; value: 0 + 6*v0 -6*v2 -3*v3 + 9 = 0; value: 0 0: 2 4 5 1: 1 3 4 2: 2 5 3: 1 3 5 optimal: 112/27 + + 112/27 <= 0; value: 112/27 - 27/5*v3 -291/5 <= 0; value: 0 - 3*v0 + 6*v2 -36 = 0; value: 0 + -839/27 <= 0; value: -839/27 - v0 -5*v1 + 16 = 0; value: 0 - -18*v2 -3*v3 + 81 = 0; value: 0 0: 2 4 5 3 1 1: 1 3 4 2: 2 5 1 3 3: 1 3 5 0: 4 -> 178/27 1: 4 -> 122/27 2: 4 -> 73/27 3: 3 -> 97/9 + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 <= 0; value: 0 + -4*v0 -4*v3 -2 <= 0; value: -18 + 5*v1 -5*v2 -1*v3 -2 <= 0; value: -1 + 5*v0 <= 0; value: 0 + 5*v3 -29 <= 0; value: -9 0: 1 2 4 1: 3 2: 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 <= 0; value: 0 + -4*v0 -4*v3 -2 <= 0; value: -18 + 5*v1 -5*v2 -1*v3 -2 <= 0; value: -1 + 5*v0 <= 0; value: 0 + 5*v3 -29 <= 0; value: -9 0: 1 2 4 1: 3 2: 3 3: 2 3 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 + 4*v1 -3*v3 -61 <= 0; value: -39 + -6*v0 -5*v1 -3*v3 + 18 <= 0; value: -27 + 4*v1 -4*v3 -22 <= 0; value: -10 + -1*v0 -2*v3 -1 < 0; value: -6 + 5*v1 -39 < 0; value: -24 0: 1 2 4 1: 1 2 3 5 2: 3: 1 2 3 4 optimal: oo + 22/5*v0 + 6/5*v3 -36/5 <= 0; value: 74/5 + -14/5*v0 -27/5*v3 -233/5 <= 0; value: -303/5 - -6*v0 -5*v1 -3*v3 + 18 <= 0; value: 0 + -24/5*v0 -32/5*v3 -38/5 <= 0; value: -158/5 + -1*v0 -2*v3 -1 < 0; value: -6 + -6*v0 -3*v3 -21 < 0; value: -51 0: 1 2 4 3 5 1: 1 2 3 5 2: 3: 1 2 3 4 5 0: 5 -> 5 1: 3 -> -12/5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + 5*v0 <= 0; value: 0 + -3*v3 < 0; value: -6 + -3*v1 + v2 -11 < 0; value: -26 + 5*v0 -6*v1 + 6 <= 0; value: -24 + = 0; value: 0 0: 1 4 1: 3 4 2: 3 3: 2 optimal: -2 + -2 <= 0; value: -2 - 5*v0 <= 0; value: 0 + -3*v3 < 0; value: -6 + v2 -14 < 0; value: -14 - 5*v0 -6*v1 + 6 <= 0; value: 0 + = 0; value: 0 0: 1 4 3 1: 3 4 2: 3 3: 2 0: 0 -> 0 1: 5 -> 1 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 -6*v2 -24 <= 0; value: -66 + -5*v1 -1*v3 + 14 < 0; value: -11 + 3*v0 + 6*v1 -92 <= 0; value: -59 + 2*v1 -1*v3 -12 <= 0; value: -2 + v2 -6*v3 -5 <= 0; value: -3 0: 3 1: 1 2 3 4 2: 1 5 3: 2 4 5 optimal: oo + 2*v0 + 2*v2 + 8 < 0; value: 14 - -6*v2 + 6/5*v3 -204/5 <= 0; value: 0 - -5*v1 -1*v3 + 14 < 0; value: -5 + 3*v0 -6*v2 -116 < 0; value: -125 + -7*v2 -54 < 0; value: -68 + -29*v2 -209 <= 0; value: -267 0: 3 1: 1 2 3 4 2: 1 5 4 3 3: 2 4 5 1 3 0: 1 -> 1 1: 5 -> -5 2: 2 -> 2 3: 0 -> 44 + 2*v0 -2*v1 <= 0; value: 8 + 2*v0 -6*v1 + 3*v3 -19 < 0; value: -8 + 4*v0 -2*v2 + 2*v3 -33 < 0; value: -15 + 6*v1 = 0; value: 0 + -5*v1 -4*v3 + 4 = 0; value: 0 + 6*v0 + 4*v1 -45 < 0; value: -21 0: 1 2 5 1: 1 3 4 5 2: 2 3: 1 2 4 optimal: (15 -e*1) + + 15 < 0; value: 15 + 3*v3 -4 <= 0; value: -1 + -2*v2 + 2*v3 -3 <= 0; value: -1 - 6*v1 = 0; value: 0 + -4*v3 + 4 = 0; value: 0 - 6*v0 -45 < 0; value: -6 0: 1 2 5 1: 1 3 4 5 2: 2 3: 1 2 4 0: 4 -> 13/2 1: 0 -> 0 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v2 -4*v3 + 3 < 0; value: -5 + -3*v1 -3*v2 = 0; value: 0 + 6*v2 -2*v3 -1 <= 0; value: -5 + -1*v1 + v2 <= 0; value: 0 + -3*v0 + 2*v2 -2*v3 -7 < 0; value: -20 0: 5 1: 2 4 2: 1 2 3 4 5 3: 1 3 5 optimal: oo + 2*v0 <= 0; value: 6 + -4*v3 + 3 < 0; value: -5 - -3*v1 -3*v2 = 0; value: 0 + -2*v3 -1 <= 0; value: -5 - 2*v2 <= 0; value: 0 + -3*v0 -2*v3 -7 < 0; value: -20 0: 5 1: 2 4 2: 1 2 3 4 5 3: 1 3 5 0: 3 -> 3 1: 0 -> 0 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -5*v0 -1*v1 + 22 < 0; value: -4 + 2*v2 + 4*v3 -9 < 0; value: -3 + 6*v1 -2*v2 -6 <= 0; value: -2 + -1*v0 + v3 + 4 = 0; value: 0 + -3*v1 + 4*v2 -2 < 0; value: -1 0: 1 4 1: 1 3 5 2: 2 3 5 3: 2 4 optimal: oo + 12*v3 + 4 < 0; value: 16 - -5*v0 -4/3*v2 + 68/3 <= 0; value: 0 + -7/2*v3 -5 < 0; value: -17/2 + -45/2*v3 + 2 < 0; value: -41/2 - -1*v0 + v3 + 4 = 0; value: 0 - -3*v1 + 4*v2 -2 < 0; value: -3 0: 1 4 2 3 1: 1 3 5 2: 2 3 5 1 3: 2 4 3 0: 5 -> 5 1: 1 -> -2 2: 1 -> -7/4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v2 -6*v3 + 5 <= 0; value: -10 + -2*v1 + 3*v3 -11 <= 0; value: -6 + 3*v1 -2*v3 <= 0; value: 0 + -5*v0 -2*v3 + 5 <= 0; value: -1 + -6*v2 -1*v3 -7 <= 0; value: -16 0: 4 1: 2 3 2: 1 5 3: 1 2 3 4 5 optimal: 788/65 + + 788/65 <= 0; value: 788/65 - 15*v0 + 3*v2 -10 <= 0; value: 0 - -2*v1 + 3*v3 -11 <= 0; value: 0 + -207/13 <= 0; value: -207/13 - -5*v0 -2*v3 + 5 <= 0; value: 0 - -13/2*v2 -47/6 <= 0; value: 0 0: 4 1 5 3 1: 2 3 2: 1 5 3 3: 1 2 3 4 5 0: 0 -> 59/65 1: 2 -> -67/13 2: 1 -> -47/39 3: 3 -> 3/13 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 + 2 <= 0; value: -1 + -2*v2 + 4*v3 -4 <= 0; value: -2 + -5*v1 + 3*v2 + 11 = 0; value: 0 + 2*v0 -6 = 0; value: 0 + 4*v0 + 5*v3 -63 < 0; value: -41 0: 4 5 1: 3 2: 1 2 3 3: 2 5 optimal: -4/5 + -4/5 <= 0; value: -4/5 - -1*v2 + 2 <= 0; value: 0 + 4*v3 -8 <= 0; value: 0 - -5*v1 + 3*v2 + 11 = 0; value: 0 - 2*v0 -6 = 0; value: 0 + 5*v3 -51 < 0; value: -41 0: 4 5 1: 3 2: 1 2 3 3: 2 5 0: 3 -> 3 1: 4 -> 17/5 2: 3 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -1*v3 + 1 <= 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 3*v1 + 4*v2 -14 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + <= 0; value: 0 0: 4 1: 3 2: 3 4 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -1*v3 + 1 <= 0; value: 0 + 3*v3 -3 <= 0; value: 0 + 3*v1 + 4*v2 -14 <= 0; value: 0 + 3*v0 -2*v2 -2 = 0; value: 0 + <= 0; value: 0 0: 4 1: 3 2: 3 4 3: 1 2 0: 2 -> 2 1: 2 -> 2 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 2 <= 0; value: -3 + 5*v2 -14 <= 0; value: -9 + -1*v1 -1*v2 + 5*v3 -14 <= 0; value: 0 + -4*v1 + v2 -1*v3 + 1 <= 0; value: -1 + -1*v0 -5*v3 + 16 = 0; value: 0 0: 1 5 1: 3 4 2: 2 3 4 3: 3 4 5 optimal: oo + 58/25*v0 + 2/25 <= 0; value: 12/5 + -5*v0 + 2 <= 0; value: -3 + -21/5*v0 -19/5 <= 0; value: -8 - -1*v1 -1*v2 + 5*v3 -14 <= 0; value: 0 - 21/5*v0 + 5*v2 -51/5 <= 0; value: 0 - -1*v0 -5*v3 + 16 = 0; value: 0 0: 1 5 4 2 1: 3 4 2: 2 3 4 3: 3 4 5 0: 1 -> 1 1: 0 -> -1/5 2: 1 -> 6/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 3*v0 -6*v3 -6 <= 0; value: -27 + -5*v0 -6*v1 + 23 = 0; value: 0 + -6*v0 -1*v3 + 2 < 0; value: -8 + 6*v0 -1*v3 -3 <= 0; value: -1 + 4*v0 -4 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 3: 1 3 4 optimal: -4 + -4 <= 0; value: -4 + -6*v3 -3 <= 0; value: -27 - -5*v0 -6*v1 + 23 = 0; value: 0 + -1*v3 -4 < 0; value: -8 + -1*v3 + 3 <= 0; value: -1 - 4*v0 -4 = 0; value: 0 0: 1 2 3 4 5 1: 2 2: 3: 1 3 4 0: 1 -> 1 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 -3*v2 + 6*v3 -28 <= 0; value: -10 + 6*v2 -52 <= 0; value: -28 + -1*v0 -3*v2 + 2*v3 -5 <= 0; value: -16 + 5*v0 -3*v1 + 6*v2 -75 <= 0; value: -38 + -4*v0 + v2 -3 < 0; value: -19 0: 3 4 5 1: 1 4 2: 1 2 3 4 5 3: 1 3 optimal: oo + -8/3*v3 + 170/3 <= 0; value: 146/3 + 4*v0 + 8*v3 -108 <= 0; value: -64 + -2*v0 + 4*v3 -62 <= 0; value: -60 - -1*v0 -3*v2 + 2*v3 -5 <= 0; value: 0 - 5*v0 -3*v1 + 6*v2 -75 <= 0; value: 0 + -13/3*v0 + 2/3*v3 -14/3 < 0; value: -73/3 0: 3 4 5 1 2 1: 1 4 2: 1 2 3 4 5 3: 1 3 2 5 0: 5 -> 5 1: 4 -> -58/3 2: 4 -> -4/3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 6*v1 + 4*v2 + v3 -28 = 0; value: 0 + -3*v2 = 0; value: 0 + v1 -3*v3 + 2 <= 0; value: -6 + 5*v1 + 4*v3 -56 <= 0; value: -20 + -3*v0 -5*v1 + 32 = 0; value: 0 0: 5 1: 1 3 4 5 2: 1 2 3: 1 3 4 optimal: 320/57 + + 320/57 <= 0; value: 320/57 - 6*v1 + 4*v2 + v3 -28 = 0; value: 0 - -3*v2 = 0; value: 0 + -26 <= 0; value: -26 - 57/5*v0 -16*v2 -328/5 <= 0; value: 0 - -3*v0 + 10/3*v2 + 5/6*v3 + 26/3 = 0; value: 0 0: 5 4 3 1: 1 3 4 5 2: 1 2 5 3 4 3: 1 3 4 5 0: 4 -> 328/57 1: 4 -> 56/19 2: 0 -> 0 3: 4 -> 196/19 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 + 4*v1 + 5*v2 -12 = 0; value: 0 + -6*v2 <= 0; value: 0 + -4*v2 <= 0; value: 0 + <= 0; value: 0 + 2*v1 -10 <= 0; value: -2 0: 1 1: 1 5 2: 1 2 3 3: optimal: oo + v0 + 5/2*v2 -6 <= 0; value: -4 - -2*v0 + 4*v1 + 5*v2 -12 = 0; value: 0 + -6*v2 <= 0; value: 0 + -4*v2 <= 0; value: 0 + <= 0; value: 0 + v0 -5/2*v2 -4 <= 0; value: -2 0: 1 5 1: 1 5 2: 1 2 3 5 3: 0: 2 -> 2 1: 4 -> 4 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 3*v0 -2*v1 -11 = 0; value: 0 + 2*v1 -4*v2 + 3 <= 0; value: -1 + -5*v1 + 5*v3 <= 0; value: 0 + 3*v0 + 2*v2 -28 <= 0; value: -9 + 6*v0 -5*v2 -25 < 0; value: -5 0: 1 4 5 1: 1 2 3 2: 2 4 5 3: 3 optimal: oo + -2/3*v3 + 22/3 <= 0; value: 6 - 3*v0 -2*v1 -11 = 0; value: 0 + -4*v2 + 2*v3 + 3 <= 0; value: -1 - -15/2*v0 + 5*v3 + 55/2 <= 0; value: 0 + 2*v2 + 2*v3 -17 <= 0; value: -9 + -5*v2 + 4*v3 -3 < 0; value: -5 0: 1 4 5 3 2 1: 1 2 3 2: 2 4 5 3: 3 4 5 2 0: 5 -> 5 1: 2 -> 2 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 -4*v2 + 17 <= 0; value: -7 + 2*v0 + 3*v2 -6*v3 = 0; value: 0 + 4*v0 + 6*v1 -24 = 0; value: 0 + 4*v0 -4*v1 -6 <= 0; value: -22 + 6*v1 -2*v3 -52 <= 0; value: -30 0: 2 3 4 1: 1 3 4 5 2: 1 2 3: 2 5 optimal: 3 + + 3 <= 0; value: 3 - -8*v2 + 8*v3 + 1 <= 0; value: 0 - 2*v0 + 3*v2 -6*v3 = 0; value: 0 - 4*v0 + 6*v1 -24 = 0; value: 0 - 10*v2 -49/2 <= 0; value: 0 + -917/20 <= 0; value: -917/20 0: 2 3 4 1 5 1: 1 3 4 5 2: 1 2 4 5 3: 2 5 4 1 0: 0 -> 33/10 1: 4 -> 9/5 2: 2 -> 49/20 3: 1 -> 93/40 + 2*v0 -2*v1 <= 0; value: -6 + -6*v1 + 5 < 0; value: -13 + -4*v1 -3*v3 + 21 = 0; value: 0 + <= 0; value: 0 + 5*v0 <= 0; value: 0 + -1*v0 <= 0; value: 0 0: 4 5 1: 1 2 2: 3: 2 optimal: (-5/3 -e*1) + -5/3 < 0; value: -5/3 - 9/2*v3 -53/2 < 0; value: -9/2 - -4*v1 -3*v3 + 21 = 0; value: 0 + <= 0; value: 0 - 5*v0 <= 0; value: 0 + <= 0; value: 0 0: 4 5 1: 1 2 2: 3: 2 1 0: 0 -> 0 1: 3 -> 19/12 2: 1 -> 1 3: 3 -> 44/9 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -2*v1 -1*v2 <= 0; value: 0 + -2*v1 + 2*v3 + 2 <= 0; value: 0 + -3*v0 + 2*v2 -1*v3 -2 < 0; value: -11 + v0 -5*v3 + 7 <= 0; value: -10 + 2*v3 -8 = 0; value: 0 0: 1 3 4 1: 1 2 2: 1 3 3: 2 3 4 5 optimal: (2/5 -e*1) + + 2/5 < 0; value: 2/5 - 4*v0 -2*v1 -1*v2 <= 0; value: 0 - -4*v0 + v2 + 2*v3 + 2 <= 0; value: 0 - 5*v0 -26 < 0; value: -5 + -39/5 <= 0; value: -39/5 - 2*v3 -8 = 0; value: 0 0: 1 3 4 2 1: 1 2 2: 1 3 2 3: 2 3 4 5 0: 3 -> 21/5 1: 5 -> 5 2: 2 -> 34/5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 3*v2 + 2*v3 -25 <= 0; value: -16 + 3*v0 -21 < 0; value: -6 + -5*v0 + 5*v2 -1*v3 + 2 <= 0; value: -21 + -3*v0 -14 <= 0; value: -29 + -1*v1 + 1 < 0; value: -1 0: 2 3 4 1: 5 2: 1 3 3: 1 3 optimal: (12 -e*1) + + 12 < 0; value: 12 + 3*v2 + 2*v3 -25 <= 0; value: -16 - 3*v0 -21 < 0; value: -3 + 5*v2 -1*v3 -33 < 0; value: -31 + -35 < 0; value: -35 - -1*v1 + 1 < 0; value: -1/2 0: 2 3 4 1: 5 2: 1 3 3: 1 3 0: 5 -> 6 1: 2 -> 3/2 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -1*v1 + 9 = 0; value: 0 + -6*v3 + 2 < 0; value: -22 + -1*v0 + 2*v1 + 4*v3 -23 < 0; value: -7 + 3*v3 -12 = 0; value: 0 + v1 -1 <= 0; value: 0 0: 1 3 1: 1 3 5 2: 3: 2 3 4 optimal: oo + 10*v0 -18 <= 0; value: 2 - -4*v0 -1*v1 + 9 = 0; value: 0 + -6*v3 + 2 < 0; value: -22 + -9*v0 + 4*v3 -5 < 0; value: -7 + 3*v3 -12 = 0; value: 0 + -4*v0 + 8 <= 0; value: 0 0: 1 3 5 1: 1 3 5 2: 3: 2 3 4 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 -2*v2 -7 <= 0; value: -3 + -2*v0 -5*v3 + 1 <= 0; value: -3 + 2*v0 + 4*v3 -7 <= 0; value: -3 + -5*v1 + 6*v3 + 8 <= 0; value: -12 + v0 + 3*v2 -3 < 0; value: -1 0: 1 2 3 5 1: 4 2: 1 5 3: 2 3 4 optimal: (631/100 -e*1) + + 631/100 < 0; value: 631/100 - -8*v2 -1 <= 0; value: 0 - -2*v0 -5*v3 + 1 <= 0; value: 0 + -97/20 <= 0; value: -97/20 - -5*v1 + 6*v3 + 8 <= 0; value: 0 - v0 + 3*v2 -3 < 0; value: -11/16 0: 1 2 3 5 1: 4 2: 1 5 3 3: 2 3 4 0: 2 -> 43/16 1: 4 -> 11/20 2: 0 -> -1/8 3: 0 -> -7/8 + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 -8 < 0; value: -2 + 4*v0 + 5*v1 + 3*v3 -54 < 0; value: -16 + 4*v3 -21 <= 0; value: -13 + 3*v2 -16 <= 0; value: -7 + 3*v1 -21 <= 0; value: -9 0: 2 1: 2 5 2: 1 4 3: 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + 2*v2 -8 < 0; value: -2 + 4*v0 + 5*v1 + 3*v3 -54 < 0; value: -16 + 4*v3 -21 <= 0; value: -13 + 3*v2 -16 <= 0; value: -7 + 3*v1 -21 <= 0; value: -9 0: 2 1: 2 5 2: 1 4 3: 2 3 0: 3 -> 3 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 -2*v3 + 1 <= 0; value: -7 + -2*v1 + 2*v2 + 4*v3 -35 < 0; value: -21 + -5*v0 + v2 + 6 <= 0; value: -7 + 4*v0 -2*v3 -7 <= 0; value: -1 + -1*v2 + 2 = 0; value: 0 0: 3 4 1: 1 2 2: 2 3 5 3: 1 2 4 optimal: (37/2 -e*1) + + 37/2 < 0; value: 37/2 - -2*v1 -2*v3 + 1 <= 0; value: 0 - 2*v2 + 6*v3 -36 < 0; value: -6 + -169/12 < 0; value: -169/12 - 4*v0 -53/3 < 0; value: -17/6 - -1*v2 + 2 = 0; value: 0 0: 3 4 1: 1 2 2: 2 3 5 4 3: 1 2 4 0: 3 -> 89/24 1: 1 -> -23/6 2: 2 -> 2 3: 3 -> 13/3 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + 3*v3 -6 <= 0; value: 0 + -1*v1 -3*v2 + 7 < 0; value: -10 + -2*v1 + 2*v3 -4 = 0; value: 0 + -4*v0 -6*v2 -38 <= 0; value: -80 + -6*v0 -2*v3 + 23 < 0; value: -3 0: 4 5 1: 1 2 3 2: 2 4 3: 1 3 5 optimal: oo + 8*v2 -37/3 < 0; value: 83/3 - -3*v1 + 3*v3 -6 <= 0; value: 0 - 3*v0 -3*v2 -5/2 <= 0; value: 0 + = 0; value: 0 + -10*v2 -124/3 <= 0; value: -274/3 - -6*v0 -2*v3 + 23 < 0; value: -2 0: 4 5 2 1: 1 2 3 2: 2 4 3: 1 3 5 2 0: 3 -> 35/6 1: 2 -> -7 2: 5 -> 5 3: 4 -> -5 + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + v2 -3*v3 + 1 <= 0; value: -10 + -4*v0 -4*v2 + 3*v3 + 20 = 0; value: 0 + 2*v1 -1*v3 -6 <= 0; value: 0 + 6*v1 -44 <= 0; value: -26 + -3*v0 + 3*v1 + 3 <= 0; value: 0 0: 1 2 5 1: 3 4 5 2: 1 2 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -3*v0 + v2 -3*v3 + 1 <= 0; value: -10 + -4*v0 -4*v2 + 3*v3 + 20 = 0; value: 0 + 2*v1 -1*v3 -6 <= 0; value: 0 + 6*v1 -44 <= 0; value: -26 + -3*v0 + 3*v1 + 3 <= 0; value: 0 0: 1 2 5 1: 3 4 5 2: 1 2 3: 1 2 3 0: 4 -> 4 1: 3 -> 3 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 2*v2 -3*v3 -9 = 0; value: 0 + 4*v1 -4*v3 <= 0; value: 0 + 6*v1 -6*v3 = 0; value: 0 + 3*v0 + 3*v1 + 3*v3 -9 = 0; value: 0 + v0 -3*v2 + 6*v3 + 4 <= 0; value: -1 0: 1 4 5 1: 2 3 4 2: 1 5 3: 1 2 3 4 5 optimal: 12/25 + + 12/25 <= 0; value: 12/25 - 4*v0 + 2*v2 -3*v3 -9 = 0; value: 0 + <= 0; value: 0 - 6*v1 -6*v3 = 0; value: 0 - 11*v0 + 4*v2 -27 = 0; value: 0 - 25/4*v0 -29/4 <= 0; value: 0 0: 1 4 5 1: 2 3 4 2: 1 5 4 3: 1 2 3 4 5 0: 1 -> 29/25 1: 1 -> 23/25 2: 4 -> 89/25 3: 1 -> 23/25 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + v3 -3 <= 0; value: -9 + 6*v0 -4*v1 -1 <= 0; value: -7 + <= 0; value: 0 + <= 0; value: 0 + -4*v0 -3*v2 + 11 <= 0; value: -5 0: 2 5 1: 2 2: 1 5 3: 1 optimal: oo + 3/4*v2 -9/4 <= 0; value: 3/4 + -2*v2 + v3 -3 <= 0; value: -9 - 6*v0 -4*v1 -1 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 - -4*v0 -3*v2 + 11 <= 0; value: 0 0: 2 5 1: 2 2: 1 5 3: 1 0: 1 -> -1/4 1: 3 -> -5/8 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -24 = 0; value: 0 + v1 + 6*v3 -27 < 0; value: -3 + 3*v1 -4*v2 + 16 <= 0; value: 0 + -3*v1 + 5*v3 -34 <= 0; value: -14 + 3*v1 -5*v2 -3 <= 0; value: -23 0: 1 1: 2 3 4 5 2: 3 5 3: 2 4 optimal: oo + 2*v0 -10/3*v3 + 68/3 <= 0; value: 52/3 + 6*v0 -24 = 0; value: 0 + 23/3*v3 -115/3 < 0; value: -23/3 + -4*v2 + 5*v3 -18 <= 0; value: -14 - -3*v1 + 5*v3 -34 <= 0; value: 0 + -5*v2 + 5*v3 -37 <= 0; value: -37 0: 1 1: 2 3 4 5 2: 3 5 3: 2 4 3 5 0: 4 -> 4 1: 0 -> -14/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + v1 -2 <= 0; value: -17 + -5*v0 -4*v1 + 15 = 0; value: 0 + -6*v1 -1*v2 -2*v3 + 13 = 0; value: 0 + 5*v1 <= 0; value: 0 + -3*v0 + 3*v2 + 3*v3 -52 <= 0; value: -34 0: 1 2 5 1: 1 2 3 4 2: 3 5 3: 3 5 optimal: oo + -9/11*v2 + 315/11 <= 0; value: 270/11 + 25/22*v2 -3197/66 <= 0; value: -1411/33 - -5*v0 -4*v1 + 15 = 0; value: 0 - 15/2*v0 -1*v2 -2*v3 -19/2 = 0; value: 0 + 25/22*v2 -2075/66 <= 0; value: -850/33 - 13/5*v2 + 11/5*v3 -279/5 <= 0; value: 0 0: 1 2 5 3 4 1: 1 2 3 4 2: 3 5 1 4 3: 3 5 1 4 0: 3 -> 235/33 1: 0 -> -170/33 2: 5 -> 5 3: 4 -> 214/11 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 + 2*v1 -2*v3 -23 <= 0; value: -14 + 3*v1 + v2 -22 <= 0; value: -14 + 4*v0 -1*v1 + 6*v2 -90 < 0; value: -49 + 4*v0 -2*v1 -15 < 0; value: -5 + -4*v1 -3*v2 -4*v3 -11 <= 0; value: -34 0: 1 3 4 1: 1 2 3 4 5 2: 2 3 5 3: 1 5 optimal: oo + 3/4*v2 + v3 + 41/4 < 0; value: 15 + -21/8*v2 -11/2*v3 -171/8 < 0; value: -40 + -5/4*v2 -3*v3 -121/4 < 0; value: -79/2 + 21/4*v2 -1*v3 -311/4 <= 0; value: -105/2 - 4*v0 -2*v1 -15 < 0; value: -2 - -8*v0 -3*v2 -4*v3 + 19 <= 0; value: 0 0: 1 3 4 5 2 1: 1 2 3 4 5 2: 2 3 5 1 3: 1 5 3 2 0: 3 -> 0 1: 1 -> -13/2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -5*v1 <= 0; value: 0 + -4*v0 -6*v1 + 3*v3 -4 <= 0; value: -42 + 5*v0 -25 = 0; value: 0 + -6*v0 + 5*v3 -28 <= 0; value: -58 + -3*v0 -4*v1 + 6 <= 0; value: -21 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 4 optimal: 4 + + 4 <= 0; value: 4 - 3*v0 -5*v1 <= 0; value: 0 + 3*v3 -42 <= 0; value: -42 - 5*v0 -25 = 0; value: 0 + 5*v3 -58 <= 0; value: -58 + -21 <= 0; value: -21 0: 1 2 3 4 5 1: 1 2 5 2: 3: 2 4 0: 5 -> 5 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -4*v2 + 5*v3 + 16 = 0; value: 0 + -2*v1 + 5*v2 -1*v3 -35 <= 0; value: -21 + -4*v0 -4*v2 -33 <= 0; value: -69 + 3*v1 -15 < 0; value: -6 + -6*v0 + 2*v1 -4 <= 0; value: -28 0: 3 5 1: 2 4 5 2: 1 2 3 3: 1 2 optimal: oo + 31/5*v0 + 1329/20 <= 0; value: 1949/20 - -4*v2 + 5*v3 + 16 = 0; value: 0 - -2*v1 + 5*v2 -1*v3 -35 <= 0; value: 0 - -4*v0 -4*v2 -33 <= 0; value: 0 + -63/10*v0 -4587/40 < 0; value: -5847/40 + -51/5*v0 -1409/20 <= 0; value: -2429/20 0: 3 5 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 4 5 0: 5 -> 5 1: 3 -> -1749/40 2: 4 -> -53/4 3: 0 -> -69/5 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 -32 < 0; value: -20 + -2*v2 + 3 < 0; value: -1 + -4*v0 -1*v1 + v3 -1 < 0; value: -3 + -3*v0 -4*v2 -3 <= 0; value: -11 + -3*v0 + 5*v2 -15 < 0; value: -5 0: 3 4 5 1: 3 2: 1 2 4 5 3: 3 optimal: oo + 10*v0 -2*v3 + 2 < 0; value: 2 + 6*v2 -32 < 0; value: -20 + -2*v2 + 3 < 0; value: -1 - -4*v0 -1*v1 + v3 -1 < 0; value: -1 + -3*v0 -4*v2 -3 <= 0; value: -11 + -3*v0 + 5*v2 -15 < 0; value: -5 0: 3 4 5 1: 3 2: 1 2 4 5 3: 3 0: 0 -> 0 1: 2 -> 0 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 + v2 -38 <= 0; value: -14 + -4*v0 -1*v1 -5 < 0; value: -24 + v2 -1*v3 -8 <= 0; value: -5 + -1*v0 + 2*v3 -1 <= 0; value: -3 + -2*v1 + 6 = 0; value: 0 0: 1 2 4 1: 2 5 2: 1 3 3: 3 4 optimal: oo + -2/5*v2 + 46/5 <= 0; value: 38/5 - 5*v0 + v2 -38 <= 0; value: 0 + 4/5*v2 -192/5 < 0; value: -176/5 + v2 -1*v3 -8 <= 0; value: -5 + 1/5*v2 + 2*v3 -43/5 <= 0; value: -29/5 - -2*v1 + 6 = 0; value: 0 0: 1 2 4 1: 2 5 2: 1 3 2 4 3: 3 4 0: 4 -> 34/5 1: 3 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 + 5*v1 -29 < 0; value: -18 + v0 -3*v3 + 14 = 0; value: 0 + 4*v0 -1*v1 -5 < 0; value: -2 + -4*v1 -5*v3 + 29 = 0; value: 0 + -4*v1 + 3 < 0; value: -1 0: 1 2 3 1: 1 3 4 5 2: 3: 2 4 optimal: (68/53 -e*1) + + 68/53 < 0; value: 68/53 + -860/53 <= 0; value: -860/53 - v0 -3*v3 + 14 = 0; value: 0 - 53/12*v0 -77/12 < 0; value: -1 - -4*v1 -5*v3 + 29 = 0; value: 0 + -13/53 <= 0; value: -13/53 0: 1 2 3 5 1: 1 3 4 5 2: 3: 2 4 3 5 1 0: 1 -> 65/53 1: 1 -> 48/53 2: 2 -> 2 3: 5 -> 269/53 + 2*v0 -2*v1 <= 0; value: -2 + -1*v2 -1*v3 -1 < 0; value: -7 + -2*v2 + 1 <= 0; value: -9 + -6*v1 -1*v2 + v3 + 30 < 0; value: -4 + -4*v0 -1 <= 0; value: -17 + -2*v0 + 4*v2 -2*v3 -29 < 0; value: -19 0: 4 5 1: 3 2: 1 2 3 5 3: 1 3 5 optimal: oo + 20/9*v0 -20/3 < 0; value: 20/9 - -1*v2 -1*v3 -1 < 0; value: -1 + -2/3*v0 -8 <= 0; value: -32/3 - -6*v1 -1*v2 + v3 + 30 < 0; value: -35/6 + -4*v0 -1 <= 0; value: -17 - -2*v0 + 6*v2 -27 <= 0; value: 0 0: 4 5 2 1: 3 2: 1 2 3 5 3: 1 3 5 0: 4 -> 4 1: 5 -> 145/36 2: 5 -> 35/6 3: 1 -> -35/6 + 2*v0 -2*v1 <= 0; value: 4 + 2*v2 -2*v3 -5 <= 0; value: -3 + -4*v0 + 6*v1 + v2 <= 0; value: 0 + v0 -2*v1 + 1 = 0; value: 0 + 4*v2 -5*v3 -8 <= 0; value: -5 + -2*v2 + 6*v3 -2 <= 0; value: 0 0: 2 3 1: 2 3 2: 1 2 4 5 3: 1 4 5 optimal: oo + v0 -1 <= 0; value: 4 + 2*v2 -2*v3 -5 <= 0; value: -3 + -1*v0 + v2 + 3 <= 0; value: 0 - v0 -2*v1 + 1 = 0; value: 0 + 4*v2 -5*v3 -8 <= 0; value: -5 + -2*v2 + 6*v3 -2 <= 0; value: 0 0: 2 3 1: 2 3 2: 1 2 4 5 3: 1 4 5 0: 5 -> 5 1: 3 -> 3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 5*v1 -1*v2 -11 <= 0; value: -6 + 4*v0 -2*v2 -3*v3 -11 <= 0; value: -5 + 3*v2 -15 = 0; value: 0 + 6*v1 -5*v3 -33 <= 0; value: -21 + -2*v0 -4*v2 -1*v3 -6 < 0; value: -34 0: 2 5 1: 1 4 2: 1 2 3 5 3: 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 5*v1 -1*v2 -11 <= 0; value: -6 + 4*v0 -2*v2 -3*v3 -11 <= 0; value: -5 + 3*v2 -15 = 0; value: 0 + 6*v1 -5*v3 -33 <= 0; value: -21 + -2*v0 -4*v2 -1*v3 -6 < 0; value: -34 0: 2 5 1: 1 4 2: 1 2 3 5 3: 2 4 5 0: 4 -> 4 1: 2 -> 2 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 6*v2 -30 = 0; value: 0 + 2*v1 + 3*v2 -3*v3 -25 = 0; value: 0 + -6*v0 + 2 <= 0; value: -10 + 2*v0 -1*v1 -5*v2 -15 <= 0; value: -41 + -3*v0 + 5*v3 + 6 = 0; value: 0 0: 3 4 5 1: 2 4 2: 1 2 4 3: 2 5 optimal: 16/11 + + 16/11 <= 0; value: 16/11 - 6*v2 -30 = 0; value: 0 - 2*v1 + 3*v2 -3*v3 -25 = 0; value: 0 + -2570/11 <= 0; value: -2570/11 - 11/10*v0 -216/5 <= 0; value: 0 - -3*v0 + 5*v3 + 6 = 0; value: 0 0: 3 4 5 1: 2 4 2: 1 2 4 3: 2 5 4 0: 2 -> 432/11 1: 5 -> 424/11 2: 5 -> 5 3: 0 -> 246/11 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + 6*v2 -24 < 0; value: -13 + -5*v0 -5*v3 -15 < 0; value: -40 + 2*v0 -3*v2 = 0; value: 0 + -1*v2 -5*v3 + 12 = 0; value: 0 + 3*v3 -8 <= 0; value: -2 0: 2 3 1: 1 2: 1 3 4 3: 2 4 5 optimal: (60 -e*1) + + 60 < 0; value: 60 - -1*v1 + 6*v2 -24 < 0; value: -1 + -55/3 < 0; value: -55/3 - 2*v0 -3*v2 = 0; value: 0 - -2/3*v0 -5*v3 + 12 = 0; value: 0 - 3*v3 -8 <= 0; value: 0 0: 2 3 4 1: 1 2: 1 3 4 3: 2 4 5 0: 3 -> -2 1: 1 -> -31 2: 2 -> -4/3 3: 2 -> 8/3 + 2*v0 -2*v1 <= 0; value: -6 + 4*v2 + 2*v3 -33 < 0; value: -19 + 2*v2 -4*v3 -3 <= 0; value: -11 + 6*v0 -6*v1 -7 < 0; value: -25 + v3 -3 <= 0; value: 0 + -1*v0 + 5*v3 -28 <= 0; value: -14 0: 3 5 1: 3 2: 1 2 3: 1 2 4 5 optimal: (7/3 -e*1) + + 7/3 < 0; value: 7/3 + 4*v2 + 2*v3 -33 < 0; value: -19 + 2*v2 -4*v3 -3 <= 0; value: -11 - 6*v0 -6*v1 -7 < 0; value: -6 + v3 -3 <= 0; value: 0 + -1*v0 + 5*v3 -28 <= 0; value: -14 0: 3 5 1: 3 2: 1 2 3: 1 2 4 5 0: 1 -> 1 1: 4 -> 5/6 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -37 < 0; value: -22 + v1 -6*v2 + 15 < 0; value: -4 + 3*v0 + 6*v1 + 2*v3 -63 <= 0; value: -8 + 4*v2 -3*v3 -1 = 0; value: 0 + -5*v1 -1*v3 + 30 = 0; value: 0 0: 1 3 1: 2 3 5 2: 2 4 3: 3 4 5 optimal: (256/47 -e*1) + + 256/47 < 0; value: 256/47 + -626/47 <= 0; value: -626/47 - 141/8*v0 -1113/8 < 0; value: -141/8 - 3*v0 + 16/15*v2 -409/15 <= 0; value: 0 - 4*v2 -3*v3 -1 = 0; value: 0 - -5*v1 -1*v3 + 30 = 0; value: 0 0: 1 3 2 1: 2 3 5 2: 2 4 3 3: 3 4 5 2 0: 5 -> 324/47 1: 5 -> 831/188 2: 4 -> 4643/752 3: 5 -> 1485/188 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -5*v2 + 5*v3 <= 0; value: -18 + -2*v3 <= 0; value: 0 + -2*v1 -4*v2 + 14 <= 0; value: -4 + 5*v1 -4*v3 -50 <= 0; value: -25 + -3*v1 + 6*v2 + 1 < 0; value: -2 0: 1 1: 3 4 5 2: 1 3 5 3: 1 2 4 optimal: oo + 2*v0 -22/3 < 0; value: 2/3 + -2*v0 + 5*v3 -25/3 <= 0; value: -49/3 + -2*v3 <= 0; value: 0 - -8*v2 + 40/3 <= 0; value: 0 + -4*v3 -95/3 < 0; value: -95/3 - -3*v1 + 6*v2 + 1 < 0; value: -2 0: 1 1: 3 4 5 2: 1 3 5 4 3: 1 2 4 0: 4 -> 4 1: 5 -> 13/3 2: 2 -> 5/3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -4*v3 + 4 <= 0; value: 0 + 6*v1 + 3*v2 + 2*v3 -35 < 0; value: -21 + -3*v1 -4*v2 -3*v3 + 9 <= 0; value: 0 + 4*v0 -1*v1 + 5*v3 -22 <= 0; value: -11 + 5*v0 -6*v1 + 5*v3 -3 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 2 3 3: 1 2 3 4 5 optimal: 22/19 + + 22/19 <= 0; value: 22/19 - 20/11*v0 + 32/11*v2 -40/11 <= 0; value: 0 + -771/76 < 0; value: -771/76 - -3*v1 -4*v2 -3*v3 + 9 <= 0; value: 0 - 19/6*v0 -52/3 <= 0; value: 0 - 5*v0 + 8*v2 + 11*v3 -21 = 0; value: 0 0: 4 5 1 2 1: 2 3 4 5 2: 2 3 4 5 1 3: 1 2 3 4 5 0: 2 -> 104/19 1: 2 -> 93/19 2: 0 -> -165/76 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 5*v1 + 5*v3 -45 < 0; value: -5 + -5*v0 -6*v1 + 5*v3 + 29 = 0; value: 0 + -3*v1 + 5*v2 -9 <= 0; value: -1 + -6*v1 + v3 -17 < 0; value: -37 + -6*v0 + 5*v3 + 6 <= 0; value: -4 0: 2 5 1: 1 2 3 4 2: 3 3: 1 2 4 5 optimal: (1292/35 -e*1) + + 1292/35 < 0; value: 1292/35 - 175/24*v0 -505/4 < 0; value: -175/24 - -5*v0 -6*v1 + 5*v3 + 29 = 0; value: 0 - 5/2*v0 + 5*v2 -5/2*v3 -47/2 <= 0; value: 0 - v0 -8*v2 -42/5 < 0; value: -8 + -1651/35 <= 0; value: -1651/35 0: 2 5 3 4 1 1: 1 2 3 4 2: 3 4 1 5 3: 1 2 4 5 3 0: 5 -> 571/35 1: 4 -> 53/168 2: 4 -> 557/280 3: 4 -> 305/28 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 -6*v2 + 6*v3 -57 <= 0; value: -24 + -2*v1 -1 <= 0; value: -3 + 6*v1 + 2*v2 -3*v3 + 7 <= 0; value: -2 + 2*v1 -5*v2 -2 <= 0; value: 0 + 3*v0 -4*v3 -9 <= 0; value: -20 0: 5 1: 1 2 3 4 2: 1 3 4 3: 1 3 5 optimal: oo + 8/3*v2 + 33 <= 0; value: 33 - -6*v2 + 6*v3 -117/2 <= 0; value: 0 - -2*v1 -1 <= 0; value: 0 + -1*v2 -101/4 <= 0; value: -101/4 + -5*v2 -3 <= 0; value: -3 - 3*v0 -4*v3 -9 <= 0; value: 0 0: 5 1: 1 2 3 4 2: 1 3 4 3: 1 3 5 0: 3 -> 16 1: 1 -> -1/2 2: 0 -> 0 3: 5 -> 39/4 + 2*v0 -2*v1 <= 0; value: 6 + -4*v2 -8 <= 0; value: -24 + 2*v0 -1*v1 + 3*v2 -22 <= 0; value: -4 + 4*v1 <= 0; value: 0 + -4*v3 = 0; value: 0 + -6*v0 -4*v2 + 16 <= 0; value: -18 0: 2 5 1: 2 3 2: 1 2 5 3: 4 optimal: 48 + + 48 <= 0; value: 48 - 6*v0 -24 <= 0; value: 0 - 2*v0 -1*v1 + 3*v2 -22 <= 0; value: 0 + -80 <= 0; value: -80 + -4*v3 = 0; value: 0 - -6*v0 -4*v2 + 16 <= 0; value: 0 0: 2 5 3 1 1: 2 3 2: 1 2 5 3 3: 4 0: 3 -> 4 1: 0 -> -20 2: 4 -> -2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -6*v2 + 5*v3 -31 <= 0; value: -63 + -6*v2 -2*v3 + 5 <= 0; value: -17 + -2*v0 + 2*v1 + 4 = 0; value: 0 + 6*v0 -38 <= 0; value: -14 + 5*v0 + 2*v2 -1*v3 -31 <= 0; value: -7 0: 1 3 4 5 1: 3 2: 1 2 5 3: 1 2 5 optimal: 4 + + 4 <= 0; value: 4 + -6*v0 -6*v2 + 5*v3 -31 <= 0; value: -63 + -6*v2 -2*v3 + 5 <= 0; value: -17 - -2*v0 + 2*v1 + 4 = 0; value: 0 + 6*v0 -38 <= 0; value: -14 + 5*v0 + 2*v2 -1*v3 -31 <= 0; value: -7 0: 1 3 4 5 1: 3 2: 1 2 5 3: 1 2 5 0: 4 -> 4 1: 2 -> 2 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -34 < 0; value: -16 + 6*v1 + 6*v3 -8 < 0; value: -2 + -2*v1 + 5*v2 = 0; value: 0 + v1 + 6*v2 <= 0; value: 0 + -2*v0 + 3 <= 0; value: -3 0: 1 5 1: 2 3 4 2: 3 4 3: 2 optimal: oo + 2*v0 -5*v2 <= 0; value: 6 + 6*v0 -34 < 0; value: -16 + 15*v2 + 6*v3 -8 < 0; value: -2 - -2*v1 + 5*v2 = 0; value: 0 + 17/2*v2 <= 0; value: 0 + -2*v0 + 3 <= 0; value: -3 0: 1 5 1: 2 3 4 2: 3 4 2 3: 2 0: 3 -> 3 1: 0 -> 0 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -1*v0 -5*v1 -4*v3 + 28 <= 0; value: -2 + -1*v0 -2*v3 + 6 <= 0; value: -9 + 6*v1 -8 <= 0; value: -2 + -3*v0 + 4*v2 + 11 = 0; value: 0 + 5*v0 -4*v1 + 6*v3 -55 <= 0; value: -4 0: 1 2 4 5 1: 1 3 5 2: 4 3: 1 2 5 optimal: 284/21 + + 284/21 <= 0; value: 284/21 - -1*v0 -5*v1 -4*v3 + 28 <= 0; value: 0 + -61/7 <= 0; value: -61/7 - 56/23*v2 -186/23 <= 0; value: 0 - -3*v0 + 4*v2 + 11 = 0; value: 0 - 29/5*v0 + 46/5*v3 -387/5 <= 0; value: 0 0: 1 2 4 5 3 1: 1 3 5 2: 4 2 3 3: 1 2 5 3 0: 5 -> 170/21 1: 1 -> 4/3 2: 1 -> 93/28 3: 5 -> 139/42 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 <= 0; value: 0 + -2*v1 + 6*v2 + 8 <= 0; value: -2 + 3*v1 + v2 -32 < 0; value: -17 + 3*v2 <= 0; value: 0 + -2*v1 + 2*v2 -5*v3 + 6 < 0; value: -19 0: 1: 2 3 5 2: 1 2 3 4 5 3: 5 optimal: oo + 2*v0 -8 <= 0; value: -2 - -1*v2 <= 0; value: 0 - -2*v1 + 6*v2 + 8 <= 0; value: 0 + -20 < 0; value: -20 + <= 0; value: 0 + -5*v3 -2 < 0; value: -17 0: 1: 2 3 5 2: 1 2 3 4 5 3: 5 0: 3 -> 3 1: 5 -> 4 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -2*v3 <= 0; value: 0 + 3*v2 -4*v3 -12 = 0; value: 0 + -2*v2 -1*v3 -2 <= 0; value: -10 + 5*v1 <= 0; value: 0 + v1 <= 0; value: 0 0: 1: 4 5 2: 2 3 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -2*v3 <= 0; value: 0 + 3*v2 -4*v3 -12 = 0; value: 0 + -2*v2 -1*v3 -2 <= 0; value: -10 + 5*v1 <= 0; value: 0 + v1 <= 0; value: 0 0: 1: 4 5 2: 2 3 3: 1 2 3 0: 2 -> 2 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 3*v1 + 4*v2 + 2*v3 -37 < 0; value: -19 + -3*v0 -4*v1 -5*v3 + 18 <= 0; value: -9 + -5*v2 -5*v3 -11 <= 0; value: -31 + 6*v0 -25 <= 0; value: -7 + 2*v1 + 4*v3 -12 <= 0; value: 0 0: 2 4 1: 1 2 5 2: 1 3 3: 1 2 3 5 optimal: 21 + + 21 <= 0; value: 21 + 4*v2 -131/3 < 0; value: -107/3 - -3*v0 -4*v1 -5*v3 + 18 <= 0; value: 0 + -5*v2 -251/6 <= 0; value: -311/6 - 6*v0 -25 <= 0; value: 0 - -3/2*v0 + 3/2*v3 -3 <= 0; value: 0 0: 2 4 1 5 3 1: 1 2 5 2: 1 3 3: 1 2 3 5 0: 3 -> 25/6 1: 2 -> -19/3 2: 2 -> 2 3: 2 -> 37/6 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 = 0; value: 0 + 4*v0 -11 <= 0; value: -7 + 6*v2 + 4*v3 -84 < 0; value: -40 + 6*v1 <= 0; value: 0 + -2*v1 + 6*v3 -30 = 0; value: 0 0: 2 1: 1 4 5 2: 3 3: 3 5 optimal: 11/2 + + 11/2 <= 0; value: 11/2 - -3*v1 = 0; value: 0 - 4*v0 -11 <= 0; value: 0 + 6*v2 + 4*v3 -84 < 0; value: -40 + <= 0; value: 0 + 6*v3 -30 = 0; value: 0 0: 2 1: 1 4 5 2: 3 3: 3 5 0: 1 -> 11/4 1: 0 -> 0 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -3*v2 + 27 = 0; value: 0 + v2 + 4*v3 -71 < 0; value: -46 + -3*v1 + 6*v3 -79 <= 0; value: -52 + 2*v0 + v1 + 5*v3 -34 = 0; value: 0 + -6*v0 + v3 -9 <= 0; value: -28 0: 1 4 5 1: 3 4 2: 1 2 3: 2 3 4 5 optimal: oo + -22/7*v2 + 976/21 <= 0; value: 646/21 - -3*v0 -3*v2 + 27 = 0; value: 0 + 15/7*v2 -983/21 < 0; value: -758/21 - 6*v0 + 21*v3 -181 <= 0; value: 0 - 2*v0 + v1 + 5*v3 -34 = 0; value: 0 + 44/7*v2 -1196/21 <= 0; value: -536/21 0: 1 4 5 3 2 1: 3 4 2: 1 2 5 3: 2 3 4 5 0: 4 -> 4 1: 1 -> -239/21 2: 5 -> 5 3: 5 -> 157/21 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 + v1 + 4*v2 -11 <= 0; value: -7 + 4*v1 -6*v2 + v3 -39 <= 0; value: -23 + -2*v1 + 4*v2 -5*v3 + 3 <= 0; value: -5 + -2*v1 -4*v2 + 1 < 0; value: -7 + 4*v1 -1*v3 -19 <= 0; value: -3 0: 1 1: 1 2 3 4 5 2: 1 2 3 4 3: 2 3 5 optimal: oo + 8*v0 + 20 < 0; value: 20 - -3*v0 + 2*v2 -21/2 < 0; value: -2 + -93/5*v0 -1017/10 < 0; value: -1017/10 - -2*v1 + 4*v2 -5*v3 + 3 <= 0; value: 0 - -8*v2 + 5*v3 -2 < 0; value: -5 + -72/5*v0 -339/5 < 0; value: -339/5 0: 1 2 5 1: 1 2 3 4 5 2: 1 2 3 4 5 3: 2 3 5 4 1 0: 0 -> 0 1: 4 -> -11/2 2: 0 -> 17/4 3: 0 -> 31/5 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -9 < 0; value: -33 + -1*v0 + 3*v2 + 5*v3 -7 = 0; value: 0 + 4*v3 -4 <= 0; value: 0 + v1 + 3*v2 -10 <= 0; value: 0 + 5*v1 -4*v2 + v3 -35 <= 0; value: -22 0: 1 2 1: 4 5 2: 2 4 5 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -9 < 0; value: -33 + -1*v0 + 3*v2 + 5*v3 -7 = 0; value: 0 + 4*v3 -4 <= 0; value: 0 + v1 + 3*v2 -10 <= 0; value: 0 + 5*v1 -4*v2 + v3 -35 <= 0; value: -22 0: 1 2 1: 4 5 2: 2 4 5 3: 2 3 5 0: 4 -> 4 1: 4 -> 4 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 -5*v2 + 5 <= 0; value: -14 + -1*v1 + 5*v3 -5 <= 0; value: -2 + 5*v0 + 6*v2 -18 <= 0; value: 0 + -5*v2 -2 <= 0; value: -17 + 3*v0 -2*v1 + 6*v2 -23 <= 0; value: -9 0: 3 5 1: 1 2 5 2: 1 3 4 5 3: 2 optimal: 305/37 + + 305/37 <= 0; value: 305/37 - -3*v0 -11*v2 + 28 <= 0; value: 0 - -1*v1 + 5*v3 -5 <= 0; value: 0 - 37/11*v0 -30/11 <= 0; value: 0 + -504/37 <= 0; value: -504/37 - 3*v0 + 6*v2 -10*v3 -13 <= 0; value: 0 0: 3 5 1 4 1: 1 2 5 2: 1 3 4 5 3: 2 1 5 0: 0 -> 30/37 1: 2 -> -245/74 2: 3 -> 86/37 3: 1 -> 25/74 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 = 0; value: 0 + -2*v2 -3*v3 + 8 < 0; value: -4 + 2*v3 -4 <= 0; value: 0 + -2*v0 -5*v1 -1 < 0; value: -11 + v2 + 3*v3 -20 <= 0; value: -11 0: 4 1: 1 4 2: 2 5 3: 2 3 5 optimal: oo + 2*v0 <= 0; value: 10 - -1*v1 = 0; value: 0 + -2*v2 -3*v3 + 8 < 0; value: -4 + 2*v3 -4 <= 0; value: 0 + -2*v0 -1 < 0; value: -11 + v2 + 3*v3 -20 <= 0; value: -11 0: 4 1: 1 4 2: 2 5 3: 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 3*v2 -5*v3 + 14 = 0; value: 0 + -6*v0 + 5*v2 -4 <= 0; value: -12 + -5*v1 + 5*v3 -14 < 0; value: -29 + 3*v3 -3 <= 0; value: 0 + -6*v0 + v1 -3*v2 + 20 = 0; value: 0 0: 1 2 5 1: 3 5 2: 1 2 5 3: 1 3 4 optimal: oo + 15/2*v0 -10 < 0; value: 25/2 - -5*v0 + 3*v2 -5*v3 + 14 = 0; value: 0 + -247/12*v0 + 113/3 < 0; value: -289/12 - -55*v0 -20*v3 + 156 < 0; value: -29/2 + -33/4*v0 + 102/5 < 0; value: -87/20 - -6*v0 + v1 -3*v2 + 20 = 0; value: 0 0: 1 2 5 3 4 1: 3 5 2: 1 2 5 3 3: 1 3 4 2 0: 3 -> 3 1: 4 -> 3/8 2: 2 -> 19/24 3: 1 -> 11/40 + 2*v0 -2*v1 <= 0; value: -4 + -5*v1 + 2 <= 0; value: -8 + 5*v2 -16 <= 0; value: -6 + 3*v0 -1*v2 + 1 < 0; value: -1 + 2*v1 + 3*v2 -25 <= 0; value: -15 + -1*v1 <= 0; value: -2 0: 3 1: 1 4 5 2: 2 3 4 3: optimal: (2/3 -e*1) + + 2/3 < 0; value: 2/3 - -5*v1 + 2 <= 0; value: 0 - 5*v2 -16 <= 0; value: 0 - 3*v0 -1*v2 + 1 < 0; value: -11/10 + -73/5 <= 0; value: -73/5 + -2/5 <= 0; value: -2/5 0: 3 1: 1 4 5 2: 2 3 4 3: 0: 0 -> 11/30 1: 2 -> 2/5 2: 2 -> 16/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -1*v3 + 3 <= 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -2*v1 -5*v3 -7 <= 0; value: -30 + 6*v0 -4*v2 -6*v3 + 4 <= 0; value: -18 + -3*v0 + v2 -1 <= 0; value: 0 0: 1 4 5 1: 3 2: 2 4 5 3: 1 3 4 optimal: oo + 2*v0 + 5*v3 + 7 <= 0; value: 22 + -5*v0 -1*v3 + 3 <= 0; value: 0 + -1*v2 + 1 <= 0; value: 0 - -2*v1 -5*v3 -7 <= 0; value: 0 + 6*v0 -4*v2 -6*v3 + 4 <= 0; value: -18 + -3*v0 + v2 -1 <= 0; value: 0 0: 1 4 5 1: 3 2: 2 4 5 3: 1 3 4 0: 0 -> 0 1: 4 -> -11 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + 4*v1 -27 <= 0; value: -15 + -2*v0 -6*v2 -5 < 0; value: -31 + 2*v1 -3*v3 -6 = 0; value: 0 + -3*v2 + 5*v3 + 7 < 0; value: -5 + v0 -6*v1 + 17 = 0; value: 0 0: 2 5 1: 1 3 5 2: 2 4 3: 3 4 optimal: (67/2 -e*1) + + 67/2 < 0; value: 67/2 - 18/5*v2 -117/5 <= 0; value: 0 + -91 < 0; value: -91 - 2*v1 -3*v3 -6 = 0; value: 0 - 5/9*v0 -3*v2 + 58/9 < 0; value: -5/9 - v0 -9*v3 -1 = 0; value: 0 0: 2 5 4 1 1: 1 3 5 2: 2 4 1 3: 3 4 5 1 0: 1 -> 45/2 1: 3 -> 79/12 2: 4 -> 13/2 3: 0 -> 43/18 + 2*v0 -2*v1 <= 0; value: 6 + 3*v1 -2*v2 -3 = 0; value: 0 + 6*v0 -2*v1 -22 = 0; value: 0 + 3*v2 -4*v3 + 8 = 0; value: 0 + -5*v0 -3*v2 + 20 = 0; value: 0 + -5*v2 -3*v3 + 4 < 0; value: -2 0: 2 4 1: 1 2 2: 1 3 4 5 3: 3 5 optimal: 6 + + 6 <= 0; value: 6 - 3*v1 -2*v2 -3 = 0; value: 0 - 74/9*v0 -296/9 = 0; value: 0 - 3*v2 -4*v3 + 8 = 0; value: 0 - -5*v0 -4*v3 + 28 = 0; value: 0 + -2 < 0; value: -2 0: 2 4 5 1: 1 2 2: 1 3 4 5 2 3: 3 5 4 2 0: 4 -> 4 1: 1 -> 1 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 + v2 -1*v3 -3 <= 0; value: -10 + 6*v0 -5*v2 -1 <= 0; value: -3 + 3*v0 -4*v1 + 3 = 0; value: 0 + -1*v0 + v3 -5 < 0; value: -3 + 3*v0 -16 < 0; value: -7 0: 1 2 3 4 5 1: 3 2: 1 2 3: 1 4 optimal: (7/6 -e*1) + + 7/6 < 0; value: 7/6 + -1*v3 -112/15 < 0; value: -187/15 - 6*v0 -5*v2 -1 <= 0; value: 0 - 3*v0 -4*v1 + 3 = 0; value: 0 + v3 -31/3 < 0; value: -16/3 - 5/2*v2 -31/2 < 0; value: -5/2 0: 1 2 3 4 5 1: 3 2: 1 2 5 4 3: 1 4 0: 3 -> 9/2 1: 3 -> 33/8 2: 4 -> 26/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 -33 <= 0; value: -15 + 3*v2 <= 0; value: 0 + 5*v0 -3*v1 -3*v3 -7 < 0; value: -16 + 6*v2 -3*v3 + 12 <= 0; value: 0 + -4*v1 -4*v2 + 16 = 0; value: 0 0: 1 3 1: 3 5 2: 2 4 5 3: 3 4 optimal: 3 + + 3 <= 0; value: 3 - 6*v0 -33 <= 0; value: 0 - 3*v2 <= 0; value: 0 + -3*v3 + 17/2 < 0; value: -7/2 + -3*v3 + 12 <= 0; value: 0 - -4*v1 -4*v2 + 16 = 0; value: 0 0: 1 3 1: 3 5 2: 2 4 5 3 3: 3 4 0: 3 -> 11/2 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 -5*v3 -14 <= 0; value: -34 + -6*v0 -5*v3 <= 0; value: -5 + 2*v1 -6*v3 <= 0; value: 0 + 4*v0 -3*v1 -3*v3 -10 < 0; value: -22 + 2*v0 + 6*v1 -1*v2 -17 = 0; value: 0 0: 2 4 5 1: 1 3 4 5 2: 5 3: 1 2 3 4 optimal: oo + 2*v0 + 2*v3 + 28/5 <= 0; value: 38/5 - 5/3*v0 -5/6*v2 -5*v3 -169/6 <= 0; value: 0 + -6*v0 -5*v3 <= 0; value: -5 + -8*v3 -28/5 <= 0; value: -68/5 + 4*v0 -8/5 < 0; value: -8/5 - 2*v0 + 6*v1 -1*v2 -17 = 0; value: 0 0: 2 4 5 1 3 1: 1 3 4 5 2: 5 4 1 3 3: 1 2 3 4 0: 0 -> 0 1: 3 -> -19/5 2: 1 -> -199/5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 2*v1 -1 <= 0; value: -9 + -2*v2 -1 < 0; value: -3 + -1*v0 -1*v1 -2*v2 + 4 = 0; value: 0 + 4*v1 -1*v3 + 2 <= 0; value: 0 + -2*v2 + 4*v3 -6 = 0; value: 0 0: 1 3 1: 1 3 4 2: 2 3 5 3: 4 5 optimal: oo + 4*v0 + 8*v3 -20 <= 0; value: 4 + -6*v0 -8*v3 + 19 <= 0; value: -9 + -4*v3 + 5 < 0; value: -3 - -1*v0 -1*v1 -2*v2 + 4 = 0; value: 0 + -4*v0 -17*v3 + 42 <= 0; value: 0 - -2*v2 + 4*v3 -6 = 0; value: 0 0: 1 3 4 1: 1 3 4 2: 2 3 5 1 4 3: 4 5 2 1 0: 2 -> 2 1: 0 -> 0 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -6*v3 -20 <= 0; value: -68 + -6*v3 + 26 < 0; value: -4 + -6*v0 -2*v1 -2*v3 -18 <= 0; value: -54 + v1 -5*v3 + 1 < 0; value: -20 + 2*v0 + 5*v3 -49 <= 0; value: -18 0: 1 3 5 1: 3 4 2: 3: 1 2 3 4 5 optimal: (136 -e*1) + + 136 < 0; value: 136 + -128 < 0; value: -128 - 12/5*v0 -164/5 < 0; value: -12/5 - -6*v0 -2*v1 -2*v3 -18 <= 0; value: 0 + -75 < 0; value: -75 - 2*v0 + 5*v3 -49 <= 0; value: 0 0: 1 3 5 4 2 1: 3 4 2: 3: 1 2 3 4 5 0: 3 -> 38/3 1: 4 -> -776/15 2: 2 -> 2 3: 5 -> 71/15 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 + 2*v2 -2*v3 -12 <= 0; value: -4 + -6*v0 -4 < 0; value: -22 + 4*v1 -5*v2 -4*v3 + 10 <= 0; value: 0 + 3*v3 -19 < 0; value: -7 + 4*v0 -1*v1 -2*v3 <= 0; value: 0 0: 2 5 1: 1 3 5 2: 1 3 3: 1 3 4 5 optimal: (88/3 -e*1) + + 88/3 < 0; value: 88/3 + 2*v2 -212/3 < 0; value: -200/3 - -6*v0 -4 < 0; value: -6 + -5*v2 -230/3 < 0; value: -260/3 - 3*v3 -19 < 0; value: -3 - 4*v0 -1*v1 -2*v3 <= 0; value: 0 0: 2 5 1 3 1: 1 3 5 2: 1 3 3: 1 3 4 5 0: 3 -> 1/3 1: 4 -> -28/3 2: 2 -> 2 3: 4 -> 16/3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v2 + 2 < 0; value: -6 + 2*v1 + 4*v3 -20 < 0; value: -10 + 6*v1 + v2 + 4*v3 -97 < 0; value: -63 + -4*v1 + 20 = 0; value: 0 + <= 0; value: 0 0: 1: 2 3 4 2: 1 3 3: 2 3 optimal: oo + 2*v0 -10 <= 0; value: -2 + -2*v2 + 2 < 0; value: -6 + 4*v3 -10 < 0; value: -10 + v2 + 4*v3 -67 < 0; value: -63 - -4*v1 + 20 = 0; value: 0 + <= 0; value: 0 0: 1: 2 3 4 2: 1 3 3: 2 3 0: 4 -> 4 1: 5 -> 5 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 -1*v3 -36 <= 0; value: -21 + 6*v1 + 6*v2 -36 = 0; value: 0 + 4*v0 -4*v2 -3 <= 0; value: -7 + -1*v2 -1*v3 -3 < 0; value: -8 + 6*v1 + 5*v2 -42 <= 0; value: -10 0: 3 1: 2 5 2: 1 2 3 4 5 3: 1 4 optimal: oo + 2*v0 + 1/2*v3 + 6 <= 0; value: 25/2 - 4*v2 -1*v3 -36 <= 0; value: 0 - 6*v1 + 6*v2 -36 = 0; value: 0 + 4*v0 -1*v3 -39 <= 0; value: -28 + -5/4*v3 -12 < 0; value: -53/4 + -1/4*v3 -15 <= 0; value: -61/4 0: 3 1: 2 5 2: 1 2 3 4 5 3: 1 4 3 5 0: 3 -> 3 1: 2 -> -13/4 2: 4 -> 37/4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + 2*v2 + 4 < 0; value: -6 + -5*v1 -6*v3 -4 < 0; value: -33 + 5*v0 -6*v3 < 0; value: -4 + 2*v0 -6*v3 -8 <= 0; value: -24 + 4*v0 + v2 -5*v3 -1 <= 0; value: 0 0: 1 3 4 5 1: 2 2: 1 5 3: 2 3 4 5 optimal: oo + 2*v0 + 12/5*v3 + 8/5 < 0; value: 96/5 + -5*v0 + 2*v2 + 4 < 0; value: -6 - -5*v1 -6*v3 -4 < 0; value: -5 + 5*v0 -6*v3 < 0; value: -4 + 2*v0 -6*v3 -8 <= 0; value: -24 + 4*v0 + v2 -5*v3 -1 <= 0; value: 0 0: 1 3 4 5 1: 2 2: 1 5 3: 2 3 4 5 0: 4 -> 4 1: 1 -> -23/5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -2*v2 + 2*v3 -26 = 0; value: 0 + -4*v0 -6*v1 -2*v2 + 8 <= 0; value: -8 + 4*v1 -6*v2 -6*v3 -5 < 0; value: -11 + -5*v0 + 5*v1 -8 <= 0; value: -28 + 2*v0 -3*v1 -15 <= 0; value: -7 0: 1 2 4 5 1: 2 3 4 5 2: 1 2 3 3: 1 3 optimal: (1361/103 -e*1) + + 1361/103 < 0; value: 1361/103 - 6*v0 -2*v2 + 2*v3 -26 = 0; value: 0 - -4*v0 -6*v1 -2*v2 + 8 <= 0; value: 0 - 206/3*v0 -331 < 0; value: -169/6 + -8453/206 < 0; value: -8453/206 - 7*v0 + v3 -32 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 4 5 2: 1 2 3 5 4 3: 1 3 5 4 0: 4 -> 1817/412 1: 0 -> -1273/618 2: 0 -> 140/103 3: 1 -> 465/412 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 5*v2 + 4*v3 + 16 = 0; value: 0 + 5*v1 -2*v2 + 4*v3 -29 = 0; value: 0 + -3*v0 -2*v2 + 9 <= 0; value: -3 + 2*v1 + 2*v2 -28 <= 0; value: -18 + -4*v1 -12 < 0; value: -32 0: 1 3 1: 2 4 5 2: 1 2 3 4 3: 1 2 optimal: (552/31 -e*1) + + 552/31 < 0; value: 552/31 - -5*v0 + 5*v2 + 4*v3 + 16 = 0; value: 0 - 5*v1 -2*v2 + 4*v3 -29 = 0; value: 0 - -3*v0 -2*v2 + 9 <= 0; value: 0 + -1324/31 < 0; value: -1324/31 - 62/5*v0 -366/5 < 0; value: -59/5 0: 1 3 5 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 5 4 0: 4 -> 307/62 1: 5 -> -1/20 2: 0 -> -363/124 3: 1 -> 2901/496 + 2*v0 -2*v1 <= 0; value: -8 + -2*v2 -3*v3 -1 <= 0; value: -10 + 2*v0 -5*v1 -1*v3 + 24 = 0; value: 0 + -5*v1 -1*v3 -9 <= 0; value: -35 + -6*v1 -1*v3 + 31 = 0; value: 0 + -2*v1 -5*v2 + 5*v3 + 20 = 0; value: 0 0: 2 1: 2 3 4 5 2: 1 5 3: 1 2 3 4 5 optimal: oo + 15/32*v2 -301/32 <= 0; value: -8 + -77/16*v2 + 71/16 <= 0; value: -10 - 2*v0 -5*v1 -1*v3 + 24 = 0; value: 0 + -5/32*v2 -1105/32 <= 0; value: -35 - -12/5*v0 + 1/5*v3 + 11/5 = 0; value: 0 - 64*v0 -5*v2 -49 = 0; value: 0 0: 2 3 4 5 1 1: 2 3 4 5 2: 1 5 3 3: 1 2 3 4 5 0: 1 -> 1 1: 5 -> 5 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 6*v0 -4*v1 + 8 = 0; value: 0 + -4*v1 -6 <= 0; value: -14 + 2*v0 <= 0; value: 0 + -3*v1 + 1 <= 0; value: -5 + -4*v0 + 4*v3 -20 <= 0; value: -4 0: 1 3 5 1: 1 2 4 2: 3: 5 optimal: -26/9 + -26/9 <= 0; value: -26/9 - 6*v0 -4*v1 + 8 = 0; value: 0 + -22/3 <= 0; value: -22/3 + -20/9 <= 0; value: -20/9 - -9/2*v3 + 35/2 <= 0; value: 0 - -4*v0 + 4*v3 -20 <= 0; value: 0 0: 1 3 5 2 4 1: 1 2 4 2: 3: 5 2 4 3 0: 0 -> -10/9 1: 2 -> 1/3 2: 1 -> 1 3: 4 -> 35/9 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v3 + 6 <= 0; value: -4 + -4*v1 -1 < 0; value: -5 + -4*v0 + 4*v1 -3 < 0; value: -19 + -5*v1 -2 < 0; value: -7 + 5*v0 -6*v3 -25 = 0; value: 0 0: 1 3 5 1: 2 3 4 2: 3: 1 5 optimal: (53/2 -e*1) + + 53/2 < 0; value: 53/2 - 3/5*v3 -4 <= 0; value: 0 - -4*v1 -1 < 0; value: -5/2 + -56 < 0; value: -56 + -3/4 <= 0; value: -3/4 - 5*v0 -6*v3 -25 = 0; value: 0 0: 1 3 5 1: 2 3 4 2: 3: 1 5 3 0: 5 -> 13 1: 1 -> 3/8 2: 2 -> 2 3: 0 -> 20/3 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 -2*v1 + 13 <= 0; value: -1 + 4*v1 + 4*v2 -24 = 0; value: 0 + 5*v2 -11 <= 0; value: -6 + 5*v2 -9 < 0; value: -4 + -1*v0 -4*v2 + 3 <= 0; value: -5 0: 1 5 1: 1 2 2: 2 3 4 5 3: optimal: (4/5 -e*1) + + 4/5 < 0; value: 4/5 - -1*v0 + 2*v2 + 1 <= 0; value: 0 - 4*v1 + 4*v2 -24 = 0; value: 0 + -2 <= 0; value: -2 - 5/2*v0 -23/2 < 0; value: -3/4 + -44/5 < 0; value: -44/5 0: 1 5 3 4 1: 1 2 2: 2 3 4 5 1 3: 0: 4 -> 43/10 1: 5 -> 87/20 2: 1 -> 33/20 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -3*v1 + 1 <= 0; value: -2 + 3*v0 + 5*v1 -1*v2 -8 = 0; value: 0 + 2*v0 -6*v3 + 19 < 0; value: -3 + -4*v0 -4*v3 -14 <= 0; value: -34 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 2 2: 2 3: 3 4 5 optimal: -2/3 + -2/3 <= 0; value: -2/3 - 24/5*v0 -3/5*v2 -19/5 <= 0; value: 0 - 3*v0 + 5*v1 -1*v2 -8 = 0; value: 0 + 2*v0 -6*v3 + 19 < 0; value: -3 + -4*v0 -4*v3 -14 <= 0; value: -34 + 6*v3 -24 = 0; value: 0 0: 1 2 3 4 1: 1 2 2: 2 1 3: 3 4 5 0: 1 -> 1 1: 2 -> 4/3 2: 5 -> 5/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 -1*v2 -13 < 0; value: -5 + 5*v0 -5*v2 + 4*v3 -28 <= 0; value: -17 + -5*v0 -1*v2 -14 < 0; value: -33 + 3*v2 -19 < 0; value: -7 + -1*v0 + 5*v2 -35 < 0; value: -18 0: 1 2 3 5 1: 2: 1 2 3 4 5 3: 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 4*v0 -1*v2 -13 < 0; value: -5 + 5*v0 -5*v2 + 4*v3 -28 <= 0; value: -17 + -5*v0 -1*v2 -14 < 0; value: -33 + 3*v2 -19 < 0; value: -7 + -1*v0 + 5*v2 -35 < 0; value: -18 0: 1 2 3 5 1: 2: 1 2 3 4 5 3: 2 0: 3 -> 3 1: 0 -> 0 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -1*v1 -1*v3 -14 < 0; value: -29 + 2*v0 + 6*v3 -21 <= 0; value: -5 + 5*v2 -1*v3 -13 <= 0; value: 0 + -3*v1 + 4*v2 -3*v3 -5 < 0; value: -2 + 6*v0 -1*v2 -9 = 0; value: 0 0: 1 2 5 1: 1 4 2: 3 4 5 3: 1 2 3 4 optimal: (2185/63 -e*1) + + 2185/63 < 0; value: 2185/63 - -14*v0 -1/3 <= 0; value: 0 - 2*v0 + 6*v3 -21 <= 0; value: 0 + -560/9 <= 0; value: -560/9 - -3*v1 + 4*v2 -3*v3 -5 < 0; value: -3 - 6*v0 -1*v2 -9 = 0; value: 0 0: 1 2 5 3 1: 1 4 2: 3 4 5 1 3: 1 2 3 4 0: 2 -> -1/42 1: 1 -> -1031/63 2: 3 -> -64/7 3: 2 -> 221/63 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 <= 0; value: -4 + -6*v1 + v2 + 8 < 0; value: -2 + v0 -1*v3 <= 0; value: 0 + = 0; value: 0 + -6*v0 -4*v1 + 15 <= 0; value: -17 0: 3 5 1: 1 2 5 2: 2 3: 3 optimal: oo + 2*v3 < 0; value: 8 - -1/3*v2 -8/3 <= 0; value: 0 - -6*v1 + v2 + 8 < 0; value: -6 - v0 -1*v3 <= 0; value: 0 + = 0; value: 0 + -6*v3 + 15 <= 0; value: -9 0: 3 5 1: 1 2 5 2: 2 1 5 3: 3 5 0: 4 -> 4 1: 2 -> 1 2: 2 -> -8 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -18 = 0; value: 0 + 4*v0 -1*v3 -20 < 0; value: -8 + -4*v1 + 5*v3 <= 0; value: 0 + v2 -8 <= 0; value: -3 + -4*v0 + 2*v1 + 3*v3 + 5 <= 0; value: -7 0: 1 2 5 1: 3 5 2: 4 3: 2 3 5 optimal: (26 -e*1) + + 26 < 0; value: 26 - 6*v0 -18 = 0; value: 0 - 4*v0 -1*v3 -20 < 0; value: -1 - -4*v1 + 5*v3 <= 0; value: 0 + v2 -8 <= 0; value: -3 + -51 < 0; value: -51 0: 1 2 5 1: 3 5 2: 4 3: 2 3 5 0: 3 -> 3 1: 0 -> -35/4 2: 5 -> 5 3: 0 -> -7 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 6*v1 -17 <= 0; value: -5 + 3*v2 + 5*v3 -16 = 0; value: 0 + -3*v3 + 6 = 0; value: 0 + 3*v1 + v3 -14 = 0; value: 0 + 4*v1 -5*v2 -6 = 0; value: 0 0: 1 1: 1 4 5 2: 2 5 3: 2 3 4 optimal: oo + 2*v0 -8 <= 0; value: -2 + -4*v0 + 7 <= 0; value: -5 - 3*v2 + 5*v3 -16 = 0; value: 0 + = 0; value: 0 - 3*v1 + v3 -14 = 0; value: 0 - -21/5*v2 + 42/5 = 0; value: 0 0: 1 1: 1 4 5 2: 2 5 3 1 3: 2 3 4 5 1 0: 3 -> 3 1: 4 -> 4 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 6*v2 -64 <= 0; value: -38 + 3*v2 -15 = 0; value: 0 + -1*v0 -5*v1 -8 < 0; value: -18 + -1*v1 -1*v3 + 3 <= 0; value: 0 + -5*v3 + 5 = 0; value: 0 0: 3 1: 1 3 4 2: 1 2 3: 4 5 optimal: oo + 2*v0 -4 <= 0; value: -4 + 6*v2 -68 <= 0; value: -38 + 3*v2 -15 = 0; value: 0 + -1*v0 -18 < 0; value: -18 - -1*v1 -1*v3 + 3 <= 0; value: 0 - -5*v3 + 5 = 0; value: 0 0: 3 1: 1 3 4 2: 1 2 3: 4 5 1 3 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -3*v1 + v2 -5 <= 0; value: 0 + -3*v0 + 3 = 0; value: 0 + -1*v0 -5*v1 <= 0; value: -1 + -4*v3 -2 <= 0; value: -22 + -6*v1 -3*v2 + 15 = 0; value: 0 0: 2 3 1: 1 3 5 2: 1 5 3: 4 optimal: 2 + + 2 <= 0; value: 2 - -3*v1 + v2 -5 <= 0; value: 0 - -3*v0 + 3 = 0; value: 0 + -1 <= 0; value: -1 + -4*v3 -2 <= 0; value: -22 - -5*v2 + 25 = 0; value: 0 0: 2 3 1: 1 3 5 2: 1 5 3 3: 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 + v2 -4*v3 -1 < 0; value: -13 + 6*v0 + 6*v1 -2*v3 -10 = 0; value: 0 + 6*v0 -5*v1 + 5*v3 -46 < 0; value: -19 + -1*v0 -6*v1 + 4*v3 -9 <= 0; value: -1 + -3*v2 + 2 < 0; value: -4 0: 2 3 4 1: 1 2 3 4 2: 1 5 3: 1 2 3 4 optimal: (911/57 -e*1) + + 911/57 < 0; value: 911/57 - -2*v0 + v2 -10/3*v3 + 7/3 < 0; value: -10/3 - 6*v0 + 6*v1 -2*v3 -10 = 0; value: 0 + -604/57 <= 0; value: -604/57 - 19/5*v0 -86/5 < 0; value: -19/5 - -3*v2 + 2 < 0; value: -2 0: 2 3 4 1 1: 1 2 3 4 2: 1 5 3 4 3: 1 2 3 4 0: 2 -> 67/19 1: 1 -> -1063/570 2: 2 -> 4/3 3: 4 -> -3/190 + 2*v0 -2*v1 <= 0; value: -4 + 4*v0 -3*v1 -1*v3 -6 <= 0; value: -15 + -1*v0 + 2*v1 -14 <= 0; value: -8 + v0 + 4*v2 -5*v3 -4 <= 0; value: -15 + 5*v1 -6*v2 -2 = 0; value: 0 + -6*v0 -3*v1 -1*v2 -8 <= 0; value: -35 0: 1 2 3 5 1: 1 2 4 5 2: 3 4 5 3: 1 3 optimal: oo + 118/23*v0 + 4 <= 0; value: 328/23 - 4*v0 -18/5*v2 -1*v3 -36/5 <= 0; value: 0 + -95/23*v0 -18 <= 0; value: -604/23 + -1097/23*v0 -12 <= 0; value: -2470/23 - 5*v1 -6*v2 -2 = 0; value: 0 - -100/9*v0 + 23/18*v3 <= 0; value: 0 0: 1 2 3 5 1: 1 2 4 5 2: 3 4 5 1 2 3: 1 3 5 2 0: 2 -> 2 1: 4 -> -118/23 2: 3 -> -106/23 3: 5 -> 400/23 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -6*v1 + 2 <= 0; value: -10 + <= 0; value: 0 + 2*v0 -6*v3 -10 <= 0; value: -2 + 6*v0 -3*v2 + 2*v3 -45 <= 0; value: -24 + -4*v0 + 4*v1 <= 0; value: 0 0: 1 3 4 5 1: 1 5 2: 4 3: 3 4 optimal: oo + 9/20*v2 + 79/12 <= 0; value: 211/30 - 3*v0 -6*v1 + 2 <= 0; value: 0 + <= 0; value: 0 - 2*v0 -6*v3 -10 <= 0; value: 0 - -3*v2 + 20*v3 -15 <= 0; value: 0 + -9/10*v2 -79/6 <= 0; value: -211/15 0: 1 3 4 5 1: 1 5 2: 4 5 3: 3 4 5 0: 4 -> 77/10 1: 4 -> 251/60 2: 1 -> 1 3: 0 -> 9/10 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 + 2*v2 + 4*v3 + 2 <= 0; value: -2 + -4*v1 -3*v2 + 31 = 0; value: 0 + -4*v0 -5*v2 + 3*v3 + 16 <= 0; value: -17 + -1*v1 -6*v3 + 28 = 0; value: 0 + -2*v0 + v2 -2*v3 + 13 = 0; value: 0 0: 1 3 5 1: 2 4 2: 1 2 3 5 3: 1 3 4 5 optimal: 20 + + 20 <= 0; value: 20 - 2/3*v0 -16/3 <= 0; value: 0 - -4*v1 -3*v2 + 31 = 0; value: 0 + -66 <= 0; value: -66 - 3/2*v0 -9/2*v3 + 21/2 = 0; value: 0 - -2*v0 + v2 -2*v3 + 13 = 0; value: 0 0: 1 3 5 4 1: 2 4 2: 1 2 3 5 4 3: 1 3 4 5 0: 5 -> 8 1: 4 -> -2 2: 5 -> 13 3: 4 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + 4*v2 -8 = 0; value: 0 + -4*v3 -1 <= 0; value: -13 + -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v2 + 5*v3 -58 < 0; value: -31 + 6*v2 -31 < 0; value: -19 0: 1: 3 2: 1 4 5 3: 2 3 4 optimal: oo + 2*v0 + 17/12 <= 0; value: 113/12 + 4*v2 -8 = 0; value: 0 - -4*v3 -1 <= 0; value: 0 - -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v2 -237/4 < 0; value: -189/4 + 6*v2 -31 < 0; value: -19 0: 1: 3 2: 1 4 5 3: 2 3 4 0: 4 -> 4 1: 2 -> -17/24 2: 2 -> 2 3: 3 -> -1/4 + 2*v0 -2*v1 <= 0; value: 10 + 3*v0 + v3 -19 < 0; value: -2 + 6*v1 -3*v2 -2*v3 + 7 <= 0; value: 0 + 6*v0 + 4*v3 -41 <= 0; value: -3 + 4*v1 + 6*v2 + 4*v3 -14 = 0; value: 0 + -3*v0 -6*v1 + 11 <= 0; value: -4 0: 1 3 5 1: 2 4 5 2: 2 4 3: 1 2 3 4 optimal: (83/6 -e*1) + + 83/6 < 0; value: 83/6 - 9/8*v2 -37/16 < 0; value: -19/32 + -26/3 < 0; value: -26/3 - 8*v0 -6*v2 -103/3 <= 0; value: 0 - 4*v1 + 6*v2 + 4*v3 -14 = 0; value: 0 - -3*v0 + 9*v2 + 6*v3 -10 <= 0; value: 0 0: 1 3 5 2 1: 2 4 5 2: 2 4 5 1 3 2 3: 1 2 3 4 5 0: 5 -> 87/16 1: 0 -> -85/96 2: 1 -> 55/36 3: 2 -> 67/32 + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 -6*v3 -2 <= 0; value: -17 + -4*v0 + 5*v2 -6*v3 + 9 < 0; value: -27 + -4*v0 + 3*v1 -4*v3 -11 <= 0; value: -30 + 6*v3 -25 < 0; value: -1 + 2*v2 + 3*v3 -18 < 0; value: -6 0: 2 3 1: 1 3 2: 1 2 5 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 -6*v3 -2 <= 0; value: -17 + -4*v0 + 5*v2 -6*v3 + 9 < 0; value: -27 + -4*v0 + 3*v1 -4*v3 -11 <= 0; value: -30 + 6*v3 -25 < 0; value: -1 + 2*v2 + 3*v3 -18 < 0; value: -6 0: 2 3 1: 1 3 2: 1 2 5 3: 1 2 3 4 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 -1*v2 + 2*v3 + 8 <= 0; value: 0 + -5*v0 + 6*v1 + 6*v2 -13 < 0; value: -4 + 3*v1 -6*v3 <= 0; value: 0 + 4*v1 -2*v2 + 2*v3 -20 = 0; value: 0 + -4*v0 + 4*v1 -4 = 0; value: 0 0: 2 5 1: 1 2 3 4 5 2: 1 2 4 3: 1 3 4 optimal: -2 + -2 <= 0; value: -2 - -3*v1 -1*v2 + 2*v3 + 8 <= 0; value: 0 + -4 < 0; value: -4 - -1*v2 -4*v3 + 8 <= 0; value: 0 - -9/2*v2 = 0; value: 0 - -4*v0 + 12 = 0; value: 0 0: 2 5 1: 1 2 3 4 5 2: 1 2 4 5 3 3: 1 3 4 5 2 0: 3 -> 3 1: 4 -> 4 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -3*v1 -6*v2 + 35 < 0; value: -1 + v1 -3*v2 + 1 < 0; value: -12 + -2*v0 -1*v2 + 6*v3 -16 < 0; value: -1 + 2*v1 -5*v3 -5 <= 0; value: -21 + v1 -4*v3 -11 <= 0; value: -25 0: 3 1: 1 2 4 5 2: 1 2 3 3: 3 4 5 optimal: oo + 2*v0 + 4*v2 -70/3 < 0; value: 2/3 - -3*v1 -6*v2 + 35 < 0; value: -1/2 + -5*v2 + 38/3 < 0; value: -37/3 + -2*v0 -1*v2 + 6*v3 -16 < 0; value: -1 + -4*v2 -5*v3 + 55/3 < 0; value: -65/3 + -2*v2 -4*v3 + 2/3 < 0; value: -76/3 0: 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 3 4 5 0: 2 -> 2 1: 2 -> 11/6 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 5*v2 -2*v3 -3 <= 0; value: 0 + -1*v1 + 5*v2 + 6*v3 -5 = 0; value: 0 + -2*v0 + 6*v1 + 2*v2 -8 < 0; value: -4 + 4*v0 -1*v3 -5 < 0; value: -2 + 5*v0 -6*v1 + 4*v2 + 1 <= 0; value: 0 0: 3 4 5 1: 1 2 3 5 2: 1 2 3 5 3: 1 2 4 optimal: oo + 1/3*v0 -4/3*v2 -1/3 <= 0; value: 0 + 35/9*v0 + 88/9*v2 -35/9 <= 0; value: 0 - -1*v1 + 5*v2 + 6*v3 -5 = 0; value: 0 + 3*v0 + 6*v2 -7 < 0; value: -4 + 139/36*v0 + 13/18*v2 -211/36 < 0; value: -2 - 5*v0 -26*v2 -36*v3 + 31 <= 0; value: 0 0: 3 4 5 1 1: 1 2 3 5 2: 1 2 3 5 4 3: 1 2 4 5 3 0: 1 -> 1 1: 1 -> 1 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -6*v2 + 5*v3 -15 < 0; value: -32 + -1*v1 + 5*v3 -13 = 0; value: 0 + 4*v1 -4*v2 -6*v3 + 20 < 0; value: -6 + -2*v0 -6*v1 + 22 = 0; value: 0 + v1 -3*v2 + 10 = 0; value: 0 0: 4 1: 1 2 3 4 5 2: 1 3 5 3: 1 2 3 optimal: (286/5 -e*1) + + 286/5 < 0; value: 286/5 - -15*v2 + 28 < 0; value: -15 - -1*v1 + 5*v3 -13 = 0; value: 0 + -1154/75 < 0; value: -1154/75 - -2*v0 -30*v3 + 100 = 0; value: 0 - -1/3*v0 -3*v2 + 41/3 = 0; value: 0 0: 4 1 5 3 1: 1 2 3 4 5 2: 1 3 5 3: 1 2 3 4 5 0: 5 -> 76/5 1: 2 -> -7/5 2: 4 -> 43/15 3: 3 -> 58/25 + 2*v0 -2*v1 <= 0; value: 0 + 3*v2 -6 = 0; value: 0 + -6*v0 -1*v3 + 7 = 0; value: 0 + -4*v0 -3*v2 + 3 <= 0; value: -7 + -3*v2 -3*v3 + 9 = 0; value: 0 + v1 -1 = 0; value: 0 0: 2 3 1: 5 2: 1 3 4 3: 2 4 optimal: 0 + <= 0; value: 0 - 3*v2 -6 = 0; value: 0 - -6*v0 -1*v3 + 7 = 0; value: 0 + -7 <= 0; value: -7 - -3*v2 -3*v3 + 9 = 0; value: 0 - v1 -1 = 0; value: 0 0: 2 3 1: 5 2: 1 3 4 3: 2 4 3 0: 1 -> 1 1: 1 -> 1 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v0 + 2*v1 -12 = 0; value: 0 + <= 0; value: 0 + 4*v0 -4*v2 -28 <= 0; value: -12 + -6*v0 -12 <= 0; value: -36 + -1*v3 < 0; value: -2 0: 1 3 4 1: 1 2: 3 3: 5 optimal: oo + 3*v2 + 9 <= 0; value: 9 - v0 + 2*v1 -12 = 0; value: 0 + <= 0; value: 0 - 4*v0 -4*v2 -28 <= 0; value: 0 + -6*v2 -54 <= 0; value: -54 + -1*v3 < 0; value: -2 0: 1 3 4 1: 1 2: 3 4 3: 5 0: 4 -> 7 1: 4 -> 5/2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + v1 -1*v2 -1*v3 -6 < 0; value: -14 + -3*v0 + 2*v1 + 3*v3 <= 0; value: -1 + 2*v1 + 5*v3 -25 < 0; value: -3 + -4*v0 + 6*v1 -4 < 0; value: -18 + -3*v0 + 6*v3 -16 <= 0; value: -7 0: 2 4 5 1: 1 2 3 4 2: 1 3: 1 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v1 -1*v2 -1*v3 -6 < 0; value: -14 + -3*v0 + 2*v1 + 3*v3 <= 0; value: -1 + 2*v1 + 5*v3 -25 < 0; value: -3 + -4*v0 + 6*v1 -4 < 0; value: -18 + -3*v0 + 6*v3 -16 <= 0; value: -7 0: 2 4 5 1: 1 2 3 4 2: 1 3: 1 2 3 5 0: 5 -> 5 1: 1 -> 1 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 2*v3 <= 0; value: -2 + 2*v0 + 5*v3 -19 = 0; value: 0 + 6*v0 + 4*v1 -1*v3 -31 <= 0; value: -10 + = 0; value: 0 + -4*v0 -4 <= 0; value: -12 0: 1 2 3 5 1: 3 2: 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -4*v0 + 2*v3 <= 0; value: -2 + 2*v0 + 5*v3 -19 = 0; value: 0 + 6*v0 + 4*v1 -1*v3 -31 <= 0; value: -10 + = 0; value: 0 + -4*v0 -4 <= 0; value: -12 0: 1 2 3 5 1: 3 2: 3: 1 2 3 0: 2 -> 2 1: 3 -> 3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + v0 + 6*v1 -1*v2 -30 = 0; value: 0 + -1*v0 < 0; value: -2 + -3*v0 -1*v2 + 7 < 0; value: -1 + -5*v1 -6*v2 + v3 + 17 <= 0; value: -20 + 4*v0 -1*v1 -5 <= 0; value: -2 0: 1 2 3 5 1: 1 4 5 2: 1 3 4 3: 4 optimal: (-61/14 -e*1) + -61/14 < 0; value: -61/14 - v0 + 6*v1 -1*v2 -30 = 0; value: 0 + -67/28 < 0; value: -67/28 - -3*v0 -1*v2 + 7 < 0; value: -1 + v3 -67/14 <= 0; value: -67/14 - 14/3*v0 -67/6 <= 0; value: 0 0: 1 2 3 5 4 1: 1 4 5 2: 1 3 4 5 3: 4 0: 2 -> 67/28 1: 5 -> 199/42 2: 2 -> 23/28 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 -2*v2 -22 <= 0; value: 0 + -2*v2 + 8 = 0; value: 0 + 6*v1 + 6*v2 -94 < 0; value: -52 + v1 + 3*v2 -44 <= 0; value: -29 + -3*v1 + 6*v2 -34 < 0; value: -19 0: 1 1: 3 4 5 2: 1 2 3 4 5 3: optimal: (50/3 -e*1) + + 50/3 < 0; value: 50/3 - 6*v0 -2*v2 -22 <= 0; value: 0 - -6*v0 + 30 = 0; value: 0 + -90 < 0; value: -90 + -106/3 < 0; value: -106/3 - -3*v1 + 6*v2 -34 < 0; value: -3 0: 1 2 3 4 1: 3 4 5 2: 1 2 3 4 5 3: 0: 5 -> 5 1: 3 -> -7/3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -4*v3 -10 <= 0; value: -30 + -6*v0 -23 <= 0; value: -47 + -6*v0 -5*v1 < 0; value: -29 + 4*v0 -6*v1 -4*v3 + 6 = 0; value: 0 + 4*v1 -1*v3 <= 0; value: 0 0: 2 3 4 1: 1 3 4 5 2: 3: 1 4 5 optimal: oo + 22/5*v0 < 0; value: 88/5 + -32/5*v0 -16 < 0; value: -208/5 + -6*v0 -23 <= 0; value: -47 - -28/3*v0 + 10/3*v3 -5 < 0; value: -10/3 - 4*v0 -6*v1 -4*v3 + 6 = 0; value: 0 + -38/5*v0 -3/2 < 0; value: -319/10 0: 2 3 4 1 5 1: 1 3 4 5 2: 3: 1 4 5 3 0: 4 -> 4 1: 1 -> -62/15 2: 1 -> 1 3: 4 -> 117/10 + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -4*v3 + 12 = 0; value: 0 + 5*v1 -56 <= 0; value: -36 + -2*v3 + 2 < 0; value: -4 + 2*v0 -4*v2 -10 <= 0; value: -30 + -5*v0 -2*v2 + v3 + 7 = 0; value: 0 0: 1 4 5 1: 2 2: 4 5 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -3*v0 -4*v3 + 12 = 0; value: 0 + 5*v1 -56 <= 0; value: -36 + -2*v3 + 2 < 0; value: -4 + 2*v0 -4*v2 -10 <= 0; value: -30 + -5*v0 -2*v2 + v3 + 7 = 0; value: 0 0: 1 4 5 1: 2 2: 4 5 3: 1 3 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -5*v3 + 5 = 0; value: 0 + 4*v2 -2*v3 -2 <= 0; value: 0 + -5*v0 -1*v1 + 10 = 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -1*v0 + v1 -7 <= 0; value: -3 0: 3 5 1: 3 5 2: 2 4 3: 1 2 optimal: oo + 12*v0 -20 <= 0; value: -8 + -5*v3 + 5 = 0; value: 0 + 4*v2 -2*v3 -2 <= 0; value: 0 - -5*v0 -1*v1 + 10 = 0; value: 0 + -1*v2 + 1 <= 0; value: 0 + -6*v0 + 3 <= 0; value: -3 0: 3 5 1: 3 5 2: 2 4 3: 1 2 0: 1 -> 1 1: 5 -> 5 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + v0 -3*v1 + 4*v3 -14 < 0; value: -1 + -6*v0 + 3*v3 -4 <= 0; value: -10 + v1 -2*v2 + 6*v3 -16 = 0; value: 0 + -1*v0 -4*v1 + 2 < 0; value: -9 + -6*v0 -2*v3 + 10 < 0; value: -16 0: 1 2 4 5 1: 1 3 4 2: 3 3: 1 2 3 5 optimal: oo + 5/2*v0 -1 < 0; value: 13/2 - v0 -6*v2 + 22*v3 -62 < 0; value: -253/16 + -117/16*v0 + 61/8 <= 0; value: -229/16 - v1 -2*v2 + 6*v3 -16 = 0; value: 0 - -23/11*v0 -16/11*v2 + 62/11 <= 0; value: 0 + -41/8*v0 + 9/4 < 0; value: -105/8 0: 1 2 4 5 1: 1 3 4 2: 3 1 4 2 5 3: 1 2 3 5 4 0: 3 -> 3 1: 2 -> 65/16 2: 5 -> -7/16 3: 4 -> 59/32 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 -1*v1 -1*v2 -1 < 0; value: -21 + 2*v2 + v3 -18 <= 0; value: -3 + -2*v1 -6*v3 + 30 = 0; value: 0 + 5*v1 -5*v2 + v3 + 3 <= 0; value: -17 + 5*v1 -4*v2 -4*v3 + 2 <= 0; value: -38 0: 1 1: 1 3 4 5 2: 1 2 4 5 3: 2 3 4 5 optimal: oo + 74/7*v0 + 90/7 < 0; value: 312/7 - -5*v0 -7*v2 + 38 < 0; value: -6 - 2*v2 + v3 -18 <= 0; value: 0 - -2*v1 -6*v3 + 30 = 0; value: 0 + -115/7*v0 -344/7 < 0; value: -689/7 + -170/7*v0 -563/7 < 0; value: -1073/7 0: 1 4 5 1: 1 3 4 5 2: 1 2 4 5 3: 2 3 4 5 1 0: 3 -> 3 1: 0 -> -99/7 2: 5 -> 29/7 3: 5 -> 68/7 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 4*v2 -13 < 0; value: -31 + 5*v2 -40 <= 0; value: -25 + -2*v2 + 6 <= 0; value: 0 + 6*v0 -6*v2 -35 < 0; value: -23 + 6*v3 -24 < 0; value: -12 0: 4 1: 1 2: 1 2 3 4 3: 5 optimal: (18 -e*1) + + 18 < 0; value: 18 - -6*v1 + 4*v2 -13 < 0; value: -6 + -25 <= 0; value: -25 - -2*v2 + 6 <= 0; value: 0 - 6*v0 -53 < 0; value: -6 + 6*v3 -24 < 0; value: -12 0: 4 1: 1 2: 1 2 3 4 3: 5 0: 5 -> 47/6 1: 5 -> 5/6 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + 2*v1 + v2 -32 <= 0; value: -21 + 3*v1 -2*v3 -26 < 0; value: -15 + -5*v0 + 3*v1 + 2*v2 -31 <= 0; value: -19 + -6*v2 + 5 <= 0; value: -1 + -4*v0 -5*v1 + 13 < 0; value: -16 0: 3 5 1: 1 2 3 5 2: 1 3 4 3: 2 optimal: oo + 18/5*v0 -26/5 < 0; value: -8/5 + -8/5*v0 + v2 -134/5 < 0; value: -137/5 + -12/5*v0 -2*v3 -91/5 < 0; value: -123/5 + -37/5*v0 + 2*v2 -116/5 < 0; value: -143/5 + -6*v2 + 5 <= 0; value: -1 - -4*v0 -5*v1 + 13 < 0; value: -5 0: 3 5 1 2 1: 1 2 3 5 2: 1 3 4 3: 2 0: 1 -> 1 1: 5 -> 14/5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + -6*v0 -3*v2 + 4 <= 0; value: -2 + 2*v1 -5*v2 -10 = 0; value: 0 + <= 0; value: 0 + -6*v0 + v3 + 1 < 0; value: -2 + -4*v1 + 8 <= 0; value: -12 0: 1 4 1: 2 5 2: 1 2 3: 4 optimal: -22/15 + -22/15 <= 0; value: -22/15 - -6*v0 -3*v2 + 4 <= 0; value: 0 - 2*v1 -5*v2 -10 = 0; value: 0 + <= 0; value: 0 + v3 -33/5 < 0; value: -18/5 - 20*v0 -76/3 <= 0; value: 0 0: 1 4 5 1: 2 5 2: 1 2 5 3: 4 0: 1 -> 19/15 1: 5 -> 2 2: 0 -> -6/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 2*v1 + v2 -10 < 0; value: -5 + -5*v0 -1*v2 + 2*v3 + 1 <= 0; value: -1 + -5*v1 -4*v3 + 8 < 0; value: -10 + -1*v0 + 2*v3 -3 = 0; value: 0 + 4*v0 -5*v1 + 6 = 0; value: 0 0: 2 4 5 1: 1 3 5 2: 1 2 3: 2 3 4 optimal: oo + -1/4*v2 -1/2 < 0; value: -3/4 - v2 + 16/5*v3 -62/5 < 0; value: -5/2 + 3/2*v2 -15 < 0; value: -27/2 + 15/4*v2 -65/2 < 0; value: -115/4 - -1*v0 + 2*v3 -3 = 0; value: 0 - 4*v0 -5*v1 + 6 = 0; value: 0 0: 2 4 5 3 1 1: 1 3 5 2: 1 2 3 3: 2 3 4 1 0: 1 -> 41/16 1: 2 -> 13/4 2: 1 -> 1 3: 2 -> 89/32 + 2*v0 -2*v1 <= 0; value: 10 + v1 + 2*v2 -5 <= 0; value: -3 + v2 -1*v3 <= 0; value: 0 + v0 -5*v1 -13 <= 0; value: -8 + <= 0; value: 0 + -3*v1 + v3 -1 = 0; value: 0 0: 3 1: 1 3 5 2: 1 2 3: 2 5 optimal: 206/7 + + 206/7 <= 0; value: 206/7 - 7/5*v0 -106/5 <= 0; value: 0 - v2 -1*v3 <= 0; value: 0 - v0 -5/3*v2 -34/3 <= 0; value: 0 + <= 0; value: 0 - -3*v1 + v3 -1 = 0; value: 0 0: 3 1 1: 1 3 5 2: 1 2 3 3: 2 5 3 1 0: 5 -> 106/7 1: 0 -> 3/7 2: 1 -> 16/7 3: 1 -> 16/7 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -4*v1 -2*v2 -7 <= 0; value: -39 + 6*v0 -3*v1 -7 <= 0; value: -4 + 3*v0 -21 <= 0; value: -12 + 2*v2 + 2*v3 -20 < 0; value: -6 + -2*v1 -3*v2 + 19 = 0; value: 0 0: 1 2 3 1: 1 2 5 2: 1 4 5 3: 4 optimal: (25/3 -e*1) + + 25/3 < 0; value: 25/3 - -11/2*v3 -11/6 <= 0; value: 0 - 6*v0 + 9/2*v2 -71/2 <= 0; value: 0 + -53/2 < 0; value: -53/2 - -8/3*v0 + 2*v3 -38/9 < 0; value: -8/3 - -2*v1 -3*v2 + 19 = 0; value: 0 0: 1 2 3 4 1: 1 2 5 2: 1 4 5 2 3: 4 1 3 0: 3 -> -5/6 1: 5 -> -4 2: 3 -> 9 3: 4 -> -1/3 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -4*v2 -4 <= 0; value: -14 + -5*v0 + 10 <= 0; value: 0 + -2*v0 -3*v1 -3*v3 + 18 <= 0; value: -4 + -2*v1 + 6*v3 -59 <= 0; value: -39 + v1 -2 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 3: 3 4 optimal: oo + 8/3*v2 -4/3 <= 0; value: 28/3 - 3*v0 -4*v2 -4 <= 0; value: 0 + -20/3*v2 + 10/3 <= 0; value: -70/3 + -8/3*v2 -3*v3 + 28/3 <= 0; value: -40/3 + 6*v3 -63 <= 0; value: -39 - v1 -2 = 0; value: 0 0: 1 2 3 1: 3 4 5 2: 1 2 3 3: 3 4 0: 2 -> 20/3 1: 2 -> 2 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + -2*v2 -2 < 0; value: -6 + -6*v1 + 4*v3 -18 <= 0; value: -44 + 5*v0 -10 = 0; value: 0 + -4*v0 + 4*v3 + 4 = 0; value: 0 + v0 + 6*v3 -8 = 0; value: 0 0: 3 4 5 1: 2 2: 1 3: 2 4 5 optimal: 26/3 + + 26/3 <= 0; value: 26/3 + -2*v2 -2 < 0; value: -6 - -6*v1 + 4*v3 -18 <= 0; value: 0 - 5*v0 -10 = 0; value: 0 - -4*v0 + 4*v3 + 4 = 0; value: 0 + = 0; value: 0 0: 3 4 5 1: 2 2: 1 3: 2 4 5 0: 2 -> 2 1: 5 -> -7/3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 + 6*v3 -24 = 0; value: 0 + -3*v1 -1*v2 -2*v3 -4 < 0; value: -12 + -1*v0 + 1 < 0; value: -2 + 4*v0 -2*v2 -3*v3 <= 0; value: 0 + -6*v1 -3*v3 + 6 < 0; value: -6 0: 3 4 1: 1 2 5 2: 2 4 3: 1 2 4 5 optimal: oo + 2*v0 + 3/2 < 0; value: 15/2 - -4*v1 + 6*v3 -24 = 0; value: 0 + -2*v0 -7/2 <= 0; value: -19/2 + -1*v0 + 1 < 0; value: -2 - 4*v0 -2*v2 -3*v3 <= 0; value: 0 - -16*v0 + 8*v2 + 42 < 0; value: -3 0: 3 4 2 5 1: 1 2 5 2: 2 4 5 3: 1 2 4 5 0: 3 -> 3 1: 0 -> -3/8 2: 0 -> 3/8 3: 4 -> 15/4 + 2*v0 -2*v1 <= 0; value: -2 + -1*v0 + v1 + 4*v3 -7 <= 0; value: -2 + 3*v0 -6*v2 -1*v3 + 10 = 0; value: 0 + 2*v0 + 5*v2 + 4*v3 -52 <= 0; value: -27 + 4*v0 -3*v3 -9 = 0; value: 0 + 5*v0 + v1 -5*v2 -4 = 0; value: 0 0: 1 2 3 4 5 1: 1 5 2: 2 3 5 3: 1 2 3 4 optimal: 306/13 + + 306/13 <= 0; value: 306/13 - 13/18*v0 -25/6 <= 0; value: 0 - 3*v0 -6*v2 -1*v3 + 10 = 0; value: 0 + -37/13 <= 0; value: -37/13 - 4*v0 -3*v3 -9 = 0; value: 0 - 5*v0 + v1 -5*v2 -4 = 0; value: 0 0: 1 2 3 4 5 1: 1 5 2: 2 3 5 1 3: 1 2 3 4 0: 3 -> 75/13 1: 4 -> -6 2: 3 -> 49/13 3: 1 -> 61/13 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -1*v1 -2*v2 + 2 = 0; value: 0 + -2*v1 -3*v2 + 4 <= 0; value: -10 + -1*v3 + 4 = 0; value: 0 + 2*v1 + 6*v2 -46 <= 0; value: -26 + -3*v0 + 3*v1 -8 < 0; value: -5 0: 1 5 1: 1 2 4 5 2: 1 2 4 3: 3 optimal: 45 + + 45 <= 0; value: 45 - 2*v0 -1*v1 -2*v2 + 2 = 0; value: 0 - -4*v0 + v2 <= 0; value: 0 + -1*v3 + 4 = 0; value: 0 - 12*v0 -42 <= 0; value: 0 + -151/2 < 0; value: -151/2 0: 1 5 2 4 1: 1 2 4 5 2: 1 2 4 5 3: 3 0: 3 -> 7/2 1: 4 -> -19 2: 2 -> 14 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -1*v3 -9 <= 0; value: -5 + 5*v0 -3*v2 -4*v3 + 1 <= 0; value: -1 + -5*v0 -6*v2 -10 < 0; value: -43 + -2*v2 -1*v3 + 8 = 0; value: 0 + v0 -2*v1 -5*v2 + 7 <= 0; value: -13 0: 1 2 3 5 1: 5 2: 2 3 4 5 3: 1 2 4 optimal: oo + -4*v0 + 24 <= 0; value: 12 + -23/5 <= 0; value: -23/5 - 5*v0 -5/2*v3 -11 <= 0; value: 0 + v0 -236/5 < 0; value: -221/5 - -2*v2 -1*v3 + 8 = 0; value: 0 - v0 -2*v1 -5*v2 + 7 <= 0; value: 0 0: 1 2 3 5 1: 5 2: 2 3 4 5 3: 1 2 4 3 0: 3 -> 3 1: 4 -> -3 2: 3 -> 16/5 3: 2 -> 8/5 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 + 3*v3 + 10 = 0; value: 0 + 2*v0 + v1 + 2*v2 -23 = 0; value: 0 + -3*v0 -3*v1 + 3*v2 + 18 = 0; value: 0 + 4*v0 -3*v2 -23 < 0; value: -15 + -4*v0 + 3*v3 + 5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 2: 2 3 4 3: 1 5 optimal: 0 + <= 0; value: 0 - -5*v1 + 3*v3 + 10 = 0; value: 0 - 14/5*v0 + 2*v2 -22 = 0; value: 0 - 48/7*v2 -192/7 = 0; value: 0 + -15 < 0; value: -15 - -4*v0 + 3*v3 + 5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 2: 2 3 4 3: 1 5 2 3 0: 5 -> 5 1: 5 -> 5 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 + 17 <= 0; value: -13 + -3*v0 -6*v3 -21 <= 0; value: -45 + 5*v0 -6*v1 + 18 = 0; value: 0 + -1*v1 + 5*v3 -18 < 0; value: -1 + -6*v1 + 6*v2 -21 <= 0; value: -9 0: 2 3 1: 3 4 5 2: 1 5 3: 2 4 optimal: oo + 1/3*v0 -6 <= 0; value: -6 + -6*v2 + 17 <= 0; value: -13 + -3*v0 -6*v3 -21 <= 0; value: -45 - 5*v0 -6*v1 + 18 = 0; value: 0 + -5/6*v0 + 5*v3 -21 < 0; value: -1 + -5*v0 + 6*v2 -39 <= 0; value: -9 0: 2 3 4 5 1: 3 4 5 2: 1 5 3: 2 4 0: 0 -> 0 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -10 + -3*v1 + 6*v3 -22 < 0; value: -13 + 6*v3 -24 = 0; value: 0 + v0 + v2 -6*v3 + 6 < 0; value: -18 + -5*v0 -2*v1 <= 0; value: -10 + v2 -3*v3 + 12 = 0; value: 0 0: 3 4 1: 1 4 2: 3 5 3: 1 2 3 5 optimal: (104/3 -e*1) + + 104/3 < 0; value: 104/3 - -3*v1 + 6*v3 -22 < 0; value: -3 - 6*v3 -24 = 0; value: 0 - v0 + v2 -18 < 0; value: -1 + -274/3 < 0; value: -274/3 - v2 = 0; value: 0 0: 3 4 1: 1 4 2: 3 5 4 3: 1 2 3 5 4 0: 0 -> 17 1: 5 -> 5/3 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 2*v0 -2*v2 -3 <= 0; value: -7 + -1*v0 -3*v1 + 2 <= 0; value: 0 + 3*v0 -6*v1 -15 <= 0; value: -9 + 5*v0 -6*v1 -11 <= 0; value: -1 + -5*v0 -4*v3 + 16 < 0; value: -2 0: 1 2 3 4 5 1: 2 3 4 2: 1 3: 5 optimal: 92/21 + + 92/21 <= 0; value: 92/21 + -2*v2 + 9/7 <= 0; value: -47/7 - -1*v0 -3*v1 + 2 <= 0; value: 0 + -58/7 <= 0; value: -58/7 - 7*v0 -15 <= 0; value: 0 + -4*v3 + 37/7 < 0; value: -19/7 0: 1 2 3 4 5 1: 2 3 4 2: 1 3: 5 0: 2 -> 15/7 1: 0 -> -1/21 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 22 <= 0; value: -2 + 4*v1 + 3*v2 + 4*v3 -77 <= 0; value: -40 + -4*v2 + 1 <= 0; value: -11 + -3*v1 + 2*v3 + 6 = 0; value: 0 + <= 0; value: 0 0: 1 1: 2 4 2: 2 3 3: 2 4 optimal: oo + 2*v0 -4/3*v3 -4 <= 0; value: 0 + -6*v0 + 22 <= 0; value: -2 + 3*v2 + 20/3*v3 -69 <= 0; value: -40 + -4*v2 + 1 <= 0; value: -11 - -3*v1 + 2*v3 + 6 = 0; value: 0 + <= 0; value: 0 0: 1 1: 2 4 2: 2 3 3: 2 4 0: 4 -> 4 1: 4 -> 4 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -5*v1 -4*v3 = 0; value: 0 + -4*v1 -1*v3 <= 0; value: 0 + v1 -4*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + 4*v1 -6*v2 + 7 < 0; value: -17 0: 1: 1 2 3 5 2: 5 3: 1 2 3 4 optimal: oo + 2*v0 <= 0; value: 8 - -5*v1 -4*v3 = 0; value: 0 - 11/5*v3 <= 0; value: 0 + <= 0; value: 0 + <= 0; value: 0 + -6*v2 + 7 < 0; value: -17 0: 1: 1 2 3 5 2: 5 3: 1 2 3 4 5 0: 4 -> 4 1: 0 -> 0 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -23 <= 0; value: -13 + -1*v1 + 4*v3 -4 <= 0; value: -1 + -4*v0 -4*v1 + 2*v2 + 1 <= 0; value: -1 + 3*v0 + 6*v1 -6*v3 -10 <= 0; value: -4 + -6*v0 + 4*v2 -21 < 0; value: -13 0: 1 3 4 5 1: 2 3 4 2: 3 5 3: 2 4 optimal: oo + 2*v0 -8*v3 + 8 <= 0; value: 4 + 5*v0 -23 <= 0; value: -13 - v0 -1/2*v2 + 4*v3 -17/4 <= 0; value: 0 - -4*v0 -4*v1 + 2*v2 + 1 <= 0; value: 0 + 3*v0 + 18*v3 -34 <= 0; value: -10 + 2*v0 + 32*v3 -55 < 0; value: -19 0: 1 3 4 5 2 1: 2 3 4 2: 3 5 2 4 3: 2 4 5 0: 2 -> 2 1: 1 -> 0 2: 5 -> 7/2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + = 0; value: 0 + -6*v0 -6*v1 + v3 + 1 <= 0; value: 0 + -4*v0 -3*v2 -5*v3 + 13 <= 0; value: -25 + -4*v0 + 5*v1 -6*v3 + 34 = 0; value: 0 + 3*v1 + 3*v2 -9 = 0; value: 0 0: 2 3 4 1: 2 4 5 2: 3 5 3: 2 3 4 optimal: 1801/13 + + 1801/13 <= 0; value: 1801/13 + = 0; value: 0 - -6*v0 -6*v1 + v3 + 1 <= 0; value: 0 - 13/20*v2 -539/20 <= 0; value: 0 - -9*v0 -31/6*v3 + 209/6 = 0; value: 0 - -120/31*v0 + 3*v2 -159/31 = 0; value: 0 0: 2 3 4 5 1: 2 4 5 2: 3 5 3: 2 3 4 5 0: 1 -> 801/26 1: 0 -> -500/13 2: 3 -> 539/13 3: 5 -> -610/13 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -6*v2 <= 0; value: 0 + 6*v0 -4*v1 + v2 -29 < 0; value: -18 + -3*v3 <= 0; value: -3 + -5*v0 + v3 + 2 < 0; value: -12 + v3 -2 <= 0; value: -1 0: 1 2 4 1: 2 2: 1 2 3: 3 4 5 optimal: (421/30 -e*1) + + 421/30 < 0; value: 421/30 - 2*v0 -6*v2 <= 0; value: 0 - 6*v0 -4*v1 + v2 -29 < 0; value: -4 - -3*v3 <= 0; value: 0 - -5*v0 + v3 + 2 < 0; value: -5 + -2 <= 0; value: -2 0: 1 2 4 1: 2 2: 1 2 3: 3 4 5 0: 3 -> 7/5 1: 2 -> -121/30 2: 1 -> 7/15 3: 1 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + -4*v1 -4*v2 + 7 <= 0; value: -13 + -5*v2 -5*v3 + 13 <= 0; value: -17 + -4*v1 -1 <= 0; value: -5 + 3*v0 -5*v3 -12 <= 0; value: -7 + -2*v0 -4*v3 + 18 <= 0; value: 0 0: 4 5 1: 1 3 2: 1 2 3: 2 4 5 optimal: oo + 10/3*v3 + 17/2 <= 0; value: 91/6 + -4*v2 + 8 <= 0; value: -8 + -5*v2 -5*v3 + 13 <= 0; value: -17 - -4*v1 -1 <= 0; value: 0 - 3*v0 -5*v3 -12 <= 0; value: 0 + -22/3*v3 + 10 <= 0; value: -14/3 0: 4 5 1: 1 3 2: 1 2 3: 2 4 5 0: 5 -> 22/3 1: 1 -> -1/4 2: 4 -> 4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -6*v2 + 2*v3 -6 < 0; value: -14 + -2*v0 -2*v2 + 3 <= 0; value: -5 + 3*v1 + 6*v2 + 2*v3 -58 < 0; value: -33 + 4*v1 -33 <= 0; value: -21 + -1*v0 + 2*v3 -4 <= 0; value: -2 0: 2 5 1: 3 4 2: 1 2 3 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -6*v2 + 2*v3 -6 < 0; value: -14 + -2*v0 -2*v2 + 3 <= 0; value: -5 + 3*v1 + 6*v2 + 2*v3 -58 < 0; value: -33 + 4*v1 -33 <= 0; value: -21 + -1*v0 + 2*v3 -4 <= 0; value: -2 0: 2 5 1: 3 4 2: 1 2 3 3: 1 3 5 0: 2 -> 2 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -5*v0 + 6*v1 -30 = 0; value: 0 + 2*v0 -1*v1 -1*v3 + 1 < 0; value: -5 + -6*v0 + v2 -7 < 0; value: -3 + -3*v2 + 5*v3 + 7 = 0; value: 0 + -3*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 2 2: 3 4 3: 2 4 optimal: oo + 6/35*v2 -324/35 < 0; value: -60/7 - -5*v0 + 6*v1 -30 = 0; value: 0 - 7/6*v0 -1*v3 -4 < 0; value: -7/6 + -73/35*v2 -713/35 < 0; value: -201/7 - -3*v2 + 5*v3 + 7 = 0; value: 0 + -54/35*v2 -234/35 < 0; value: -90/7 0: 1 2 3 5 1: 1 2 2: 3 4 5 3: 2 4 3 5 0: 0 -> 23/7 1: 5 -> 325/42 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + 2*v2 -33 <= 0; value: -16 + v1 + 3*v2 + 3*v3 -30 < 0; value: -7 + -6*v2 + 3*v3 -11 <= 0; value: -26 + -3*v1 -2*v3 -10 <= 0; value: -22 + -5*v2 + 16 < 0; value: -4 0: 1 1: 2 4 2: 1 2 3 5 3: 2 3 4 optimal: (7838/207 -e*1) + + 7838/207 < 0; value: 7838/207 - 3*v0 -1831/69 <= 0; value: 0 - 3*v2 + 7/3*v3 -100/3 < 0; value: -7/3 - -69/7*v2 + 223/7 <= 0; value: 0 - -3*v1 -2*v3 -10 <= 0; value: 0 + -11/69 < 0; value: -11/69 0: 1 1: 2 4 2: 1 2 3 5 3: 2 3 4 0: 3 -> 1831/207 1: 2 -> -650/69 2: 4 -> 223/69 3: 3 -> 210/23 + 2*v0 -2*v1 <= 0; value: 6 + v1 -1*v3 -1 <= 0; value: -6 + v0 + v2 -5 <= 0; value: -2 + -5*v0 + v1 -8 <= 0; value: -23 + -6*v1 + 2*v2 + 3*v3 -23 < 0; value: -8 + 6*v3 -65 <= 0; value: -35 0: 2 3 1: 1 3 4 2: 2 4 3: 1 4 5 optimal: oo + 2*v0 -4/3*v2 + 52/3 < 0; value: 70/3 - 1/3*v2 -1/2*v3 -29/6 < 0; value: -1/2 + v0 + v2 -5 <= 0; value: -2 + -5*v0 + 2/3*v2 -50/3 < 0; value: -95/3 - -6*v1 + 2*v2 + 3*v3 -23 < 0; value: -6 + 4*v2 -123 < 0; value: -123 0: 2 3 1: 1 3 4 2: 2 4 1 3 5 3: 1 4 5 3 0: 3 -> 3 1: 0 -> -43/6 2: 0 -> 0 3: 5 -> -26/3 + 2*v0 -2*v1 <= 0; value: -4 + v0 + 4*v2 + 3*v3 -6 = 0; value: 0 + -1*v1 -4*v3 -7 <= 0; value: -16 + -5*v3 + 2 <= 0; value: -3 + 2*v2 <= 0; value: 0 + -2*v1 -2*v2 + 4 <= 0; value: -6 0: 1 1: 2 5 2: 1 4 5 3: 1 2 3 optimal: 28/5 + + 28/5 <= 0; value: 28/5 - v0 + 4*v2 + 3*v3 -6 = 0; value: 0 + -53/5 <= 0; value: -53/5 - 5/3*v0 -8 <= 0; value: 0 - -1/2*v0 -3/2*v3 + 3 <= 0; value: 0 - -2*v1 -2*v2 + 4 <= 0; value: 0 0: 1 4 2 3 1: 2 5 2: 1 4 5 2 3: 1 2 3 4 0: 3 -> 24/5 1: 5 -> 2 2: 0 -> 0 3: 1 -> 2/5 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 + 3*v1 -6*v2 -18 <= 0; value: -54 + 6*v0 + 3*v2 + v3 -65 <= 0; value: -29 + -6*v0 -3*v1 -1*v2 + 12 <= 0; value: -14 + -2*v1 + 6*v2 -45 <= 0; value: -17 + 4*v0 + 2*v2 + 3*v3 -52 <= 0; value: -21 0: 1 2 3 5 1: 1 3 4 2: 1 2 3 4 5 3: 2 5 optimal: oo + -4/3*v3 + 313/6 <= 0; value: 289/6 + 8/7*v3 -3043/28 <= 0; value: -421/4 - 21/5*v0 + v3 -823/20 <= 0; value: 0 - -6*v0 -3*v1 -1*v2 + 12 <= 0; value: 0 - 4*v0 + 20/3*v2 -53 <= 0; value: 0 + 7/3*v3 -26/3 <= 0; value: -5/3 0: 1 2 3 5 4 1: 1 3 4 2: 1 2 3 4 5 3: 2 5 1 0: 3 -> 109/12 1: 1 -> -15 2: 5 -> 5/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 5*v3 -10 <= 0; value: 0 + 5*v0 + 6*v3 -12 = 0; value: 0 + -4*v2 -5*v3 -15 <= 0; value: -33 + 2*v0 + 2*v3 -9 < 0; value: -5 + -6*v0 -3*v2 -2 <= 0; value: -8 0: 2 4 5 1: 2: 3 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 5*v3 -10 <= 0; value: 0 + 5*v0 + 6*v3 -12 = 0; value: 0 + -4*v2 -5*v3 -15 <= 0; value: -33 + 2*v0 + 2*v3 -9 < 0; value: -5 + -6*v0 -3*v2 -2 <= 0; value: -8 0: 2 4 5 1: 2: 3 5 3: 1 2 3 4 0: 0 -> 0 1: 3 -> 3 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 6*v0 + 2*v1 + 6*v2 -48 = 0; value: 0 + v0 -5*v2 + 2 <= 0; value: -21 + 5*v2 -1*v3 -22 = 0; value: 0 + <= 0; value: 0 + -2*v1 -5*v3 -16 <= 0; value: -37 0: 1 2 1: 1 5 2: 1 2 3 3: 3 5 optimal: oo + 8*v0 + 6/5*v3 -108/5 <= 0; value: -2 - 6*v0 + 2*v1 + 6*v2 -48 = 0; value: 0 + v0 -1*v3 -20 <= 0; value: -21 - 5*v2 -1*v3 -22 = 0; value: 0 + <= 0; value: 0 + 6*v0 -19/5*v3 -188/5 <= 0; value: -37 0: 1 2 5 1: 1 5 2: 1 2 3 5 3: 3 5 2 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + -1*v1 -6*v2 -4 < 0; value: -10 + -5*v0 -4*v2 -17 < 0; value: -41 + -5*v0 + v2 -6*v3 + 25 = 0; value: 0 + -2*v1 -3*v3 + 3 = 0; value: 0 + 6*v1 -2*v2 -1 < 0; value: -3 0: 2 3 1: 1 4 5 2: 1 2 3 5 3: 3 4 optimal: oo + -1/2*v0 + 1/2*v2 + 19/2 <= 0; value: 8 + -5/4*v0 -23/4*v2 + 3/4 < 0; value: -10 + -5*v0 -4*v2 -17 < 0; value: -41 - -5*v0 + v2 -6*v3 + 25 = 0; value: 0 - -2*v1 -3*v3 + 3 = 0; value: 0 + 15/2*v0 -7/2*v2 -59/2 < 0; value: -3 0: 2 3 1 5 1: 1 4 5 2: 1 2 3 5 3: 3 4 1 5 0: 4 -> 4 1: 0 -> 0 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 2*v0 -2*v3 + 8 = 0; value: 0 + -3*v1 -5*v2 + 25 = 0; value: 0 + -5*v1 -6*v2 -4*v3 + 50 = 0; value: 0 + 5*v2 -25 = 0; value: 0 + 5*v0 -1*v3 <= 0; value: 0 0: 1 5 1: 2 3 2: 2 3 4 3: 1 3 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 -2*v3 + 8 = 0; value: 0 - -3*v1 -5*v2 + 25 = 0; value: 0 - 7/3*v2 -4*v3 + 25/3 = 0; value: 0 + = 0; value: 0 - 4*v0 -4 <= 0; value: 0 0: 1 5 4 1: 2 3 2: 2 3 4 3: 1 3 5 4 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + 2*v0 + 4*v3 -40 <= 0; value: -20 + -6*v1 + 12 = 0; value: 0 + -6*v1 -6*v2 -3*v3 -43 <= 0; value: -88 + -1*v3 -1 <= 0; value: -6 + -5*v0 = 0; value: 0 0: 1 5 1: 2 3 2: 3 3: 1 3 4 optimal: -4 + -4 <= 0; value: -4 + 4*v3 -40 <= 0; value: -20 - -6*v1 + 12 = 0; value: 0 + -6*v2 -3*v3 -55 <= 0; value: -88 + -1*v3 -1 <= 0; value: -6 - -5*v0 = 0; value: 0 0: 1 5 1: 2 3 2: 3 3: 1 3 4 0: 0 -> 0 1: 2 -> 2 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 + 2*v3 -1 <= 0; value: -9 + -1*v0 -2*v1 + 7 = 0; value: 0 + 3*v0 -4*v1 -4*v3 + 7 <= 0; value: 0 + -3*v1 + 6*v3 -13 <= 0; value: -7 + -4*v0 -3*v1 -6*v3 + 28 < 0; value: -2 0: 2 3 5 1: 1 2 3 4 5 2: 3: 1 3 4 5 optimal: 13/3 + + 13/3 <= 0; value: 13/3 + -85/18 <= 0; value: -85/18 - -1*v0 -2*v1 + 7 = 0; value: 0 - 5*v0 -4*v3 -7 <= 0; value: 0 - 36/5*v3 -107/5 <= 0; value: 0 + -88/9 < 0; value: -88/9 0: 2 3 5 1 4 1: 1 2 3 4 5 2: 3: 1 3 4 5 0: 3 -> 34/9 1: 2 -> 29/18 2: 3 -> 3 3: 2 -> 107/36 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 2*v1 -5*v2 -7 < 0; value: -20 + v1 -5*v3 + 6 < 0; value: -3 + 5*v1 -6*v3 + 7 = 0; value: 0 + 6*v0 + 2*v2 -17 <= 0; value: -11 + 4*v0 -2*v1 -4*v3 + 10 = 0; value: 0 0: 1 4 5 1: 1 2 3 5 2: 1 4 3: 2 3 5 optimal: (-61/78 -e*1) + -61/78 < 0; value: -61/78 - -13/2*v2 + 31/4 < 0; value: -47/8 + -2741/312 < 0; value: -2741/312 - 5*v1 -6*v3 + 7 = 0; value: 0 - 6*v0 + 2*v2 -17 <= 0; value: 0 - 4*v0 -32/5*v3 + 64/5 = 0; value: 0 0: 1 4 5 2 1: 1 2 3 5 2: 1 4 2 3: 2 3 5 1 0: 0 -> 111/52 1: 1 -> 541/208 2: 3 -> 109/52 3: 2 -> 1387/416 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -18 <= 0; value: -9 + -4*v0 -8 <= 0; value: -20 + 2*v3 -8 = 0; value: 0 + -3*v2 + 3 = 0; value: 0 + -2*v0 + 5*v3 -16 <= 0; value: -2 0: 1 2 5 1: 2: 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -18 <= 0; value: -9 + -4*v0 -8 <= 0; value: -20 + 2*v3 -8 = 0; value: 0 + -3*v2 + 3 = 0; value: 0 + -2*v0 + 5*v3 -16 <= 0; value: -2 0: 1 2 5 1: 2: 4 3: 3 5 0: 3 -> 3 1: 2 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v1 -4*v3 = 0; value: 0 + -4*v0 + 4 <= 0; value: -4 + v1 <= 0; value: 0 + 6*v3 <= 0; value: 0 + 5*v2 -63 <= 0; value: -38 0: 2 1: 1 3 2: 5 3: 1 4 optimal: oo + 2*v0 -8/3*v3 <= 0; value: 4 - 3*v1 -4*v3 = 0; value: 0 + -4*v0 + 4 <= 0; value: -4 + 4/3*v3 <= 0; value: 0 + 6*v3 <= 0; value: 0 + 5*v2 -63 <= 0; value: -38 0: 2 1: 1 3 2: 5 3: 1 4 3 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -1*v0 + v2 -3 <= 0; value: 0 + -6*v1 + v2 + 2*v3 + 5 <= 0; value: 0 + -6*v1 -4*v3 + 38 = 0; value: 0 + -3*v0 <= 0; value: 0 + -6*v0 -1*v1 + 6*v2 -15 = 0; value: 0 0: 1 4 5 1: 2 3 5 2: 1 2 5 3: 2 3 optimal: -6 + -6 <= 0; value: -6 - 1/53*v0 <= 0; value: 0 - -6*v1 + v2 + 2*v3 + 5 <= 0; value: 0 - -1*v2 -6*v3 + 33 = 0; value: 0 + <= 0; value: 0 - -6*v0 + 53/9*v2 -53/3 = 0; value: 0 0: 1 4 5 1: 2 3 5 2: 1 2 5 3 3: 2 3 5 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 + 4*v2 -37 < 0; value: -9 + -3*v0 -8 < 0; value: -23 + <= 0; value: 0 + 6*v1 + 5*v2 -10 = 0; value: 0 + -2*v2 + v3 = 0; value: 0 0: 1 2 1: 4 2: 1 4 5 3: 5 optimal: oo + 1/3*v0 + 145/12 < 0; value: 55/4 - 4*v0 + 2*v3 -37 < 0; value: -2 + -3*v0 -8 < 0; value: -23 + <= 0; value: 0 - 6*v1 + 5*v2 -10 = 0; value: 0 - -2*v2 + v3 = 0; value: 0 0: 1 2 1: 4 2: 1 4 5 3: 5 1 0: 5 -> 5 1: 0 -> -35/24 2: 2 -> 15/4 3: 4 -> 15/2 + 2*v0 -2*v1 <= 0; value: -8 + -3*v1 -1*v2 -9 <= 0; value: -21 + 4*v0 + 4*v3 -35 <= 0; value: -19 + 4*v1 -16 = 0; value: 0 + 2*v0 -1*v2 <= 0; value: 0 + -2*v0 -5*v2 -3*v3 + 12 = 0; value: 0 0: 2 4 5 1: 1 3 2: 1 4 5 3: 2 5 optimal: oo + -1/2*v3 -6 <= 0; value: -8 + 1/2*v3 -23 <= 0; value: -21 + 3*v3 -31 <= 0; value: -19 - 4*v1 -16 = 0; value: 0 - 2*v0 -1*v2 <= 0; value: 0 - -6*v2 -3*v3 + 12 = 0; value: 0 0: 2 4 5 1: 1 3 2: 1 4 5 2 3: 2 5 1 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -2*v3 + 17 = 0; value: 0 + v1 + v2 -5 = 0; value: 0 + -5*v1 <= 0; value: 0 + 2*v3 -3 <= 0; value: -1 + v0 -5*v1 -6*v2 + 30 = 0; value: 0 0: 5 1: 2 3 5 2: 1 2 5 3: 1 4 optimal: 0 + <= 0; value: 0 - -3*v2 -2*v3 + 17 = 0; value: 0 - v1 + v2 -5 = 0; value: 0 - 5*v0 <= 0; value: 0 + -1 <= 0; value: -1 - v0 + 2/3*v3 -2/3 = 0; value: 0 0: 5 3 4 1: 2 3 5 2: 1 2 5 3 3: 1 4 5 3 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 + 8 <= 0; value: 0 + 3*v0 + 6*v2 + 5*v3 -28 <= 0; value: -16 + -3*v0 + 6*v1 + 3*v3 -8 <= 0; value: -20 + 2*v1 + 6*v3 <= 0; value: 0 + -4*v0 + 6*v2 + 16 = 0; value: 0 0: 1 2 3 5 1: 3 4 2: 1 2 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -2*v0 + 3*v2 + 2*v3 + 8 <= 0; value: 0 + 3*v0 + 6*v2 + 5*v3 -28 <= 0; value: -16 + -3*v0 + 6*v1 + 3*v3 -8 <= 0; value: -20 + 2*v1 + 6*v3 <= 0; value: 0 + -4*v0 + 6*v2 + 16 = 0; value: 0 0: 1 2 3 5 1: 3 4 2: 1 2 5 3: 1 2 3 4 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 2*v2 + 2*v3 -2 <= 0; value: 0 + 2*v1 -3*v2 + 2*v3 -13 = 0; value: 0 + 2*v2 + 5*v3 -51 <= 0; value: -24 + 2*v1 + 6*v2 -20 <= 0; value: -8 + v0 -6*v1 -12 < 0; value: -28 0: 1 5 1: 2 4 5 2: 1 2 3 4 3: 1 2 3 optimal: (2966/279 -e*1) + + 2966/279 < 0; value: 2966/279 - -5*v0 + 2*v2 + 2*v3 -2 <= 0; value: 0 - 2*v1 -3*v2 + 2*v3 -13 = 0; value: 0 - 93/10*v0 -37 <= 0; value: 0 + -4244/279 < 0; value: -4244/279 - 16*v0 -15*v2 -45 < 0; value: -170/93 0: 1 5 3 4 1: 2 4 5 2: 1 2 3 4 5 3: 1 2 3 5 4 0: 2 -> 370/93 1: 3 -> -32/31 2: 1 -> 127/93 3: 5 -> 297/31 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 2*v1 + 2 = 0; value: 0 + -1*v2 + 4 = 0; value: 0 + 2*v0 + 2*v1 -17 <= 0; value: -11 + 6*v0 -4*v1 <= 0; value: -2 + 2*v0 -2 = 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3: optimal: -2 + -2 <= 0; value: -2 - -6*v0 + 2*v1 + 2 = 0; value: 0 + -1*v2 + 4 = 0; value: 0 + -11 <= 0; value: -11 + -2 <= 0; value: -2 - 2*v0 -2 = 0; value: 0 0: 1 3 4 5 1: 1 3 4 2: 2 3: 0: 1 -> 1 1: 2 -> 2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -6*v2 + 6 = 0; value: 0 + -1*v1 -4*v3 <= 0; value: 0 + 3*v0 -6*v1 <= 0; value: 0 + 3*v0 -4*v2 + 2 <= 0; value: -2 + 4*v2 + 4*v3 -4 <= 0; value: 0 0: 3 4 1: 2 3 2: 1 4 5 3: 2 5 optimal: 0 + <= 0; value: 0 - -6*v2 + 6 = 0; value: 0 - -1*v1 -4*v3 <= 0; value: 0 - 3*v0 <= 0; value: 0 + -2 <= 0; value: -2 - 4*v2 + 4*v3 -4 <= 0; value: 0 0: 3 4 1: 2 3 2: 1 4 5 3 3: 2 5 3 0: 0 -> 0 1: 0 -> 0 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 6*v1 -3*v3 <= 0; value: 0 + -3*v1 + 3*v3 -12 <= 0; value: -6 + v2 -4 <= 0; value: -2 + -1*v1 <= 0; value: -2 + -3*v1 + 6*v2 -10 < 0; value: -4 0: 1: 1 2 4 5 2: 3 5 3: 1 2 optimal: oo + 2*v0 < 0; value: 10 + -3*v3 < 0; value: -12 + 3*v3 -12 <= 0; value: 0 + -7/3 <= 0; value: -7/3 - -2*v2 + 10/3 <= 0; value: 0 - -3*v1 + 6*v2 -10 < 0; value: -3 0: 1: 1 2 4 5 2: 3 5 4 2 1 3: 1 2 0: 5 -> 5 1: 2 -> 1 2: 2 -> 5/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + v0 -4*v3 < 0; value: -8 + -3*v1 -2*v2 + 5 <= 0; value: -4 + 4*v3 -35 <= 0; value: -23 + 2*v1 -5*v3 -7 <= 0; value: -16 + -4*v0 -1*v1 + 3 <= 0; value: -16 0: 1 5 1: 2 4 5 2: 2 3: 1 3 4 optimal: (344 -e*1) + + 344 < 0; value: 344 - v0 -4*v3 < 0; value: -1 - -3*v1 -2*v2 + 5 <= 0; value: 0 - 4*v3 -35 <= 0; value: 0 + -1299/4 < 0; value: -1299/4 - -4*v0 + 2/3*v2 + 4/3 <= 0; value: 0 0: 1 5 4 1: 2 4 5 2: 2 5 4 3: 1 3 4 0: 4 -> 34 1: 3 -> -133 2: 0 -> 202 3: 3 -> 35/4 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 -1 < 0; value: -4 + -5*v1 -2*v3 <= 0; value: -2 + 5*v0 -4*v2 -3*v3 -4 <= 0; value: 0 + v0 -3 <= 0; value: 0 + 2*v0 + 3*v1 -14 < 0; value: -8 0: 1 3 4 5 1: 2 5 2: 3 3: 2 3 optimal: oo + 2*v0 + 4/5*v3 <= 0; value: 34/5 + -1*v0 -1 < 0; value: -4 - -5*v1 -2*v3 <= 0; value: 0 + 5*v0 -4*v2 -3*v3 -4 <= 0; value: 0 + v0 -3 <= 0; value: 0 + 2*v0 -6/5*v3 -14 < 0; value: -46/5 0: 1 3 4 5 1: 2 5 2: 3 3: 2 3 5 0: 3 -> 3 1: 0 -> -2/5 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 -1 <= 0; value: -5 + v1 -2*v2 + 1 <= 0; value: 0 + 3*v0 -5*v3 + 11 <= 0; value: -8 + 5*v2 -6*v3 + 20 = 0; value: 0 + -5*v1 -3*v3 + 5 <= 0; value: -25 0: 1 3 1: 2 5 2: 2 4 3: 3 4 5 optimal: oo + 2*v0 + v2 + 2 <= 0; value: 8 + -2*v0 -1 <= 0; value: -5 + -5/2*v2 <= 0; value: -5 + 3*v0 -25/6*v2 -17/3 <= 0; value: -8 - 5*v2 -6*v3 + 20 = 0; value: 0 - -5*v1 -3*v3 + 5 <= 0; value: 0 0: 1 3 1: 2 5 2: 2 4 3 3: 3 4 5 2 0: 2 -> 2 1: 3 -> -2 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -8 + 2*v0 -2*v1 + 3 < 0; value: -5 + -2*v0 -4*v3 -5 <= 0; value: -11 + -4*v1 + 2*v3 + 6 <= 0; value: -12 + 4*v1 -1*v2 -30 <= 0; value: -11 + -2*v2 + 2 = 0; value: 0 0: 1 2 1: 1 3 4 2: 4 5 3: 2 3 optimal: (-3 -e*1) + -3 < 0; value: -3 - 2*v0 -2*v1 + 3 < 0; value: -2 + -2*v0 -4*v3 -5 <= 0; value: -11 + -4*v0 + 2*v3 <= 0; value: -2 + 4*v0 -1*v2 -24 < 0; value: -21 + -2*v2 + 2 = 0; value: 0 0: 1 2 3 4 1: 1 3 4 2: 4 5 3: 2 3 0: 1 -> 1 1: 5 -> 7/2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + <= 0; value: 0 + -5*v1 -10 <= 0; value: -30 + -3*v0 -5*v3 + 28 = 0; value: 0 + 4*v0 -4 <= 0; value: 0 + -2*v0 -5*v1 + 15 <= 0; value: -7 0: 3 4 5 1: 2 5 2: 3: 3 optimal: -16/5 + -16/5 <= 0; value: -16/5 + <= 0; value: 0 + -23 <= 0; value: -23 - -3*v0 -5*v3 + 28 = 0; value: 0 - -20/3*v3 + 100/3 <= 0; value: 0 - -2*v0 -5*v1 + 15 <= 0; value: 0 0: 3 4 5 2 1: 2 5 2: 3: 3 4 2 0: 1 -> 1 1: 4 -> 13/5 2: 3 -> 3 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 + 6*v3 -78 < 0; value: -42 + 2*v0 -3*v1 + 4*v2 -1 <= 0; value: 0 + -5*v0 + 4*v1 + 3 = 0; value: 0 + -1*v0 + 3*v1 -6*v3 + 12 <= 0; value: -12 + 5*v0 -2*v1 -4*v2 -5 = 0; value: 0 0: 2 3 4 5 1: 1 2 3 4 5 2: 2 5 3: 1 4 optimal: 0 + <= 0; value: 0 + 6*v3 -72 < 0; value: -42 - 2*v0 -3*v1 + 4*v2 -1 <= 0; value: 0 - 3/5*v0 -9/5 = 0; value: 0 + -6*v3 + 18 <= 0; value: -12 - 11/3*v0 -20/3*v2 -13/3 = 0; value: 0 0: 2 3 4 5 1 1: 1 2 3 4 5 2: 2 5 3 1 4 3: 1 4 0: 3 -> 3 1: 3 -> 3 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 -1*v2 + 6*v3 + 17 = 0; value: 0 + 5*v0 + 6*v2 + v3 -54 <= 0; value: -28 + 3*v3 = 0; value: 0 + -3*v1 -6*v3 + 6 = 0; value: 0 + -3*v0 + 2*v2 -6*v3 + 10 = 0; value: 0 0: 1 2 5 1: 4 2: 1 2 5 3: 1 2 3 4 5 optimal: 4 + + 4 <= 0; value: 4 - -4*v0 -1*v2 + 6*v3 + 17 = 0; value: 0 + -28 <= 0; value: -28 - 11/2*v0 -22 = 0; value: 0 - -3*v1 -6*v3 + 6 = 0; value: 0 - -7*v0 + v2 + 27 = 0; value: 0 0: 1 2 5 3 1: 4 2: 1 2 5 3 3: 1 2 3 4 5 0: 4 -> 4 1: 2 -> 2 2: 1 -> 1 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 -3*v2 -3*v3 + 16 = 0; value: 0 + -6*v0 + 24 = 0; value: 0 + -1*v0 + 5*v2 -2*v3 -1 <= 0; value: 0 + -3*v1 + 3*v2 -4 <= 0; value: -1 + v0 -4*v3 + 3 <= 0; value: -13 0: 2 3 5 1: 1 4 2: 1 3 4 3: 1 3 5 optimal: 66/13 + + 66/13 <= 0; value: 66/13 - 4*v1 -3*v2 -3*v3 + 16 = 0; value: 0 - -6*v0 + 24 = 0; value: 0 - -1*v0 + 5*v2 -2*v3 -1 <= 0; value: 0 - 9/8*v0 -39/8*v2 + 73/8 <= 0; value: 0 + -427/39 <= 0; value: -427/39 0: 2 3 5 4 1: 1 4 2: 1 3 4 5 3: 1 3 5 4 0: 4 -> 4 1: 2 -> 19/13 2: 3 -> 109/39 3: 5 -> 175/39 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -6*v2 -1*v3 + 14 = 0; value: 0 + 3*v3 <= 0; value: 0 + -4*v3 <= 0; value: 0 + 6*v2 -9 < 0; value: -3 + 5*v0 -2*v2 -54 < 0; value: -31 0: 5 1: 1 2: 1 4 5 3: 1 2 3 optimal: (203/10 -e*1) + + 203/10 < 0; value: 203/10 - -4*v1 -6*v2 -1*v3 + 14 = 0; value: 0 - 3*v3 <= 0; value: 0 + <= 0; value: 0 - 6*v2 -9 < 0; value: -3/2 - 5*v0 -57 < 0; value: -5 0: 5 1: 1 2: 1 4 5 3: 1 2 3 0: 5 -> 52/5 1: 2 -> 13/8 2: 1 -> 5/4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 6*v2 -58 <= 0; value: -34 + v0 + 3*v2 -6*v3 -5 = 0; value: 0 + v0 + 4*v1 -21 = 0; value: 0 + -4*v0 + 2*v2 -4*v3 -16 <= 0; value: -36 + -3*v1 + 4 < 0; value: -8 0: 2 3 4 1: 3 5 2: 1 2 4 3: 2 4 optimal: (86/3 -e*1) + + 86/3 < 0; value: 86/3 + 6*v2 -58 <= 0; value: -34 - v0 + 3*v2 -6*v3 -5 = 0; value: 0 - v0 + 4*v1 -21 = 0; value: 0 + -772/9 < 0; value: -772/9 - -9/4*v2 + 9/2*v3 -8 < 0; value: -4 0: 2 3 4 5 1: 3 5 2: 1 2 4 5 3: 2 4 5 0: 5 -> 31/3 1: 4 -> 8/3 2: 4 -> 4 3: 2 -> 26/9 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 -1*v1 + 6*v2 + 16 = 0; value: 0 + 4*v1 -34 <= 0; value: -18 + v0 + 3*v1 -16 = 0; value: 0 + 4*v0 + 4*v3 -38 < 0; value: -22 + 5*v1 + 5*v3 -49 < 0; value: -29 0: 1 3 4 1: 1 2 3 5 2: 1 3: 4 5 optimal: oo + -8/3*v3 + 44/3 < 0; value: 44/3 - -3*v0 -1*v1 + 6*v2 + 16 = 0; value: 0 + 4/3*v3 -76/3 < 0; value: -76/3 - -8*v0 + 18*v2 + 32 = 0; value: 0 - 4*v0 + 4*v3 -38 < 0; value: -4 + 20/3*v3 -229/6 < 0; value: -229/6 0: 1 3 4 2 5 1: 1 2 3 5 2: 1 3 2 5 3: 4 5 2 0: 4 -> 17/2 1: 4 -> 5/2 2: 0 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 6*v3 <= 0; value: 0 + -5*v2 <= 0; value: 0 + -2*v0 + 6*v3 + 1 < 0; value: -7 + 4*v3 <= 0; value: 0 + -6*v1 = 0; value: 0 0: 3 1: 5 2: 2 3: 1 3 4 optimal: oo + 2*v0 <= 0; value: 8 + 6*v3 <= 0; value: 0 + -5*v2 <= 0; value: 0 + -2*v0 + 6*v3 + 1 < 0; value: -7 + 4*v3 <= 0; value: 0 - -6*v1 = 0; value: 0 0: 3 1: 5 2: 2 3: 1 3 4 0: 4 -> 4 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + v2 + v3 -12 < 0; value: -6 + 3*v1 = 0; value: 0 + 3*v1 -6*v2 + 24 = 0; value: 0 + 6*v0 + 5*v1 -2*v3 -28 <= 0; value: -14 + 4*v0 -5*v1 -1*v3 -10 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 1 3 3: 1 4 5 optimal: (9 -e*1) + + 9 < 0; value: 9 - v2 + v3 -12 < 0; value: -1 - 3*v1 = 0; value: 0 - -6*v2 + 24 = 0; value: 0 + -17 < 0; value: -17 - 4*v0 -1*v3 -10 = 0; value: 0 0: 4 5 1: 2 3 4 5 2: 1 3 4 3: 1 4 5 0: 3 -> 17/4 1: 0 -> 0 2: 4 -> 4 3: 2 -> 7 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -5*v3 -25 = 0; value: 0 + -2*v2 + v3 -8 < 0; value: -17 + -1*v2 + 5*v3 <= 0; value: 0 + 4*v1 -36 < 0; value: -20 + v2 -5 = 0; value: 0 0: 1 1: 4 2: 2 3 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -5*v3 -25 = 0; value: 0 + -2*v2 + v3 -8 < 0; value: -17 + -1*v2 + 5*v3 <= 0; value: 0 + 4*v1 -36 < 0; value: -20 + v2 -5 = 0; value: 0 0: 1 1: 4 2: 2 3 5 3: 1 2 3 0: 5 -> 5 1: 4 -> 4 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 6*v0 -1*v2 -15 < 0; value: -4 + v3 -10 < 0; value: -5 + -5*v0 -4*v1 -3*v3 -27 <= 0; value: -56 + 4*v2 + v3 -25 <= 0; value: -16 + -2*v0 -1*v3 -1 <= 0; value: -10 0: 1 3 5 1: 3 2: 1 4 3: 2 3 4 5 optimal: (681/16 -e*1) + + 681/16 < 0; value: 681/16 - 6*v0 -1*v2 -15 < 0; value: -27/8 - v3 -10 < 0; value: -1 - -5*v0 -4*v1 -3*v3 -27 <= 0; value: 0 - 4*v2 -15 <= 0; value: 0 + -69/4 < 0; value: -69/4 0: 1 3 5 1: 3 2: 1 4 5 3: 2 3 4 5 0: 2 -> 41/16 1: 1 -> -1069/64 2: 1 -> 15/4 3: 5 -> 9 + 2*v0 -2*v1 <= 0; value: -8 + -5*v0 -5*v1 -1*v3 + 15 <= 0; value: -5 + -3*v2 + 2*v3 <= 0; value: 0 + -2*v0 + 3*v3 <= 0; value: 0 + -6*v1 + 5*v3 + 24 = 0; value: 0 + -6*v0 + 5*v1 + 5*v2 -38 <= 0; value: -18 0: 1 3 5 1: 1 4 5 2: 2 5 3: 1 2 3 4 optimal: oo + 112/31*v0 -198/31 <= 0; value: -198/31 - -5*v0 -31/6*v3 -5 <= 0; value: 0 + -60/31*v0 -3*v2 -60/31 <= 0; value: -60/31 + -152/31*v0 -90/31 <= 0; value: -90/31 - -6*v1 + 5*v3 + 24 = 0; value: 0 + -311/31*v0 + 5*v2 -683/31 <= 0; value: -683/31 0: 1 3 5 2 1: 1 4 5 2: 2 5 3: 1 2 3 4 5 0: 0 -> 0 1: 4 -> 99/31 2: 0 -> 0 3: 0 -> -30/31 + 2*v0 -2*v1 <= 0; value: -8 + -2*v1 -3*v2 + 3 <= 0; value: -13 + v1 + 6*v2 -40 <= 0; value: -23 + 6*v0 + 5*v1 -31 = 0; value: 0 + -1*v1 -3*v2 + 11 = 0; value: 0 + 5*v1 -4*v2 -1*v3 -26 <= 0; value: -11 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3: 5 optimal: 119/3 + + 119/3 <= 0; value: 119/3 - 3*v2 -19 <= 0; value: 0 + -10 <= 0; value: -10 - 6*v0 + 5*v1 -31 = 0; value: 0 - 6/5*v0 -3*v2 + 24/5 = 0; value: 0 + -1*v3 -274/3 <= 0; value: -280/3 0: 3 1 4 2 5 1: 1 2 3 4 5 2: 1 2 4 5 3: 5 0: 1 -> 71/6 1: 5 -> -8 2: 2 -> 19/3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -5*v0 + 2*v2 + 2*v3 -5 < 0; value: -15 + -4*v2 + 4*v3 -1 <= 0; value: -5 + -1*v0 -6*v1 -1*v2 + 13 = 0; value: 0 + 4*v0 + 2*v1 -18 = 0; value: 0 + -2*v1 + v3 <= 0; value: 0 0: 1 3 4 1: 3 4 5 2: 1 2 3 3: 1 2 5 optimal: (16 -e*1) + + 16 < 0; value: 16 - -9/4*v3 -21/2 < 0; value: -9/4 + -105 < 0; value: -105 - -1*v0 -6*v1 -1*v2 + 13 = 0; value: 0 - 11/3*v0 -1/3*v2 -41/3 = 0; value: 0 - 4*v0 + v3 -18 <= 0; value: 0 0: 1 3 4 5 2 1: 3 4 5 2: 1 2 3 4 5 3: 1 2 5 0: 4 -> 65/12 1: 1 -> -11/6 2: 3 -> 223/12 3: 2 -> -11/3 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 6*v1 -13 <= 0; value: -5 + -5*v1 + 2 < 0; value: -18 + 4*v0 + 6*v3 -69 <= 0; value: -41 + -1*v1 + 4 <= 0; value: 0 + 4*v1 -4*v2 + 5*v3 -19 < 0; value: -5 0: 1 3 1: 1 2 4 5 2: 5 3: 3 5 optimal: oo + -3*v3 + 53/2 <= 0; value: 41/2 + 6*v3 -58 <= 0; value: -46 + -18 < 0; value: -18 - 4*v0 + 6*v3 -69 <= 0; value: 0 - -1*v1 + 4 <= 0; value: 0 + -4*v2 + 5*v3 -3 < 0; value: -5 0: 1 3 1: 1 2 4 5 2: 5 3: 3 5 1 0: 4 -> 57/4 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + 5*v2 -47 < 0; value: -27 + v0 -7 <= 0; value: -4 + 5*v3 -48 <= 0; value: -28 + -1*v0 + v1 -3*v2 + 9 < 0; value: -1 + -6*v1 -1*v3 -31 <= 0; value: -65 0: 2 4 1: 4 5 2: 1 4 3: 3 5 optimal: 413/15 + + 413/15 <= 0; value: 413/15 + 5*v2 -47 < 0; value: -27 - v0 -7 <= 0; value: 0 - 5*v3 -48 <= 0; value: 0 + -3*v2 -143/30 < 0; value: -503/30 - -6*v1 -1*v3 -31 <= 0; value: 0 0: 2 4 1: 4 5 2: 1 4 3: 3 5 4 0: 3 -> 7 1: 5 -> -203/30 2: 4 -> 4 3: 4 -> 48/5 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 + 6*v1 -5*v2 + 1 <= 0; value: 0 + -4*v1 -5*v2 -17 <= 0; value: -36 + -6*v1 + 3*v2 -8 <= 0; value: -5 + -6*v3 -2 <= 0; value: -32 + 6*v1 -3*v2 -6*v3 -17 <= 0; value: -50 0: 1 1: 1 2 3 5 2: 1 2 3 5 3: 4 5 optimal: oo + v0 + 37/6 <= 0; value: 61/6 - 2*v0 -2*v2 -7 <= 0; value: 0 + -7*v0 + 77/6 <= 0; value: -91/6 - -6*v1 + 3*v2 -8 <= 0; value: 0 + -6*v3 -2 <= 0; value: -32 + -6*v3 -25 <= 0; value: -55 0: 1 2 1: 1 2 3 5 2: 1 2 3 5 3: 4 5 0: 4 -> 4 1: 1 -> -13/12 2: 3 -> 1/2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + -4*v1 + 6*v2 + 2 = 0; value: 0 + -4*v0 + 2*v2 + 6 <= 0; value: -4 + -3*v0 -4*v3 + 9 < 0; value: -12 + -1*v0 + v2 + 2 = 0; value: 0 + 5*v1 -2*v2 -8 <= 0; value: 0 0: 2 3 4 1: 1 5 2: 1 2 4 5 3: 3 optimal: 4 + + 4 <= 0; value: 4 - -4*v1 + 6*v2 + 2 = 0; value: 0 - -2*v0 + 2 <= 0; value: 0 + -4*v3 + 6 < 0; value: -6 - -1*v0 + v2 + 2 = 0; value: 0 + -11 <= 0; value: -11 0: 2 3 4 5 1: 1 5 2: 1 2 4 5 3: 3 0: 3 -> 1 1: 2 -> -1 2: 1 -> -1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + v2 -1*v3 + 2 = 0; value: 0 + 3*v0 + 6*v2 -46 <= 0; value: -13 + 4*v1 + 3*v2 -62 <= 0; value: -41 + 5*v0 -5*v1 + 5*v2 -66 <= 0; value: -41 + 5*v0 + v1 + 5*v3 -113 <= 0; value: -75 0: 2 4 5 1: 1 3 4 5 2: 1 2 3 4 3: 1 5 optimal: oo + -2*v2 + 132/5 <= 0; value: 102/5 - -1*v1 + v2 -1*v3 + 2 = 0; value: 0 + 3*v0 + 6*v2 -46 <= 0; value: -13 + 4*v0 + 7*v2 -574/5 <= 0; value: -369/5 - 5*v0 + 5*v3 -76 <= 0; value: 0 + v0 + v2 -251/5 <= 0; value: -211/5 0: 2 4 5 3 1: 1 3 4 5 2: 1 2 3 4 5 3: 1 5 4 3 0: 5 -> 5 1: 3 -> -26/5 2: 3 -> 3 3: 2 -> 51/5 + 2*v0 -2*v1 <= 0; value: 8 + -6*v0 + v1 -14 < 0; value: -38 + 2*v2 <= 0; value: 0 + -2*v1 -3*v3 -4 < 0; value: -10 + -6*v3 + 12 <= 0; value: 0 + v0 -6*v2 -7 <= 0; value: -3 0: 1 5 1: 1 3 2: 2 5 3: 3 4 optimal: oo + 2*v0 + 3*v3 + 4 < 0; value: 18 + -6*v0 -3/2*v3 -16 < 0; value: -43 + 2*v2 <= 0; value: 0 - -2*v1 -3*v3 -4 < 0; value: -2 + -6*v3 + 12 <= 0; value: 0 + v0 -6*v2 -7 <= 0; value: -3 0: 1 5 1: 1 3 2: 2 5 3: 3 4 1 0: 4 -> 4 1: 0 -> -4 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 5*v2 -6 < 0; value: -1 + 2*v3 -6 < 0; value: -2 + -5*v1 -4*v3 -20 <= 0; value: -43 + -6*v0 + 4*v1 + 2*v3 <= 0; value: -2 + 2*v1 -2*v2 -5*v3 + 6 = 0; value: 0 0: 4 1: 3 4 5 2: 1 5 3: 2 3 4 5 optimal: oo + 2*v0 + 64/5 < 0; value: 94/5 + -121/2 < 0; value: -121/2 - -20/33*v2 -218/33 < 0; value: -20/33 - -5*v2 -33/2*v3 -5 <= 0; value: 0 + -6*v0 -98/5 < 0; value: -188/5 - 2*v1 -2*v2 -5*v3 + 6 = 0; value: 0 0: 4 1: 3 4 5 2: 1 5 3 4 2 3: 2 3 4 5 0: 3 -> 3 1: 3 -> -1016/165 2: 1 -> -99/10 3: 2 -> 89/33 + 2*v0 -2*v1 <= 0; value: 10 + -2*v0 + 4*v3 -29 <= 0; value: -19 + -3*v0 -2*v1 -3 <= 0; value: -18 + -2*v1 -6*v2 + 3 <= 0; value: -15 + -1*v0 + 3*v1 + 4 < 0; value: -1 + 3*v0 -3*v1 -4*v3 -2 <= 0; value: -7 0: 1 2 4 5 1: 2 3 4 5 2: 3 3: 1 5 optimal: oo + 4/3*v0 + 62/3 <= 0; value: 82/3 - v0 + 9*v2 -71/2 <= 0; value: 0 + -11/3*v0 + 53/3 <= 0; value: -2/3 - -2*v0 -6*v2 + 8/3*v3 + 13/3 <= 0; value: 0 + -27 < 0; value: -27 - 3*v0 -3*v1 -4*v3 -2 <= 0; value: 0 0: 1 2 4 5 3 1: 2 3 4 5 2: 3 2 1 4 3: 1 5 2 3 4 0: 5 -> 5 1: 0 -> -26/3 2: 3 -> 61/18 3: 5 -> 39/4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 + 6*v3 -9 <= 0; value: -3 + 4*v1 + 4*v3 -10 <= 0; value: -6 + 2*v0 + 6*v3 -7 <= 0; value: -3 + -5*v1 + v2 + 2 = 0; value: 0 + -2*v0 + 4 = 0; value: 0 0: 1 3 5 1: 2 4 2: 4 3: 1 2 3 optimal: oo + 2*v0 -2/5*v2 -4/5 <= 0; value: 2 + 3*v0 + 6*v3 -9 <= 0; value: -3 + 4/5*v2 + 4*v3 -42/5 <= 0; value: -6 + 2*v0 + 6*v3 -7 <= 0; value: -3 - -5*v1 + v2 + 2 = 0; value: 0 + -2*v0 + 4 = 0; value: 0 0: 1 3 5 1: 2 4 2: 4 2 3: 1 2 3 0: 2 -> 2 1: 1 -> 1 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -2*v2 + 15 = 0; value: 0 + 4*v1 -2*v3 + 2 <= 0; value: -4 + -4*v2 + 4*v3 + 4 <= 0; value: -4 + <= 0; value: 0 + v3 -3 = 0; value: 0 0: 1 1: 2 2: 1 3 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + -1*v0 -2*v2 + 15 = 0; value: 0 + 4*v1 -2*v3 + 2 <= 0; value: -4 + -4*v2 + 4*v3 + 4 <= 0; value: -4 + <= 0; value: 0 + v3 -3 = 0; value: 0 0: 1 1: 2 2: 1 3 3: 2 3 5 0: 5 -> 5 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 -4*v1 -3*v2 -4 <= 0; value: -23 + 6*v0 + 5*v1 + 2*v3 -39 = 0; value: 0 + 3*v0 -6*v2 + 12 = 0; value: 0 + 6*v1 + 3*v2 -60 < 0; value: -21 + -5*v0 + 3*v2 + 1 <= 0; value: 0 0: 1 2 3 5 1: 1 2 4 2: 1 3 4 5 3: 2 optimal: (68/9 -e*1) + + 68/9 < 0; value: 68/9 - 49/5*v0 -3*v2 + 8/5*v3 -176/5 <= 0; value: 0 - 6*v0 + 5*v1 + 2*v3 -39 = 0; value: 0 - 3*v0 -6*v2 + 12 = 0; value: 0 - 27/4*v0 -69 < 0; value: -27/4 + -259/9 < 0; value: -259/9 0: 1 2 3 5 4 1: 1 2 4 2: 1 3 4 5 3: 2 1 4 0: 2 -> 83/9 1: 5 -> 401/72 2: 3 -> 119/18 3: 1 -> -3181/144 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + 2*v2 + v3 -36 <= 0; value: -20 + -1*v0 + 3*v2 -5*v3 -2 < 0; value: -1 + 2*v1 + 3*v2 -37 < 0; value: -18 + -3*v1 + 3*v3 <= 0; value: 0 + -4*v1 -1*v2 + 3 <= 0; value: -10 0: 2 1: 1 3 4 5 2: 1 2 3 5 3: 1 2 4 optimal: (574/5 -e*1) + + 574/5 < 0; value: 574/5 + -16 <= 0; value: -16 - -1*v0 + 3*v2 -5*v3 -2 < 0; value: -5 - 10/17*v0 -546/17 < 0; value: -10/17 - -3*v1 + 3*v3 <= 0; value: 0 - 4/5*v0 -17/5*v2 + 23/5 <= 0; value: 0 0: 2 5 1 3 1: 1 3 4 5 2: 1 2 3 5 3: 1 2 4 5 3 0: 4 -> 268/5 1: 2 -> -148/85 2: 5 -> 1187/85 3: 2 -> -148/85 + 2*v0 -2*v1 <= 0; value: -8 + 2*v2 + v3 -9 <= 0; value: -4 + -5*v1 + 6*v2 -6*v3 + 19 = 0; value: 0 + 4*v1 -20 = 0; value: 0 + 5*v2 -1*v3 -22 <= 0; value: -13 + 6*v0 + 2*v2 + v3 -29 <= 0; value: -18 0: 5 1: 2 3 2: 1 2 4 5 3: 1 2 4 5 optimal: oo + -1*v2 <= 0; value: -2 + 3*v2 -10 <= 0; value: -4 - -5*v1 + 6*v2 -6*v3 + 19 = 0; value: 0 - 24/5*v2 -24/5*v3 -24/5 = 0; value: 0 + 4*v2 -21 <= 0; value: -13 - 6*v0 + 3*v2 -30 <= 0; value: 0 0: 5 1: 2 3 2: 1 2 4 5 3 3: 1 2 4 5 3 0: 1 -> 4 1: 5 -> 5 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 + v3 -16 <= 0; value: -8 + -3*v0 + 4*v1 + 4*v2 -38 < 0; value: -21 + -4*v0 + v1 -4*v2 -18 <= 0; value: -55 + v1 -1*v2 -4*v3 -8 < 0; value: -18 + 3*v1 -6*v2 + 6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 2 3 4 5 3: 1 4 5 optimal: oo + 2*v0 -4*v2 + 4*v3 + 6 <= 0; value: 4 + 4*v2 -3*v3 -22 <= 0; value: -8 + -3*v0 + 12*v2 -8*v3 -50 < 0; value: -21 + -4*v0 -2*v2 -2*v3 -21 <= 0; value: -55 + v2 -6*v3 -11 < 0; value: -18 - 3*v1 -6*v2 + 6*v3 + 9 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 2 3 4 5 1 3: 1 4 5 2 3 0: 5 -> 5 1: 3 -> 3 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 + 5*v3 -28 <= 0; value: -18 + -3*v0 <= 0; value: 0 + 6*v0 + 6*v1 -68 < 0; value: -38 + 5*v2 -5*v3 -5 < 0; value: -15 + 5*v2 + 4*v3 -21 <= 0; value: -13 0: 1 2 3 1: 3 2: 4 5 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -10 + -3*v0 + 5*v3 -28 <= 0; value: -18 + -3*v0 <= 0; value: 0 + 6*v0 + 6*v1 -68 < 0; value: -38 + 5*v2 -5*v3 -5 < 0; value: -15 + 5*v2 + 4*v3 -21 <= 0; value: -13 0: 1 2 3 1: 3 2: 4 5 3: 1 4 5 0: 0 -> 0 1: 5 -> 5 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + 3*v1 -6 < 0; value: -3 + 5*v1 -2*v3 -7 <= 0; value: -2 + -3*v0 -2*v1 < 0; value: -2 + -3*v1 -6*v2 + 4*v3 + 31 <= 0; value: -2 + 2*v1 -3*v3 -4 <= 0; value: -2 0: 3 1: 1 2 3 4 5 2: 4 3: 2 4 5 optimal: oo + 60*v2 -770/3 < 0; value: 130/3 + -54*v2 + 225 < 0; value: -45 + -66*v2 + 278 < 0; value: -52 - -3*v0 + 4*v2 -8/3*v3 -62/3 < 0; value: -8/3 - -3*v1 -6*v2 + 4*v3 + 31 <= 0; value: 0 - 3/8*v0 -9/2*v2 + 77/4 <= 0; value: 0 0: 3 5 2 1 1: 1 2 3 4 5 2: 4 3 1 2 5 1 3: 2 4 5 3 1 0: 0 -> 26/3 1: 1 -> -35/3 2: 5 -> 5 3: 0 -> -9 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 + 5*v1 + 6*v2 -100 <= 0; value: -45 + -4*v0 -1*v1 + 4 < 0; value: -17 + v0 -5*v2 + 3*v3 + 1 < 0; value: -1 + 4*v0 -23 <= 0; value: -7 + 2*v0 -6*v3 -3 < 0; value: -13 0: 1 2 3 4 5 1: 1 2 2: 1 3 3: 3 5 optimal: (99/2 -e*1) + + 99/2 < 0; value: 99/2 + 6*v2 -711/4 < 0; value: -639/4 - -4*v0 -1*v1 + 4 < 0; value: -1 - v0 -5*v2 + 3*v3 + 1 < 0; value: -7/8 - 20*v2 -12*v3 -27 <= 0; value: 0 + -10*v2 + 22 <= 0; value: -8 0: 1 2 3 4 5 1: 1 2 2: 1 3 4 5 3: 3 5 4 1 0: 4 -> 39/8 1: 5 -> -29/2 2: 3 -> 3 3: 3 -> 11/4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -15 <= 0; value: -33 + 4*v1 -34 < 0; value: -22 + 2*v0 -5*v3 -3 <= 0; value: -7 + -6*v0 + 3*v2 + 1 <= 0; value: -17 + 6*v3 -22 < 0; value: -10 0: 1 3 4 1: 2 2: 4 3: 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 -15 <= 0; value: -33 + 4*v1 -34 < 0; value: -22 + 2*v0 -5*v3 -3 <= 0; value: -7 + -6*v0 + 3*v2 + 1 <= 0; value: -17 + 6*v3 -22 < 0; value: -10 0: 1 3 4 1: 2 2: 4 3: 3 5 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 -4*v3 -3 < 0; value: -18 + 4*v0 -30 <= 0; value: -10 + 4*v1 -4*v2 -3*v3 -8 = 0; value: 0 + v0 -6*v2 -6*v3 -6 < 0; value: -1 + 3*v0 + v2 -15 = 0; value: 0 0: 1 2 4 5 1: 3 2: 3 4 5 3: 1 3 4 optimal: (115/8 -e*1) + + 115/8 < 0; value: 115/8 + -113/2 <= 0; value: -113/2 - 4*v0 -30 <= 0; value: 0 - 4*v1 -4*v2 -3*v3 -8 = 0; value: 0 - v0 -6*v2 -6*v3 -6 < 0; value: -6 - 3*v0 + v2 -15 = 0; value: 0 0: 1 2 4 5 1: 3 2: 3 4 5 1 3: 1 3 4 0: 5 -> 15/2 1: 2 -> 17/16 2: 0 -> -15/2 3: 0 -> 35/4 + 2*v0 -2*v1 <= 0; value: 2 + 3*v0 -4*v2 -5*v3 + 1 <= 0; value: -8 + 3*v0 -17 <= 0; value: -2 + -1*v0 + 2*v2 + 3*v3 -20 <= 0; value: -11 + -5*v0 + 4*v2 -1*v3 + 25 = 0; value: 0 + -2*v0 + 6*v1 -1*v3 -10 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 1 3 4 3: 1 3 4 5 optimal: 92/27 + + 92/27 <= 0; value: 92/27 - 28*v0 -24*v2 -124 <= 0; value: 0 - 3*v0 -17 <= 0; value: 0 + -139/9 <= 0; value: -139/9 - -5*v0 + 4*v2 -1*v3 + 25 = 0; value: 0 - -2*v0 + 6*v1 -1*v3 -10 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 1 3 4 3: 1 3 4 5 0: 5 -> 17/3 1: 4 -> 107/27 2: 1 -> 13/9 3: 4 -> 22/9 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 -2*v2 + 3 < 0; value: -19 + 4*v0 -1*v1 -17 = 0; value: 0 + -1*v2 -2*v3 + 7 <= 0; value: 0 + v0 + 6*v1 -45 <= 0; value: -22 + 4*v2 + v3 -33 < 0; value: -12 0: 2 4 1: 1 2 4 2: 1 3 5 3: 3 5 optimal: (767/56 -e*1) + + 767/56 < 0; value: 767/56 - -16*v0 -2*v2 + 71 < 0; value: -82/7 - 4*v0 -1*v1 -17 = 0; value: 0 - -7/4*v3 -5/4 < 0; value: -3/2 + -6989/112 < 0; value: -6989/112 - 4*v2 + v3 -33 < 0; value: -4 0: 2 4 1 1: 1 2 4 2: 1 3 5 4 3: 3 5 4 0: 5 -> 239/56 1: 3 -> 1/14 2: 5 -> 101/14 3: 1 -> 1/7 + 2*v0 -2*v1 <= 0; value: -4 + -6*v1 -1*v2 -4 < 0; value: -36 + -5*v0 + 5*v1 + 2*v2 -14 = 0; value: 0 + 6*v1 -70 < 0; value: -40 + -1*v0 + 2 <= 0; value: -1 + 3*v0 -9 = 0; value: 0 0: 2 4 5 1: 1 2 3 2: 1 2 3: optimal: (116/7 -e*1) + + 116/7 < 0; value: 116/7 - -6*v0 + 7/5*v2 -104/5 < 0; value: -7/5 - -5*v0 + 5*v1 + 2*v2 -14 = 0; value: 0 + -712/7 < 0; value: -712/7 + -1 <= 0; value: -1 - 3*v0 -9 = 0; value: 0 0: 2 4 5 1 3 1: 1 2 3 2: 1 2 3 3: 0: 3 -> 3 1: 5 -> -171/35 2: 2 -> 187/7 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 4*v2 -11 = 0; value: 0 + -4*v0 + 5*v3 -16 <= 0; value: -36 + 4*v1 -3*v2 -8 = 0; value: 0 + -4*v0 + 4*v1 <= 0; value: 0 + 5*v1 + v2 -68 <= 0; value: -39 0: 1 2 4 1: 3 4 5 2: 1 3 5 3: 2 optimal: 1014/19 + + 1014/19 <= 0; value: 1014/19 - -1*v0 + 4*v2 -11 = 0; value: 0 + 5*v3 -3180/19 <= 0; value: -3180/19 - 4*v1 -3*v2 -8 = 0; value: 0 + -2028/19 <= 0; value: -2028/19 - 19/16*v0 -719/16 <= 0; value: 0 0: 1 2 4 5 1: 3 4 5 2: 1 3 5 4 3: 2 0: 5 -> 719/19 1: 5 -> 212/19 2: 4 -> 232/19 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + 5*v0 + 4*v2 -26 <= 0; value: -14 + 6*v2 + 5*v3 -94 < 0; value: -56 + -6*v1 -1*v3 + 2 < 0; value: -20 + 2*v1 -6 = 0; value: 0 + 5*v0 -1*v1 + 3*v2 -6 <= 0; value: 0 0: 1 5 1: 3 4 5 2: 1 2 5 3: 2 3 optimal: oo + -6/5*v2 -12/5 <= 0; value: -6 + v2 -17 <= 0; value: -14 + 6*v2 + 5*v3 -94 < 0; value: -56 + -1*v3 -16 < 0; value: -20 - 2*v1 -6 = 0; value: 0 - 5*v0 + 3*v2 -9 <= 0; value: 0 0: 1 5 1: 3 4 5 2: 1 2 5 3: 2 3 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 3*v2 -6*v3 + 1 <= 0; value: -5 + 3*v0 -5*v2 + 6 <= 0; value: -2 + 5*v1 + 3*v2 + 6*v3 -74 <= 0; value: -34 + 3*v2 + 2*v3 -47 <= 0; value: -29 + -6*v0 -2*v1 -3*v3 -9 <= 0; value: -46 0: 2 5 1: 3 5 2: 1 2 3 4 3: 1 3 4 5 optimal: 1499/9 + + 1499/9 <= 0; value: 1499/9 - 36/5*v0 -628/5 <= 0; value: 0 - 3*v0 -5*v2 + 6 <= 0; value: 0 + -1993/6 <= 0; value: -1993/6 - 3*v2 + 2*v3 -47 <= 0; value: 0 - -6*v0 -2*v1 -3*v3 -9 <= 0; value: 0 0: 2 5 3 1 1: 3 5 2: 1 2 3 4 3: 1 3 4 5 0: 4 -> 157/9 1: 2 -> -395/6 2: 4 -> 35/3 3: 3 -> 6 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 4*v1 + 3*v3 -10 <= 0; value: 0 + -4*v1 -2*v3 + 24 = 0; value: 0 + -3*v1 -3 <= 0; value: -15 + -6*v2 + 4*v3 -6 < 0; value: -14 + -1*v0 <= 0; value: -3 0: 1 5 1: 1 2 3 2: 4 3: 1 2 4 optimal: (34/3 -e*1) + + 34/3 < 0; value: 34/3 - -6*v0 + v3 + 14 <= 0; value: 0 - -4*v1 -2*v3 + 24 = 0; value: 0 - 9/4*v2 -75/4 <= 0; value: 0 - 24*v0 -6*v2 -62 < 0; value: -20 + -14/3 < 0; value: -14/3 0: 1 5 4 3 1: 1 2 3 2: 4 3 5 3: 1 2 4 3 0: 3 -> 23/6 1: 4 -> 3/2 2: 4 -> 25/3 3: 4 -> 9 + 2*v0 -2*v1 <= 0; value: -4 + -1*v3 + 2 <= 0; value: 0 + 4*v1 + 4*v2 -52 <= 0; value: -16 + -5*v1 -2*v3 + 29 = 0; value: 0 + 5*v0 -21 <= 0; value: -6 + -5*v1 -2*v2 -7 <= 0; value: -40 0: 4 1: 2 3 5 2: 2 5 3: 1 3 optimal: 152/5 + + 152/5 <= 0; value: 152/5 + -40 <= 0; value: -40 - 12/5*v2 -288/5 <= 0; value: 0 - -5*v1 -2*v3 + 29 = 0; value: 0 - 5*v0 -21 <= 0; value: 0 - -2*v2 + 2*v3 -36 <= 0; value: 0 0: 4 1: 2 3 5 2: 2 5 1 3: 1 3 5 2 0: 3 -> 21/5 1: 5 -> -11 2: 4 -> 24 3: 2 -> 42 + 2*v0 -2*v1 <= 0; value: 4 + 4*v0 -4*v1 + 5*v2 -31 <= 0; value: -3 + -2*v1 -6*v2 + 16 <= 0; value: -12 + 6*v2 -3*v3 -13 <= 0; value: -4 + 6*v1 + v2 + 3*v3 -31 = 0; value: 0 + -3*v1 -1*v3 + 9 <= 0; value: -2 0: 1 1: 1 2 4 5 2: 1 2 3 4 3: 3 4 5 optimal: 321/22 + + 321/22 <= 0; value: 321/22 - 4*v0 + 17/3*v2 + 2*v3 -155/3 <= 0; value: 0 - -2*v0 -17/2*v2 + 63/2 <= 0; value: 0 - 44/17*v0 -625/17 <= 0; value: 0 - 6*v1 + v2 + 3*v3 -31 = 0; value: 0 + -268/33 <= 0; value: -268/33 0: 1 2 5 3 1: 1 2 4 5 2: 1 2 3 4 5 3: 3 4 5 2 1 0: 4 -> 625/44 1: 2 -> 76/11 2: 4 -> 4/11 3: 5 -> -119/33 + 2*v0 -2*v1 <= 0; value: 0 + -3*v0 + 6 = 0; value: 0 + -1*v0 -5*v3 -5 <= 0; value: -22 + 3*v1 -3*v2 + 2*v3 -9 = 0; value: 0 + 5*v0 + v2 + 5*v3 -36 <= 0; value: -10 + -3*v0 -5*v1 + 5*v2 -9 <= 0; value: -20 0: 1 2 4 5 1: 3 5 2: 3 4 5 3: 2 3 4 optimal: 48 + + 48 <= 0; value: 48 - -3*v0 + 6 = 0; value: 0 + -52 <= 0; value: -52 - 3*v1 -3*v2 + 2*v3 -9 = 0; value: 0 - 5*v0 + v2 + 5*v3 -36 <= 0; value: 0 - -19/3*v0 -2/3*v2 <= 0; value: 0 0: 1 2 4 5 1: 3 5 2: 3 4 5 5 2 3: 2 3 4 5 0: 2 -> 2 1: 2 -> -22 2: 1 -> -19 3: 3 -> 9 + 2*v0 -2*v1 <= 0; value: 0 + -3*v3 + 9 = 0; value: 0 + 6*v0 + 2*v1 -14 <= 0; value: -6 + -2*v1 -2*v2 + 2 < 0; value: -6 + -5*v1 + 4 < 0; value: -1 + 5*v0 + 6*v2 + v3 -29 <= 0; value: -3 0: 2 5 1: 2 3 4 2: 3 5 3: 1 5 optimal: (38/15 -e*1) + + 38/15 < 0; value: 38/15 - -3*v3 + 9 = 0; value: 0 - -36/5*v2 + 94/5 < 0; value: -7/5 + -217/45 <= 0; value: -217/45 - -5*v1 + 4 < 0; value: -1/2 - 5*v0 + 6*v2 + v3 -29 <= 0; value: 0 0: 2 5 1: 2 3 4 2: 3 5 2 3: 1 5 2 0: 1 -> 11/6 1: 1 -> 9/10 2: 3 -> 101/36 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -3*v1 + 4*v2 + 3*v3 <= 0; value: 0 + -2*v1 + 2*v2 + 4 <= 0; value: 0 + -6*v1 + 5 <= 0; value: -7 + -4*v0 -6*v3 + 5 < 0; value: -11 + 2*v1 -4 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 2 3: 1 4 optimal: oo + 2*v0 -4 <= 0; value: -2 - -3*v1 + 4*v2 + 3*v3 <= 0; value: 0 - -2/3*v2 -2*v3 + 4 <= 0; value: 0 + -7 <= 0; value: -7 + -4*v0 -7 < 0; value: -11 - 2*v2 = 0; value: 0 0: 4 1: 1 2 3 5 2: 1 2 3 5 4 3: 1 4 2 3 5 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + v2 -3*v3 + 8 <= 0; value: -7 + -6*v1 + 5*v2 + 4*v3 -20 = 0; value: 0 + -4*v2 -1*v3 + 4 <= 0; value: -1 + -4*v1 <= 0; value: 0 + 6*v0 + v2 -36 <= 0; value: -18 0: 5 1: 2 4 2: 1 2 3 5 3: 1 2 3 optimal: 400/33 + + 400/33 <= 0; value: 400/33 + -96/11 <= 0; value: -96/11 - -6*v1 + 5*v2 + 4*v3 -20 = 0; value: 0 - -11/4*v2 -1 <= 0; value: 0 - -10/3*v2 -8/3*v3 + 40/3 <= 0; value: 0 - 6*v0 + v2 -36 <= 0; value: 0 0: 5 1: 2 4 2: 1 2 3 5 4 3: 1 2 3 4 0: 3 -> 200/33 1: 0 -> 0 2: 0 -> -4/11 3: 5 -> 60/11 + 2*v0 -2*v1 <= 0; value: -8 + -1*v1 -6*v2 + 11 = 0; value: 0 + 2*v2 -6*v3 + 28 = 0; value: 0 + -4*v1 -2*v3 + 16 <= 0; value: -14 + 5*v2 -14 < 0; value: -9 + 4*v1 -3*v2 -47 < 0; value: -30 0: 1: 1 3 5 2: 1 2 4 5 3: 2 3 optimal: oo + 2*v0 -14/5 <= 0; value: -4/5 - -1*v1 -6*v2 + 11 = 0; value: 0 - 2*v2 -6*v3 + 28 = 0; value: 0 - 70*v3 -364 <= 0; value: 0 + -6 < 0; value: -6 + -231/5 < 0; value: -231/5 0: 1: 1 3 5 2: 1 2 4 5 3 3: 2 3 4 5 0: 1 -> 1 1: 5 -> 7/5 2: 1 -> 8/5 3: 5 -> 26/5 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4 = 0; value: 0 + -6*v0 + v1 + 3 = 0; value: 0 + -5*v0 + 5*v1 -11 <= 0; value: -1 + 4*v2 -3*v3 -16 <= 0; value: -5 + -2*v1 + 2*v2 -11 <= 0; value: -7 0: 1 2 3 1: 2 3 5 2: 4 5 3: 4 optimal: -4 + -4 <= 0; value: -4 - -4*v0 + 4 = 0; value: 0 - -6*v0 + v1 + 3 = 0; value: 0 + -1 <= 0; value: -1 + 4*v2 -3*v3 -16 <= 0; value: -5 + 2*v2 -17 <= 0; value: -7 0: 1 2 3 5 1: 2 3 5 2: 4 5 3: 4 0: 1 -> 1 1: 3 -> 3 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -4*v1 + 4 = 0; value: 0 + 5*v1 -1*v2 + 2*v3 -11 <= 0; value: -3 + -6*v1 + 3*v2 <= 0; value: 0 + -4*v1 -1*v2 -6*v3 + 6 <= 0; value: -18 + -3*v1 <= 0; value: 0 0: 1 1: 1 2 3 4 5 2: 2 3 4 3: 2 4 optimal: 2 + + 2 <= 0; value: 2 - -4*v0 -4*v1 + 4 = 0; value: 0 + 2*v3 -11 <= 0; value: -3 - 6*v0 + 3*v2 -6 <= 0; value: 0 + -6*v3 + 6 <= 0; value: -18 - -3/2*v2 <= 0; value: 0 0: 1 3 4 5 2 1: 1 2 3 4 5 2: 2 3 4 5 3: 2 4 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -6*v0 -2*v3 -4 < 0; value: -40 + -4*v1 -1*v2 + 3*v3 -1 <= 0; value: -13 + -3*v0 + 2*v2 -3*v3 + 14 = 0; value: 0 + -1*v0 + 4*v1 -5*v2 -7 <= 0; value: -21 + 3*v3 -16 <= 0; value: -7 0: 1 3 4 1: 2 4 2: 2 3 4 3: 1 2 3 5 optimal: oo + 4*v0 -29/4 <= 0; value: 51/4 + -8/3*v0 -46/3 < 0; value: -86/3 - -4*v1 -1*v2 + 3*v3 -1 <= 0; value: 0 - -3*v0 + 2*v2 -3*v3 + 14 = 0; value: 0 - -4*v0 -4*v2 + 6 <= 0; value: 0 + -5*v0 + 1 <= 0; value: -24 0: 1 3 4 5 1: 2 4 2: 2 3 4 1 5 3: 1 2 3 5 4 0: 5 -> 5 1: 4 -> -11/8 2: 5 -> -7/2 3: 3 -> -8/3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v1 + v2 + 3 = 0; value: 0 + v0 + 3*v1 + 2*v3 -24 <= 0; value: 0 + 2*v1 -4*v2 + v3 -6 <= 0; value: -2 + v0 -9 <= 0; value: -4 + -3*v0 + 5*v2 -3 < 0; value: -8 0: 2 4 5 1: 1 2 3 2: 1 3 5 3: 2 3 optimal: oo + 2*v0 -1*v3 -6 <= 0; value: 2 - -1*v1 + v2 + 3 = 0; value: 0 + v0 + 7/2*v3 -15 <= 0; value: -3 - -2*v2 + v3 <= 0; value: 0 + v0 -9 <= 0; value: -4 + -3*v0 + 5/2*v3 -3 < 0; value: -13 0: 2 4 5 1: 1 2 3 2: 1 3 5 2 3: 2 3 5 0: 5 -> 5 1: 5 -> 4 2: 2 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + 2*v0 + 5*v2 -41 < 0; value: -18 + 2*v0 + 4*v3 -45 < 0; value: -25 + 5*v0 -4*v3 -14 <= 0; value: -6 + -2*v1 + 4*v2 -10 = 0; value: 0 + -5*v2 -8 < 0; value: -23 0: 1 2 3 1: 4 2: 1 4 5 3: 2 3 optimal: (1164/35 -e*1) + + 1164/35 < 0; value: 1164/35 + -225/7 <= 0; value: -225/7 - 28/5*v3 -197/5 < 0; value: -28/5 - 5*v0 -4*v3 -14 <= 0; value: 0 - -2*v1 + 4*v2 -10 = 0; value: 0 - -5*v2 -8 < 0; value: -5 0: 1 2 3 1: 4 2: 1 4 5 3: 2 3 1 0: 4 -> 267/35 1: 1 -> -31/5 2: 3 -> -3/5 3: 3 -> 169/28 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 -25 < 0; value: -15 + -5*v0 + 3*v1 + 6*v2 -57 <= 0; value: -33 + -3*v2 + 15 = 0; value: 0 + v1 -1*v3 -3 = 0; value: 0 + 3*v1 -5*v2 -13 <= 0; value: -29 0: 2 1: 2 4 5 2: 1 2 3 5 3: 4 optimal: oo + 2*v0 -2*v3 -6 <= 0; value: 0 + 2*v2 -25 < 0; value: -15 + -5*v0 + 6*v2 + 3*v3 -48 <= 0; value: -33 + -3*v2 + 15 = 0; value: 0 - v1 -1*v3 -3 = 0; value: 0 + -5*v2 + 3*v3 -4 <= 0; value: -29 0: 2 1: 2 4 5 2: 1 2 3 5 3: 4 2 5 0: 3 -> 3 1: 3 -> 3 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 -20 = 0; value: 0 + 2*v0 -6*v3 + 20 <= 0; value: 0 + -4*v0 -6*v1 -5*v2 + 25 = 0; value: 0 + -5*v2 + v3 <= 0; value: 0 + -3*v0 -3*v1 + 2*v3 -4 < 0; value: -9 0: 1 2 3 5 1: 3 5 2: 3 4 3: 2 4 5 optimal: (16 -e*1) + + 16 < 0; value: 16 - 4*v0 -20 = 0; value: 0 - 2*v0 -6*v3 + 20 <= 0; value: 0 - -4*v0 -6*v1 -5*v2 + 25 = 0; value: 0 + -18 < 0; value: -18 - -1*v0 + 5/2*v2 + 2*v3 -33/2 < 0; value: -5/2 0: 1 2 3 5 4 1: 3 5 2: 3 4 5 3: 2 4 5 0: 5 -> 5 1: 0 -> -13/6 2: 1 -> 18/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -6*v2 -10 <= 0; value: -40 + -3*v1 + v2 -3*v3 -8 < 0; value: -24 + -4*v0 -5*v2 -3*v3 + 39 = 0; value: 0 + -4*v2 -1*v3 -12 <= 0; value: -34 + -1*v1 -6*v2 + 2*v3 + 17 < 0; value: -14 0: 3 1: 2 5 2: 1 2 3 4 5 3: 2 3 4 5 optimal: (1289/55 -e*1) + + 1289/55 < 0; value: 1289/55 + -256/55 <= 0; value: -256/55 - -3*v1 + v2 -3*v3 -8 < 0; value: -39/55 - -4*v0 -5*v2 -3*v3 + 39 = 0; value: 0 - 110/51*v0 -1891/51 <= 0; value: 0 - -4*v0 -34/3*v2 + 176/3 <= 0; value: 0 0: 3 5 4 1 1: 2 5 2: 1 2 3 4 5 3: 2 3 4 5 0: 2 -> 1891/110 1: 5 -> 314/55 2: 5 -> -49/55 3: 2 -> -464/55 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 6*v2 -14 = 0; value: 0 + v0 -3*v1 -6*v2 + 17 = 0; value: 0 + 6*v0 -2*v2 -23 <= 0; value: -5 + -3*v1 -4*v2 + 15 = 0; value: 0 + 4*v2 -3*v3 -6 <= 0; value: -3 0: 1 2 3 1: 2 4 2: 1 2 3 4 5 3: 5 optimal: 6 + + 6 <= 0; value: 6 - -1*v0 + 6*v2 -14 = 0; value: 0 - v0 -3*v1 -6*v2 + 17 = 0; value: 0 + -5 <= 0; value: -5 - -2/3*v0 + 8/3 = 0; value: 0 + -3*v3 + 6 <= 0; value: -3 0: 1 2 3 4 5 1: 2 4 2: 1 2 3 4 5 3: 5 0: 4 -> 4 1: 1 -> 1 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + v1 <= 0; value: 0 + -5*v0 + 4*v3 <= 0; value: 0 + -2*v0 -2*v1 <= 0; value: 0 + -4*v0 + 4*v1 + 4*v3 <= 0; value: 0 + 6*v0 <= 0; value: 0 0: 1 2 3 4 5 1: 1 3 4 2: 3: 2 4 optimal: 0 + <= 0; value: 0 + <= 0; value: 0 + 4*v3 <= 0; value: 0 - -2*v0 -2*v1 <= 0; value: 0 + 4*v3 <= 0; value: 0 - 6*v0 <= 0; value: 0 0: 1 2 3 4 5 1: 1 3 4 2: 3: 2 4 0: 0 -> 0 1: 0 -> 0 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 6 + 2*v1 -3*v3 + 1 < 0; value: -2 + -5*v0 + 3*v3 -3 <= 0; value: -15 + -2*v0 -2*v2 -12 < 0; value: -26 + -2*v0 + 4*v1 + 3 <= 0; value: -3 + -4*v1 + v3 -2 < 0; value: -1 0: 2 3 4 1: 1 4 5 2: 3 3: 1 2 5 optimal: oo + 2*v0 + 1 < 0; value: 7 - -5/2*v3 < 0; value: -5/4 + -5*v0 -3 < 0; value: -18 + -2*v0 -2*v2 -12 < 0; value: -26 + -2*v0 + 1 < 0; value: -5 - -4*v1 + v3 -2 < 0; value: -3/4 0: 2 3 4 1: 1 4 5 2: 3 3: 1 2 5 4 0: 3 -> 3 1: 0 -> -3/16 2: 4 -> 4 3: 1 -> 1/2 + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 2*v2 -36 <= 0; value: -6 + 2*v0 + 6*v2 + 6*v3 -88 <= 0; value: -56 + -4*v0 -1*v2 -4*v3 -7 <= 0; value: -16 + 2*v0 -2 <= 0; value: 0 + 3*v2 -2*v3 -15 = 0; value: 0 0: 2 3 4 1: 1 2: 1 2 3 5 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + 4*v1 + 2*v2 -36 <= 0; value: -6 + 2*v0 + 6*v2 + 6*v3 -88 <= 0; value: -56 + -4*v0 -1*v2 -4*v3 -7 <= 0; value: -16 + 2*v0 -2 <= 0; value: 0 + 3*v2 -2*v3 -15 = 0; value: 0 0: 2 3 4 1: 1 2: 1 2 3 5 3: 2 3 5 0: 1 -> 1 1: 5 -> 5 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 + 5*v3 -14 = 0; value: 0 + -3*v2 -5*v3 -31 <= 0; value: -66 + 3*v2 -2*v3 -16 <= 0; value: -9 + -1*v0 -4*v1 + 23 = 0; value: 0 + -2*v1 + 10 = 0; value: 0 0: 1 4 1: 4 5 2: 2 3 3: 1 2 3 optimal: -4 + -4 <= 0; value: -4 - -2*v0 + 5*v3 -14 = 0; value: 0 + -3*v2 -51 <= 0; value: -66 + 3*v2 -24 <= 0; value: -9 - -1*v0 -4*v1 + 23 = 0; value: 0 - 5/4*v3 -5 = 0; value: 0 0: 1 4 5 1: 4 5 2: 2 3 3: 1 2 3 5 0: 3 -> 3 1: 5 -> 5 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 2*v2 -18 < 0; value: -11 + 4*v2 -6 <= 0; value: -2 + -3*v1 + 2*v2 -2 <= 0; value: -9 + -6*v0 -5*v1 -2*v3 < 0; value: -23 + -1*v2 < 0; value: -1 0: 1 4 1: 3 4 2: 1 2 3 5 3: 4 optimal: (128/15 -e*1) + + 128/15 < 0; value: 128/15 - 5*v0 -18 < 0; value: -5 + -6 < 0; value: -6 - -3*v1 + 2*v2 -2 <= 0; value: 0 + -2*v3 -274/15 < 0; value: -304/15 - -1*v2 < 0; value: -1/2 0: 1 4 1: 3 4 2: 1 2 3 5 4 3: 4 0: 1 -> 13/5 1: 3 -> -1/3 2: 1 -> 1/2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -6*v3 -14 < 0; value: -68 + -1*v0 -6*v1 + 2*v2 + 19 = 0; value: 0 + 6*v1 -31 < 0; value: -13 + -3*v1 + 2*v2 -1 <= 0; value: -6 + -3*v3 + 11 <= 0; value: -1 0: 1 2 1: 2 3 4 2: 2 4 3: 1 5 optimal: oo + 7/3*v0 -2/3*v2 -19/3 <= 0; value: 4 + -6*v0 -6*v3 -14 < 0; value: -68 - -1*v0 -6*v1 + 2*v2 + 19 = 0; value: 0 + -1*v0 + 2*v2 -12 < 0; value: -13 + 1/2*v0 + v2 -21/2 <= 0; value: -6 + -3*v3 + 11 <= 0; value: -1 0: 1 2 4 3 1: 2 3 4 2: 2 4 3 3: 1 5 0: 5 -> 5 1: 3 -> 3 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v2 -3 <= 0; value: -9 + -6*v0 + 3*v1 + v3 + 8 = 0; value: 0 + -6*v0 -6*v1 -21 <= 0; value: -51 + -5*v2 + 4 < 0; value: -11 + 3*v0 + v2 -13 <= 0; value: -1 0: 1 2 3 5 1: 2 3 2: 1 4 5 3: 2 optimal: 239/11 + + 239/11 <= 0; value: 239/11 - -22/3*v2 + 43/3 <= 0; value: 0 - -6*v0 + 3*v1 + v3 + 8 = 0; value: 0 - -18*v0 + 2*v3 -5 <= 0; value: 0 + -127/22 < 0; value: -127/22 - 3*v0 + v2 -13 <= 0; value: 0 0: 1 2 3 5 1: 2 3 2: 1 4 5 3: 2 3 0: 3 -> 81/22 1: 2 -> -79/11 2: 3 -> 43/22 3: 4 -> 392/11 + 2*v0 -2*v1 <= 0; value: 8 + v0 + 2*v1 + 5*v3 -34 <= 0; value: -10 + 4*v2 -14 <= 0; value: -6 + -5*v0 -1*v2 + 22 = 0; value: 0 + v0 -3*v2 -4*v3 + 5 <= 0; value: -13 + -6*v3 + 8 < 0; value: -16 0: 1 3 4 1: 1 2: 2 3 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v0 + 2*v1 + 5*v3 -34 <= 0; value: -10 + 4*v2 -14 <= 0; value: -6 + -5*v0 -1*v2 + 22 = 0; value: 0 + v0 -3*v2 -4*v3 + 5 <= 0; value: -13 + -6*v3 + 8 < 0; value: -16 0: 1 3 4 1: 1 2: 2 3 4 3: 1 4 5 0: 4 -> 4 1: 0 -> 0 2: 2 -> 2 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 4*v0 -3*v1 <= 0; value: -12 + 2*v1 -2*v2 = 0; value: 0 + 6*v0 -1*v2 -1 <= 0; value: -5 + 5*v0 -5*v2 + 19 <= 0; value: -1 + -6*v2 -6*v3 + 19 <= 0; value: -17 0: 1 3 4 1: 1 2 2: 2 3 4 5 3: 5 optimal: -38/5 + -38/5 <= 0; value: -38/5 + v0 -57/5 <= 0; value: -57/5 - 2*v1 -2*v2 = 0; value: 0 + 5*v0 -24/5 <= 0; value: -24/5 - 5*v0 -5*v2 + 19 <= 0; value: 0 + -6*v0 -6*v3 -19/5 <= 0; value: -79/5 0: 1 3 4 5 1: 1 2 2: 2 3 4 5 1 3: 5 0: 0 -> 0 1: 4 -> 19/5 2: 4 -> 19/5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -2*v3 -3 <= 0; value: -7 + v3 -2 <= 0; value: -1 + v1 + 5*v2 -22 < 0; value: -11 + -5*v0 + v2 + 7 <= 0; value: -1 + -5*v0 -1*v2 -6*v3 -16 < 0; value: -34 0: 1 4 5 1: 3 2: 3 4 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 -2*v3 -3 <= 0; value: -7 + v3 -2 <= 0; value: -1 + v1 + 5*v2 -22 < 0; value: -11 + -5*v0 + v2 + 7 <= 0; value: -1 + -5*v0 -1*v2 -6*v3 -16 < 0; value: -34 0: 1 4 5 1: 3 2: 3 4 5 3: 1 2 5 0: 2 -> 2 1: 1 -> 1 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 2*v0 -1*v1 -4*v3 -4 <= 0; value: -23 + -6*v0 -1*v1 + 3 = 0; value: 0 + -2*v1 -6*v2 -5*v3 + 7 <= 0; value: -19 + -1*v0 + 3*v3 -33 <= 0; value: -21 + -2*v0 + 6*v1 -33 < 0; value: -15 0: 1 2 4 5 1: 1 2 3 5 2: 3 3: 1 3 4 optimal: 1011/10 + + 1011/10 <= 0; value: 1011/10 - 120/31*v2 -501/31 <= 0; value: 0 - -6*v0 -1*v1 + 3 = 0; value: 0 - 12*v0 -6*v2 -5*v3 + 1 <= 0; value: 0 - -1/2*v2 + 31/12*v3 -395/12 <= 0; value: 0 + -3057/10 < 0; value: -3057/10 0: 1 2 4 5 3 1: 1 2 3 5 2: 3 1 4 5 3: 1 3 4 5 0: 0 -> 153/20 1: 3 -> -429/10 2: 0 -> 167/40 3: 4 -> 271/20 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 -3*v2 + 30 = 0; value: 0 + v0 -5*v2 + 2*v3 -7 < 0; value: -15 + 5*v0 -1*v2 -16 <= 0; value: 0 + 4*v1 -34 <= 0; value: -22 + 3*v3 -21 < 0; value: -9 0: 2 3 1: 1 4 2: 1 2 3 3: 2 5 optimal: oo + 2*v0 + v2 -10 <= 0; value: 2 - -6*v1 -3*v2 + 30 = 0; value: 0 + v0 -5*v2 + 2*v3 -7 < 0; value: -15 + 5*v0 -1*v2 -16 <= 0; value: 0 + -2*v2 -14 <= 0; value: -22 + 3*v3 -21 < 0; value: -9 0: 2 3 1: 1 4 2: 1 2 3 4 3: 2 5 0: 4 -> 4 1: 3 -> 3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + -3*v0 -4*v2 + 31 = 0; value: 0 + -6*v0 + 5*v1 -5*v2 -5 <= 0; value: -40 + 4*v0 + v2 + 4*v3 -24 = 0; value: 0 + 6*v0 + v2 -5*v3 -34 = 0; value: 0 + -3*v1 + 5*v2 -11 = 0; value: 0 0: 1 2 3 4 1: 2 5 2: 1 2 3 4 5 3: 3 4 optimal: 4 + + 4 <= 0; value: 4 - -3*v0 -4*v2 + 31 = 0; value: 0 + -40 <= 0; value: -40 - 13/4*v0 + 4*v3 -65/4 = 0; value: 0 - -149/13*v3 = 0; value: 0 - -3*v1 + 5*v2 -11 = 0; value: 0 0: 1 2 3 4 1: 2 5 2: 1 2 3 4 5 3: 3 4 2 0: 5 -> 5 1: 3 -> 3 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -2*v0 -6*v1 + 2*v3 + 16 < 0; value: -4 + 2*v0 + 2*v1 -22 <= 0; value: -12 + -3*v0 + 5*v1 -5*v3 -5 < 0; value: -3 + 6*v1 + 5*v2 -80 <= 0; value: -41 + -1*v3 + 3 = 0; value: 0 0: 1 2 3 1: 1 2 3 4 2: 4 3: 1 3 5 optimal: (22 -e*1) + + 22 < 0; value: 22 - -2*v0 -6*v1 + 2*v3 + 16 < 0; value: -6 - 4/3*v0 -44/3 < 0; value: -4/3 + -53 < 0; value: -53 + 5*v2 -80 < 0; value: -65 - -1*v3 + 3 = 0; value: 0 0: 1 2 3 4 1: 1 2 3 4 2: 4 3: 1 3 5 2 4 0: 1 -> 10 1: 4 -> 4/3 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 4*v1 + 3*v3 -67 < 0; value: -40 + -5*v2 -5*v3 -26 <= 0; value: -76 + 5*v3 -56 <= 0; value: -31 + 4*v1 + 3*v3 -27 = 0; value: 0 + -3*v3 -13 < 0; value: -28 0: 1: 1 4 2: 2 3: 1 2 3 4 5 optimal: oo + 2*v0 + 33/10 <= 0; value: 33/10 + -40 < 0; value: -40 + -5*v2 -82 <= 0; value: -107 - 5*v3 -56 <= 0; value: 0 - 4*v1 + 3*v3 -27 = 0; value: 0 + -233/5 < 0; value: -233/5 0: 1: 1 4 2: 2 3: 1 2 3 4 5 0: 0 -> 0 1: 3 -> -33/20 2: 5 -> 5 3: 5 -> 56/5 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 -1*v1 + 6*v3 -90 < 0; value: -52 + 5*v0 + 2*v1 + 5*v3 -55 < 0; value: -20 + -6*v0 + 2*v1 + 5*v2 + 9 = 0; value: 0 + 3*v0 + 2*v2 + 6*v3 -49 < 0; value: -13 + 4*v0 + 5*v3 -31 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 2: 3 4 3: 1 2 4 5 optimal: (51 -e*1) + + 51 < 0; value: 51 + -473/10 < 0; value: -473/10 - 5/2*v0 -125/2 < 0; value: -5/2 - -6*v0 + 2*v1 + 5*v2 + 9 = 0; value: 0 - 3*v0 + 2*v2 + 6*v3 -49 < 0; value: -2 - 4*v0 + 5*v3 -31 = 0; value: 0 0: 1 2 3 4 5 1: 1 2 3 2: 3 4 1 2 3: 1 2 4 5 0: 4 -> 24 1: 0 -> 5/4 2: 3 -> 53/2 3: 3 -> -13 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 -4*v1 -5*v3 + 6 = 0; value: 0 + -4*v1 -5*v3 + 2 <= 0; value: -6 + -2*v3 <= 0; value: 0 + 4*v1 + 2*v2 + 2*v3 -38 <= 0; value: -24 + -5*v0 -6*v3 + 5 = 0; value: 0 0: 1 5 1: 1 2 4 2: 4 3: 1 2 3 4 5 optimal: 5/4 + + 5/4 <= 0; value: 5/4 - 2*v0 -4*v1 -5*v3 + 6 = 0; value: 0 - -2*v0 -4 <= 0; value: 0 + -5 <= 0; value: -5 + 2*v2 -87/2 <= 0; value: -75/2 - -5*v0 -6*v3 + 5 = 0; value: 0 0: 1 5 2 4 3 1: 1 2 4 2: 4 3: 1 2 3 4 5 0: 1 -> -2 1: 2 -> -21/8 2: 3 -> 3 3: 0 -> 5/2 + 2*v0 -2*v1 <= 0; value: -4 + -1*v2 + 6*v3 -25 = 0; value: 0 + 5*v1 -6*v3 + 20 = 0; value: 0 + v0 -3*v3 + 15 = 0; value: 0 + -2*v0 -4*v1 + v3 + 3 = 0; value: 0 + v2 + 3*v3 -20 = 0; value: 0 0: 3 4 1: 2 4 2: 1 5 3: 1 2 3 4 5 optimal: -4 + -4 <= 0; value: -4 - -1*v2 + 6*v3 -25 = 0; value: 0 - 5*v1 -6*v3 + 20 = 0; value: 0 - v0 = 0; value: 0 + = 0; value: 0 - 3/2*v2 -15/2 = 0; value: 0 0: 3 4 1: 2 4 2: 1 5 3 4 3: 1 2 3 4 5 0: 0 -> 0 1: 2 -> 2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 6 + -3*v0 + 3*v1 -5*v3 + 9 = 0; value: 0 + -3*v3 <= 0; value: 0 + v0 -7 <= 0; value: -3 + -2*v0 + 6 <= 0; value: -2 + v0 + 6*v2 + 6*v3 -41 <= 0; value: -7 0: 1 3 4 5 1: 1 2: 5 3: 1 2 5 optimal: 6 + + 6 <= 0; value: 6 - -3*v0 + 3*v1 -5*v3 + 9 = 0; value: 0 - -3*v3 <= 0; value: 0 + v0 -7 <= 0; value: -3 + -2*v0 + 6 <= 0; value: -2 + v0 + 6*v2 -41 <= 0; value: -7 0: 1 3 4 5 1: 1 2: 5 3: 1 2 5 0: 4 -> 4 1: 1 -> 1 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 = 0; value: 0 + <= 0; value: 0 + -3*v0 + 2*v3 -5 < 0; value: -3 + -2*v2 -1 < 0; value: -3 + -4*v0 -2*v1 -2*v2 + 3 < 0; value: -7 0: 1 3 5 1: 5 2: 4 5 3: 3 optimal: oo + 6*v0 + 2*v2 -3 < 0; value: -1 + -1*v0 = 0; value: 0 + <= 0; value: 0 + -3*v0 + 2*v3 -5 < 0; value: -3 + -2*v2 -1 < 0; value: -3 - -4*v0 -2*v1 -2*v2 + 3 < 0; value: -2 0: 1 3 5 1: 5 2: 4 5 3: 3 0: 0 -> 0 1: 4 -> 3/2 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -5*v3 -23 <= 0; value: -63 + 2*v1 + 4*v3 -38 <= 0; value: -20 + -5*v2 -2 <= 0; value: -17 + 3*v0 + 4*v1 -28 < 0; value: -9 + -5*v0 -3*v2 -5*v3 + 3 <= 0; value: -51 0: 1 4 5 1: 2 4 2: 3 5 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + -4*v0 -5*v3 -23 <= 0; value: -63 + 2*v1 + 4*v3 -38 <= 0; value: -20 + -5*v2 -2 <= 0; value: -17 + 3*v0 + 4*v1 -28 < 0; value: -9 + -5*v0 -3*v2 -5*v3 + 3 <= 0; value: -51 0: 1 4 5 1: 2 4 2: 3 5 3: 1 2 5 0: 5 -> 5 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 2*v0 + 2*v2 + 6*v3 -105 <= 0; value: -65 + 2*v0 -4*v1 + 2*v3 -6 = 0; value: 0 + -2*v0 -2*v1 + 3*v2 -13 = 0; value: 0 + -2*v1 -3*v2 -6*v3 + 47 = 0; value: 0 + -4*v1 + v2 -1 <= 0; value: 0 0: 1 2 3 1: 2 3 4 5 2: 1 3 4 5 3: 1 2 4 optimal: 577/4 + + 577/4 <= 0; value: 577/4 - 2/3*v0 -65 <= 0; value: 0 - 2*v0 -4*v1 + 2*v3 -6 = 0; value: 0 - -20/7*v0 + 24/7*v2 -120/7 = 0; value: 0 - -1*v0 -3*v2 -7*v3 + 50 = 0; value: 0 + -65/4 <= 0; value: -65/4 0: 1 2 3 4 5 1: 2 3 4 5 2: 1 3 4 5 3: 1 2 4 3 5 0: 0 -> 195/2 1: 1 -> 203/8 2: 5 -> 345/4 3: 5 -> -175/4 + 2*v0 -2*v1 <= 0; value: -4 + -2*v0 -2*v2 + 2 < 0; value: -6 + -6*v1 + 5*v2 -16 < 0; value: -8 + 3*v1 + 2*v2 -23 < 0; value: -9 + -1*v1 + 4*v2 -31 < 0; value: -17 + -5*v0 + 3*v1 -11 < 0; value: -5 0: 1 5 1: 2 3 4 5 2: 1 2 3 4 3: optimal: oo + 11/3*v0 + 11/3 < 0; value: 11/3 - -2*v0 -2*v2 + 2 < 0; value: -2 - -6*v1 + 5*v2 -16 < 0; value: -6 + -9/2*v0 -53/2 < 0; value: -53/2 + -19/6*v0 -151/6 < 0; value: -151/6 + -15/2*v0 -33/2 < 0; value: -33/2 0: 1 5 3 4 1: 2 3 4 5 2: 1 2 3 4 5 3: 0: 0 -> 0 1: 2 -> 0 2: 4 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 -2*v2 -6*v3 + 22 <= 0; value: -14 + v1 -4*v2 -6*v3 + 5 <= 0; value: -11 + -5*v3 + 10 <= 0; value: 0 + 6*v0 -5*v2 -39 < 0; value: -25 + 5*v0 + 2*v1 + v3 -72 <= 0; value: -42 0: 4 5 1: 1 2 5 2: 1 2 4 3: 1 2 3 5 optimal: oo + 2*v0 + 4/5*v2 + 12/5*v3 -44/5 <= 0; value: 28/5 - -5*v1 -2*v2 -6*v3 + 22 <= 0; value: 0 + -22/5*v2 -36/5*v3 + 47/5 <= 0; value: -69/5 + -5*v3 + 10 <= 0; value: 0 + 6*v0 -5*v2 -39 < 0; value: -25 + 5*v0 -4/5*v2 -7/5*v3 -316/5 <= 0; value: -238/5 0: 4 5 1: 1 2 5 2: 1 2 4 5 3: 1 2 3 5 0: 4 -> 4 1: 4 -> 6/5 2: 2 -> 2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 -1*v2 + 18 = 0; value: 0 + -6*v0 -6*v1 + 4*v2 + 23 <= 0; value: -25 + 3*v0 -5*v1 + 6*v2 = 0; value: 0 + 6*v0 -38 < 0; value: -8 + -5*v2 + 3*v3 -18 <= 0; value: -6 0: 2 3 4 1: 1 2 3 2: 1 2 3 5 3: 5 optimal: (796/123 -e*1) + + 796/123 < 0; value: 796/123 - -6*v1 -1*v2 + 18 = 0; value: 0 + -1473/41 < 0; value: -1473/41 - 3*v0 + 41/6*v2 -15 = 0; value: 0 - 6*v0 -38 < 0; value: -4 + 3*v3 -618/41 <= 0; value: -126/41 0: 2 3 4 5 1: 1 2 3 2: 1 2 3 5 3: 5 0: 5 -> 17/3 1: 3 -> 125/41 2: 0 -> -12/41 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + -3*v2 -6*v3 -4 <= 0; value: -16 + 4*v0 + 5*v1 -59 <= 0; value: -22 + -4*v3 <= 0; value: 0 + 3*v1 -2*v2 -15 < 0; value: -8 + 6*v0 -2*v1 -11 <= 0; value: -3 0: 2 5 1: 2 4 5 2: 1 4 3: 1 3 optimal: oo + -4*v0 + 11 <= 0; value: -1 + -3*v2 -6*v3 -4 <= 0; value: -16 + 19*v0 -173/2 <= 0; value: -59/2 + -4*v3 <= 0; value: 0 + 9*v0 -2*v2 -63/2 < 0; value: -25/2 - 6*v0 -2*v1 -11 <= 0; value: 0 0: 2 5 4 1: 2 4 5 2: 1 4 3: 1 3 0: 3 -> 3 1: 5 -> 7/2 2: 4 -> 4 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + -6*v1 + 2*v2 + 10 <= 0; value: -4 + v0 + 2*v1 -16 <= 0; value: -8 + -4*v0 -6*v3 + 18 < 0; value: -6 + 3*v2 + 6*v3 -62 < 0; value: -23 + -1*v0 -2*v1 + 4*v3 -8 <= 0; value: 0 0: 2 3 5 1: 1 2 5 2: 1 4 3: 3 4 5 optimal: oo + 17/3*v0 -4 < 0; value: -4 - 3*v0 + 2*v2 -12*v3 + 34 <= 0; value: 0 + -8/3*v0 -12 < 0; value: -12 - -11/2*v0 -1*v2 + 1 < 0; value: -1 + -41/2*v0 -41 < 0; value: -41 - -1*v0 -2*v1 + 4*v3 -8 <= 0; value: 0 0: 2 3 5 1 4 2 1: 1 2 5 2: 1 4 3 2 3: 3 4 5 1 2 0: 0 -> 0 1: 4 -> 7/3 2: 5 -> 2 3: 4 -> 19/6 + 2*v0 -2*v1 <= 0; value: 8 + -3*v0 + 3*v2 + 2*v3 = 0; value: 0 + v3 = 0; value: 0 + 6*v2 -57 <= 0; value: -33 + -6*v1 -5*v2 -18 < 0; value: -38 + 5*v1 -3*v2 + 9 < 0; value: -3 0: 1 1: 4 5 2: 1 3 4 5 3: 1 2 optimal: (245/6 -e*1) + + 245/6 < 0; value: 245/6 - -3*v0 + 3*v2 + 2*v3 = 0; value: 0 - v3 = 0; value: 0 - 6*v0 -57 <= 0; value: 0 - -6*v1 -5*v2 -18 < 0; value: -6 + -889/12 < 0; value: -889/12 0: 1 3 5 1: 4 5 2: 1 3 4 5 3: 1 2 3 5 0: 4 -> 19/2 1: 0 -> -119/12 2: 4 -> 19/2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -8 + 2*v0 -3*v3 + 13 = 0; value: 0 + -4*v1 + 5*v3 -8 < 0; value: -3 + 3*v1 + 3*v2 + 3*v3 -59 < 0; value: -29 + 4*v1 + 2*v3 -63 <= 0; value: -33 + -3*v0 + 3*v3 -17 <= 0; value: -5 0: 1 5 1: 2 3 4 2: 3 3: 1 2 3 4 5 optimal: (-55/14 -e*1) + -55/14 < 0; value: -55/14 - 2*v0 -3*v3 + 13 = 0; value: 0 - -4*v1 + 5*v3 -8 < 0; value: -4 - 9/2*v0 + 3*v2 -143/4 < 0; value: -9/2 - -28/9*v2 -97/27 <= 0; value: 0 + -89/7 < 0; value: -89/7 0: 1 5 3 4 1: 2 3 4 2: 3 4 5 3: 1 2 3 4 5 0: 1 -> 54/7 1: 5 -> 911/84 2: 0 -> -97/84 3: 5 -> 199/21 + 2*v0 -2*v1 <= 0; value: 4 + 5*v3 -15 = 0; value: 0 + 5*v0 + 2*v1 -36 <= 0; value: -19 + -4*v0 + 2*v1 + 8 <= 0; value: -2 + -3*v1 -1*v2 + 2*v3 <= 0; value: -2 + v0 -2*v1 -6*v3 + 17 = 0; value: 0 0: 2 3 5 1: 2 3 4 5 2: 4 3: 1 4 5 optimal: 43/6 + + 43/6 <= 0; value: 43/6 - 5*v3 -15 = 0; value: 0 - 6*v0 -37 <= 0; value: 0 + -23/2 <= 0; value: -23/2 + -1*v2 -7/4 <= 0; value: -27/4 - v0 -2*v1 -6*v3 + 17 = 0; value: 0 0: 2 3 5 4 1: 2 3 4 5 2: 4 3: 1 4 5 2 3 0: 3 -> 37/6 1: 1 -> 31/12 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6*v3 -10 = 0; value: 0 + 6*v0 -1*v2 -1*v3 -4 <= 0; value: 0 + -2*v3 + 4 = 0; value: 0 + 5*v1 + v2 -27 <= 0; value: -17 + -3*v0 + 4*v1 -5 = 0; value: 0 0: 1 2 5 1: 4 5 2: 2 4 3: 1 2 3 optimal: -2 + -2 <= 0; value: -2 - -2*v0 + 6*v3 -10 = 0; value: 0 - -1*v2 + 17*v3 -34 <= 0; value: 0 - -2/17*v2 = 0; value: 0 + -17 <= 0; value: -17 - -3*v0 + 4*v1 -5 = 0; value: 0 0: 1 2 5 4 1: 4 5 2: 2 4 3 3: 1 2 3 4 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 2 + v1 + 2*v3 -9 = 0; value: 0 + 6*v2 -50 < 0; value: -26 + 4*v0 + 3*v1 -25 = 0; value: 0 + 2*v0 -5*v2 -11 <= 0; value: -23 + 5*v1 -2*v3 -10 <= 0; value: -1 0: 3 4 1: 1 3 5 2: 2 4 3: 1 5 optimal: (956/9 -e*1) + + 956/9 < 0; value: 956/9 - v1 + 2*v3 -9 = 0; value: 0 - 6*v2 -50 < 0; value: -6 - 4*v0 -6*v3 + 2 = 0; value: 0 - 2*v0 -5*v2 -11 <= 0; value: 0 + -539/3 < 0; value: -539/3 0: 3 4 5 1: 1 3 5 2: 2 4 5 3: 1 5 3 0: 4 -> 143/6 1: 3 -> -211/9 2: 4 -> 22/3 3: 3 -> 146/9 + 2*v0 -2*v1 <= 0; value: 2 + -6*v3 -14 <= 0; value: -44 + 3*v2 + 3*v3 -37 <= 0; value: -7 + 6*v2 + v3 -35 = 0; value: 0 + -6*v0 -1*v1 -1*v2 -7 <= 0; value: -25 + -3*v1 + 3*v2 -12 <= 0; value: 0 0: 4 1: 4 5 2: 2 3 4 5 3: 1 2 3 optimal: oo + 2*v0 -16/15 <= 0; value: 44/15 + -304/5 <= 0; value: -304/5 - 5/2*v3 -39/2 <= 0; value: 0 - 6*v2 + v3 -35 = 0; value: 0 + -6*v0 -181/15 <= 0; value: -361/15 - -3*v1 + 3*v2 -12 <= 0; value: 0 0: 4 1: 4 5 2: 2 3 4 5 3: 1 2 3 4 0: 2 -> 2 1: 1 -> 8/15 2: 5 -> 68/15 3: 5 -> 39/5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -6*v3 <= 0; value: 0 + 5*v1 -2*v2 + v3 + 6 = 0; value: 0 + -1*v3 <= 0; value: 0 + 3*v1 -3*v2 + 6*v3 + 8 < 0; value: -1 + = 0; value: 0 0: 1: 1 2 4 2: 2 4 3: 1 2 3 4 optimal: oo + 2*v0 + 4/9 < 0; value: 4/9 + -8/9 <= 0; value: -8/9 - 5*v1 -2*v2 + v3 + 6 = 0; value: 0 - -1/3*v2 + 22/27 < 0; value: -5/54 - -9/5*v2 + 27/5*v3 + 22/5 < 0; value: -1/4 + = 0; value: 0 0: 1: 1 2 4 2: 2 4 1 3 3: 1 2 3 4 0: 0 -> 0 1: 0 -> -13/108 2: 3 -> 49/18 3: 0 -> 5/108 + 2*v0 -2*v1 <= 0; value: 2 + -6*v1 -3*v3 + 27 = 0; value: 0 + -2*v0 -4*v1 -6*v2 -9 <= 0; value: -41 + 5*v0 + v3 -23 = 0; value: 0 + v0 -3*v2 -1 <= 0; value: -3 + -2*v2 + 5*v3 -11 = 0; value: 0 0: 2 3 4 1: 1 2 2: 2 4 5 3: 1 3 5 optimal: oo + 6/25*v2 + 38/25 <= 0; value: 2 - -6*v1 -3*v3 + 27 = 0; value: 0 + -126/25*v2 -773/25 <= 0; value: -41 - 5*v0 + v3 -23 = 0; value: 0 + -77/25*v2 + 79/25 <= 0; value: -3 - -25*v0 -2*v2 + 104 = 0; value: 0 0: 2 3 4 5 1: 1 2 2: 2 4 5 3: 1 3 5 2 0: 4 -> 4 1: 3 -> 3 2: 2 -> 2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + 5*v0 -20 = 0; value: 0 + 5*v0 + 5*v1 -2*v3 -67 <= 0; value: -37 + v1 + 2*v2 + 2*v3 -8 <= 0; value: -2 + -6*v0 -5*v1 + 4*v3 -21 <= 0; value: -55 + 5*v0 -52 < 0; value: -32 0: 1 2 4 5 1: 2 3 4 2: 3 3: 2 3 4 optimal: oo + 22/5*v0 -8/5*v3 + 42/5 <= 0; value: 26 + 5*v0 -20 = 0; value: 0 + -1*v0 + 2*v3 -88 <= 0; value: -92 + -6/5*v0 + 2*v2 + 14/5*v3 -61/5 <= 0; value: -13 - -6*v0 -5*v1 + 4*v3 -21 <= 0; value: 0 + 5*v0 -52 < 0; value: -32 0: 1 2 4 5 3 1: 2 3 4 2: 3 3: 2 3 4 0: 4 -> 4 1: 2 -> -9 2: 2 -> 2 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 8 = 0; value: 0 + 6*v0 -6*v3 + 12 = 0; value: 0 + -5*v1 + v3 -11 <= 0; value: -7 + -1*v3 + 4 = 0; value: 0 + 5*v2 -11 < 0; value: -6 0: 1 2 1: 3 2: 5 3: 2 3 4 optimal: 34/5 + + 34/5 <= 0; value: 34/5 - -4*v0 + 8 = 0; value: 0 - 6*v0 -6*v3 + 12 = 0; value: 0 - -5*v1 + v3 -11 <= 0; value: 0 + = 0; value: 0 + 5*v2 -11 < 0; value: -6 0: 1 2 4 1: 3 2: 5 3: 2 3 4 0: 2 -> 2 1: 0 -> -7/5 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 11 <= 0; value: -7 + -5*v1 -6*v2 + 33 = 0; value: 0 + 6*v1 -6*v2 -2*v3 -1 <= 0; value: -11 + -3*v1 -4*v2 + 17 < 0; value: -4 + 4*v2 -2*v3 -2 = 0; value: 0 0: 1: 1 2 3 4 2: 2 3 4 5 3: 3 5 optimal: oo + 2*v0 -11/3 <= 0; value: 7/3 - 18/5*v3 -25 <= 0; value: 0 - -5*v1 -6*v2 + 33 = 0; value: 0 + -499/18 <= 0; value: -499/18 + -79/18 < 0; value: -79/18 - 4*v2 -2*v3 -2 = 0; value: 0 0: 1: 1 2 3 4 2: 2 3 4 5 1 3: 3 5 1 4 0: 3 -> 3 1: 3 -> 11/6 2: 3 -> 143/36 3: 5 -> 125/18 + 2*v0 -2*v1 <= 0; value: -6 + 6*v1 -3*v3 -49 <= 0; value: -28 + v2 -5*v3 <= 0; value: -1 + 5*v1 -43 < 0; value: -23 + -1*v1 + v2 -1*v3 <= 0; value: -1 + 2*v1 -2*v2 -4*v3 + 1 <= 0; value: -3 0: 1: 1 3 4 5 2: 2 4 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v2 + 2*v3 <= 0; value: -4 + 6*v2 -9*v3 -49 <= 0; value: -34 + v2 -5*v3 <= 0; value: -1 + 5*v2 -5*v3 -43 < 0; value: -28 - -1*v1 + v2 -1*v3 <= 0; value: 0 + -6*v3 + 1 <= 0; value: -5 0: 1: 1 3 4 5 2: 2 4 5 1 3 3: 1 2 4 5 3 0: 1 -> 1 1: 4 -> 3 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v1 -5 <= 0; value: -17 + 2*v0 + 2*v2 -15 <= 0; value: -3 + -1*v0 -5*v1 -4*v2 + 22 = 0; value: 0 + 6*v1 + 4*v2 -1*v3 -19 = 0; value: 0 + 3*v0 + 5*v1 + 4*v3 -30 < 0; value: -4 0: 2 3 5 1: 1 3 4 5 2: 2 3 4 3: 4 5 optimal: (100/11 -e*1) + + 100/11 < 0; value: 100/11 + -241/11 < 0; value: -241/11 - -1*v0 -5/2*v3 + 7/2 <= 0; value: 0 - -1*v0 -5*v1 -4*v2 + 22 = 0; value: 0 - -6/5*v0 -4/5*v2 -1*v3 + 37/5 = 0; value: 0 - 22/5*v0 -162/5 < 0; value: -22/5 0: 2 3 5 1 4 1: 1 3 4 5 2: 2 3 4 1 5 3: 4 5 2 1 0: 4 -> 70/11 1: 2 -> 122/55 2: 2 -> 25/22 3: 1 -> -63/55 + 2*v0 -2*v1 <= 0; value: -10 + 6*v0 -4*v1 -6*v3 + 50 = 0; value: 0 + 6*v2 + 4*v3 -107 < 0; value: -57 + -5*v0 -4*v1 + 3*v2 + 5 = 0; value: 0 + v1 + 2*v3 -41 < 0; value: -26 + -5*v2 -5*v3 + 50 = 0; value: 0 0: 1 3 1: 1 3 4 2: 2 3 5 3: 1 2 4 5 optimal: (68 -e*1) + + 68 < 0; value: 68 - 6*v0 -4*v1 -6*v3 + 50 = 0; value: 0 + -571/5 < 0; value: -571/5 - -11*v0 -3*v2 + 15 = 0; value: 0 - 10/3*v0 -26 < 0; value: -10/3 - -5*v2 -5*v3 + 50 = 0; value: 0 0: 1 3 4 2 1: 1 3 4 2: 2 3 5 4 3: 1 2 4 5 3 0: 0 -> 34/5 1: 5 -> -111/5 2: 5 -> -299/15 3: 5 -> 449/15 + 2*v0 -2*v1 <= 0; value: -8 + -4*v0 + 5*v2 -1*v3 -22 = 0; value: 0 + -1*v0 <= 0; value: 0 + -1*v2 + 5 = 0; value: 0 + 6*v0 -6*v1 -4*v2 + 44 = 0; value: 0 + -6*v1 + 5*v2 -1 <= 0; value: 0 0: 1 2 4 1: 4 5 2: 1 3 4 5 3: 1 optimal: -8 + -8 <= 0; value: -8 - -4*v0 + 5*v2 -1*v3 -22 = 0; value: 0 + -1*v0 <= 0; value: 0 - -4/5*v0 -1/5*v3 + 3/5 = 0; value: 0 - 6*v0 -6*v1 -4*v2 + 44 = 0; value: 0 + -6*v0 <= 0; value: 0 0: 1 2 4 5 3 1: 4 5 2: 1 3 4 5 3: 1 3 5 0: 0 -> 0 1: 4 -> 4 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -10 + 6*v0 -2*v1 -5*v3 -5 <= 0; value: -20 + = 0; value: 0 + -6*v3 -1 < 0; value: -7 + -2*v0 -6*v3 -2 <= 0; value: -8 + -1*v1 -6*v2 + 24 <= 0; value: -5 0: 1 4 1: 1 5 2: 5 3: 1 3 4 optimal: oo + -4*v0 + 5*v3 + 5 <= 0; value: 10 - 6*v0 + 12*v2 -5*v3 -53 <= 0; value: 0 + = 0; value: 0 + -6*v3 -1 < 0; value: -7 + -2*v0 -6*v3 -2 <= 0; value: -8 - -1*v1 -6*v2 + 24 <= 0; value: 0 0: 1 4 1: 1 5 2: 5 1 3: 1 3 4 0: 0 -> 0 1: 5 -> -5 2: 4 -> 29/6 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 + 4*v2 -58 <= 0; value: -22 + 5*v0 + v2 -24 = 0; value: 0 + -3*v1 + 5*v2 + 6*v3 -49 <= 0; value: -26 + 5*v1 + 4*v2 -41 = 0; value: 0 + -1*v1 + 5*v3 -27 <= 0; value: -17 0: 1 2 1: 3 4 5 2: 1 2 3 4 3: 3 5 optimal: 34/5 + + 34/5 <= 0; value: 34/5 - -90/37*v3 -154/37 <= 0; value: 0 - 5*v0 + v2 -24 = 0; value: 0 - -37*v0 + 6*v3 + 104 <= 0; value: 0 - 5*v1 + 4*v2 -41 = 0; value: 0 + -1561/45 <= 0; value: -1561/45 0: 1 2 3 5 1: 3 4 5 2: 1 2 3 4 5 3: 3 5 1 0: 4 -> 38/15 1: 5 -> -13/15 2: 4 -> 34/3 3: 3 -> -77/45 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -6*v2 <= 0; value: 0 + 5*v0 -3*v2 -12 <= 0; value: -2 + -5*v0 + 3*v1 + 5*v3 + 3 < 0; value: -7 + -2*v1 <= 0; value: 0 + 3*v1 + 5*v2 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 2 5 3: 3 optimal: 24/5 + + 24/5 <= 0; value: 24/5 + <= 0; value: 0 - 5*v0 -3*v2 -12 <= 0; value: 0 + 5*v3 -9 < 0; value: -9 - -2*v1 <= 0; value: 0 - 5*v2 = 0; value: 0 0: 2 3 1: 1 3 4 5 2: 1 2 5 3 3: 3 0: 2 -> 12/5 1: 0 -> 0 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 -6*v2 -8 = 0; value: 0 + -2*v0 -2*v3 + 14 = 0; value: 0 + -3*v1 -6*v2 + 2*v3 -18 < 0; value: -38 + 3*v0 -17 <= 0; value: -2 + -2*v0 -1*v1 -6 <= 0; value: -20 0: 1 2 4 5 1: 3 5 2: 1 3 3: 2 3 optimal: (94/3 -e*1) + + 94/3 < 0; value: 94/3 - 4*v0 -6*v2 -8 = 0; value: 0 - -2*v0 -2*v3 + 14 = 0; value: 0 - -3*v1 -6*v2 + 2*v3 -18 < 0; value: -3 - 3*v0 -17 <= 0; value: 0 + -22/3 <= 0; value: -22/3 0: 1 2 4 5 1: 3 5 2: 1 3 5 3: 2 3 5 0: 5 -> 17/3 1: 4 -> -9 2: 2 -> 22/9 3: 2 -> 4/3 + 2*v0 -2*v1 <= 0; value: 2 + 4*v3 -6 < 0; value: -2 + -3*v0 -4*v1 -1*v3 -7 <= 0; value: -32 + -2*v0 -4 < 0; value: -12 + v0 + 2*v2 -8 <= 0; value: 0 + 2*v0 -6*v1 -5*v2 -14 <= 0; value: -34 0: 2 3 4 5 1: 2 5 2: 4 5 3: 1 2 optimal: oo + 1/2*v0 + 34/3 <= 0; value: 40/3 + 4*v3 -6 < 0; value: -2 + -6*v0 -1*v3 + 47/3 <= 0; value: -28/3 + -2*v0 -4 < 0; value: -12 - v0 + 2*v2 -8 <= 0; value: 0 - 2*v0 -6*v1 -5*v2 -14 <= 0; value: 0 0: 2 3 4 5 1: 2 5 2: 4 5 2 3: 1 2 0: 4 -> 4 1: 3 -> -8/3 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -5*v1 -3*v3 + 7 <= 0; value: -14 + -4*v3 + 8 = 0; value: 0 + 3*v0 -4*v3 -16 <= 0; value: -9 + -3*v0 -6*v2 + 21 = 0; value: 0 + 6*v0 -50 < 0; value: -20 0: 3 4 5 1: 1 2: 4 3: 1 2 3 optimal: 78/5 + + 78/5 <= 0; value: 78/5 - -5*v1 -3*v3 + 7 <= 0; value: 0 - -4*v3 + 8 = 0; value: 0 - -6*v2 -3 <= 0; value: 0 - -3*v0 -6*v2 + 21 = 0; value: 0 + -2 < 0; value: -2 0: 3 4 5 1: 1 2: 4 3 5 3: 1 2 3 0: 5 -> 8 1: 3 -> 1/5 2: 1 -> -1/2 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + 2*v2 -2 = 0; value: 0 + -3*v1 + v2 -4*v3 + 2 <= 0; value: -5 + 6*v1 -4*v2 + 3 <= 0; value: -1 + 5*v1 + 4*v3 -17 <= 0; value: -9 + -3*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3 3: 2 4 5 optimal: oo + 2*v0 -2/3*v2 + 8/3*v3 -4/3 <= 0; value: 34/3 + 2*v2 -2 = 0; value: 0 - -3*v1 + v2 -4*v3 + 2 <= 0; value: 0 + -2*v2 -8*v3 + 7 <= 0; value: -11 + 5/3*v2 -8/3*v3 -41/3 <= 0; value: -52/3 + -3*v3 -3 <= 0; value: -9 0: 1: 2 3 4 2: 1 2 3 4 3: 2 4 5 3 0: 4 -> 4 1: 0 -> -5/3 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + v2 -3*v3 + 10 = 0; value: 0 + -6*v1 -4*v3 -3 <= 0; value: -53 + 3*v0 + 3*v1 -2*v2 -50 <= 0; value: -33 + -5*v0 + 5*v1 -9 < 0; value: -4 + 3*v0 -4*v1 <= 0; value: -8 0: 3 4 5 1: 2 3 4 5 2: 1 3 3: 1 2 optimal: oo + 4/7*v3 + 20/7 <= 0; value: 40/7 - v2 -3*v3 + 10 = 0; value: 0 + -64/7*v3 -201/7 <= 0; value: -521/7 - 21/4*v0 -2*v2 -50 <= 0; value: 0 + -10/7*v3 -113/7 < 0; value: -163/7 - 3*v0 -4*v1 <= 0; value: 0 0: 3 4 5 2 1: 2 3 4 5 2: 1 3 4 2 3: 1 2 4 0: 4 -> 80/7 1: 5 -> 60/7 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -4*v0 -1*v2 + 6*v3 -31 < 0; value: -19 + -6*v1 + 3*v2 <= 0; value: 0 + -5*v0 -5*v3 -26 < 0; value: -56 + -4*v0 + v1 < 0; value: -6 + 4*v2 + 6*v3 -104 <= 0; value: -64 0: 1 3 4 1: 2 4 2: 1 2 5 3: 1 3 5 optimal: oo + 12*v0 + 311/5 < 0; value: 431/5 - -4*v0 -1*v2 + 6*v3 -31 < 0; value: -1 - -6*v1 + 3*v2 <= 0; value: 0 - -5*v0 -5*v3 -26 < 0; value: -5 + -9*v0 -311/10 < 0; value: -491/10 + -46*v0 -384 < 0; value: -476 0: 1 3 4 5 1: 2 4 2: 1 2 5 4 3: 1 3 5 4 0: 2 -> 2 1: 2 -> -188/5 2: 4 -> -376/5 3: 4 -> -31/5 + 2*v0 -2*v1 <= 0; value: -4 + 5*v0 + 2*v1 -6 <= 0; value: -2 + 6*v2 -2*v3 + 2 <= 0; value: 0 + <= 0; value: 0 + v2 -5*v3 + 1 < 0; value: -4 + -3*v1 -2*v3 + 8 = 0; value: 0 0: 1 1: 1 5 2: 2 4 3: 2 4 5 optimal: oo + 2*v0 + 4/3*v3 -16/3 <= 0; value: -4 + 5*v0 -4/3*v3 -2/3 <= 0; value: -2 + 6*v2 -2*v3 + 2 <= 0; value: 0 + <= 0; value: 0 + v2 -5*v3 + 1 < 0; value: -4 - -3*v1 -2*v3 + 8 = 0; value: 0 0: 1 1: 1 5 2: 2 4 3: 2 4 5 1 0: 0 -> 0 1: 2 -> 2 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + 3*v0 -3*v1 -5*v3 <= 0; value: 0 + 6*v0 -4*v2 -3*v3 + 1 <= 0; value: -1 + 3*v0 + 2*v1 -4*v2 -3 < 0; value: -8 + -4*v1 + 12 = 0; value: 0 + 4*v1 -2*v3 -29 < 0; value: -17 0: 1 2 3 1: 1 3 4 5 2: 2 3 3: 1 2 5 optimal: oo + 40/21*v2 -190/21 <= 0; value: 10/21 - 3*v0 -3*v1 -5*v3 <= 0; value: 0 - 21/5*v0 -4*v2 + 32/5 <= 0; value: 0 + -8/7*v2 -11/7 < 0; value: -51/7 - -4*v0 + 20/3*v3 + 12 = 0; value: 0 + -8/7*v2 -81/7 < 0; value: -121/7 0: 1 2 3 4 5 1: 1 3 4 5 2: 2 3 5 3: 1 2 5 4 3 0: 3 -> 68/21 1: 3 -> 3 2: 5 -> 5 3: 0 -> 1/7 + 2*v0 -2*v1 <= 0; value: 0 + -5*v1 + 6*v3 + 13 <= 0; value: -7 + -1*v2 + 2 < 0; value: -1 + -3*v0 -2*v1 -12 <= 0; value: -32 + -4*v1 + 6*v2 -2 <= 0; value: 0 + v0 -11 < 0; value: -7 0: 3 5 1: 1 3 4 2: 2 4 3: 1 optimal: (17 -e*1) + + 17 < 0; value: 17 - -15/2*v2 + 6*v3 + 31/2 <= 0; value: 0 - -4/5*v3 -1/15 < 0; value: -1/30 + -50 < 0; value: -50 - -4*v1 + 6*v2 -2 <= 0; value: 0 - v0 -11 < 0; value: -1 0: 3 5 1: 1 3 4 2: 2 4 3 1 3: 1 3 2 0: 4 -> 10 1: 4 -> 51/20 2: 3 -> 61/30 3: 0 -> -1/24 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -1*v1 -6*v3 + 18 = 0; value: 0 + 3*v0 -20 <= 0; value: -11 + -4*v1 + 6*v2 -11 < 0; value: -5 + -3*v1 + 2*v3 -1 <= 0; value: 0 + 6*v0 -6*v2 <= 0; value: 0 0: 1 2 5 1: 1 3 4 2: 3 5 3: 1 4 optimal: (5/4 -e*1) + + 5/4 < 0; value: 5/4 - 5*v0 -1*v1 -6*v3 + 18 = 0; value: 0 + -29/4 <= 0; value: -29/4 - 4*v2 -17 < 0; value: -5/2 - -15*v0 + 20*v3 -55 <= 0; value: 0 - 6*v0 -6*v2 <= 0; value: 0 0: 1 2 5 3 4 1: 1 3 4 2: 3 5 2 3: 1 4 3 0: 3 -> 29/8 1: 3 -> 53/16 2: 3 -> 29/8 3: 5 -> 175/32 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 2*v1 + v2 -12 <= 0; value: -6 + -6*v0 + 4*v2 -34 <= 0; value: -18 + -6*v0 -3*v2 + 12 = 0; value: 0 + -6*v0 -3*v1 + 6*v2 -40 <= 0; value: -19 + 6*v1 -12 < 0; value: -6 0: 1 2 3 4 1: 1 4 5 2: 1 2 3 4 3: optimal: oo + 14*v0 + 32/3 <= 0; value: 32/3 + -16*v0 -56/3 <= 0; value: -56/3 + -14*v0 -18 <= 0; value: -18 - -6*v0 -3*v2 + 12 = 0; value: 0 - -6*v0 -3*v1 + 6*v2 -40 <= 0; value: 0 + -36*v0 -44 < 0; value: -44 0: 1 2 3 4 5 1: 1 4 5 2: 1 2 3 4 5 3: 0: 0 -> 0 1: 1 -> -16/3 2: 4 -> 4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + 4*v0 -6*v1 -1*v3 -1 <= 0; value: -12 + -3*v1 -5*v2 + 5*v3 -17 <= 0; value: -10 + -4*v2 -1 < 0; value: -13 + v1 -1*v2 + 6*v3 -48 <= 0; value: -20 + 6*v0 -5*v2 + 15 = 0; value: 0 0: 1 5 1: 1 2 4 2: 2 3 4 5 3: 1 2 4 optimal: 1579/328 + + 1579/328 <= 0; value: 1579/328 - 4*v0 -6*v1 -1*v3 -1 <= 0; value: 0 - -2*v0 -5*v2 + 11/2*v3 -33/2 <= 0; value: 0 + -1945/82 < 0; value: -1945/82 - 1312/165*v0 -586/33 <= 0; value: 0 - 6*v0 -5*v2 + 15 = 0; value: 0 0: 1 5 2 4 3 1: 1 2 4 2: 2 3 4 5 3: 1 2 4 0: 0 -> 1465/656 1: 1 -> -57/328 2: 3 -> 1863/328 3: 5 -> 368/41 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 -5*v2 + 4*v3 -3 <= 0; value: -9 + -1*v0 + 5*v1 + 6*v3 -8 <= 0; value: -4 + <= 0; value: 0 + -5*v0 + 4*v3 + 1 <= 0; value: -4 + 3*v1 + v2 + 5*v3 -3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 1 5 3: 1 2 4 5 optimal: oo + 181/18*v0 -101/18 <= 0; value: 40/9 - -3*v2 + 14*v3 -9 <= 0; value: 0 + -491/36*v0 + 163/36 <= 0; value: -82/9 + <= 0; value: 0 - -5*v0 + 6/7*v2 + 25/7 <= 0; value: 0 - 3*v1 + v2 + 5*v3 -3 = 0; value: 0 0: 2 4 1: 1 2 5 2: 1 5 2 4 3: 1 2 4 5 0: 1 -> 1 1: 1 -> -11/9 2: 0 -> 5/3 3: 0 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + -3*v3 + 11 < 0; value: -1 + 4*v0 -5*v2 + 2 <= 0; value: -3 + 5*v1 -4*v2 -3*v3 -5 < 0; value: -27 + -3*v2 + 3*v3 -1 <= 0; value: -4 + -4*v0 -18 <= 0; value: -38 0: 2 5 1: 3 2: 2 3 4 3: 1 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + -3*v3 + 11 < 0; value: -1 + 4*v0 -5*v2 + 2 <= 0; value: -3 + 5*v1 -4*v2 -3*v3 -5 < 0; value: -27 + -3*v2 + 3*v3 -1 <= 0; value: -4 + -4*v0 -18 <= 0; value: -38 0: 2 5 1: 3 2: 2 3 4 3: 1 3 4 0: 5 -> 5 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 5*v0 -6*v1 + 1 <= 0; value: 0 + 3*v0 -1*v2 + 2 <= 0; value: 0 + 5*v3 -10 = 0; value: 0 + -6*v0 -6*v1 + 2*v3 + 8 = 0; value: 0 + 4*v1 -4*v2 + 5*v3 -3 < 0; value: -9 0: 1 2 4 1: 1 4 5 2: 2 5 3: 3 4 5 optimal: 0 + <= 0; value: 0 - 5*v0 -6*v1 + 1 <= 0; value: 0 - 3*v0 -1*v2 + 2 <= 0; value: 0 - 5*v3 -10 = 0; value: 0 - -11/3*v2 + 2*v3 + 43/3 = 0; value: 0 + -9 < 0; value: -9 0: 1 2 4 5 1: 1 4 5 2: 2 5 4 3: 3 4 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -4*v1 -5*v2 -6*v3 + 19 = 0; value: 0 + -1*v2 -1*v3 + 2 = 0; value: 0 + -4*v2 -1*v3 -2 <= 0; value: -7 + -3*v0 -8 <= 0; value: -23 + 3*v0 + 3*v1 + 5*v2 -46 <= 0; value: -20 0: 4 5 1: 1 5 2: 1 2 3 5 3: 1 2 3 optimal: 265/9 + + 265/9 <= 0; value: 265/9 - -4*v1 -5*v2 -6*v3 + 19 = 0; value: 0 - -1*v2 -1*v3 + 2 = 0; value: 0 - -3*v2 -4 <= 0; value: 0 + -677/12 <= 0; value: -677/12 - 3*v0 -581/12 <= 0; value: 0 0: 4 5 1: 1 5 2: 1 2 3 5 3: 1 2 3 5 0: 5 -> 581/36 1: 2 -> 17/12 2: 1 -> -4/3 3: 1 -> 10/3 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + -5*v1 -5*v3 -9 < 0; value: -39 + 6*v0 + 5*v2 -71 < 0; value: -40 + -4*v2 + v3 + 16 = 0; value: 0 + -4*v1 -5*v2 + 33 = 0; value: 0 0: 3 1: 2 5 2: 3 4 5 3: 2 4 optimal: oo + -1*v0 + 19 < 0; value: 18 + <= 0; value: 0 + 33/2*v0 -331/2 < 0; value: -149 - 6*v0 + 5/4*v3 -51 < 0; value: -5/4 - -4*v2 + v3 + 16 = 0; value: 0 - -4*v1 -5*v2 + 33 = 0; value: 0 0: 3 2 1: 2 5 2: 3 4 5 2 3: 2 4 3 0: 1 -> 1 1: 2 -> -123/16 2: 5 -> 51/4 3: 4 -> 35 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 -45 <= 0; value: -29 + 5*v0 -25 = 0; value: 0 + -3*v0 -5*v2 + 35 = 0; value: 0 + -6*v1 -2*v2 + 2*v3 -1 < 0; value: -13 + -6*v1 -4*v2 -2 <= 0; value: -24 0: 2 3 1: 4 5 2: 1 3 4 5 3: 4 optimal: (16 -e*1) + + 16 < 0; value: 16 + -29 <= 0; value: -29 - 5*v0 -25 = 0; value: 0 - -3*v0 -5*v2 + 35 = 0; value: 0 - -6*v1 -2*v2 + 2*v3 -1 < 0; value: -6 - -2*v2 -2*v3 -1 <= 0; value: 0 0: 2 3 1 1: 4 5 2: 1 3 4 5 3: 4 5 0: 5 -> 5 1: 1 -> -2 2: 4 -> 4 3: 1 -> -9/2 + 2*v0 -2*v1 <= 0; value: -4 + -6*v0 + 2*v2 -2 = 0; value: 0 + -3*v0 -4*v1 -3*v2 + 4 < 0; value: -7 + -5*v0 <= 0; value: 0 + -2*v0 -6*v2 -3 <= 0; value: -9 + 3*v0 + 2*v1 -2*v3 + 4 = 0; value: 0 0: 1 2 3 4 5 1: 2 5 2: 1 2 4 3: 5 optimal: oo + 8*v0 -1/2 < 0; value: -1/2 - -6*v0 + 2*v2 -2 = 0; value: 0 - 3*v0 -3*v2 -4*v3 + 12 < 0; value: -7/2 + -5*v0 <= 0; value: 0 + -20*v0 -9 <= 0; value: -9 - 3*v0 + 2*v1 -2*v3 + 4 = 0; value: 0 0: 1 2 3 4 5 1: 2 5 2: 1 2 4 3: 5 2 0: 0 -> 0 1: 2 -> 9/8 2: 1 -> 1 3: 4 -> 25/8 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 4*v2 + 2*v3 -99 <= 0; value: -55 + -3*v0 -2*v2 -12 <= 0; value: -33 + 5*v2 + v3 -31 <= 0; value: -15 + 6*v0 + 4*v1 -5*v2 -40 <= 0; value: -13 + -4*v1 + 2*v3 -7 <= 0; value: -17 0: 1 2 4 1: 4 5 2: 1 2 3 4 3: 1 3 5 optimal: oo + 2*v0 -1*v3 + 7/2 <= 0; value: 25/2 + 6*v0 + 4*v2 + 2*v3 -99 <= 0; value: -55 + -3*v0 -2*v2 -12 <= 0; value: -33 + 5*v2 + v3 -31 <= 0; value: -15 + 6*v0 -5*v2 + 2*v3 -47 <= 0; value: -30 - -4*v1 + 2*v3 -7 <= 0; value: 0 0: 1 2 4 1: 4 5 2: 1 2 3 4 3: 1 3 5 4 0: 5 -> 5 1: 3 -> -5/4 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + -4*v1 + 3*v2 + 7 < 0; value: -1 + -4*v0 -5*v2 -13 < 0; value: -53 + 3*v1 -22 <= 0; value: -7 + -2*v0 + 3*v1 -13 <= 0; value: -8 + 2*v3 -7 <= 0; value: -1 0: 2 4 1: 1 3 4 2: 1 2 3: 5 optimal: oo + 16/5*v0 + 2/5 < 0; value: 82/5 - -4*v1 + 3*v2 + 7 < 0; value: -4 - -4*v0 -5*v2 -13 < 0; value: -5 + -9/5*v0 -113/5 < 0; value: -158/5 + -19/5*v0 -68/5 < 0; value: -163/5 + 2*v3 -7 <= 0; value: -1 0: 2 4 3 1: 1 3 4 2: 1 2 3 4 3: 5 0: 5 -> 5 1: 5 -> -29/20 2: 4 -> -28/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -4*v1 + 5*v3 + 1 <= 0; value: -1 + -1*v0 + 5 = 0; value: 0 + 5*v1 + 2*v2 + v3 -51 <= 0; value: -32 + -4*v1 + 3*v2 -5*v3 -7 <= 0; value: -26 + 3*v0 + 4*v2 -19 = 0; value: 0 0: 2 5 1: 1 3 4 2: 3 4 5 3: 1 3 4 optimal: 43/4 + + 43/4 <= 0; value: 43/4 - -4*v1 + 5*v3 + 1 <= 0; value: 0 - -1*v0 + 5 = 0; value: 0 + -411/8 <= 0; value: -411/8 - 3*v2 -10*v3 -8 <= 0; value: 0 - 3*v0 + 4*v2 -19 = 0; value: 0 0: 2 5 3 1: 1 3 4 2: 3 4 5 3: 1 3 4 0: 5 -> 5 1: 3 -> -3/8 2: 1 -> 1 3: 2 -> -1/2 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + -5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 5*v0 -5*v1 -6 <= 0; value: -16 + 6*v0 -3*v2 < 0; value: -3 + -2*v0 -3*v2 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 3 2: 2 4 5 3: 2 5 optimal: 12/5 + + 12/5 <= 0; value: 12/5 + <= 0; value: 0 + -5*v0 + v2 + 6*v3 -13 = 0; value: 0 - 5*v0 -5*v1 -6 <= 0; value: 0 + 6*v0 -3*v2 < 0; value: -3 + -2*v0 -3*v2 + 4*v3 -5 = 0; value: 0 0: 2 3 4 5 1: 3 2: 2 4 5 3: 2 5 0: 0 -> 0 1: 2 -> -6/5 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 8 + -2*v1 -5*v2 + 15 = 0; value: 0 + -1*v1 + 4*v2 -27 <= 0; value: -15 + -5*v0 + 3*v2 + 11 = 0; value: 0 + -5*v0 + 6*v1 + 13 < 0; value: -7 + 2*v0 -21 < 0; value: -13 0: 3 4 5 1: 1 2 4 2: 1 2 3 3: optimal: 290/13 + + 290/13 <= 0; value: 290/13 - -2*v1 -5*v2 + 15 = 0; value: 0 - 65/6*v0 -175/3 <= 0; value: 0 - -5*v0 + 3*v2 + 11 = 0; value: 0 + -631/13 < 0; value: -631/13 + -133/13 < 0; value: -133/13 0: 3 4 5 2 1: 1 2 4 2: 1 2 3 4 3: 0: 4 -> 70/13 1: 0 -> -75/13 2: 3 -> 69/13 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 4 + -6*v2 -4*v3 + 4 < 0; value: -10 + 6*v0 -4*v3 -4 = 0; value: 0 + <= 0; value: 0 + -3*v0 + v3 + 4 <= 0; value: 0 + -5*v0 -4*v1 + 4*v2 < 0; value: -6 0: 2 4 5 1: 5 2: 1 5 3: 1 2 4 optimal: oo + 13/2*v0 -8/3 < 0; value: 31/3 - -6*v2 -4*v3 + 4 < 0; value: -5 - 6*v0 -4*v3 -4 = 0; value: 0 + <= 0; value: 0 + -3/2*v0 + 3 <= 0; value: 0 - -5*v0 -4*v1 + 4*v2 < 0; value: -4 0: 2 4 5 1: 5 2: 1 5 3: 1 2 4 0: 2 -> 2 1: 0 -> -4/3 2: 1 -> 1/6 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -8 + v1 + 3*v3 -20 <= 0; value: -4 + <= 0; value: 0 + -4*v0 + 6*v2 = 0; value: 0 + 6*v0 -4*v3 + 16 = 0; value: 0 + 6*v1 + 6*v3 -48 = 0; value: 0 0: 3 4 1: 1 5 2: 3 3: 1 4 5 optimal: -4/3 + -4/3 <= 0; value: -4/3 - 9/2*v2 -4 <= 0; value: 0 + <= 0; value: 0 - -4*v0 + 6*v2 = 0; value: 0 - 6*v0 -4*v3 + 16 = 0; value: 0 - 6*v1 + 6*v3 -48 = 0; value: 0 0: 3 4 1 1: 1 5 2: 3 1 3: 1 4 5 0: 0 -> 4/3 1: 4 -> 2 2: 0 -> 8/9 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: 2 + -4*v2 <= 0; value: 0 + 5*v0 -2*v1 -5*v2 -8 <= 0; value: 0 + 2*v0 + 4*v1 -4*v2 -19 <= 0; value: -11 + -3*v3 <= 0; value: -12 + 3*v0 + 3*v3 -37 < 0; value: -19 0: 2 3 5 1: 2 3 2: 1 2 3 3: 4 5 optimal: oo + -3*v0 + 5*v2 + 8 <= 0; value: 2 + -4*v2 <= 0; value: 0 - 5*v0 -2*v1 -5*v2 -8 <= 0; value: 0 + 12*v0 -14*v2 -35 <= 0; value: -11 + -3*v3 <= 0; value: -12 + 3*v0 + 3*v3 -37 < 0; value: -19 0: 2 3 5 1: 2 3 2: 1 2 3 3: 4 5 0: 2 -> 2 1: 1 -> 1 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + -6*v0 -6*v3 + 1 <= 0; value: -11 + 6*v0 -3*v3 -4 <= 0; value: -1 + 4*v0 + 4*v2 + 5*v3 -58 <= 0; value: -33 + 2*v0 + 3*v1 + 4*v3 -15 = 0; value: 0 0: 2 3 4 5 1: 5 2: 4 3: 2 3 4 5 optimal: oo + 6/5*v0 -32/15*v2 + 314/15 <= 0; value: 68/5 + <= 0; value: 0 + -6/5*v0 + 24/5*v2 -343/5 <= 0; value: -253/5 + 42/5*v0 + 12/5*v2 -194/5 <= 0; value: -104/5 - 4*v0 + 4*v2 + 5*v3 -58 <= 0; value: 0 - 2*v0 + 3*v1 + 4*v3 -15 = 0; value: 0 0: 2 3 4 5 1: 5 2: 4 2 3 3: 2 3 4 5 0: 1 -> 1 1: 3 -> -29/5 2: 4 -> 4 3: 1 -> 38/5 + 2*v0 -2*v1 <= 0; value: 2 + -2*v0 + 5*v1 + 6*v2 -16 = 0; value: 0 + 5*v0 + v3 -27 < 0; value: -11 + -2*v0 -2*v1 + 2*v2 -1 <= 0; value: -7 + -3*v1 -5*v2 + 6*v3 + 6 < 0; value: -4 + 2*v0 + 2*v1 -12 <= 0; value: -2 0: 1 2 3 5 1: 1 3 4 5 2: 1 3 4 3: 2 4 optimal: (128/7 -e*1) + + 128/7 < 0; value: 128/7 - -2*v0 + 5*v1 + 6*v2 -16 = 0; value: 0 - 5*v0 + v3 -27 < 0; value: -5 - -14/5*v0 + 22/5*v2 -37/5 <= 0; value: 0 + -1217/14 < 0; value: -1217/14 - -14/55*v3 -152/55 <= 0; value: 0 0: 1 2 3 5 4 1: 1 3 4 5 2: 1 3 4 5 3: 2 4 5 0: 3 -> 46/7 1: 2 -> -93/77 2: 2 -> 129/22 3: 1 -> -76/7 + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v2 + 3*v3 -2 < 0; value: -1 + 2*v1 + 5*v3 -33 < 0; value: -8 + -4*v2 + 2 <= 0; value: -2 + -2*v0 -6*v2 + 5 <= 0; value: -7 + 4*v0 + 4*v3 -24 = 0; value: 0 0: 1 4 5 1: 2 2: 1 3 4 3: 1 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -4*v0 + 4*v2 + 3*v3 -2 < 0; value: -1 + 2*v1 + 5*v3 -33 < 0; value: -8 + -4*v2 + 2 <= 0; value: -2 + -2*v0 -6*v2 + 5 <= 0; value: -7 + 4*v0 + 4*v3 -24 = 0; value: 0 0: 1 4 5 1: 2 2: 1 3 4 3: 1 2 5 0: 3 -> 3 1: 5 -> 5 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + 4*v0 -4*v2 -6*v3 + 2 <= 0; value: 0 + 2*v0 -2*v3 -8 = 0; value: 0 + -4*v0 -2*v1 + 4*v2 + 4 = 0; value: 0 + -2*v1 <= 0; value: 0 + 5*v0 -4*v2 -15 <= 0; value: -6 0: 1 2 3 5 1: 3 4 2: 1 3 5 3: 1 2 optimal: 10 + + 10 <= 0; value: 10 - 4*v0 -4*v2 -6*v3 + 2 <= 0; value: 0 - 2*v0 -2*v3 -8 = 0; value: 0 - -4*v0 -2*v1 + 4*v2 + 4 = 0; value: 0 - 6*v0 -30 <= 0; value: 0 + -6 <= 0; value: -6 0: 1 2 3 5 4 4 1: 3 4 2: 1 3 5 4 3: 1 2 5 4 0: 5 -> 5 1: 0 -> 0 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 -11 <= 0; value: -23 + -6*v1 -7 <= 0; value: -25 + 5*v0 + v2 -15 <= 0; value: 0 + v1 -6*v3 + 21 = 0; value: 0 + 3*v0 -2*v1 <= 0; value: 0 0: 1 3 5 1: 2 4 5 2: 3 3: 4 optimal: 7/9 + + 7/9 <= 0; value: 7/9 + -19/3 <= 0; value: -19/3 - -9*v0 -7 <= 0; value: 0 + v2 -170/9 <= 0; value: -125/9 - v1 -6*v3 + 21 = 0; value: 0 - 3*v0 -12*v3 + 42 <= 0; value: 0 0: 1 3 5 2 1: 2 4 5 2: 3 3: 4 2 5 0: 2 -> -7/9 1: 3 -> -7/6 2: 5 -> 5 3: 4 -> 119/36 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 -5*v1 + 1 <= 0; value: -24 + -3*v2 + 4*v3 -2 <= 0; value: -5 + 2*v2 -13 <= 0; value: -3 + -5*v1 + v3 -7 <= 0; value: -19 + 5*v1 -5*v2 + 10 = 0; value: 0 0: 1 1: 1 4 5 2: 2 3 5 3: 2 4 optimal: oo + 2*v0 + 40/17 <= 0; value: 108/17 + -5*v0 + 117/17 <= 0; value: -53/17 - -3*v2 + 4*v3 -2 <= 0; value: 0 + -193/17 <= 0; value: -193/17 - -17/3*v3 + 19/3 <= 0; value: 0 - 5*v1 -5*v2 + 10 = 0; value: 0 0: 1 1: 1 4 5 2: 2 3 5 1 4 3: 2 4 1 3 0: 2 -> 2 1: 3 -> -20/17 2: 5 -> 14/17 3: 3 -> 19/17 + 2*v0 -2*v1 <= 0; value: 2 + 4*v0 + 2*v3 -16 = 0; value: 0 + -6*v1 -3*v3 + 8 <= 0; value: -10 + 5*v1 + v2 -45 <= 0; value: -29 + v0 -3*v3 -6 <= 0; value: -2 + -5*v1 -5*v2 + 20 = 0; value: 0 0: 1 4 1: 2 3 5 2: 3 5 3: 1 2 4 optimal: 16/3 + + 16/3 <= 0; value: 16/3 - 4*v0 + 2*v3 -16 = 0; value: 0 - 6*v2 -3*v3 -16 <= 0; value: 0 + 4*v0 -155/3 <= 0; value: -107/3 + 7*v0 -30 <= 0; value: -2 - -5*v1 -5*v2 + 20 = 0; value: 0 0: 1 4 3 1: 2 3 5 2: 3 5 2 3: 1 2 4 3 0: 4 -> 4 1: 3 -> 4/3 2: 1 -> 8/3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + -5*v1 -1*v2 + 1 <= 0; value: 0 + -3*v0 -3*v1 -1*v2 -2 < 0; value: -6 + -1*v1 + v3 -2 <= 0; value: -1 + 2*v1 + 5*v2 -13 <= 0; value: -8 + 4*v0 + 4*v2 -15 <= 0; value: -7 0: 2 5 1: 1 2 3 4 2: 1 2 4 5 3: 3 optimal: 125/46 + + 125/46 <= 0; value: 125/46 - -5*v1 -1*v2 + 1 <= 0; value: 0 + -619/92 < 0; value: -619/92 + v3 -38/23 <= 0; value: -15/23 - 23/5*v2 -63/5 <= 0; value: 0 - 4*v0 -93/23 <= 0; value: 0 0: 2 5 1: 1 2 3 4 2: 1 2 4 5 3 3: 3 0: 1 -> 93/92 1: 0 -> -8/23 2: 1 -> 63/23 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v2 + 2 <= 0; value: 0 + 4*v0 -6*v1 -4 < 0; value: -16 + v2 -2*v3 < 0; value: -1 + 3*v2 + 3*v3 -7 <= 0; value: -1 + 4*v0 + 5*v2 -14 < 0; value: -9 0: 2 5 1: 2 2: 1 3 4 5 3: 3 4 optimal: (17/6 -e*1) + + 17/6 < 0; value: 17/6 - -2*v2 + 2 <= 0; value: 0 - 4*v0 -6*v1 -4 < 0; value: -11/2 + -2*v3 + 1 < 0; value: -1 + 3*v3 -4 <= 0; value: -1 - 4*v0 + 5*v2 -14 < 0; value: -4 0: 2 5 1: 2 2: 1 3 4 5 3: 3 4 0: 0 -> 5/4 1: 2 -> 13/12 2: 1 -> 1 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -5*v2 + 4*v3 + 12 = 0; value: 0 + 3*v0 -6*v2 + 4*v3 + 10 = 0; value: 0 + -2*v1 + 4*v2 + 2*v3 -16 <= 0; value: -6 + 2*v0 + 5*v2 + v3 -74 <= 0; value: -48 + -1*v3 + 1 < 0; value: -1 0: 2 4 1: 3 2: 1 2 3 4 3: 1 2 3 4 5 optimal: (14/3 -e*1) + + 14/3 < 0; value: 14/3 - -5*v2 + 4*v3 + 12 = 0; value: 0 - 3*v0 -1*v2 -2 = 0; value: 0 - -2*v1 + 4*v2 + 2*v3 -16 <= 0; value: 0 + -803/15 < 0; value: -803/15 - -15/4*v0 + 13/2 < 0; value: -1/2 0: 2 4 5 1: 3 2: 1 2 3 4 5 3: 1 2 3 4 5 0: 2 -> 28/15 1: 5 -> 7/10 2: 4 -> 18/5 3: 2 -> 3/2 + 2*v0 -2*v1 <= 0; value: -4 + -4*v2 -6*v3 -3 <= 0; value: -23 + -2*v0 + 5*v3 -1 < 0; value: -5 + -1*v3 <= 0; value: 0 + -6*v0 + 5*v2 -3*v3 -37 <= 0; value: -24 + -3*v0 + 2 <= 0; value: -4 0: 2 4 5 1: 2: 1 4 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + -4*v2 -6*v3 -3 <= 0; value: -23 + -2*v0 + 5*v3 -1 < 0; value: -5 + -1*v3 <= 0; value: 0 + -6*v0 + 5*v2 -3*v3 -37 <= 0; value: -24 + -3*v0 + 2 <= 0; value: -4 0: 2 4 5 1: 2: 1 4 3: 1 2 3 4 0: 2 -> 2 1: 4 -> 4 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -5*v1 + 11 < 0; value: -2 + -4*v3 -8 < 0; value: -28 + -2*v1 + 2*v3 <= 0; value: 0 + 5*v1 -33 < 0; value: -8 + -2*v0 + 4*v2 -3*v3 -16 < 0; value: -35 0: 1 5 1: 1 3 4 2: 5 3: 2 3 5 optimal: (22/15 -e*1) + + 22/15 < 0; value: 22/15 - 3*v0 -5*v3 + 11 < 0; value: -5/2 + -172/5 < 0; value: -172/5 - -2*v1 + 2*v3 <= 0; value: 0 - 3*v0 -22 < 0; value: -3 + 4*v2 -757/15 < 0; value: -697/15 0: 1 5 2 4 1: 1 3 4 2: 5 3: 2 3 5 1 4 0: 4 -> 19/3 1: 5 -> 13/2 2: 1 -> 1 3: 5 -> 13/2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + -6*v0 -3*v2 -5*v3 + 22 <= 0; value: -27 + -4*v0 + 3*v2 + 5 <= 0; value: -6 + 3*v0 -3*v3 -19 <= 0; value: -10 + -3*v2 -4*v3 -13 < 0; value: -30 0: 2 3 4 1: 2: 2 3 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + 5*v3 -19 < 0; value: -9 + -6*v0 -3*v2 -5*v3 + 22 <= 0; value: -27 + -4*v0 + 3*v2 + 5 <= 0; value: -6 + 3*v0 -3*v3 -19 <= 0; value: -10 + -3*v2 -4*v3 -13 < 0; value: -30 0: 2 3 4 1: 2: 2 3 5 3: 1 2 4 5 0: 5 -> 5 1: 4 -> 4 2: 3 -> 3 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + -2*v0 -5*v2 + 3*v3 -6 < 0; value: -14 + -2*v1 + v2 + 4*v3 -23 <= 0; value: -3 + 4*v0 + 3*v3 -20 <= 0; value: -8 + 3*v3 -12 = 0; value: 0 + -6*v0 -4*v1 = 0; value: 0 0: 1 3 5 1: 2 5 2: 1 2 3: 1 2 3 4 optimal: 10 + + 10 <= 0; value: 10 + -3 < 0; value: -3 - 3*v0 + v2 + 4*v3 -23 <= 0; value: 0 - -4/3*v2 + 4/3 <= 0; value: 0 - 3*v3 -12 = 0; value: 0 - -6*v0 -4*v1 = 0; value: 0 0: 1 3 5 2 1: 2 5 2: 1 2 3 3: 1 2 3 4 0: 0 -> 2 1: 0 -> -3 2: 4 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 6*v2 -3*v3 -21 <= 0; value: -45 + 5*v1 + 2*v2 -45 < 0; value: -28 + -6*v2 -4*v3 -16 <= 0; value: -38 + -5*v1 + 3*v2 + 3 <= 0; value: -9 + = 0; value: 0 0: 1: 1 2 4 2: 1 2 3 4 3: 1 3 optimal: oo + 2*v0 + 4/5*v3 + 2 <= 0; value: 56/5 + -23/5*v3 -31 <= 0; value: -247/5 + -10/3*v3 -166/3 < 0; value: -206/3 - -6*v2 -4*v3 -16 <= 0; value: 0 - -5*v1 + 3*v2 + 3 <= 0; value: 0 + = 0; value: 0 0: 1: 1 2 4 2: 1 2 3 4 3: 1 3 2 0: 3 -> 3 1: 3 -> -13/5 2: 1 -> -16/3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 + 2 = 0; value: 0 + -1*v0 -1*v3 -1 <= 0; value: -7 + 5*v0 -1*v2 + 2*v3 -39 < 0; value: -24 + -5*v0 + v2 + 1 < 0; value: -6 + -4*v0 + 4*v1 -4*v2 + 12 = 0; value: 0 0: 1 2 3 4 5 1: 5 2: 3 4 5 3: 2 3 optimal: (76 -e*1) + + 76 < 0; value: 76 - -1*v0 + 2 = 0; value: 0 - -1*v0 -1*v3 -1 <= 0; value: 0 - 5*v0 -1*v2 + 2*v3 -39 < 0; value: -1 + -44 < 0; value: -44 - -4*v0 + 4*v1 -4*v2 + 12 = 0; value: 0 0: 1 2 3 4 5 4 1: 5 2: 3 4 5 3: 2 3 4 0: 2 -> 2 1: 2 -> -35 2: 3 -> -34 3: 4 -> -3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 + 6*v3 -34 <= 0; value: -2 + -2*v0 + 5*v3 = 0; value: 0 + -6*v1 -4*v2 + 5*v3 + 16 <= 0; value: -4 + -1*v0 -4*v1 -3*v3 + 18 <= 0; value: -13 + 5*v0 + 5*v1 + 4*v3 -151 <= 0; value: -93 0: 2 4 5 1: 1 3 4 5 2: 3 3: 1 2 3 4 5 optimal: 7274/77 + + 7274/77 <= 0; value: 7274/77 + -718/77 <= 0; value: -718/77 - -2*v0 + 5*v3 = 0; value: 0 - -6*v1 -4*v2 + 5*v3 + 16 <= 0; value: 0 - -53/15*v0 + 8/3*v2 + 22/3 <= 0; value: 0 - 77/20*v0 -257/2 <= 0; value: 0 0: 2 4 5 1 1: 1 3 4 5 2: 3 4 1 5 3: 1 2 3 4 5 0: 5 -> 2570/77 1: 5 -> -97/7 2: 0 -> 6387/154 3: 2 -> 1028/77 + 2*v0 -2*v1 <= 0; value: 2 + 4*v3 -6 < 0; value: -2 + -6*v1 -6*v2 -9 < 0; value: -39 + -4*v0 -1*v2 + 3 <= 0; value: -6 + v0 -3*v1 -1 <= 0; value: 0 + 3*v1 + 4*v2 + 3*v3 -28 <= 0; value: -5 0: 3 4 1: 2 4 5 2: 2 3 5 3: 1 5 optimal: oo + -16/3*v2 -4*v3 + 118/3 <= 0; value: 26/3 + 4*v3 -6 < 0; value: -2 + 2*v2 + 6*v3 -65 < 0; value: -49 + 15*v2 + 12*v3 -113 <= 0; value: -26 - v0 -3*v1 -1 <= 0; value: 0 - v0 + 4*v2 + 3*v3 -29 <= 0; value: 0 0: 3 4 2 5 1: 2 4 5 2: 2 3 5 3: 1 5 3 2 0: 1 -> 6 1: 0 -> 5/3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + 4*v2 + 6*v3 -34 = 0; value: 0 + v1 -2*v3 + 6 = 0; value: 0 + -3*v0 + 5*v1 -3*v2 -2 = 0; value: 0 + -5*v3 -8 <= 0; value: -33 + 2*v1 -2*v2 -10 <= 0; value: -4 0: 3 1: 2 3 5 2: 1 3 5 3: 1 2 4 optimal: 110/21 + + 110/21 <= 0; value: 110/21 - 4*v2 + 6*v3 -34 = 0; value: 0 - v1 -2*v3 + 6 = 0; value: 0 - -3*v0 -29/3*v2 + 74/3 = 0; value: 0 + -251/7 <= 0; value: -251/7 - 42/29*v0 -326/29 <= 0; value: 0 0: 3 4 5 1: 2 3 5 2: 1 3 5 4 3: 1 2 4 3 5 0: 5 -> 163/21 1: 4 -> 36/7 2: 1 -> 1/7 3: 5 -> 39/7 + 2*v0 -2*v1 <= 0; value: 8 + 4*v1 <= 0; value: 0 + 2*v0 -3*v2 -3 <= 0; value: -1 + -6*v1 <= 0; value: 0 + 2*v0 + 4*v2 -3*v3 -1 <= 0; value: 0 + -3*v0 + 2 <= 0; value: -10 0: 2 4 5 1: 1 3 2: 2 4 3: 4 optimal: oo + 3*v2 + 3 <= 0; value: 9 + <= 0; value: 0 - -7*v2 + 3*v3 -2 <= 0; value: 0 - -6*v1 <= 0; value: 0 - 2*v0 + 4*v2 -3*v3 -1 <= 0; value: 0 + -9/2*v2 -5/2 <= 0; value: -23/2 0: 2 4 5 1: 1 3 2: 2 4 5 3: 4 2 5 0: 4 -> 9/2 1: 0 -> 0 2: 2 -> 2 3: 5 -> 16/3 + 2*v0 -2*v1 <= 0; value: 4 + -5*v0 <= 0; value: -20 + -2*v0 -6*v1 + 20 = 0; value: 0 + -3*v0 + 2*v2 + 10 <= 0; value: 0 + = 0; value: 0 + 3*v0 + v3 -44 <= 0; value: -29 0: 1 2 3 5 1: 2 2: 3 3: 5 optimal: oo + -8/9*v3 + 292/9 <= 0; value: 268/9 + 5/3*v3 -220/3 <= 0; value: -205/3 - -2*v0 -6*v1 + 20 = 0; value: 0 + 2*v2 + v3 -34 <= 0; value: -29 + = 0; value: 0 - 3*v0 + v3 -44 <= 0; value: 0 0: 1 2 3 5 1: 2 2: 3 3: 5 1 3 0: 4 -> 41/3 1: 2 -> -11/9 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 -3*v3 + 9 = 0; value: 0 + 2*v0 <= 0; value: 0 + -1*v0 -6*v3 + 18 = 0; value: 0 + 3*v3 -9 = 0; value: 0 + v0 + 2*v2 + v3 -5 = 0; value: 0 0: 1 2 3 5 1: 2: 5 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 3*v0 -3*v3 + 9 = 0; value: 0 + 2*v0 <= 0; value: 0 + -1*v0 -6*v3 + 18 = 0; value: 0 + 3*v3 -9 = 0; value: 0 + v0 + 2*v2 + v3 -5 = 0; value: 0 0: 1 2 3 5 1: 2: 5 3: 1 3 4 5 0: 0 -> 0 1: 3 -> 3 2: 1 -> 1 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 + 3*v1 -21 <= 0; value: -7 + -5*v1 -5 <= 0; value: -15 + -4*v1 + 2*v2 + 6*v3 -26 = 0; value: 0 + -3*v0 + 6*v3 -28 < 0; value: -4 + 3*v0 + 5*v2 -16 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 3 5 3: 3 4 optimal: 14 + + 14 <= 0; value: 14 - -20/3*v2 -8/3 <= 0; value: 0 - -5/2*v2 -15/2*v3 + 55/2 <= 0; value: 0 - -4*v1 + 2*v2 + 6*v3 -26 = 0; value: 0 + -116/5 < 0; value: -116/5 - 3*v0 + 5*v2 -16 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 3 5 2 1 4 1 3: 3 4 2 1 0: 2 -> 6 1: 2 -> -1 2: 2 -> -2/5 3: 5 -> 19/5 + 2*v0 -2*v1 <= 0; value: 6 + 6*v2 <= 0; value: 0 + -5*v1 + 4*v3 + 6 = 0; value: 0 + -6*v0 + v1 + 23 <= 0; value: -5 + 3*v0 + 2*v3 -33 <= 0; value: -16 + -3*v1 -6*v2 -4*v3 + 6 <= 0; value: -4 0: 3 4 1: 2 3 5 2: 1 5 3: 2 4 5 optimal: 37/2 + + 37/2 <= 0; value: 37/2 - 6*v2 <= 0; value: 0 - -5*v1 + 4*v3 + 6 = 0; value: 0 + -40 <= 0; value: -40 - 3*v0 -129/4 <= 0; value: 0 - -6*v2 -32/5*v3 + 12/5 <= 0; value: 0 0: 3 4 1: 2 3 5 2: 1 5 4 3 3: 2 4 5 3 0: 5 -> 43/4 1: 2 -> 3/2 2: 0 -> 0 3: 1 -> 3/8 + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 6*v2 + 4*v3 -41 <= 0; value: -25 + -2*v0 + 4*v3 <= 0; value: 0 + -4*v0 + 6*v1 -1*v3 < 0; value: -9 + v2 -2 = 0; value: 0 + 6*v0 + 6*v1 + 3*v2 -33 <= 0; value: -15 0: 2 3 5 1: 1 3 5 2: 1 4 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + 4*v1 + 6*v2 + 4*v3 -41 <= 0; value: -25 + -2*v0 + 4*v3 <= 0; value: 0 + -4*v0 + 6*v1 -1*v3 < 0; value: -9 + v2 -2 = 0; value: 0 + 6*v0 + 6*v1 + 3*v2 -33 <= 0; value: -15 0: 2 3 5 1: 1 3 5 2: 1 4 5 3: 1 2 3 0: 2 -> 2 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + -6*v0 -27 <= 0; value: -57 + v0 -5*v1 -3 <= 0; value: -13 + 3*v0 + 3*v2 + 4*v3 -55 < 0; value: -29 + -5*v2 -3 <= 0; value: -8 + -2*v0 + 4*v3 + 1 <= 0; value: -1 0: 1 2 3 5 1: 2 2: 3 4 3: 3 5 optimal: oo + -8/5*v2 -32/15*v3 + 458/15 < 0; value: 74/3 + 6*v2 + 8*v3 -137 < 0; value: -115 - v0 -5*v1 -3 <= 0; value: 0 - 3*v0 + 3*v2 + 4*v3 -55 < 0; value: -3 + -5*v2 -3 <= 0; value: -8 + 2*v2 + 20/3*v3 -107/3 < 0; value: -61/3 0: 1 2 3 5 1: 2 2: 3 4 1 5 3: 3 5 1 0: 5 -> 41/3 1: 3 -> 32/15 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + 6*v0 -40 <= 0; value: -22 + 3*v2 -3*v3 + 1 <= 0; value: -2 + 3*v0 -1*v1 + 6*v2 -6 = 0; value: 0 + 2*v1 -2*v2 -6*v3 <= 0; value: 0 + -4*v0 + v1 -2*v2 + 7 <= 0; value: -2 0: 1 3 5 1: 3 4 5 2: 2 3 4 5 3: 2 4 optimal: oo + -4*v0 -12*v2 + 12 <= 0; value: 0 + 6*v0 -40 <= 0; value: -22 + 3*v2 -3*v3 + 1 <= 0; value: -2 - 3*v0 -1*v1 + 6*v2 -6 = 0; value: 0 + 6*v0 + 10*v2 -6*v3 -12 <= 0; value: 0 + -1*v0 + 4*v2 + 1 <= 0; value: -2 0: 1 3 5 4 1: 3 4 5 2: 2 3 4 5 3: 2 4 0: 3 -> 3 1: 3 -> 3 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 3*v3 -3 = 0; value: 0 + 4*v2 -22 <= 0; value: -10 + -6*v2 + 4*v3 + 14 = 0; value: 0 + -6*v0 -3*v1 -5 <= 0; value: -23 + -2*v0 -1*v1 + 4*v2 -11 <= 0; value: -5 0: 4 5 1: 4 5 2: 2 3 5 3: 1 3 optimal: oo + 6*v0 -2 <= 0; value: 4 - 3*v3 -3 = 0; value: 0 + -10 <= 0; value: -10 - -6*v2 + 4*v3 + 14 = 0; value: 0 + -8 <= 0; value: -8 - -2*v0 -1*v1 + 4*v2 -11 <= 0; value: 0 0: 4 5 1: 4 5 2: 2 3 5 4 3: 1 3 4 2 0: 1 -> 1 1: 4 -> -1 2: 3 -> 3 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -1*v3 -4 <= 0; value: 0 + 2*v0 + 3*v2 -5*v3 -4 <= 0; value: -1 + -3*v2 -5*v3 -5 <= 0; value: -24 + 3*v1 -11 <= 0; value: -2 + v0 -2*v1 + 2 <= 0; value: -2 0: 1 2 5 1: 4 5 2: 2 3 3: 1 2 3 optimal: 10/3 + + 10/3 <= 0; value: 10/3 - 3*v0 -1*v3 -4 <= 0; value: 0 + 3*v2 -160/3 <= 0; value: -133/3 + -3*v2 -65 <= 0; value: -74 - 1/2*v3 -6 <= 0; value: 0 - v0 -2*v1 + 2 <= 0; value: 0 0: 1 2 5 4 1: 4 5 2: 2 3 3: 1 2 3 4 0: 2 -> 16/3 1: 3 -> 11/3 2: 3 -> 3 3: 2 -> 12 + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 + 6*v3 -1 <= 0; value: -8 + -6*v0 + 2*v3 <= 0; value: 0 + 5*v1 + 6*v3 -25 <= 0; value: -7 + v0 + 4*v1 -1 <= 0; value: 0 + 2*v2 -17 <= 0; value: -7 0: 2 4 1: 3 4 2: 1 5 3: 1 2 3 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v2 + 6*v3 -1 <= 0; value: -8 + -6*v0 + 2*v3 <= 0; value: 0 + 5*v1 + 6*v3 -25 <= 0; value: -7 + v0 + 4*v1 -1 <= 0; value: 0 + 2*v2 -17 <= 0; value: -7 0: 2 4 1: 3 4 2: 1 5 3: 1 2 3 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -2*v2 -4 <= 0; value: -2 + 4*v0 + 6*v1 -58 < 0; value: -30 + v3 -8 < 0; value: -3 + -6*v0 + 6 = 0; value: 0 + -2*v0 -4*v2 + 8 <= 0; value: -2 0: 1 2 4 5 1: 2 2: 1 5 3: 3 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -2*v2 -4 <= 0; value: -2 + 4*v0 + 6*v1 -58 < 0; value: -30 + v3 -8 < 0; value: -3 + -6*v0 + 6 = 0; value: 0 + -2*v0 -4*v2 + 8 <= 0; value: -2 0: 1 2 4 5 1: 2 2: 1 5 3: 3 0: 1 -> 1 1: 4 -> 4 2: 2 -> 2 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -2*v0 + 6*v1 -19 <= 0; value: -9 + 6*v1 + 2*v3 -22 = 0; value: 0 + 6*v0 + 4*v1 -16 < 0; value: -2 + -4*v3 + 11 < 0; value: -9 + -4*v1 + 3 < 0; value: -5 0: 1 3 1: 1 2 3 5 2: 3: 2 4 optimal: (17/6 -e*1) + + 17/6 < 0; value: 17/6 + -113/6 < 0; value: -113/6 - 6*v1 + 2*v3 -22 = 0; value: 0 - 6*v0 -13 < 0; value: -7/2 + -24 < 0; value: -24 - 4/3*v3 -35/3 < 0; value: -4/3 0: 1 3 1: 1 2 3 5 2: 3: 2 4 5 1 3 0: 1 -> 19/12 1: 2 -> 13/12 2: 1 -> 1 3: 5 -> 31/4 + 2*v0 -2*v1 <= 0; value: 8 + v1 + 4*v2 -2 < 0; value: -1 + -2*v2 -3*v3 -4 < 0; value: -19 + 3*v2 <= 0; value: 0 + 2*v0 + v1 -4*v2 -14 <= 0; value: -3 + -5*v0 + 2*v3 + 12 <= 0; value: -3 0: 4 5 1: 1 4 2: 1 2 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 8 + v1 + 4*v2 -2 < 0; value: -1 + -2*v2 -3*v3 -4 < 0; value: -19 + 3*v2 <= 0; value: 0 + 2*v0 + v1 -4*v2 -14 <= 0; value: -3 + -5*v0 + 2*v3 + 12 <= 0; value: -3 0: 4 5 1: 1 4 2: 1 2 3 4 3: 2 5 0: 5 -> 5 1: 1 -> 1 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 5*v2 -3*v3 + 5 < 0; value: -4 + 2*v0 + 6*v2 -24 = 0; value: 0 + -4*v0 + 2*v1 + 7 <= 0; value: -3 + 4*v2 -6*v3 + 10 < 0; value: -2 + -4*v3 -3 <= 0; value: -19 0: 1 2 3 1: 3 2: 1 2 4 3: 1 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 4 + -4*v0 + 5*v2 -3*v3 + 5 < 0; value: -4 + 2*v0 + 6*v2 -24 = 0; value: 0 + -4*v0 + 2*v1 + 7 <= 0; value: -3 + 4*v2 -6*v3 + 10 < 0; value: -2 + -4*v3 -3 <= 0; value: -19 0: 1 2 3 1: 3 2: 1 2 4 3: 1 4 5 0: 3 -> 3 1: 1 -> 1 2: 3 -> 3 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 6 + -1*v0 + 3*v1 -2 <= 0; value: -1 + 4*v2 -1*v3 -19 = 0; value: 0 + 2*v0 -6*v1 + 5*v3 -3 <= 0; value: 0 + 6*v0 -3*v1 + 2*v3 -76 <= 0; value: -50 + 2*v1 + 3*v3 -10 <= 0; value: -3 0: 1 3 4 1: 1 3 4 5 2: 2 3: 2 3 4 5 optimal: oo + -46/3*v0 + 748/3 <= 0; value: 518/3 + 25*v0 -376 <= 0; value: -251 - 4*v2 -1*v3 -19 = 0; value: 0 - 2*v0 -6*v1 + 5*v3 -3 <= 0; value: 0 - 5*v0 -2*v2 -65 <= 0; value: 0 + 142/3*v0 -2119/3 <= 0; value: -1409/3 0: 1 3 4 5 1 1: 1 3 4 5 2: 2 4 5 1 3: 2 3 4 5 1 0: 5 -> 5 1: 2 -> -244/3 2: 5 -> -20 3: 1 -> -99 + 2*v0 -2*v1 <= 0; value: -6 + -2*v0 -3*v1 + 6 < 0; value: -3 + -5*v1 + 6*v3 + 1 <= 0; value: -14 + -1*v1 -2 < 0; value: -5 + 2*v0 + 2*v1 -6 = 0; value: 0 + -2*v3 <= 0; value: 0 0: 1 4 1: 1 2 3 4 2: 3: 2 5 optimal: 26/5 + + 26/5 <= 0; value: 26/5 + -1/5 < 0; value: -1/5 - 5*v0 + 6*v3 -14 <= 0; value: 0 + -11/5 < 0; value: -11/5 - 2*v0 + 2*v1 -6 = 0; value: 0 - -2*v3 <= 0; value: 0 0: 1 4 2 3 1: 1 2 3 4 2: 3: 2 5 1 3 0: 0 -> 14/5 1: 3 -> 1/5 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -6 + -6*v0 -5*v3 + 17 = 0; value: 0 + v2 + 2*v3 -10 < 0; value: -5 + -3*v2 + 9 <= 0; value: 0 + -2*v1 -1*v2 -9 <= 0; value: -22 + v0 + 3*v1 -33 <= 0; value: -16 0: 1 5 1: 4 5 2: 2 3 4 3: 1 2 optimal: oo + 22/5*v0 + 61/5 < 0; value: 21 - -6*v0 -5*v3 + 17 = 0; value: 0 - v2 + 2*v3 -10 < 0; value: -1 + -36/5*v0 -3/5 < 0; value: -15 - -2*v1 -1*v2 -9 <= 0; value: 0 + -13/5*v0 -513/10 < 0; value: -113/2 0: 1 5 3 1: 4 5 2: 2 3 4 5 3: 1 2 3 5 0: 2 -> 2 1: 5 -> -8 2: 3 -> 7 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + v1 + 2*v3 -9 = 0; value: 0 + 6*v3 -51 <= 0; value: -33 + 3*v1 + 4*v2 -44 <= 0; value: -27 + 2*v1 + 5*v2 -40 <= 0; value: -24 + -2*v3 -5 <= 0; value: -11 0: 1: 1 3 4 2: 3 4 3: 1 2 5 optimal: oo + 2*v0 + 16 <= 0; value: 18 - v1 + 2*v3 -9 = 0; value: 0 - 6*v3 -51 <= 0; value: 0 + 4*v2 -68 <= 0; value: -60 + 5*v2 -56 <= 0; value: -46 + -22 <= 0; value: -22 0: 1: 1 3 4 2: 3 4 3: 1 2 5 3 4 0: 1 -> 1 1: 3 -> -8 2: 2 -> 2 3: 3 -> 17/2 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 -4*v3 + 2 <= 0; value: -10 + -1*v0 + 2*v1 -4*v2 + 13 = 0; value: 0 + -6*v3 -18 < 0; value: -48 + -3*v1 + 9 = 0; value: 0 + 5*v0 + 2*v1 -6*v3 + 9 = 0; value: 0 0: 2 5 1: 2 4 5 2: 1 2 3: 1 3 5 optimal: oo + 12/5*v3 -12 <= 0; value: 0 + -23/5*v3 + 13 <= 0; value: -10 - -1*v0 + 2*v1 -4*v2 + 13 = 0; value: 0 + -6*v3 -18 < 0; value: -48 - -3/2*v0 -6*v2 + 57/2 = 0; value: 0 - 5*v0 -6*v3 + 15 = 0; value: 0 0: 2 5 4 1 1: 2 4 5 2: 1 2 4 5 3: 1 3 5 0: 3 -> 3 1: 3 -> 3 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -1*v2 + v3 -13 < 0; value: -8 + <= 0; value: 0 + 4*v0 -5*v2 -3*v3 + 31 = 0; value: 0 + -6*v0 + 3*v2 -14 <= 0; value: -8 + 2*v0 + 2*v1 + 6*v3 -56 < 0; value: -22 0: 1 3 4 5 1: 5 2: 1 3 4 3: 1 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + 4*v0 -1*v2 + v3 -13 < 0; value: -8 + <= 0; value: 0 + 4*v0 -5*v2 -3*v3 + 31 = 0; value: 0 + -6*v0 + 3*v2 -14 <= 0; value: -8 + 2*v0 + 2*v1 + 6*v3 -56 < 0; value: -22 0: 1 3 4 5 1: 5 2: 1 3 4 3: 1 3 5 0: 1 -> 1 1: 1 -> 1 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 2*v1 -3*v2 + v3 + 5 = 0; value: 0 + -2*v0 + 3*v3 + 2 = 0; value: 0 + -6*v3 + 2 < 0; value: -10 + -3*v0 + 3*v1 <= 0; value: 0 + 3*v1 -4*v2 + 8 <= 0; value: 0 0: 2 4 1: 1 4 5 2: 1 5 3: 1 2 3 optimal: oo + 8/3*v0 -3*v2 + 13/3 <= 0; value: 0 - 2*v1 -3*v2 + v3 + 5 = 0; value: 0 - -2*v0 + 3*v3 + 2 = 0; value: 0 + -4*v0 + 6 < 0; value: -10 + -4*v0 + 9/2*v2 -13/2 <= 0; value: 0 + -1*v0 + 1/2*v2 + 3/2 <= 0; value: 0 0: 2 4 3 5 1: 1 4 5 2: 1 5 4 3: 1 2 3 4 5 0: 4 -> 4 1: 4 -> 4 2: 5 -> 5 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 <= 0; value: 0 + 5*v0 + v1 -5*v2 + 7 <= 0; value: -2 + -2*v0 -3*v1 + 3 <= 0; value: 0 + -3*v0 -5*v1 + v2 + 2 <= 0; value: -1 + -6*v1 -3*v3 + 15 = 0; value: 0 0: 1 2 3 4 1: 2 3 4 5 2: 2 4 3: 5 optimal: 17/9 + + 17/9 <= 0; value: 17/9 + -35/6 <= 0; value: -35/6 - -5*v2 + 13/4*v3 -7/4 <= 0; value: 0 - -2*v0 -3*v1 + 3 <= 0; value: 0 - 18/13*v2 -47/13 <= 0; value: 0 - 4*v0 -3*v3 + 9 = 0; value: 0 0: 1 2 3 4 5 1: 2 3 4 5 2: 2 4 1 3: 5 4 2 1 0: 0 -> 7/6 1: 1 -> 2/9 2: 2 -> 47/18 3: 3 -> 41/9 + 2*v0 -2*v1 <= 0; value: 0 + -5*v2 + 4*v3 + 1 < 0; value: -11 + v0 + v2 -3*v3 -2 < 0; value: -1 + 2*v3 -4 = 0; value: 0 + 5*v0 -2*v2 -13 < 0; value: -6 + -3*v1 + 3*v3 <= 0; value: -3 0: 2 4 1: 5 2: 1 2 4 3: 1 2 3 5 optimal: (30/7 -e*1) + + 30/7 < 0; value: 30/7 + -72/7 < 0; value: -72/7 - v0 + v2 -8 < 0; value: -4/7 - 2*v3 -4 = 0; value: 0 - -7*v2 + 27 <= 0; value: 0 - -3*v1 + 3*v3 <= 0; value: 0 0: 2 4 1: 5 2: 1 2 4 3: 1 2 3 5 0: 3 -> 25/7 1: 3 -> 2 2: 4 -> 27/7 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + -2*v1 -1*v3 -1 <= 0; value: -8 + 6*v3 -44 <= 0; value: -26 + -3*v2 -2*v3 + 13 <= 0; value: -8 + -4*v1 -4*v3 + 15 < 0; value: -5 + -3*v0 + v1 -5*v2 + 29 <= 0; value: -6 0: 5 1: 1 4 5 2: 3 5 3: 1 2 3 4 optimal: oo + 2*v0 + 43/6 < 0; value: 91/6 + -7/6 <= 0; value: -7/6 - 6*v3 -44 <= 0; value: 0 + -3*v2 -5/3 <= 0; value: -50/3 - -4*v1 -4*v3 + 15 < 0; value: -4 + -3*v0 -5*v2 + 305/12 < 0; value: -139/12 0: 5 1: 1 4 5 2: 3 5 3: 1 2 3 4 5 0: 4 -> 4 1: 2 -> -31/12 2: 5 -> 5 3: 3 -> 22/3 + 2*v0 -2*v1 <= 0; value: 4 + 2*v1 -5*v3 -9 <= 0; value: -5 + 6*v0 -49 <= 0; value: -25 + 5*v0 -6*v2 + v3 -45 <= 0; value: -25 + -3*v0 -6*v1 + 3*v2 + 17 <= 0; value: -7 + v0 -6*v1 -3*v3 < 0; value: -8 0: 2 3 4 5 1: 1 4 5 2: 3 4 3: 1 3 5 optimal: (1177/63 -e*1) + + 1177/63 < 0; value: 1177/63 + -4625/126 < 0; value: -4625/126 - 6*v0 -49 <= 0; value: 0 - -3*v0 + 7*v3 -11 <= 0; value: 0 - -3*v0 -6*v1 + 3*v2 + 17 <= 0; value: 0 - 4*v0 -3*v2 -3*v3 -17 < 0; value: -19/84 0: 2 3 4 5 1 1: 1 4 5 2: 3 4 5 1 3: 1 3 5 0: 4 -> 49/6 1: 2 -> -191/168 2: 0 -> 19/84 3: 0 -> 71/14 + 2*v0 -2*v1 <= 0; value: 10 + 5*v0 -1*v1 -5*v2 -40 <= 0; value: -25 + 2*v0 + 2*v1 -2*v3 -19 <= 0; value: -9 + 5*v2 -2*v3 -27 <= 0; value: -17 + -3*v0 + v3 <= 0; value: -15 + 5*v3 <= 0; value: 0 0: 1 2 4 1: 1 2 2: 1 3 3: 2 3 4 5 optimal: 134 + + 134 <= 0; value: 134 - 5*v0 -1*v1 -5*v2 -40 <= 0; value: 0 + -153 <= 0; value: -153 - 5*v2 -2*v3 -27 <= 0; value: 0 - -3*v0 <= 0; value: 0 - 5*v3 <= 0; value: 0 0: 1 2 4 1: 1 2 2: 1 3 2 3: 2 3 4 5 0: 5 -> 0 1: 0 -> -67 2: 2 -> 27/5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 5*v1 -6*v2 + 18 = 0; value: 0 + -2*v0 + v2 -5 <= 0; value: -12 + -1*v1 + 2*v2 -1*v3 -6 <= 0; value: 0 + -4*v2 -6*v3 + 12 = 0; value: 0 + -5*v0 + 3*v3 + 25 = 0; value: 0 0: 2 5 1: 1 3 2: 1 2 3 4 3: 3 4 5 optimal: oo + 8*v0 -30 <= 0; value: 10 - 5*v1 -6*v2 + 18 = 0; value: 0 + -9/2*v0 + 21/2 <= 0; value: -12 + -11/3*v0 + 55/3 <= 0; value: 0 - -4*v2 -6*v3 + 12 = 0; value: 0 - -5*v0 + 3*v3 + 25 = 0; value: 0 0: 2 5 3 1: 1 3 2: 1 2 3 4 3: 3 4 5 2 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 2 + 5*v1 -4*v2 -2 <= 0; value: -1 + -1*v1 + 1 <= 0; value: 0 + 5*v0 + 6*v2 -22 <= 0; value: -6 + -6*v0 + 10 <= 0; value: -2 + -4*v1 + 5*v2 -2 < 0; value: -1 0: 3 4 1: 1 2 5 2: 1 3 5 3: optimal: 5 + + 5 <= 0; value: 5 - -4*v2 + 3 <= 0; value: 0 - -1*v1 + 1 <= 0; value: 0 - 5*v0 + 6*v2 -22 <= 0; value: 0 + -11 <= 0; value: -11 + -9/4 < 0; value: -9/4 0: 3 4 1: 1 2 5 2: 1 3 5 4 3: 0: 2 -> 7/2 1: 1 -> 1 2: 1 -> 3/4 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -6*v3 + 15 <= 0; value: -20 + 5*v0 -5 = 0; value: 0 + -6*v2 <= 0; value: 0 + 4*v2 <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -1 0: 1 2 5 1: 2: 3 4 5 3: 1 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 -6*v3 + 15 <= 0; value: -20 + 5*v0 -5 = 0; value: 0 + -6*v2 <= 0; value: 0 + 4*v2 <= 0; value: 0 + 4*v0 -1*v2 -5 <= 0; value: -1 0: 1 2 5 1: 2: 3 4 5 3: 1 0: 1 -> 1 1: 0 -> 0 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + 2*v3 -10 = 0; value: 0 + -2*v0 -1*v1 + 5*v3 -30 <= 0; value: -11 + -3*v1 -5*v2 + 12 = 0; value: 0 + 2*v0 -5 <= 0; value: -3 + 2*v1 -3*v3 + 7 = 0; value: 0 0: 2 4 1: 2 3 5 2: 3 3: 1 2 5 optimal: -3 + -3 <= 0; value: -3 - 2*v3 -10 = 0; value: 0 + -14 <= 0; value: -14 - -3*v1 -5*v2 + 12 = 0; value: 0 - 2*v0 -5 <= 0; value: 0 - -10/3*v2 -3*v3 + 15 = 0; value: 0 0: 2 4 1: 2 3 5 2: 3 2 5 3: 1 2 5 0: 1 -> 5/2 1: 4 -> 4 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 + 6*v3 -17 <= 0; value: -7 + 2*v0 + v3 -21 <= 0; value: -12 + v0 + 5*v2 -36 <= 0; value: -19 + -4*v1 -1*v2 -3 < 0; value: -26 + -2*v0 -1*v1 + 6*v3 -21 = 0; value: 0 0: 2 3 5 1: 1 4 5 2: 3 4 3: 1 2 5 optimal: 45/22 + + 45/22 <= 0; value: 45/22 - 8*v0 -18*v3 + 67 <= 0; value: 0 - 22/9*v0 -311/18 <= 0; value: 0 + 5*v2 -1273/44 <= 0; value: -613/44 + -1*v2 -299/11 < 0; value: -332/11 - -2*v0 -1*v1 + 6*v3 -21 = 0; value: 0 0: 2 3 5 4 1 1: 1 4 5 2: 3 4 3: 1 2 5 4 0: 2 -> 311/44 1: 5 -> 133/22 2: 3 -> 3 3: 5 -> 151/22 + 2*v0 -2*v1 <= 0; value: 0 + 5*v1 + 6*v3 -31 = 0; value: 0 + 4*v2 -5*v3 -20 < 0; value: -13 + -6*v0 -5*v1 -6*v2 + 40 <= 0; value: -33 + 6*v0 + 2*v1 -90 <= 0; value: -50 + -4*v1 -3*v2 + 17 <= 0; value: -12 0: 3 4 1: 1 3 4 5 2: 2 3 5 3: 1 2 optimal: (1742/21 -e*1) + + 1742/21 < 0; value: 1742/21 - 5*v1 + 6*v3 -31 = 0; value: 0 - 7/8*v2 -225/8 < 0; value: -7/8 + -1283/7 < 0; value: -1283/7 - 6*v0 -908/7 < 0; value: -6 - -3*v2 + 24/5*v3 -39/5 <= 0; value: 0 0: 3 4 1: 1 3 4 5 2: 2 3 5 4 3: 1 2 3 5 4 0: 5 -> 433/21 1: 5 -> -535/28 2: 3 -> 218/7 3: 1 -> 1181/56 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 -4*v3 + 11 < 0; value: -21 + -5*v0 + v2 -4*v3 + 13 < 0; value: -3 + 4*v0 + 6*v3 -22 = 0; value: 0 + -3*v0 + 3*v1 -6*v3 -4 <= 0; value: -10 + 3*v0 + 3*v1 + v2 -19 = 0; value: 0 0: 2 3 4 5 1: 1 4 5 2: 2 5 3: 1 2 3 4 optimal: (161/44 -e*1) + + 161/44 < 0; value: 161/44 - 88/9*v0 -241/9 <= 0; value: 0 - -5*v0 + v2 -4*v3 + 13 < 0; value: -1 - 4*v0 + 6*v3 -22 = 0; value: 0 + -1807/88 < 0; value: -1807/88 - 3*v0 + 3*v1 + v2 -19 = 0; value: 0 0: 2 3 4 5 1 1: 1 4 5 2: 2 5 1 4 3: 1 2 3 4 0: 1 -> 241/88 1: 5 -> 41/33 2: 1 -> 621/88 3: 3 -> 81/44 + 2*v0 -2*v1 <= 0; value: -10 + -2*v0 + v1 -6*v2 -22 <= 0; value: -47 + v0 + 5*v1 -25 = 0; value: 0 + -1*v1 -2*v2 + 5 <= 0; value: -10 + 2*v2 + 5*v3 -80 < 0; value: -50 + 5*v0 + 4*v1 + 2*v3 -65 <= 0; value: -37 0: 1 2 5 1: 1 2 3 5 2: 1 3 4 3: 4 5 optimal: oo + 24*v2 -10 <= 0; value: 110 + -28*v2 -17 <= 0; value: -157 - v0 + 5*v1 -25 = 0; value: 0 - -2*v2 -2/21*v3 + 15/7 <= 0; value: 0 + -103*v2 + 65/2 < 0; value: -965/2 - 21/5*v0 + 2*v3 -45 <= 0; value: 0 0: 1 2 5 3 1: 1 2 3 5 2: 1 3 4 3: 4 5 3 1 0: 0 -> 50 1: 5 -> -5 2: 5 -> 5 3: 4 -> -165/2 + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -4*v3 -22 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -25 <= 0; value: 0 + -3*v0 -2*v2 -9 <= 0; value: -24 + -5*v0 + 13 <= 0; value: -12 0: 1 3 4 5 1: 2: 4 3: 1 2 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 6*v0 -4*v3 -22 < 0; value: -8 + -6*v3 + 24 = 0; value: 0 + 5*v0 -25 <= 0; value: 0 + -3*v0 -2*v2 -9 <= 0; value: -24 + -5*v0 + 13 <= 0; value: -12 0: 1 3 4 5 1: 2: 4 3: 1 2 0: 5 -> 5 1: 2 -> 2 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 5*v3 + 5 <= 0; value: 0 + 4*v0 + 2*v3 -6 = 0; value: 0 + -5*v0 -1*v3 + 4 < 0; value: -2 + -4*v2 + 5*v3 + 11 <= 0; value: -4 + 6*v0 -3*v3 -3 = 0; value: 0 0: 2 3 5 1: 2: 1 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -2*v2 + 5*v3 + 5 <= 0; value: 0 + 4*v0 + 2*v3 -6 = 0; value: 0 + -5*v0 -1*v3 + 4 < 0; value: -2 + -4*v2 + 5*v3 + 11 <= 0; value: -4 + 6*v0 -3*v3 -3 = 0; value: 0 0: 2 3 5 1: 2: 1 4 3: 1 2 3 4 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 4 + v0 -4*v1 + 4 = 0; value: 0 + -3*v0 + 6*v1 -6*v3 + 11 < 0; value: -13 + -3*v1 + 2*v3 -3 <= 0; value: -1 + v3 -4 = 0; value: 0 + -1*v1 -1*v2 + 7 = 0; value: 0 0: 1 2 1: 1 2 3 5 2: 5 3: 2 3 4 optimal: oo + -6*v2 + 34 <= 0; value: 4 - v0 -4*v1 + 4 = 0; value: 0 + 6*v2 -6*v3 -19 < 0; value: -13 + 3*v2 + 2*v3 -24 <= 0; value: -1 + v3 -4 = 0; value: 0 - -1/4*v0 -1*v2 + 6 = 0; value: 0 0: 1 2 3 5 1: 1 2 3 5 2: 5 2 3 3: 2 3 4 0: 4 -> 4 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v0 + 2*v1 -4 = 0; value: 0 + 5*v0 -4*v1 -4*v2 + 7 = 0; value: 0 + 2*v0 -3 <= 0; value: -1 + -6*v0 + 2*v3 <= 0; value: -4 + 5*v2 -2*v3 -21 <= 0; value: -13 0: 1 2 3 4 1: 1 2 2: 2 5 3: 4 5 optimal: 2 + + 2 <= 0; value: 2 - 2*v0 + 2*v1 -4 = 0; value: 0 - 9*v0 -4*v2 -1 = 0; value: 0 - 8/9*v2 -25/9 <= 0; value: 0 + 2*v3 -9 <= 0; value: -7 + -2*v3 -43/8 <= 0; value: -59/8 0: 1 2 3 4 1: 1 2 2: 2 5 3 4 3: 4 5 0: 1 -> 3/2 1: 1 -> 1/2 2: 2 -> 25/8 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + 4*v0 -8 < 0; value: -4 + 6*v0 -3*v1 + 2*v2 <= 0; value: 0 + v0 + 6*v2 -1*v3 -36 <= 0; value: -20 + 4*v1 -1*v2 -13 = 0; value: 0 + v2 -4*v3 < 0; value: -9 0: 1 2 3 1: 2 4 2: 2 3 4 5 3: 3 5 optimal: (-8/5 -e*1) + -8/5 < 0; value: -8/5 - 4*v0 -8 < 0; value: -2 - 6*v0 -3*v1 + 2*v2 <= 0; value: 0 + -1*v3 -224/5 < 0; value: -239/5 - 8*v0 + 5/3*v2 -13 = 0; value: 0 + -4*v3 -9/5 < 0; value: -69/5 0: 1 2 3 4 5 1: 2 4 2: 2 3 4 5 3: 3 5 0: 1 -> 3/2 1: 4 -> 17/5 2: 3 -> 3/5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -4 + -5*v0 -6*v3 + 10 <= 0; value: -30 + -6*v1 -9 < 0; value: -33 + -5*v0 -4*v1 + 26 <= 0; value: 0 + -2*v2 + 10 = 0; value: 0 + 3*v0 -6*v2 -17 <= 0; value: -41 0: 1 3 5 1: 2 3 2: 4 5 3: 1 optimal: (79/5 -e*1) + + 79/5 < 0; value: 79/5 + -6*v3 -22 < 0; value: -52 - 15/2*v0 -48 < 0; value: -15/2 - -5*v0 -4*v1 + 26 <= 0; value: 0 + -2*v2 + 10 = 0; value: 0 + -6*v2 + 11/5 <= 0; value: -139/5 0: 1 3 5 2 1: 2 3 2: 4 5 3: 1 0: 2 -> 27/5 1: 4 -> -1/4 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + 4*v1 -2*v3 -20 < 0; value: -8 + 5*v2 -22 <= 0; value: -12 + -3*v0 + 4*v3 + 4 <= 0; value: 0 + -2*v0 -4*v1 + 6*v2 -2 <= 0; value: -14 + -5*v0 -2*v2 + 21 < 0; value: -3 0: 3 4 5 1: 1 4 2: 2 4 5 3: 1 3 optimal: oo + 21/2*v0 -61/2 < 0; value: 23/2 + -17*v0 -2*v3 + 41 < 0; value: -31 + -25/2*v0 + 61/2 < 0; value: -39/2 + -3*v0 + 4*v3 + 4 <= 0; value: 0 - -2*v0 -4*v1 + 6*v2 -2 <= 0; value: 0 - -5*v0 -2*v2 + 21 < 0; value: -3/2 0: 3 4 5 1 2 1: 1 4 2: 2 4 5 1 3: 1 3 0: 4 -> 4 1: 4 -> -5/8 2: 2 -> 5/4 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 0 + <= 0; value: 0 + v0 -1*v3 = 0; value: 0 + -6*v1 + v3 -8 < 0; value: -33 + 6*v2 + 3*v3 -39 = 0; value: 0 + -2*v3 -2 < 0; value: -12 0: 2 1: 3 2: 4 3: 2 3 4 5 optimal: oo + -10/3*v2 + 73/3 < 0; value: 11 + <= 0; value: 0 - v0 -1*v3 = 0; value: 0 - -6*v1 + v3 -8 < 0; value: -6 - 3*v0 + 6*v2 -39 = 0; value: 0 + 4*v2 -28 < 0; value: -12 0: 2 4 5 1: 3 2: 4 5 3: 2 3 4 5 0: 5 -> 5 1: 5 -> 1/2 2: 4 -> 4 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 0 + -6*v1 + 3*v2 -9 = 0; value: 0 + 2*v0 + 6*v1 -4*v3 -7 <= 0; value: -19 + 3*v1 + 4*v2 -12 = 0; value: 0 + -4*v3 -2 <= 0; value: -14 + -6*v1 <= 0; value: 0 0: 2 1: 1 2 3 5 2: 1 3 3: 2 4 optimal: oo + 4*v3 + 7 <= 0; value: 19 - -6*v1 + 3*v2 -9 = 0; value: 0 - 2*v0 -4*v3 -7 <= 0; value: 0 - 11/2*v2 -33/2 = 0; value: 0 + -4*v3 -2 <= 0; value: -14 + <= 0; value: 0 0: 2 1: 1 2 3 5 2: 1 3 5 2 3: 2 4 0: 0 -> 19/2 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -4*v0 -5*v1 -8 <= 0; value: -39 + 5*v0 + v1 -25 <= 0; value: -2 + -3*v1 + 5*v3 -1 = 0; value: 0 + -2*v0 + 2*v2 + 6*v3 -25 <= 0; value: -13 + -5*v1 + 4*v2 -1 <= 0; value: 0 0: 1 2 4 1: 1 2 3 5 2: 4 5 3: 3 4 optimal: 26 + + 26 <= 0; value: 26 - -4*v0 -4*v2 -7 <= 0; value: 0 - 21/5*v0 -133/5 <= 0; value: 0 - -3*v1 + 5*v3 -1 = 0; value: 0 + -2299/30 <= 0; value: -2299/30 - 4*v2 -25/3*v3 + 2/3 <= 0; value: 0 0: 1 2 4 1: 1 2 3 5 2: 4 5 1 2 3: 3 4 1 5 2 0: 4 -> 19/3 1: 3 -> -20/3 2: 4 -> -97/12 3: 2 -> -19/5 + 2*v0 -2*v1 <= 0; value: 10 + 2*v1 + 4*v3 -16 <= 0; value: -4 + -6*v3 -17 < 0; value: -35 + 4*v2 -27 < 0; value: -15 + -2*v2 -5*v3 -8 < 0; value: -29 + 5*v1 + v2 -6 <= 0; value: -3 0: 1: 1 5 2: 3 4 5 3: 1 2 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 10 + 2*v1 + 4*v3 -16 <= 0; value: -4 + -6*v3 -17 < 0; value: -35 + 4*v2 -27 < 0; value: -15 + -2*v2 -5*v3 -8 < 0; value: -29 + 5*v1 + v2 -6 <= 0; value: -3 0: 1: 1 5 2: 3 4 5 3: 1 2 4 0: 5 -> 5 1: 0 -> 0 2: 3 -> 3 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 8 + 5*v0 + 6*v2 -109 < 0; value: -71 + -6*v0 -6*v1 <= 0; value: -24 + 4*v0 + 2*v2 -61 <= 0; value: -39 + 4*v0 + 4*v1 -18 <= 0; value: -2 + 5*v0 + 2*v1 + 3*v3 -26 <= 0; value: 0 0: 1 2 3 4 5 1: 2 4 5 2: 1 3 3: 5 optimal: oo + -2*v2 + 61 <= 0; value: 55 + 7/2*v2 -131/4 < 0; value: -89/4 - -6*v0 -6*v1 <= 0; value: 0 - 2*v2 -4*v3 -79/3 <= 0; value: 0 + -18 <= 0; value: -18 - 3*v0 + 3*v3 -26 <= 0; value: 0 0: 1 2 3 4 5 1: 2 4 5 2: 1 3 3: 5 1 3 0: 4 -> 55/4 1: 0 -> -55/4 2: 3 -> 3 3: 2 -> -61/12 + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 = 0; value: 0 + -1*v2 -4*v3 + 1 <= 0; value: -2 + 3*v2 + 6*v3 -16 <= 0; value: -7 + 4*v1 + 5*v2 -5*v3 -37 <= 0; value: -10 + 6*v3 = 0; value: 0 0: 1: 4 2: 2 3 4 3: 1 2 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -6 + -6*v3 = 0; value: 0 + -1*v2 -4*v3 + 1 <= 0; value: -2 + 3*v2 + 6*v3 -16 <= 0; value: -7 + 4*v1 + 5*v2 -5*v3 -37 <= 0; value: -10 + 6*v3 = 0; value: 0 0: 1: 4 2: 2 3 4 3: 1 2 3 4 5 0: 0 -> 0 1: 3 -> 3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 4 + 3*v0 -6*v1 -6 = 0; value: 0 + -5*v0 + 5*v3 -6 <= 0; value: -16 + -6*v0 -3*v2 -24 <= 0; value: -51 + 4*v2 -20 = 0; value: 0 + v2 -3*v3 -6 < 0; value: -1 0: 1 2 3 1: 1 2: 3 4 5 3: 2 5 optimal: oo + v0 + 2 <= 0; value: 4 - 3*v0 -6*v1 -6 = 0; value: 0 + -5*v0 + 5*v3 -6 <= 0; value: -16 + -6*v0 -3*v2 -24 <= 0; value: -51 + 4*v2 -20 = 0; value: 0 + v2 -3*v3 -6 < 0; value: -1 0: 1 2 3 1: 1 2: 3 4 5 3: 2 5 0: 2 -> 2 1: 0 -> 0 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -10 + -1*v1 + 5 <= 0; value: 0 + -5*v1 + 11 <= 0; value: -14 + 3*v0 -2*v3 -1 <= 0; value: -7 + v0 + 6*v2 -38 <= 0; value: -14 + <= 0; value: 0 0: 3 4 1: 1 2 2: 4 3: 3 optimal: oo + -12*v2 + 66 <= 0; value: 18 - -1*v1 + 5 <= 0; value: 0 + -14 <= 0; value: -14 - 3*v0 -2*v3 -1 <= 0; value: 0 - 6*v2 + 2/3*v3 -113/3 <= 0; value: 0 + <= 0; value: 0 0: 3 4 1: 1 2 2: 4 3: 3 4 0: 0 -> 14 1: 5 -> 5 2: 4 -> 4 3: 3 -> 41/2 + 2*v0 -2*v1 <= 0; value: -2 + -2*v1 + 3*v2 -9 = 0; value: 0 + 2*v0 -1*v2 + 1 = 0; value: 0 + -4*v0 < 0; value: -8 + 2*v1 -3*v2 <= 0; value: -9 + 2*v1 -6 = 0; value: 0 0: 2 3 1: 1 4 5 2: 1 2 4 3: optimal: -2 + -2 <= 0; value: -2 - -2*v1 + 3*v2 -9 = 0; value: 0 - 2*v0 -1*v2 + 1 = 0; value: 0 + -8 < 0; value: -8 + -9 <= 0; value: -9 - 6*v0 -12 = 0; value: 0 0: 2 3 5 1: 1 4 5 2: 1 2 4 5 3: 0: 2 -> 2 1: 3 -> 3 2: 5 -> 5 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 6 + v0 + 4*v3 -7 = 0; value: 0 + 4*v3 -10 <= 0; value: -6 + 2*v3 -3 <= 0; value: -1 + -6*v2 + 6*v3 -5 <= 0; value: -11 + 6*v0 + 3*v2 -24 <= 0; value: 0 0: 1 5 1: 2: 4 5 3: 1 2 3 4 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + v0 + 4*v3 -7 = 0; value: 0 + 4*v3 -10 <= 0; value: -6 + 2*v3 -3 <= 0; value: -1 + -6*v2 + 6*v3 -5 <= 0; value: -11 + 6*v0 + 3*v2 -24 <= 0; value: 0 0: 1 5 1: 2: 4 5 3: 1 2 3 4 0: 3 -> 3 1: 0 -> 0 2: 2 -> 2 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + 3*v1 -6 = 0; value: 0 + -5*v0 + 3*v1 -3*v3 <= 0; value: 0 + 5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 4*v2 + 4*v3 -33 <= 0; value: -21 + -5*v0 + 5*v3 -10 = 0; value: 0 0: 2 3 5 1: 1 2 2: 3 4 3: 2 3 4 5 optimal: oo + -2/11*v2 -42/11 <= 0; value: -4 - 3*v1 -6 = 0; value: 0 + 8/11*v2 -8/11 <= 0; value: 0 - 5*v0 + v2 + 6*v3 -13 = 0; value: 0 + 40/11*v2 -271/11 <= 0; value: -21 - v2 + 11*v3 -23 = 0; value: 0 0: 2 3 5 1: 1 2 2: 3 4 5 2 3: 2 3 4 5 0: 0 -> 0 1: 2 -> 2 2: 1 -> 1 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 4 + 6*v1 -22 < 0; value: -4 + v0 -5*v1 -2*v3 + 18 = 0; value: 0 + -5*v1 + 2*v3 -6 <= 0; value: -13 + 3*v1 + 6*v3 -33 = 0; value: 0 + -3*v2 -5*v3 + 31 <= 0; value: -1 0: 2 1: 1 2 3 4 2: 5 3: 2 3 4 5 optimal: (8 -e*1) + + 8 < 0; value: 8 - 36/5*v2 -152/5 < 0; value: -4/5 - v0 -5*v1 -2*v3 + 18 = 0; value: 0 + -17 < 0; value: -17 - 3/5*v0 + 24/5*v3 -111/5 = 0; value: 0 - 5/8*v0 -3*v2 + 63/8 <= 0; value: 0 0: 2 3 4 1 5 1: 1 2 3 4 2: 5 1 3 3: 2 3 4 5 1 0: 5 -> 107/15 1: 3 -> 53/15 2: 4 -> 37/9 3: 4 -> 56/15 + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -6*v2 -1 < 0; value: -4 + -6*v3 -15 < 0; value: -45 + 4*v0 -5*v2 -8 < 0; value: -4 + 5*v0 -1*v2 -14 <= 0; value: -9 + 4*v1 + 2*v3 -32 <= 0; value: -14 0: 1 3 4 1: 5 2: 1 3 4 3: 2 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -2 + -3*v0 -6*v2 -1 < 0; value: -4 + -6*v3 -15 < 0; value: -45 + 4*v0 -5*v2 -8 < 0; value: -4 + 5*v0 -1*v2 -14 <= 0; value: -9 + 4*v1 + 2*v3 -32 <= 0; value: -14 0: 1 3 4 1: 5 2: 1 3 4 3: 2 5 0: 1 -> 1 1: 2 -> 2 2: 0 -> 0 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -4 + -4*v1 -1*v2 + 3*v3 -6 <= 0; value: -13 + -1*v0 <= 0; value: -1 + 5*v1 + 6*v2 -46 < 0; value: -25 + -1*v2 -1*v3 + 2 <= 0; value: -1 + -3*v0 + 6*v3 -22 <= 0; value: -13 0: 2 5 1: 1 3 2: 1 3 4 3: 1 4 5 optimal: oo + 2*v0 + 92 < 0; value: 94 - -4*v1 -1*v2 + 3*v3 -6 <= 0; value: 0 + -1*v0 <= 0; value: -1 - v2 -46 < 0; value: -1 - -1*v2 -1*v3 + 2 <= 0; value: 0 + -3*v0 -286 < 0; value: -289 0: 2 5 1: 1 3 2: 1 3 4 5 3: 1 4 5 3 0: 1 -> 1 1: 3 -> -45 2: 1 -> 45 3: 2 -> -43 + 2*v0 -2*v1 <= 0; value: -8 + -2*v0 -2*v2 + 5*v3 -51 < 0; value: -31 + 4*v2 -1*v3 + 4 = 0; value: 0 + -5*v0 + 3*v1 -12 <= 0; value: 0 + -3*v2 -6*v3 + 24 = 0; value: 0 + -4*v0 -1*v3 -3 <= 0; value: -7 0: 1 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -8 + -2*v0 -2*v2 + 5*v3 -51 < 0; value: -31 + 4*v2 -1*v3 + 4 = 0; value: 0 + -5*v0 + 3*v1 -12 <= 0; value: 0 + -3*v2 -6*v3 + 24 = 0; value: 0 + -4*v0 -1*v3 -3 <= 0; value: -7 0: 1 3 5 1: 3 2: 1 2 4 3: 1 2 4 5 0: 0 -> 0 1: 4 -> 4 2: 0 -> 0 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -4 + 3*v3 -29 <= 0; value: -14 + -4*v0 -6*v1 + 4*v2 <= 0; value: -28 + -1*v2 + 1 = 0; value: 0 + -1*v1 + 5*v2 -1 <= 0; value: 0 + -6*v0 + 2*v2 + 10 = 0; value: 0 0: 2 5 1: 2 4 2: 2 3 4 5 3: 1 optimal: -4 + -4 <= 0; value: -4 + 3*v3 -29 <= 0; value: -14 + -28 <= 0; value: -28 - -1*v2 + 1 = 0; value: 0 - -1*v1 + 5*v2 -1 <= 0; value: 0 - -6*v0 + 12 = 0; value: 0 0: 2 5 1: 2 4 2: 2 3 4 5 3: 1 0: 2 -> 2 1: 4 -> 4 2: 1 -> 1 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 3*v3 -16 <= 0; value: -9 + -5*v0 -6*v1 + 14 < 0; value: -3 + -4*v0 -2*v3 -8 < 0; value: -20 + -1*v0 + 5*v1 -3*v3 + 1 <= 0; value: -2 + 5*v1 + 2*v2 -6*v3 + 2 <= 0; value: -2 0: 1 2 3 4 1: 2 4 5 2: 5 3: 1 3 4 5 optimal: oo + 11/3*v0 -14/3 < 0; value: -1 + -5*v0 + 3*v3 -16 <= 0; value: -9 - -5*v0 -6*v1 + 14 < 0; value: -3/2 + -4*v0 -2*v3 -8 < 0; value: -20 + -31/6*v0 -3*v3 + 38/3 < 0; value: -9/2 + -25/6*v0 + 2*v2 -6*v3 + 41/3 < 0; value: -9/2 0: 1 2 3 4 5 1: 2 4 5 2: 5 3: 1 3 4 5 0: 1 -> 1 1: 2 -> 7/4 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + 2*v2 + v3 -9 < 0; value: -3 + -2*v0 -2*v1 + 2 <= 0; value: -2 + -6*v0 + 2*v2 -2 < 0; value: -6 + 4*v0 -5*v1 + 1 <= 0; value: 0 + -2*v1 -1 < 0; value: -3 0: 2 3 4 1: 2 4 5 2: 1 3 3: 1 optimal: oo + 2/5*v0 -2/5 <= 0; value: 0 + 2*v2 + v3 -9 < 0; value: -3 + -18/5*v0 + 8/5 <= 0; value: -2 + -6*v0 + 2*v2 -2 < 0; value: -6 - 4*v0 -5*v1 + 1 <= 0; value: 0 + -8/5*v0 -7/5 < 0; value: -3 0: 2 3 4 5 1: 2 4 5 2: 1 3 3: 1 0: 1 -> 1 1: 1 -> 1 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -6 + 6*v0 -5*v2 -1*v3 <= 0; value: -29 + v0 + 4*v1 + 2*v3 -59 <= 0; value: -39 + 6*v1 -5*v2 + 5 <= 0; value: -2 + v0 -1*v1 + 3 = 0; value: 0 + 4*v2 -53 <= 0; value: -33 0: 1 2 4 1: 2 3 4 2: 1 3 5 3: 1 2 optimal: -6 + -6 <= 0; value: -6 + 6*v0 -5*v2 -1*v3 <= 0; value: -29 + 5*v0 + 2*v3 -47 <= 0; value: -39 + 6*v0 -5*v2 + 23 <= 0; value: -2 - v0 -1*v1 + 3 = 0; value: 0 + 4*v2 -53 <= 0; value: -33 0: 1 2 4 3 1: 2 3 4 2: 1 3 5 3: 1 2 0: 0 -> 0 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 4 + 6*v0 + 5*v1 -15 <= 0; value: -3 + v0 -3*v3 -3 < 0; value: -1 + 4*v2 -38 <= 0; value: -22 + 2*v0 -4*v1 -5*v3 -7 <= 0; value: -3 + -2*v1 -4*v2 -7 <= 0; value: -23 0: 1 2 4 1: 1 4 5 2: 3 5 3: 2 4 optimal: 175/2 + + 175/2 <= 0; value: 175/2 - 6*v0 -255/2 <= 0; value: 0 + -1141/20 < 0; value: -1141/20 - 4*v2 -38 <= 0; value: 0 - 2*v0 -4*v1 -5*v3 -7 <= 0; value: 0 - -1*v0 -4*v2 + 5/2*v3 -7/2 <= 0; value: 0 0: 1 2 4 5 1: 1 4 5 2: 3 5 2 1 3: 2 4 5 1 0: 2 -> 85/4 1: 0 -> -45/2 2: 4 -> 19/2 3: 0 -> 251/10 + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 2*v3 -4 < 0; value: -2 + 6*v1 + 2*v3 -92 <= 0; value: -60 + 5*v0 -15 <= 0; value: 0 + 4*v0 + 2*v2 -4*v3 -18 < 0; value: -10 + 3*v0 + 4*v2 + 2*v3 -12 < 0; value: -1 0: 3 4 5 1: 2 2: 1 4 5 3: 1 2 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: -4 + 6*v2 + 2*v3 -4 < 0; value: -2 + 6*v1 + 2*v3 -92 <= 0; value: -60 + 5*v0 -15 <= 0; value: 0 + 4*v0 + 2*v2 -4*v3 -18 < 0; value: -10 + 3*v0 + 4*v2 + 2*v3 -12 < 0; value: -1 0: 3 4 5 1: 2 2: 1 4 5 3: 1 2 4 5 0: 3 -> 3 1: 5 -> 5 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 + 4*v3 -31 < 0; value: -19 + 4*v0 -4*v3 + 6 <= 0; value: -2 + 3*v0 + 3*v2 + 5*v3 -48 <= 0; value: -30 + -1*v0 -6*v1 + 6*v3 + 12 <= 0; value: -1 + -4*v1 + 20 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 3 3: 1 2 3 4 optimal: -32/5 + -32/5 <= 0; value: -32/5 + 3*v2 -89/5 < 0; value: -89/5 - 4*v0 -4*v3 + 6 <= 0; value: 0 + 3*v2 -261/10 <= 0; value: -261/10 - 5*v3 -33/2 <= 0; value: 0 - -4*v1 + 20 = 0; value: 0 0: 2 3 4 1: 4 5 2: 1 3 3: 1 2 3 4 0: 1 -> 9/5 1: 5 -> 5 2: 0 -> 0 3: 3 -> 33/10 + 2*v0 -2*v1 <= 0; value: 8 + 4*v2 + 4*v3 -59 < 0; value: -27 + -5*v0 + 4*v1 -1*v3 + 25 = 0; value: 0 + -3*v1 -2 < 0; value: -5 + v0 + 6*v1 + 3*v2 -59 <= 0; value: -36 + -4*v1 + v2 = 0; value: 0 0: 2 4 1: 2 3 4 5 2: 1 4 5 3: 1 2 optimal: (430/3 -e*1) + + 430/3 < 0; value: 430/3 + -4201/3 < 0; value: -4201/3 - -5*v0 + 4*v1 -1*v3 + 25 = 0; value: 0 - -3/4*v2 -2 < 0; value: -3/4 - v0 -71 < 0; value: -1 - -5*v0 + v2 -1*v3 + 25 = 0; value: 0 0: 2 4 3 5 1 1: 2 3 4 5 2: 1 4 5 3 3: 1 2 3 5 4 0: 5 -> 70 1: 1 -> -5/12 2: 4 -> -5/3 3: 4 -> -980/3 + 2*v0 -2*v1 <= 0; value: 2 + 2*v2 -4*v3 -5 <= 0; value: -1 + 3*v1 -12 = 0; value: 0 + -4*v0 + v2 + 11 <= 0; value: -5 + -4*v1 <= 0; value: -16 + -3*v2 + 6*v3 -1 < 0; value: -7 0: 3 1: 2 4 2: 1 3 5 3: 1 5 optimal: oo + 2*v0 -8 <= 0; value: 2 + 2*v2 -4*v3 -5 <= 0; value: -1 - 3*v1 -12 = 0; value: 0 + -4*v0 + v2 + 11 <= 0; value: -5 + -16 <= 0; value: -16 + -3*v2 + 6*v3 -1 < 0; value: -7 0: 3 1: 2 4 2: 1 3 5 3: 1 5 0: 5 -> 5 1: 4 -> 4 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -4 + -2*v1 + 4 = 0; value: 0 + -5*v0 -3*v1 -4*v3 -20 <= 0; value: -42 + 3*v0 + 4*v2 -2*v3 -14 <= 0; value: -2 + 2*v2 -25 <= 0; value: -15 + 3*v3 -12 = 0; value: 0 0: 2 3 1: 1 2 2: 3 4 3: 2 3 5 optimal: oo + -8/3*v2 + 32/3 <= 0; value: -8/3 - -2*v1 + 4 = 0; value: 0 + 20/3*v2 -236/3 <= 0; value: -136/3 - 3*v0 + 4*v2 -2*v3 -14 <= 0; value: 0 + 2*v2 -25 <= 0; value: -15 - 3*v3 -12 = 0; value: 0 0: 2 3 1: 1 2 2: 3 4 2 3: 2 3 5 0: 0 -> 2/3 1: 2 -> 2 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -8 + 3*v2 + 5*v3 -23 = 0; value: 0 + 4*v0 -5*v2 -4 < 0; value: -9 + 6*v1 -2*v3 -17 <= 0; value: -1 + -4*v1 + 6*v2 + 8 <= 0; value: -2 + -5*v1 -6*v3 + 22 <= 0; value: -22 0: 2 1: 3 4 5 2: 1 2 4 3: 1 3 5 optimal: (0 -e*1) + < 0; value: 0 - 3*v2 + 5*v3 -23 = 0; value: 0 - 4*v0 + 25/3*v3 -127/3 < 0; value: -25/3 + -55 < 0; value: -55 - -4*v1 + 6*v2 + 8 <= 0; value: 0 - -78/25*v0 -312/25 <= 0; value: 0 0: 2 5 3 1: 3 4 5 2: 1 2 4 5 3 3: 1 3 5 2 0: 0 -> -4 1: 4 -> -3/2 2: 1 -> -7/3 3: 4 -> 6 + 2*v0 -2*v1 <= 0; value: 6 + 4*v1 -14 <= 0; value: -6 + -2*v2 + 5*v3 -15 <= 0; value: -8 + -4*v3 + 12 = 0; value: 0 + -1*v2 -1 <= 0; value: -5 + 3*v1 -2*v3 <= 0; value: 0 0: 1: 1 5 2: 2 4 3: 2 3 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 6 + 4*v1 -14 <= 0; value: -6 + -2*v2 + 5*v3 -15 <= 0; value: -8 + -4*v3 + 12 = 0; value: 0 + -1*v2 -1 <= 0; value: -5 + 3*v1 -2*v3 <= 0; value: 0 0: 1: 1 5 2: 2 4 3: 2 3 5 0: 5 -> 5 1: 2 -> 2 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -1*v0 -1*v1 + 7 < 0; value: -1 + 3*v0 -12 = 0; value: 0 + -1*v0 -1*v2 + 1 < 0; value: -3 + -4*v1 -4*v3 + 20 = 0; value: 0 + 6*v0 -4*v2 -29 < 0; value: -5 0: 1 2 3 5 1: 1 4 2: 3 5 3: 4 optimal: (2 -e*1) + + 2 < 0; value: 2 - -1*v0 + v3 + 2 < 0; value: -1/2 - 3*v0 -12 = 0; value: 0 + -1*v2 -3 < 0; value: -3 - -4*v1 -4*v3 + 20 = 0; value: 0 + -4*v2 -5 < 0; value: -5 0: 1 2 3 5 1: 1 4 2: 3 5 3: 4 1 0: 4 -> 4 1: 4 -> 7/2 2: 0 -> 0 3: 1 -> 3/2 + 2*v0 -2*v1 <= 0; value: -6 + -5*v1 + 5*v2 + 2*v3 + 23 = 0; value: 0 + 5*v0 -19 <= 0; value: -9 + v1 + 3*v3 -12 <= 0; value: -4 + -2*v2 <= 0; value: 0 + 5*v0 -6*v2 -24 < 0; value: -14 0: 2 5 1: 1 3 2: 1 4 5 3: 1 3 optimal: oo + 2*v0 -2*v2 -4/5*v3 -46/5 <= 0; value: -6 - -5*v1 + 5*v2 + 2*v3 + 23 = 0; value: 0 + 5*v0 -19 <= 0; value: -9 + v2 + 17/5*v3 -37/5 <= 0; value: -4 + -2*v2 <= 0; value: 0 + 5*v0 -6*v2 -24 < 0; value: -14 0: 2 5 1: 1 3 2: 1 4 5 3 3: 1 3 0: 2 -> 2 1: 5 -> 5 2: 0 -> 0 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 0 + v1 + 6*v3 -41 < 0; value: -14 + -2*v0 -5*v3 + 26 = 0; value: 0 + <= 0; value: 0 + -5*v0 + 2*v1 + 9 <= 0; value: 0 + 2*v1 -1*v2 -1 = 0; value: 0 0: 2 4 1: 1 4 5 2: 5 3: 1 2 optimal: oo + 2*v0 -1*v2 -1 <= 0; value: 0 + 1/2*v2 + 6*v3 -81/2 < 0; value: -14 + -2*v0 -5*v3 + 26 = 0; value: 0 + <= 0; value: 0 + -5*v0 + v2 + 10 <= 0; value: 0 - 2*v1 -1*v2 -1 = 0; value: 0 0: 2 4 1: 1 4 5 2: 5 1 4 3: 1 2 0: 3 -> 3 1: 3 -> 3 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -5*v0 + 6*v2 -19 <= 0; value: -5 + <= 0; value: 0 + -3*v0 -4*v2 -2 < 0; value: -24 + -1*v2 -6*v3 + 2 < 0; value: -20 + -2*v1 -5*v2 + 26 <= 0; value: 0 0: 1 3 1: 5 2: 1 3 4 5 3: 4 optimal: oo + 37/6*v0 -61/6 <= 0; value: 13/6 - -5*v0 + 6*v2 -19 <= 0; value: 0 + <= 0; value: 0 + -19/3*v0 -44/3 < 0; value: -82/3 + -5/6*v0 -6*v3 -7/6 < 0; value: -125/6 - -2*v1 -5*v2 + 26 <= 0; value: 0 0: 1 3 4 1: 5 2: 1 3 4 5 3: 4 0: 2 -> 2 1: 3 -> 11/12 2: 4 -> 29/6 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 -6*v3 -2 <= 0; value: -14 + -5*v0 + 10 = 0; value: 0 + -4*v0 -2*v1 + 2*v3 + 6 < 0; value: -2 + 4*v3 -18 <= 0; value: -10 + 5*v0 + 4*v1 -21 <= 0; value: -3 0: 2 3 5 1: 3 5 2: 1 3: 1 3 4 optimal: oo + 6*v0 + v2 -16/3 < 0; value: 20/3 - -3*v2 -6*v3 -2 <= 0; value: 0 + -5*v0 + 10 = 0; value: 0 - -4*v0 -2*v1 + 2*v3 + 6 < 0; value: -2 + -2*v2 -58/3 <= 0; value: -58/3 + -3*v0 -2*v2 -31/3 < 0; value: -49/3 0: 2 3 5 1: 3 5 2: 1 4 5 3: 1 3 4 5 0: 2 -> 2 1: 2 -> -1/3 2: 0 -> 0 3: 2 -> -1/3 + 2*v0 -2*v1 <= 0; value: 4 + 6*v2 + 2*v3 -29 <= 0; value: -1 + 5*v1 -3*v3 -4 = 0; value: 0 + 2*v0 + 2*v2 -34 <= 0; value: -18 + -3*v2 -4*v3 + 11 < 0; value: -9 + 3*v0 + 4*v1 + 3*v2 -47 <= 0; value: -15 0: 3 5 1: 2 5 2: 1 3 4 5 3: 1 2 4 optimal: (919/45 -e*1) + + 919/45 < 0; value: 919/45 - 9/2*v2 -47/2 < 0; value: -11/4 - 5*v1 -3*v3 -4 = 0; value: 0 + -44/15 <= 0; value: -44/15 - -3*v2 -4*v3 + 11 < 0; value: -4 - 3*v0 -464/15 <= 0; value: 0 0: 3 5 1: 2 5 2: 1 3 4 5 3: 1 2 4 5 0: 4 -> 464/45 1: 2 -> 39/40 2: 4 -> 83/18 3: 2 -> 7/24 + 2*v0 -2*v1 <= 0; value: 10 + -5*v2 <= 0; value: 0 + 2*v0 + 5*v2 -10 = 0; value: 0 + 4*v0 -2*v1 -3*v2 -32 <= 0; value: -12 + 2*v0 + 2*v1 -22 < 0; value: -12 + -4*v0 -5*v1 + 4*v2 + 7 <= 0; value: -13 0: 2 3 4 5 1: 3 4 5 2: 1 2 3 5 3: optimal: 76/5 + + 76/5 <= 0; value: 76/5 - -5*v2 <= 0; value: 0 - 2*v0 -10 = 0; value: 0 + -34/5 <= 0; value: -34/5 + -86/5 < 0; value: -86/5 - -4*v0 -5*v1 + 4*v2 + 7 <= 0; value: 0 0: 2 3 4 5 1: 3 4 5 2: 1 2 3 5 4 3: 0: 5 -> 5 1: 0 -> -13/5 2: 0 -> 0 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + -6*v0 + 2*v2 + 8 <= 0; value: -2 + -6*v1 + 24 = 0; value: 0 + 6*v0 + v1 -32 <= 0; value: -10 + 6*v1 -4*v2 -20 <= 0; value: -12 + -1*v1 + 6*v2 -6*v3 -14 = 0; value: 0 0: 1 3 1: 2 3 4 5 2: 1 4 5 3: 5 optimal: 4/3 + + 4/3 <= 0; value: 4/3 + 2*v2 -20 <= 0; value: -12 - -6*v1 + 24 = 0; value: 0 - 6*v0 -28 <= 0; value: 0 + -4*v2 + 4 <= 0; value: -12 + 6*v2 -6*v3 -18 = 0; value: 0 0: 1 3 1: 2 3 4 5 2: 1 4 5 3: 5 0: 3 -> 14/3 1: 4 -> 4 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v1 -1*v3 -6 < 0; value: -15 + -1*v0 + 2*v1 + 1 <= 0; value: 0 + 3*v0 -2*v3 + 5 = 0; value: 0 + 5*v2 + 6*v3 -49 = 0; value: 0 + 3*v1 -2*v3 -2 < 0; value: -10 0: 1 2 3 1: 1 2 5 2: 4 3: 1 3 4 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 2 + -5*v0 + 6*v1 -1*v3 -6 < 0; value: -15 + -1*v0 + 2*v1 + 1 <= 0; value: 0 + 3*v0 -2*v3 + 5 = 0; value: 0 + 5*v2 + 6*v3 -49 = 0; value: 0 + 3*v1 -2*v3 -2 < 0; value: -10 0: 1 2 3 1: 1 2 5 2: 4 3: 1 3 4 5 0: 1 -> 1 1: 0 -> 0 2: 5 -> 5 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + <= 0; value: 0 + 5*v0 -2*v2 -37 <= 0; value: -23 + -4*v0 -2*v2 + 7 <= 0; value: -15 + -3*v0 + 2*v1 -2*v2 -2 <= 0; value: -10 + -2*v1 -8 < 0; value: -18 0: 2 3 4 1: 4 5 2: 2 3 4 3: optimal: oo + 4/5*v2 + 114/5 < 0; value: 126/5 + <= 0; value: 0 - 5*v0 -2*v2 -37 <= 0; value: 0 + -18/5*v2 -113/5 <= 0; value: -167/5 + -16/5*v2 -161/5 < 0; value: -209/5 - -2*v1 -8 < 0; value: -2 0: 2 3 4 1: 4 5 2: 2 3 4 3: 0: 4 -> 43/5 1: 5 -> -3 2: 3 -> 3 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 6*v3 -3 < 0; value: -18 + -1*v0 -5*v2 + 26 <= 0; value: 0 + -5*v0 -2 <= 0; value: -7 + <= 0; value: 0 + 6*v0 + 4*v3 -8 <= 0; value: -2 0: 2 3 5 1: 2: 1 2 3: 1 5 optimal: oo + 2*v0 -2*v1 <= 0; value: 0 + -3*v2 + 6*v3 -3 < 0; value: -18 + -1*v0 -5*v2 + 26 <= 0; value: 0 + -5*v0 -2 <= 0; value: -7 + <= 0; value: 0 + 6*v0 + 4*v3 -8 <= 0; value: -2 0: 2 3 5 1: 2: 1 2 3: 1 5 0: 1 -> 1 1: 1 -> 1 2: 5 -> 5 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + 6*v0 -1*v1 + 6*v2 -59 < 0; value: -11 + -4*v0 -3*v2 + 22 <= 0; value: -7 + v0 + 5*v1 -5 = 0; value: 0 + -3*v1 -4*v3 + 3 <= 0; value: -13 + -5*v0 + 5*v3 <= 0; value: -5 0: 1 2 3 5 1: 1 3 4 2: 1 2 3: 4 5 optimal: oo + 16*v3 -2 < 0; value: 62 - 31/5*v0 + 6*v2 -60 < 0; value: -31/5 + -6*v3 -8 < 0; value: -32 - v0 + 5*v1 -5 = 0; value: 0 - -18/31*v2 -4*v3 + 180/31 <= 0; value: 0 + -85/3*v3 < 0; value: -340/3 0: 1 2 3 5 4 1: 1 3 4 2: 1 2 4 5 3: 4 5 2 0: 5 -> 77/3 1: 0 -> -62/15 2: 3 -> -158/9 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: -2 + -4*v1 + 2*v3 <= 0; value: -2 + -2*v1 + 2*v2 -9 <= 0; value: -3 + -1*v0 -6*v3 + 6 = 0; value: 0 + v0 -5*v1 + 2 < 0; value: -3 + 2*v0 <= 0; value: 0 0: 3 4 5 1: 1 2 4 2: 2 3: 1 3 optimal: -1 + -1 <= 0; value: -1 - -4*v1 + 2*v3 <= 0; value: 0 + 2*v2 -10 <= 0; value: -2 - -1*v0 -6*v3 + 6 = 0; value: 0 + -1/2 < 0; value: -1/2 - 2*v0 <= 0; value: 0 0: 3 4 5 2 1: 1 2 4 2: 2 3: 1 3 2 4 0: 0 -> 0 1: 1 -> 1/2 2: 4 -> 4 3: 1 -> 1 + 2*v0 -2*v1 <= 0; value: -6 + -4*v1 -4*v2 + 32 <= 0; value: 0 + 5*v1 -1*v2 + v3 -28 <= 0; value: -18 + 3*v0 -6*v1 -14 < 0; value: -32 + 3*v1 -4*v2 -3*v3 + 11 = 0; value: 0 + -6*v1 + 4*v2 -5 <= 0; value: -3 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3: 2 4 optimal: (221/15 -e*1) + + 221/15 < 0; value: 221/15 - -4*v1 -4*v2 + 32 <= 0; value: 0 + -41/2 <= 0; value: -41/2 - 3*v0 -151/5 < 0; value: -3 - -7*v2 -3*v3 + 35 = 0; value: 0 - -30/7*v3 -3 <= 0; value: 0 0: 3 1: 1 2 3 4 5 2: 1 2 4 5 3 3: 2 4 5 3 0: 0 -> 136/15 1: 3 -> 27/10 2: 5 -> 53/10 3: 0 -> -7/10 + 2*v0 -2*v1 <= 0; value: 0 + 6*v2 + 3*v3 -35 < 0; value: -17 + -5*v1 -6*v2 -1 <= 0; value: -23 + 4*v0 + 6*v3 -41 <= 0; value: -21 + 5*v0 -10 = 0; value: 0 + -4*v3 -3 <= 0; value: -11 0: 3 4 1: 2 2: 1 2 3: 1 3 5 optimal: (193/10 -e*1) + + 193/10 < 0; value: 193/10 - 6*v2 + 3*v3 -35 < 0; value: -6 - -5*v1 -6*v2 -1 <= 0; value: 0 + -75/2 <= 0; value: -75/2 - 5*v0 -10 = 0; value: 0 - -4*v3 -3 <= 0; value: 0 0: 3 4 1: 2 2: 1 2 3: 1 3 5 0: 2 -> 2 1: 2 -> -129/20 2: 2 -> 125/24 3: 2 -> -3/4 + 2*v0 -2*v1 <= 0; value: -2 + 5*v0 -6*v3 + 10 <= 0; value: -14 + 6*v3 -35 <= 0; value: -11 + -5*v0 -1*v3 + 2 <= 0; value: -2 + 6*v0 -1*v1 < 0; value: -1 + -1*v0 -5*v1 -5*v2 + 15 < 0; value: -10 0: 1 3 4 5 1: 4 5 2: 5 3: 1 2 3 optimal: (23/3 -e*1) + + 23/3 < 0; value: 23/3 + -173/6 <= 0; value: -173/6 - 6*v3 -35 <= 0; value: 0 - 25/31*v2 -1*v3 -13/31 <= 0; value: 0 - 6*v0 -1*v1 < 0; value: -1 - -31*v0 -5*v2 + 15 <= 0; value: 0 0: 1 3 4 5 1: 4 5 2: 5 3 1 3: 1 2 3 0: 0 -> -23/30 1: 1 -> -18/5 2: 4 -> 1163/150 3: 4 -> 35/6 + 2*v0 -2*v1 <= 0; value: -8 + -4*v1 + 4*v2 -1 < 0; value: -5 + -3*v0 + 4*v1 + v2 -50 <= 0; value: -31 + -4*v0 + 3*v1 + v3 -31 < 0; value: -19 + 6*v0 -2*v1 + 3 < 0; value: -5 + 3*v1 + 5*v2 -27 = 0; value: 0 0: 2 3 4 1: 1 2 3 4 5 2: 1 2 5 3: 3 optimal: (-127/24 -e*1) + -127/24 < 0; value: -127/24 - 32/3*v2 -37 < 0; value: -5/2 + -283/8 < 0; value: -283/8 + v3 -2269/96 < 0; value: -2269/96 - 6*v0 -55/16 <= 0; value: 0 - 3*v1 + 5*v2 -27 = 0; value: 0 0: 2 3 4 1: 1 2 3 4 5 2: 1 2 5 4 3 3: 3 0: 0 -> 55/96 1: 4 -> 231/64 2: 3 -> 207/64 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 8 + 6*v0 -30 = 0; value: 0 + -1*v0 -2*v2 + 3*v3 <= 0; value: -2 + -6*v1 -1*v2 -2 <= 0; value: -8 + 3*v1 + 3*v2 -4*v3 <= 0; value: -1 + -6*v0 + 3*v2 -3*v3 + 31 <= 0; value: -2 0: 1 2 5 1: 3 4 2: 2 3 4 5 3: 2 4 5 optimal: 12 + + 12 <= 0; value: 12 - 6*v0 -30 = 0; value: 0 - -5*v0 + v3 + 62/3 <= 0; value: 0 - -6*v1 -1*v2 -2 <= 0; value: 0 + -25/3 <= 0; value: -25/3 - -6*v0 + 3*v2 -3*v3 + 31 <= 0; value: 0 0: 1 2 5 4 1: 3 4 2: 2 3 4 5 3: 2 4 5 0: 5 -> 5 1: 1 -> -1 2: 0 -> 4 3: 1 -> 13/3 + 2*v0 -2*v1 <= 0; value: -8 + -1*v3 + 3 = 0; value: 0 + 6*v2 -28 < 0; value: -4 + -2*v0 -1*v3 -3 <= 0; value: -8 + 2*v0 -3*v1 + 3 <= 0; value: -10 + -3*v0 -4*v2 -3*v3 + 28 = 0; value: 0 0: 3 4 5 1: 4 2: 2 5 3: 1 3 5 optimal: oo + -8/9*v2 + 20/9 <= 0; value: -4/3 - -1*v3 + 3 = 0; value: 0 + 6*v2 -28 < 0; value: -4 + 8/3*v2 -56/3 <= 0; value: -8 - 2*v0 -3*v1 + 3 <= 0; value: 0 - -3*v0 -4*v2 -3*v3 + 28 = 0; value: 0 0: 3 4 5 1: 4 2: 2 5 3 3: 1 3 5 0: 1 -> 1 1: 5 -> 5/3 2: 4 -> 4 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 2 + -2*v2 + 8 <= 0; value: 0 + -5*v1 + 4 < 0; value: -1 + 5*v0 -16 < 0; value: -6 + 6*v1 + 5*v2 -44 <= 0; value: -18 + 2*v1 + 2*v2 -10 = 0; value: 0 0: 3 1: 2 4 5 2: 1 4 5 3: optimal: (24/5 -e*1) + + 24/5 < 0; value: 24/5 + -2/5 < 0; value: -2/5 - 5*v2 -21 < 0; value: -1/2 - 5*v0 -16 < 0; value: -3 + -91/5 < 0; value: -91/5 - 2*v1 + 2*v2 -10 = 0; value: 0 0: 3 1: 2 4 5 2: 1 4 5 2 3: 0: 2 -> 13/5 1: 1 -> 9/10 2: 4 -> 41/10 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 0 + -6*v0 + 3*v1 + 5*v3 -35 <= 0; value: -20 + -1*v0 -2*v3 + 4 <= 0; value: -2 + -1*v0 -5*v3 -13 <= 0; value: -28 + 6*v1 + 5*v2 -25 = 0; value: 0 + -1*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 4 2: 4 3: 1 2 3 optimal: oo + 2*v0 + 5/3*v2 -25/3 <= 0; value: 0 + -6*v0 -5/2*v2 + 5*v3 -45/2 <= 0; value: -20 + -1*v0 -2*v3 + 4 <= 0; value: -2 + -1*v0 -5*v3 -13 <= 0; value: -28 - 6*v1 + 5*v2 -25 = 0; value: 0 + -1*v0 <= 0; value: 0 0: 1 2 3 5 1: 1 4 2: 4 1 3: 1 2 3 0: 0 -> 0 1: 0 -> 0 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -2 + 3*v2 -5 <= 0; value: -2 + 6*v0 -4*v3 -6 = 0; value: 0 + -6*v0 -2*v1 -6*v3 -30 <= 0; value: -74 + 2*v3 -7 <= 0; value: -1 + -5*v1 -4*v2 -3 < 0; value: -27 0: 2 3 1: 3 5 2: 1 5 3: 2 3 4 optimal: (158/15 -e*1) + + 158/15 < 0; value: 158/15 - 3*v2 -5 <= 0; value: 0 - 6*v0 -4*v3 -6 = 0; value: 0 + -1007/15 <= 0; value: -1007/15 - 2*v3 -7 <= 0; value: 0 - -5*v1 -4*v2 -3 < 0; value: -5 0: 2 3 1: 3 5 2: 1 5 3 3: 2 3 4 0: 3 -> 10/3 1: 4 -> -14/15 2: 1 -> 5/3 3: 3 -> 7/2 + 2*v0 -2*v1 <= 0; value: -2 + v0 + v1 + 3*v3 -65 < 0; value: -43 + 2*v0 -5*v1 + 3*v2 -5 < 0; value: -19 + 5*v0 + 2*v3 -66 <= 0; value: -41 + 2*v1 + v3 -36 < 0; value: -23 + -2*v0 -1*v2 -3 <= 0; value: -9 0: 1 2 3 5 1: 1 2 4 2: 2 5 3: 1 3 4 optimal: oo + -36/25*v3 + 1328/25 < 0; value: 1148/25 + 73/25*v3 -1629/25 < 0; value: -1264/25 - 2*v0 -5*v1 + 3*v2 -5 < 0; value: -5 - 5*v0 + 2*v3 -66 <= 0; value: 0 + 41/25*v3 -1568/25 < 0; value: -1363/25 - -2*v0 -1*v2 -3 <= 0; value: 0 0: 1 2 3 5 4 1: 1 2 4 2: 2 5 1 4 3: 1 3 4 0: 3 -> 56/5 1: 4 -> -269/25 2: 0 -> -127/5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: 2 + 2*v1 + 3*v3 -10 = 0; value: 0 + -4*v1 + 5 <= 0; value: -3 + -6*v0 -1*v3 + 20 = 0; value: 0 + -2*v0 + 4*v2 + 2*v3 -16 <= 0; value: -6 + -3*v1 -5*v2 -5*v3 + 10 <= 0; value: -21 0: 3 4 1: 1 2 5 2: 4 5 3: 1 3 4 5 optimal: 10/3 + + 10/3 <= 0; value: 10/3 - 2*v1 + 3*v3 -10 = 0; value: 0 - -36*v0 + 105 <= 0; value: 0 - -6*v0 -1*v3 + 20 = 0; value: 0 + 4*v2 -101/6 <= 0; value: -29/6 + -5*v2 -25/4 <= 0; value: -85/4 0: 3 4 2 5 1: 1 2 5 2: 4 5 3: 1 3 4 5 2 0: 3 -> 35/12 1: 2 -> 5/4 2: 3 -> 3 3: 2 -> 5/2 + 2*v0 -2*v1 <= 0; value: 2 + 5*v0 -4*v1 -3*v2 -7 <= 0; value: -2 + 4*v1 + 6*v2 -4*v3 -2 = 0; value: 0 + -2*v2 + 5*v3 -18 = 0; value: 0 + -3*v0 -3*v2 -12 <= 0; value: -27 + -1*v0 + 4*v3 -34 <= 0; value: -22 0: 1 4 5 1: 1 2 2: 1 2 3 4 3: 2 3 5 optimal: 1050/47 + + 1050/47 <= 0; value: 1050/47 - 5*v0 + 7/5*v2 -117/5 <= 0; value: 0 - 4*v1 + 6*v2 -4*v3 -2 = 0; value: 0 - -2*v2 + 5*v3 -18 = 0; value: 0 + -2535/47 <= 0; value: -2535/47 - -47/7*v0 + 50/7 <= 0; value: 0 0: 1 4 5 1: 1 2 2: 1 2 3 4 5 3: 2 3 5 1 0: 4 -> 50/47 1: 3 -> -475/47 2: 1 -> 607/47 3: 4 -> 412/47 + 2*v0 -2*v1 <= 0; value: -6 + -3*v0 -6*v3 -10 <= 0; value: -22 + 2*v1 + 3*v2 -21 = 0; value: 0 + 2*v0 <= 0; value: 0 + 6*v1 + 5*v2 -79 <= 0; value: -36 + 4*v2 -3*v3 -21 < 0; value: -7 0: 1 3 1: 2 4 2: 2 4 5 3: 1 5 optimal: oo + 2*v0 + 9/4*v3 -21/4 < 0; value: -3/4 + -3*v0 -6*v3 -10 <= 0; value: -22 - 2*v1 + 3*v2 -21 = 0; value: 0 + 2*v0 <= 0; value: 0 + -3*v3 -37 < 0; value: -43 - 4*v2 -3*v3 -21 < 0; value: -7/2 0: 1 3 1: 2 4 2: 2 4 5 3: 1 5 4 0: 0 -> 0 1: 3 -> 27/16 2: 5 -> 47/8 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: 6 + -6*v1 -3*v3 + 12 = 0; value: 0 + 4*v0 + 3*v2 -53 < 0; value: -21 + -4*v0 + 2*v3 + 16 <= 0; value: -4 + -3*v0 + v2 + 2*v3 -10 < 0; value: -21 + 2*v1 -6*v2 + 20 = 0; value: 0 0: 2 3 4 1: 1 5 2: 2 4 5 3: 1 3 4 optimal: (112/3 -e*1) + + 112/3 < 0; value: 112/3 - -6*v1 -3*v3 + 12 = 0; value: 0 - 3*v0 -37 < 0; value: -3 - -4*v0 -12*v2 + 64 <= 0; value: 0 + -112/9 <= 0; value: -112/9 - -6*v2 -1*v3 + 24 = 0; value: 0 0: 2 3 4 1: 1 5 2: 2 4 5 3 3: 1 3 4 5 0: 5 -> 34/3 1: 2 -> -16/3 2: 4 -> 14/9 3: 0 -> 44/3 + 2*v0 -2*v1 <= 0; value: -2 + -6*v3 -10 <= 0; value: -40 + v0 -1*v3 + 2 = 0; value: 0 + -5*v0 + 6*v1 -9 <= 0; value: 0 + -6*v1 + 3 <= 0; value: -21 + 6*v1 -62 < 0; value: -38 0: 2 3 1: 3 4 5 2: 3: 1 2 optimal: oo + 2*v3 -5 <= 0; value: 5 + -6*v3 -10 <= 0; value: -40 - v0 -1*v3 + 2 = 0; value: 0 + -5*v3 + 4 <= 0; value: -21 - -6*v1 + 3 <= 0; value: 0 + -59 < 0; value: -59 0: 2 3 1: 3 4 5 2: 3: 1 2 3 0: 3 -> 3 1: 4 -> 1/2 2: 5 -> 5 3: 5 -> 5 + 2*v0 -2*v1 <= 0; value: -2 + 3*v0 -3*v2 + 9 = 0; value: 0 + -1*v1 + 4*v2 -6*v3 + 1 <= 0; value: 0 + -4*v2 + 6*v3 + 1 <= 0; value: -1 + 6*v0 + 4*v2 + 2*v3 -73 <= 0; value: -35 + -5*v0 + 4*v2 -29 <= 0; value: -19 0: 1 4 5 1: 2 2: 1 2 3 4 5 3: 2 3 4 optimal: 104/17 + + 104/17 <= 0; value: 104/17 - 3*v0 -3*v2 + 9 = 0; value: 0 - -1*v1 + 4*v2 -6*v3 + 1 <= 0; value: 0 - -4*v2 + 6*v3 + 1 <= 0; value: 0 - 34/3*v2 -274/3 <= 0; value: 0 + -375/17 <= 0; value: -375/17 0: 1 4 5 1: 2 2: 1 2 3 4 5 3: 2 3 4 0: 2 -> 86/17 1: 3 -> 2 2: 5 -> 137/17 3: 3 -> 177/34 + 2*v0 -2*v1 <= 0; value: 4 + -1*v1 + 6*v2 + 2 = 0; value: 0 + -4*v0 -5*v1 -18 <= 0; value: -44 + v3 -3 <= 0; value: 0 + -6*v0 -6*v1 + 5*v3 + 21 <= 0; value: 0 + v0 -3*v1 -2*v3 -4 <= 0; value: -12 0: 2 4 5 1: 1 2 4 5 2: 1 3: 3 4 5 optimal: 16 + + 16 <= 0; value: 16 - -1*v1 + 6*v2 + 2 = 0; value: 0 + -41 <= 0; value: -41 - 8/9*v0 -56/9 <= 0; value: 0 - -6*v0 -36*v2 + 5*v3 + 9 <= 0; value: 0 - 4*v0 -9/2*v3 -29/2 <= 0; value: 0 0: 2 4 5 3 1: 1 2 4 5 2: 1 2 4 5 3: 3 4 5 2 0: 4 -> 7 1: 2 -> -1 2: 0 -> -1/2 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: 10 + -1*v1 -4*v3 + 8 = 0; value: 0 + -4*v0 -1*v2 -2*v3 + 24 = 0; value: 0 + -5*v0 + 3*v1 -5*v3 + 35 = 0; value: 0 + 3*v1 + 2*v3 -4 <= 0; value: 0 + 3*v0 + 4*v3 -43 <= 0; value: -20 0: 2 3 5 1: 1 3 4 2: 2 3: 1 2 3 4 5 optimal: oo + -6/17*v0 + 200/17 <= 0; value: 10 - -1*v1 -4*v3 + 8 = 0; value: 0 - -4*v0 -1*v2 -2*v3 + 24 = 0; value: 0 - 29*v0 + 17/2*v2 -145 = 0; value: 0 + 50/17*v0 -250/17 <= 0; value: 0 + 31/17*v0 -495/17 <= 0; value: -20 0: 2 3 5 4 1: 1 3 4 2: 2 3 5 4 3: 1 2 3 4 5 0: 5 -> 5 1: 0 -> 0 2: 0 -> 0 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + -3*v0 -6*v1 -6*v2 + 4 <= 0; value: -53 + -6*v3 + 12 = 0; value: 0 + -5*v0 -1*v1 + 6*v2 + 2 <= 0; value: 0 + -1*v1 -4*v2 -3*v3 + 23 = 0; value: 0 + -6*v0 -3*v1 + 14 < 0; value: -19 0: 1 3 5 1: 1 3 4 5 2: 1 3 4 3: 2 4 optimal: 49 + + 49 <= 0; value: 49 - 6*v0 -71 <= 0; value: 0 - -6*v3 + 12 = 0; value: 0 - -5*v0 -1*v1 + 6*v2 + 2 <= 0; value: 0 - 5*v0 -10*v2 -3*v3 + 21 = 0; value: 0 + -19 < 0; value: -19 0: 1 3 5 4 1: 1 3 4 5 2: 1 3 4 5 3: 2 4 1 5 0: 3 -> 71/6 1: 5 -> -38/3 2: 3 -> 89/12 3: 2 -> 2 + 2*v0 -2*v1 <= 0; value: -4 + <= 0; value: 0 + 4*v1 -1*v2 -12 = 0; value: 0 + -1*v0 + 4*v1 -6*v3 -20 < 0; value: -9 + <= 0; value: 0 + v0 -2*v3 -2 <= 0; value: -1 0: 3 5 1: 2 3 2: 2 3: 3 5 optimal: oo + 2*v0 -1/2*v2 -6 <= 0; value: -4 + <= 0; value: 0 - 4*v1 -1*v2 -12 = 0; value: 0 + -1*v0 + v2 -6*v3 -8 < 0; value: -9 + <= 0; value: 0 + v0 -2*v3 -2 <= 0; value: -1 0: 3 5 1: 2 3 2: 2 3 3: 3 5 0: 1 -> 1 1: 3 -> 3 2: 0 -> 0 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: -2 + -4*v2 + 20 = 0; value: 0 + -1*v1 + 2*v2 -9 = 0; value: 0 + -4*v1 -2 <= 0; value: -6 + 6*v1 + v3 -23 <= 0; value: -14 + 6*v2 + 2*v3 -104 <= 0; value: -68 0: 1: 2 3 4 2: 1 2 5 3: 4 5 optimal: oo + 2*v0 -2 <= 0; value: -2 - -4*v2 + 20 = 0; value: 0 - -1*v1 + 2*v2 -9 = 0; value: 0 + -6 <= 0; value: -6 + v3 -17 <= 0; value: -14 + 2*v3 -74 <= 0; value: -68 0: 1: 2 3 4 2: 1 2 5 3 4 3: 4 5 0: 0 -> 0 1: 1 -> 1 2: 5 -> 5 3: 3 -> 3 + 2*v0 -2*v1 <= 0; value: -8 + -1*v0 + 1 = 0; value: 0 + -5*v0 -4*v2 + 9 = 0; value: 0 + -3*v1 -5*v2 + 11 <= 0; value: -9 + -4*v0 -4*v1 -3*v2 + 10 <= 0; value: -17 + 5*v1 -2*v2 -33 <= 0; value: -10 0: 1 2 4 1: 3 4 5 2: 2 3 4 5 3: optimal: -2 + -2 <= 0; value: -2 - -1*v0 + 1 = 0; value: 0 - -5*v0 -4*v2 + 9 = 0; value: 0 - -3*v1 -5*v2 + 11 <= 0; value: 0 + -5 <= 0; value: -5 + -25 <= 0; value: -25 0: 1 2 4 5 1: 3 4 5 2: 2 3 4 5 3: 0: 1 -> 1 1: 5 -> 2 2: 1 -> 1 3: 4 -> 4 + 2*v0 -2*v1 <= 0; value: 2 + -1*v0 + 4*v1 -4*v3 -9 <= 0; value: -4 + -2*v1 + 6*v2 -1*v3 -49 < 0; value: -29 + -3*v1 -6*v2 + 18 < 0; value: -12 + 3*v0 + 5*v2 -2*v3 -72 < 0; value: -43 + 2*v0 -1*v3 -6 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 2 3 4 3: 1 2 4 5 optimal: oo + 14/5*v0 + 10 < 0; value: 92/5 + -53/5*v0 -5 < 0; value: -184/5 - 10*v2 -1*v3 -61 <= 0; value: 0 - -3*v1 -6*v2 + 18 < 0; value: -3 + -65/2 < 0; value: -65/2 - 2*v0 -1*v3 -6 = 0; value: 0 0: 1 4 5 1: 1 2 3 2: 2 3 4 1 3: 1 2 4 5 0: 3 -> 3 1: 2 -> -26/5 2: 4 -> 61/10 3: 0 -> 0 + 2*v0 -2*v1 <= 0; value: 10 + -6*v1 -3*v2 -1 <= 0; value: -7 + v0 + 6*v1 -1*v2 -6 <= 0; value: -3 + -2*v0 -3*v1 -2*v2 + 14 = 0; value: 0 + 6*v1 + 2*v3 -6 <= 0; value: -2 + 2*v1 = 0; value: 0 0: 2 3 1: 1 2 3 4 5 2: 1 2 3 3: 4 optimal: 13 + + 13 <= 0; value: 13 + -5/2 <= 0; value: -5/2 - 2*v0 -13 <= 0; value: 0 - -2*v0 -3*v1 -2*v2 + 14 = 0; value: 0 + 2*v3 -6 <= 0; value: -2 - -4/3*v0 -4/3*v2 + 28/3 = 0; value: 0 0: 2 3 1 5 4 1: 1 2 3 4 5 2: 1 2 3 5 4 3: 4 0: 5 -> 13/2 1: 0 -> 0 2: 2 -> 1/2 3: 2 -> 2 10 x: 5 y: 5 z: 5 u: 6 10 oo (10 -e*1) x: 4 y: 5 z: 5 u: 6 v3 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v2 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v2 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 v3 -1 - <= 0; value: 0 + v0 -1*v3 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -2 - v1 -1*v3 <= 0; value: -2 - v2 -1*v3 + 1 <= 0; value: 0 0: 1 2 1: 1 3 2: 2 4 3: 3 4 1 2 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -2 + v1 -1*v2 <= 0; value: -1 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 + v2 -1*v6 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 v1 - <= 0; value: 0 + v0 -1*v1 <= 0; value: -1 - v1 -1*v2 <= 0; value: -1 + v1 -1*v4 <= 0; value: -3 + v1 -1*v3 + 1 <= 0; value: -1 + v1 -1*v5 + 1 <= 0; value: -3 + v1 -1*v6 + 1 <= 0; value: -3 0: 1 1: 2 3 4 5 6 1 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 < 0; value: -2 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 + v2 -1*v6 + 1 < 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 v0 - <= 0; value: 0 - v0 -1*v2 <= 0; value: -1 + -1*v0 + v1 < 0; value: -1 + v0 -1*v4 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -1 + v0 -1*v5 + 1 <= 0; value: -3 + v0 -1*v6 + 1 < 0; value: -3 0: 1 3 4 5 6 2 1: 2 2: 1 2 3 4 5 6 3: 4 4: 3 5: 5 6: 6 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 < 0; value: -2 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 - <= 0; value: 0 + v0 -1*v5 + 1 <= 0; value: -3 + v1 -1*v5 + 1 < 0; value: -4 - v2 -1*v4 <= 0; value: -2 - v2 -1*v3 + 1 <= 0; value: 0 - v2 -1*v5 + 1 <= 0; value: -2 + v0 -1*v4 <= 0; value: -3 + v1 -1*v4 < 0; value: -4 + v0 -1*v3 + 1 <= 0; value: -1 + v1 -1*v3 + 1 < 0; value: -2 0: 1 6 8 1: 2 7 9 2: 1 2 3 4 5 6 7 8 9 3: 4 8 9 4: 3 6 7 5: 5 1 2 - <= 0; value: 0 + v0 -1*v2 <= 0; value: -1 + v1 -1*v2 + 1 <= 0; value: -1 + v2 -1*v4 <= 0; value: -2 + v2 -1*v3 + 1 <= 0; value: 0 + v2 -1*v5 + 1 <= 0; value: -2 0: 1 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 v0 - <= 0; value: 0 - v0 -1*v2 <= 0; value: -1 + -1*v0 + v1 + 1 <= 0; value: 0 + v0 -1*v4 <= 0; value: -3 + v0 -1*v3 + 1 <= 0; value: -1 + v0 -1*v5 + 1 <= 0; value: -3 0: 1 3 4 5 2 1: 2 2: 1 2 3 4 5 3: 4 4: 3 5: 5 - <= 0; value: 0 + v0 -2*v1 <= 0; value: 0 + 2*v1 -1*v2 <= 0; value: -1 0: 1 1: 1 2 2: 2 v2 / 2 - <= 0; value: 0 + 2*v0 -2*v2 + 1 <= 0; value: -1 - 2*v1 -1*v2 <= 0; value: -1 0: 1 1: 1 2 2: 2 1 - <= 0; value: 0 + v0 -2*v1 <= 0; value: -1 + 2*v1 -1*v2 <= 0; value: 0 0: 1 1: 1 2 2: 2 v2 / 2 - <= 0; value: 0 + 2*v0 -2*v2 + 1 <= 0; value: -1 - 2*v1 -1*v2 <= 0; value: 0 0: 1 1: 1 2 2: 2 1 PASS (test model_based_opt :time 0.11 :before-memory 4.68 :after-memory 4.68) (<= 0.0 (* 2.0 z z)) -> (or (= 0.0 z) (= 0.0 (- 2.0)) (< (- 2.0) 0.0)) PASS (test factor_rewriter :time 0.00 :before-memory 4.68 :after-memory 4.68) (<= 0.0 (* 2.0 z z)) -> (or (= 0.0 z) (= 0.0 (- 2.0)) (< (- 2.0) 0.0)) PASS (test factor_rewriter :time 0.00 :before-memory 4.68 :after-memory 4.68) spec: (declare-datatypes (T) ((list (nil) (cons (car T) (cdr list))))) (declare-const x Int) (declare-const l (list Int)) (declare-fun f ((list Int)) Bool) (assert (f (cons x l))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-datatypes ((list 1)) ((par (k!00)((nil) (cons (car k!00) (cdr (list k!00))))))) (declare-fun f ((list Int)) Bool) (declare-fun l () (list Int)) (declare-fun x () Int) (assert (and (f (cons x l)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (f (cons x l)))) done printing spec: (declare-const x Int) (declare-const a (Array Int Int)) (declare-const b (Array (Array Int Int) Bool)) (assert (select b a)) (assert (= b ((as const (Array (Array Int Int) Bool)) true))) (assert (= b (store b a true))) (declare-const b1 (Array Bool Bool)) (declare-const b2 (Array Bool Bool)) (assert (= ((as const (Array Bool Bool)) false) ((_ map and) b1 b2))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun b2 () (Array Bool Bool)) (declare-fun b1 () (Array Bool Bool)) (declare-fun a () (Array Int Int)) (declare-fun b () (Array (Array Int Int) Bool)) (assert (and (select b a) (= b ((as const (Array (Array Int Int) Bool)) true)) (= b (store b a true)) (= ((as const (Array Bool Bool)) false) ((_ map and ) b1 b2)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (select b a) (= b ((as const (Array (Array Int Int) Bool)) true)) (= b (store b a true)) (= ((as const (Array Bool Bool)) false) ((_ map (and (Bool Bool) Bool)) b1 b2)))) done printing spec: (declare-datatypes () ((list (nil) (cons (car tree) (cdr list))) (tree (leaf) (node (n list))))) (declare-const x tree) (declare-const l list) (declare-fun f (list) Bool) (assert (f (cons x l))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-datatypes ((tree 0) (list 0)) (((leaf) (node (n list))) ((nil) (cons (car tree) (cdr list))))) (declare-fun f (list) Bool) (declare-fun l () list) (declare-fun x () tree) (assert (and (f (cons x l)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (f (cons x l)))) done printing spec: (declare-const x Real) (declare-const y Int) (assert (= x 0.0)) (assert (= y 6)) (assert (> (/ x 1.4) (to_real y))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun y () Int) (declare-fun x () Real) (assert (and (= x 0.0) (= y 6) (> (/ x (/ 7.0 5.0)) (to_real y)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (= x 0.0) (= y 6) (> (/ x (/ 7.0 5.0)) (to_real y)))) done printing spec: (declare-const x (_ BitVec 4)) (declare-const y (_ BitVec 4)) (assert (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) #xf0))))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun x () (_ BitVec 4)) (declare-fun y () (_ BitVec 4)) (assert (and (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) (_ bv240 8))))))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (let ((a!1 (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) #xf0)))))) (and a!1))) done printing spec: (assert (= "abc" "abc")) done parsing spec1: benchmark->string ; test (set-info :status unknown) (assert (and (= "abc" "abc"))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (= "abc" "abc"))) done printing PASS (test smt2print_parse :time 0.01 :before-memory 4.68 :after-memory 4.69) spec: (declare-datatypes (T) ((list (nil) (cons (car T) (cdr list))))) (declare-const x Int) (declare-const l (list Int)) (declare-fun f ((list Int)) Bool) (assert (f (cons x l))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-datatypes ((list 1)) ((par (k!00)((nil) (cons (car k!00) (cdr (list k!00))))))) (declare-fun f ((list Int)) Bool) (declare-fun l () (list Int)) (declare-fun x () Int) (assert (and (f (cons x l)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (f (cons x l)))) done printing spec: (declare-const x Int) (declare-const a (Array Int Int)) (declare-const b (Array (Array Int Int) Bool)) (assert (select b a)) (assert (= b ((as const (Array (Array Int Int) Bool)) true))) (assert (= b (store b a true))) (declare-const b1 (Array Bool Bool)) (declare-const b2 (Array Bool Bool)) (assert (= ((as const (Array Bool Bool)) false) ((_ map and) b1 b2))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun b2 () (Array Bool Bool)) (declare-fun b1 () (Array Bool Bool)) (declare-fun a () (Array Int Int)) (declare-fun b () (Array (Array Int Int) Bool)) (assert (and (select b a) (= b ((as const (Array (Array Int Int) Bool)) true)) (= b (store b a true)) (= ((as const (Array Bool Bool)) false) ((_ map and ) b1 b2)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (select b a) (= b ((as const (Array (Array Int Int) Bool)) true)) (= b (store b a true)) (= ((as const (Array Bool Bool)) false) ((_ map (and (Bool Bool) Bool)) b1 b2)))) done printing spec: (declare-datatypes () ((list (nil) (cons (car tree) (cdr list))) (tree (leaf) (node (n list))))) (declare-const x tree) (declare-const l list) (declare-fun f (list) Bool) (assert (f (cons x l))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-datatypes ((tree 0) (list 0)) (((leaf) (node (n list))) ((nil) (cons (car tree) (cdr list))))) (declare-fun f (list) Bool) (declare-fun l () list) (declare-fun x () tree) (assert (and (f (cons x l)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (f (cons x l)))) done printing spec: (declare-const x Real) (declare-const y Int) (assert (= x 0.0)) (assert (= y 6)) (assert (> (/ x 1.4) (to_real y))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun y () Int) (declare-fun x () Real) (assert (and (= x 0.0) (= y 6) (> (/ x (/ 7.0 5.0)) (to_real y)))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (= x 0.0) (= y 6) (> (/ x (/ 7.0 5.0)) (to_real y)))) done printing spec: (declare-const x (_ BitVec 4)) (declare-const y (_ BitVec 4)) (assert (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) #xf0))))) done parsing spec1: benchmark->string ; test (set-info :status unknown) (declare-fun x () (_ BitVec 4)) (declare-fun y () (_ BitVec 4)) (assert (and (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) (_ bv240 8))))))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (let ((a!1 (bvule x (bvmul y (concat ((_ extract 2 0) x) ((_ extract 3 3) #xf0)))))) (and a!1))) done printing spec: (assert (= "abc" "abc")) done parsing spec1: benchmark->string ; test (set-info :status unknown) (assert (and (= "abc" "abc"))) (check-sat) attempting to parse spec1... parse successful, converting ast->string spec2: string->ast->string (ast-vector (and (= "abc" "abc"))) done printing PASS (test smt2print_parse :time 0.01 :before-memory 4.69 :after-memory 4.69) VAR 0:0 --> 0 (:var 1) PASS (test substitution :time 0.00 :before-memory 4.69 :after-memory 4.69) VAR 0:0 --> 0 (:var 1) PASS (test substitution :time 0.00 :before-memory 4.69 :after-memory 4.69) --------- p: x0 x1^2 + x0 x1 + x1 + 2 q: x0 x1 + 3 S_0: - x0^2 + 6 x0 --------- p: x0 x1^4 + x0 x1^3 + x1^3 + 2 q: x0 x1^3 + 3 S_0: - x0^4 + 72 x0^3 - 27 x0^2 - 27 x0 S_1: 9 x0^3 --------- p: x9^4 + x0 x9^2 + x1 x9 + x2 q: 4 x9^3 + 2 x0 x9 + x1 S_0: 256 x2^3 - 4 x0^3 x1^2 - 128 x0^2 x2^2 + 144 x0 x1^2 x2 - 27 x1^4 + 16 x0^4 x2 S_1: - 32 x0 x2 + 8 x0^3 + 36 x1^2 S_2: 8 x0 --------- p: x9 x10^2 - x10^2 + 6 x9 - 6 - x9^2 x10 - x10 q: - x9 x10^2 - x9^2 + 6 x10 - 6 + x9^2 x10 - x9 S_0: 2 x9^6 - 22 x9^5 + 102 x9^4 - 274 x9^3 + 488 x9^2 - 552 x9 + 288 S_1: - x9^2 - 6 + 5 x9 --------- p: x9 x10^3 - x10^3 + 6 x9 - 6 - x9^3 x10 - x10 q: - x9 x10^3 - x9^3 + 6 x10 - 6 + x9^3 x10 - x9 S_0: 3 x9^11 - 3 x9^10 - 37 x9^9 + 99 x9^8 + 51 x9^7 - 621 x9^6 + 1089 x9^5 - 39 x9^4 - 3106 x9^3 + 5868 x9^2 - 4968 x9 + 1728 S_1: x9^6 - 10 x9^4 + 12 x9^3 + 25 x9^2 - 60 x9 + 36 --------- p: x9^6 + x0 x9^3 + x1 q: x9^6 + x2 x9^3 + x3 S_0: x3^6 + 3 x0^4 x2^2 x3^3 - 3 x0^5 x2 x3^3 + x0^6 x3^3 + 3 x0^2 x1 x2^4 x3^2 - 9 x0^3 x1 x2^3 x3^2 + 9 x0^4 x1 x2^2 x3^2 - 3 x0^5 x1 x2 x3^2 - 3 x0 x1^2 x2^5 x3 + 9 x0^2 x1^2 x2^4 x3 - 9 x0^3 x1^2 x2^3 x3 + 3 x0^4 x1^2 x2^2 x3 + x1^3 x2^6 - 3 x0 x1^3 x2^5 + 3 x0^2 x1^3 x2^4 - x0^3 x1^3 x2^3 + 3 x0^2 x2^2 x3^4 - 6 x0^3 x2 x3^4 + 3 x0^4 x3^4 - 6 x0 x1 x2^3 x3^3 + 6 x0^2 x1 x2^2 x3^3 + 6 x0^3 x1 x2 x3^3 - 6 x0^4 x1 x3^3 + 3 x1^2 x2^4 x3^2 + 6 x0 x1^2 x2^3 x3^2 - 18 x0^2 x1^2 x2^2 x3^2 + 6 x0^3 x1^2 x2 x3^2 + 3 x0^4 x1^2 x3^2 - 6 x1^3 x2^4 x3 + 6 x0 x1^3 x2^3 x3 + 6 x0^2 x1^3 x2^2 x3 - 6 x0^3 x1^3 x2 x3 + 3 x1^4 x2^4 - 6 x0 x1^4 x2^3 + 3 x0^2 x1^4 x2^2 - 3 x0 x2 x3^5 + 3 x0^2 x3^5 + 3 x1 x2^2 x3^4 + 9 x0 x1 x2 x3^4 - 12 x0^2 x1 x3^4 - 12 x1^2 x2^2 x3^3 - 6 x0 x1^2 x2 x3^3 + 18 x0^2 x1^2 x3^3 + 18 x1^3 x2^2 x3^2 - 6 x0 x1^3 x2 x3^2 - 12 x0^2 x1^3 x3^2 - 12 x1^4 x2^2 x3 + 9 x0 x1^4 x2 x3 + 3 x0^2 x1^4 x3 + 3 x1^5 x2^2 - 3 x0 x1^5 x2 - x0^3 x2^3 x3^3 - 6 x1 x3^5 + 15 x1^2 x3^4 - 20 x1^3 x3^3 + 15 x1^4 x3^2 - 6 x1^5 x3 + x1^6 S_1: x2^3 - 3 x0 x2^2 + 3 x0^2 x2 - x0^3 --------- p: x9 q: x0 x9 + x1 x2 + x3 - x4 S_0: - x4 + x3 + x1 x2 --------- p: x0 x3 x9 + x0 x2 x5 + x0 x4 - x0 x1 q: x3 x9 + x2 x5 + x4 - x1 S_0: 0 PASS (test polynomial :time 0.00 :before-memory 4.69 :after-memory 4.69) --------- p: x0 x1^2 + x0 x1 + x1 + 2 q: x0 x1 + 3 S_0: - x0^2 + 6 x0 --------- p: x0 x1^4 + x0 x1^3 + x1^3 + 2 q: x0 x1^3 + 3 S_0: - x0^4 + 72 x0^3 - 27 x0^2 - 27 x0 S_1: 9 x0^3 --------- p: x9^4 + x0 x9^2 + x1 x9 + x2 q: 4 x9^3 + 2 x0 x9 + x1 S_0: 256 x2^3 - 4 x0^3 x1^2 - 128 x0^2 x2^2 + 144 x0 x1^2 x2 - 27 x1^4 + 16 x0^4 x2 S_1: - 32 x0 x2 + 8 x0^3 + 36 x1^2 S_2: 8 x0 --------- p: x9 x10^2 - x10^2 + 6 x9 - 6 - x9^2 x10 - x10 q: - x9 x10^2 - x9^2 + 6 x10 - 6 + x9^2 x10 - x9 S_0: 2 x9^6 - 22 x9^5 + 102 x9^4 - 274 x9^3 + 488 x9^2 - 552 x9 + 288 S_1: - x9^2 - 6 + 5 x9 --------- p: x9 x10^3 - x10^3 + 6 x9 - 6 - x9^3 x10 - x10 q: - x9 x10^3 - x9^3 + 6 x10 - 6 + x9^3 x10 - x9 S_0: 3 x9^11 - 3 x9^10 - 37 x9^9 + 99 x9^8 + 51 x9^7 - 621 x9^6 + 1089 x9^5 - 39 x9^4 - 3106 x9^3 + 5868 x9^2 - 4968 x9 + 1728 S_1: x9^6 - 10 x9^4 + 12 x9^3 + 25 x9^2 - 60 x9 + 36 --------- p: x9^6 + x0 x9^3 + x1 q: x9^6 + x2 x9^3 + x3 S_0: x3^6 + 3 x0^4 x2^2 x3^3 - 3 x0^5 x2 x3^3 + x0^6 x3^3 + 3 x0^2 x1 x2^4 x3^2 - 9 x0^3 x1 x2^3 x3^2 + 9 x0^4 x1 x2^2 x3^2 - 3 x0^5 x1 x2 x3^2 - 3 x0 x1^2 x2^5 x3 + 9 x0^2 x1^2 x2^4 x3 - 9 x0^3 x1^2 x2^3 x3 + 3 x0^4 x1^2 x2^2 x3 + x1^3 x2^6 - 3 x0 x1^3 x2^5 + 3 x0^2 x1^3 x2^4 - x0^3 x1^3 x2^3 + 3 x0^2 x2^2 x3^4 - 6 x0^3 x2 x3^4 + 3 x0^4 x3^4 - 6 x0 x1 x2^3 x3^3 + 6 x0^2 x1 x2^2 x3^3 + 6 x0^3 x1 x2 x3^3 - 6 x0^4 x1 x3^3 + 3 x1^2 x2^4 x3^2 + 6 x0 x1^2 x2^3 x3^2 - 18 x0^2 x1^2 x2^2 x3^2 + 6 x0^3 x1^2 x2 x3^2 + 3 x0^4 x1^2 x3^2 - 6 x1^3 x2^4 x3 + 6 x0 x1^3 x2^3 x3 + 6 x0^2 x1^3 x2^2 x3 - 6 x0^3 x1^3 x2 x3 + 3 x1^4 x2^4 - 6 x0 x1^4 x2^3 + 3 x0^2 x1^4 x2^2 - 3 x0 x2 x3^5 + 3 x0^2 x3^5 + 3 x1 x2^2 x3^4 + 9 x0 x1 x2 x3^4 - 12 x0^2 x1 x3^4 - 12 x1^2 x2^2 x3^3 - 6 x0 x1^2 x2 x3^3 + 18 x0^2 x1^2 x3^3 + 18 x1^3 x2^2 x3^2 - 6 x0 x1^3 x2 x3^2 - 12 x0^2 x1^3 x3^2 - 12 x1^4 x2^2 x3 + 9 x0 x1^4 x2 x3 + 3 x0^2 x1^4 x3 + 3 x1^5 x2^2 - 3 x0 x1^5 x2 - x0^3 x2^3 x3^3 - 6 x1 x3^5 + 15 x1^2 x3^4 - 20 x1^3 x3^3 + 15 x1^4 x3^2 - 6 x1^5 x3 + x1^6 S_1: x2^3 - 3 x0 x2^2 + 3 x0^2 x2 - x0^3 --------- p: x9 q: x0 x9 + x1 x2 + x3 - x4 S_0: - x4 + x3 + x1 x2 --------- p: x0 x3 x9 + x0 x2 x5 + x0 x4 - x0 x1 q: x3 x9 + x2 x5 + x4 - x1 S_0: 0 PASS (test polynomial :time 0.00 :before-memory 4.69 :after-memory 4.69) Testing GCD _p: 13 x^18 - 1560 x^17 + 86931 x^16 - 2987504 x^15 + 70923060 x^14 - 1234660752 x^13 + 16329634620 x^12 - 167746338864 x^11 + 1356661565766 x^10 - 8703145006400 x^9 + 44396368299114 x^8 - 179697656333520 x^7 + 572988784985188 x^6 - 1420294907137392 x^5 + 2677652713464300 x^4 - 3706435590858000 x^3 + 3548919735343125 x^2 - 2098635449625000 x + 577124748646875 _q: 234 x^17 - 26520 x^16 + 1390896 x^15 - 44812560 x^14 + 992922840 x^13 - 16050589776 x^12 + 195955615440 x^11 - 1845209727504 x^10 + 13566615657660 x^9 - 78328305057600 x^8 + 355170946392912 x^7 - 1257883594334640 x^6 + 3437932709911128 x^5 - 7101474535686960 x^4 + 10710610853857200 x^3 - 11119306772574000 x^2 + 7097839470686250 x - 2098635449625000 gcd: 13 x^15 - 1313 x^14 + 60645 x^13 - 1697865 x^12 + 32200545 x^11 - 437963877 x^10 + 4411517097 x^9 - 33504144765 x^8 + 193432514535 x^7 - 849099998435 x^6 + 2811735445519 x^5 - 6901018131579 x^4 + 12159189854955 x^3 - 14529083829975 x^2 + 10535573923875 x - 3497725749375 _p: 13 x^18 - 1560 x^17 + 86931 x^16 - 2987504 x^15 + 70923060 x^14 - 1234660752 x^13 + 16329634620 x^12 - 167746338864 x^11 + 1356661565766 x^10 - 8703145006400 x^9 + 44396368299114 x^8 - 179697656333520 x^7 + 572988784985188 x^6 - 1420294907137392 x^5 + 2677652713464300 x^4 - 3706435590858000 x^3 + 3548919735343125 x^2 - 2098635449625000 x + 577124748646875 _q: 234 x^17 - 26520 x^16 + 1390896 x^15 - 44812560 x^14 + 992922840 x^13 - 16050589776 x^12 + 195955615440 x^11 - 1845209727504 x^10 + 13566615657660 x^9 - 78328305057600 x^8 + 355170946392912 x^7 - 1257883594334640 x^6 + 3437932709911128 x^5 - 7101474535686960 x^4 + 10710610853857200 x^3 - 11119306772574000 x^2 + 7097839470686250 x - 2098635449625000 subresultant_gcd: x^15 - 101 x^14 + 4665 x^13 - 130605 x^12 + 2476965 x^11 - 33689529 x^10 + 339347469 x^9 - 2577241905 x^8 + 14879424195 x^7 - 65315384495 x^6 + 216287341963 x^5 - 530847548583 x^4 + 935322296535 x^3 - 1117621833075 x^2 + 810428763375 x - 269055826875 --------------- p: x0^2 - 2 _p: x^2 - 2 _p: x^2 - 2 k: 1 --------------- p: x0^5 _p: x^5 _p: x^5 k: 1 --------------- p: 64 x0^4 - 120 x0^3 + 70 x0^2 - 15 x0 + 1 _p: 64 x^4 - 120 x^3 + 70 x^2 - 15 x + 1 _p: 64 x^4 - 120 x^3 + 70 x^2 - 15 x + 1 k: 5 --------------- p: 1024 x0^5 - 1984 x0^4 + 1240 x0^3 - 310 x0^2 + 31 x0 - 1 _p: 1024 x^5 - 1984 x^4 + 1240 x^3 - 310 x^2 + 31 x - 1 _p: 1024 x^5 - 1984 x^4 + 1240 x^3 - 310 x^2 + 31 x - 1 k: 6 --------------- p: 1024 x0^8 - 1984 x0^7 + 1240 x0^6 - 310 x0^5 + 31 x0^4 - x0^3 _p: 1024 x^8 - 1984 x^7 + 1240 x^6 - 310 x^5 + 31 x^4 - x^3 _p: 1024 x^8 - 1984 x^7 + 1240 x^6 - 310 x^5 + 31 x^4 - x^3 k: 6 --------------- p: x0^5 - x0 - 1 _p: x^5 - x - 1 _p: x^5 - x - 1 k: 2 --------------- p: 1000 x0^2 - 1001 x0 + 1 _p: 1000 x^2 - 1001 x + 1 _p: 1000 x^2 - 1001 x + 1 k: 11 --------------- p: 1024 x0^5 + 704 x0^4 - 440 x0^3 - 110 x0^2 + 11 x0 + 1 _p: 1024 x^5 + 704 x^4 - 440 x^3 - 110 x^2 + 11 x + 1 _p: 1024 x^5 + 704 x^4 - 440 x^3 - 110 x^2 + 11 x + 1 k: 5 --------------- p: 1024 x0^5 + 1984 x0^4 + 1240 x0^3 + 310 x0^2 + 31 x0 + 1 _p: 1024 x^5 + 1984 x^4 + 1240 x^3 + 310 x^2 + 31 x + 1 _p: 1024 x^5 + 1984 x^4 + 1240 x^3 + 310 x^2 + 31 x + 1 k: 6 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 _p: x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17 _p: x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17 k: 3 --------------- p: x0^33 - 4 x0^30 - 12 x0^27 - 12 x0^29 - 5 x0^26 + 18 x0^23 - 24 x0^28 + 42 x0^25 + 9 x0^22 - 2 x0^19 + 51 x0^24 - 19 x0^21 - 8 x0^18 - 10 x0^20 - 5 x0^17 + 5 x0^32 - 94 x0^16 + 3 x0^31 - 91 x0^15 + 22 x0^14 + 18 x0^13 + 62 x0^12 + 62 x0^11 + 19 x0^10 + 2 x0^9 + 10 x0^7 - 9 x0^6 + 10 x0^8 - 64 x0^5 - 44 x0^4 - 4 x0^3 + 40 x0^2 + 56 x0 + 28 _p: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 _p: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 k: 3 --------------- p: 900 x0^19 - 6000113760 x0^18 + 10000758403594816 x0^17 - 1264023965440000000 x0^16 + 39942400000000000000 x0^15 - 2700000000000 x0^14 + 18000341280000000000 x0^13 - 30002275210784448000000000 x0^12 + 3792071896320000000000000000 x0^11 - 119827200000000000000000000000 x0^10 + 2700000000000000000000 x0^9 - 18000341280000000000000000000 x0^8 + 30002275210784448000000000000000000 x0^7 - 3792071896320000000000000000000000000 x0^6 + 119827200000000000000000000000000000000 x0^5 - 900000000000000000000000000000 x0^4 + 6000113760000000000000000000000000000 x0^3 - 10000758403594816000000000000000000000000000 x0^2 + 1264023965440000000000000000000000000000000000 x0 - 39942400000000000000000000000000000000000000000 _p: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 _p: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 k: 1 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^2 + 5)^1 *(x - 2)^1 *(x + 2)^1 3 3 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^4 + x^2 - 20)^1 1 1 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^4 + x^2 - 20)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 factors: 1 *(x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17)^1 1 1 --------------- p: x0^4 - 404 x0^2 + 39204 factors: 1 *(x^2 - 242)^1 *(x^2 - 162)^1 2 2 --------------- p: - x0^8 + 3 x0^7 - 5 x0^6 + 4 x0^5 - 3 x0^4 + 4 x0^3 - 5 x0 + 3 factors: -1 *(x^2 - 2 x + 3)^1 *(x - 1)^1 *(x^5 - x^2 + 1)^1 3 3 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^2 + 5)^1 *(x - 2)^1 *(x + 2)^1 3 3 --------------- p: 11 x0^8 - 33 x0^7 + 55 x0^6 - 44 x0^5 + 33 x0^4 - 44 x0^3 + 55 x0 - 33 factors: 11 *(x^2 - 2 x + 3)^1 *(x - 1)^1 *(x^5 - x^2 + 1)^1 3 3 --------------- p: - 2 x0^2 + x0 + 1 factors: -1 *(x - 1)^1 *(2 x + 1)^1 2 2 --------------- p: 13 x0^18 - 1560 x0^17 + 86931 x0^16 - 2987504 x0^15 + 70923060 x0^14 - 1234660752 x0^13 + 16329634620 x0^12 - 167746338864 x0^11 + 1356661565766 x0^10 - 8703145006400 x0^9 + 44396368299114 x0^8 - 179697656333520 x0^7 + 572988784985188 x0^6 - 1420294907137392 x0^5 + 2677652713464300 x0^4 - 3706435590858000 x0^3 + 3548919735343125 x0^2 - 2098635449625000 x0 + 577124748646875 factors: 13 *(x - 5)^5 *(x - 3)^6 *(x - 11)^7 3 3 --------------- p: x0^30 + 30 x0^29 + 435 x0^28 + 4060 x0^27 + 27405 x0^26 + 142506 x0^25 + 593775 x0^24 + 2035800 x0^23 + 5852925 x0^22 + 14307150 x0^21 + 30045015 x0^20 + 54627300 x0^19 + 86493225 x0^18 + 119759850 x0^17 + 145422675 x0^16 + 155117520 x0^15 + 145422675 x0^14 + 119759850 x0^13 + 86493225 x0^12 + 54627300 x0^11 + 30045015 x0^10 + 14307150 x0^9 + 5852925 x0^8 + 2035800 x0^7 + 593775 x0^6 + 142506 x0^5 + 27405 x0^4 + 4060 x0^3 + 435 x0^2 + 30 x0 + 1 factors: 1 *(x + 1)^30 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^10 - 4 x^5 + 2)^1 *(x^50 - 10 x^40 + 38 x^30 - 2 x^25 - 100 x^20 - 40 x^15 + 121 x^10 - 38 x^5 - 17)^1 *(x^10 - 2 x^5 - 1)^1 3 3 --------------- p: x0^4 - 8 x0^2 factors: 1 *(x^2 - 8)^1 *(x)^2 2 2 --------------- p: x0^5 - 2 x0^3 + x0 - 1 factors: 1 *(x^5 - 2 x^3 + x - 1)^1 1 1 --------------- p: x0^25 - 4 x0^21 - 5 x0^20 + 6 x0^17 + 11 x0^16 + 10 x0^15 - 4 x0^13 - 7 x0^12 - 9 x0^11 - 10 x0^10 + x0^9 + x0^8 + x0^7 + x0^6 + 3 x0^5 + x0 - 1 factors: 1 *(x^5 - 2 x^3 + x - 1)^1 *(x^10 + x^8 - x^6 - 2 x^5 - x^4 - x^3 + 1)^2 2 2 --------------- p: x0^25 - 10 x0^21 - 10 x0^20 - 95 x0^17 - 470 x0^16 - 585 x0^15 - 40 x0^13 - 1280 x0^12 - 4190 x0^11 - 3830 x0^10 + 400 x0^9 + 1760 x0^8 + 760 x0^7 - 2280 x0^6 + 449 x0^5 + 640 x0^3 - 640 x0^2 + 240 x0 - 32 factors: 1 *(x^5 - 16 x - 32)^1 *(x^10 + 3 x^6 + 11 x^5 - 4 x^2 + 4 x - 1)^2 2 2 --------------- p: x0^10 factors: 1 *(x)^10 1 1 --------------- p: x0^2 - 1 factors: 1 *(x - 1)^1 *(x + 1)^1 2 2 --------------- p: - 2 x0^2 + 2 factors: -2 *(x - 1)^1 *(x + 1)^1 2 2 --------------- p: 0 factors: 0 0 0 --------------- p: 3 factors: 3 0 0 --------------- p: x0 + 1 factors: 1 *(x + 1)^1 1 1 --------------- p: x0 - 1 factors: 1 *(x - 1)^1 1 1 --------------- p: - x0 - 1 factors: -1 *(x + 1)^1 1 1 --------------- p: - x0 + 1 factors: -1 *(x - 1)^1 1 1 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 factors: 1 *(x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17)^1 1 1 --------------- p: x0^50 - 10 x0^40 + 38 x0^30 - 2 x0^25 - 100 x0^20 - 40 x0^15 + 121 x0^10 - 38 x0^5 - 17 factors: 1 *(x^50 - 10 x^40 + 38 x^30 - 2 x^25 - 100 x^20 - 40 x^15 + 121 x^10 - 38 x^5 - 17)^1 1 1 --------------- p: x0^50 + 50 x0^49 + 1225 x0^48 + 19600 x0^47 + 230300 x0^46 + 2118760 x0^45 + 15890700 x0^44 + 99884400 x0^43 + 536878650 x0^42 + 2505433700 x0^41 + 10272278160 x0^40 + 37353738400 x0^39 + 121399643300 x0^38 + 354860419800 x0^37 + 937844742400 x0^36 + 2250822995040 x0^35 + 4923651311775 x0^34 + 9847192955550 x0^33 + 18052759836925 x0^32 + 30403208994400 x0^31 + 47120735638718 x0^30 + 67304328049540 x0^29 + 88693946746330 x0^28 + 107922921291080 x0^27 + 121316591779290 x0^26 + 126008358402418 x0^25 + 120920161583200 x0^24 + 107156006937400 x0^23 + 87616235053150 x0^22 + 66015165625200 x0^21 + 45751888559970 x0^20 + 29095194780400 x0^19 + 16923012027925 x0^18 + 8964604200300 x0^17 + 4300690170275 x0^16 + 1854462502360 x0^15 + 711289628150 x0^14 + 239061007300 x0^13 + 68794843050 x0^12 + 16285796400 x0^11 + 2912250341 x0^10 + 293635660 x0^9 - 24769155 x0^8 - 18147080 x0^7 - 4334640 x0^6 - 792418 x0^5 - 181390 x0^4 - 47580 x0^3 - 8780 x0^2 - 840 x0 - 47 factors: 1 *(x^50 + 50 x^49 + 1225 x^48 + 19600 x^47 + 230300 x^46 + 2118760 x^45 + 15890700 x^44 + 99884400 x^43 + 536878650 x^42 + 2505433700 x^41 + 10272278160 x^40 + 37353738400 x^39 + 121399643300 x^38 + 354860419800 x^37 + 937844742400 x^36 + 2250822995040 x^35 + 4923651311775 x^34 + 9847192955550 x^33 + 18052759836925 x^32 + 30403208994400 x^31 + 47120735638718 x^30 + 67304328049540 x^29 + 88693946746330 x^28 + 107922921291080 x^27 + 121316591779290 x^26 + 126008358402418 x^25 + 120920161583200 x^24 + 107156006937400 x^23 + 87616235053150 x^22 + 66015165625200 x^21 + 45751888559970 x^20 + 29095194780400 x^19 + 16923012027925 x^18 + 8964604200300 x^17 + 4300690170275 x^16 + 1854462502360 x^15 + 711289628150 x^14 + 239061007300 x^13 + 68794843050 x^12 + 16285796400 x^11 + 2912250341 x^10 + 293635660 x^9 - 24769155 x^8 - 18147080 x^7 - 4334640 x^6 - 792418 x^5 - 181390 x^4 - 47580 x^3 - 8780 x^2 - 840 x - 47)^1 1 1 --------------- p: x0^4 - 404 x0^2 + 39204 factors: 1 *(x^2 - 242)^1 *(x^2 - 162)^1 2 2 --------------- p: x0^25 - 31260 x0^20 + 383062540 x0^15 - 2590282000080 x0^10 + 7334282001000080 x0^5 - 9552011721875500032 factors: 1 *(x^5 - 15552)^1 *(x^20 - 15708 x^15 + 138771724 x^10 - 432104148432 x^5 + 614198284585616)^1 2 2 --------------- p: x0^25 - 3125 x0^21 - 15630 x0^20 + 3888750 x0^17 + 38684375 x0^16 + 95765635 x0^15 - 2489846500 x0^13 - 37650481875 x0^12 - 190548065625 x0^11 - 323785250010 x0^10 + 750249453025 x0^9 + 14962295699875 x0^8 + 111775113235000 x0^7 + 370399286731250 x0^6 + 362903064503129 x0^5 - 2387239013984400 x0^4 - 23872390139844000 x0^3 - 119361950699220000 x0^2 - 298404876748050000 x0 - 298500366308609376 factors: 1 *(x^5 - 1296 x - 7776)^1 *(x^20 - 1829 x^16 - 7854 x^15 + 1518366 x^12 + 14283287 x^11 + 34692931 x^10 - 522044164 x^8 - 7332527907 x^7 - 34519187337 x^6 - 54013018554 x^5 + 73680216481 x^4 + 1399924113139 x^3 + 10020509441416 x^2 + 31977213952754 x + 38387392786601)^1 2 2 --------------- p: - x0^27 + 54 x0^24 - 324 x0^21 + 17496 x0^18 - 34992 x0^15 + 1889568 x0^12 - 1259712 x0^9 + 68024448 x0^6 factors: -1 *(x^3 - 54)^1 *(x^6 + 108)^3 *(x)^6 3 3 --------------- p: x0^27 - 648 x0^24 + 105300 x0^21 - 3639168 x0^18 - 521485776 x0^15 - 40761760896 x0^12 - 8435982634560 x0^9 - 326907538633728 x0^6 - 904871002816512 x0^3 - 34835065137266688 factors: 1 *(x^3 - 432)^1 *(x^6 + 6912)^1 *(x^6 - 324 x^3 + 37044)^1 *(x^6 + 108)^1 *(x^3 + 54)^2 5 5 --------------- p: x0^54 - 54 x0^52 - 1296 x0^51 + 1404 x0^50 + 607104 x0^48 - 1057536 x0^47 - 22401792 x0^46 - 131347008 x0^45 + 385174656 x0^44 + 4556424960 x0^43 + 10518648048 x0^42 + 54432 x0^49 - 69060148992 x0^41 - 565617303648 x0^40 + 445518434304 x0^39 + 8781044678784 x0^38 + 32843377234944 x0^37 - 131307918402048 x0^36 - 1186720516915200 x0^35 + 736520460602112 x0^34 + 18979903288608768 x0^33 - 112345961528001024 x0^32 + 1270197317039357952 x0^31 - 1541064534072996096 x0^30 + 16614053352447639552 x0^29 - 64121868468546937344 x0^28 - 441603923048400752640 x0^27 + 3907490603726606515200 x0^26 - 9940058828597411831808 x0^25 + 37842357616860755976192 x0^24 - 207493394698593727119360 x0^23 + 7974899726119384485888 x0^22 + 2119713138903354441449472 x0^21 - 1236506243331227840225280 x0^20 + 15633879365645789187538944 x0^19 + 135073233715906678961491968 x0^18 - 283501898470995378000297984 x0^17 - 103789476798964165693218816 x0^16 + 2149475050405063712005816320 x0^15 + 11401046311106270759794900992 x0^14 - 42594459367486176885626634240 x0^13 + 144038627307565998906953170944 x0^12 + 51604015948240925730371272704 x0^11 - 250947536887982891503528574976 x0^10 + 3480976544954551737609272426496 x0^9 + 10434520207534987392729183682560 x0^8 + 42130058836708565940278805921792 x0^7 + 28392667475502927445585073012736 x0^6 + 292548838778373337946194100355072 x0^5 + 732626185252271205256762862075904 x0^4 + 490660485015010178556685461749760 x0^3 + 1356203807400073270301299496189952 x0^2 + 436594705270365747351637721088000 x0 + 1395158047392035876769798396313600 factors: 1 *(x^6 - 6 x^4 - 864 x^3 + 12 x^2 - 5184 x + 186616)^1 *(x^12 - 12 x^10 + 60 x^8 + 56 x^6 + 6720 x^4 + 12768 x^2 + 13456)^1 *(x^12 - 12 x^10 - 648 x^9 + 60 x^8 + 178904 x^6 + 15552 x^5 + 1593024 x^4 - 24045984 x^3 + 5704800 x^2 - 143995968 x + 1372010896)^1 *(x^12 - 12 x^10 + 60 x^8 + 13664 x^6 + 414960 x^4 + 829248 x^2 + 47886400)^1 *(x^6 - 6 x^4 + 108 x^3 + 12 x^2 + 648 x + 2908)^2 5 5 --------------- p: x0^2 + x0 q: x0 r: 0 --------------- p: x0^2 + x0 + 1 q: x0 r: 1 --------------- p: x0^2 + 2 x0 + 1 q: 2 x0 + 2 r: 0 ------ p1: x^3 - 6 x^2 + 11 x - 6 p2: x^2 - 3 x + 2 r: x - 3 expected: x - 3 ------ p1: 2 x^3 - 12 x^2 + 22 x - 12 p2: x^2 - 3 x + 2 r: 2 x - 6 expected: 2 x - 6 ------ p1: 2 x^3 - 12 x^2 + 22 x - 12 p2: x^3 - 7 x^2 + 14 x - 8 ------ p1: x - 3 p2: x - 1 ------ p1: 0 p2: x^3 - 7 x^2 + 14 x - 8 r: 0 expected: 0 ------ p1: x^3 - 7 x^2 + 14 x - 8 p2: 0 ------ p1: 0 p2: 0 ------ p1: 2 x - 2 p2: x - 1 r: 2 expected: 2 ------ p1: 2 x - 2 p2: 4 x - 4 ------ p1: 6 x - 4 p2: 2 r: 3 x - 2 expected: 3 x - 2 isolating roots of: x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34 (isolate time :time 0.01 :before-memory 4.83 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.95) square free part: x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34 (sqf time :time 0.00 :before-memory 4.95 :after-memory 4.95) (fourier time :time 0.00 :before-memory 4.95 :after-memory 4.99) num. roots: 6 sign var(-oo): 16 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1.203125, 1.21875) (1.1875, 1.203125) (0, 1) (-0.875, -0.8125) (-0.8125, -0.75)(interval check :time 0.01 :before-memory 4.99 :after-memory 5.10) isolating roots of: x^2 - 3 x + 2 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - 3 x + 2 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 2 intervals: (0, 2)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - 2 x^4 + x^3 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - x (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 0 intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - x - 1 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^5 - x - 1 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 1 sign var(-oo): 2 sign var(+oo): 1 roots: intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^6 - x^5 - 16 x^4 + 10 x^3 + 69 x^2 - 9 x - 54 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.77) square free part: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 (sqf time :time 0.00 :before-memory 4.77 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 5 sign var(-oo): 5 sign var(+oo): 0 roots: -2 intervals: (2, 4) (0, 2) (-4, -2) (-2, 0)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 100000000 x^2 - 630000 x + 992 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 100000000 x^2 - 630000 x + 992 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.76) (fourier time :time 0.00 :before-memory 4.76 :after-memory 4.76) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: intervals: (0.0031738281?, 0.0034179687?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.76 :after-memory 4.76) isolating roots of: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 3 sign var(-oo): 3 sign var(+oo): 0 roots: intervals: (0.0032958984?, 0.0034179687?) (0.0031738281?, 0.0032958984?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (isolate time :time 0.00 :before-memory 4.77 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.87) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.87 :after-memory 4.87) (fourier time :time 0.00 :before-memory 4.87 :after-memory 4.87) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.87 :after-memory 4.87) isolating roots of: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.91) (sturm time :time 0.00 :before-memory 4.91 :after-memory 4.91) square free part: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (sqf time :time 0.00 :before-memory 4.91 :after-memory 4.91) (fourier time :time 0.00 :before-memory 4.91 :after-memory 4.91) num. roots: 11 sign var(-oo): 11 sign var(+oo): 0 roots: 64 32 16 8 4 2 0.5 0.25 0.125 0.0625 intervals: (0, 0.0625)(interval check :time 0.00 :before-memory 4.91 :after-memory 4.91) isolating roots of: 1000000 x^22 - 2334000 x^21 + 1361889 x^20 - 4000000 x^17 + 9336000 x^16 - 5447556 x^15 - 2000000 x^14 + 4668000 x^13 + 3276222 x^12 - 14004000 x^11 + 8171334 x^10 + 4000000 x^9 - 9336000 x^8 + 1447556 x^7 + 10336000 x^6 - 7781556 x^5 - 638111 x^4 + 4668000 x^3 - 1723778 x^2 - 2334000 x + 1361889 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.92) (sturm time :time 0.00 :before-memory 4.92 :after-memory 4.94) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.94 :after-memory 4.94) (fourier time :time 0.00 :before-memory 4.94 :after-memory 4.94) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.93) square free part: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (sqf time :time 0.00 :before-memory 4.93 :after-memory 4.93) (fourier time :time 0.00 :before-memory 4.93 :after-memory 4.94) num. roots: 3 sign var(-oo): 10 sign var(+oo): 7 roots: intervals: (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.94) (sturm time :time 0.00 :before-memory 4.94 :after-memory 4.98) square free part: x^25 + 5 x^24 + 3 x^23 - 2 x^22 - x^21 - 12 x^20 - 8 x^19 - 8 x^18 + 3 x^17 + 6 x^16 - 20 x^15 + 5 x^14 + 14 x^13 - x^12 + 26 x^11 + 15 x^10 - 6 x^9 - x^8 - 6 x^7 + 13 x^6 - x^5 - 7 x^4 - x^3 + 6 x^2 + 14 x + 14 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.99) num. roots: 5 sign var(-oo): 15 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1, 1.25) (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.99 :after-memory 4.99) isolating roots of: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 (isolate time :time 0.00 :before-memory 4.97 :after-memory 4.98) (sturm time :time 0.00 :before-memory 4.98 :after-memory 4.98) square free part: 15 x^7 - 50000948 x^6 + 3160000000 x^5 - 15000000000 x^2 + 50000948000000000 x - 3160000000000000000 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.98) num. roots: 3 sign var(-oo): 5 sign var(+oo): 2 roots: intervals: (2097152, 4194304) (63.125, 63.25) (63, 63.125)(interval check :time 0.00 :before-memory 4.98 :after-memory 4.98) upolynomial sturm seq... x^16 - 136 x^14 + 6476 x^12 - 141912 x^10 + 1513334 x^8 - 7453176 x^6 + 13950764 x^4 - 5596840 x^2 + 46225 16 x^31 - 3184 x^29 + 266896 x^27 - 12504176 x^25 + 365186736 x^23 - 7016366800 x^21 + 91296632240 x^19 - 816781071440 x^17 + 5048153319680 x^15 - 21441099366400 x^13 + 61546497478656 x^11 - 115751532406784 x^9 + 135609801916416 x^7 - 91405602717696 x^5 + 30893429293056 x^3 - 3713794375680 x -1 x^16 + 136 x^14 - 6476 x^12 + 141912 x^10 - 1513334 x^8 + 7453176 x^6 - 13950764 x^4 + 5596840 x^2 - 46225 -1127661677367 x^15 + 80685790700977 x^13 - 2102726493398207 x^11 + 24514705741043569 x^9 - 126650346236335533 x^7 + 242589935638940027 x^5 - 97920676059890653 x^3 + 808873659526115 x -14535239484187 x^14 + 1040002105846097 x^12 - 27102803643492427 x^10 + 315975682124035209 x^8 - 1632414202846505513 x^6 + 3126764251346253547 x^4 - 1262106621739038833 x^2 + 10425232207257915 -167716660671508667641 x^13 + 8401333185842706888530 x^11 - 134511192706723391471287 x^9 + 821751607340566559868924 x^7 - 1705905612159036016144823 x^5 + 712068977650176642124114 x^3 - 10375158858866309689337 x -46388284262096386474101 x^12 + 2297177756962323065528714 x^10 - 36402788774274131831901243 x^8 + 220799657664499131685981196 x^6 - 455864002600254932618175227 x^4 + 187578869474987904058942602 x^2 - 1550540527908097632341045 -4781966315926860973699105567 x^11 + 144464930716069568218159788243 x^9 - 1169427211740981342868979217166 x^7 + 2878829227828597116284471589262 x^5 - 1689381939540688922079704055699 x^3 + 237821093214524613444114401119 x -5108074971655853552979774902899 x^10 + 142894793305009146385089605918283 x^8 - 1099846101471960685926906955737574 x^6 + 2506082302169705625991475997146542 x^4 - 1056500552045609715416888450812743 x^2 + 8841855718148765940369646193383 -98120336193551253677921935999799283 x^9 + 1282821860598696804541403875934437348 x^7 - 4888580553822740399599176292389184402 x^5 + 6426442235002716205008267522870828260 x^3 - 2106362515913203012578123667196293235 x -1561728884476847525112813341042616474011 x^8 + 17345591286879038944880672380421451809732 x^6 - 44557170670678936833666488386470071966338 x^4 + 19428144317367539496215506533408444604612 x^2 - 181424501621876268050477659663628874267 -48718567339545057971709193441047126509 x^7 + 527268188685058585740868192019254318421 x^5 - 1313868868153889289084379514485509676183 x^3 + 528737651333486566371183339800760756103 x -220162280897461356833414966265382012563279 x^6 + 1211314214555794584950776751645547954082463 x^4 - 1230799847361844990126616667707906905070125 x^2 + 90080631010818812189690298672496136915141 -4567940256921478185902666831705495050259 x^5 + 18353182476718620132475356289264733969914 x^3 - 8965983880068785028294729109994152212011 x -16568849839314393995007704109417733998971 x^4 + 40499812984358514784159551770437344409066 x^2 - 4567940256921478185902666831705495050259 -211307826015503935324666261 x^3 + 226566446302093673740485799 x -1051673563609695326877268183 x^2 + 211307826015503935324666261 -1 x -1 p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (1/3, 7/5) (0.3333333333?, 1.4) after (1/2, 21/2^4) (0.5, 1.3125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (1/2, 7/5) (0.5, 1.4) after (1/2, 21/2^4) (0.5, 1.3125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (3/7, 3/2) (0.4285714285?, 1.5) after (3/2^2, 3/2) (0.75, 1.5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (0, 3/2) (0, 1.5) after (0, 3/2) (0, 1.5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (0, 23/21) (0, 1.0952380952?) after (0, 69/2^6) (0, 1.078125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (7/2, 5) (3.5, 5) after (7/2, 5) (3.5, 5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (999/1000, 1001/1000) (0.999, 1.001) after (1047951/2^20, 524475/2^19) (0.9994039535?, 1.0003566741?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (9999/10000, 10001/10000) (0.9999, 1.0001) after (67103289/2^26, 8389161/2^23) (0.9999169260?, 1.0000659227?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (39999/10000, 40001/10000) (3.9999, 4.0001) after (268433289/2^26, 1073746843/2^28) (3.9999677091?, 4.0000186972?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 q: 81 x^4 - 702 x^3 + 2079 x^2 - 2418 x + 880 p: 24 x^4 - 50 x^3 + 35 x^2 - 10 x + 1 Refining intervals p: x0^5 - x0 - 1 before (1, 2) new (2448013/2^21, 1224007/2^20) as decimal: 1.16730356216430664062? p: x0^2 - 2 before (1, 2) new (1136276788042180458070828951474823657989790988021617205464301/2^199, 4545107152168721832283315805899294631959163952086468821857205/2^201) as decimal: 1.4142135623730950488016887242096980785696718753769480731766796228945468916789744311432405157464679368195737862332593934694025131023094144793931710987557973124330301661899511600495316088199615478515625 Refinable intervals p: 4 x0^3 - 27 x0^2 + 56 x0 - 33 before (1, 3) new root: 11/2^2 before (2, 3) new root: 11/2^2 before (5/2, 3) new root: 11/2^2 p: 5 x0^3 - 31 x0^2 + 59 x0 - 33 before (1, 3) new (2, 5/2) before (2, 3) new (2, 5/2) before (3/2, 3) new (3/2, 9/2^2) before (1, 5/2) new (7/2^2, 5/2) before (3/2, 5/2) new (3/2, 5/2) p: x0^3 - 6 x0^2 + 11 x0 - 6 before (1, 3) new root: 2 Sturm Seq upolynomial sturm seq... 7 x^10 + 3 x^9 + x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 70 x^9 + 27 x^8 + 8 x^7 + 6 x^5 + 40 x^3 + 30 x^2 + 16 x + 2 -59 x^8 + 24 x^7 - 280 x^6 + 18 x^5 - 4200 x^4 - 4780 x^3 - 4390 x^2 - 1212 x - 5594 1500 x^7 + 1203 x^6 + 24666 x^5 + 47840 x^4 + 48052 x^3 + 27528 x^2 + 38592 x + 26146 -136383 x^6 - 156626 x^5 + 987760 x^4 + 1288828 x^3 + 900792 x^2 + 434888 x + 1473094 -447977461 x^5 - 722331988 x^4 - 657814810 x^3 - 358104882 x^2 - 658907000 x - 254616997 -35151054357362 x^4 - 42237581647498 x^3 - 34012218049812 x^2 - 13572653161293 x - 46516612622356 32579335587662 x^3 + 71643021991321 x^2 - 50595120825621 x + 112457692722850 2904057856460384409 x^2 - 2842891454868987857 x + 2936283658205629262 -2803684606075989760487 x - 1222930252896030111592 -1 _p: 4 x^3 - 12 x^2 - x + 3 _r: 16 x^2 - 40 x - 24 _q: 16 x^2 - 40 x - 24 isolating roots of: x^2 - 3 x + 2 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - 3 x + 2 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 2 intervals: (0, 2)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - 2 x^4 + x^3 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - x (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 0 intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - x - 1 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^5 - x - 1 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 1 sign var(-oo): 2 sign var(+oo): 1 roots: intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^6 - x^5 - 16 x^4 + 10 x^3 + 69 x^2 - 9 x - 54 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.77) square free part: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 (sqf time :time 0.00 :before-memory 4.77 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 5 sign var(-oo): 5 sign var(+oo): 0 roots: -2 intervals: (2, 4) (0, 2) (-4, -2) (-2, 0)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 100000000 x^2 - 630000 x + 992 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 100000000 x^2 - 630000 x + 992 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.76) (fourier time :time 0.00 :before-memory 4.76 :after-memory 4.76) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: intervals: (0.0031738281?, 0.0034179687?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.76 :after-memory 4.76) isolating roots of: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 3 sign var(-oo): 3 sign var(+oo): 0 roots: intervals: (0.0032958984?, 0.0034179687?) (0.0031738281?, 0.0032958984?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (isolate time :time 0.00 :before-memory 4.77 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.87) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.87 :after-memory 4.87) (fourier time :time 0.00 :before-memory 4.87 :after-memory 4.87) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.87 :after-memory 4.87) isolating roots of: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.91) (sturm time :time 0.00 :before-memory 4.91 :after-memory 4.91) square free part: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (sqf time :time 0.00 :before-memory 4.91 :after-memory 4.91) (fourier time :time 0.00 :before-memory 4.91 :after-memory 4.91) num. roots: 11 sign var(-oo): 11 sign var(+oo): 0 roots: 64 32 16 8 4 2 0.5 0.25 0.125 0.0625 intervals: (0, 0.0625)(interval check :time 0.00 :before-memory 4.91 :after-memory 4.91) isolating roots of: 1000000 x^22 - 2334000 x^21 + 1361889 x^20 - 4000000 x^17 + 9336000 x^16 - 5447556 x^15 - 2000000 x^14 + 4668000 x^13 + 3276222 x^12 - 14004000 x^11 + 8171334 x^10 + 4000000 x^9 - 9336000 x^8 + 1447556 x^7 + 10336000 x^6 - 7781556 x^5 - 638111 x^4 + 4668000 x^3 - 1723778 x^2 - 2334000 x + 1361889 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.92) (sturm time :time 0.00 :before-memory 4.92 :after-memory 4.94) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.94 :after-memory 4.94) (fourier time :time 0.00 :before-memory 4.94 :after-memory 4.94) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.93) square free part: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (sqf time :time 0.00 :before-memory 4.93 :after-memory 4.93) (fourier time :time 0.00 :before-memory 4.93 :after-memory 4.94) num. roots: 3 sign var(-oo): 10 sign var(+oo): 7 roots: intervals: (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.94) (sturm time :time 0.00 :before-memory 4.94 :after-memory 4.98) square free part: x^25 + 5 x^24 + 3 x^23 - 2 x^22 - x^21 - 12 x^20 - 8 x^19 - 8 x^18 + 3 x^17 + 6 x^16 - 20 x^15 + 5 x^14 + 14 x^13 - x^12 + 26 x^11 + 15 x^10 - 6 x^9 - x^8 - 6 x^7 + 13 x^6 - x^5 - 7 x^4 - x^3 + 6 x^2 + 14 x + 14 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.99) num. roots: 5 sign var(-oo): 15 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1, 1.25) (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.99 :after-memory 4.99) isolating roots of: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 (isolate time :time 0.00 :before-memory 4.97 :after-memory 4.98) (sturm time :time 0.00 :before-memory 4.98 :after-memory 4.98) square free part: 15 x^7 - 50000948 x^6 + 3160000000 x^5 - 15000000000 x^2 + 50000948000000000 x - 3160000000000000000 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.98) num. roots: 3 sign var(-oo): 5 sign var(+oo): 2 roots: intervals: (2097152, 4194304) (63.125, 63.25) (63, 63.125)(interval check :time 0.00 :before-memory 4.98 :after-memory 4.98) p: x0^5 + 2 x0^4 - 10 x0^3 - 20 x0^2 + 9 x0 + 18 q: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 degree(q): 5 expanded q: 18 9 -20 -10 2 1 new q: 2 x^5 + 3 x^4 - 9 x^3 - 19 x^2 + 10 x + 19 new q^2: 4 x^10 + 12 x^9 - 27 x^8 - 130 x^7 + 7 x^6 + 478 x^5 + 295 x^4 - 722 x^3 - 622 x^2 + 380 x + 361 new (q^2)^3: 64 x^30 + 576 x^29 + 432 x^28 - 12288 x^27 - 40020 x^26 + 79284 x^25 + 586149 x^24 + 235698 x^23 - 4140627 x^22 - 6895030 x^21 + 15251184 x^20 + 49873788 x^19 - 16794929 x^18 - 201145074 x^17 - 108039945 x^16 + 499210576 x^15 + 614825733 x^14 - 724261014 x^13 - 1616514344 x^12 + 376952670 x^11 + 2580727584 x^10 + 671496040 x^9 - 2571049230 x^8 - 1605401010 x^7 + 1474343885 x^6 + 1530682218 x^5 - 329384703 x^4 - 739359046 x^3 - 86793786 x^2 + 148565940 x + 47045881 Testing Z_p GCD in Z[x] _p: x^4 + 2 x^3 + 2 x^2 + x _q: x^3 + x + 1 gcd: 1 _p: x^4 + 2 x^3 + 2 x^2 + x _q: x^3 + x + 1 subresultant_gcd: 1 GCD in Z_3[x] _p: x^4 - x^3 - x^2 + x _q: x^3 + x + 1 gcd: x - 1 _p: x^4 - x^3 - x^2 + x _q: x^3 + x + 1 subresultant_gcd: x - 1 Testing Z_p GCD in Z[x] _p: x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 _q: x^6 + 5 x^5 + 9 x^4 + 5 x^2 + 5 x gcd: 1 _p: x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 _q: x^6 + 5 x^5 + 9 x^4 + 5 x^2 + 5 x subresultant_gcd: 1 GCD in Z_13[x] _p: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 _q: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x gcd: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 _p: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 _q: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x subresultant_gcd: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 Extended GCD GCD in Z_13[x] A: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x B: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 U: x^2 - 5 x + 4 V: -1 D: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 Extended GCD in Z_7 GCD in Z_7[x] A: x^3 + 2 B: -1 x^2 - 1 U: 3 x - 1 V: 3 x^2 - x - 3 D: 1 PASS (test upolynomial :time 0.52 :before-memory 4.69 :after-memory 4.69) Testing GCD _p: 13 x^18 - 1560 x^17 + 86931 x^16 - 2987504 x^15 + 70923060 x^14 - 1234660752 x^13 + 16329634620 x^12 - 167746338864 x^11 + 1356661565766 x^10 - 8703145006400 x^9 + 44396368299114 x^8 - 179697656333520 x^7 + 572988784985188 x^6 - 1420294907137392 x^5 + 2677652713464300 x^4 - 3706435590858000 x^3 + 3548919735343125 x^2 - 2098635449625000 x + 577124748646875 _q: 234 x^17 - 26520 x^16 + 1390896 x^15 - 44812560 x^14 + 992922840 x^13 - 16050589776 x^12 + 195955615440 x^11 - 1845209727504 x^10 + 13566615657660 x^9 - 78328305057600 x^8 + 355170946392912 x^7 - 1257883594334640 x^6 + 3437932709911128 x^5 - 7101474535686960 x^4 + 10710610853857200 x^3 - 11119306772574000 x^2 + 7097839470686250 x - 2098635449625000 gcd: 13 x^15 - 1313 x^14 + 60645 x^13 - 1697865 x^12 + 32200545 x^11 - 437963877 x^10 + 4411517097 x^9 - 33504144765 x^8 + 193432514535 x^7 - 849099998435 x^6 + 2811735445519 x^5 - 6901018131579 x^4 + 12159189854955 x^3 - 14529083829975 x^2 + 10535573923875 x - 3497725749375 _p: 13 x^18 - 1560 x^17 + 86931 x^16 - 2987504 x^15 + 70923060 x^14 - 1234660752 x^13 + 16329634620 x^12 - 167746338864 x^11 + 1356661565766 x^10 - 8703145006400 x^9 + 44396368299114 x^8 - 179697656333520 x^7 + 572988784985188 x^6 - 1420294907137392 x^5 + 2677652713464300 x^4 - 3706435590858000 x^3 + 3548919735343125 x^2 - 2098635449625000 x + 577124748646875 _q: 234 x^17 - 26520 x^16 + 1390896 x^15 - 44812560 x^14 + 992922840 x^13 - 16050589776 x^12 + 195955615440 x^11 - 1845209727504 x^10 + 13566615657660 x^9 - 78328305057600 x^8 + 355170946392912 x^7 - 1257883594334640 x^6 + 3437932709911128 x^5 - 7101474535686960 x^4 + 10710610853857200 x^3 - 11119306772574000 x^2 + 7097839470686250 x - 2098635449625000 subresultant_gcd: x^15 - 101 x^14 + 4665 x^13 - 130605 x^12 + 2476965 x^11 - 33689529 x^10 + 339347469 x^9 - 2577241905 x^8 + 14879424195 x^7 - 65315384495 x^6 + 216287341963 x^5 - 530847548583 x^4 + 935322296535 x^3 - 1117621833075 x^2 + 810428763375 x - 269055826875 --------------- p: x0^2 - 2 _p: x^2 - 2 _p: x^2 - 2 k: 1 --------------- p: x0^5 _p: x^5 _p: x^5 k: 1 --------------- p: 64 x0^4 - 120 x0^3 + 70 x0^2 - 15 x0 + 1 _p: 64 x^4 - 120 x^3 + 70 x^2 - 15 x + 1 _p: 64 x^4 - 120 x^3 + 70 x^2 - 15 x + 1 k: 5 --------------- p: 1024 x0^5 - 1984 x0^4 + 1240 x0^3 - 310 x0^2 + 31 x0 - 1 _p: 1024 x^5 - 1984 x^4 + 1240 x^3 - 310 x^2 + 31 x - 1 _p: 1024 x^5 - 1984 x^4 + 1240 x^3 - 310 x^2 + 31 x - 1 k: 6 --------------- p: 1024 x0^8 - 1984 x0^7 + 1240 x0^6 - 310 x0^5 + 31 x0^4 - x0^3 _p: 1024 x^8 - 1984 x^7 + 1240 x^6 - 310 x^5 + 31 x^4 - x^3 _p: 1024 x^8 - 1984 x^7 + 1240 x^6 - 310 x^5 + 31 x^4 - x^3 k: 6 --------------- p: x0^5 - x0 - 1 _p: x^5 - x - 1 _p: x^5 - x - 1 k: 2 --------------- p: 1000 x0^2 - 1001 x0 + 1 _p: 1000 x^2 - 1001 x + 1 _p: 1000 x^2 - 1001 x + 1 k: 11 --------------- p: 1024 x0^5 + 704 x0^4 - 440 x0^3 - 110 x0^2 + 11 x0 + 1 _p: 1024 x^5 + 704 x^4 - 440 x^3 - 110 x^2 + 11 x + 1 _p: 1024 x^5 + 704 x^4 - 440 x^3 - 110 x^2 + 11 x + 1 k: 5 --------------- p: 1024 x0^5 + 1984 x0^4 + 1240 x0^3 + 310 x0^2 + 31 x0 + 1 _p: 1024 x^5 + 1984 x^4 + 1240 x^3 + 310 x^2 + 31 x + 1 _p: 1024 x^5 + 1984 x^4 + 1240 x^3 + 310 x^2 + 31 x + 1 k: 6 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 _p: x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17 _p: x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17 k: 3 --------------- p: x0^33 - 4 x0^30 - 12 x0^27 - 12 x0^29 - 5 x0^26 + 18 x0^23 - 24 x0^28 + 42 x0^25 + 9 x0^22 - 2 x0^19 + 51 x0^24 - 19 x0^21 - 8 x0^18 - 10 x0^20 - 5 x0^17 + 5 x0^32 - 94 x0^16 + 3 x0^31 - 91 x0^15 + 22 x0^14 + 18 x0^13 + 62 x0^12 + 62 x0^11 + 19 x0^10 + 2 x0^9 + 10 x0^7 - 9 x0^6 + 10 x0^8 - 64 x0^5 - 44 x0^4 - 4 x0^3 + 40 x0^2 + 56 x0 + 28 _p: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 _p: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 k: 3 --------------- p: 900 x0^19 - 6000113760 x0^18 + 10000758403594816 x0^17 - 1264023965440000000 x0^16 + 39942400000000000000 x0^15 - 2700000000000 x0^14 + 18000341280000000000 x0^13 - 30002275210784448000000000 x0^12 + 3792071896320000000000000000 x0^11 - 119827200000000000000000000000 x0^10 + 2700000000000000000000 x0^9 - 18000341280000000000000000000 x0^8 + 30002275210784448000000000000000000 x0^7 - 3792071896320000000000000000000000000 x0^6 + 119827200000000000000000000000000000000 x0^5 - 900000000000000000000000000000 x0^4 + 6000113760000000000000000000000000000 x0^3 - 10000758403594816000000000000000000000000000 x0^2 + 1264023965440000000000000000000000000000000000 x0 - 39942400000000000000000000000000000000000000000 _p: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 _p: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 k: 1 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^2 + 5)^1 *(x - 2)^1 *(x + 2)^1 3 3 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^4 + x^2 - 20)^1 1 1 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^4 + x^2 - 20)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34)^1 1 1 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 factors: 1 *(x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17)^1 1 1 --------------- p: x0^4 - 404 x0^2 + 39204 factors: 1 *(x^2 - 242)^1 *(x^2 - 162)^1 2 2 --------------- p: - x0^8 + 3 x0^7 - 5 x0^6 + 4 x0^5 - 3 x0^4 + 4 x0^3 - 5 x0 + 3 factors: -1 *(x^2 - 2 x + 3)^1 *(x - 1)^1 *(x^5 - x^2 + 1)^1 3 3 --------------- p: x0^4 + x0^2 - 20 factors: 1 *(x^2 + 5)^1 *(x - 2)^1 *(x + 2)^1 3 3 --------------- p: 11 x0^8 - 33 x0^7 + 55 x0^6 - 44 x0^5 + 33 x0^4 - 44 x0^3 + 55 x0 - 33 factors: 11 *(x^2 - 2 x + 3)^1 *(x - 1)^1 *(x^5 - x^2 + 1)^1 3 3 --------------- p: - 2 x0^2 + x0 + 1 factors: -1 *(x - 1)^1 *(2 x + 1)^1 2 2 --------------- p: 13 x0^18 - 1560 x0^17 + 86931 x0^16 - 2987504 x0^15 + 70923060 x0^14 - 1234660752 x0^13 + 16329634620 x0^12 - 167746338864 x0^11 + 1356661565766 x0^10 - 8703145006400 x0^9 + 44396368299114 x0^8 - 179697656333520 x0^7 + 572988784985188 x0^6 - 1420294907137392 x0^5 + 2677652713464300 x0^4 - 3706435590858000 x0^3 + 3548919735343125 x0^2 - 2098635449625000 x0 + 577124748646875 factors: 13 *(x - 5)^5 *(x - 3)^6 *(x - 11)^7 3 3 --------------- p: x0^30 + 30 x0^29 + 435 x0^28 + 4060 x0^27 + 27405 x0^26 + 142506 x0^25 + 593775 x0^24 + 2035800 x0^23 + 5852925 x0^22 + 14307150 x0^21 + 30045015 x0^20 + 54627300 x0^19 + 86493225 x0^18 + 119759850 x0^17 + 145422675 x0^16 + 155117520 x0^15 + 145422675 x0^14 + 119759850 x0^13 + 86493225 x0^12 + 54627300 x0^11 + 30045015 x0^10 + 14307150 x0^9 + 5852925 x0^8 + 2035800 x0^7 + 593775 x0^6 + 142506 x0^5 + 27405 x0^4 + 4060 x0^3 + 435 x0^2 + 30 x0 + 1 factors: 1 *(x + 1)^30 1 1 --------------- p: x0^70 - 6 x0^65 - x0^60 + 60 x0^55 - 54 x0^50 - 230 x0^45 + 274 x0^40 + 542 x0^35 - 615 x0^30 - 1120 x0^25 + 1500 x0^20 - 160 x0^15 - 395 x0^10 + 76 x0^5 + 34 factors: 1 *(x^10 - 4 x^5 + 2)^1 *(x^50 - 10 x^40 + 38 x^30 - 2 x^25 - 100 x^20 - 40 x^15 + 121 x^10 - 38 x^5 - 17)^1 *(x^10 - 2 x^5 - 1)^1 3 3 --------------- p: x0^4 - 8 x0^2 factors: 1 *(x^2 - 8)^1 *(x)^2 2 2 --------------- p: x0^5 - 2 x0^3 + x0 - 1 factors: 1 *(x^5 - 2 x^3 + x - 1)^1 1 1 --------------- p: x0^25 - 4 x0^21 - 5 x0^20 + 6 x0^17 + 11 x0^16 + 10 x0^15 - 4 x0^13 - 7 x0^12 - 9 x0^11 - 10 x0^10 + x0^9 + x0^8 + x0^7 + x0^6 + 3 x0^5 + x0 - 1 factors: 1 *(x^5 - 2 x^3 + x - 1)^1 *(x^10 + x^8 - x^6 - 2 x^5 - x^4 - x^3 + 1)^2 2 2 --------------- p: x0^25 - 10 x0^21 - 10 x0^20 - 95 x0^17 - 470 x0^16 - 585 x0^15 - 40 x0^13 - 1280 x0^12 - 4190 x0^11 - 3830 x0^10 + 400 x0^9 + 1760 x0^8 + 760 x0^7 - 2280 x0^6 + 449 x0^5 + 640 x0^3 - 640 x0^2 + 240 x0 - 32 factors: 1 *(x^5 - 16 x - 32)^1 *(x^10 + 3 x^6 + 11 x^5 - 4 x^2 + 4 x - 1)^2 2 2 --------------- p: x0^10 factors: 1 *(x)^10 1 1 --------------- p: x0^2 - 1 factors: 1 *(x - 1)^1 *(x + 1)^1 2 2 --------------- p: - 2 x0^2 + 2 factors: -2 *(x - 1)^1 *(x + 1)^1 2 2 --------------- p: 0 factors: 0 0 0 --------------- p: 3 factors: 3 0 0 --------------- p: x0 + 1 factors: 1 *(x + 1)^1 1 1 --------------- p: x0 - 1 factors: 1 *(x - 1)^1 1 1 --------------- p: - x0 - 1 factors: -1 *(x + 1)^1 1 1 --------------- p: - x0 + 1 factors: -1 *(x - 1)^1 1 1 --------------- p: x0^10 - 10 x0^8 + 38 x0^6 - 2 x0^5 - 100 x0^4 - 40 x0^3 + 121 x0^2 - 38 x0 - 17 factors: 1 *(x^10 - 10 x^8 + 38 x^6 - 2 x^5 - 100 x^4 - 40 x^3 + 121 x^2 - 38 x - 17)^1 1 1 --------------- p: x0^50 - 10 x0^40 + 38 x0^30 - 2 x0^25 - 100 x0^20 - 40 x0^15 + 121 x0^10 - 38 x0^5 - 17 factors: 1 *(x^50 - 10 x^40 + 38 x^30 - 2 x^25 - 100 x^20 - 40 x^15 + 121 x^10 - 38 x^5 - 17)^1 1 1 --------------- p: x0^50 + 50 x0^49 + 1225 x0^48 + 19600 x0^47 + 230300 x0^46 + 2118760 x0^45 + 15890700 x0^44 + 99884400 x0^43 + 536878650 x0^42 + 2505433700 x0^41 + 10272278160 x0^40 + 37353738400 x0^39 + 121399643300 x0^38 + 354860419800 x0^37 + 937844742400 x0^36 + 2250822995040 x0^35 + 4923651311775 x0^34 + 9847192955550 x0^33 + 18052759836925 x0^32 + 30403208994400 x0^31 + 47120735638718 x0^30 + 67304328049540 x0^29 + 88693946746330 x0^28 + 107922921291080 x0^27 + 121316591779290 x0^26 + 126008358402418 x0^25 + 120920161583200 x0^24 + 107156006937400 x0^23 + 87616235053150 x0^22 + 66015165625200 x0^21 + 45751888559970 x0^20 + 29095194780400 x0^19 + 16923012027925 x0^18 + 8964604200300 x0^17 + 4300690170275 x0^16 + 1854462502360 x0^15 + 711289628150 x0^14 + 239061007300 x0^13 + 68794843050 x0^12 + 16285796400 x0^11 + 2912250341 x0^10 + 293635660 x0^9 - 24769155 x0^8 - 18147080 x0^7 - 4334640 x0^6 - 792418 x0^5 - 181390 x0^4 - 47580 x0^3 - 8780 x0^2 - 840 x0 - 47 factors: 1 *(x^50 + 50 x^49 + 1225 x^48 + 19600 x^47 + 230300 x^46 + 2118760 x^45 + 15890700 x^44 + 99884400 x^43 + 536878650 x^42 + 2505433700 x^41 + 10272278160 x^40 + 37353738400 x^39 + 121399643300 x^38 + 354860419800 x^37 + 937844742400 x^36 + 2250822995040 x^35 + 4923651311775 x^34 + 9847192955550 x^33 + 18052759836925 x^32 + 30403208994400 x^31 + 47120735638718 x^30 + 67304328049540 x^29 + 88693946746330 x^28 + 107922921291080 x^27 + 121316591779290 x^26 + 126008358402418 x^25 + 120920161583200 x^24 + 107156006937400 x^23 + 87616235053150 x^22 + 66015165625200 x^21 + 45751888559970 x^20 + 29095194780400 x^19 + 16923012027925 x^18 + 8964604200300 x^17 + 4300690170275 x^16 + 1854462502360 x^15 + 711289628150 x^14 + 239061007300 x^13 + 68794843050 x^12 + 16285796400 x^11 + 2912250341 x^10 + 293635660 x^9 - 24769155 x^8 - 18147080 x^7 - 4334640 x^6 - 792418 x^5 - 181390 x^4 - 47580 x^3 - 8780 x^2 - 840 x - 47)^1 1 1 --------------- p: x0^4 - 404 x0^2 + 39204 factors: 1 *(x^2 - 242)^1 *(x^2 - 162)^1 2 2 --------------- p: x0^25 - 31260 x0^20 + 383062540 x0^15 - 2590282000080 x0^10 + 7334282001000080 x0^5 - 9552011721875500032 factors: 1 *(x^5 - 15552)^1 *(x^20 - 15708 x^15 + 138771724 x^10 - 432104148432 x^5 + 614198284585616)^1 2 2 --------------- p: x0^25 - 3125 x0^21 - 15630 x0^20 + 3888750 x0^17 + 38684375 x0^16 + 95765635 x0^15 - 2489846500 x0^13 - 37650481875 x0^12 - 190548065625 x0^11 - 323785250010 x0^10 + 750249453025 x0^9 + 14962295699875 x0^8 + 111775113235000 x0^7 + 370399286731250 x0^6 + 362903064503129 x0^5 - 2387239013984400 x0^4 - 23872390139844000 x0^3 - 119361950699220000 x0^2 - 298404876748050000 x0 - 298500366308609376 factors: 1 *(x^5 - 1296 x - 7776)^1 *(x^20 - 1829 x^16 - 7854 x^15 + 1518366 x^12 + 14283287 x^11 + 34692931 x^10 - 522044164 x^8 - 7332527907 x^7 - 34519187337 x^6 - 54013018554 x^5 + 73680216481 x^4 + 1399924113139 x^3 + 10020509441416 x^2 + 31977213952754 x + 38387392786601)^1 2 2 --------------- p: - x0^27 + 54 x0^24 - 324 x0^21 + 17496 x0^18 - 34992 x0^15 + 1889568 x0^12 - 1259712 x0^9 + 68024448 x0^6 factors: -1 *(x^3 - 54)^1 *(x^6 + 108)^3 *(x)^6 3 3 --------------- p: x0^27 - 648 x0^24 + 105300 x0^21 - 3639168 x0^18 - 521485776 x0^15 - 40761760896 x0^12 - 8435982634560 x0^9 - 326907538633728 x0^6 - 904871002816512 x0^3 - 34835065137266688 factors: 1 *(x^3 - 432)^1 *(x^6 + 6912)^1 *(x^6 - 324 x^3 + 37044)^1 *(x^6 + 108)^1 *(x^3 + 54)^2 5 5 --------------- p: x0^54 - 54 x0^52 - 1296 x0^51 + 1404 x0^50 + 607104 x0^48 - 1057536 x0^47 - 22401792 x0^46 - 131347008 x0^45 + 385174656 x0^44 + 4556424960 x0^43 + 10518648048 x0^42 + 54432 x0^49 - 69060148992 x0^41 - 565617303648 x0^40 + 445518434304 x0^39 + 8781044678784 x0^38 + 32843377234944 x0^37 - 131307918402048 x0^36 - 1186720516915200 x0^35 + 736520460602112 x0^34 + 18979903288608768 x0^33 - 112345961528001024 x0^32 + 1270197317039357952 x0^31 - 1541064534072996096 x0^30 + 16614053352447639552 x0^29 - 64121868468546937344 x0^28 - 441603923048400752640 x0^27 + 3907490603726606515200 x0^26 - 9940058828597411831808 x0^25 + 37842357616860755976192 x0^24 - 207493394698593727119360 x0^23 + 7974899726119384485888 x0^22 + 2119713138903354441449472 x0^21 - 1236506243331227840225280 x0^20 + 15633879365645789187538944 x0^19 + 135073233715906678961491968 x0^18 - 283501898470995378000297984 x0^17 - 103789476798964165693218816 x0^16 + 2149475050405063712005816320 x0^15 + 11401046311106270759794900992 x0^14 - 42594459367486176885626634240 x0^13 + 144038627307565998906953170944 x0^12 + 51604015948240925730371272704 x0^11 - 250947536887982891503528574976 x0^10 + 3480976544954551737609272426496 x0^9 + 10434520207534987392729183682560 x0^8 + 42130058836708565940278805921792 x0^7 + 28392667475502927445585073012736 x0^6 + 292548838778373337946194100355072 x0^5 + 732626185252271205256762862075904 x0^4 + 490660485015010178556685461749760 x0^3 + 1356203807400073270301299496189952 x0^2 + 436594705270365747351637721088000 x0 + 1395158047392035876769798396313600 factors: 1 *(x^6 - 6 x^4 - 864 x^3 + 12 x^2 - 5184 x + 186616)^1 *(x^12 - 12 x^10 + 60 x^8 + 56 x^6 + 6720 x^4 + 12768 x^2 + 13456)^1 *(x^12 - 12 x^10 - 648 x^9 + 60 x^8 + 178904 x^6 + 15552 x^5 + 1593024 x^4 - 24045984 x^3 + 5704800 x^2 - 143995968 x + 1372010896)^1 *(x^12 - 12 x^10 + 60 x^8 + 13664 x^6 + 414960 x^4 + 829248 x^2 + 47886400)^1 *(x^6 - 6 x^4 + 108 x^3 + 12 x^2 + 648 x + 2908)^2 5 5 --------------- p: x0^2 + x0 q: x0 r: 0 --------------- p: x0^2 + x0 + 1 q: x0 r: 1 --------------- p: x0^2 + 2 x0 + 1 q: 2 x0 + 2 r: 0 ------ p1: x^3 - 6 x^2 + 11 x - 6 p2: x^2 - 3 x + 2 r: x - 3 expected: x - 3 ------ p1: 2 x^3 - 12 x^2 + 22 x - 12 p2: x^2 - 3 x + 2 r: 2 x - 6 expected: 2 x - 6 ------ p1: 2 x^3 - 12 x^2 + 22 x - 12 p2: x^3 - 7 x^2 + 14 x - 8 ------ p1: x - 3 p2: x - 1 ------ p1: 0 p2: x^3 - 7 x^2 + 14 x - 8 r: 0 expected: 0 ------ p1: x^3 - 7 x^2 + 14 x - 8 p2: 0 ------ p1: 0 p2: 0 ------ p1: 2 x - 2 p2: x - 1 r: 2 expected: 2 ------ p1: 2 x - 2 p2: 4 x - 4 ------ p1: 6 x - 4 p2: 2 r: 3 x - 2 expected: 3 x - 2 isolating roots of: x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34 (isolate time :time 0.01 :before-memory 4.83 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.95) square free part: x^70 - 6 x^65 - x^60 + 60 x^55 - 54 x^50 - 230 x^45 + 274 x^40 + 542 x^35 - 615 x^30 - 1120 x^25 + 1500 x^20 - 160 x^15 - 395 x^10 + 76 x^5 + 34 (sqf time :time 0.00 :before-memory 4.95 :after-memory 4.95) (fourier time :time 0.00 :before-memory 4.95 :after-memory 4.99) num. roots: 6 sign var(-oo): 16 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1.203125, 1.21875) (1.1875, 1.203125) (0, 1) (-0.875, -0.8125) (-0.8125, -0.75)(interval check :time 0.01 :before-memory 4.99 :after-memory 5.10) isolating roots of: x^2 - 3 x + 2 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - 3 x + 2 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 2 intervals: (0, 2)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - 2 x^4 + x^3 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - x (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 0 intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - x - 1 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^5 - x - 1 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 1 sign var(-oo): 2 sign var(+oo): 1 roots: intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^6 - x^5 - 16 x^4 + 10 x^3 + 69 x^2 - 9 x - 54 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.77) square free part: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 (sqf time :time 0.00 :before-memory 4.77 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 5 sign var(-oo): 5 sign var(+oo): 0 roots: -2 intervals: (2, 4) (0, 2) (-4, -2) (-2, 0)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 100000000 x^2 - 630000 x + 992 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 100000000 x^2 - 630000 x + 992 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.76) (fourier time :time 0.00 :before-memory 4.76 :after-memory 4.76) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: intervals: (0.0031738281?, 0.0034179687?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.76 :after-memory 4.76) isolating roots of: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 3 sign var(-oo): 3 sign var(+oo): 0 roots: intervals: (0.0032958984?, 0.0034179687?) (0.0031738281?, 0.0032958984?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (isolate time :time 0.00 :before-memory 4.77 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.87) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.87 :after-memory 4.87) (fourier time :time 0.00 :before-memory 4.87 :after-memory 4.87) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.87 :after-memory 4.87) isolating roots of: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.91) (sturm time :time 0.00 :before-memory 4.91 :after-memory 4.91) square free part: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (sqf time :time 0.00 :before-memory 4.91 :after-memory 4.91) (fourier time :time 0.00 :before-memory 4.91 :after-memory 4.91) num. roots: 11 sign var(-oo): 11 sign var(+oo): 0 roots: 64 32 16 8 4 2 0.5 0.25 0.125 0.0625 intervals: (0, 0.0625)(interval check :time 0.00 :before-memory 4.91 :after-memory 4.91) isolating roots of: 1000000 x^22 - 2334000 x^21 + 1361889 x^20 - 4000000 x^17 + 9336000 x^16 - 5447556 x^15 - 2000000 x^14 + 4668000 x^13 + 3276222 x^12 - 14004000 x^11 + 8171334 x^10 + 4000000 x^9 - 9336000 x^8 + 1447556 x^7 + 10336000 x^6 - 7781556 x^5 - 638111 x^4 + 4668000 x^3 - 1723778 x^2 - 2334000 x + 1361889 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.92) (sturm time :time 0.00 :before-memory 4.92 :after-memory 4.94) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.94 :after-memory 4.94) (fourier time :time 0.00 :before-memory 4.94 :after-memory 4.94) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.93) square free part: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (sqf time :time 0.00 :before-memory 4.93 :after-memory 4.93) (fourier time :time 0.00 :before-memory 4.93 :after-memory 4.94) num. roots: 3 sign var(-oo): 10 sign var(+oo): 7 roots: intervals: (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.94) (sturm time :time 0.00 :before-memory 4.94 :after-memory 4.98) square free part: x^25 + 5 x^24 + 3 x^23 - 2 x^22 - x^21 - 12 x^20 - 8 x^19 - 8 x^18 + 3 x^17 + 6 x^16 - 20 x^15 + 5 x^14 + 14 x^13 - x^12 + 26 x^11 + 15 x^10 - 6 x^9 - x^8 - 6 x^7 + 13 x^6 - x^5 - 7 x^4 - x^3 + 6 x^2 + 14 x + 14 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.99) num. roots: 5 sign var(-oo): 15 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1, 1.25) (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.99 :after-memory 4.99) isolating roots of: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 (isolate time :time 0.00 :before-memory 4.97 :after-memory 4.98) (sturm time :time 0.00 :before-memory 4.98 :after-memory 4.98) square free part: 15 x^7 - 50000948 x^6 + 3160000000 x^5 - 15000000000 x^2 + 50000948000000000 x - 3160000000000000000 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.98) num. roots: 3 sign var(-oo): 5 sign var(+oo): 2 roots: intervals: (2097152, 4194304) (63.125, 63.25) (63, 63.125)(interval check :time 0.00 :before-memory 4.98 :after-memory 4.98) upolynomial sturm seq... x^16 - 136 x^14 + 6476 x^12 - 141912 x^10 + 1513334 x^8 - 7453176 x^6 + 13950764 x^4 - 5596840 x^2 + 46225 16 x^31 - 3184 x^29 + 266896 x^27 - 12504176 x^25 + 365186736 x^23 - 7016366800 x^21 + 91296632240 x^19 - 816781071440 x^17 + 5048153319680 x^15 - 21441099366400 x^13 + 61546497478656 x^11 - 115751532406784 x^9 + 135609801916416 x^7 - 91405602717696 x^5 + 30893429293056 x^3 - 3713794375680 x -1 x^16 + 136 x^14 - 6476 x^12 + 141912 x^10 - 1513334 x^8 + 7453176 x^6 - 13950764 x^4 + 5596840 x^2 - 46225 -1127661677367 x^15 + 80685790700977 x^13 - 2102726493398207 x^11 + 24514705741043569 x^9 - 126650346236335533 x^7 + 242589935638940027 x^5 - 97920676059890653 x^3 + 808873659526115 x -14535239484187 x^14 + 1040002105846097 x^12 - 27102803643492427 x^10 + 315975682124035209 x^8 - 1632414202846505513 x^6 + 3126764251346253547 x^4 - 1262106621739038833 x^2 + 10425232207257915 -167716660671508667641 x^13 + 8401333185842706888530 x^11 - 134511192706723391471287 x^9 + 821751607340566559868924 x^7 - 1705905612159036016144823 x^5 + 712068977650176642124114 x^3 - 10375158858866309689337 x -46388284262096386474101 x^12 + 2297177756962323065528714 x^10 - 36402788774274131831901243 x^8 + 220799657664499131685981196 x^6 - 455864002600254932618175227 x^4 + 187578869474987904058942602 x^2 - 1550540527908097632341045 -4781966315926860973699105567 x^11 + 144464930716069568218159788243 x^9 - 1169427211740981342868979217166 x^7 + 2878829227828597116284471589262 x^5 - 1689381939540688922079704055699 x^3 + 237821093214524613444114401119 x -5108074971655853552979774902899 x^10 + 142894793305009146385089605918283 x^8 - 1099846101471960685926906955737574 x^6 + 2506082302169705625991475997146542 x^4 - 1056500552045609715416888450812743 x^2 + 8841855718148765940369646193383 -98120336193551253677921935999799283 x^9 + 1282821860598696804541403875934437348 x^7 - 4888580553822740399599176292389184402 x^5 + 6426442235002716205008267522870828260 x^3 - 2106362515913203012578123667196293235 x -1561728884476847525112813341042616474011 x^8 + 17345591286879038944880672380421451809732 x^6 - 44557170670678936833666488386470071966338 x^4 + 19428144317367539496215506533408444604612 x^2 - 181424501621876268050477659663628874267 -48718567339545057971709193441047126509 x^7 + 527268188685058585740868192019254318421 x^5 - 1313868868153889289084379514485509676183 x^3 + 528737651333486566371183339800760756103 x -220162280897461356833414966265382012563279 x^6 + 1211314214555794584950776751645547954082463 x^4 - 1230799847361844990126616667707906905070125 x^2 + 90080631010818812189690298672496136915141 -4567940256921478185902666831705495050259 x^5 + 18353182476718620132475356289264733969914 x^3 - 8965983880068785028294729109994152212011 x -16568849839314393995007704109417733998971 x^4 + 40499812984358514784159551770437344409066 x^2 - 4567940256921478185902666831705495050259 -211307826015503935324666261 x^3 + 226566446302093673740485799 x -1051673563609695326877268183 x^2 + 211307826015503935324666261 -1 x -1 p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (1/3, 7/5) (0.3333333333?, 1.4) after (1/2, 21/2^4) (0.5, 1.3125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (1/2, 7/5) (0.5, 1.4) after (1/2, 21/2^4) (0.5, 1.3125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (3/7, 3/2) (0.4285714285?, 1.5) after (3/2^2, 3/2) (0.75, 1.5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (0, 3/2) (0, 1.5) after (0, 3/2) (0, 1.5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (0, 23/21) (0, 1.0952380952?) after (0, 69/2^6) (0, 1.078125) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (7/2, 5) (3.5, 5) after (7/2, 5) (3.5, 5) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (999/1000, 1001/1000) (0.999, 1.001) after (1047951/2^20, 524475/2^19) (0.9994039535?, 1.0003566741?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (9999/10000, 10001/10000) (0.9999, 1.0001) after (67103289/2^26, 8389161/2^23) (0.9999169260?, 1.0000659227?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 before (39999/10000, 40001/10000) (3.9999, 4.0001) after (268433289/2^26, 1073746843/2^28) (3.9999677091?, 4.0000186972?) p: x^4 - 10 x^3 + 35 x^2 - 50 x + 24 q: 81 x^4 - 702 x^3 + 2079 x^2 - 2418 x + 880 p: 24 x^4 - 50 x^3 + 35 x^2 - 10 x + 1 Refining intervals p: x0^5 - x0 - 1 before (1, 2) new (2448013/2^21, 1224007/2^20) as decimal: 1.16730356216430664062? p: x0^2 - 2 before (1, 2) new (1136276788042180458070828951474823657989790988021617205464301/2^199, 4545107152168721832283315805899294631959163952086468821857205/2^201) as decimal: 1.4142135623730950488016887242096980785696718753769480731766796228945468916789744311432405157464679368195737862332593934694025131023094144793931710987557973124330301661899511600495316088199615478515625 Refinable intervals p: 4 x0^3 - 27 x0^2 + 56 x0 - 33 before (1, 3) new root: 11/2^2 before (2, 3) new root: 11/2^2 before (5/2, 3) new root: 11/2^2 p: 5 x0^3 - 31 x0^2 + 59 x0 - 33 before (1, 3) new (2, 5/2) before (2, 3) new (2, 5/2) before (3/2, 3) new (3/2, 9/2^2) before (1, 5/2) new (7/2^2, 5/2) before (3/2, 5/2) new (3/2, 5/2) p: x0^3 - 6 x0^2 + 11 x0 - 6 before (1, 3) new root: 2 Sturm Seq upolynomial sturm seq... 7 x^10 + 3 x^9 + x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 70 x^9 + 27 x^8 + 8 x^7 + 6 x^5 + 40 x^3 + 30 x^2 + 16 x + 2 -59 x^8 + 24 x^7 - 280 x^6 + 18 x^5 - 4200 x^4 - 4780 x^3 - 4390 x^2 - 1212 x - 5594 1500 x^7 + 1203 x^6 + 24666 x^5 + 47840 x^4 + 48052 x^3 + 27528 x^2 + 38592 x + 26146 -136383 x^6 - 156626 x^5 + 987760 x^4 + 1288828 x^3 + 900792 x^2 + 434888 x + 1473094 -447977461 x^5 - 722331988 x^4 - 657814810 x^3 - 358104882 x^2 - 658907000 x - 254616997 -35151054357362 x^4 - 42237581647498 x^3 - 34012218049812 x^2 - 13572653161293 x - 46516612622356 32579335587662 x^3 + 71643021991321 x^2 - 50595120825621 x + 112457692722850 2904057856460384409 x^2 - 2842891454868987857 x + 2936283658205629262 -2803684606075989760487 x - 1222930252896030111592 -1 _p: 4 x^3 - 12 x^2 - x + 3 _r: 16 x^2 - 40 x - 24 _q: 16 x^2 - 40 x - 24 isolating roots of: x^2 - 3 x + 2 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - 3 x + 2 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 2 intervals: (0, 2)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - 2 x^4 + x^3 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^2 - x (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: 0 intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^5 - x - 1 (isolate time :time 0.00 :before-memory 4.74 :after-memory 4.74) (sturm time :time 0.00 :before-memory 4.74 :after-memory 4.74) square free part: x^5 - x - 1 (sqf time :time 0.00 :before-memory 4.74 :after-memory 4.74) (fourier time :time 0.00 :before-memory 4.74 :after-memory 4.74) num. roots: 1 sign var(-oo): 2 sign var(+oo): 1 roots: intervals: (0, 4)(interval check :time 0.00 :before-memory 4.74 :after-memory 4.74) isolating roots of: x^6 - x^5 - 16 x^4 + 10 x^3 + 69 x^2 - 9 x - 54 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.77) square free part: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 (sqf time :time 0.00 :before-memory 4.77 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 5 sign var(-oo): 5 sign var(+oo): 0 roots: -2 intervals: (2, 4) (0, 2) (-4, -2) (-2, 0)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 100000000 x^2 - 630000 x + 992 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 100000000 x^2 - 630000 x + 992 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.76) (fourier time :time 0.00 :before-memory 4.76 :after-memory 4.76) num. roots: 2 sign var(-oo): 2 sign var(+oo): 0 roots: intervals: (0.0031738281?, 0.0034179687?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.76 :after-memory 4.76) isolating roots of: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (isolate time :time 0.00 :before-memory 4.76 :after-memory 4.76) (sturm time :time 0.00 :before-memory 4.76 :after-memory 4.76) square free part: 1000000000000 x^3 - 9600000000 x^2 + 30710000 x - 32736 (sqf time :time 0.00 :before-memory 4.76 :after-memory 4.77) (fourier time :time 0.00 :before-memory 4.77 :after-memory 4.77) num. roots: 3 sign var(-oo): 3 sign var(+oo): 0 roots: intervals: (0.0032958984?, 0.0034179687?) (0.0031738281?, 0.0032958984?) (0.0029296875, 0.0031738281?)(interval check :time 0.00 :before-memory 4.77 :after-memory 4.77) isolating roots of: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (isolate time :time 0.00 :before-memory 4.77 :after-memory 4.77) (sturm time :time 0.00 :before-memory 4.77 :after-memory 4.87) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.87 :after-memory 4.87) (fourier time :time 0.00 :before-memory 4.87 :after-memory 4.87) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.87 :after-memory 4.87) isolating roots of: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.91) (sturm time :time 0.00 :before-memory 4.91 :after-memory 4.91) square free part: 32768 x^11 - 4160512 x^10 + 174665408 x^9 - 3092100952 x^8 + 24729859214 x^7 - 89699170501 x^6 + 140975222734 x^5 - 87882836696 x^4 + 23405003968 x^3 - 2729126912 x^2 + 132087808 x - 2097152 (sqf time :time 0.00 :before-memory 4.91 :after-memory 4.91) (fourier time :time 0.00 :before-memory 4.91 :after-memory 4.91) num. roots: 11 sign var(-oo): 11 sign var(+oo): 0 roots: 64 32 16 8 4 2 0.5 0.25 0.125 0.0625 intervals: (0, 0.0625)(interval check :time 0.00 :before-memory 4.91 :after-memory 4.91) isolating roots of: 1000000 x^22 - 2334000 x^21 + 1361889 x^20 - 4000000 x^17 + 9336000 x^16 - 5447556 x^15 - 2000000 x^14 + 4668000 x^13 + 3276222 x^12 - 14004000 x^11 + 8171334 x^10 + 4000000 x^9 - 9336000 x^8 + 1447556 x^7 + 10336000 x^6 - 7781556 x^5 - 638111 x^4 + 4668000 x^3 - 1723778 x^2 - 2334000 x + 1361889 (isolate time :time 0.00 :before-memory 4.91 :after-memory 4.92) (sturm time :time 0.00 :before-memory 4.92 :after-memory 4.94) square free part: 1000 x^11 - 1167 x^10 - 2000 x^6 + 2334 x^5 - 1000 x^3 + 1167 x^2 + 1000 x - 1167 (sqf time :time 0.00 :before-memory 4.94 :after-memory 4.94) (fourier time :time 0.00 :before-memory 4.94 :after-memory 4.94) num. roots: 3 sign var(-oo): 6 sign var(+oo): 3 roots: intervals: (1.1672363281?, 1.1674804687?) (1.1669921875, 1.1672363281?) (0, 1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.93) (sturm time :time 0.00 :before-memory 4.93 :after-memory 4.93) square free part: x^17 + 5 x^16 + 3 x^15 + 10 x^13 + 13 x^10 + x^9 + 8 x^5 + 3 x^2 + 7 (sqf time :time 0.00 :before-memory 4.93 :after-memory 4.93) (fourier time :time 0.00 :before-memory 4.93 :after-memory 4.94) num. roots: 3 sign var(-oo): 10 sign var(+oo): 7 roots: intervals: (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.94 :after-memory 4.94) isolating roots of: x^33 + 5 x^32 + 3 x^31 - 4 x^30 - 12 x^29 - 24 x^28 - 12 x^27 - 5 x^26 + 42 x^25 + 51 x^24 + 18 x^23 + 9 x^22 - 19 x^21 - 10 x^20 - 2 x^19 - 8 x^18 - 5 x^17 - 94 x^16 - 91 x^15 + 22 x^14 + 18 x^13 + 62 x^12 + 62 x^11 + 19 x^10 + 2 x^9 + 10 x^8 + 10 x^7 - 9 x^6 - 64 x^5 - 44 x^4 - 4 x^3 + 40 x^2 + 56 x + 28 (isolate time :time 0.00 :before-memory 4.93 :after-memory 4.94) (sturm time :time 0.00 :before-memory 4.94 :after-memory 4.98) square free part: x^25 + 5 x^24 + 3 x^23 - 2 x^22 - x^21 - 12 x^20 - 8 x^19 - 8 x^18 + 3 x^17 + 6 x^16 - 20 x^15 + 5 x^14 + 14 x^13 - x^12 + 26 x^11 + 15 x^10 - 6 x^9 - x^8 - 6 x^7 + 13 x^6 - x^5 - 7 x^4 - x^3 + 6 x^2 + 14 x + 14 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.99) num. roots: 5 sign var(-oo): 15 sign var(+oo): 10 roots: intervals: (1.25, 1.5) (1, 1.25) (-8, -4) (-2, -1.5) (-1.5, -1)(interval check :time 0.00 :before-memory 4.99 :after-memory 4.99) isolating roots of: 900 x^19 - 6000113760 x^18 + 10000758403594816 x^17 - 1264023965440000000 x^16 + 39942400000000000000 x^15 - 2700000000000 x^14 + 18000341280000000000 x^13 - 30002275210784448000000000 x^12 + 3792071896320000000000000000 x^11 - 119827200000000000000000000000 x^10 + 2700000000000000000000 x^9 - 18000341280000000000000000000 x^8 + 30002275210784448000000000000000000 x^7 - 3792071896320000000000000000000000000 x^6 + 119827200000000000000000000000000000000 x^5 - 900000000000000000000000000000 x^4 + 6000113760000000000000000000000000000 x^3 - 10000758403594816000000000000000000000000000 x^2 + 1264023965440000000000000000000000000000000000 x - 39942400000000000000000000000000000000000000000 (isolate time :time 0.00 :before-memory 4.97 :after-memory 4.98) (sturm time :time 0.00 :before-memory 4.98 :after-memory 4.98) square free part: 15 x^7 - 50000948 x^6 + 3160000000 x^5 - 15000000000 x^2 + 50000948000000000 x - 3160000000000000000 (sqf time :time 0.00 :before-memory 4.98 :after-memory 4.98) (fourier time :time 0.00 :before-memory 4.98 :after-memory 4.98) num. roots: 3 sign var(-oo): 5 sign var(+oo): 2 roots: intervals: (2097152, 4194304) (63.125, 63.25) (63, 63.125)(interval check :time 0.00 :before-memory 4.98 :after-memory 4.98) p: x0^5 + 2 x0^4 - 10 x0^3 - 20 x0^2 + 9 x0 + 18 q: x^5 + 2 x^4 - 10 x^3 - 20 x^2 + 9 x + 18 degree(q): 5 expanded q: 18 9 -20 -10 2 1 new q: 2 x^5 + 3 x^4 - 9 x^3 - 19 x^2 + 10 x + 19 new q^2: 4 x^10 + 12 x^9 - 27 x^8 - 130 x^7 + 7 x^6 + 478 x^5 + 295 x^4 - 722 x^3 - 622 x^2 + 380 x + 361 new (q^2)^3: 64 x^30 + 576 x^29 + 432 x^28 - 12288 x^27 - 40020 x^26 + 79284 x^25 + 586149 x^24 + 235698 x^23 - 4140627 x^22 - 6895030 x^21 + 15251184 x^20 + 49873788 x^19 - 16794929 x^18 - 201145074 x^17 - 108039945 x^16 + 499210576 x^15 + 614825733 x^14 - 724261014 x^13 - 1616514344 x^12 + 376952670 x^11 + 2580727584 x^10 + 671496040 x^9 - 2571049230 x^8 - 1605401010 x^7 + 1474343885 x^6 + 1530682218 x^5 - 329384703 x^4 - 739359046 x^3 - 86793786 x^2 + 148565940 x + 47045881 Testing Z_p GCD in Z[x] _p: x^4 + 2 x^3 + 2 x^2 + x _q: x^3 + x + 1 gcd: 1 _p: x^4 + 2 x^3 + 2 x^2 + x _q: x^3 + x + 1 subresultant_gcd: 1 GCD in Z_3[x] _p: x^4 - x^3 - x^2 + x _q: x^3 + x + 1 gcd: x - 1 _p: x^4 - x^3 - x^2 + x _q: x^3 + x + 1 subresultant_gcd: x - 1 Testing Z_p GCD in Z[x] _p: x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 _q: x^6 + 5 x^5 + 9 x^4 + 5 x^2 + 5 x gcd: 1 _p: x^8 + x^6 + 10 x^4 + 10 x^3 + 8 x^2 + 2 x + 8 _q: x^6 + 5 x^5 + 9 x^4 + 5 x^2 + 5 x subresultant_gcd: 1 GCD in Z_13[x] _p: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 _q: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x gcd: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 _p: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 _q: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x subresultant_gcd: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 Extended GCD GCD in Z_13[x] A: x^6 + 5 x^5 - 4 x^4 + 5 x^2 + 5 x B: x^8 + x^6 - 3 x^4 - 3 x^3 - 5 x^2 + 2 x - 5 U: x^2 - 5 x + 4 V: -1 D: x^5 + 5 x^4 - 4 x^3 + 5 x + 5 Extended GCD in Z_7 GCD in Z_7[x] A: x^3 + 2 B: -1 x^2 - 1 U: 3 x - 1 V: 3 x^2 - x - 3 D: 1 PASS (test upolynomial :time 0.52 :before-memory 4.69 :after-memory 4.69) root: 2 root: (#^4 - 4, 2) -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (#, 1) x2 -> (#, 1) roots: signs: + -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (# - 1, 1) x2 -> (#, 1) roots: (# + 1, 1) -1 signs: - 0 + -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#, 1) roots: (2 #^2 - 1, 1) -0.7071067811? signs: - 0 + -------------- p: x2 x3 + x1 x3 + 1 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (8 #^2 - 1, 1) -0.3535533905? signs: - 0 + -------------- p: x2 x3 + x1 x3 + x1 x2 + 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^2 - 2, 1) -1.4142135623? signs: - 0 + -------------- p: x2 x3^3 + x1 x3^3 + x1 x2 + 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^6 - 2, 1) -1.1224620483? signs: - 0 + -------------- p: x2 x3^2 + x1 x3^2 - x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^4 - 2, 1) -1.1892071150? (#^4 - 2, 2) 1.1892071150? signs: + 0 - 0 + -------------- p: x0 x2 x3^2 + x0 x1 x3^2 - x0 x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: - -------------- p: - x2 x3 + x1 x3 + x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: 0 -------------- p: - x2 x3^3 + x1 x3^3 + x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: 0 -------------- p: x3^2 - 2 x0 x3 - x1 x3 + x0^2 + x0 x1 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (#^2 - 2, 2) 1.4142135623? (#^4 - 10 #^2 + 1, 4) 3.1462643699? signs: + 0 - 0 + -------------- p: x3^3 - 3 x0 x3^2 - 2 x1 x3^2 + 3 x0^2 x3 + 4 x0 x1 x3 + x1^2 x3 - x0^3 - 2 x0^2 x1 - x0 x1^2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (#^2 - 2, 2) 1.4142135623? (#^4 - 10 #^2 + 1, 4) 3.1462643699? signs: - 0 + 0 + -------------- p: x3^5 - x1 x3^4 - 4 x3^4 + 4 x1 x3^3 + 5 x3^3 - 5 x1 x3^2 - 2 x3^2 + 2 x1 x3 - x0 x3^4 + x0 x1 x3^3 + 4 x0 x3^3 - 4 x0 x1 x3^2 - 5 x0 x3^2 + 5 x0 x1 x3 + 2 x0 x3 - 2 x0 x1 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (# - 1, 1) 1 (#^2 - 2, 2) 1.4142135623? (#^2 - 3, 2) 1.7320508075? (# - 2, 1) 2 signs: - 0 - 0 + 0 - 0 + d: 1 p: (x2^2) (x1) (0) (2 x2 + x1) p': (x1) (0) (6 x2 + 3 x1) h2: (6 x2^3 + 3 x1 x2^2) (4 x1 x2 + 2 x1^2) d: 2 h3: (216 x2^7 + 324 x1 x2^6 + 162 x1^2 x2^5 + 16 x1^3 x2^2 + 16 x1^4 x2 + 4 x1^5 + 27 x1^3 x2^4) sign(h3(v1,v2)): 1 sign(h2(v1,v2)): 1 sign(p'(v1,v2)): 1 sign(p(v1,v2)): -1 tmp: -1/2 -0.5 v0: -0.5 sign(h2(v1,v2)): 1 sign(p'(v1,v2)): 1 sign(p(v1,v2)): 1 -------------- p: x2 + x0 x1 + x1^2 + 2 x0 -> (#, 1) x1 -> (#, 1) x2 -> (#, 1) sign: 2 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#, 1) x1 -> (#, 1) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (# + 3, 1) x1 -> (# - 1, 1) x2 -> (# + 2, 1) sign: -2 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# - 1, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# + 3, 1) sign: -1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 3, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 4, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 5, 1) sign: -1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 3, 1) sign: -1 -------------- p: - x2 + x0 x1 + x1^2 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 3, 1) sign: 1 ---------- lower: 1/2^3 as decimal: 0.125 upper: 3/2^2 as decimal: 0.75 choice: 1/2 as decimal: 0.5 ---------- lower: 1220703125/2^27 as decimal: 9.09494701? upper: 1375/2^7 as decimal: 10.7421875 choice: 10 as decimal: 10 ---------- lower: 1220703125/2^27 as decimal: 9.09494701? upper: 10001/2^10 as decimal: 9.76660156? choice: 19/2 as decimal: 9.5 ---------- lower: 1 as decimal: 1 upper: 1 as decimal: 1 choice: 1 as decimal: 1 ---------- lower: 1 as decimal: 1 upper: 2 as decimal: 2 choice: 1 as decimal: 1 ---------- lower: -1 as decimal: -1 upper: -1 as decimal: -1 choice: -1 as decimal: -1 ---------- lower: -2 as decimal: -2 upper: -1 as decimal: -1 choice: -2 as decimal: -2 ---------- lower: 0 as decimal: 0 upper: 275/2^8 as decimal: 1.07421875 choice: 0 as decimal: 0 ---------- lower: 7/2^3 as decimal: 0.875 upper: 1001/2^10 as decimal: 0.97753906? choice: 7/2^3 as decimal: 0.875 ---------- lower: 125/2^7 as decimal: 0.9765625 upper: 1001/2^10 as decimal: 0.97753906? choice: 125/2^7 as decimal: 0.9765625 ---------- lower: 4457915684525902395869512133369841539490161434991526715513934826241/2^192 as decimal: 710186941.75287040? upper: 2228957842262951197934756066684920769745080717495763357756967413121/2^191 as decimal: 710186941.75287040? choice: 2228957842262951197934756066684920769745080717495763357756967413121/2^191 as decimal: 710186941.75287040? ---------- lower: 4457915684525902395869512133369841539490161434991526715513934826241/2^192 as decimal: 710186941.75287040? upper: 4457915684525902395869512133369841539490161434991526715513934826497/2^192 as decimal: 710186941.75287040? choice: 4353433285669826558466320442743985878408360776358912808119076979/2^182 as decimal: 710186941.75287040? two101: 1.0650410894? (#^11 - 2, 1) two103: 1.1040895136? (#^7 - 2, 1) sum1: 2.1691306031? (#^77 - 22 #^70 - 14 #^66 + 220 #^63 - 544236 #^59 - 1320 #^56 + 84 #^55 - 97853448 #^52 + 5280 #^49 - 25531352 #^48 - 2670956288 #^45 - 280 #^44 - 14784 #^42 + 20445649840 #^41 - 20052576544 #^38 - 155813504 #^37 + 29568 #^35 - 850951467520 #^34 + 560 #^33 - 50308241984 #^31 - 120170824928 #^30 - 42240 #^28 + 4024746461120 #^27 - 186825408 #^26 - 43405281920 #^24 - 1992710577088 #^23 - 672 #^22 + 42240 #^21 - 2544211567744 #^20 + 34723106880 #^19 - 11504100608 #^17 - 1268310460032 #^16 - 37166976 #^15 - 28160 #^14 + 171371574528 #^13 - 38011467648 #^12 + 448 #^11 - 650890240 #^10 - 20646191104 #^9 - 198253440 #^8 + 11264 #^7 - 495599104 #^6 + 96233984 #^5 - 295680 #^4 - 2050048 #^3 - 670208 #^2 - 19712 # - 2176, 1) Wilkinson's polynomial: x0^20 - 210 x0^19 + 20615 x0^18 - 1256850 x0^17 + 53327946 x0^16 - 1672280820 x0^15 + 40171771630 x0^14 - 756111184500 x0^13 + 11310276995381 x0^12 - 135585182899530 x0^11 + 1307535010540395 x0^10 - 10142299865511450 x0^9 + 63030812099294896 x0^8 - 311333643161390640 x0^7 + 1206647803780373360 x0^6 - 3599979517947607200 x0^5 + 8037811822645051776 x0^4 - 12870931245150988800 x0^3 + 13803759753640704000 x0^2 - 8752948036761600000 x0 + 2432902008176640000 p: x0^20 - 210 x0^19 + 20615 x0^18 - 1256850 x0^17 + 53327946 x0^16 - 1672280820 x0^15 + 40171771630 x0^14 - 756111184500 x0^13 + 11310276995381 x0^12 - 135585182899530 x0^11 + 1307535010540395 x0^10 - 10142299865511450 x0^9 + 63030812099294896 x0^8 - 311333643161390640 x0^7 + 1206647803780373360 x0^6 - 3599979517947607200 x0^5 + 8037811822645051776 x0^4 - 12870931245150988800 x0^3 + 13803759753640704000 x0^2 - 8752948036761600000 x0 + 2432902008176640000 numbers in decimal: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 numbers as root objects (# - 1, 1) (# - 2, 1) (# - 3, 1) (# - 4, 1) (# - 5, 1) (# - 6, 1) (# - 7, 1) (# - 8, 1) (# - 9, 1) (# - 10, 1) (# - 11, 1) (# - 12, 1) (# - 13, 1) (# - 14, 1) (# - 15, 1) (# - 16, 1) (# - 17, 1) (# - 18, 1) (# - 19, 1) (# - 20, 1) numbers as intervals [1, 1] [2, 2] [3, 3] [4, 4] [5, 5] [6, 6] [7, 7] [8, 8] [9, 9] [10, 10] [11, 11] [12, 12] [13, 13] [14, 14] [15, 15] [16, 16] [17, 17] [18, 18] [19, 19] [20, 20] p: 3 x0 - 2 numbers in decimal: 0.6666666666? numbers as root objects (3 # - 2, 1) numbers as intervals [2/3, 2/3] p: x0^2 - 2 numbers in decimal: -1.4142135623? 1.4142135623? numbers as root objects (#^2 - 2, 1) (#^2 - 2, 2) numbers as intervals (-4, 0) (0, 4) sqrt(2) + 1/3: 1.7475468957? (1/2, 13/2^2) (9 #^2 - 6 # - 17, 2) -sqrt(2) + 1/3: -1.0808802290? (-11/2^2, 0) (9 #^2 - 6 # - 17, 1) p: x0^7 - 3 x0^6 + 2 x0^5 - x0^3 + 2 x0^2 + x0 - 2 numbers in decimal: 1 1.1673039782? 2 numbers as root objects (# - 1, 1) (#^5 - # - 1, 1) (# - 2, 1) numbers as intervals [1, 1] (0, 4) [2, 2] compare(1.4142135623?, 1.1673039782?): 1 () p: x0^4 - 5 x0^2 + 6 numbers in decimal: -1.7320508075? -1.4142135623? 1.4142135623? 1.7320508075? numbers as root objects (#^2 - 3, 1) (#^2 - 2, 1) (#^2 - 2, 2) (#^2 - 3, 2) numbers as intervals (-2, -3/2) (-3/2, -1) (1, 3/2) (3/2, 2) compare(1.4142135623?, 1.4142135623?): 0 () sqrt(2)^4: 4 sqrt2 + gauss: 2.5815175406? (#^10 - 10 #^8 + 38 #^6 - 2 #^5 - 100 #^4 - 40 #^3 + 121 #^2 - 38 # - 17, 2) sqrt2*sqrt2: 2 sqrt2*sqrt2 == 2: 1 (-3)^(1/5): -1.2457309396? sqrt(2)^(1/3): 1.1224620483? as-root-object(sqrt(2)^(1/3)): (#^6 - 2, 2) (sqrt(2) + 1)^(1/3): 1.3415037626? as-root-object((sqrt(2) + 1)^(1/3)): (#^6 - 2 #^3 - 1, 2) (sqrt(2) + gauss)^(1/5): 1.2088572404? as-root-object(sqrt(2) + gauss)^(1/5): (#^50 - 10 #^40 + 38 #^30 - 2 #^25 - 100 #^20 - 40 #^15 + 121 #^10 - 38 #^5 - 17, 2) (sqrt(2) / sqrt(2)): 1 (sqrt(2) / gauss): 1.2115212392? (sqrt(2) / gauss) 30 digits: 1.211521239291433957983023270852? as-root-object(sqrt(2) / gauss): (#^10 - 2 #^8 + 16 #^4 - 32, 2) is_int(sqrt(2)^(1/3)): 0 1/sqrt(2): 0.7071067811? 4*1/sqrt(2): 2.8284271247? (#^2 - 8, 2) sqrt(2)*4*(1/sqrt2): 4 (# - 4, 1) is_int(sqrt(2)*4*(1/sqrt2)): 1, after is-int: 4 p: 998 x0^3 - 14970 x0 - 1414 x0^2 + 21210 is-rational(sqrt2): 0 qr: (499 # - 707, 1), is-rational: 1, val: (499 # - 707, 1) using refine upper... 5/2^3 < 5/7 < 5/2^2 0.625 < 0.71428571428571428571? < 1.25 5/2^3 < 5/7 < 15/2^4 0.625 < 0.71428571428571428571? < 0.9375 5/2^3 < 5/7 < 25/2^5 0.625 < 0.71428571428571428571? < 0.78125 45/2^6 < 5/7 < 95/2^7 0.703125 < 0.71428571428571428571? < 0.7421875 45/2^6 < 5/7 < 185/2^8 0.703125 < 0.71428571428571428571? < 0.72265625 365/2^9 < 5/7 < 735/2^10 0.712890625 < 0.71428571428571428571? < 0.7177734375 365/2^9 < 5/7 < 1465/2^11 0.712890625 < 0.71428571428571428571? < 0.71533203125 2925/2^12 < 5/7 < 5855/2^13 0.714111328125 < 0.71428571428571428571? < 0.7147216796875 2925/2^12 < 5/7 < 11705/2^14 0.714111328125 < 0.71428571428571428571? < 0.71441650390625 23405/2^15 < 5/7 < 46815/2^16 0.714263916015625 < 0.71428571428571428571? < 0.7143402099609375 23405/2^15 < 5/7 < 93625/2^17 0.714263916015625 < 0.71428571428571428571? < 0.71430206298828125 187245/2^18 < 5/7 < 374495/2^19 0.714282989501953125 < 0.71428571428571428571? < 0.7142925262451171875 187245/2^18 < 5/7 < 748985/2^20 0.714282989501953125 < 0.71428571428571428571? < 0.71428775787353515625 1497965/2^21 < 5/7 < 2995935/2^22 0.71428537368774414062? < 0.71428571428571428571? < 0.71428656578063964843? 1497965/2^21 < 5/7 < 5991865/2^23 0.71428537368774414062? < 0.71428571428571428571? < 0.71428596973419189453? 11983725/2^24 < 5/7 < 23967455/2^25 0.71428567171096801757? < 0.71428571428571428571? < 0.71428582072257995605? 11983725/2^24 < 5/7 < 47934905/2^26 0.71428567171096801757? < 0.71428571428571428571? < 0.71428574621677398681? 95869805/2^27 < 5/7 < 191739615/2^28 0.71428570896387100219? < 0.71428571428571428571? < 0.71428572759032249450? 95869805/2^27 < 5/7 < 383479225/2^29 0.71428570896387100219? < 0.71428571428571428571? < 0.71428571827709674835? 766958445/2^30 < 5/7 < 1533916895/2^31 0.71428571362048387527? < 0.71428571428571428571? < 0.71428571594879031181? using refine lower... 5/2^3 < 5/7 < 5/2^2 0.625 < 0.71428571428571428571? < 1.25 45/2^6 < 5/7 < 25/2^5 0.703125 < 0.71428571428571428571? < 0.78125 365/2^9 < 5/7 < 185/2^8 0.712890625 < 0.71428571428571428571? < 0.72265625 2925/2^12 < 5/7 < 1465/2^11 0.714111328125 < 0.71428571428571428571? < 0.71533203125 23405/2^15 < 5/7 < 11705/2^14 0.714263916015625 < 0.71428571428571428571? < 0.71441650390625 187245/2^18 < 5/7 < 93625/2^17 0.714282989501953125 < 0.71428571428571428571? < 0.71430206298828125 1497965/2^21 < 5/7 < 748985/2^20 0.71428537368774414062? < 0.71428571428571428571? < 0.71428775787353515625 11983725/2^24 < 5/7 < 5991865/2^23 0.71428567171096801757? < 0.71428571428571428571? < 0.71428596973419189453? 95869805/2^27 < 5/7 < 47934905/2^26 0.71428570896387100219? < 0.71428571428571428571? < 0.71428574621677398681? 766958445/2^30 < 5/7 < 383479225/2^29 0.71428571362048387527? < 0.71428571428571428571? < 0.71428571827709674835? 6135667565/2^33 < 5/7 < 3067833785/2^32 0.71428571420256048440? < 0.71428571428571428571? < 0.71428571478463709354? 49085340525/2^36 < 5/7 < 24542670265/2^35 0.71428571427532006055? < 0.71428571428571428571? < 0.71428571434807963669? 392682724205/2^39 < 5/7 < 196341362105/2^38 0.71428571428441500756? < 0.71428571428571428571? < 0.71428571429350995458? 3141461793645/2^42 < 5/7 < 1570730896825/2^41 0.71428571428555187594? < 0.71428571428571428571? < 0.71428571428668874432? 25131694349165/2^45 < 5/7 < 12565847174585/2^44 0.71428571428569398449? < 0.71428571428571428571? < 0.71428571428583609304? 201053554793325/2^48 < 5/7 < 100526777396665/2^47 0.71428571428571174806? < 0.71428571428571428571? < 0.71428571428572951163? 1608428438346605/2^51 < 5/7 < 804214219173305/2^50 0.71428571428571396850? < 0.71428571428571428571? < 0.71428571428571618895? 12867427506772845/2^54 < 5/7 < 6433713753386425/2^53 0.71428571428571424606? < 0.71428571428571428571? < 0.71428571428571452361? 102939420054182765/2^57 < 5/7 < 51469710027091385/2^56 0.71428571428571428075? < 0.71428571428571428571? < 0.71428571428571431545? 823515360433462125/2^60 < 5/7 < 411757680216731065/2^59 0.71428571428571428509? < 0.71428571428571428571? < 0.71428571428571428943? PASS (test algebraic :time 0.97 :before-memory 4.69 :after-memory 4.69) root: 2 root: (#^4 - 4, 2) -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (#, 1) x2 -> (#, 1) roots: signs: + -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (# - 1, 1) x2 -> (#, 1) roots: (# + 1, 1) -1 signs: - 0 + -------------- p: x1 x3 + 1 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#, 1) roots: (2 #^2 - 1, 1) -0.7071067811? signs: - 0 + -------------- p: x2 x3 + x1 x3 + 1 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (8 #^2 - 1, 1) -0.3535533905? signs: - 0 + -------------- p: x2 x3 + x1 x3 + x1 x2 + 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^2 - 2, 1) -1.4142135623? signs: - 0 + -------------- p: x2 x3^3 + x1 x3^3 + x1 x2 + 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^6 - 2, 1) -1.1224620483? signs: - 0 + -------------- p: x2 x3^2 + x1 x3^2 - x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: (#^4 - 2, 1) -1.1892071150? (#^4 - 2, 2) 1.1892071150? signs: + 0 - 0 + -------------- p: x0 x2 x3^2 + x0 x1 x3^2 - x0 x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: - -------------- p: - x2 x3 + x1 x3 + x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: 0 -------------- p: - x2 x3^3 + x1 x3^3 + x1 x2 - 2 x0 -> (#, 1) x1 -> (#^2 - 2, 2) x2 -> (#^2 - 2, 2) roots: signs: 0 -------------- p: x3^2 - 2 x0 x3 - x1 x3 + x0^2 + x0 x1 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (#^2 - 2, 2) 1.4142135623? (#^4 - 10 #^2 + 1, 4) 3.1462643699? signs: + 0 - 0 + -------------- p: x3^3 - 3 x0 x3^2 - 2 x1 x3^2 + 3 x0^2 x3 + 4 x0 x1 x3 + x1^2 x3 - x0^3 - 2 x0^2 x1 - x0 x1^2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (#^2 - 2, 2) 1.4142135623? (#^4 - 10 #^2 + 1, 4) 3.1462643699? signs: - 0 + 0 + -------------- p: x3^5 - x1 x3^4 - 4 x3^4 + 4 x1 x3^3 + 5 x3^3 - 5 x1 x3^2 - 2 x3^2 + 2 x1 x3 - x0 x3^4 + x0 x1 x3^3 + 4 x0 x3^3 - 4 x0 x1 x3^2 - 5 x0 x3^2 + 5 x0 x1 x3 + 2 x0 x3 - 2 x0 x1 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 3, 2) x2 -> (#, 1) roots: (# - 1, 1) 1 (#^2 - 2, 2) 1.4142135623? (#^2 - 3, 2) 1.7320508075? (# - 2, 1) 2 signs: - 0 - 0 + 0 - 0 + d: 1 p: (x2^2) (x1) (0) (2 x2 + x1) p': (x1) (0) (6 x2 + 3 x1) h2: (6 x2^3 + 3 x1 x2^2) (4 x1 x2 + 2 x1^2) d: 2 h3: (216 x2^7 + 324 x1 x2^6 + 162 x1^2 x2^5 + 16 x1^3 x2^2 + 16 x1^4 x2 + 4 x1^5 + 27 x1^3 x2^4) sign(h3(v1,v2)): 1 sign(h2(v1,v2)): 1 sign(p'(v1,v2)): 1 sign(p(v1,v2)): -1 tmp: -1/2 -0.5 v0: -0.5 sign(h2(v1,v2)): 1 sign(p'(v1,v2)): 1 sign(p(v1,v2)): 1 -------------- p: x2 + x0 x1 + x1^2 + 2 x0 -> (#, 1) x1 -> (#, 1) x2 -> (#, 1) sign: 2 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#, 1) x1 -> (#, 1) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (# + 3, 1) x1 -> (# - 1, 1) x2 -> (# + 2, 1) sign: -2 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# - 1, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#, 1) x2 -> (# + 3, 1) sign: -1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 3, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 4, 1) sign: 1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (# - 1, 1) x2 -> (# + 5, 1) sign: -1 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 2, 1) sign: 0 -------------- p: x2 + x1^2 + x0 x1 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 3, 1) sign: -1 -------------- p: - x2 + x0 x1 + x1^2 + 2 x0 -> (#^2 - 2, 2) x1 -> (#^2 - 2, 2) x2 -> (# + 3, 1) sign: 1 ---------- lower: 1/2^3 as decimal: 0.125 upper: 3/2^2 as decimal: 0.75 choice: 1/2 as decimal: 0.5 ---------- lower: 1220703125/2^27 as decimal: 9.09494701? upper: 1375/2^7 as decimal: 10.7421875 choice: 10 as decimal: 10 ---------- lower: 1220703125/2^27 as decimal: 9.09494701? upper: 10001/2^10 as decimal: 9.76660156? choice: 19/2 as decimal: 9.5 ---------- lower: 1 as decimal: 1 upper: 1 as decimal: 1 choice: 1 as decimal: 1 ---------- lower: 1 as decimal: 1 upper: 2 as decimal: 2 choice: 1 as decimal: 1 ---------- lower: -1 as decimal: -1 upper: -1 as decimal: -1 choice: -1 as decimal: -1 ---------- lower: -2 as decimal: -2 upper: -1 as decimal: -1 choice: -2 as decimal: -2 ---------- lower: 0 as decimal: 0 upper: 275/2^8 as decimal: 1.07421875 choice: 0 as decimal: 0 ---------- lower: 7/2^3 as decimal: 0.875 upper: 1001/2^10 as decimal: 0.97753906? choice: 7/2^3 as decimal: 0.875 ---------- lower: 125/2^7 as decimal: 0.9765625 upper: 1001/2^10 as decimal: 0.97753906? choice: 125/2^7 as decimal: 0.9765625 ---------- lower: 4457915684525902395869512133369841539490161434991526715513934826241/2^192 as decimal: 710186941.75287040? upper: 2228957842262951197934756066684920769745080717495763357756967413121/2^191 as decimal: 710186941.75287040? choice: 2228957842262951197934756066684920769745080717495763357756967413121/2^191 as decimal: 710186941.75287040? ---------- lower: 4457915684525902395869512133369841539490161434991526715513934826241/2^192 as decimal: 710186941.75287040? upper: 4457915684525902395869512133369841539490161434991526715513934826497/2^192 as decimal: 710186941.75287040? choice: 4353433285669826558466320442743985878408360776358912808119076979/2^182 as decimal: 710186941.75287040? two101: 1.0650410894? (#^11 - 2, 1) two103: 1.1040895136? (#^7 - 2, 1) sum1: 2.1691306031? (#^77 - 22 #^70 - 14 #^66 + 220 #^63 - 544236 #^59 - 1320 #^56 + 84 #^55 - 97853448 #^52 + 5280 #^49 - 25531352 #^48 - 2670956288 #^45 - 280 #^44 - 14784 #^42 + 20445649840 #^41 - 20052576544 #^38 - 155813504 #^37 + 29568 #^35 - 850951467520 #^34 + 560 #^33 - 50308241984 #^31 - 120170824928 #^30 - 42240 #^28 + 4024746461120 #^27 - 186825408 #^26 - 43405281920 #^24 - 1992710577088 #^23 - 672 #^22 + 42240 #^21 - 2544211567744 #^20 + 34723106880 #^19 - 11504100608 #^17 - 1268310460032 #^16 - 37166976 #^15 - 28160 #^14 + 171371574528 #^13 - 38011467648 #^12 + 448 #^11 - 650890240 #^10 - 20646191104 #^9 - 198253440 #^8 + 11264 #^7 - 495599104 #^6 + 96233984 #^5 - 295680 #^4 - 2050048 #^3 - 670208 #^2 - 19712 # - 2176, 1) Wilkinson's polynomial: x0^20 - 210 x0^19 + 20615 x0^18 - 1256850 x0^17 + 53327946 x0^16 - 1672280820 x0^15 + 40171771630 x0^14 - 756111184500 x0^13 + 11310276995381 x0^12 - 135585182899530 x0^11 + 1307535010540395 x0^10 - 10142299865511450 x0^9 + 63030812099294896 x0^8 - 311333643161390640 x0^7 + 1206647803780373360 x0^6 - 3599979517947607200 x0^5 + 8037811822645051776 x0^4 - 12870931245150988800 x0^3 + 13803759753640704000 x0^2 - 8752948036761600000 x0 + 2432902008176640000 p: x0^20 - 210 x0^19 + 20615 x0^18 - 1256850 x0^17 + 53327946 x0^16 - 1672280820 x0^15 + 40171771630 x0^14 - 756111184500 x0^13 + 11310276995381 x0^12 - 135585182899530 x0^11 + 1307535010540395 x0^10 - 10142299865511450 x0^9 + 63030812099294896 x0^8 - 311333643161390640 x0^7 + 1206647803780373360 x0^6 - 3599979517947607200 x0^5 + 8037811822645051776 x0^4 - 12870931245150988800 x0^3 + 13803759753640704000 x0^2 - 8752948036761600000 x0 + 2432902008176640000 numbers in decimal: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 numbers as root objects (# - 1, 1) (# - 2, 1) (# - 3, 1) (# - 4, 1) (# - 5, 1) (# - 6, 1) (# - 7, 1) (# - 8, 1) (# - 9, 1) (# - 10, 1) (# - 11, 1) (# - 12, 1) (# - 13, 1) (# - 14, 1) (# - 15, 1) (# - 16, 1) (# - 17, 1) (# - 18, 1) (# - 19, 1) (# - 20, 1) numbers as intervals [1, 1] [2, 2] [3, 3] [4, 4] [5, 5] [6, 6] [7, 7] [8, 8] [9, 9] [10, 10] [11, 11] [12, 12] [13, 13] [14, 14] [15, 15] [16, 16] [17, 17] [18, 18] [19, 19] [20, 20] p: 3 x0 - 2 numbers in decimal: 0.6666666666? numbers as root objects (3 # - 2, 1) numbers as intervals [2/3, 2/3] p: x0^2 - 2 numbers in decimal: -1.4142135623? 1.4142135623? numbers as root objects (#^2 - 2, 1) (#^2 - 2, 2) numbers as intervals (-4, 0) (0, 4) sqrt(2) + 1/3: 1.7475468957? (1/2, 13/2^2) (9 #^2 - 6 # - 17, 2) -sqrt(2) + 1/3: -1.0808802290? (-11/2^2, 0) (9 #^2 - 6 # - 17, 1) p: x0^7 - 3 x0^6 + 2 x0^5 - x0^3 + 2 x0^2 + x0 - 2 numbers in decimal: 1 1.1673039782? 2 numbers as root objects (# - 1, 1) (#^5 - # - 1, 1) (# - 2, 1) numbers as intervals [1, 1] (0, 4) [2, 2] compare(1.4142135623?, 1.1673039782?): 1 () p: x0^4 - 5 x0^2 + 6 numbers in decimal: -1.7320508075? -1.4142135623? 1.4142135623? 1.7320508075? numbers as root objects (#^2 - 3, 1) (#^2 - 2, 1) (#^2 - 2, 2) (#^2 - 3, 2) numbers as intervals (-2, -3/2) (-3/2, -1) (1, 3/2) (3/2, 2) compare(1.4142135623?, 1.4142135623?): 0 () sqrt(2)^4: 4 sqrt2 + gauss: 2.5815175406? (#^10 - 10 #^8 + 38 #^6 - 2 #^5 - 100 #^4 - 40 #^3 + 121 #^2 - 38 # - 17, 2) sqrt2*sqrt2: 2 sqrt2*sqrt2 == 2: 1 (-3)^(1/5): -1.2457309396? sqrt(2)^(1/3): 1.1224620483? as-root-object(sqrt(2)^(1/3)): (#^6 - 2, 2) (sqrt(2) + 1)^(1/3): 1.3415037626? as-root-object((sqrt(2) + 1)^(1/3)): (#^6 - 2 #^3 - 1, 2) (sqrt(2) + gauss)^(1/5): 1.2088572404? as-root-object(sqrt(2) + gauss)^(1/5): (#^50 - 10 #^40 + 38 #^30 - 2 #^25 - 100 #^20 - 40 #^15 + 121 #^10 - 38 #^5 - 17, 2) (sqrt(2) / sqrt(2)): 1 (sqrt(2) / gauss): 1.2115212392? (sqrt(2) / gauss) 30 digits: 1.211521239291433957983023270852? as-root-object(sqrt(2) / gauss): (#^10 - 2 #^8 + 16 #^4 - 32, 2) is_int(sqrt(2)^(1/3)): 0 1/sqrt(2): 0.7071067811? 4*1/sqrt(2): 2.8284271247? (#^2 - 8, 2) sqrt(2)*4*(1/sqrt2): 4 (# - 4, 1) is_int(sqrt(2)*4*(1/sqrt2)): 1, after is-int: 4 p: 998 x0^3 - 14970 x0 - 1414 x0^2 + 21210 is-rational(sqrt2): 0 qr: (499 # - 707, 1), is-rational: 1, val: (499 # - 707, 1) using refine upper... 5/2^3 < 5/7 < 5/2^2 0.625 < 0.71428571428571428571? < 1.25 5/2^3 < 5/7 < 15/2^4 0.625 < 0.71428571428571428571? < 0.9375 5/2^3 < 5/7 < 25/2^5 0.625 < 0.71428571428571428571? < 0.78125 45/2^6 < 5/7 < 95/2^7 0.703125 < 0.71428571428571428571? < 0.7421875 45/2^6 < 5/7 < 185/2^8 0.703125 < 0.71428571428571428571? < 0.72265625 365/2^9 < 5/7 < 735/2^10 0.712890625 < 0.71428571428571428571? < 0.7177734375 365/2^9 < 5/7 < 1465/2^11 0.712890625 < 0.71428571428571428571? < 0.71533203125 2925/2^12 < 5/7 < 5855/2^13 0.714111328125 < 0.71428571428571428571? < 0.7147216796875 2925/2^12 < 5/7 < 11705/2^14 0.714111328125 < 0.71428571428571428571? < 0.71441650390625 23405/2^15 < 5/7 < 46815/2^16 0.714263916015625 < 0.71428571428571428571? < 0.7143402099609375 23405/2^15 < 5/7 < 93625/2^17 0.714263916015625 < 0.71428571428571428571? < 0.71430206298828125 187245/2^18 < 5/7 < 374495/2^19 0.714282989501953125 < 0.71428571428571428571? < 0.7142925262451171875 187245/2^18 < 5/7 < 748985/2^20 0.714282989501953125 < 0.71428571428571428571? < 0.71428775787353515625 1497965/2^21 < 5/7 < 2995935/2^22 0.71428537368774414062? < 0.71428571428571428571? < 0.71428656578063964843? 1497965/2^21 < 5/7 < 5991865/2^23 0.71428537368774414062? < 0.71428571428571428571? < 0.71428596973419189453? 11983725/2^24 < 5/7 < 23967455/2^25 0.71428567171096801757? < 0.71428571428571428571? < 0.71428582072257995605? 11983725/2^24 < 5/7 < 47934905/2^26 0.71428567171096801757? < 0.71428571428571428571? < 0.71428574621677398681? 95869805/2^27 < 5/7 < 191739615/2^28 0.71428570896387100219? < 0.71428571428571428571? < 0.71428572759032249450? 95869805/2^27 < 5/7 < 383479225/2^29 0.71428570896387100219? < 0.71428571428571428571? < 0.71428571827709674835? 766958445/2^30 < 5/7 < 1533916895/2^31 0.71428571362048387527? < 0.71428571428571428571? < 0.71428571594879031181? using refine lower... 5/2^3 < 5/7 < 5/2^2 0.625 < 0.71428571428571428571? < 1.25 45/2^6 < 5/7 < 25/2^5 0.703125 < 0.71428571428571428571? < 0.78125 365/2^9 < 5/7 < 185/2^8 0.712890625 < 0.71428571428571428571? < 0.72265625 2925/2^12 < 5/7 < 1465/2^11 0.714111328125 < 0.71428571428571428571? < 0.71533203125 23405/2^15 < 5/7 < 11705/2^14 0.714263916015625 < 0.71428571428571428571? < 0.71441650390625 187245/2^18 < 5/7 < 93625/2^17 0.714282989501953125 < 0.71428571428571428571? < 0.71430206298828125 1497965/2^21 < 5/7 < 748985/2^20 0.71428537368774414062? < 0.71428571428571428571? < 0.71428775787353515625 11983725/2^24 < 5/7 < 5991865/2^23 0.71428567171096801757? < 0.71428571428571428571? < 0.71428596973419189453? 95869805/2^27 < 5/7 < 47934905/2^26 0.71428570896387100219? < 0.71428571428571428571? < 0.71428574621677398681? 766958445/2^30 < 5/7 < 383479225/2^29 0.71428571362048387527? < 0.71428571428571428571? < 0.71428571827709674835? 6135667565/2^33 < 5/7 < 3067833785/2^32 0.71428571420256048440? < 0.71428571428571428571? < 0.71428571478463709354? 49085340525/2^36 < 5/7 < 24542670265/2^35 0.71428571427532006055? < 0.71428571428571428571? < 0.71428571434807963669? 392682724205/2^39 < 5/7 < 196341362105/2^38 0.71428571428441500756? < 0.71428571428571428571? < 0.71428571429350995458? 3141461793645/2^42 < 5/7 < 1570730896825/2^41 0.71428571428555187594? < 0.71428571428571428571? < 0.71428571428668874432? 25131694349165/2^45 < 5/7 < 12565847174585/2^44 0.71428571428569398449? < 0.71428571428571428571? < 0.71428571428583609304? 201053554793325/2^48 < 5/7 < 100526777396665/2^47 0.71428571428571174806? < 0.71428571428571428571? < 0.71428571428572951163? 1608428438346605/2^51 < 5/7 < 804214219173305/2^50 0.71428571428571396850? < 0.71428571428571428571? < 0.71428571428571618895? 12867427506772845/2^54 < 5/7 < 6433713753386425/2^53 0.71428571428571424606? < 0.71428571428571428571? < 0.71428571428571452361? 102939420054182765/2^57 < 5/7 < 51469710027091385/2^56 0.71428571428571428075? < 0.71428571428571428571? < 0.71428571428571431545? 823515360433462125/2^60 < 5/7 < 411757680216731065/2^59 0.71428571428571428509? < 0.71428571428571428571? < 0.71428571428571428943? PASS (test algebraic :time 0.93 :before-memory 4.69 :after-memory 4.69) 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139, 149, 151, 157, 163, 167, 173, 179, 181, 191, 193, 197, 199, 211, 223, 227, 229, 233, 239, 241, 251, 257, 263, 269, 271, 277, 281, 283, 293, 307, 311, 313, 317, 331, 337, 347, 349, 353, 359, 367, 373, 379, 383, 389, 397, 401, 409, 419, 421, 431, 433, 439, 443, 449, 457, 461, 463, 467, 479, 487, 491, 499, 503, 509, 521, 523, 541, 547, 557, 563, 569, 571, 577, 587, 593, 599, 601, 607, 613, 617, 619, 631, 641, 643, 647, 653, 659, 661, 673, 677, 683, 691, 701, 709, 719, 727, 733, 739, 743, 751, 757, 761, 769, 773, 787, 797, 809, 811, 821, 823, 827, 829, 839, 853, 857, 859, 863, 877, 881, 883, 887, 907, 911, 919, 929, 937, 941, 947, 953, 967, 971, 977, 983, 991, 997, 1009, 1013, 1019, 1021, 1031, 1033, 1039, 1049, 1051, 1061, 1063, 1069, 1087, 1091, 1093, 1097, 1103, 1109, 1117, 1123, 1129, 1151, 1153, 1163, 1171, 1181, 1187, 1193, 1201, 1213, 1217, 1223, 1229, 1231, 1237, 1249, 1259, 1277, 1279, 1283, 1289, 1291, 1297, 1301, 1303, 1307, 1319, 1321, 1327, 1361, 1367, 1373, 1381, 1399, 1409, 1423, 1427, 1429, 1433, 1439, 1447, 1451, 1453, 1459, 1471, 1481, 1483, 1487, 1489, 1493, 1499, 1511, 1523, 1531, 1543, 1549, 1553, 1559, 1567, 1571, 1579, 1583, 1597, 1601, 1607, 1609, 1613, 1619, 1621, 1627, 1637, 1657, 1663, 1667, 1669, 1693, 1697, 1699, 1709, 1721, 1723, 1733, 1741, 1747, 1753, 1759, 1777, 1783, 1787, 1789, 1801, 1811, 1823, 1831, 1847, 1861, 1867, 1871, 1873, 1877, 1879, 1889, 1901, 1907, 1913, 1931, 1933, 1949, 1951, 1973, 1979, 1987, 1993, 1997, 1999, 2003, 2011, 2017, 2027, 2029, 2039, 2053, 2063, 2069, 2081, 2083, 2087, 2089, 2099, 2111, 2113, 2129, 2131, 2137, 2141, 2143, 2153, 2161, 2179, 2203, 2207, 2213, 2221, 2237, 2239, 2243, 2251, 2267, 2269, 2273, 2281, 2287, 2293, 2297, 2309, 2311, 2333, 2339, 2341, 2347, 2351, 2357, 2371, 2377, 2381, 2383, 2389, 2393, 2399, 2411, 2417, 2423, 2437, 2441, 2447, 2459, 2467, 2473, 2477, 2503, 2521, 2531, 2539, 2543, 2549, 2551, 2557, 2579, 2591, 2593, 2609, 2617, 2621, 2633, 2647, 2657, 2659, 2663, 2671, 2677, 2683, 2687, 2689, 2693, 2699, 2707, 2711, 2713, 2719, 2729, 2731, 2741, 2749, 2753, 2767, 2777, 2789, 2791, 2797, 2801, 2803, 2819, 2833, 2837, 2843, 2851, 2857, 2861, 2879, 2887, 2897, 2903, 2909, 2917, 2927, 2939, 2953, 2957, 2963, 2969, 2971, 2999, 3001, 3011, 3019, 3023, 3037, 3041, 3049, 3061, 3067, 3079, 3083, 3089, 3109, 3119, 3121, 3137, 3163, 3167, 3169, 3181, 3187, 3191, 3203, 3209, 3217, 3221, 3229, 3251, 3253, 3257, 3259, 3271, 3299, 3301, 3307, 3313, 3319, 3323, 3329, 3331, 3343, 3347, 3359, 3361, 3371, 3373, 3389, 3391, 3407, 3413, 3433, 3449, 3457, 3461, 3463, 3467, 3469, 3491, 3499, 3511, 3517, 3527, 3529, 3533, 3539, 3541, 3547, 3557, 3559, 3571, 3581, 3583, 3593, 3607, 3613, 3617, 3623, 3631, 3637, 3643, 3659, 3671, 3673, 3677, 3691, 3697, 3701, 3709, 3719, 3727, 3733, 3739, 3761, 3767, 3769, 3779, 3793, 3797, 3803, 3821, 3823, 3833, 3847, 3851, 3853, 3863, 3877, 3881, 3889, 3907, 3911, 3917, 3919, 3923, 3929, 3931, 3943, 3947, 3967, 3989, 4001, 4003, 4007, 4013, 4019, 4021, 4027, 4049, 4051, 4057, 4073, 4079, 4091, 4093, 4099, 4111, 4127, 4129, 4133, 4139, 4153, 4157, 4159, 4177, 4201, 4211, 4217, 4219, 4229, 4231, 4241, 4243, 4253, 4259, 4261, 4271, 4273, 4283, 4289, 4297, 4327, 4337, 4339, 4349, 4357, 4363, 4373, 4391, 4397, 4409, 4421, 4423, 4441, 4447, 4451, 4457, 4463, 4481, 4483, 4493, 4507, 4513, 4517, 4519, 4523, 4547, 4549, 4561, 4567, 4583, 4591, 4597, 4603, 4621, 4637, 4639, 4643, 4649, 4651, 4657, 4663, 4673, 4679, 4691, 4703, 4721, 4723, 4729, 4733, 4751, 4759, 4783, 4787, 4789, 4793, 4799, 4801, 4813, 4817, 4831, 4861, 4871, 4877, 4889, 4903, 4909, 4919, 4931, 4933, 4937, 4943, 4951, 4957, 4967, 4969, 4973, 4987, 4993, 4999, 5003, 5009, 5011, 5021, 5023, 5039, 5051, 5059, 5077, 5081, 5087, 5099, 5101, 5107, 5113, 5119, 5147, 5153, 5167, 5171, 5179, 5189, 5197, 5209, 5227, 5231, 5233, 5237, 5261, 5273, 5279, 5281, 5297, 5303, 5309, 5323, 5333, 5347, 5351, 5381, 5387, 5393, 5399, 5407, 5413, 5417, 5419, 5431, 5437, 5441, 5443, 5449, 5471, 5477, 5479, 5483, 5501, 5503, 5507, 5519, 5521, 5527, 5531, 5557, 5563, 5569, 5573, 5581, 5591, 5623, 5639, 5641, 5647, 5651, 5653, 5657, 5659, 5669, 5683, 5689, 5693, 5701, 5711, 5717, 5737, 5741, 5743, 5749, 5779, 5783, 5791, 5801, 5807, 5813, 5821, 5827, 5839, 5843, 5849, 5851, 5857, 5861, 5867, 5869, 5879, 5881, 5897, 5903, 5923, 5927, 5939, 5953, 5981, 5987, 6007, 6011, 6029, 6037, 6043, 6047, 6053, 6067, 6073, 6079, 6089, 6091, 6101, 6113, 6121, 6131, 6133, 6143, 6151, 6163, 6173, 6197, 6199, 6203, 6211, 6217, 6221, 6229, 6247, 6257, 6263, 6269, 6271, 6277, 6287, 6299, 6301, 6311, 6317, 6323, 6329, 6337, 6343, 6353, 6359, 6361, 6367, 6373, 6379, 6389, 6397, 6421, 6427, 6449, 6451, 6469, 6473, 6481, 6491, 6521, 6529, 6547, 6551, 6553, 6563, 6569, 6571, 6577, 6581, 6599, 6607, 6619, 6637, 6653, 6659, 6661, 6673, 6679, 6689, 6691, 6701, 6703, 6709, 6719, 6733, 6737, 6761, 6763, 6779, 6781, 6791, 6793, 6803, 6823, 6827, 6829, 6833, 6841, 6857, 6863, 6869, 6871, 6883, 6899, 6907, 6911, 6917, 6947, 6949, 6959, 6961, 6967, 6971, 6977, 6983, 6991, 6997, 7001, 7013, 7019, 7027, 7039, 7043, 7057, 7069, 7079, 7103, 7109, 7121, 7127, 7129, 7151, 7159, 7177, 7187, 7193, 7207, 7211, 7213, 7219, 7229, 7237, 7243, 7247, 7253, 7283, 7297, 7307, 7309, 7321, 7331, 7333, 7349, 7351, 7369, 7393, 7411, 7417, 7433, 7451, 7457, 7459, 7477, 7481, 7487, 7489, 7499, 7507, 7517, 7523, 7529, 7537, 7541, 7547, 7549, 7559, 7561, 7573, 7577, 7583, 7589, 7591, 7603, 7607, 7621, 7639, 7643, 7649, 7669, 7673, 7681, 7687, 7691, 7699, 7703, 7717, 7723, 7727, 7741, 7753, 7757, 7759, 7789, 7793, 7817, 7823, 7829, 7841, 7853, 7867, 7873, 7877, 7879, 7883, 7901, 7907, 7919, 7927, 7933, 7937, 7949, 7951, 7963, 7993, 8009, 8011, 8017, 8039, 8053, 8059, 8069, 8081, 8087, 8089, 8093, 8101, 8111, 8117, 8123, 8147, 8161, 8167, 8171, 8179, 8191, 8209, 8219, 8221, 8231, 8233, 8237, 8243, 8263, 8269, 8273, 8287, 8291, 8293, 8297, 8311, 8317, 8329, 8353, 8363, 8369, 8377, 8387, 8389, 8419, 8423, 8429, 8431, 8443, 8447, 8461, 8467, 8501, 8513, 8521, 8527, 8537, 8539, 8543, 8563, 8573, 8581, 8597, 8599, 8609, 8623, 8627, 8629, 8641, 8647, 8663, 8669, 8677, 8681, 8689, 8693, 8699, 8707, 8713, 8719, 8731, 8737, 8741, 8747, 8753, 8761, 8779, 8783, 8803, 8807, 8819, 8821, 8831, 8837, 8839, 8849, 8861, 8863, 8867, 8887, 8893, 8923, 8929, 8933, 8941, 8951, 8963, 8969, 8971, 8999, 9001, 9007, 9011, 9013, 9029, 9041, 9043, 9049, 9059, 9067, 9091, 9103, 9109, 9127, 9133, 9137, 9151, 9157, 9161, 9173, 9181, 9187, 9199, 9203, 9209, 9221, 9227, 9239, 9241, 9257, 9277, 9281, 9283, 9293, 9311, 9319, 9323, 9337, 9341, 9343, 9349, 9371, 9377, 9391, 9397, 9403, 9413, 9419, 9421, 9431, 9433, 9437, 9439, 9461, 9463, 9467, 9473, 9479, 9491, 9497, 9511, 9521, 9533, 9539, 9547, 9551, 9587, 9601, 9613, 9619, 9623, 9629, 9631, 9643, 9649, 9661, 9677, 9679, 9689, 9697, 9719, 9721, 9733, 9739, 9743, 9749, 9767, 9769, 9781, 9787, 9791, 9803, 9811, 9817, 9829, 9833, 9839, 9851, 9857, 9859, 9871, 9883, 9887, 9901, 9907, 9923, 9929, 9931, 9941, 9949, 9967, 9973, 10007, 10009, 10037, 10039, 10061, 10067, 10069, 10079, 10091, 10093, 10099, 10103, 10111, 10133, 10139, 10141, 10151, 10159, 10163, 10169, 10177, 10181, 10193, 10211, 10223, 10243, 10247, 10253, 10259, 10267, 10271, 10273, 10289, 10301, 10303, 10313, 10321, 10331, 10333, 10337, 10343, 10357, 10369, 10391, 10399, 10427, 10429, 10433, 10453, 10457, 10459, 10463, 10477, 10487, 10499, 10501, 10513, 10529, 10531, 10559, 10567, 10589, 10597, 10601, 10607, 10613, 10627, 10631, 10639, 10651, 10657, 10663, 10667, 10687, 10691, 10709, 10711, 10723, 10729, 10733, 10739, 10753, 10771, 10781, 10789, 10799, 10831, 10837, 10847, 10853, 10859, 10861, 10867, 10883, 10889, 10891, 10903, 10909, 10937, 10939, 10949, 10957, 10973, 10979, 10987, 10993, 11003, 11027, 11047, 11057, 11059, 11069, 11071, 11083, 11087, 11093, 11113, 11117, 11119, 11131, 11149, 11159, 11161, 11171, 11173, 11177, 11197, 11213, 11239, 11243, 11251, 11257, 11261, 11273, 11279, 11287, 11299, 11311, 11317, 11321, 11329, 11351, 11353, 11369, 11383, 11393, 11399, 11411, 11423, 11437, 11443, 11447, 11467, 11471, 11483, 11489, 11491, 11497, 11503, 11519, 11527, 11549, 11551, 11579, 11587, 11593, 11597, 11617, 11621, 11633, 11657, 11677, 11681, 11689, 11699, 11701, 11717, 11719, 11731, 11743, 11777, 11779, 11783, 11789, 11801, 11807, 11813, 11821, 11827, 11831, 11833, 11839, 11863, 11867, 11887, 11897, 11903, 11909, 11923, 11927, 11933, 11939, 11941, 11953, 11959, 11969, 11971, 11981, 11987, 12007, 12011, 12037, 12041, 12043, 12049, 12071, 12073, 12097, 12101, 12107, 12109, 12113, 12119, 12143, 12149, 12157, 12161, 12163, 12197, 12203, 12211, 12227, 12239, 12241, 12251, 12253, 12263, 12269, 12277, 12281, 12289, 12301, 12323, 12329, 12343, 12347, 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87383, 87403, 87407, 87421, 87427, 87433, 87443, 87473, 87481, 87491, 87509, 87511, 87517, 87523, 87539, 87541, 87547, 87553, 87557, 87559, 87583, 87587, 87589, 87613, 87623, 87629, 87631, 87641, 87643, 87649, 87671, 87679, 87683, 87691, 87697, 87701, 87719, 87721, 87739, 87743, 87751, 87767, 87793, 87797, 87803, 87811, 87833, 87853, 87869, 87877, 87881, 87887, 87911, 87917, 87931, 87943, 87959, 87961, 87973, 87977, 87991, 88001, 88003, 88007, 88019, 88037, 88069, 88079, 88093, 88117, 88129, 88169, 88177, 88211, 88223, 88237, 88241, 88259, 88261, 88289, 88301, 88321, 88327, 88337, 88339, 88379, 88397, 88411, 88423, 88427, 88463, 88469, 88471, 88493, 88499, 88513, 88523, 88547, 88589, 88591, 88607, 88609, 88643, 88651, 88657, 88661, 88663, 88667, 88681, 88721, 88729, 88741, 88747, 88771, 88789, 88793, 88799, 88801, 88807, 88811, 88813, 88817, 88819, 88843, 88853, 88861, 88867, 88873, 88883, 88897, 88903, 88919, 88937, 88951, 88969, 88993, 88997, 89003, 89009, 89017, 89021, 89041, 89051, 89057, 89069, 89071, 89083, 89087, 89101, 89107, 89113, 89119, 89123, 89137, 89153, 89189, 89203, 89209, 89213, 89227, 89231, 89237, 89261, 89269, 89273, 89293, 89303, 89317, 89329, 89363, 89371, 89381, 89387, 89393, 89399, 89413, 89417, 89431, 89443, 89449, 89459, 89477, 89491, 89501, 89513, 89519, 89521, 89527, 89533, 89561, 89563, 89567, 89591, 89597, 89599, 89603, 89611, 89627, 89633, 89653, 89657, 89659, 89669, 89671, 89681, 89689, 89753, 89759, 89767, 89779, 89783, 89797, 89809, 89819, 89821, 89833, 89839, 89849, 89867, 89891, 89897, 89899, 89909, 89917, 89923, 89939, 89959, 89963, 89977, 89983, 89989, 90001, 90007, 90011, 90017, 90019, 90023, 90031, 90053, 90059, 90067, 90071, 90073, 90089, 90107, 90121, 90127, 90149, 90163, 90173, 90187, 90191, 90197, 90199, 90203, 90217, 90227, 90239, 90247, 90263, 90271, 90281, 90289, 90313, 90353, 90359, 90371, 90373, 90379, 90397, 90401, 90403, 90407, 90437, 90439, 90469, 90473, 90481, 90499, 90511, 90523, 90527, 90529, 90533, 90547, 90583, 90599, 90617, 90619, 90631, 90641, 90647, 90659, 90677, 90679, 90697, 90703, 90709, 90731, 90749, 90787, 90793, 90803, 90821, 90823, 90833, 90841, 90847, 90863, 90887, 90901, 90907, 90911, 90917, 90931, 90947, 90971, 90977, 90989, 90997, 91009, 91019, 91033, 91079, 91081, 91097, 91099, 91121, 91127, 91129, 91139, 91141, 91151, 91153, 91159, 91163, 91183, 91193, 91199, 91229, 91237, 91243, 91249, 91253, 91283, 91291, 91297, 91303, 91309, 91331, 91367, 91369, 91373, 91381, 91387, 91393, 91397, 91411, 91423, 91433, 91453, 91457, 91459, 91463, 91493, 91499, 91513, 91529, 91541, 91571, 91573, 91577, 91583, 91591, 91621, 91631, 91639, 91673, 91691, 91703, 91711, 91733, 91753, 91757, 91771, 91781, 91801, 91807, 91811, 91813, 91823, 91837, 91841, 91867, 91873, 91909, 91921, 91939, 91943, 91951, 91957, 91961, 91967, 91969, 91997, 92003, 92009, 92033, 92041, 92051, 92077, 92083, 92107, 92111, 92119, 92143, 92153, 92173, 92177, 92179, 92189, 92203, 92219, 92221, 92227, 92233, 92237, 92243, 92251, 92269, 92297, 92311, 92317, 92333, 92347, 92353, 92357, 92363, 92369, 92377, 92381, 92383, 92387, 92399, 92401, 92413, 92419, 92431, 92459, 92461, 92467, 92479, 92489, 92503, 92507, 92551, 92557, 92567, 92569, 92581, 92593, 92623, 92627, 92639, 92641, 92647, 92657, 92669, 92671, 92681, 92683, 92693, 92699, 92707, 92717, 92723, 92737, 92753, 92761, 92767, 92779, 92789, 92791, 92801, 92809, 92821, 92831, 92849, 92857, 92861, 92863, 92867, 92893, 92899, 92921, 92927, 92941, 92951, 92957, 92959, 92987, 92993, 93001, 93047, 93053, 93059, 93077, 93083, 93089, 93097, 93103, 93113, 93131, 93133, 93139, 93151, 93169, 93179, 93187, 93199, 93229, 93239, 93241, 93251, 93253, 93257, 93263, 93281, 93283, 93287, 93307, 93319, 93323, 93329, 93337, 93371, 93377, 93383, 93407, 93419, 93427, 93463, 93479, 93481, 93487, 93491, 93493, 93497, 93503, 93523, 93529, 93553, 93557, 93559, 93563, 93581, 93601, 93607, 93629, 93637, 93683, 93701, 93703, 93719, 93739, 93761, 93763, 93787, 93809, 93811, 93827, 93851, 93871, 93887, 93889, 93893, 93901, 93911, 93913, 93923, 93937, 93941, 93949, 93967, 93971, 93979, 93983, 93997, 94007, 94009, 94033, 94049, 94057, 94063, 94079, 94099, 94109, 94111, 94117, 94121, 94151, 94153, 94169, 94201, 94207, 94219, 94229, 94253, 94261, 94273, 94291, 94307, 94309, 94321, 94327, 94331, 94343, 94349, 94351, 94379, 94397, 94399, 94421, 94427, 94433, 94439, 94441, 94447, 94463, 94477, 94483, 94513, 94529, 94531, 94541, 94543, 94547, 94559, 94561, 94573, 94583, 94597, 94603, 94613, 94621, 94649, 94651, 94687, 94693, 94709, 94723, 94727, 94747, 94771, 94777, 94781, 94789, 94793, 94811, 94819, 94823, 94837, 94841, 94847, 94849, 94873, 94889, 94903, 94907, 94933, 94949, 94951, 94961, 94993, 94999, 95003, 95009, 95021, 95027, 95063, 95071, 95083, 95087, 95089, 95093, 95101, 95107, 95111, 95131, 95143, 95153, 95177, 95189, 95191, 95203, 95213, 95219, 95231, 95233, 95239, 95257, 95261, 95267, 95273, 95279, 95287, 95311, 95317, 95327, 95339, 95369, 95383, 95393, 95401, 95413, 95419, 95429, 95441, 95443, 95461, 95467, 95471, 95479, 95483, 95507, 95527, 95531, 95539, 95549, 95561, 95569, 95581, 95597, 95603, 95617, 95621, 95629, 95633, 95651, 95701, 95707, 95713, 95717, 95723, 95731, 95737, 95747, 95773, 95783, 95789, 95791, 95801, 95803, 95813, 95819, 95857, 95869, 95873, 95881, 95891, 95911, 95917, 95923, 95929, 95947, 95957, 95959, 95971, 95987, 95989, 96001, 96013, 96017, 96043, 96053, 96059, 96079, 96097, 96137, 96149, 96157, 96167, 96179, 96181, 96199, 96211, 96221, 96223, 96233, 96259, 96263, 96269, 96281, 96289, 96293, 96323, 96329, 96331, 96337, 96353, 96377, 96401, 96419, 96431, 96443, 96451, 96457, 96461, 96469, 96479, 96487, 96493, 96497, 96517, 96527, 96553, 96557, 96581, 96587, 96589, 96601, 96643, 96661, 96667, 96671, 96697, 96703, 96731, 96737, 96739, 96749, 96757, 96763, 96769, 96779, 96787, 96797, 96799, 96821, 96823, 96827, 96847, 96851, 96857, 96893, 96907, 96911, 96931, 96953, 96959, 96973, 96979, 96989, 96997, 97001, 97003, 97007, 97021, 97039, 97073, 97081, 97103, 97117, 97127, 97151, 97157, 97159, 97169, 97171, 97177, 97187, 97213, 97231, 97241, 97259, 97283, 97301, 97303, 97327, 97367, 97369, 97373, 97379, 97381, 97387, 97397, 97423, 97429, 97441, 97453, 97459, 97463, 97499, 97501, 97511, 97523, 97547, 97549, 97553, 97561, 97571, 97577, 97579, 97583, 97607, 97609, 97613, 97649, 97651, 97673, 97687, 97711, 97729, 97771, 97777, 97787, 97789, 97813, 97829, 97841, 97843, 97847, 97849, 97859, 97861, 97871, 97879, 97883, 97919, 97927, 97931, 97943, 97961, 97967, 97973, 97987, 98009, 98011, 98017, 98041, 98047, 98057, 98081, 98101, 98123, 98129, 98143, 98179, 98207, 98213, 98221, 98227, 98251, 98257, 98269, 98297, 98299, 98317, 98321, 98323, 98327, 98347, 98369, 98377, 98387, 98389, 98407, 98411, 98419, 98429, 98443, 98453, 98459, 98467, 98473, 98479, 98491, 98507, 98519, 98533, 98543, 98561, 98563, 98573, 98597, 98621, 98627, 98639, 98641, 98663, 98669, 98689, 98711, 98713, 98717, 98729, 98731, 98737, 98773, 98779, 98801, 98807, 98809, 98837, 98849, 98867, 98869, 98873, 98887, 98893, 98897, 98899, 98909, 98911, 98927, 98929, 98939, 98947, 98953, 98963, 98981, 98993, 98999, 99013, 99017, 99023, 99041, 99053, 99079, 99083, 99089, 99103, 99109, 99119, 99131, 99133, 99137, 99139, 99149, 99173, 99181, 99191, 99223, 99233, 99241, 99251, 99257, 99259, 99277, 99289, 99317, 99347, 99349, 99367, 99371, 99377, 99391, 99397, 99401, 99409, 99431, 99439, 99469, 99487, 99497, 99523, 99527, 99529, 99551, 99559, 99563, 99571, 99577, 99581, 99607, 99611, 99623, 99643, 99661, 99667, 99679, 99689, 99707, 99709, 99713, 99719, 99721, 99733, 99761, 99767, 99787, 99793, 99809, 99817, 99823, 99829, 99833, 99839, 99859, 99871, 99877, 99881, 99901, 99907, 99923, 99929, 99961, 99971, 99989, 99991, 100003, 100019, 100043, 100049, 100057, 100069, 100103, 100109, 100129, 100151, 100153, 100169, 100183, 100189, 100193, 100207, 100213, 100237, 100267, 100271, 100279, 100291, 100297, 100313, 100333, 100343, 100357, 100361, 100363, 100379, 100391, 100393, 100403, 100411, 100417, 100447, 100459, 100469, 100483, 100493, 100501, 100511, 100517, 100519, 100523, 100537, 100547, 100549, 100559, 100591, 100609, 100613, 100621, 100649, 100669, 100673, 100693, 100699, 100703, 100733, 100741, 100747, 100769, 100787, 100799, 100801, 100811, 100823, 100829, 100847, 100853, 100907, 100913, 100927, 100931, 100937, 100943, 100957, 100981, 100987, 100999, 101009, 101021, 101027, 101051, 101063, 101081, 101089, 101107, 101111, 101113, 101117, 101119, 101141, 101149, 101159, 101161, 101173, 101183, 101197, 101203, 101207, 101209, 101221, 101267, 101273, 101279, 101281, 101287, 101293, 101323, 101333, 101341, 101347, 101359, 101363, 101377, 101383, 101399, 101411, 101419, 101429, 101449, 101467, 101477, 101483, 101489, 101501, 101503, 101513, 101527, 101531, 101533, 101537, 101561, 101573, 101581, 101599, 101603, 101611, 101627, 101641, 101653, 101663, 101681, 101693, 101701, 101719, 101723, 101737, 101741, 101747, 101749, 101771, 101789, 101797, 101807, 101833, 101837, 101839, 101863, 101869, 101873, 101879, 101891, 101917, 101921, 101929, 101939, 101957, 101963, 101977, 101987, 101999, 102001, 102013, 102019, 102023, 102031, 102043, 102059, 102061, 102071, 102077, 102079, 102101, 102103, 102107, 102121, 102139, 102149, 102161, 102181, 102191, 102197, 102199, 102203, 102217, 102229, 102233, 102241, 102251, 102253, 102259, 102293, 102299, 102301, 102317, 102329, 102337, 102359, 102367, 102397, 102407, 102409, 102433, 102437, 102451, 102461, 102481, 102497, 102499, 102503, 102523, 102533, 102539, 102547, 102551, 102559, 102563, 102587, 102593, 102607, 102611, 102643, 102647, 102653, 102667, 102673, 102677, 102679, 102701, 102761, 102763, 102769, 102793, 102797, 102811, 102829, 102841, 102859, 102871, 102877, 102881, 102911, 102913, 102929, 102931, 102953, 102967, 102983, 103001, 103007, 103043, 103049, 103067, 103069, 103079, 103087, 103091, 103093, 103099, 103123, 103141, 103171, 103177, 103183, 103217, 103231, 103237, 103289, 103291, 103307, 103319, 103333, 103349, 103357, 103387, 103391, 103393, 103399, 103409, 103421, 103423, 103451, 103457, 103471, 103483, 103511, 103529, 103549, 103553, 103561, 103567, 103573, 103577, 103583, 103591, 103613, 103619, 103643, 103651, 103657, 103669, 103681, 103687, 103699, 103703, 103723, 103769, 103787, 103801, 103811, 103813, 103837, 103841, 103843, 103867, 103889, 103903, 103913, 103919, 103951, 103963, 103967, 103969, 103979, 103981, 103991, 103993, 103997, 104003, 104009, 104021, 104033, 104047, 104053, 104059, 104087, 104089, 104107, 104113, 104119, 104123, 104147, 104149, 104161, 104173, 104179, 104183, 104207, 104231, 104233, 104239, 104243, 104281, 104287, 104297, 104309, 104311, 104323, 104327, 104347, 104369, 104381, 104383, 104393, 104399, 104417, 104459, 104471, 104473, 104479, 104491, 104513, 104527, 104537, 104543, 104549, 104551, 104561, 104579, 104593, 104597, 104623, 104639, 104651, 104659, 104677, 104681, 104683, 104693, 104701, 104707, 104711, 104717, 104723, 104729, PASS (test prime_generator :time 0.12 :before-memory 4.69 :after-memory 4.69) 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139, 149, 151, 157, 163, 167, 173, 179, 181, 191, 193, 197, 199, 211, 223, 227, 229, 233, 239, 241, 251, 257, 263, 269, 271, 277, 281, 283, 293, 307, 311, 313, 317, 331, 337, 347, 349, 353, 359, 367, 373, 379, 383, 389, 397, 401, 409, 419, 421, 431, 433, 439, 443, 449, 457, 461, 463, 467, 479, 487, 491, 499, 503, 509, 521, 523, 541, 547, 557, 563, 569, 571, 577, 587, 593, 599, 601, 607, 613, 617, 619, 631, 641, 643, 647, 653, 659, 661, 673, 677, 683, 691, 701, 709, 719, 727, 733, 739, 743, 751, 757, 761, 769, 773, 787, 797, 809, 811, 821, 823, 827, 829, 839, 853, 857, 859, 863, 877, 881, 883, 887, 907, 911, 919, 929, 937, 941, 947, 953, 967, 971, 977, 983, 991, 997, 1009, 1013, 1019, 1021, 1031, 1033, 1039, 1049, 1051, 1061, 1063, 1069, 1087, 1091, 1093, 1097, 1103, 1109, 1117, 1123, 1129, 1151, 1153, 1163, 1171, 1181, 1187, 1193, 1201, 1213, 1217, 1223, 1229, 1231, 1237, 1249, 1259, 1277, 1279, 1283, 1289, 1291, 1297, 1301, 1303, 1307, 1319, 1321, 1327, 1361, 1367, 1373, 1381, 1399, 1409, 1423, 1427, 1429, 1433, 1439, 1447, 1451, 1453, 1459, 1471, 1481, 1483, 1487, 1489, 1493, 1499, 1511, 1523, 1531, 1543, 1549, 1553, 1559, 1567, 1571, 1579, 1583, 1597, 1601, 1607, 1609, 1613, 1619, 1621, 1627, 1637, 1657, 1663, 1667, 1669, 1693, 1697, 1699, 1709, 1721, 1723, 1733, 1741, 1747, 1753, 1759, 1777, 1783, 1787, 1789, 1801, 1811, 1823, 1831, 1847, 1861, 1867, 1871, 1873, 1877, 1879, 1889, 1901, 1907, 1913, 1931, 1933, 1949, 1951, 1973, 1979, 1987, 1993, 1997, 1999, 2003, 2011, 2017, 2027, 2029, 2039, 2053, 2063, 2069, 2081, 2083, 2087, 2089, 2099, 2111, 2113, 2129, 2131, 2137, 2141, 2143, 2153, 2161, 2179, 2203, 2207, 2213, 2221, 2237, 2239, 2243, 2251, 2267, 2269, 2273, 2281, 2287, 2293, 2297, 2309, 2311, 2333, 2339, 2341, 2347, 2351, 2357, 2371, 2377, 2381, 2383, 2389, 2393, 2399, 2411, 2417, 2423, 2437, 2441, 2447, 2459, 2467, 2473, 2477, 2503, 2521, 2531, 2539, 2543, 2549, 2551, 2557, 2579, 2591, 2593, 2609, 2617, 2621, 2633, 2647, 2657, 2659, 2663, 2671, 2677, 2683, 2687, 2689, 2693, 2699, 2707, 2711, 2713, 2719, 2729, 2731, 2741, 2749, 2753, 2767, 2777, 2789, 2791, 2797, 2801, 2803, 2819, 2833, 2837, 2843, 2851, 2857, 2861, 2879, 2887, 2897, 2903, 2909, 2917, 2927, 2939, 2953, 2957, 2963, 2969, 2971, 2999, 3001, 3011, 3019, 3023, 3037, 3041, 3049, 3061, 3067, 3079, 3083, 3089, 3109, 3119, 3121, 3137, 3163, 3167, 3169, 3181, 3187, 3191, 3203, 3209, 3217, 3221, 3229, 3251, 3253, 3257, 3259, 3271, 3299, 3301, 3307, 3313, 3319, 3323, 3329, 3331, 3343, 3347, 3359, 3361, 3371, 3373, 3389, 3391, 3407, 3413, 3433, 3449, 3457, 3461, 3463, 3467, 3469, 3491, 3499, 3511, 3517, 3527, 3529, 3533, 3539, 3541, 3547, 3557, 3559, 3571, 3581, 3583, 3593, 3607, 3613, 3617, 3623, 3631, 3637, 3643, 3659, 3671, 3673, 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95369, 95383, 95393, 95401, 95413, 95419, 95429, 95441, 95443, 95461, 95467, 95471, 95479, 95483, 95507, 95527, 95531, 95539, 95549, 95561, 95569, 95581, 95597, 95603, 95617, 95621, 95629, 95633, 95651, 95701, 95707, 95713, 95717, 95723, 95731, 95737, 95747, 95773, 95783, 95789, 95791, 95801, 95803, 95813, 95819, 95857, 95869, 95873, 95881, 95891, 95911, 95917, 95923, 95929, 95947, 95957, 95959, 95971, 95987, 95989, 96001, 96013, 96017, 96043, 96053, 96059, 96079, 96097, 96137, 96149, 96157, 96167, 96179, 96181, 96199, 96211, 96221, 96223, 96233, 96259, 96263, 96269, 96281, 96289, 96293, 96323, 96329, 96331, 96337, 96353, 96377, 96401, 96419, 96431, 96443, 96451, 96457, 96461, 96469, 96479, 96487, 96493, 96497, 96517, 96527, 96553, 96557, 96581, 96587, 96589, 96601, 96643, 96661, 96667, 96671, 96697, 96703, 96731, 96737, 96739, 96749, 96757, 96763, 96769, 96779, 96787, 96797, 96799, 96821, 96823, 96827, 96847, 96851, 96857, 96893, 96907, 96911, 96931, 96953, 96959, 96973, 96979, 96989, 96997, 97001, 97003, 97007, 97021, 97039, 97073, 97081, 97103, 97117, 97127, 97151, 97157, 97159, 97169, 97171, 97177, 97187, 97213, 97231, 97241, 97259, 97283, 97301, 97303, 97327, 97367, 97369, 97373, 97379, 97381, 97387, 97397, 97423, 97429, 97441, 97453, 97459, 97463, 97499, 97501, 97511, 97523, 97547, 97549, 97553, 97561, 97571, 97577, 97579, 97583, 97607, 97609, 97613, 97649, 97651, 97673, 97687, 97711, 97729, 97771, 97777, 97787, 97789, 97813, 97829, 97841, 97843, 97847, 97849, 97859, 97861, 97871, 97879, 97883, 97919, 97927, 97931, 97943, 97961, 97967, 97973, 97987, 98009, 98011, 98017, 98041, 98047, 98057, 98081, 98101, 98123, 98129, 98143, 98179, 98207, 98213, 98221, 98227, 98251, 98257, 98269, 98297, 98299, 98317, 98321, 98323, 98327, 98347, 98369, 98377, 98387, 98389, 98407, 98411, 98419, 98429, 98443, 98453, 98459, 98467, 98473, 98479, 98491, 98507, 98519, 98533, 98543, 98561, 98563, 98573, 98597, 98621, 98627, 98639, 98641, 98663, 98669, 98689, 98711, 98713, 98717, 98729, 98731, 98737, 98773, 98779, 98801, 98807, 98809, 98837, 98849, 98867, 98869, 98873, 98887, 98893, 98897, 98899, 98909, 98911, 98927, 98929, 98939, 98947, 98953, 98963, 98981, 98993, 98999, 99013, 99017, 99023, 99041, 99053, 99079, 99083, 99089, 99103, 99109, 99119, 99131, 99133, 99137, 99139, 99149, 99173, 99181, 99191, 99223, 99233, 99241, 99251, 99257, 99259, 99277, 99289, 99317, 99347, 99349, 99367, 99371, 99377, 99391, 99397, 99401, 99409, 99431, 99439, 99469, 99487, 99497, 99523, 99527, 99529, 99551, 99559, 99563, 99571, 99577, 99581, 99607, 99611, 99623, 99643, 99661, 99667, 99679, 99689, 99707, 99709, 99713, 99719, 99721, 99733, 99761, 99767, 99787, 99793, 99809, 99817, 99823, 99829, 99833, 99839, 99859, 99871, 99877, 99881, 99901, 99907, 99923, 99929, 99961, 99971, 99989, 99991, 100003, 100019, 100043, 100049, 100057, 100069, 100103, 100109, 100129, 100151, 100153, 100169, 100183, 100189, 100193, 100207, 100213, 100237, 100267, 100271, 100279, 100291, 100297, 100313, 100333, 100343, 100357, 100361, 100363, 100379, 100391, 100393, 100403, 100411, 100417, 100447, 100459, 100469, 100483, 100493, 100501, 100511, 100517, 100519, 100523, 100537, 100547, 100549, 100559, 100591, 100609, 100613, 100621, 100649, 100669, 100673, 100693, 100699, 100703, 100733, 100741, 100747, 100769, 100787, 100799, 100801, 100811, 100823, 100829, 100847, 100853, 100907, 100913, 100927, 100931, 100937, 100943, 100957, 100981, 100987, 100999, 101009, 101021, 101027, 101051, 101063, 101081, 101089, 101107, 101111, 101113, 101117, 101119, 101141, 101149, 101159, 101161, 101173, 101183, 101197, 101203, 101207, 101209, 101221, 101267, 101273, 101279, 101281, 101287, 101293, 101323, 101333, 101341, 101347, 101359, 101363, 101377, 101383, 101399, 101411, 101419, 101429, 101449, 101467, 101477, 101483, 101489, 101501, 101503, 101513, 101527, 101531, 101533, 101537, 101561, 101573, 101581, 101599, 101603, 101611, 101627, 101641, 101653, 101663, 101681, 101693, 101701, 101719, 101723, 101737, 101741, 101747, 101749, 101771, 101789, 101797, 101807, 101833, 101837, 101839, 101863, 101869, 101873, 101879, 101891, 101917, 101921, 101929, 101939, 101957, 101963, 101977, 101987, 101999, 102001, 102013, 102019, 102023, 102031, 102043, 102059, 102061, 102071, 102077, 102079, 102101, 102103, 102107, 102121, 102139, 102149, 102161, 102181, 102191, 102197, 102199, 102203, 102217, 102229, 102233, 102241, 102251, 102253, 102259, 102293, 102299, 102301, 102317, 102329, 102337, 102359, 102367, 102397, 102407, 102409, 102433, 102437, 102451, 102461, 102481, 102497, 102499, 102503, 102523, 102533, 102539, 102547, 102551, 102559, 102563, 102587, 102593, 102607, 102611, 102643, 102647, 102653, 102667, 102673, 102677, 102679, 102701, 102761, 102763, 102769, 102793, 102797, 102811, 102829, 102841, 102859, 102871, 102877, 102881, 102911, 102913, 102929, 102931, 102953, 102967, 102983, 103001, 103007, 103043, 103049, 103067, 103069, 103079, 103087, 103091, 103093, 103099, 103123, 103141, 103171, 103177, 103183, 103217, 103231, 103237, 103289, 103291, 103307, 103319, 103333, 103349, 103357, 103387, 103391, 103393, 103399, 103409, 103421, 103423, 103451, 103457, 103471, 103483, 103511, 103529, 103549, 103553, 103561, 103567, 103573, 103577, 103583, 103591, 103613, 103619, 103643, 103651, 103657, 103669, 103681, 103687, 103699, 103703, 103723, 103769, 103787, 103801, 103811, 103813, 103837, 103841, 103843, 103867, 103889, 103903, 103913, 103919, 103951, 103963, 103967, 103969, 103979, 103981, 103991, 103993, 103997, 104003, 104009, 104021, 104033, 104047, 104053, 104059, 104087, 104089, 104107, 104113, 104119, 104123, 104147, 104149, 104161, 104173, 104179, 104183, 104207, 104231, 104233, 104239, 104243, 104281, 104287, 104297, 104309, 104311, 104323, 104327, 104347, 104369, 104381, 104383, 104393, 104399, 104417, 104459, 104471, 104473, 104479, 104491, 104513, 104527, 104537, 104543, 104549, 104551, 104561, 104579, 104593, 104597, 104623, 104639, 104651, 104659, 104677, 104681, 104683, 104693, 104701, 104707, 104711, 104717, 104723, 104729, PASS (test prime_generator :time 0.12 :before-memory 4.69 :after-memory 4.69) PASS (test permutation :time 0.00 :before-memory 4.69 :after-memory 4.69) PASS (test permutation :time 0.00 :before-memory 4.69 :after-memory 4.69) x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 1 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 2 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 0.5 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := -1 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 3 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 1 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 2 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 0.5 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := -1 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 3 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 < 0); ------------------ Off Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; On Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; ==> x3 - x0 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x5 - x3 > 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x4 < 0; x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; On Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x1 > 0; x9 - x2 > 0; x9 - x3 > 0; x9 - x4 < 0; x9 - x5 < 0; x9 - x6 < 0; x9 - x7 < 0; x9 - x8 < 0; Off Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; ==> x5 > 0; x3 - x0 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x3 < 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; x5 x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x4 < 0; x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; x5 x10 - x9 = 0; ==> x5 x9 - x0 x5 > 0; x5 x9 - x1 x5 > 0; x5 x9 - x2 x5 > 0; x5 x9 - x3 x5 > 0; x5 x9 - x4 x5 < 0; x5 x9 - x5^2 < 0; x5 x9 - x5 x6 < 0; x5 x9 - x5 x7 < 0; x5 x9 - x5 x8 < 0; x5 > 0; Off Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; ==> x3 - x0 < 0; x1 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x5 - x3 > 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; x10 - x9 = 0; ==> x9 > root[1](x1 x9 - x4); x9 < root[1](x1 x9 - x0); x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; x10 - x9 = 0; ==> x1 x9 - x0 > 0; x1 x9 - x1 > 0; x1 x9 - x2 > 0; x1 x9 - x3 > 0; x1 x9 - x4 < 0; x1 x9 - x5 < 0; x1 x9 - x6 < 0; x1 x9 - x7 < 0; x1 x9 - x8 < 0; ------------------ Project x0 x6^2 - x1 x6 - x2 = 0; ==> x2 > root[1](4 x0 x2 + x1^2); x0 > 0; ------------------ x5 + x4 > 0 x5 + x4 < 0 true b0 -> true x0 -> -0.5 x1 -> -0.5 x2 -> 1 x3 -> -1 x4 -> 0.5 x5 -> 1 x6 -> 2 0.5 1 2 ------------------ Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; ==> x6 + 2 > 0; x1 > 0; x0 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; ==> x6 + x0 x4^2 + 2 > 0; x6 + x2 x4 + 1 > 0; x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; ==> x5 > root[1](x1 x5 + 2 x2 x4 - x4 + 10); x2^2 - 4 x0 = 0; x0 > 0; 2 x0 x4 - x2 > 0; x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; ==> x5 > root[1](x1 x5 + 2 x0 x4^2 - x4 + 12); x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; 5 x6 - x5 + x3 x4 > 0; ==> x5 > root[1](5 x1 x5 - 2 x5 + 2 x3 x4 - 5 x4 + 40); x2^2 - 4 x0 = 0; x0 > 0; 2 x0 x4 - x2 > 0; x1^2 x3^2 - 10 x1^2 x2 x3 - 2 x1 x3 + 25 x1^2 x2^2 + 10 x1 x2 + 40 x0 x1 - 96 x0 + 1 > 0; 2 x0 > 0; 4 x0 x4 + x1 x3 - 5 x1 x2 - 1 < 0; 2 x0 x4^2 + x1 x3 x4 - 5 x1 x2 x4 - x4 - 5 x1 + 12 < 0; x1^2 x3^2 - 15 x1^2 x2 x3 + 14 x1 x2 x3 - 2 x1 x3 + 50 x1^2 x2^2 - 80 x1 x2^2 + 24 x2^2 + 15 x1 x2 - 14 x2 + 25 x0 x1^2 - 100 x0 x1 + 100 x0 + 1 = 0; 800 x0 x1^4 - 800 x0 x1^3 = 0; x1^2 > 0; x1^2 x3 + 2 x1 x2 - x1 > 0; 160 x0 x1^3 - 384 x0 x1^2 < 0; x1^2 x3 - 5 x1^2 x2 - x1 < 0; x1 - 1 = 0; x2 > root[2](25 x1^2 x2^4 + 20 x1 x2^4 + 4 x2^4 - 400 x0 x1^2 x2^2 + 480 x0 x1 x2^2 - 192 x0 x2^2 + 1600 x0^2 x1^2 - 3840 x0^2 x1 + 2304 x0^2); 40 x0 x1 - 96 x0 < 0; x2 > 0; x2^2 + 10 x0 x1 - 24 x0 < 0; 35 x1 - 27 > 0; 175 x1^2 - 270 x1 + 96 > 0; 40 x1 - 19 > 0; 20 x1^2 - 19 x1 - 2 < 0; Project - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; 5 x6 - x5 + x3 x4 > 0; ==> x5 > root[1](5 x1 x5 - 2 x5 + 2 x3 x4 - 5 x4 + 40); x4 > root[1](x1 x3 x4 - 5 x1 x2 x4 + 2 x2 x4 - x4 - 5 x1 + 10); x3 < root[1](x1 x3 - 5 x1 x2 + 2 x2 - 1); 5 x1 - 2 > 0; ------------------ 1) {(-oo, ~p1, -1.4142135623?), (1.4142135623?, ~p1, oo)} 2) {(-oo, ~p1, -1.4142135623?), (1.4142135623?, ~p1, oo)} ------------------ s1: {(-oo, p1, -17], [-15, p1, -14], [-13, p1, -12), [-10, p1, -8], [-6, p1, -3), [-2, p1, -1), (1, p1, 4], (5, p1, 7], [8, p1, 10]} s2: {(-15, p2, -14], [-13, p2, -12), (-12, p2, -10], (-9, p2, -8), (-7, p2, -6], (-5, p2, -4], [-3, p2, 0], (1, p2, 3], (5, p2, 7)} union(s1, s2): {(-oo, p1, -17], [-15, p1, -14], [-13, p1, -12), (-12, p2, -10), [-10, p1, -8], (-7, p2, -6), [-6, p1, -3), [-3, p2, 0], (1, p1, 4], (5, p1, 7], [8, p1, 10]} s1: {(-oo, p1, -7), [-5, p1, -3), (-2, p1, 1), [2, p1, 2], (3, p1, 4), (5, p1, 6], (7, p1, 8), [9, p1, 10), (10, p1, oo)} s2: {(-12, p2, -11), (-9, p2, -8), (-7, p2, -6], (-4, p2, -3], [-2, p2, -1], [0, p2, 2), (3, p2, 4], (5, p2, 6), (7, p2, 9], [11, p2, 12), (12, p2, oo)} union(s1, s2): {(-oo, p1, -7), (-7, p2, -6], [-5, p1, -4], (-4, p2, -3], [-2, p2, -2], (-2, p1, 0), [0, p2, 2), [2, p1, 2], (3, p2, 4], (5, p1, 6], (7, p2, 9), [9, p1, 10), (10, p1, oo)} s1: {(-9, p1, -8], [-7, p1, -4], (-3, p1, -2), (0, p1, 2), [4, p1, 6], [7, p1, 11], [12, p1, 14)} s2: {(-oo, p2, -13], [-11, p2, -11], [-9, p2, -7), (-5, p2, -4), [-2, p2, -1), (-1, p2, 1], [2, p2, 4), [6, p2, 7), (7, p2, 9), [10, p2, 12], (13, p2, oo)} union(s1, s2): {(-oo, p2, -13], [-11, p2, -11], [-9, p2, -7), [-7, p1, -4], (-3, p1, -2), [-2, p2, -1), (-1, p2, 0], (0, p1, 2), [2, p2, 4), [4, p1, 6), [6, p2, 7), [7, p1, 10), [10, p2, 12), [12, p1, 13], (13, p2, oo)} s1: {[-12, p1, -10], (-9, p1, -8), [-6, p1, -4], (-2, p1, 0), (1, p1, 3], [5, p1, 8), (8, p1, 10), (12, p1, 13]} s2: {[-9, p2, -8), (-8, p2, -7], (-6, p2, -5], (-4, p2, -3), [-1, p2, 0), (0, p2, 6), (8, p2, 9]} union(s1, s2): {[-12, p1, -10], [-9, p2, -8), (-8, p2, -7], [-6, p1, -4], (-4, p2, -3), (-2, p1, 0), (0, p2, 5), [5, p1, 8), (8, p1, 10), (12, p1, 13]} s1: {(-8, p1, -7), (-5, p1, -4), (-2, p1, 0), [1, p1, 3), (4, p1, 6), (6, p1, 9], [11, p1, 14]} s2: {(-16, p2, -15), (-14, p2, -12], [-10, p2, -10], [-8, p2, -6), (-4, p2, 1), (1, p2, 2), [3, p2, oo)} union(s1, s2): {(-16, p2, -15), (-14, p2, -12], [-10, p2, -10], [-8, p2, -6), (-5, p1, -4), (-4, p2, 1), [1, p1, 3), [3, p2, oo)} s1: {(-9, p1, -6], [-5, p1, -3], (-2, p1, -1], (1, p1, 3), (4, p1, 6], [7, p1, 8], [9, p1, 10], [12, p1, 12]} s2: {(-oo, p2, -16), (-16, p2, -14], (-12, p2, -10), (-8, p2, -5], [-4, p2, 1), (3, p2, 5], [7, p2, 8)} union(s1, s2): {(-oo, p2, -16), (-16, p2, -14], (-12, p2, -10), (-9, p1, -8], (-8, p2, -5), [-5, p1, -4), [-4, p2, 1), (1, p1, 3), (3, p2, 4], (4, p1, 6], [7, p1, 8], [9, p1, 10], [12, p1, 12]} s1: {(-oo, p1, -17], (-16, p1, -14), (-12, p1, -9], (-8, p1, -7), (-5, p1, -4), [-3, p1, -2], (-1, p1, 0]} s2: {(-oo, p2, -19), (-19, p2, -18), (-16, p2, -14), [-12, p2, -11), [-9, p2, -8), (-7, p2, -3]} union(s1, s2): {(-oo, p1, -17], (-16, p1, -14), [-12, p2, -12], (-12, p1, -9), [-9, p2, -8), (-8, p1, -7), (-7, p2, -3), [-3, p1, -2], (-1, p1, 0]} s1: {(-17, p1, -16), [-14, p1, -12), [-11, p1, -9], (-8, p1, -3), [-2, p1, -1], (1, p1, 2], [3, p1, 4]} s2: {(-10, p2, -7), [-5, p2, -3], (-1, p2, 3], (4, p2, 7]} union(s1, s2): {(-17, p1, -16), [-14, p1, -12), [-11, p1, -10], (-10, p2, -8], (-8, p1, -5), [-5, p2, -3], [-2, p1, -1], (-1, p2, 3), [3, p1, 4], (4, p2, 7]} s1: {[-17, p1, -16], (-14, p1, -12], (-10, p1, -9], [-7, p1, -6), (-6, p1, -5], [-3, p1, -2), (-1, p1, 0), (1, p1, 2), [4, p1, 4], (6, p1, 7)} s2: {(-12, p2, -11], (-10, p2, -9], [-7, p2, -6), (-5, p2, -4), (-4, p2, -3), (-3, p2, -2], [-1, p2, 0), [2, p2, 3), (4, p2, 6], [7, p2, oo)} union(s1, s2): {[-17, p1, -16], (-14, p1, -12], (-12, p2, -11], (-10, p1, -9], [-7, p1, -6), (-6, p1, -5], (-5, p2, -4), (-4, p2, -3), [-3, p1, -3], (-3, p2, -2], [-1, p2, 0), (1, p1, 2), [2, p2, 3), [4, p1, 4], (4, p2, 6], (6, p1, 7), [7, p2, oo)} s1: {(-10, p1, -9), (-7, p1, -6), [-5, p1, -4), [-2, p1, -1), [1, p1, 2], (3, p1, 4), (5, p1, 6], (8, p1, 9), [11, p1, 13), (15, p1, 16), (16, p1, oo)} s2: {(-15, p2, -13], (-11, p2, -10), (-8, p2, -6), [-4, p2, -2), [-1, p2, 1], (3, p2, 4), (6, p2, 8), [9, p2, 9], [11, p2, oo)} union(s1, s2): {(-15, p2, -13], (-11, p2, -10), (-10, p1, -9), (-8, p2, -6), [-5, p1, -4), [-4, p2, -2), [-2, p1, -1), [-1, p2, 1), [1, p1, 2], (3, p1, 4), (5, p1, 6], (6, p2, 8), (8, p1, 9), [9, p2, 9], [11, p2, oo)} s1: {[-14, p1, -12), (-11, p1, -9), (-9, p1, -6], [-4, p1, -2], [-1, p1, 5), [6, p1, 7]} s2: {[-14, p2, -12), (-10, p2, -9], [-7, p2, -5], (-3, p2, -2], (-1, p2, 3], (5, p2, 7], [8, p2, 10], (12, p2, 14), (15, p2, 17)} union(s1, s2): {[-14, p1, -12), (-11, p1, -10], (-10, p2, -9], (-9, p1, -7), [-7, p2, -5], [-4, p1, -2], [-1, p1, 5), (5, p2, 7], [8, p2, 10], (12, p2, 14), (15, p2, 17)} s1: {[-10, p1, -8], [-6, p1, -3], [-2, p1, 0], (2, p1, 4), (5, p1, 6), (6, p1, 7], (8, p1, 9)} s2: {[-17, p2, -15], (-14, p2, -13), (-12, p2, -10], (-8, p2, -6), (-5, p2, -4], (-2, p2, 0], (2, p2, 4], (6, p2, 7], [9, p2, 10), (10, p2, 11)} union(s1, s2): {[-17, p2, -15], (-14, p2, -13), (-12, p2, -10), [-10, p1, -8], (-8, p2, -6), [-6, p1, -3], [-2, p1, 0], (2, p2, 4], (5, p1, 6), (6, p1, 7], (8, p1, 9), [9, p2, 10), (10, p2, 11)} s1: {(-oo, p1, -15), [-14, p1, -12), [-11, p1, -11], [-9, p1, -6], (-5, p1, -3), (-1, p1, 1), [2, p1, 4), [5, p1, 7], (8, p1, 9)} s2: {[-9, p2, -8), (-6, p2, -5), (-3, p2, 0), (0, p2, 2], (4, p2, 6), (7, p2, 9), (11, p2, 12], (13, p2, 15)} union(s1, s2): {(-oo, p1, -15), [-14, p1, -12), [-11, p1, -11], [-9, p1, -6], (-6, p2, -5), (-5, p1, -3), (-3, p2, -1], (-1, p1, 0], (0, p2, 2), [2, p1, 4), (4, p2, 5), [5, p1, 7], (7, p2, 9), (11, p2, 12], (13, p2, 15)} s1: {(-12, p1, -11), [-10, p1, -9), (-8, p1, -6], [-5, p1, -4), (-3, p1, -2], (-1, p1, 1), [3, p1, 4), [5, p1, 6], (8, p1, 9], [10, p1, oo)} s2: {(-10, p2, -7), (-5, p2, -1], (0, p2, 2), (3, p2, 5), (5, p2, 6)} union(s1, s2): {(-12, p1, -11), [-10, p1, -10], (-10, p2, -8], (-8, p1, -6], [-5, p1, -5], (-5, p2, -1], (-1, p1, 0], (0, p2, 2), [3, p1, 3], (3, p2, 5), [5, p1, 6], (8, p1, 9], [10, p1, oo)} s1: {(-7, p1, -6], (-4, p1, -3], (-1, p1, 1], [2, p1, 4), [6, p1, 7), [8, p1, 9), [11, p1, 13), (13, p1, 14), [16, p1, 16]} s2: {(-oo, p2, -11], (-10, p2, -9), (-8, p2, -5), [-4, p2, -1), [0, p2, 2), (4, p2, 5), [7, p2, 8], (10, p2, 11]} union(s1, s2): {(-oo, p2, -11], (-10, p2, -9), (-8, p2, -5), [-4, p2, -1), (-1, p1, 0), [0, p2, 2), [2, p1, 4), (4, p2, 5), [6, p1, 7), [7, p2, 8), [8, p1, 9), (10, p2, 11), [11, p1, 13), (13, p1, 14), [16, p1, 16]} s1: {(-oo, p1, -10), (-9, p1, -8), (-7, p1, -6], (-4, p1, -3), (-3, p1, -2), [0, p1, 1), (1, p1, 2), (3, p1, 4], (5, p1, 6)} s2: {[-18, p2, -17), (-15, p2, -14), (-12, p2, -9), [-7, p2, -6], (-5, p2, -3], [-1, p2, 0], (1, p2, 3), [4, p2, 5)} union(s1, s2): {(-oo, p1, -12], (-12, p2, -9), (-9, p1, -8), [-7, p2, -6], (-5, p2, -3], (-3, p1, -2), [-1, p2, 0), [0, p1, 1), (1, p2, 3), (3, p1, 4), [4, p2, 5), (5, p1, 6)} s1: {[-15, p1, -14), [-13, p1, -11], (-9, p1, -7), (-7, p1, -6), [-4, p1, -2], [0, p1, 1], [2, p1, 3), [5, p1, 7]} s2: {[-12, p2, -10), (-9, p2, -6), [-5, p2, -4), (-3, p2, -2], (0, p2, 1], (3, p2, 4), [5, p2, 7)} union(s1, s2): {[-15, p1, -14), [-13, p1, -12), [-12, p2, -10), (-9, p2, -6), [-5, p2, -4), [-4, p1, -2], [0, p1, 1], [2, p1, 3), (3, p2, 4), [5, p1, 7]} s1: {(-13, p1, -12], (-11, p1, -10), [-9, p1, -8), (-7, p1, -6), [-5, p1, -4], [-2, p1, -1), [1, p1, 3), [5, p1, 6], (7, p1, oo)} s2: {(-oo, p2, -14], (-13, p2, -12], [-10, p2, -7), (-6, p2, -5], (-4, p2, -3), (-3, p2, -2), [-1, p2, -1], [0, p2, 1), [2, p2, 3]} union(s1, s2): {(-oo, p2, -14], (-13, p1, -12], (-11, p1, -10), [-10, p2, -7), (-7, p1, -6), (-6, p2, -5), [-5, p1, -4], (-4, p2, -3), (-3, p2, -2), [-2, p1, -1), [-1, p2, -1], [0, p2, 1), [1, p1, 2), [2, p2, 3], [5, p1, 6], (7, p1, oo)} s1: {(-oo, p1, -18], (-16, p1, -15], [-14, p1, -12], (-11, p1, -8), (-8, p1, -7], [-6, p1, -4), (-2, p1, -1], (0, p1, 1)} s2: {(-8, p2, -7), (-5, p2, -3], (-1, p2, 1), (3, p2, 4), (5, p2, 6), (7, p2, 8], [9, p2, 10), (10, p2, 12), (14, p2, 16)} union(s1, s2): {(-oo, p1, -18], (-16, p1, -15], [-14, p1, -12], (-11, p1, -8), (-8, p1, -7], [-6, p1, -5], (-5, p2, -3], (-2, p1, -1], (-1, p2, 1), (3, p2, 4), (5, p2, 6), (7, p2, 8], [9, p2, 10), (10, p2, 12), (14, p2, 16)} s1: {(-13, p1, -11), [-10, p1, -8), (-6, p1, -3), [-1, p1, 0], (1, p1, 3], (5, p1, 6], [8, p1, 10)} s2: {(-oo, p2, -13), (-13, p2, -11), (-9, p2, -8), (-8, p2, -6], (-5, p2, -3), (-2, p2, 0], [1, p2, 2), (4, p2, oo)} union(s1, s2): {(-oo, p2, -13), (-13, p1, -11), [-10, p1, -8), (-8, p2, -6], (-6, p1, -3), (-2, p2, 0], [1, p2, 1], (1, p1, 3], (4, p2, oo)} s1: {(-oo, p1, -18], [-16, p1, -14], (-12, p1, -11], (-9, p1, -7), [-5, p1, -4), (-3, p1, -1), [0, p1, 2), (2, p1, 5), [7, p1, 9], [11, p1, 13)} s2: {(-oo, p2, -10), (-9, p2, -8), (-8, p2, -6), (-6, p2, -5), [-3, p2, -2), (-1, p2, 1], [3, p2, 4), (4, p2, 6], [7, p2, 10]} union(s1, s2): {(-oo, p2, -10), (-9, p1, -8], (-8, p2, -6), (-6, p2, -5), [-5, p1, -4), [-3, p2, -3], (-3, p1, -1), (-1, p2, 0), [0, p1, 2), (2, p1, 4], (4, p2, 6], [7, p2, 10], [11, p1, 13)} s1: {(-oo, p1, -15], (-14, p1, -13], (-11, p1, -10], (-9, p1, -8], [-6, p1, -4], (-3, p1, -1), (1, p1, 2), (3, p1, 4)} s2: {(-13, p2, -11], [-9, p2, -7], [-5, p2, -3], [-2, p2, -1), (1, p2, 2), [4, p2, 8]} union(s1, s2): {(-oo, p1, -15], (-14, p1, -13], (-13, p2, -11], (-11, p1, -10], [-9, p2, -7], [-6, p1, -5), [-5, p2, -3], (-3, p1, -1), (1, p1, 2), (3, p1, 4), [4, p2, 8]} s1: {(-oo, p1, -8), [-6, p1, -5), [-4, p1, -3], [-1, p1, 4), (6, p1, 7], (8, p1, 10), (10, p1, 11)} s2: {(-18, p2, -16), (-14, p2, -12), [-10, p2, -8), (-7, p2, -6), [-4, p2, -1), [0, p2, 0], (1, p2, 2]} union(s1, s2): {(-oo, p1, -8), (-7, p2, -6), [-6, p1, -5), [-4, p2, -1), [-1, p1, 4), (6, p1, 7], (8, p1, 10), (10, p1, 11)} s1: {(-9, p1, -7], (-5, p1, -2), (-1, p1, 0), (2, p1, 3], (4, p1, 6], [8, p1, 10), [12, p1, 14], [16, p1, 18), (18, p1, 19], (21, p1, oo)} s2: {(-13, p2, -12], [-10, p2, -10], (-8, p2, -6], (-4, p2, -3], [-2, p2, -2], [0, p2, 1), [3, p2, 6], [7, p2, 8)} union(s1, s2): {(-13, p2, -12], [-10, p2, -10], (-9, p1, -8], (-8, p2, -6], (-5, p1, -2), [-2, p2, -2], (-1, p1, 0), [0, p2, 1), (2, p1, 3), [3, p2, 6], [7, p2, 8), [8, p1, 10), [12, p1, 14], [16, p1, 18), (18, p1, 19], (21, p1, oo)} s1: {[-13, p1, -11), [-10, p1, -8), (-7, p1, -5], [-3, p1, -2), (-1, p1, 0], (2, p1, 7], (9, p1, 11), [13, p1, 15]} s2: {(-oo, p2, -14), (-14, p2, -13], [-12, p2, -10), (-8, p2, -6], (-4, p2, -2], (0, p2, 1], [2, p2, 5], [6, p2, 7), [9, p2, oo)} union(s1, s2): {(-oo, p2, -14), (-14, p2, -13), [-13, p1, -12), [-12, p2, -10), [-10, p1, -8), (-8, p2, -7], (-7, p1, -5], (-4, p2, -2], (-1, p1, 0], (0, p2, 1], [2, p2, 2], (2, p1, 7], [9, p2, oo)} s1: {(-oo, p1, -16), (-15, p1, -14], (-12, p1, -11), (-10, p1, -8], (-7, p1, -6], [-4, p1, -1), (1, p1, 2], [4, p1, 7), (9, p1, oo)} s2: {(-oo, p2, -11), (-10, p2, -7), (-5, p2, -3), [-2, p2, -1), (1, p2, 3), (3, p2, 6), [7, p2, oo)} union(s1, s2): {(-oo, p2, -11), (-10, p2, -7), (-7, p1, -6], (-5, p2, -4), [-4, p1, -1), (1, p2, 3), (3, p2, 4), [4, p1, 7), [7, p2, oo)} s1: {[-15, p1, -14), [-13, p1, -10], [-9, p1, -8), (-7, p1, -6), [-5, p1, -4], (-2, p1, -1), (1, p1, 2), (4, p1, 5), (6, p1, 7]} s2: {[-12, p2, -11), (-10, p2, -9], [-8, p2, -5], [-3, p2, -2), [0, p2, 2], [4, p2, 6), [7, p2, 8), [9, p2, 11)} union(s1, s2): {[-15, p1, -14), [-13, p1, -10], (-10, p2, -9), [-9, p1, -8), [-8, p2, -5), [-5, p1, -4], [-3, p2, -2), (-2, p1, -1), [0, p2, 2], [4, p2, 6), (6, p1, 7), [7, p2, 8), [9, p2, 11)} s1: {(-19, p1, -18), [-17, p1, -17], (-15, p1, -14], [-12, p1, -11), [-10, p1, -9), [-7, p1, -6), [-4, p1, -3), (-2, p1, -1], (0, p1, 2], [3, p1, 5]} s2: {[-17, p2, -16), (-16, p2, -15], [-14, p2, -13), [-12, p2, -10], (-8, p2, -7), [-6, p2, -6], [-5, p2, -3], [-1, p2, 0), (0, p2, 1)} union(s1, s2): {(-19, p1, -18), [-17, p2, -16), (-16, p2, -15], (-15, p1, -14), [-14, p2, -13), [-12, p2, -10), [-10, p1, -9), (-8, p2, -7), [-7, p1, -6), [-6, p2, -6], [-5, p2, -3], (-2, p1, -1), [-1, p2, 0), (0, p1, 2], [3, p1, 5]} s1: {(-oo, p1, -6], [-5, p1, -4), [-2, p1, -1), [0, p1, 2], [3, p1, 4], [5, p1, 6]} s2: {[-9, p2, -8), (-8, p2, -7), (-7, p2, -3), (-2, p2, -1], [1, p2, 2), [4, p2, 5), [7, p2, 10)} union(s1, s2): {(-oo, p1, -7], (-7, p2, -3), [-2, p1, -2], (-2, p2, -1], [0, p1, 2], [3, p1, 4), [4, p2, 5), [5, p1, 6], [7, p2, 10)} s1: {(-oo, p1, -10), [-8, p1, -7), [-5, p1, -4), (-3, p1, -2], [-1, p1, 0), (2, p1, 4), [5, p1, 6), (7, p1, 10), [11, p1, 13]} s2: {[-16, p2, -15), (-15, p2, -14], [-12, p2, -12], [-10, p2, -8), [-7, p2, -5), (-5, p2, -4), [-2, p2, 0), (2, p2, 3], [4, p2, oo)} union(s1, s2): {(-oo, p1, -10), [-10, p2, -8), [-8, p1, -7), [-7, p2, -5), [-5, p1, -4), (-3, p1, -2), [-2, p2, 0), (2, p1, 4), [4, p2, oo)} s1: {(-oo, p1, -11], (-9, p1, -7], (-6, p1, -5], (-3, p1, -1], [0, p1, 1], (2, p1, 3), (4, p1, 6], [8, p1, 9], (10, p1, 11), (12, p1, 14)} s2: {(-9, p2, -8], (-7, p2, -4), (-3, p2, -2], (0, p2, 2], (4, p2, 5), (5, p2, 6), [7, p2, 8), (10, p2, 12], [13, p2, 14)} union(s1, s2): {(-oo, p1, -11], (-9, p1, -7], (-7, p2, -4), (-3, p1, -1], [0, p1, 0], (0, p2, 2], (2, p1, 3), (4, p1, 6], [7, p2, 8), [8, p1, 9], (10, p2, 12], (12, p1, 14)} s1: {[-15, p1, -15], [-14, p1, -13), [-12, p1, -12], [-10, p1, -9], [-8, p1, -8], [-7, p1, -5], [-3, p1, -3], [-1, p1, -1], [0, p1, 1), (3, p1, 4)} s2: {(-oo, p2, -14], [-13, p2, -12), [-11, p2, -10), (-9, p2, -7], [-6, p2, -4], [-3, p2, -2), (-2, p2, 0], [1, p2, 5), (7, p2, 8), [9, p2, oo)} union(s1, s2): {(-oo, p2, -14), [-14, p1, -13), [-13, p2, -12), [-12, p1, -12], [-11, p2, -10), [-10, p1, -9], (-9, p2, -7), [-7, p1, -6), [-6, p2, -4], [-3, p2, -2), (-2, p2, 0), [0, p1, 1), [1, p2, 5), (7, p2, 8), [9, p2, oo)} s1: {[-18, p1, -16], [-14, p1, -13), (-11, p1, -9), (-9, p1, -8), (-8, p1, -7), [-5, p1, -3], (-2, p1, 2), (2, p1, oo)} s2: {(-14, p2, -12), (-11, p2, -10), (-8, p2, -5), [-4, p2, -3), [-2, p2, -1), (-1, p2, 0), (2, p2, 3), [5, p2, 7), (9, p2, oo)} union(s1, s2): {[-18, p1, -16], [-14, p1, -14], (-14, p2, -12), (-11, p1, -9), (-9, p1, -8), (-8, p2, -5), [-5, p1, -3], [-2, p2, -2], (-2, p1, 2), (2, p1, oo)} s1: {(-13, p1, -11], (-10, p1, -7), (-7, p1, -6), [-5, p1, -3), [-2, p1, 1), (3, p1, 4), (5, p1, 6], (8, p1, 9]} s2: {(-14, p2, -13), [-12, p2, -11), (-10, p2, -9], [-7, p2, -5), (-5, p2, -3), [-1, p2, 3], [4, p2, oo)} union(s1, s2): {(-14, p2, -13), (-13, p1, -11], (-10, p1, -7), [-7, p2, -5), [-5, p1, -3), [-2, p1, -1), [-1, p2, 3], (3, p1, 4), [4, p2, oo)} s1: {(-oo, p1, -8], (-6, p1, -5), [-4, p1, -3), (-1, p1, 1], (2, p1, 3), [5, p1, 6), (8, p1, 9), [11, p1, 14), (15, p1, 16), [18, p1, 18]} s2: {(-oo, p2, -18), (-18, p2, -16), (-16, p2, -14), (-12, p2, -10), [-8, p2, -7), (-7, p2, -5), [-3, p2, -2), [0, p2, 1]} union(s1, s2): {(-oo, p1, -8), [-8, p2, -7), (-7, p2, -5), [-4, p1, -3), [-3, p2, -2), (-1, p1, 1], (2, p1, 3), [5, p1, 6), (8, p1, 9), [11, p1, 14), (15, p1, 16), [18, p1, 18]} s1: {(-12, p1, -11), [-9, p1, -7], [-5, p1, -3), [-2, p1, -1), [1, p1, 2], [3, p1, 5), (5, p1, 7], (8, p1, 9), (11, p1, 12)} s2: {[-19, p2, -17), (-15, p2, -13], (-12, p2, -10), (-10, p2, -8), [-7, p2, -6), [-4, p2, -2], [0, p2, 1), [3, p2, 4)} union(s1, s2): {[-19, p2, -17), (-15, p2, -13], (-12, p2, -10), (-10, p2, -9), [-9, p1, -7), [-7, p2, -6), [-5, p1, -4), [-4, p2, -2), [-2, p1, -1), [0, p2, 1), [1, p1, 2], [3, p1, 5), (5, p1, 7], (8, p1, 9), (11, p1, 12)} s1: {[-16, p1, -15), (-14, p1, -13), (-12, p1, -11), (-10, p1, -6), [-4, p1, -3), (-3, p1, 0), (1, p1, oo)} s2: {(-18, p2, -14), [-12, p2, -11), (-11, p2, -6], [-5, p2, -3), (-1, p2, 0], [1, p2, 2)} union(s1, s2): {(-18, p2, -14), (-14, p1, -13), [-12, p2, -11), (-11, p2, -6], [-5, p2, -3), (-3, p1, -1], (-1, p2, 0], [1, p2, 1], (1, p1, oo)} s1: {(-oo, p1, -11), [-9, p1, -5), [-4, p1, -3), [-2, p1, -2], (0, p1, 2], [4, p1, 6), (6, p1, 9), [10, p1, 14]} s2: {[-10, p2, -9), [-8, p2, -8], (-6, p2, -5], [-4, p2, -2), [-1, p2, 0], (2, p2, 3), (5, p2, 7), (9, p2, 10)} union(s1, s2): {(-oo, p1, -11), [-10, p2, -9), [-9, p1, -6], (-6, p2, -5], [-4, p2, -2), [-2, p1, -2], [-1, p2, 0], (0, p1, 2], (2, p2, 3), [4, p1, 5], (5, p2, 6], (6, p1, 9), (9, p2, 10), [10, p1, 14]} s1: {(-oo, p1, -7), (-7, p1, -3), (-1, p1, 0), (1, p1, 2), [4, p1, 6], (7, p1, 10), (12, p1, 14)} s2: {[-13, p2, -13], (-11, p2, -10), [-8, p2, -4), (-2, p2, 0], (1, p2, 3), [5, p2, 6], [7, p2, 7], (8, p2, 9]} union(s1, s2): {(-oo, p1, -8), [-8, p2, -7], (-7, p1, -3), (-2, p2, 0], (1, p2, 3), [4, p1, 6], [7, p2, 7], (7, p1, 10), (12, p1, 14)} s1: {(-oo, p1, -19), [-18, p1, -17), (-17, p1, -15], (-13, p1, -10], (-9, p1, -8), [-7, p1, -5), [-3, p1, -2], [-1, p1, oo)} s2: {[-15, p2, -14), (-14, p2, -13), [-12, p2, -11), (-10, p2, -8), [-6, p2, -5], (-3, p2, -2), (0, p2, 2], [4, p2, 4], (6, p2, 8]} union(s1, s2): {(-oo, p1, -19), [-18, p1, -17), (-17, p1, -15), [-15, p2, -14), (-14, p2, -13), (-13, p1, -10], (-10, p2, -8), [-7, p1, -6), [-6, p2, -5], [-3, p1, -2], [-1, p1, oo)} s1: {(-oo, p1, -14], [-12, p1, -12], [-11, p1, -11], (-10, p1, -8), (-7, p1, -6], (-4, p1, -3), [-1, p1, 1], [2, p1, 3]} s2: {[-13, p2, -12), [-10, p2, -7], (-6, p2, -4), (-3, p2, -1], (1, p2, 4), (6, p2, 7], (8, p2, 9), (11, p2, 12], [13, p2, oo)} union(s1, s2): {(-oo, p1, -14], [-13, p2, -12), [-12, p1, -12], [-11, p1, -11], [-10, p2, -7], (-7, p1, -6], (-6, p2, -4), (-4, p1, -3), (-3, p2, -1), [-1, p1, 1], (1, p2, 4), (6, p2, 7], (8, p2, 9), (11, p2, 12], [13, p2, oo)} s1: {(-8, p1, -6), (-5, p1, -4), [-2, p1, -1), (0, p1, 1], [3, p1, 4), (6, p1, 8), (8, p1, 9), (10, p1, 11], (13, p1, 14], (16, p1, oo)} s2: {(-oo, p2, -5), (-3, p2, -2], [-1, p2, 0), [1, p2, 2), (2, p2, 4], [5, p2, 9), [10, p2, 11], [13, p2, 13], [14, p2, 14]} union(s1, s2): {(-oo, p2, -5), (-5, p1, -4), (-3, p2, -2), [-2, p1, -1), [-1, p2, 0), (0, p1, 1), [1, p2, 2), (2, p2, 4], [5, p2, 9), [10, p2, 11], [13, p2, 13], (13, p1, 14], (16, p1, oo)} s1: {(-15, p1, -14), (-13, p1, -12], (-10, p1, -8), [-6, p1, -4), (-4, p1, -3), [-2, p1, -1), (0, p1, 1], [2, p1, 2], [4, p1, 6), (7, p1, 8]} s2: {(-14, p2, -13), [-11, p2, -10), (-10, p2, -8], (-7, p2, -5], (-3, p2, -1), (-1, p2, 0], (2, p2, 3], [4, p2, 6], (8, p2, oo)} union(s1, s2): {(-15, p1, -14), (-14, p2, -13), (-13, p1, -12], [-11, p2, -10), (-10, p2, -8], (-7, p2, -6), [-6, p1, -4), (-4, p1, -3), (-3, p2, -1), (-1, p2, 0], (0, p1, 1], [2, p1, 2], (2, p2, 3], [4, p2, 6], (7, p1, 8], (8, p2, oo)} s1: {[-10, p1, -9), (-7, p1, -5], (-3, p1, -2], (0, p1, 1], (2, p1, 3], (4, p1, 5), [6, p1, 7), (9, p1, 10), (11, p1, oo)} s2: {(-oo, p2, -9], [-7, p2, -4), [-2, p2, -1), (0, p2, 1), (2, p2, 3), (5, p2, 6], [8, p2, 10], [12, p2, 13], (14, p2, 16], [17, p2, 19], [20, p2, oo)} union(s1, s2): {(-oo, p2, -9], [-7, p2, -4), (-3, p1, -2), [-2, p2, -1), (0, p1, 1], (2, p1, 3], (4, p1, 5), (5, p2, 6), [6, p1, 7), [8, p2, 10], (11, p1, oo)} s1: {(-oo, p1, -11), (-9, p1, -7), (-5, p1, -4), (-3, p1, -1), (-1, p1, 0], (1, p1, 6], [7, p1, 9], (11, p1, 13]} s2: {(-oo, p2, -9), (-9, p2, -8), (-6, p2, -4), (-2, p2, 0), (2, p2, 3), (4, p2, 5), [6, p2, 9], (11, p2, 12), (12, p2, 14)} union(s1, s2): {(-oo, p2, -9), (-9, p1, -7), (-6, p2, -4), (-3, p1, -2], (-2, p2, -1], (-1, p1, 0], (1, p1, 6), [6, p2, 9], (11, p1, 12], (12, p2, 14)} s1: {[-17, p1, -14), (-14, p1, -12), [-10, p1, -9], [-7, p1, -6), (-6, p1, -3), (-3, p1, -1], (0, p1, 2)} s2: {(-17, p2, -16], [-15, p2, -13), (-11, p2, -10], (-8, p2, -5), (-5, p2, -4), (-4, p2, -3), (-2, p2, -1], (1, p2, 3), (3, p2, 4]} union(s1, s2): {[-17, p1, -15), [-15, p2, -14], (-14, p1, -12), (-11, p2, -10), [-10, p1, -9], (-8, p2, -6], (-6, p1, -3), (-3, p1, -1], (0, p1, 1], (1, p2, 3), (3, p2, 4]} s1: {(-oo, p1, -16], (-14, p1, -13], [-11, p1, -9), (-8, p1, -5), (-5, p1, -4), (-3, p1, -1], (1, p1, 5), [7, p1, 8]} s2: {(-13, p2, -11), (-10, p2, -6), (-6, p2, -5], (-4, p2, -2), (0, p2, 1], (3, p2, 5), [7, p2, 8), [9, p2, oo)} union(s1, s2): {(-oo, p1, -16], (-14, p1, -13], (-13, p2, -11), [-11, p1, -10], (-10, p2, -8], (-8, p1, -6], (-6, p2, -5], (-5, p1, -4), (-4, p2, -3], (-3, p1, -1], (0, p2, 1], (1, p1, 5), [7, p1, 8], [9, p2, oo)} s1: {(-oo, p1, -10), (-10, p1, -9], [-8, p1, -7), (-7, p1, -6), (-6, p1, -4], (-2, p1, 2), [4, p1, 6], [7, p1, 8], (10, p1, oo)} s2: {[-17, p2, -15], [-13, p2, -13], (-12, p2, -10), (-9, p2, -8], [-6, p2, -5), (-3, p2, -2), (-2, p2, -1), (-1, p2, 2]} union(s1, s2): {(-oo, p1, -10), (-10, p1, -9], (-9, p2, -8), [-8, p1, -7), (-7, p1, -6), [-6, p2, -6], (-6, p1, -4], (-3, p2, -2), (-2, p1, -1], (-1, p2, 2], [4, p1, 6], [7, p1, 8], (10, p1, oo)} s1: {[-10, p1, -8], [-7, p1, -5], (-3, p1, -1), (0, p1, 1], (3, p1, 5], [7, p1, 9], (10, p1, 11], [13, p1, 15), (16, p1, 17)} s2: {(-7, p2, -5), (-3, p2, -1), [1, p2, 3], (4, p2, 5), (6, p2, 9], (10, p2, 13), (15, p2, 17]} union(s1, s2): {[-10, p1, -8], [-7, p1, -5], (-3, p1, -1), (0, p1, 1), [1, p2, 3], (3, p1, 5], (6, p2, 9], (10, p2, 13), [13, p1, 15), (15, p2, 17]} s1: {(-oo, p1, -17], (-15, p1, -11], (-9, p1, -8), (-6, p1, -5], [-4, p1, -3), (-3, p1, 0), (0, p1, 1), (3, p1, 5)} s2: {[-10, p2, -8], [-6, p2, -4), [-2, p2, 0], (2, p2, 3), (4, p2, 5), [7, p2, 8), (10, p2, 13], [14, p2, 15], [16, p2, oo)} union(s1, s2): {(-oo, p1, -17], (-15, p1, -11], [-10, p2, -8], [-6, p2, -4), [-4, p1, -3), (-3, p1, -2), [-2, p2, 0], (0, p1, 1), (2, p2, 3), (3, p1, 5), [7, p2, 8), (10, p2, 13], [14, p2, 15], [16, p2, oo)} s1: {(-18, p1, -16), (-15, p1, -14), [-13, p1, -11), [-10, p1, -9), (-8, p1, -6), (-6, p1, -5], (-3, p1, -2], (-1, p1, 0), (1, p1, oo)} s2: {(-11, p2, -8), (-8, p2, -6], [-5, p2, -2], (-1, p2, 2), (4, p2, 6), (8, p2, 10]} union(s1, s2): {(-18, p1, -16), (-15, p1, -14), [-13, p1, -11), (-11, p2, -8), (-8, p2, -6], (-6, p1, -5), [-5, p2, -2], (-1, p2, 1], (1, p1, oo)} s1: {[-10, p1, -8], [-7, p1, -6], [-4, p1, -3), (-3, p1, -1], [1, p1, 2), (4, p1, 7], (9, p1, 10], [12, p1, 14]} s2: {(-16, p2, -14), (-12, p2, -11), [-9, p2, -7], (-5, p2, 0), (1, p2, 2], [3, p2, 3], (4, p2, 6], (7, p2, 9)} union(s1, s2): {(-16, p2, -14), (-12, p2, -11), [-10, p1, -9), [-9, p2, -7), [-7, p1, -6], (-5, p2, 0), [1, p1, 1], (1, p2, 2], [3, p2, 3], (4, p1, 7], (7, p2, 9), (9, p1, 10], [12, p1, 14]} s1: {[-8, p1, -7), (-7, p1, -5), (-3, p1, -1), (0, p1, 2), (2, p1, 3), [5, p1, 8), (8, p1, 9], (10, p1, 11]} s2: {(-oo, p2, -16), (-14, p2, -13], [-12, p2, -12], [-10, p2, -8], (-7, p2, -6], (-4, p2, -1), [1, p2, 4)} union(s1, s2): {(-oo, p2, -16), (-14, p2, -13], [-12, p2, -12], [-10, p2, -8), [-8, p1, -7), (-7, p1, -5), (-4, p2, -1), (0, p1, 1), [1, p2, 4), [5, p1, 8), (8, p1, 9], (10, p1, 11]} s1: {[-12, p1, -10), (-10, p1, -8), (-6, p1, -5], [-3, p1, -3], (-2, p1, -1), (0, p1, 1], (2, p1, 3], [5, p1, 7], [8, p1, 10]} s2: {(-oo, p2, -13], (-12, p2, -11], (-9, p2, -8], (-6, p2, -2), (0, p2, 1], (2, p2, 3], [5, p2, 6]} union(s1, s2): {(-oo, p2, -13], [-12, p1, -10), (-10, p1, -9], (-9, p2, -8], (-6, p2, -2), (-2, p1, -1), (0, p1, 1], (2, p1, 3], [5, p1, 7], [8, p1, 10]} s1: {[-18, p1, -17), [-15, p1, -13], [-12, p1, -11), (-10, p1, -9), (-8, p1, -7], [-5, p1, -4), (-3, p1, -2), [-1, p1, 0], [1, p1, 4)} s2: {(-14, p2, -11), [-9, p2, -8], (-7, p2, -6), [-5, p2, -5], [-3, p2, -3], [-1, p2, 1], [3, p2, 5]} union(s1, s2): {[-18, p1, -17), [-15, p1, -14], (-14, p2, -11), (-10, p1, -9), [-9, p2, -8], (-8, p1, -7], (-7, p2, -6), [-5, p1, -4), [-3, p2, -3], (-3, p1, -2), [-1, p2, 1), [1, p1, 3), [3, p2, 5]} s1: {[-14, p1, -12), (-11, p1, -10), (-9, p1, -5), [-3, p1, -2), (-2, p1, oo)} s2: {(-11, p2, -9), (-7, p2, -4], [-2, p2, -1], [0, p2, 1], (3, p2, 4)} union(s1, s2): {[-14, p1, -12), (-11, p2, -9), (-9, p1, -7], (-7, p2, -4], [-3, p1, -2), [-2, p2, -2], (-2, p1, oo)} s1: {(-oo, p1, -14), (-13, p1, -12), [-11, p1, -9], [-7, p1, -6], [-5, p1, -3), (-3, p1, -1), (-1, p1, 1), (2, p1, 3], (5, p1, oo)} s2: {[-16, p2, -15], [-14, p2, -13), [-12, p2, -11), (-10, p2, -9), (-9, p2, -4), [-3, p2, -3], [-1, p2, 1), (1, p2, oo)} union(s1, s2): {(-oo, p1, -14), [-14, p2, -13), (-13, p1, -12), [-12, p2, -11), [-11, p1, -9], (-9, p2, -5), [-5, p1, -3), [-3, p2, -3], (-3, p1, -1), [-1, p2, 1), (1, p2, oo)} s1: {(-14, p1, -12), [-10, p1, -9], (-8, p1, -7), [-5, p1, -4), (-2, p1, 0), (0, p1, 2], (4, p1, 5), (7, p1, 8], (10, p1, 12], [14, p1, 16), (18, p1, oo)} s2: {[-17, p2, -17], [-16, p2, -15), [-14, p2, -11], (-9, p2, -8), (-8, p2, -6), (-4, p2, -3), (-3, p2, -2), (-1, p2, 1), (1, p2, oo)} union(s1, s2): {[-17, p2, -17], [-16, p2, -15), [-14, p2, -11], [-10, p1, -9], (-9, p2, -8), (-8, p2, -6), [-5, p1, -4), (-4, p2, -3), (-3, p2, -2), (-2, p1, -1], (-1, p2, 0], (0, p1, 1], (1, p2, oo)} s1: {(-13, p1, -9), (-9, p1, -8], [-6, p1, -4], [-2, p1, 0), [1, p1, 2], [4, p1, oo)} s2: {(-14, p2, -13), (-13, p2, -12), (-10, p2, -8], (-7, p2, -5), (-3, p2, -2], [-1, p2, 0), (0, p2, 1), [3, p2, 4), (4, p2, 6)} union(s1, s2): {(-14, p2, -13), (-13, p1, -10], (-10, p2, -8], (-7, p2, -6), [-6, p1, -4], (-3, p2, -2), [-2, p1, 0), (0, p2, 1), [1, p1, 2], [3, p2, 4), [4, p1, oo)} s1: {[-15, p1, -14], (-12, p1, -11], (-10, p1, -7), [-5, p1, -1), (0, p1, 4)} s2: {(-oo, p2, -8), (-7, p2, -4], [-3, p2, -2), (-1, p2, 0], [1, p2, 2), (4, p2, 7]} union(s1, s2): {(-oo, p2, -10], (-10, p1, -7), (-7, p2, -5), [-5, p1, -1), (-1, p2, 0], (0, p1, 4), (4, p2, 7]} s1: {(-oo, p1, -9], [-7, p1, -3], (-2, p1, -1], (1, p1, 3), (5, p1, 6], (8, p1, 9], (10, p1, 11], [12, p1, 13), (15, p1, oo)} s2: {[-11, p2, -7), (-6, p2, -3], (-1, p2, 0], [1, p2, 5], [6, p2, 6], (7, p2, 8]} union(s1, s2): {(-oo, p1, -11), [-11, p2, -7), [-7, p1, -3], (-2, p1, -1], (-1, p2, 0], [1, p2, 5], (5, p1, 6], (7, p2, 8], (8, p1, 9], (10, p1, 11], [12, p1, 13), (15, p1, oo)} s1: {(-18, p1, -17), [-15, p1, -14), [-12, p1, -9], [-8, p1, -6), [-4, p1, 0], (2, p1, 5], (7, p1, oo)} s2: {[-16, p2, -12), [-11, p2, -10], [-8, p2, -7], (-6, p2, -5], [-4, p2, -1), (1, p2, 2]} union(s1, s2): {(-18, p1, -17), [-16, p2, -12), [-12, p1, -9], [-8, p1, -6), (-6, p2, -5], [-4, p1, 0], (1, p2, 2], (2, p1, 5], (7, p1, oo)} s1: {(-12, p1, -10], (-9, p1, -7), [-5, p1, -4), (-4, p1, -1), (-1, p1, 1], (2, p1, 3), [5, p1, 6), [7, p1, 9), (11, p1, 13), [14, p1, oo)} s2: {(-oo, p2, -15), (-13, p2, -11), (-9, p2, -8], (-7, p2, -4], (-3, p2, 0), (0, p2, 3], [5, p2, 6), (7, p2, oo)} union(s1, s2): {(-oo, p2, -15), (-13, p2, -12], (-12, p1, -10], (-9, p1, -7), (-7, p2, -4], (-4, p1, -3], (-3, p2, -1], (-1, p1, 0], (0, p2, 3], [5, p1, 6), [7, p1, 7], (7, p2, oo)} s1: {(-oo, p1, -7), [-6, p1, -5], (-3, p1, -2], [0, p1, 1], (2, p1, 5], [7, p1, 10), [12, p1, 13]} s2: {[-15, p2, -15], (-14, p2, -12), [-11, p2, -9], (-7, p2, -6), (-6, p2, -4], [-2, p2, 0), [1, p2, 2), (3, p2, 4), [6, p2, 8), (8, p2, oo)} union(s1, s2): {(-oo, p1, -7), (-7, p2, -6), [-6, p1, -6], (-6, p2, -4], (-3, p1, -2), [-2, p2, 0), [0, p1, 1), [1, p2, 2), (2, p1, 5], [6, p2, 7), [7, p1, 8], (8, p2, oo)} s1: {(-oo, p1, -19], [-18, p1, -17], (-15, p1, -14), (-14, p1, -8], [-6, p1, -6], [-4, p1, -3]} s2: {(-oo, p2, -11), (-9, p2, -7], (-6, p2, -4), [-3, p2, -1], [1, p2, 3), (3, p2, 5), (7, p2, 10), (10, p2, 11), (11, p2, oo)} union(s1, s2): {(-oo, p2, -14], (-14, p1, -9], (-9, p2, -7], [-6, p1, -6], (-6, p2, -4), [-4, p1, -3), [-3, p2, -1], [1, p2, 3), (3, p2, 5), (7, p2, 10), (10, p2, 11), (11, p2, oo)} s1: {(-oo, p1, -11), [-9, p1, -8), (-8, p1, -6], (-5, p1, -4], (-3, p1, -2], (0, p1, 1), [3, p1, 5), [6, p1, 7), [8, p1, 8], (10, p1, 11), (13, p1, 15]} s2: {[-10, p2, -10], [-9, p2, -7), [-6, p2, -5], (-4, p2, -3), (-3, p2, -1), (0, p2, 2), (4, p2, 6], [7, p2, 10)} union(s1, s2): {(-oo, p1, -11), [-10, p2, -10], [-9, p2, -8], (-8, p1, -6), [-6, p2, -5], (-5, p1, -4], (-4, p2, -3), (-3, p2, -1), (0, p2, 2), [3, p1, 4], (4, p2, 6), [6, p1, 7), [7, p2, 10), (10, p1, 11), (13, p1, 15]} s1: {(-oo, p1, -16), (-14, p1, -12), [-11, p1, -10), (-8, p1, -7], [-6, p1, -3), [-2, p1, 0), [1, p1, 3], [5, p1, 6]} s2: {(-18, p2, -16], (-15, p2, -14], [-12, p2, -11], (-9, p2, -8), (-6, p2, -4], [-3, p2, 1], [2, p2, 2], (4, p2, 5]} union(s1, s2): {(-oo, p1, -18], (-18, p2, -16], (-15, p2, -14], (-14, p1, -12), [-12, p2, -11), [-11, p1, -10), (-9, p2, -8), (-8, p1, -7], [-6, p1, -3), [-3, p2, 1), [1, p1, 3], (4, p2, 5), [5, p1, 6]} s1: {[-12, p1, -10), [-9, p1, -8], (-7, p1, -5), [-4, p1, -3), (-1, p1, 0), (1, p1, 2], [4, p1, 6), (6, p1, oo)} s2: {(-oo, p2, -13], [-12, p2, -11], [-10, p2, -8), [-7, p2, -6), [-5, p2, -3], (-2, p2, -1), [1, p2, 3), [5, p2, 7]} union(s1, s2): {(-oo, p2, -13], [-12, p1, -10), [-10, p2, -9), [-9, p1, -8], [-7, p2, -7], (-7, p1, -5), [-5, p2, -3], (-2, p2, -1), (-1, p1, 0), [1, p2, 3), [4, p1, 5), [5, p2, 6], (6, p1, oo)} s1: {[-11, p1, -11], [-9, p1, -8], (-6, p1, -5), [-4, p1, -2), (0, p1, 2], [4, p1, 4], (6, p1, 8), (9, p1, 12), (13, p1, 14]} s2: {[-17, p2, -17], [-15, p2, -14), (-12, p2, -11), (-11, p2, -9], (-8, p2, -7], (-5, p2, -4], [-2, p2, -1], (0, p2, 2], [3, p2, 5], (7, p2, 8)} union(s1, s2): {[-17, p2, -17], [-15, p2, -14), (-12, p2, -11), [-11, p1, -11], (-11, p2, -9), [-9, p1, -8], (-8, p2, -7], (-6, p1, -5), (-5, p2, -4), [-4, p1, -2), [-2, p2, -1], (0, p1, 2], [3, p2, 5], (6, p1, 8), (9, p1, 12), (13, p1, 14]} s1: {[-15, p1, -12), [-11, p1, -10), (-8, p1, -7], (-5, p1, -4], (-2, p1, -1), (-1, p1, 0], (2, p1, 4), (6, p1, 8], (10, p1, 11]} s2: {(-oo, p2, -16), (-16, p2, -15), [-13, p2, -12], (-11, p2, -9), [-7, p2, -5), (-3, p2, -1], [0, p2, 1], (3, p2, 5), (6, p2, 7), (8, p2, 10], (11, p2, 12]} union(s1, s2): {(-oo, p2, -16), (-16, p2, -15), [-15, p1, -13), [-13, p2, -12], [-11, p1, -11], (-11, p2, -9), (-8, p1, -7), [-7, p2, -5), (-5, p1, -4], (-3, p2, -1], (-1, p1, 0), [0, p2, 1], (2, p1, 3], (3, p2, 5), (6, p1, 8], (8, p2, 10], (10, p1, 11], (11, p2, 12]} s1: {(-oo, p1, -7), (-6, p1, -5], (-4, p1, -3], [-2, p1, 0], [1, p1, 3), (3, p1, 4), (4, p1, 7)} s2: {(-8, p2, -7], [-6, p2, -4), [-3, p2, -3], (-2, p2, 0], [1, p2, 4], [5, p2, 5], [6, p2, 8)} union(s1, s2): {(-oo, p1, -8], (-8, p2, -7], [-6, p2, -4), (-4, p1, -3], [-2, p1, 0], [1, p2, 4], (4, p1, 6), [6, p2, 8)} s1: {[-18, p1, -18], [-17, p1, -14), (-14, p1, -12], [-11, p1, -10], [-9, p1, -8], [-6, p1, -4), [-2, p1, -2]} s2: {(-15, p2, -13], [-12, p2, -10], (-9, p2, -7), (-5, p2, -4), [-3, p2, 2], (4, p2, 5], (7, p2, 8), [10, p2, 11)} union(s1, s2): {[-18, p1, -18], [-17, p1, -15], (-15, p2, -14], (-14, p1, -12), [-12, p2, -10], [-9, p1, -9], (-9, p2, -7), [-6, p1, -4), [-3, p2, 2], (4, p2, 5], (7, p2, 8), [10, p2, 11)} s1: {(-15, p1, -12), (-11, p1, -9), (-8, p1, -6], (-4, p1, -3), (-2, p1, 1], [2, p1, 3), [4, p1, oo)} s2: {(-9, p2, -8), (-7, p2, -6), (-4, p2, -3), (-2, p2, 0], [2, p2, 5), [6, p2, 8], [10, p2, 11], (12, p2, 13), [14, p2, 16]} union(s1, s2): {(-15, p1, -12), (-11, p1, -9), (-9, p2, -8), (-8, p1, -6], (-4, p1, -3), (-2, p1, 1], [2, p2, 4), [4, p1, oo)} s1: {(-oo, p1, -7], [-5, p1, -3], [-2, p1, -1), (1, p1, 2), (3, p1, 6], (7, p1, 8), (9, p1, 12)} s2: {[-16, p2, -14), [-12, p2, -10), (-10, p2, -9), (-7, p2, -4), [-3, p2, -2], [-1, p2, 1], (3, p2, 4], [6, p2, oo)} union(s1, s2): {(-oo, p1, -7], (-7, p2, -5), [-5, p1, -3), [-3, p2, -2), [-2, p1, -1), [-1, p2, 1], (1, p1, 2), (3, p1, 6), [6, p2, oo)} s1: {(-oo, p1, -17), (-17, p1, -15], [-13, p1, -13], [-12, p1, -11], (-10, p1, -6), [-4, p1, -3), (-2, p1, -1), [0, p1, 3)} s2: {[-17, p2, -15], (-14, p2, -11], (-9, p2, -7], [-6, p2, -6], (-4, p2, -3), (-3, p2, -1), [0, p2, 2), (2, p2, 3]} union(s1, s2): {(-oo, p1, -17), [-17, p2, -15], (-14, p2, -11], (-10, p1, -6), [-6, p2, -6], [-4, p1, -3), (-3, p2, -1), [0, p1, 2], (2, p2, 3]} s1: {(-10, p1, -8], (-7, p1, -6), (-5, p1, -4), (-3, p1, -2], (-1, p1, 0), [2, p1, 4], [6, p1, 7], (9, p1, 10), (11, p1, oo)} s2: {(-12, p2, -11], [-10, p2, -10], [-8, p2, -5], (-4, p2, -3), [-1, p2, 0), [2, p2, 3], [5, p2, 5], [7, p2, 9], [11, p2, 12]} union(s1, s2): {(-12, p2, -11], [-10, p2, -10], (-10, p1, -8), [-8, p2, -5], (-5, p1, -4), (-4, p2, -3), (-3, p1, -2], [-1, p2, 0), [2, p1, 4], [5, p2, 5], [6, p1, 7), [7, p2, 9], (9, p1, 10), [11, p2, 11], (11, p1, oo)} s1: {(-9, p1, -7], [-6, p1, -5), [-4, p1, -4], [-3, p1, -2), (-2, p1, -1), [0, p1, 2], [4, p1, 5), (5, p1, 6]} s2: {(-19, p2, -18], (-16, p2, -15), [-13, p2, -13], [-12, p2, -8], (-7, p2, -6], (-4, p2, -2), [-1, p2, -1], [1, p2, 2), (2, p2, 3]} union(s1, s2): {(-19, p2, -18], (-16, p2, -15), [-13, p2, -13], [-12, p2, -9], (-9, p1, -7], (-7, p2, -6), [-6, p1, -5), [-4, p1, -4], (-4, p2, -2), (-2, p1, -1), [-1, p2, -1], [0, p1, 2], (2, p2, 3], [4, p1, 5), (5, p1, 6]} s1: {(-oo, p1, -14), [-13, p1, -12), (-10, p1, -9), (-9, p1, -7), (-7, p1, -6), [-4, p1, -2), [0, p1, 1), (3, p1, 7), (8, p1, 9], (10, p1, oo)} s2: {[-13, p2, -12], [-11, p2, -10), (-8, p2, -6), (-4, p2, -3), [-2, p2, -1), (-1, p2, 1), (2, p2, 3), [4, p2, 6), (7, p2, oo)} union(s1, s2): {(-oo, p1, -14), [-13, p2, -12], [-11, p2, -10), (-10, p1, -9), (-9, p1, -8], (-8, p2, -6), [-4, p1, -2), [-2, p2, -1), (-1, p2, 1), (2, p2, 3), (3, p1, 7), (7, p2, oo)} s1: {[-16, p1, -15), (-15, p1, -13), (-11, p1, -9], (-8, p1, -6), (-5, p1, -2), [-1, p1, 1), (2, p1, 5], (7, p1, 8]} s2: {(-10, p2, -8), (-8, p2, -6), [-4, p2, -2], (-1, p2, 1], (2, p2, 4], (6, p2, 8], [9, p2, 9], [10, p2, 12), [13, p2, 15)} union(s1, s2): {[-16, p1, -15), (-15, p1, -13), (-11, p1, -10], (-10, p2, -8), (-8, p1, -6), (-5, p1, -4), [-4, p2, -2], [-1, p1, -1], (-1, p2, 1], (2, p1, 5], (6, p2, 8], [9, p2, 9], [10, p2, 12), [13, p2, 15)} s1: {(-14, p1, -12], [-11, p1, -9], (-7, p1, -4], [-3, p1, -3], (-1, p1, 0), [2, p1, 5], (6, p1, 8]} s2: {(-10, p2, -7), [-5, p2, -4), [-3, p2, -2), [0, p2, 1), (1, p2, 7), (7, p2, 8]} union(s1, s2): {(-14, p1, -12], [-11, p1, -10], (-10, p2, -7), (-7, p1, -4], [-3, p2, -2), (-1, p1, 0), [0, p2, 1), (1, p2, 6], (6, p1, 8]} s1: {(-oo, p1, -16], (-15, p1, -14), (-12, p1, -11], (-9, p1, -7], (-5, p1, -1], (1, p1, 2], (4, p1, 5), (5, p1, 6], (8, p1, 9], (10, p1, 11)} s2: {(-oo, p2, -18], [-16, p2, -14), (-13, p2, -9), (-7, p2, -5), [-4, p2, 0), (1, p2, 2), (4, p2, 5]} union(s1, s2): {(-oo, p1, -16), [-16, p2, -14), (-13, p2, -9), (-9, p1, -7], (-7, p2, -5), (-5, p1, -4), [-4, p2, 0), (1, p1, 2], (4, p2, 5], (5, p1, 6], (8, p1, 9], (10, p1, 11)} s1: {[-13, p1, -11), [-10, p1, -9), [-7, p1, -2), (-1, p1, 1), [3, p1, 4), (5, p1, 6], [8, p1, 11]} s2: {[-12, p2, -10), [-8, p2, -6), (-4, p2, -3), [-2, p2, -1], (1, p2, 2], (4, p2, 6], [7, p2, 9), (10, p2, 14], (16, p2, 18], [20, p2, oo)} union(s1, s2): {[-13, p1, -12), [-12, p2, -10), [-10, p1, -9), [-8, p2, -7), [-7, p1, -2), [-2, p2, -1], (-1, p1, 1), (1, p2, 2], [3, p1, 4), (4, p2, 6], [7, p2, 8), [8, p1, 10], (10, p2, 14], (16, p2, 18], [20, p2, oo)} s1: {[-14, p1, -12), (-11, p1, -10), (-8, p1, -6), (-4, p1, -2], [-1, p1, 1], (2, p1, 4), (5, p1, 7], [9, p1, 10), (12, p1, 16), (17, p1, oo)} s2: {(-7, p2, -6), [-4, p2, -2], (0, p2, 1], (2, p2, 4], [5, p2, 5], [6, p2, 8), (9, p2, 11], [13, p2, 14)} union(s1, s2): {[-14, p1, -12), (-11, p1, -10), (-8, p1, -6), [-4, p2, -2], [-1, p1, 1], (2, p2, 4], [5, p2, 5], (5, p1, 6), [6, p2, 8), [9, p1, 9], (9, p2, 11], (12, p1, 16), (17, p1, oo)} s1: {(-14, p1, -12), (-12, p1, -10], (-9, p1, -8], (-6, p1, -5], [-3, p1, -2], (0, p1, 3], [5, p1, 6], (7, p1, 8], (10, p1, 12)} s2: {(-oo, p2, -18), (-17, p2, -16), (-15, p2, -13], [-12, p2, -7), [-6, p2, -4), (-2, p2, -1), (1, p2, 2], (4, p2, 6)} union(s1, s2): {(-oo, p2, -18), (-17, p2, -16), (-15, p2, -14], (-14, p1, -12), [-12, p2, -7), [-6, p2, -4), [-3, p1, -2], (-2, p2, -1), (0, p1, 3], (4, p2, 5), [5, p1, 6], (7, p1, 8], (10, p1, 12)} s1: {(-8, p1, -6), [-4, p1, -3), [-2, p1, -2], (-1, p1, 1), [3, p1, 4), (4, p1, 5], [6, p1, 8], [9, p1, 10), [12, p1, 13), (13, p1, 15], [17, p1, oo)} s2: {(-oo, p2, -19), (-17, p2, -16], [-14, p2, -12], [-11, p2, -7), (-5, p2, -4], [-2, p2, -1], (0, p2, 1), [3, p2, 5), (6, p2, 7)} union(s1, s2): {(-oo, p2, -19), (-17, p2, -16], [-14, p2, -12], [-11, p2, -8], (-8, p1, -6), (-5, p2, -4), [-4, p1, -3), [-2, p2, -1], (-1, p1, 1), [3, p2, 4], (4, p1, 5], [6, p1, 8], [9, p1, 10), [12, p1, 13), (13, p1, 15], [17, p1, oo)} s1: {(-17, p1, -16), [-14, p1, -13], (-12, p1, -10], [-9, p1, -7], [-5, p1, -3), (-3, p1, -2], [0, p1, 2], (4, p1, 6)} s2: {[-20, p2, -19], (-18, p2, -17], (-15, p2, -12], (-11, p2, -9], [-8, p2, -5), [-4, p2, -3)} union(s1, s2): {[-20, p2, -19], (-18, p2, -17], (-17, p1, -16), (-15, p2, -12], (-12, p1, -11], (-11, p2, -9), [-9, p1, -8), [-8, p2, -5), [-5, p1, -3), (-3, p1, -2], [0, p1, 2], (4, p1, 6)} s1: {[-14, p1, -12), (-10, p1, -7], (-6, p1, -4), (-2, p1, -1], [0, p1, 3], (5, p1, 6], (8, p1, 10]} s2: {(-11, p2, -8), [-7, p2, 0), (1, p2, 3), (4, p2, 6], (8, p2, 9)} union(s1, s2): {[-14, p1, -12), (-11, p2, -10], (-10, p1, -7), [-7, p2, 0), [0, p1, 3], (4, p2, 6], (8, p1, 10]} s1: {[-13, p1, -12), [-11, p1, -8], (-6, p1, -4), [-3, p1, 0], [2, p1, 4), (5, p1, 7], [9, p1, 9], (10, p1, 11)} s2: {(-15, p2, -14), (-14, p2, -12), [-11, p2, -10), (-9, p2, -8], (-6, p2, -3), (-3, p2, -2], (-1, p2, 0), [2, p2, 3]} union(s1, s2): {(-15, p2, -14), (-14, p2, -12), [-11, p1, -8], (-6, p2, -3), [-3, p1, 0], [2, p1, 4), (5, p1, 7], [9, p1, 9], (10, p1, 11)} s1: {[-18, p1, -16), [-14, p1, -13), [-12, p1, -11), [-10, p1, -10], [-9, p1, -8), (-7, p1, -5), [-4, p1, -2]} s2: {(-oo, p2, -7], (-5, p2, -3], (-2, p2, -1], [0, p2, 2), (3, p2, 5], [7, p2, 8), (8, p2, 9), (9, p2, 12)} union(s1, s2): {(-oo, p2, -7], (-7, p1, -5), (-5, p2, -4), [-4, p1, -2], (-2, p2, -1], [0, p2, 2), (3, p2, 5], [7, p2, 8), (8, p2, 9), (9, p2, 12)} s1: {(-11, p1, -10], (-8, p1, -6], (-4, p1, -3), (-3, p1, -1], [1, p1, 2), (2, p1, 4), [5, p1, 6], (7, p1, 8), (9, p1, 10)} s2: {(-oo, p2, -11], (-10, p2, -7), [-6, p2, -5), (-5, p2, -3], [-2, p2, 1), [2, p2, 4], (6, p2, 7], (9, p2, 12)} union(s1, s2): {(-oo, p2, -11], (-11, p1, -10], (-10, p2, -8], (-8, p1, -6), [-6, p2, -5), (-5, p2, -3], (-3, p1, -2), [-2, p2, 1), [1, p1, 2), [2, p2, 4], [5, p1, 6], (6, p2, 7], (7, p1, 8), (9, p2, 12)} s1: {(-12, p1, -10), [-9, p1, -7], [-5, p1, -3), [-1, p1, 1], (3, p1, 7], [8, p1, 9], [11, p1, 13), (15, p1, 16]} s2: {[-13, p2, -12), [-10, p2, -9], [-7, p2, -6), [-5, p2, -5], [-3, p2, 0), (1, p2, 3], [5, p2, 5], [6, p2, 8)} union(s1, s2): {[-13, p2, -12), (-12, p1, -10), [-10, p2, -9), [-9, p1, -7), [-7, p2, -6), [-5, p1, -3), [-3, p2, -1), [-1, p1, 1], (1, p2, 3], (3, p1, 6), [6, p2, 8), [8, p1, 9], [11, p1, 13), (15, p1, 16]} s1: {(-oo, p1, -10), (-9, p1, -8], [-6, p1, -4], [-2, p1, 2], (3, p1, 4], (5, p1, 8), (8, p1, 10)} s2: {(-9, p2, -8], (-6, p2, -4), (-2, p2, -1], [0, p2, 1), [3, p2, 5), [6, p2, 8], (10, p2, 11], (13, p2, 14), [15, p2, 16), (16, p2, 17)} union(s1, s2): {(-oo, p1, -10), (-9, p1, -8], [-6, p1, -4], [-2, p1, 2], [3, p2, 5), (5, p1, 6), [6, p2, 8], (8, p1, 10), (10, p2, 11], (13, p2, 14), [15, p2, 16), (16, p2, 17)} s1: {(-15, p1, -14], [-12, p1, -11), (-11, p1, -9), (-7, p1, -5), [-4, p1, -1], (1, p1, 2], (4, p1, 5], [7, p1, 9], [11, p1, 12)} s2: {(-oo, p2, -16), [-15, p2, -13), [-12, p2, -10], (-9, p2, -8], (-6, p2, -5], (-4, p2, -1], [1, p2, 3), [5, p2, 7)} union(s1, s2): {(-oo, p2, -16), [-15, p2, -13), [-12, p2, -11], (-11, p1, -9), (-9, p2, -8], (-7, p1, -6], (-6, p2, -5], [-4, p1, -1], [1, p2, 3), (4, p1, 5), [5, p2, 7), [7, p1, 9], [11, p1, 12)} s1: {(-8, p1, -6), (-4, p1, -2), (-1, p1, 2), [4, p1, 6], (7, p1, 10], (12, p1, 14], [15, p1, 15], [17, p1, 19], [21, p1, oo)} s2: {[-18, p2, -16), (-14, p2, -12), (-10, p2, -9], (-7, p2, -5], (-3, p2, -1), [1, p2, 2), (3, p2, 4), (6, p2, 9]} union(s1, s2): {[-18, p2, -16), (-14, p2, -12), (-10, p2, -9], (-8, p1, -7], (-7, p2, -5], (-4, p1, -3], (-3, p2, -1), (-1, p1, 2), (3, p2, 4), [4, p1, 6], (6, p2, 7], (7, p1, 10], (12, p1, 14], [15, p1, 15], [17, p1, 19], [21, p1, oo)} s1: {(-oo, p1, -18), (-16, p1, -15), (-13, p1, -12), (-10, p1, -8), (-6, p1, -2], [0, p1, 0], (2, p1, 3), [5, p1, 7], (8, p1, 9), (11, p1, 12]} s2: {(-oo, p2, -13], (-12, p2, -9), (-9, p2, -7], [-6, p2, -5), [-3, p2, -2), [0, p2, 3), [4, p2, 6), (7, p2, 8], (9, p2, 10), [11, p2, oo)} union(s1, s2): {(-oo, p2, -13], (-13, p1, -12), (-12, p2, -10], (-10, p1, -9], (-9, p2, -7], [-6, p2, -6], (-6, p1, -2], [0, p2, 3), [4, p2, 5), [5, p1, 7], (7, p2, 8], (8, p1, 9), (9, p2, 10), [11, p2, oo)} s1: {(-19, p1, -17), (-17, p1, -15], (-14, p1, -13), (-11, p1, -9], [-7, p1, -5), (-3, p1, 3]} s2: {[-18, p2, -17), (-17, p2, -14), (-13, p2, -12), (-12, p2, -10), (-10, p2, -8), (-6, p2, -5), [-4, p2, -2], [0, p2, 0]} union(s1, s2): {(-19, p1, -17), (-17, p2, -14), (-14, p1, -13), (-13, p2, -12), (-12, p2, -11], (-11, p1, -10], (-10, p2, -8), [-7, p1, -5), [-4, p2, -3], (-3, p1, 3]} s1: {[-15, p1, -14], [-13, p1, -11), (-11, p1, -9], [-7, p1, -5], [-3, p1, -1], [1, p1, 3), (4, p1, 5), (5, p1, 7), (9, p1, oo)} s2: {[-15, p2, -14), [-13, p2, -11], [-9, p2, -6], [-4, p2, -3], (-1, p2, 0), (0, p2, 1], (3, p2, 5), (6, p2, oo)} union(s1, s2): {[-15, p1, -14], [-13, p2, -11], (-11, p1, -9), [-9, p2, -7), [-7, p1, -5], [-4, p2, -3), [-3, p1, -1], (-1, p2, 0), (0, p2, 1), [1, p1, 3), (3, p2, 5), (5, p1, 6], (6, p2, oo)} s1: {(-9, p1, -8), (-7, p1, 0), [2, p1, 4), (5, p1, 6], (7, p1, 9), (9, p1, 11)} s2: {(-oo, p2, -14), (-14, p2, -12], (-10, p2, -8), (-6, p2, -4), (-4, p2, -1), (-1, p2, 1), [3, p2, 4), (6, p2, oo)} union(s1, s2): {(-oo, p2, -14), (-14, p2, -12], (-10, p2, -8), (-7, p1, -1], (-1, p2, 1), [2, p1, 4), (5, p1, 6], (6, p2, oo)} s1: {(-oo, p1, -18], (-17, p1, -14), [-12, p1, -9), [-7, p1, -5], [-3, p1, -1), (1, p1, 2], (4, p1, oo)} s2: {[-12, p2, -6), (-4, p2, -2), [0, p2, 3], [5, p2, 7], [8, p2, 10], (11, p2, 12], (14, p2, oo)} union(s1, s2): {(-oo, p1, -18], (-17, p1, -14), [-12, p2, -7), [-7, p1, -5], (-4, p2, -3), [-3, p1, -1), [0, p2, 3], (4, p1, oo)} s1: {(-oo, p1, -12), (-10, p1, -9), (-8, p1, -6], [-5, p1, -4), [-2, p1, 0], [1, p1, 2], (4, p1, 5), [7, p1, 7]} s2: {(-oo, p2, -16), (-14, p2, -13), [-11, p2, -7), (-5, p2, -4), (-3, p2, -2], (-1, p2, 0), (2, p2, 7), (9, p2, oo)} union(s1, s2): {(-oo, p1, -12), [-11, p2, -8], (-8, p1, -6], [-5, p1, -4), (-3, p2, -2), [-2, p1, 0], [1, p1, 2], (2, p2, 7), [7, p1, 7], (9, p2, oo)} s1: {[76, p1, 80), (173, p1, 196), (293, p1, 311], (332, p1, 402], [469, p1, 553), [615, p1, 621), [682, p1, 693], (785, p1, 800], (845, p1, 871], [873, p1, 945), [1011, p1, 1040), (1047, p1, 1067), (1147, p1, 1184], [1190, p1, 1285], [1344, p1, 1414], (1499, p1, 1548), [1592, p1, 1599], (1642, p1, 1694), (1774, p1, 1816), (1826, p1, 1899)} s2: {(1, p2, 7), [23, p2, 37), [39, p2, 51), [81, p2, 98), (112, p2, 168], [256, p2, 291], [310, p2, 321), [355, p2, 440], [498, p2, 532), (563, p2, 577), (603, p2, 632), (726, p2, 775], (862, p2, 902), [952, p2, 1022], (1052, p2, 1093), (1159, p2, 1200], (1212, p2, 1229), (1259, p2, 1341], (1352, p2, 1367), (1439, p2, 1503)} union(s1, s2): {(1, p2, 7), [23, p2, 37), [39, p2, 51), [76, p1, 80), [81, p2, 98), (112, p2, 168], (173, p1, 196), [256, p2, 291], (293, p1, 310), [310, p2, 321), (332, p1, 355), [355, p2, 440], [469, p1, 553), (563, p2, 577), (603, p2, 632), [682, p1, 693], (726, p2, 775], (785, p1, 800], (845, p1, 862], (862, p2, 873), [873, p1, 945), [952, p2, 1011), [1011, p1, 1040), (1047, p1, 1052], (1052, p2, 1093), (1147, p1, 1159], (1159, p2, 1190), [1190, p1, 1259], (1259, p2, 1341], [1344, p1, 1414], (1439, p2, 1499], (1499, p1, 1548), [1592, p1, 1599], (1642, p1, 1694), (1774, p1, 1816), (1826, p1, 1899)} s1: {(-oo, p1, 119), [184, p1, 219), [312, p1, 351), [407, p1, 437], (476, p1, 547], (598, p1, 602], [608, p1, 675), (732, p1, 809), (884, p1, 966], [971, p1, 988], [1039, p1, 1068), [1097, p1, 1145), (1158, p1, 1253], [1349, p1, 1447], [1479, p1, 1537], [1570, p1, 1638), [1680, p1, 1744], (1830, p1, 1867], [1885, p1, 1959], (1964, p1, 2058], (2093, p1, 2190], [2217, p1, oo)} s2: {(-oo, p2, 74], (115, p2, 186], [267, p2, 320), (336, p2, 343), [347, p2, 374), [423, p2, 487], [511, p2, 607), (650, p2, 727], [777, p2, 792), (854, p2, 878), [930, p2, 953], (1046, p2, 1091], [1126, p2, 1223), (1225, p2, 1286), [1350, p2, 1363], [1420, p2, 1484), (1551, p2, 1564), (1637, p2, 1689), [1768, p2, 1864), [1893, p2, 1908], [1939, p2, 2011], [2040, p2, oo)} union(s1, s2): {(-oo, p1, 115], (115, p2, 184), [184, p1, 219), [267, p2, 312), [312, p1, 347), [347, p2, 374), [407, p1, 423), [423, p2, 476], (476, p1, 511), [511, p2, 607), [608, p1, 650], (650, p2, 727], (732, p1, 809), (854, p2, 878), (884, p1, 966], [971, p1, 988], [1039, p1, 1046], (1046, p2, 1091], [1097, p1, 1126), [1126, p2, 1158], (1158, p1, 1225], (1225, p2, 1286), [1349, p1, 1420), [1420, p2, 1479), [1479, p1, 1537], (1551, p2, 1564), [1570, p1, 1637], (1637, p2, 1680), [1680, p1, 1744], [1768, p2, 1830], (1830, p1, 1867], [1885, p1, 1939), [1939, p2, 1964], (1964, p1, 2040), [2040, p2, oo)} s1: {[165, p1, 182], [274, p1, 329], [357, p1, 367), [421, p1, 461), (535, p1, 619), (693, p1, 764), [790, p1, 795], [798, p1, 833), [850, p1, 934), (974, p1, 1019], [1028, p1, 1109], [1147, p1, 1188), [1266, p1, 1294), [1312, p1, 1379), (1392, p1, 1491), [1587, p1, 1614), (1635, p1, 1715], (1739, p1, 1792], (1884, p1, 1952], (1973, p1, 2059)} s2: {[112, p2, 198), (211, p2, 228], [252, p2, 343], [350, p2, 426), (432, p2, 470), (481, p2, 521], [608, p2, 631], [663, p2, 753), (803, p2, 857), [946, p2, 993], (1048, p2, 1065), (1086, p2, 1169], [1188, p2, 1232), [1240, p2, 1278), [1349, p2, 1356), [1412, p2, 1478), [1536, p2, 1579), [1600, p2, 1634), [1689, p2, 1727), [1813, p2, 1846]} union(s1, s2): {[112, p2, 198), (211, p2, 228], [252, p2, 343], [350, p2, 421), [421, p1, 432], (432, p2, 470), (481, p2, 521], (535, p1, 608), [608, p2, 631], [663, p2, 693], (693, p1, 764), [790, p1, 795], [798, p1, 803], (803, p2, 850), [850, p1, 934), [946, p2, 974], (974, p1, 1019], [1028, p1, 1086], (1086, p2, 1147), [1147, p1, 1188), [1188, p2, 1232), [1240, p2, 1266), [1266, p1, 1294), [1312, p1, 1379), (1392, p1, 1491), [1536, p2, 1579), [1587, p1, 1600), [1600, p2, 1634), (1635, p1, 1689), [1689, p2, 1727), (1739, p1, 1792], [1813, p2, 1846], (1884, p1, 1952], (1973, p1, 2059)} s1: {[27, p1, 96), (126, p1, 151], [184, p1, 216], [219, p1, 245), (289, p1, 299), [338, p1, 410), [497, p1, 511], [591, p1, 627], (636, p1, 684], (707, p1, 784], [798, p1, 808), [827, p1, 900), (913, p1, 941], [981, p1, 993], (1004, p1, 1060], [1101, p1, 1182], [1196, p1, 1263], (1357, p1, 1395), [1398, p1, 1472), (1531, p1, 1603), (1686, p1, oo)} s2: {(-oo, p2, 205], [290, p2, 376], [383, p2, 433], [460, p2, 516], (529, p2, 556), (635, p2, 713], [773, p2, 775), (851, p2, 883), [940, p2, 948), [1011, p2, 1035], [1123, p2, 1161], (1233, p2, 1300), [1347, p2, 1438], (1464, p2, 1481), (1544, p2, 1554], [1637, p2, 1649), (1651, p2, 1730], (1780, p2, 1849], [1856, p2, 1915], (1982, p2, 2062], (2090, p2, 2094], (2125, p2, oo)} union(s1, s2): {(-oo, p2, 184), [184, p1, 216], [219, p1, 245), (289, p1, 290), [290, p2, 338), [338, p1, 383), [383, p2, 433], [460, p2, 516], (529, p2, 556), [591, p1, 627], (635, p2, 707], (707, p1, 784], [798, p1, 808), [827, p1, 900), (913, p1, 940), [940, p2, 948), [981, p1, 993], (1004, p1, 1060], [1101, p1, 1182], [1196, p1, 1233], (1233, p2, 1300), [1347, p2, 1398), [1398, p1, 1464], (1464, p2, 1481), (1531, p1, 1603), [1637, p2, 1649), (1651, p2, 1686], (1686, p1, oo)} s1: {(139, p1, 148), (206, p1, 218), [279, p1, 368), [466, p1, 560], [572, p1, 592), (649, p1, 686), [717, p1, 800), [828, p1, 850), [948, p1, 987], [1004, p1, 1082], (1106, p1, 1191], (1208, p1, 1254), [1335, p1, 1406], (1433, p1, 1501), (1557, p1, 1614), [1661, p1, 1710], [1720, p1, 1802], [1835, p1, 1932], [1993, p1, 2033], (2100, p1, 2150), (2237, p1, oo)} s2: {[129, p2, 169), [175, p2, 220), [294, p2, 323), (383, p2, 406), [466, p2, 523], (551, p2, 629], (673, p2, 714), [764, p2, 841], [870, p2, 879], [923, p2, 1010), [1085, p2, 1125], [1211, p2, 1237), (1302, p2, 1370), (1416, p2, 1440], [1445, p2, 1467], [1531, p2, 1600], [1651, p2, 1707], [1755, p2, 1806], [1832, p2, 1866], [1889, p2, 1894]} union(s1, s2): {[129, p2, 169), [175, p2, 220), [279, p1, 368), (383, p2, 406), [466, p1, 551], (551, p2, 629], (649, p1, 673], (673, p2, 714), [717, p1, 764), [764, p2, 828), [828, p1, 850), [870, p2, 879], [923, p2, 1004), [1004, p1, 1082], [1085, p2, 1106], (1106, p1, 1191], (1208, p1, 1254), (1302, p2, 1335), [1335, p1, 1406], (1416, p2, 1433], (1433, p1, 1501), [1531, p2, 1557], (1557, p1, 1614), [1651, p2, 1661), [1661, p1, 1710], [1720, p1, 1755), [1755, p2, 1806], [1832, p2, 1835), [1835, p1, 1932], [1993, p1, 2033], (2100, p1, 2150), (2237, p1, oo)} s1: {[-98, p1, -56], (-19, p1, 25), (115, p1, 138), [153, p1, 175), (217, p1, 223), (285, p1, 361], [432, p1, 521), [556, p1, 652), (731, p1, 815], [851, p1, 862], [873, p1, 907], [990, p1, 1051), (1113, p1, 1142), (1227, p1, 1268], [1316, p1, 1338], [1382, p1, 1445], (1520, p1, 1579), [1600, p1, 1624), [1693, p1, 1789), [1853, p1, 1947), (1998, p1, oo)} s2: {(-oo, p2, 147], [190, p2, 218], [280, p2, 307), [370, p2, 447], (520, p2, 614], (707, p2, 761], [852, p2, 862), (929, p2, 1004], [1060, p2, 1076), (1175, p2, 1326], (1411, p2, 1495), [1502, p2, 1524], (1528, p2, 1536), [1581, p2, 1625], [1722, p2, 1723), [1774, p2, 1799], [1812, p2, 1829), (1849, p2, 1943), [1989, p2, 2067], [2148, p2, 2217)} union(s1, s2): {(-oo, p2, 147], [153, p1, 175), [190, p2, 217], (217, p1, 223), [280, p2, 285], (285, p1, 361], [370, p2, 432), [432, p1, 520], (520, p2, 556), [556, p1, 652), (707, p2, 731], (731, p1, 815], [851, p1, 862], [873, p1, 907], (929, p2, 990), [990, p1, 1051), [1060, p2, 1076), (1113, p1, 1142), (1175, p2, 1316), [1316, p1, 1338], [1382, p1, 1411], (1411, p2, 1495), [1502, p2, 1520], (1520, p1, 1579), [1581, p2, 1625], [1693, p1, 1774), [1774, p2, 1799], [1812, p2, 1829), (1849, p2, 1853), [1853, p1, 1947), [1989, p2, 1998], (1998, p1, oo)} s1: {(-oo, p1, 47], [67, p1, 126], (191, p1, 233), [313, p1, 318], [324, p1, 338), (390, p1, 473), [563, p1, 643], [678, p1, 724), (783, p1, 862), [883, p1, 942), (981, p1, 1076], (1159, p1, 1203], (1294, p1, 1352], [1446, p1, 1521), [1537, p1, 1578], (1663, p1, 1735], (1766, p1, 1781), [1824, p1, 1853], [1913, p1, 2011], (2094, p1, 2168)} s2: {(-oo, p2, -91), (-60, p2, -5), (86, p2, 113], (194, p2, 197], [234, p2, 287], [385, p2, 432], [506, p2, 596), [666, p2, 715], (729, p2, 794), [825, p2, 896], (968, p2, 972], [1046, p2, 1071], (1073, p2, 1141], [1177, p2, 1258), [1272, p2, 1340], [1382, p2, 1427), (1514, p2, 1612), [1693, p2, 1790], (1882, p2, 1895), [1934, p2, 1953), (2014, p2, 2066]} union(s1, s2): {(-oo, p1, 47], [67, p1, 126], (191, p1, 233), [234, p2, 287], [313, p1, 318], [324, p1, 338), [385, p2, 390], (390, p1, 473), [506, p2, 563), [563, p1, 643], [666, p2, 678), [678, p1, 724), (729, p2, 783], (783, p1, 825), [825, p2, 883), [883, p1, 942), (968, p2, 972], (981, p1, 1073], (1073, p2, 1141], (1159, p1, 1177), [1177, p2, 1258), [1272, p2, 1294], (1294, p1, 1352], [1382, p2, 1427), [1446, p1, 1514], (1514, p2, 1612), (1663, p1, 1693), [1693, p2, 1790], [1824, p1, 1853], (1882, p2, 1895), [1913, p1, 2011], (2014, p2, 2066], (2094, p1, 2168)} s1: {(-oo, p1, 257), (323, p1, 359), [450, p1, 463], (499, p1, 507], [537, p1, 592], (598, p1, 617), (639, p1, 722], [732, p1, 770], [851, p1, 938], [969, p1, 1012], [1049, p1, 1126), [1189, p1, 1241), [1243, p1, 1322), (1412, p1, 1453), (1490, p1, 1554], (1555, p1, 1649], (1731, p1, 1799], (1835, p1, 1914], (1926, p1, 1974), [2026, p1, 2058), [2146, p1, 2237)} s2: {(128, p2, 209), (232, p2, 278), [344, p2, 419), (503, p2, 543], (627, p2, 642), [683, p2, 782), (869, p2, 905], [985, p2, 1042], [1094, p2, 1168), (1233, p2, 1253), [1275, p2, 1289], (1366, p2, 1399), (1422, p2, 1445], [1495, p2, 1554), [1556, p2, 1628], [1653, p2, 1744), (1799, p2, 1819], [1834, p2, 1889], (1974, p2, 1994)} union(s1, s2): {(-oo, p1, 232], (232, p2, 278), (323, p1, 344), [344, p2, 419), [450, p1, 463], (499, p1, 503], (503, p2, 537), [537, p1, 592], (598, p1, 617), (627, p2, 639], (639, p1, 683), [683, p2, 782), [851, p1, 938], [969, p1, 985), [985, p2, 1042], [1049, p1, 1094), [1094, p2, 1168), [1189, p1, 1233], (1233, p2, 1243), [1243, p1, 1322), (1366, p2, 1399), (1412, p1, 1453), (1490, p1, 1554], (1555, p1, 1649], [1653, p2, 1731], (1731, p1, 1799], (1799, p2, 1819], [1834, p2, 1835], (1835, p1, 1914], (1926, p1, 1974), (1974, p2, 1994), [2026, p1, 2058), [2146, p1, 2237)} s1: {(-oo, p1, -8], (1, p1, 99], [188, p1, 254), [288, p1, 367), (431, p1, 483], (489, p1, 503], (538, p1, 606], [609, p1, 620), (644, p1, 677), [729, p1, 772), [834, p1, 898), (986, p1, 993], (1000, p1, 1088), (1145, p1, 1217), (1279, p1, 1322), (1364, p1, 1421), (1490, p1, 1545), (1626, p1, 1700], (1764, p1, 1854), (1912, p1, 1981), (2006, p1, 2032], [2108, p1, oo)} s2: {[194, p2, 218), (279, p2, 367], (450, p2, 485], [523, p2, 555), [567, p2, 646], [739, p2, 762], [849, p2, 896], [928, p2, 928], [973, p2, 1027), (1057, p2, 1058), (1068, p2, 1069], [1101, p2, 1170), [1184, p2, 1224], (1293, p2, 1366], (1432, p2, 1443], [1486, p2, 1524], [1557, p2, 1608], (1644, p2, 1711], (1746, p2, 1771], [1797, p2, 1885), (1917, p2, oo)} union(s1, s2): {(-oo, p1, -8], (1, p1, 99], [188, p1, 254), (279, p2, 367], (431, p1, 450], (450, p2, 485], (489, p1, 503], [523, p2, 538], (538, p1, 567), [567, p2, 644], (644, p1, 677), [729, p1, 772), [834, p1, 898), [928, p2, 928], [973, p2, 1000], (1000, p1, 1088), [1101, p2, 1145], (1145, p1, 1184), [1184, p2, 1224], (1279, p1, 1293], (1293, p2, 1364], (1364, p1, 1421), (1432, p2, 1443], [1486, p2, 1490], (1490, p1, 1545), [1557, p2, 1608], (1626, p1, 1644], (1644, p2, 1711], (1746, p2, 1764], (1764, p1, 1797), [1797, p2, 1885), (1912, p1, 1917], (1917, p2, oo)} s1: {[59, p1, 74], [162, p1, 188), (223, p1, 272), [320, p1, 418], (450, p1, 513], (550, p1, 633), [700, p1, 741], (815, p1, 880], [894, p1, 904), [982, p1, 1006], [1085, p1, 1159], [1185, p1, 1224), (1227, p1, 1250), [1294, p1, 1342), [1371, p1, 1425], (1478, p1, 1554), (1575, p1, 1642], [1713, p1, 1777), [1779, p1, 1796], (1832, p1, oo)} s2: {(-oo, p2, 64], (152, p2, 241], [285, p2, 379], (468, p2, 560), (633, p2, 710), [751, p2, 785), [836, p2, 883], [982, p2, 1048], (1142, p2, 1151), [1194, p2, 1226), [1270, p2, 1344), (1356, p2, 1451), [1530, p2, 1544], (1553, p2, 1588], [1676, p2, 1736), (1819, p2, 1851], (1858, p2, 1866), (1939, p2, 2020), (2032, p2, 2114), (2127, p2, 2205), (2257, p2, 2321]} union(s1, s2): {(-oo, p2, 59), [59, p1, 74], (152, p2, 223], (223, p1, 272), [285, p2, 320), [320, p1, 418], (450, p1, 468], (468, p2, 550], (550, p1, 633), (633, p2, 700), [700, p1, 741], [751, p2, 785), (815, p1, 836), [836, p2, 883], [894, p1, 904), [982, p2, 1048], [1085, p1, 1159], [1185, p1, 1194), [1194, p2, 1226), (1227, p1, 1250), [1270, p2, 1344), (1356, p2, 1451), (1478, p1, 1553], (1553, p2, 1575], (1575, p1, 1642], [1676, p2, 1713), [1713, p1, 1777), [1779, p1, 1796], (1819, p2, 1832], (1832, p1, oo)} s1: {(-173, p1, -143), (-112, p1, -30], (-6, p1, -4], (11, p1, 58], (148, p1, 157), [176, p1, 187], (226, p1, 293], (382, p1, 429), [473, p1, 500), (577, p1, 670], [685, p1, 780], (783, p1, 871), [941, p1, 983), (1051, p1, 1137), (1137, p1, 1149), [1223, p1, 1295], (1362, p1, 1372], (1399, p1, 1477), (1540, p1, 1619), [1664, p1, 1721), (1812, p1, oo)} s2: {(-11, p2, 48], [136, p2, 149], [170, p2, 242], [322, p2, 419), (515, p2, 539], (632, p2, 697], (765, p2, 859], [948, p2, 961], [1029, p2, 1051), (1121, p2, 1189], [1199, p2, 1203), (1294, p2, 1367], (1463, p2, 1541), (1626, p2, 1711), [1746, p2, 1784], (1823, p2, 1863], [1874, p2, 1963), (1977, p2, 2016), [2094, p2, 2107], [2145, p2, 2173)} union(s1, s2): {(-173, p1, -143), (-112, p1, -30], (-11, p2, 11], (11, p1, 58], [136, p2, 148], (148, p1, 157), [170, p2, 226], (226, p1, 293], [322, p2, 382], (382, p1, 429), [473, p1, 500), (515, p2, 539], (577, p1, 632], (632, p2, 685), [685, p1, 765], (765, p2, 783], (783, p1, 871), [941, p1, 983), [1029, p2, 1051), (1051, p1, 1121], (1121, p2, 1189], [1199, p2, 1203), [1223, p1, 1294], (1294, p2, 1362], (1362, p1, 1372], (1399, p1, 1463], (1463, p2, 1540], (1540, p1, 1619), (1626, p2, 1664), [1664, p1, 1721), [1746, p2, 1784], (1812, p1, oo)} s1: {[-67, p1, 16], [97, p1, 131], [221, p1, 282), (335, p1, 339), (402, p1, 423), [477, p1, 541], [565, p1, 659], [693, p1, 779], [854, p1, 914], [927, p1, 1022), (1041, p1, 1125], (1168, p1, 1201], (1247, p1, 1281), [1363, p1, 1434], (1481, p1, 1526), [1540, p1, 1630), (1711, p1, 1778), [1849, p1, 1869), (1956, p1, 1971), [1993, p1, 2077]} s2: {(205, p2, 253), [267, p2, 329), (379, p2, 404], (437, p2, 529), (599, p2, 657), (742, p2, 835), [913, p2, 961], [978, p2, 1032), [1047, p2, 1110), (1186, p2, 1260], (1278, p2, 1302), (1334, p2, 1406], (1454, p2, 1517), (1555, p2, 1605), (1664, p2, 1738), (1787, p2, 1822], (1905, p2, 1969), [1972, p2, 2038), (2068, p2, 2090], (2121, p2, 2141), [2175, p2, oo)} union(s1, s2): {[-67, p1, 16], [97, p1, 131], (205, p2, 221), [221, p1, 267), [267, p2, 329), (335, p1, 339), (379, p2, 402], (402, p1, 423), (437, p2, 477), [477, p1, 541], [565, p1, 659], [693, p1, 742], (742, p2, 835), [854, p1, 913), [913, p2, 927), [927, p1, 978), [978, p2, 1032), (1041, p1, 1125], (1168, p1, 1186], (1186, p2, 1247], (1247, p1, 1278], (1278, p2, 1302), (1334, p2, 1363), [1363, p1, 1434], (1454, p2, 1481], (1481, p1, 1526), [1540, p1, 1630), (1664, p2, 1711], (1711, p1, 1778), (1787, p2, 1822], [1849, p1, 1869), (1905, p2, 1956], (1956, p1, 1971), [1972, p2, 1993), [1993, p1, 2068], (2068, p2, 2090], (2121, p2, 2141), [2175, p2, oo)} s1: {[12, p1, 54], (61, p1, 106), [179, p1, 232), (274, p1, 355], [442, p1, 514), [538, p1, 614), [695, p1, 730), (740, p1, 797), [817, p1, 895], [907, p1, 913), (976, p1, 1017], (1067, p1, 1155), (1155, p1, 1164], (1254, p1, 1276), (1314, p1, 1395], (1415, p1, 1442], (1494, p1, 1560], [1572, p1, 1595], (1672, p1, 1684), (1711, p1, 1777]} s2: {(-oo, p2, -40], (-31, p2, -6), [28, p2, 101], [132, p2, 218), [301, p2, 309), (391, p2, 392), [449, p2, 528), [608, p2, 668), [693, p2, 755), (793, p2, 852), [878, p2, 966), [1062, p2, 1152], (1200, p2, 1261], [1359, p2, 1404), [1453, p2, 1550], [1602, p2, 1700), [1711, p2, 1739), (1775, p2, 1781], [1844, p2, 1892), [1967, p2, 2047), (2077, p2, 2079)} union(s1, s2): {(-oo, p2, -40], (-31, p2, -6), [12, p1, 28), [28, p2, 61], (61, p1, 106), [132, p2, 179), [179, p1, 232), (274, p1, 355], (391, p2, 392), [442, p1, 449), [449, p2, 528), [538, p1, 608), [608, p2, 668), [693, p2, 740], (740, p1, 793], (793, p2, 817), [817, p1, 878), [878, p2, 966), (976, p1, 1017], [1062, p2, 1067], (1067, p1, 1155), (1155, p1, 1164], (1200, p2, 1254], (1254, p1, 1276), (1314, p1, 1359), [1359, p2, 1404), (1415, p1, 1442], [1453, p2, 1494], (1494, p1, 1560], [1572, p1, 1595], [1602, p2, 1700), [1711, p2, 1711], (1711, p1, 1775], (1775, p2, 1781], [1844, p2, 1892), [1967, p2, 2047), (2077, p2, 2079)} s1: {[185, p1, 283), (300, p1, 336], (415, p1, 456], [535, p1, 594), [675, p1, 710], (764, p1, 818], [827, p1, 830), [851, p1, 942], [943, p1, 977], (1010, p1, 1090], (1110, p1, 1126), (1173, p1, 1229], (1286, p1, 1291), [1334, p1, 1342], [1344, p1, 1401), [1408, p1, 1443], (1521, p1, 1582), [1632, p1, 1691), [1763, p1, 1774), [1788, p1, 1793], [1811, p1, oo)} s2: {(157, p2, 220), (248, p2, 273], [341, p2, 358), [383, p2, 456], (465, p2, 512), (531, p2, 628), (709, p2, 723], (816, p2, 869], (871, p2, 876], [934, p2, 959), [1006, p2, 1099], [1187, p2, 1239], [1269, p2, 1336], (1375, p2, 1393), [1410, p2, 1488], (1586, p2, 1588], [1626, p2, 1692), [1697, p2, 1730], [1813, p2, 1878), (1968, p2, 2025], (2075, p2, oo)} union(s1, s2): {(157, p2, 185), [185, p1, 283), (300, p1, 336], [341, p2, 358), [383, p2, 456], (465, p2, 512), (531, p2, 628), [675, p1, 709], (709, p2, 723], (764, p1, 816], (816, p2, 851), [851, p1, 934), [934, p2, 943), [943, p1, 977], [1006, p2, 1099], (1110, p1, 1126), (1173, p1, 1187), [1187, p2, 1239], [1269, p2, 1334), [1334, p1, 1342], [1344, p1, 1401), [1408, p1, 1410), [1410, p2, 1488], (1521, p1, 1582), (1586, p2, 1588], [1626, p2, 1692), [1697, p2, 1730], [1763, p1, 1774), [1788, p1, 1793], [1811, p1, oo)} s1: {(-oo, p1, -107), [-103, p1, -60], (-17, p1, 60), (105, p1, 182), [228, p1, 265), (320, p1, 377], (414, p1, 427], (490, p1, 505], [562, p1, 569], (622, p1, 704), [758, p1, 845], [915, p1, 987], [1027, p1, 1059], (1082, p1, 1085), [1119, p1, 1138), [1214, p1, 1264), [1313, p1, 1361], (1443, p1, 1465), (1558, p1, 1617], (1650, p1, 1652], (1697, p1, 1713)} s2: {(-oo, p2, 102), [150, p2, 171), (200, p2, 274), (327, p2, 356), (364, p2, 419], (461, p2, 550], [593, p2, 617), [709, p2, 802], (815, p2, 874), [956, p2, 981], (1008, p2, 1088), (1135, p2, 1208), (1223, p2, 1250), [1272, p2, 1335], (1399, p2, 1422), [1427, p2, 1451), [1542, p2, 1613), (1632, p2, 1715), (1755, p2, 1800), (1896, p2, 1984], (1999, p2, 2081]} union(s1, s2): {(-oo, p2, 102), (105, p1, 182), (200, p2, 274), (320, p1, 364], (364, p2, 414], (414, p1, 427], (461, p2, 550], [562, p1, 569], [593, p2, 617), (622, p1, 704), [709, p2, 758), [758, p1, 815], (815, p2, 874), [915, p1, 987], (1008, p2, 1088), [1119, p1, 1135], (1135, p2, 1208), [1214, p1, 1264), [1272, p2, 1313), [1313, p1, 1361], (1399, p2, 1422), [1427, p2, 1443], (1443, p1, 1465), [1542, p2, 1558], (1558, p1, 1617], (1632, p2, 1715), (1755, p2, 1800), (1896, p2, 1984], (1999, p2, 2081]} s1: {(-oo, p1, -82), [-22, p1, -14), (24, p1, 42], (122, p1, 180), (246, p1, 260), [336, p1, 412), (503, p1, 552], [606, p1, 664], (695, p1, 740], (791, p1, 836], (887, p1, 916], [925, p1, 1003), [1045, p1, 1073), [1134, p1, 1186], [1278, p1, 1305), [1391, p1, 1408), [1505, p1, 1543], (1567, p1, 1596], [1603, p1, 1607], [1668, p1, 1747), [1758, p1, 1774], (1835, p1, oo)} s2: {(35, p2, 68], (104, p2, 190], [259, p2, 306], (356, p2, 424), [521, p2, 523), (582, p2, 657], (725, p2, 792], (833, p2, 858), [870, p2, 912], [919, p2, 1008], (1053, p2, 1058), (1076, p2, 1127), (1224, p2, 1227], (1230, p2, 1273], (1354, p2, 1379), (1385, p2, 1427], (1461, p2, 1517], [1527, p2, 1588), [1601, p2, 1605], [1700, p2, 1764)} union(s1, s2): {(-oo, p1, -82), [-22, p1, -14), (24, p1, 35], (35, p2, 68], (104, p2, 190], (246, p1, 259), [259, p2, 306], [336, p1, 356], (356, p2, 424), (503, p1, 552], (582, p2, 606), [606, p1, 664], (695, p1, 725], (725, p2, 791], (791, p1, 833], (833, p2, 858), [870, p2, 887], (887, p1, 916], [919, p2, 1008], [1045, p1, 1073), (1076, p2, 1127), [1134, p1, 1186], (1224, p2, 1227], (1230, p2, 1273], [1278, p1, 1305), (1354, p2, 1379), (1385, p2, 1427], (1461, p2, 1505), [1505, p1, 1527), [1527, p2, 1567], (1567, p1, 1596], [1601, p2, 1603), [1603, p1, 1607], [1668, p1, 1700), [1700, p2, 1758), [1758, p1, 1774], (1835, p1, oo)} s1: {[119, p1, 202], (275, p1, 362], (439, p1, 472], (489, p1, 524], (589, p1, 666), [679, p1, 769), (777, p1, 807), (853, p1, 886], (923, p1, 981), (1019, p1, 1104], (1137, p1, 1183], [1213, p1, 1292), [1369, p1, 1460], [1540, p1, 1636), (1652, p1, 1678], [1703, p1, 1769), [1851, p1, 1856], [1940, p1, 1989], [2087, p1, 2111], [2117, p1, 2119]} s2: {(-oo, p2, 87), (142, p2, 225], (298, p2, 397), (462, p2, 554], [579, p2, 675), (760, p2, 815], (816, p2, 832], [872, p2, 932], [968, p2, 983], (1042, p2, 1111), (1188, p2, 1203], (1242, p2, 1355), (1361, p2, 1405], [1432, p2, 1510], (1546, p2, 1609], [1611, p2, 1621], [1656, p2, 1732), (1767, p2, 1852), [1880, p2, 1964], [1998, p2, 2049), (2128, p2, oo)} union(s1, s2): {(-oo, p2, 87), [119, p1, 142], (142, p2, 225], (275, p1, 298], (298, p2, 397), (439, p1, 462], (462, p2, 554], [579, p2, 675), [679, p1, 760], (760, p2, 815], (816, p2, 832], (853, p1, 872), [872, p2, 923], (923, p1, 968), [968, p2, 983], (1019, p1, 1042], (1042, p2, 1111), (1137, p1, 1183], (1188, p2, 1203], [1213, p1, 1242], (1242, p2, 1355), (1361, p2, 1369), [1369, p1, 1432), [1432, p2, 1510], [1540, p1, 1636), (1652, p1, 1656), [1656, p2, 1703), [1703, p1, 1767], (1767, p2, 1851), [1851, p1, 1856], [1880, p2, 1940), [1940, p1, 1989], [1998, p2, 2049), [2087, p1, 2111], [2117, p1, 2119], (2128, p2, oo)} s1: {(-128, p1, -96), (-26, p1, 7], (96, p1, 151], [184, p1, 213], [239, p1, 263), [304, p1, 342], [362, p1, 392), (491, p1, 588], (621, p1, 694), (754, p1, 851], (880, p1, 958], [985, p1, 1022], (1079, p1, 1120), (1214, p1, 1263), (1332, p1, 1409), [1478, p1, 1487), [1522, p1, 1541], (1550, p1, 1605), [1646, p1, 1677], (1708, p1, 1796)} s2: {(-78, p2, -35), (35, p2, 70], [124, p2, 169], [227, p2, 318], [364, p2, 447], [514, p2, 528), (601, p2, 649), [687, p2, 695), [731, p2, 746], (830, p2, 887], (954, p2, 956], (993, p2, 1003), [1084, p2, 1120], (1156, p2, 1232], [1298, p2, 1365), (1418, p2, 1457), (1508, p2, 1570], (1644, p2, 1696), (1757, p2, 1770], (1796, p2, 1831], [1879, p2, oo)} union(s1, s2): {(-128, p1, -96), (-78, p2, -35), (-26, p1, 7], (35, p2, 70], (96, p1, 124), [124, p2, 169], [184, p1, 213], [227, p2, 304), [304, p1, 342], [362, p1, 364), [364, p2, 447], (491, p1, 588], (601, p2, 621], (621, p1, 687), [687, p2, 695), [731, p2, 746], (754, p1, 830], (830, p2, 880], (880, p1, 958], [985, p1, 1022], (1079, p1, 1084), [1084, p2, 1120], (1156, p2, 1214], (1214, p1, 1263), [1298, p2, 1332], (1332, p1, 1409), (1418, p2, 1457), [1478, p1, 1487), (1508, p2, 1550], (1550, p1, 1605), (1644, p2, 1696), (1708, p1, 1796), (1796, p2, 1831], [1879, p2, oo)} s1: {(-oo, p1, -90), (7, p1, 46), (68, p1, 142), (159, p1, 228], [230, p1, 329), [407, p1, 411], [493, p1, 542], (636, p1, 654], [702, p1, 736], (823, p1, 868), (886, p1, 923), (958, p1, 1011], [1039, p1, 1076), [1155, p1, 1219), [1223, p1, 1241], [1318, p1, 1399], (1408, p1, 1490], (1539, p1, 1543), [1567, p1, 1628], [1668, p1, 1741], (1811, p1, 1857], [1937, p1, oo)} s2: {(-43, p2, 19), (62, p2, 121), (163, p2, 227], [299, p2, 318), (338, p2, 402), (433, p2, 485], (496, p2, 545), (638, p2, 710), (803, p2, 897], [941, p2, 1022], (1112, p2, 1128), [1172, p2, 1254), [1326, p2, 1330], (1398, p2, 1472], (1540, p2, 1631), [1682, p2, 1772], (1791, p2, 1831], [1886, p2, 1937), [1991, p2, 2004], (2022, p2, 2048)} union(s1, s2): {(-oo, p1, -90), (-43, p2, 7], (7, p1, 46), (62, p2, 68], (68, p1, 142), (159, p1, 228], [230, p1, 329), (338, p2, 402), [407, p1, 411], (433, p2, 485], [493, p1, 496], (496, p2, 545), (636, p1, 638], (638, p2, 702), [702, p1, 736], (803, p2, 886], (886, p1, 923), [941, p2, 1022], [1039, p1, 1076), (1112, p2, 1128), [1155, p1, 1172), [1172, p2, 1254), [1318, p1, 1398], (1398, p2, 1408], (1408, p1, 1490], (1539, p1, 1540], (1540, p2, 1631), [1668, p1, 1682), [1682, p2, 1772], (1791, p2, 1811], (1811, p1, 1857], [1886, p2, 1937), [1937, p1, oo)} s1: {[-152, p1, -92), [-5, p1, 0], (37, p1, 71], (80, p1, 143], [208, p1, 234), [263, p1, 281], (311, p1, 403], [499, p1, 529), [600, p1, 654], (695, p1, 793], (816, p1, 909), (946, p1, 978), [1009, p1, 1044), [1094, p1, 1175], [1189, p1, 1260], [1356, p1, 1443), (1474, p1, 1542], [1621, p1, 1627), [1674, p1, 1760], [1839, p1, 1863]} s2: {[142, p2, 213), [293, p2, 384], [439, p2, 450], (522, p2, 529], (593, p2, 646], [687, p2, 706), [789, p2, 873), [898, p2, 962), (1007, p2, 1071], [1128, p2, 1217], (1258, p2, 1289], [1334, p2, 1419), (1420, p2, 1443), [1521, p2, 1606], [1652, p2, 1698], [1736, p2, 1779), [1843, p2, 1860], [1883, p2, 1909), [1971, p2, 1994]} union(s1, s2): {[-152, p1, -92), [-5, p1, 0], (37, p1, 71], (80, p1, 142), [142, p2, 208), [208, p1, 234), [263, p1, 281], [293, p2, 311], (311, p1, 403], [439, p2, 450], [499, p1, 522], (522, p2, 529], (593, p2, 600), [600, p1, 654], [687, p2, 695], (695, p1, 789), [789, p2, 816], (816, p1, 898), [898, p2, 946], (946, p1, 978), (1007, p2, 1071], [1094, p1, 1128), [1128, p2, 1189), [1189, p1, 1258], (1258, p2, 1289], [1334, p2, 1356), [1356, p1, 1443), (1474, p1, 1521), [1521, p2, 1606], [1621, p1, 1627), [1652, p2, 1674), [1674, p1, 1736), [1736, p2, 1779), [1839, p1, 1863], [1883, p2, 1909), [1971, p2, 1994]} s1: {[-125, p1, -120), [-90, p1, -53), [-11, p1, 42], (57, p1, 153], (244, p1, 261], (342, p1, 399), [429, p1, 452), (500, p1, 514), [524, p1, 595), [659, p1, 670), (756, p1, 847), (934, p1, 999), [1031, p1, 1064), [1144, p1, 1169], [1240, p1, 1249], (1271, p1, 1310], (1363, p1, 1401), (1432, p1, 1480], (1549, p1, 1639), [1736, p1, 1791)} s2: {[-163, p2, -162], [-94, p2, -25), [63, p2, 162], [178, p2, 225], [246, p2, 250), [294, p2, 368), [437, p2, 533), (589, p2, 624], [635, p2, 695), [697, p2, 708], [729, p2, 749], [776, p2, 827), [854, p2, 896], (924, p2, 977), (1045, p2, 1130), (1152, p2, 1166], [1174, p2, 1202], (1228, p2, 1251), [1268, p2, 1289), (1351, p2, 1445)} union(s1, s2): {[-163, p2, -162], [-125, p1, -120), [-94, p2, -25), [-11, p1, 42], (57, p1, 63), [63, p2, 162], [178, p2, 225], (244, p1, 261], [294, p2, 342], (342, p1, 399), [429, p1, 437), [437, p2, 524), [524, p1, 589], (589, p2, 624], [635, p2, 695), [697, p2, 708], [729, p2, 749], (756, p1, 847), [854, p2, 896], (924, p2, 934], (934, p1, 999), [1031, p1, 1045], (1045, p2, 1130), [1144, p1, 1169], [1174, p2, 1202], (1228, p2, 1251), [1268, p2, 1271], (1271, p1, 1310], (1351, p2, 1432], (1432, p1, 1480], (1549, p1, 1639), [1736, p1, 1791)} s1: {(-66, p1, -20), [37, p1, 52), [85, p1, 113], [129, p1, 140], [196, p1, 236], [260, p1, 311], [347, p1, 404], [417, p1, 419], [508, p1, 578), (616, p1, 636), [687, p1, 725], (804, p1, 890), (971, p1, 1063), [1066, p1, 1107), (1122, p1, 1129], (1160, p1, 1231], (1303, p1, 1330), (1351, p1, 1419], [1448, p1, 1455), [1517, p1, 1591]} s2: {(-oo, p2, 150], [187, p2, 188), [278, p2, 351), (431, p2, 477], [576, p2, 614), [657, p2, 741], (781, p2, 795], [873, p2, 972], [985, p2, 1053), [1078, p2, 1149), [1189, p2, 1205), (1291, p2, 1379), (1431, p2, 1453), (1521, p2, 1545), [1574, p2, 1661), (1741, p2, 1780), [1862, p2, 1899), (1962, p2, 2047], [2121, p2, 2123], (2176, p2, 2216], [2287, p2, 2356)} union(s1, s2): {(-oo, p2, 150], [187, p2, 188), [196, p1, 236], [260, p1, 278), [278, p2, 347), [347, p1, 404], [417, p1, 419], (431, p2, 477], [508, p1, 576), [576, p2, 614), (616, p1, 636), [657, p2, 741], (781, p2, 795], (804, p1, 873), [873, p2, 971], (971, p1, 1063), [1066, p1, 1078), [1078, p2, 1149), (1160, p1, 1231], (1291, p2, 1351], (1351, p1, 1419], (1431, p2, 1448), [1448, p1, 1455), [1517, p1, 1574), [1574, p2, 1661), (1741, p2, 1780), [1862, p2, 1899), (1962, p2, 2047], [2121, p2, 2123], (2176, p2, 2216], [2287, p2, 2356)} s1: {[145, p1, 199], (270, p1, 292), (325, p1, 346), [360, p1, 403], (469, p1, 501), [542, p1, 555], [579, p1, 675], (709, p1, 781], (793, p1, 872), [971, p1, 1029), (1057, p1, 1139), [1167, p1, 1230], [1291, p1, 1296], (1301, p1, 1367], [1380, p1, 1399], (1408, p1, 1418], [1516, p1, 1571], (1627, p1, 1633], [1642, p1, 1675], (1700, p1, 1790)} s2: {[204, p2, 297), (326, p2, 347), [368, p2, 451), (503, p2, 519], (590, p2, 644), [715, p2, 752), [833, p2, 847], (853, p2, 916], [934, p2, 972), (974, p2, 1052], [1143, p2, 1207), (1297, p2, 1387], (1408, p2, 1477], (1524, p2, 1602), [1632, p2, 1665], [1677, p2, 1760), (1808, p2, 1905], (1948, p2, 1978], [2068, p2, 2092], (2181, p2, 2238)} union(s1, s2): {[145, p1, 199], [204, p2, 297), (325, p1, 326], (326, p2, 347), [360, p1, 368), [368, p2, 451), (469, p1, 501), (503, p2, 519], [542, p1, 555], [579, p1, 675], (709, p1, 781], (793, p1, 853], (853, p2, 916], [934, p2, 971), [971, p1, 974], (974, p2, 1052], (1057, p1, 1139), [1143, p2, 1167), [1167, p1, 1230], [1291, p1, 1296], (1297, p2, 1380), [1380, p1, 1399], (1408, p2, 1477], [1516, p1, 1524], (1524, p2, 1602), (1627, p1, 1632), [1632, p2, 1642), [1642, p1, 1675], [1677, p2, 1700], (1700, p1, 1790), (1808, p2, 1905], (1948, p2, 1978], [2068, p2, 2092], (2181, p2, 2238)} s1: {(-93, p1, -19), (-15, p1, 5), (8, p1, 27], [117, p1, 193), [231, p1, 257), [355, p1, 400), [477, p1, 507], (588, p1, 651), [704, p1, 796), [886, p1, 921), [959, p1, 1046), [1091, p1, 1094], [1119, p1, 1176), [1259, p1, 1288), [1357, p1, 1441], (1504, p1, 1592), [1657, p1, 1727], (1775, p1, 1812), (1821, p1, 1826], [1878, p1, 1886), (1922, p1, oo)} s2: {(-oo, p2, 43), [112, p2, 193), [223, p2, 228], [275, p2, 350), (373, p2, 409), (496, p2, 515), [598, p2, 678), [715, p2, 785), [834, p2, 879), (942, p2, 950), [1031, p2, 1095], [1191, p2, 1238), [1272, p2, 1330), (1408, p2, 1437], [1528, p2, 1564], (1632, p2, 1661), [1732, p2, 1825), (1917, p2, 1924], (2000, p2, 2001], [2028, p2, 2100), [2167, p2, 2222)} union(s1, s2): {(-oo, p2, 43), [112, p2, 193), [223, p2, 228], [231, p1, 257), [275, p2, 350), [355, p1, 373], (373, p2, 409), [477, p1, 496], (496, p2, 515), (588, p1, 598), [598, p2, 678), [704, p1, 796), [834, p2, 879), [886, p1, 921), (942, p2, 950), [959, p1, 1031), [1031, p2, 1095], [1119, p1, 1176), [1191, p2, 1238), [1259, p1, 1272), [1272, p2, 1330), [1357, p1, 1441], (1504, p1, 1592), (1632, p2, 1657), [1657, p1, 1727], [1732, p2, 1821], (1821, p1, 1826], [1878, p1, 1886), (1917, p2, 1922], (1922, p1, oo)} s1: {[158, p1, 257], (267, p1, 315), (340, p1, 354), (354, p1, 365], (432, p1, 479], (494, p1, 584), [614, p1, 684], (775, p1, 777], (791, p1, 853], [893, p1, 933), (996, p1, 1067], (1120, p1, 1173), [1267, p1, 1341], (1347, p1, 1381), [1453, p1, 1496], [1551, p1, 1580], (1618, p1, 1708], (1771, p1, 1789], [1852, p1, 1869), [1931, p1, 1981)} s2: {(-oo, p2, -134], [-87, p2, -23], [51, p2, 56), [86, p2, 95), (140, p2, 239], [323, p2, 409], (459, p2, 493], [563, p2, 637], [735, p2, 771], (792, p2, 879), (945, p2, 990), (1037, p2, 1062), [1138, p2, 1212), (1227, p2, 1244], (1296, p2, 1307), (1392, p2, 1463), (1555, p2, 1625], (1673, p2, 1717), [1765, p2, 1847), (1897, p2, 1902), [1921, p2, 1967)} union(s1, s2): {(-oo, p2, -134], [-87, p2, -23], [51, p2, 56), [86, p2, 95), (140, p2, 158), [158, p1, 257], (267, p1, 315), [323, p2, 409], (432, p1, 459], (459, p2, 493], (494, p1, 563), [563, p2, 614), [614, p1, 684], [735, p2, 771], (775, p1, 777], (791, p1, 792], (792, p2, 879), [893, p1, 933), (945, p2, 990), (996, p1, 1067], (1120, p1, 1138), [1138, p2, 1212), (1227, p2, 1244], [1267, p1, 1341], (1347, p1, 1381), (1392, p2, 1453), [1453, p1, 1496], [1551, p1, 1555], (1555, p2, 1618], (1618, p1, 1673], (1673, p2, 1717), [1765, p2, 1847), [1852, p1, 1869), (1897, p2, 1902), [1921, p2, 1931), [1931, p1, 1981)} s1: {[-60, p1, -32), [10, p1, 48), [69, p1, 111], (202, p1, 261), [309, p1, 309], (311, p1, 326), (363, p1, 425], (511, p1, 567], (587, p1, 653], [675, p1, 681], [733, p1, 793], (877, p1, 964], (1000, p1, 1086], (1103, p1, 1195), [1292, p1, 1341], [1423, p1, 1489], [1551, p1, 1593), (1655, p1, 1728], [1787, p1, 1868), (1906, p1, 1974]} s2: {(-oo, p2, -107], [-12, p2, 80], [119, p2, 151], [223, p2, 308), [360, p2, 399], [486, p2, 511), (606, p2, 676), (686, p2, 757], [852, p2, 907], (953, p2, 999), (1012, p2, 1030), [1033, p2, 1048], (1059, p2, 1072], (1144, p2, 1212], [1288, p2, 1291), [1312, p2, 1363], (1446, p2, 1472], [1571, p2, 1614), [1689, p2, 1758], [1841, p2, 1917], (2005, p2, 2027), [2069, p2, oo)} union(s1, s2): {(-oo, p2, -107], [-60, p1, -32), [-12, p2, 69), [69, p1, 111], [119, p2, 151], (202, p1, 223), [223, p2, 308), [309, p1, 309], (311, p1, 326), [360, p2, 363], (363, p1, 425], [486, p2, 511), (511, p1, 567], (587, p1, 606], (606, p2, 675), [675, p1, 681], (686, p2, 733), [733, p1, 793], [852, p2, 877], (877, p1, 953], (953, p2, 999), (1000, p1, 1086], (1103, p1, 1144], (1144, p2, 1212], [1288, p2, 1291), [1292, p1, 1312), [1312, p2, 1363], [1423, p1, 1489], [1551, p1, 1571), [1571, p2, 1614), (1655, p1, 1689), [1689, p2, 1758], [1787, p1, 1841), [1841, p2, 1906], (1906, p1, 1974], (2005, p2, 2027), [2069, p2, oo)} s1: {(-oo, p1, 113), [182, p1, 262], [355, p1, 355], (396, p1, 475], (517, p1, 562), (592, p1, 636], [699, p1, 738), [802, p1, 852), [892, p1, 893), [928, p1, 964), [996, p1, 1075), (1142, p1, 1191), [1269, p1, 1364), [1371, p1, 1457], (1501, p1, 1505], (1556, p1, 1591), (1610, p1, 1704], (1731, p1, 1741], [1802, p1, 1874), (1887, p1, 1962], (2041, p1, 2129)} s2: {[183, p2, 258), [293, p2, 323], (347, p2, 361], [416, p2, 483], (556, p2, 583), [652, p2, 750), [777, p2, 812), (842, p2, 896], [937, p2, 984], (985, p2, 1036], (1118, p2, 1196], (1214, p2, 1258), (1304, p2, 1305], (1395, p2, 1433], (1485, p2, 1508), (1528, p2, 1595], [1654, p2, 1656], [1730, p2, 1829], (1870, p2, 1911), (1994, p2, 2040)} union(s1, s2): {(-oo, p1, 113), [182, p1, 262], [293, p2, 323], (347, p2, 361], (396, p1, 416), [416, p2, 483], (517, p1, 556], (556, p2, 583), (592, p1, 636], [652, p2, 750), [777, p2, 802), [802, p1, 842], (842, p2, 896], [928, p1, 937), [937, p2, 984], (985, p2, 996), [996, p1, 1075), (1118, p2, 1196], (1214, p2, 1258), [1269, p1, 1364), [1371, p1, 1457], (1485, p2, 1508), (1528, p2, 1595], (1610, p1, 1704], [1730, p2, 1802), [1802, p1, 1870], (1870, p2, 1887], (1887, p1, 1962], (1994, p2, 2040), (2041, p1, 2129)} s1: {(98, p1, 100), (169, p1, 184], [231, p1, 316], [319, p1, 344], (397, p1, 457], [458, p1, 495), (502, p1, 520), (599, p1, 649], (657, p1, 756], [832, p1, 895), [957, p1, 1021), (1027, p1, 1056], [1108, p1, 1178], (1210, p1, 1213), (1258, p1, 1329], (1337, p1, 1343), [1414, p1, 1462], [1539, p1, 1583), [1660, p1, 1702], [1709, p1, 1742]} s2: {[229, p2, 303), [312, p2, 363), (424, p2, 455], (509, p2, 546], [633, p2, 680), (757, p2, 801), (893, p2, 922), [998, p2, 1047], (1072, p2, 1168), [1216, p2, 1246), (1246, p2, 1297), (1308, p2, 1337), [1365, p2, 1444], (1465, p2, 1490], [1502, p2, 1591], (1619, p2, 1679], [1708, p2, 1798), [1845, p2, 1910), [1961, p2, 1990), (2029, p2, 2105]} union(s1, s2): {(98, p1, 100), (169, p1, 184], [229, p2, 231), [231, p1, 312), [312, p2, 363), (397, p1, 457], [458, p1, 495), (502, p1, 509], (509, p2, 546], (599, p1, 633), [633, p2, 657], (657, p1, 756], (757, p2, 801), [832, p1, 893], (893, p2, 922), [957, p1, 998), [998, p2, 1027], (1027, p1, 1056], (1072, p2, 1108), [1108, p1, 1178], (1210, p1, 1213), [1216, p2, 1246), (1246, p2, 1258], (1258, p1, 1308], (1308, p2, 1337), (1337, p1, 1343), [1365, p2, 1414), [1414, p1, 1462], (1465, p2, 1490], [1502, p2, 1591], (1619, p2, 1660), [1660, p1, 1702], [1708, p2, 1798), [1845, p2, 1910), [1961, p2, 1990), (2029, p2, 2105]} s1: {(-oo, p1, -20], (1, p1, 65], (124, p1, 212], [309, p1, 334], (373, p1, 399), [476, p1, 531), [547, p1, 639), (720, p1, 744], [824, p1, 911], (986, p1, 1009], [1011, p1, 1024), [1025, p1, 1105], (1153, p1, 1175], [1237, p1, 1297], (1318, p1, 1337], (1358, p1, 1421], (1448, p1, 1510), [1546, p1, 1558), (1561, p1, 1571], (1622, p1, 1710], (1758, p1, 1826], [1862, p1, oo)} s2: {[17, p2, 88], [138, p2, 183], (251, p2, 258], [314, p2, 392], [426, p2, 482), (527, p2, 619), (674, p2, 686], (759, p2, 794), (827, p2, 915), [984, p2, 1080], [1158, p2, 1162), [1179, p2, 1180], (1221, p2, 1240], [1293, p2, 1392], (1467, p2, 1547], [1560, p2, 1584], (1678, p2, 1690), [1739, p2, 1768), (1798, p2, 1819], (1892, p2, 1942), (1994, p2, oo)} union(s1, s2): {(-oo, p1, -20], (1, p1, 17), [17, p2, 88], (124, p1, 212], (251, p2, 258], [309, p1, 314), [314, p2, 373], (373, p1, 399), [426, p2, 476), [476, p1, 527], (527, p2, 547), [547, p1, 639), (674, p2, 686], (720, p1, 744], (759, p2, 794), [824, p1, 827], (827, p2, 915), [984, p2, 1025), [1025, p1, 1105], (1153, p1, 1175], [1179, p2, 1180], (1221, p2, 1237), [1237, p1, 1293), [1293, p2, 1358], (1358, p1, 1421], (1448, p1, 1467], (1467, p2, 1546), [1546, p1, 1558), [1560, p2, 1584], (1622, p1, 1710], [1739, p2, 1758], (1758, p1, 1826], [1862, p1, oo)} s1: {(-oo, p1, -114), (-52, p1, -8), (6, p1, 9), [26, p1, 81), (107, p1, 136), (205, p1, 296], [301, p1, 349), (434, p1, 491), (580, p1, 659], (672, p1, 683], [744, p1, 816], [821, p1, 909), [960, p1, 1021], [1060, p1, 1077], (1147, p1, 1187], [1249, p1, 1263), (1335, p1, 1400], [1499, p1, 1514], [1591, p1, 1681], (1745, p1, 1840), (1898, p1, 1940), [1941, p1, oo)} s2: {(57, p2, 98), [180, p2, 213), (255, p2, 276], (368, p2, 385], (464, p2, 515], [557, p2, 651), [662, p2, 716), (738, p2, 798], [888, p2, 975), (1051, p2, 1058), [1097, p2, 1166), (1197, p2, 1258], [1343, p2, 1355), [1443, p2, 1506), (1566, p2, 1654], (1746, p2, 1838], (1862, p2, 1940], (1947, p2, 2004], (2051, p2, 2089)} union(s1, s2): {(-oo, p1, -114), (-52, p1, -8), (6, p1, 9), [26, p1, 57], (57, p2, 98), (107, p1, 136), [180, p2, 205], (205, p1, 296], [301, p1, 349), (368, p2, 385], (434, p1, 464], (464, p2, 515], [557, p2, 580], (580, p1, 659], [662, p2, 716), (738, p2, 744), [744, p1, 816], [821, p1, 888), [888, p2, 960), [960, p1, 1021], (1051, p2, 1058), [1060, p1, 1077], [1097, p2, 1147], (1147, p1, 1187], (1197, p2, 1249), [1249, p1, 1263), (1335, p1, 1400], [1443, p2, 1499), [1499, p1, 1514], (1566, p2, 1591), [1591, p1, 1681], (1745, p1, 1840), (1862, p2, 1940], [1941, p1, oo)} s1: {(-64, p1, -54), (45, p1, 115), [139, p1, 227), [317, p1, 335), (418, p1, 457], [487, p1, 541), (596, p1, 600], [650, p1, 747), [831, p1, 930], [1023, p1, 1122), [1213, p1, 1218], [1311, p1, 1409], (1413, p1, 1421), (1443, p1, 1524), [1607, p1, 1698), (1795, p1, 1854), [1936, p1, 2031), [2048, p1, 2110], (2200, p1, 2207], (2304, p1, 2309)} s2: {(6, p2, 102], [141, p2, 228), (314, p2, 318], [329, p2, 395], (457, p2, 493), [533, p2, 545), [629, p2, 703), [707, p2, 720), (799, p2, 852), (861, p2, 911], [969, p2, 1065), (1079, p2, 1102], [1183, p2, 1236), (1274, p2, 1344), [1417, p2, 1484], [1562, p2, 1636), [1680, p2, 1717], [1782, p2, 1863], (1921, p2, 1925], (2012, p2, 2042]} union(s1, s2): {(-64, p1, -54), (6, p2, 45], (45, p1, 115), [139, p1, 141), [141, p2, 228), (314, p2, 317), [317, p1, 329), [329, p2, 395], (418, p1, 457], (457, p2, 487), [487, p1, 533), [533, p2, 545), (596, p1, 600], [629, p2, 650), [650, p1, 747), (799, p2, 831), [831, p1, 930], [969, p2, 1023), [1023, p1, 1122), [1183, p2, 1236), (1274, p2, 1311), [1311, p1, 1409], (1413, p1, 1417), [1417, p2, 1443], (1443, p1, 1524), [1562, p2, 1607), [1607, p1, 1680), [1680, p2, 1717], [1782, p2, 1863], (1921, p2, 1925], [1936, p1, 2012], (2012, p2, 2042], [2048, p1, 2110], (2200, p1, 2207], (2304, p1, 2309)} s1: {[9, p1, 108), [194, p1, 288), [329, p1, 389), [397, p1, 491), [540, p1, 557], [575, p1, 657), (672, p1, 732], [738, p1, 793], (799, p1, 830), [890, p1, 893), [951, p1, 985), [1043, p1, 1061), [1089, p1, 1132), [1159, p1, 1173], (1182, p1, 1217), (1301, p1, 1356], [1379, p1, 1393), (1411, p1, 1487), (1544, p1, 1562], [1601, p1, 1692]} s2: {[66, p2, 110], (140, p2, 165), [243, p2, 327), [384, p2, 387], (460, p2, 520], (552, p2, 600), [632, p2, 713), (727, p2, 789], [803, p2, 828), [912, p2, 934], (1011, p2, 1025), (1075, p2, 1078], (1086, p2, 1152], (1223, p2, 1235], (1295, p2, 1328], [1376, p2, 1442], (1489, p2, 1531], (1604, p2, 1668), [1672, p2, 1735), [1785, p2, 1830), (1898, p2, oo)} union(s1, s2): {[9, p1, 66), [66, p2, 110], (140, p2, 165), [194, p1, 243), [243, p2, 327), [329, p1, 389), [397, p1, 460], (460, p2, 520], [540, p1, 552], (552, p2, 575), [575, p1, 632), [632, p2, 672], (672, p1, 727], (727, p2, 738), [738, p1, 793], (799, p1, 830), [890, p1, 893), [912, p2, 934], [951, p1, 985), (1011, p2, 1025), [1043, p1, 1061), (1075, p2, 1078], (1086, p2, 1152], [1159, p1, 1173], (1182, p1, 1217), (1223, p2, 1235], (1295, p2, 1301], (1301, p1, 1356], [1376, p2, 1411], (1411, p1, 1487), (1489, p2, 1531], (1544, p1, 1562], [1601, p1, 1672), [1672, p2, 1735), [1785, p2, 1830), (1898, p2, oo)} s1: {[60, p1, 86], [110, p1, 150), [155, p1, 251), [335, p1, 398), (441, p1, 448), [449, p1, 457], [544, p1, 552], [562, p1, 582], [642, p1, 771), [834, p1, 911], [964, p1, 1009), [1092, p1, 1150], [1200, p1, 1277], [1356, p1, 1449), (1538, p1, 1598], (1694, p1, 1702), [1757, p1, 1784), (1848, p1, 1849), (1919, p1, 1927]} s2: {(-oo, p2, 17), (41, p2, 132], [141, p2, 156], [183, p2, 185], [194, p2, 283], [323, p2, 363], [397, p2, 426), (464, p2, 493), (506, p2, 528], (545, p2, 631), [686, p2, 750], [788, p2, 793), (827, p2, 873), (928, p2, 989), (1003, p2, 1054], (1062, p2, 1093), [1122, p2, 1162), (1209, p2, 1293), (1365, p2, 1410), (1503, p2, 1564], (1624, p2, 1628]} union(s1, s2): {(-oo, p2, 17), (41, p2, 110), [110, p1, 141), [141, p2, 155), [155, p1, 194), [194, p2, 283], [323, p2, 335), [335, p1, 397), [397, p2, 426), (441, p1, 448), [449, p1, 457], (464, p2, 493), (506, p2, 528], [544, p1, 545], (545, p2, 631), [642, p1, 771), [788, p2, 793), (827, p2, 834), [834, p1, 911], (928, p2, 964), [964, p1, 1003], (1003, p2, 1054], (1062, p2, 1092), [1092, p1, 1122), [1122, p2, 1162), [1200, p1, 1209], (1209, p2, 1293), [1356, p1, 1449), (1503, p2, 1538], (1538, p1, 1598], (1624, p2, 1628], (1694, p1, 1702), [1757, p1, 1784), (1848, p1, 1849), (1919, p1, 1927]} s1: {(-oo, p1, 90), [107, p1, 156), (198, p1, 229], [233, p1, 259], (303, p1, 344), (366, p1, 513], (529, p1, 606], (681, p1, 772), (794, p1, 842), [923, p1, 955], [1032, p1, 1096], (1162, p1, 1214], [1236, p1, 1251], (1348, p1, 1444], [1537, p1, 1596], (1663, p1, 1746], (1801, p1, 1872), (1881, p1, 1932), (2017, p1, 2066], [2125, p1, 2168]} s2: {[67, p2, 165), [192, p2, 228], (250, p2, 257], (270, p2, 362], [453, p2, 547], (646, p2, 681], [770, p2, 843), [847, p2, 870], (891, p2, 892), (918, p2, 995), [1083, p2, 1151], [1211, p2, 1245), [1310, p2, 1313), (1323, p2, 1340), [1416, p2, 1444], [1478, p2, 1480], [1491, p2, 1494), [1561, p2, 1566), (1628, p2, 1703]} union(s1, s2): {(-oo, p1, 67), [67, p2, 165), [192, p2, 198], (198, p1, 229], [233, p1, 259], (270, p2, 362], (366, p1, 453), [453, p2, 529], (529, p1, 606], (646, p2, 681], (681, p1, 770), [770, p2, 843), [847, p2, 870], (891, p2, 892), (918, p2, 995), [1032, p1, 1083), [1083, p2, 1151], (1162, p1, 1211), [1211, p2, 1236), [1236, p1, 1251], [1310, p2, 1313), (1323, p2, 1340), (1348, p1, 1444], [1478, p2, 1480], [1491, p2, 1494), [1537, p1, 1596], (1628, p2, 1663], (1663, p1, 1746], (1801, p1, 1872), (1881, p1, 1932), (2017, p1, 2066], [2125, p1, 2168]} s1: {(-oo, p1, 151], [230, p1, 298], [332, p1, 370), (381, p1, 457), (489, p1, 581), [663, p1, 698), (754, p1, 853), [948, p1, 971), (980, p1, 1032], [1113, p1, 1212), (1301, p1, 1384], [1481, p1, 1565), [1624, p1, 1720], (1755, p1, 1781], (1851, p1, 1871], [1872, p1, 1897], (1921, p1, 2020), (2072, p1, 2133], (2192, p1, 2288], (2346, p1, 2360], (2391, p1, 2474)} s2: {(2, p2, 96], [176, p2, 236], (299, p2, 370], (394, p2, 482], [500, p2, 596], [693, p2, 712], [717, p2, 725), (796, p2, 830), (837, p2, 854], (922, p2, 944], [984, p2, 1011], (1108, p2, 1190), (1212, p2, 1267), (1345, p2, 1441), (1491, p2, 1508), [1550, p2, 1642), [1739, p2, 1805), (1885, p2, 1952], [1956, p2, 1999), (2030, p2, 2076)} union(s1, s2): {(-oo, p1, 151], [176, p2, 230), [230, p1, 298], (299, p2, 370], (381, p1, 394], (394, p2, 482], (489, p1, 500), [500, p2, 596], [663, p1, 693), [693, p2, 712], [717, p2, 725), (754, p1, 837], (837, p2, 854], (922, p2, 944], [948, p1, 971), (980, p1, 1032], (1108, p2, 1113), [1113, p1, 1212), (1212, p2, 1267), (1301, p1, 1345], (1345, p2, 1441), [1481, p1, 1550), [1550, p2, 1624), [1624, p1, 1720], [1739, p2, 1805), (1851, p1, 1871], [1872, p1, 1885], (1885, p2, 1921], (1921, p1, 2020), (2030, p2, 2072], (2072, p1, 2133], (2192, p1, 2288], (2346, p1, 2360], (2391, p1, 2474)} s1: {(-oo, p1, -67), [29, p1, 77], (107, p1, 153], [169, p1, 196], (274, p1, 344], [408, p1, 435), (479, p1, 540], [623, p1, 668], (685, p1, 715], (799, p1, 818), (846, p1, 905], [957, p1, 1016], [1045, p1, 1078), (1119, p1, 1131], [1160, p1, 1208), [1266, p1, 1317], [1388, p1, 1392], (1439, p1, 1502), (1565, p1, 1638], (1649, p1, 1683], [1685, p1, 1697)} s2: {(-oo, p2, 33], (54, p2, 137), (150, p2, 204], (291, p2, 373), [442, p2, 451), [453, p2, 485], [569, p2, 579], [639, p2, 719], (816, p2, 850], [914, p2, 964), (1058, p2, 1130], [1215, p2, 1225], [1245, p2, 1322), [1324, p2, 1419], (1457, p2, 1555], [1595, p2, 1627), [1657, p2, 1658), [1663, p2, 1693], [1779, p2, 1827], [1912, p2, 1969], [2029, p2, 2077)} union(s1, s2): {(-oo, p2, 29), [29, p1, 54], (54, p2, 107], (107, p1, 150], (150, p2, 204], (274, p1, 291], (291, p2, 373), [408, p1, 435), [442, p2, 451), [453, p2, 479], (479, p1, 540], [569, p2, 579], [623, p1, 639), [639, p2, 719], (799, p1, 816], (816, p2, 846], (846, p1, 905], [914, p2, 957), [957, p1, 1016], [1045, p1, 1058], (1058, p2, 1119], (1119, p1, 1131], [1160, p1, 1208), [1215, p2, 1225], [1245, p2, 1322), [1324, p2, 1419], (1439, p1, 1457], (1457, p2, 1555], (1565, p1, 1638], (1649, p1, 1663), [1663, p2, 1685), [1685, p1, 1697), [1779, p2, 1827], [1912, p2, 1969], [2029, p2, 2077)} s1: {[-9, p1, 42), (82, p1, 142], [209, p1, 257), (273, p1, 358], [438, p1, 480), (552, p1, 568), (632, p1, 694], [705, p1, 800), [837, p1, 876], (931, p1, 972], (1041, p1, 1044], (1076, p1, 1099], [1194, p1, 1270], [1365, p1, 1421), [1491, p1, 1584), [1592, p1, 1649], [1692, p1, 1707), (1728, p1, 1774], (1853, p1, 1897), (1910, p1, 1957]} s2: {(-oo, p2, 111), (199, p2, 234), (283, p2, 290), (388, p2, 428], (514, p2, 515), (598, p2, 678], (692, p2, 731), (765, p2, 847), [859, p2, 878), (959, p2, 973], [1060, p2, 1119], [1148, p2, 1228), [1280, p2, 1347], (1356, p2, 1364), (1381, p2, 1399), (1466, p2, 1538), [1587, p2, 1608], (1650, p2, 1651], (1741, p2, 1815), (1857, p2, 1926], [1971, p2, 2038)} union(s1, s2): {(-oo, p2, 82], (82, p1, 142], (199, p2, 209), [209, p1, 257), (273, p1, 358], (388, p2, 428], [438, p1, 480), (514, p2, 515), (552, p1, 568), (598, p2, 632], (632, p1, 692], (692, p2, 705), [705, p1, 765], (765, p2, 837), [837, p1, 859), [859, p2, 878), (931, p1, 959], (959, p2, 973], (1041, p1, 1044], [1060, p2, 1119], [1148, p2, 1194), [1194, p1, 1270], [1280, p2, 1347], (1356, p2, 1364), [1365, p1, 1421), (1466, p2, 1491), [1491, p1, 1584), [1587, p2, 1592), [1592, p1, 1649], (1650, p2, 1651], [1692, p1, 1707), (1728, p1, 1741], (1741, p2, 1815), (1853, p1, 1857], (1857, p2, 1910], (1910, p1, 1957], [1971, p2, 2038)} s1: {[228, p1, 314), (332, p1, 410), [486, p1, 491], (558, p1, 617], (711, p1, 785], (853, p1, 926), [1014, p1, 1068], (1086, p1, 1115), (1138, p1, 1185), (1254, p1, 1266), [1361, p1, 1394], (1418, p1, 1450], (1527, p1, 1606), [1614, p1, 1685], [1691, p1, 1757], [1854, p1, 1942), [1996, p1, 2019), [2028, p1, 2112), (2119, p1, 2202], [2253, p1, 2291)} s2: {(-oo, p2, 17], (80, p2, 95), [188, p2, 192), [291, p2, 303), [334, p2, 408], [438, p2, 479), [548, p2, 678), [736, p2, 818), [835, p2, 848], [928, p2, 1012), [1018, p2, 1085], [1134, p2, 1223), [1281, p2, 1369], [1464, p2, 1466), [1516, p2, 1601], [1657, p2, 1667), (1685, p2, 1744), (1774, p2, 1820), [1918, p2, 1987], (2071, p2, 2143]} union(s1, s2): {(-oo, p2, 17], (80, p2, 95), [188, p2, 192), [228, p1, 314), (332, p1, 410), [438, p2, 479), [486, p1, 491], [548, p2, 678), (711, p1, 736), [736, p2, 818), [835, p2, 848], (853, p1, 926), [928, p2, 1012), [1014, p1, 1018), [1018, p2, 1085], (1086, p1, 1115), [1134, p2, 1223), (1254, p1, 1266), [1281, p2, 1361), [1361, p1, 1394], (1418, p1, 1450], [1464, p2, 1466), [1516, p2, 1527], (1527, p1, 1606), [1614, p1, 1685], (1685, p2, 1691), [1691, p1, 1757], (1774, p2, 1820), [1854, p1, 1918), [1918, p2, 1987], [1996, p1, 2019), [2028, p1, 2071], (2071, p2, 2119], (2119, p1, 2202], [2253, p1, 2291)} s1: {[152, p1, 180), [223, p1, 224), (261, p1, 316], (371, p1, 464), [478, p1, 518], (599, p1, 640], [653, p1, 690], [723, p1, 817], [879, p1, 911], [983, p1, 1027), [1052, p1, 1123], [1217, p1, 1263], [1299, p1, 1303), (1307, p1, 1357], (1436, p1, 1438], [1501, p1, 1579], (1601, p1, 1664), (1748, p1, 1759], [1821, p1, 1833], [1838, p1, 1932)} s2: {(-oo, p2, -41), (-27, p2, 50), (123, p2, 213), (213, p2, 291], [364, p2, 412), (495, p2, 584), (603, p2, 630], [662, p2, 757], (797, p2, 825], (828, p2, 876), (910, p2, 959], (1051, p2, 1053), [1096, p2, 1147], [1198, p2, 1208], [1231, p2, 1319), (1319, p2, 1406], (1444, p2, 1445), [1473, p2, 1474], (1573, p2, 1645], [1711, p2, 1762), [1811, p2, 1851), (1877, p2, oo)} union(s1, s2): {(-oo, p2, -41), (-27, p2, 50), (123, p2, 213), (213, p2, 261], (261, p1, 316], [364, p2, 371], (371, p1, 464), [478, p1, 495], (495, p2, 584), (599, p1, 640], [653, p1, 662), [662, p2, 723), [723, p1, 797], (797, p2, 825], (828, p2, 876), [879, p1, 910], (910, p2, 959], [983, p1, 1027), (1051, p2, 1052), [1052, p1, 1096), [1096, p2, 1147], [1198, p2, 1208], [1217, p1, 1231), [1231, p2, 1307], (1307, p1, 1319], (1319, p2, 1406], (1436, p1, 1438], (1444, p2, 1445), [1473, p2, 1474], [1501, p1, 1573], (1573, p2, 1601], (1601, p1, 1664), [1711, p2, 1762), [1811, p2, 1838), [1838, p1, 1877], (1877, p2, oo)} s1: {(-oo, p1, 240), (319, p1, 334), (365, p1, 409), [433, p1, 482], (539, p1, 581), (619, p1, 634), (642, p1, 667), [747, p1, 843), [926, p1, 957], (978, p1, 986], [995, p1, 1020), [1056, p1, 1091], [1187, p1, 1190), [1193, p1, 1231), [1299, p1, 1336), (1381, p1, 1393], [1394, p1, 1401), [1493, p1, 1576], [1629, p1, 1671), [1686, p1, 1687), [1710, p1, 1786), [1801, p1, oo)} s2: {[-78, p2, -12), (-10, p2, -3], (25, p2, 27], [55, p2, 136], (190, p2, 202), (273, p2, 338], [361, p2, 364], (403, p2, 422], [521, p2, 604], [651, p2, 746), [813, p2, 816), [856, p2, 902), (911, p2, 1006), [1056, p2, 1089), (1120, p2, 1207), (1284, p2, 1314), (1367, p2, 1425), (1434, p2, 1485], [1576, p2, 1651), [1745, p2, 1761)} union(s1, s2): {(-oo, p1, 240), (273, p2, 338], [361, p2, 364], (365, p1, 403], (403, p2, 422], [433, p1, 482], [521, p2, 604], (619, p1, 634), (642, p1, 651), [651, p2, 746), [747, p1, 843), [856, p2, 902), (911, p2, 995), [995, p1, 1020), [1056, p1, 1091], (1120, p2, 1193), [1193, p1, 1231), (1284, p2, 1299), [1299, p1, 1336), (1367, p2, 1425), (1434, p2, 1485], [1493, p1, 1576), [1576, p2, 1629), [1629, p1, 1671), [1686, p1, 1687), [1710, p1, 1786), [1801, p1, oo)} s1: {(-oo, p1, 143], [216, p1, 315], [381, p1, 448], [493, p1, 495), (542, p1, 543], [564, p1, 592), [612, p1, 683], [774, p1, 804], (851, p1, 852), (911, p1, 928), [962, p1, 1036), [1082, p1, 1168), (1198, p1, 1211], [1257, p1, 1284), (1341, p1, 1420], [1519, p1, 1587), [1588, p1, 1659), [1664, p1, 1710), (1776, p1, 1801], (1881, p1, 1960), (1992, p1, 1993)} s2: {(-22, p2, -4), (22, p2, 94], (157, p2, 201), (209, p2, 259], [305, p2, 359], [427, p2, 453), (526, p2, 617), [652, p2, 694), (701, p2, 720], (746, p2, 753), (819, p2, 912), [972, p2, 1042], (1134, p2, 1204), (1293, p2, 1455], (1458, p2, 1550], [1624, p2, 1648), (1728, p2, 1790], [1871, p2, 1884), [1936, p2, 1941]} union(s1, s2): {(-oo, p1, 143], (157, p2, 201), (209, p2, 216), [216, p1, 305), [305, p2, 359], [381, p1, 427), [427, p2, 453), [493, p1, 495), (526, p2, 612), [612, p1, 652), [652, p2, 694), (701, p2, 720], (746, p2, 753), [774, p1, 804], (819, p2, 911], (911, p1, 928), [962, p1, 972), [972, p2, 1042], [1082, p1, 1134], (1134, p2, 1198], (1198, p1, 1211], [1257, p1, 1284), (1293, p2, 1455], (1458, p2, 1519), [1519, p1, 1587), [1588, p1, 1659), [1664, p1, 1710), (1728, p2, 1776], (1776, p1, 1801], [1871, p2, 1881], (1881, p1, 1960), (1992, p1, 1993)} s1: {(-oo, p1, 33], (104, p1, 192], [252, p1, 347), [412, p1, 482), [564, p1, 592), [659, p1, 666), (748, p1, 845], (940, p1, 1023), [1118, p1, 1200], [1257, p1, 1265), [1294, p1, 1295), [1393, p1, 1476], [1563, p1, 1566), (1610, p1, 1663], (1761, p1, 1826), (1902, p1, 1905], [1932, p1, 1963), (2059, p1, 2061], (2138, p1, 2163], (2261, p1, 2284], (2300, p1, 2341)} s2: {[262, p2, 297], [301, p2, 321], [330, p2, 401], (444, p2, 473), [495, p2, 517], [556, p2, 620], (665, p2, 762], [795, p2, 886), (893, p2, 916], (930, p2, 993), (1031, p2, 1043], [1075, p2, 1173), (1270, p2, 1336], [1428, p2, 1430], (1480, p2, 1555], [1606, p2, 1609), (1707, p2, 1711], [1743, p2, 1748), [1765, p2, 1781), (1836, p2, 1908]} union(s1, s2): {(-oo, p1, 33], (104, p1, 192], [252, p1, 330), [330, p2, 401], [412, p1, 482), [495, p2, 517], [556, p2, 620], [659, p1, 665], (665, p2, 748], (748, p1, 795), [795, p2, 886), (893, p2, 916], (930, p2, 940], (940, p1, 1023), (1031, p2, 1043], [1075, p2, 1118), [1118, p1, 1200], [1257, p1, 1265), (1270, p2, 1336], [1393, p1, 1476], (1480, p2, 1555], [1563, p1, 1566), [1606, p2, 1609), (1610, p1, 1663], (1707, p2, 1711], [1743, p2, 1748), (1761, p1, 1826), (1836, p2, 1908], [1932, p1, 1963), (2059, p1, 2061], (2138, p1, 2163], (2261, p1, 2284], (2300, p1, 2341)} s1: {[216, p1, 289], (383, p1, 467), [564, p1, 622), (689, p1, 702], [706, p1, 708), [794, p1, 795), [835, p1, 888], [940, p1, 981], [1053, p1, 1132), (1209, p1, 1261), (1293, p1, 1361), (1363, p1, 1398), [1419, p1, 1460], [1463, p1, 1509], (1535, p1, 1544), [1609, p1, 1687), [1737, p1, 1790), [1870, p1, 1959], (1974, p1, 2046], (2132, p1, 2141], [2189, p1, oo)} s2: {(-oo, p2, -61), [25, p2, 58], (60, p2, 95], [102, p2, 120], [196, p2, 231], [312, p2, 355], (444, p2, 448), [516, p2, 607], [624, p2, 718), (724, p2, 768), (865, p2, 960], [963, p2, 1036), [1048, p2, 1077], (1099, p2, 1151], (1208, p2, 1303), [1393, p2, 1433], (1527, p2, 1608], [1630, p2, 1646], (1647, p2, 1675], (1725, p2, 1779], (1829, p2, 1908]} union(s1, s2): {(-oo, p2, -61), [25, p2, 58], (60, p2, 95], [102, p2, 120], [196, p2, 216), [216, p1, 289], [312, p2, 355], (383, p1, 467), [516, p2, 564), [564, p1, 622), [624, p2, 718), (724, p2, 768), [794, p1, 795), [835, p1, 865], (865, p2, 940), [940, p1, 963), [963, p2, 1036), [1048, p2, 1053), [1053, p1, 1099], (1099, p2, 1151], (1208, p2, 1293], (1293, p1, 1361), (1363, p1, 1393), [1393, p2, 1419), [1419, p1, 1460], [1463, p1, 1509], (1527, p2, 1608], [1609, p1, 1687), (1725, p2, 1737), [1737, p1, 1790), (1829, p2, 1870), [1870, p1, 1959], (1974, p1, 2046], (2132, p1, 2141], [2189, p1, oo)} s1: {(211, p1, 233), (307, p1, 326], (357, p1, 364), (412, p1, 486), [530, p1, 571], (588, p1, 594], [662, p1, 729), [767, p1, 819), [893, p1, 957), (991, p1, 1016], (1019, p1, 1117), [1142, p1, 1168), [1170, p1, 1185), (1254, p1, 1306], (1328, p1, 1399], [1419, p1, 1452), [1499, p1, 1562), (1618, p1, 1647), (1697, p1, 1778), [1812, p1, 1870)} s2: {(-74, p2, -7], [68, p2, 87), (149, p2, 199), (273, p2, 299], (391, p2, 447], (475, p2, 507], [579, p2, 658], (756, p2, 776), (869, p2, 873), [932, p2, 984), (1076, p2, 1104], [1170, p2, 1255), (1348, p2, 1447], (1489, p2, 1561), [1657, p2, 1677], (1769, p2, 1842], [1878, p2, 1960], [2051, p2, 2094), (2138, p2, 2173], (2262, p2, 2336]} union(s1, s2): {(-74, p2, -7], [68, p2, 87), (149, p2, 199), (211, p1, 233), (273, p2, 299], (307, p1, 326], (357, p1, 364), (391, p2, 412], (412, p1, 475], (475, p2, 507], [530, p1, 571], [579, p2, 658], [662, p1, 729), (756, p2, 767), [767, p1, 819), (869, p2, 873), [893, p1, 932), [932, p2, 984), (991, p1, 1016], (1019, p1, 1117), [1142, p1, 1168), [1170, p2, 1254], (1254, p1, 1306], (1328, p1, 1348], (1348, p2, 1419), [1419, p1, 1452), (1489, p2, 1499), [1499, p1, 1562), (1618, p1, 1647), [1657, p2, 1677], (1697, p1, 1769], (1769, p2, 1812), [1812, p1, 1870), [1878, p2, 1960], [2051, p2, 2094), (2138, p2, 2173], (2262, p2, 2336]} s1: {(-oo, p1, 71], [167, p1, 263], [324, p1, 344], (403, p1, 488], [582, p1, 592), [609, p1, 691], (692, p1, 738), [837, p1, 883), (932, p1, 983], [1042, p1, 1060], (1150, p1, 1173), (1243, p1, 1329], (1338, p1, 1359], (1386, p1, 1474], [1513, p1, 1607], [1645, p1, 1682], (1716, p1, 1800], (1849, p1, 1883], [1895, p1, 1940), (2038, p1, 2039), (2052, p1, 2066)} s2: {(139, p2, 148), [155, p2, 252], (309, p2, 321), [367, p2, 422], (486, p2, 563), [581, p2, 616], [711, p2, 723), (746, p2, 789), [836, p2, 892), [899, p2, 985), [1007, p2, 1068), [1092, p2, 1151), (1194, p2, 1216], [1268, p2, 1306), (1361, p2, 1414], [1455, p2, 1541), (1542, p2, 1548], (1637, p2, 1681), (1736, p2, 1808), (1860, p2, 1874)} union(s1, s2): {(-oo, p1, 71], (139, p2, 148), [155, p2, 167), [167, p1, 263], (309, p2, 321), [324, p1, 344], [367, p2, 403], (403, p1, 486], (486, p2, 563), [581, p2, 609), [609, p1, 691], (692, p1, 738), (746, p2, 789), [836, p2, 892), [899, p2, 985), [1007, p2, 1068), [1092, p2, 1150], (1150, p1, 1173), (1194, p2, 1216], (1243, p1, 1329], (1338, p1, 1359], (1361, p2, 1386], (1386, p1, 1455), [1455, p2, 1513), [1513, p1, 1607], (1637, p2, 1645), [1645, p1, 1682], (1716, p1, 1736], (1736, p2, 1808), (1849, p1, 1883], [1895, p1, 1940), (2038, p1, 2039), (2052, p1, 2066)} s1: {(-oo, p1, 111), (172, p1, 264), [335, p1, 403), [415, p1, 443), (475, p1, 498), [504, p1, 525), [546, p1, 556], (596, p1, 675], (744, p1, 794], (887, p1, 964], [980, p1, 1048), (1049, p1, 1073], (1168, p1, 1226], (1240, p1, 1287), (1350, p1, 1394], (1444, p1, 1538), [1589, p1, 1669), (1756, p1, 1792], [1811, p1, 1817], (1822, p1, 1848], [1914, p1, 1951), (2022, p1, oo)} s2: {[180, p2, 242), [341, p2, 376), [474, p2, 491], (590, p2, 679), (745, p2, 749], (765, p2, 792), [843, p2, 871], (915, p2, 962], [1036, p2, 1094), (1173, p2, 1208), [1231, p2, 1324], (1363, p2, 1437], (1453, p2, 1529), [1605, p2, 1644], [1726, p2, 1803), [1824, p2, 1895), (1904, p2, 1984), (2070, p2, 2097), [2125, p2, 2167], (2263, p2, 2271), (2317, p2, oo)} union(s1, s2): {(-oo, p1, 111), (172, p1, 264), [335, p1, 403), [415, p1, 443), [474, p2, 475], (475, p1, 498), [504, p1, 525), [546, p1, 556], (590, p2, 679), (744, p1, 794], [843, p2, 871], (887, p1, 964], [980, p1, 1036), [1036, p2, 1094), (1168, p1, 1226], [1231, p2, 1324], (1350, p1, 1363], (1363, p2, 1437], (1444, p1, 1538), [1589, p1, 1669), [1726, p2, 1803), [1811, p1, 1817], (1822, p1, 1824), [1824, p2, 1895), (1904, p2, 1984), (2022, p1, oo)} s1: {(-183, p1, -87), (-64, p1, -41], [-40, p1, -12), (72, p1, 169], (236, p1, 288], [299, p1, 318], [338, p1, 421), [432, p1, 480), [540, p1, 636), [734, p1, 816), (825, p1, 917), [988, p1, 1046), (1052, p1, 1109), [1198, p1, 1230), (1323, p1, 1385], (1459, p1, 1555], (1621, p1, 1697), (1710, p1, 1761), (1787, p1, 1874), (1923, p1, 1942]} s2: {(-oo, p2, -114), [-43, p2, 6), (73, p2, 120), (121, p2, 153), [175, p2, 274], [316, p2, 323), [336, p2, 409], [438, p2, 527], [573, p2, 621], [641, p2, 695), [792, p2, 841], [843, p2, 861], [910, p2, 920), (959, p2, 1042], (1069, p2, 1133), (1185, p2, 1192], (1251, p2, 1321), (1325, p2, 1337), [1374, p2, 1430), (1477, p2, 1483], (1549, p2, 1590), (1683, p2, oo)} union(s1, s2): {(-oo, p2, -183], (-183, p1, -87), (-64, p1, -43), [-43, p2, 6), (72, p1, 169], [175, p2, 236], (236, p1, 288], [299, p1, 316), [316, p2, 323), [336, p2, 338), [338, p1, 421), [432, p1, 438), [438, p2, 527], [540, p1, 636), [641, p2, 695), [734, p1, 792), [792, p2, 825], (825, p1, 910), [910, p2, 920), (959, p2, 988), [988, p1, 1046), (1052, p1, 1069], (1069, p2, 1133), (1185, p2, 1192], [1198, p1, 1230), (1251, p2, 1321), (1323, p1, 1374), [1374, p2, 1430), (1459, p1, 1549], (1549, p2, 1590), (1621, p1, 1683], (1683, p2, oo)} s1: {[-120, p1, -68), [-24, p1, 54], [94, p1, 146], (245, p1, 318], [391, p1, 429], (499, p1, 541], (545, p1, 638], (733, p1, 742), [799, p1, 831], (835, p1, 867], [933, p1, 941), [1000, p1, 1052), (1109, p1, 1127], [1207, p1, 1280], (1311, p1, 1325], [1376, p1, 1417), (1451, p1, 1545), (1604, p1, 1681), [1713, p1, 1748), (1748, p1, 1799)} s2: {(-oo, p2, -151), [-144, p2, -95), (-73, p2, 12], [98, p2, 179), [277, p2, 362], (424, p2, 456], [475, p2, 542), (617, p2, 623), (710, p2, 720), [743, p2, 791), [818, p2, 858], [957, p2, 958), [978, p2, 1066), [1134, p2, 1206], (1236, p2, 1253], [1313, p2, 1329), [1394, p2, 1399), (1441, p2, 1463], (1522, p2, 1558), [1628, p2, 1723], [1814, p2, 1876], (1907, p2, oo)} union(s1, s2): {(-oo, p2, -151), [-144, p2, -120), [-120, p1, -73], (-73, p2, -24), [-24, p1, 54], [94, p1, 98), [98, p2, 179), (245, p1, 277), [277, p2, 362], [391, p1, 424], (424, p2, 456], [475, p2, 542), (545, p1, 638], (710, p2, 720), (733, p1, 742), [743, p2, 791), [799, p1, 818), [818, p2, 835], (835, p1, 867], [933, p1, 941), [957, p2, 958), [978, p2, 1066), (1109, p1, 1127], [1134, p2, 1206], [1207, p1, 1280], (1311, p1, 1313), [1313, p2, 1329), [1376, p1, 1417), (1441, p2, 1451], (1451, p1, 1522], (1522, p2, 1558), (1604, p1, 1628), [1628, p2, 1713), [1713, p1, 1748), (1748, p1, 1799), [1814, p2, 1876], (1907, p2, oo)} s1: {(-oo, p1, 19], [37, p1, 87], (130, p1, 150), (211, p1, 296), (357, p1, 360], (368, p1, 393), [486, p1, 583), (673, p1, 736), (766, p1, 778], (829, p1, 849), [898, p1, 911), (926, p1, 1004), [1020, p1, 1115], [1124, p1, 1217), (1230, p1, 1238), [1294, p1, 1328], (1416, p1, 1439], [1500, p1, 1587], (1628, p1, 1652], [1680, p1, 1725], (1797, p1, 1887]} s2: {(-oo, p2, 196], [209, p2, 257), (349, p2, 351], [393, p2, 486], [521, p2, 524], (545, p2, 563), [651, p2, 659], (693, p2, 785], (856, p2, 945], [1036, p2, 1076), (1081, p2, 1149), (1217, p2, 1259], [1311, p2, 1332], (1388, p2, 1467], [1472, p2, 1516], [1601, p2, 1656], (1745, p2, 1796], (1800, p2, 1839), [1912, p2, 1949], [1975, p2, 1983], (2077, p2, 2141], [2187, p2, oo)} union(s1, s2): {(-oo, p2, 196], [209, p2, 211], (211, p1, 296), (349, p2, 351], (357, p1, 360], (368, p1, 393), [393, p2, 486), [486, p1, 583), [651, p2, 659], (673, p1, 693], (693, p2, 785], (829, p1, 849), (856, p2, 926], (926, p1, 1004), [1020, p1, 1081], (1081, p2, 1124), [1124, p1, 1217), (1217, p2, 1259], [1294, p1, 1311), [1311, p2, 1332], (1388, p2, 1467], [1472, p2, 1500), [1500, p1, 1587], [1601, p2, 1656], [1680, p1, 1725], (1745, p2, 1796], (1797, p1, 1887], [1912, p2, 1949], [1975, p2, 1983], (2077, p2, 2141], [2187, p2, oo)} s1: {[189, p1, 222), [272, p1, 304), [358, p1, 412), (433, p1, 439), [525, p1, 548), (602, p1, 664], [673, p1, 717), (781, p1, 857], [864, p1, 898], [992, p1, 1075), [1093, p1, 1124), (1157, p1, 1182], (1260, p1, 1309), [1330, p1, 1406), [1429, p1, 1508], (1529, p1, 1606), [1608, p1, 1643), (1689, p1, 1762], [1786, p1, 1840]} s2: {(184, p2, 237), (297, p2, 396], [412, p2, 419], (470, p2, 479], [548, p2, 555), (626, p2, 702], (710, p2, 795], [819, p2, 832), (885, p2, 890), (895, p2, 947), [955, p2, 1016), (1115, p2, 1154], (1221, p2, 1237), [1262, p2, 1331], [1341, p2, 1402], [1484, p2, 1492], [1527, p2, 1528], (1539, p2, 1563), (1573, p2, 1594], (1651, p2, 1708]} union(s1, s2): {(184, p2, 237), [272, p1, 297], (297, p2, 358), [358, p1, 412), [412, p2, 419], (433, p1, 439), (470, p2, 479], [525, p1, 548), [548, p2, 555), (602, p1, 626], (626, p2, 673), [673, p1, 710], (710, p2, 781], (781, p1, 857], [864, p1, 895], (895, p2, 947), [955, p2, 992), [992, p1, 1075), [1093, p1, 1115], (1115, p2, 1154], (1157, p1, 1182], (1221, p2, 1237), (1260, p1, 1262), [1262, p2, 1330), [1330, p1, 1406), [1429, p1, 1508], [1527, p2, 1528], (1529, p1, 1606), [1608, p1, 1643), (1651, p2, 1689], (1689, p1, 1762], [1786, p1, 1840]} s1: {(42, p1, 110], [194, p1, 271], (350, p1, 425), [467, p1, 531], (590, p1, 608), (608, p1, 653), (743, p1, 793), (852, p1, 887], [911, p1, 971), (975, p1, 985], (1077, p1, 1103), (1157, p1, 1194], (1218, p1, 1255), [1296, p1, 1322], [1411, p1, 1449], (1480, p1, 1573], (1657, p1, 1722], [1753, p1, 1786], (1822, p1, 1855), [1944, p1, 1977)} s2: {[12, p2, 107), [168, p2, 168], [264, p2, 284], [300, p2, 378), (411, p2, 502], (523, p2, 619], (718, p2, 719), [815, p2, 896], (904, p2, 905], (909, p2, 950], (965, p2, 997], [1067, p2, 1111], [1171, p2, 1201), (1251, p2, 1277), (1364, p2, 1420], (1484, p2, 1505), (1587, p2, 1658), (1722, p2, 1788], [1799, p2, 1895), [1953, p2, 1977), [2048, p2, oo)} union(s1, s2): {[12, p2, 42], (42, p1, 110], [168, p2, 168], [194, p1, 264), [264, p2, 284], [300, p2, 350], (350, p1, 411], (411, p2, 467), [467, p1, 523], (523, p2, 608], (608, p1, 653), (718, p2, 719), (743, p1, 793), [815, p2, 896], (904, p2, 905], (909, p2, 911), [911, p1, 965], (965, p2, 997], [1067, p2, 1111], (1157, p1, 1171), [1171, p2, 1201), (1218, p1, 1251], (1251, p2, 1277), [1296, p1, 1322], (1364, p2, 1411), [1411, p1, 1449], (1480, p1, 1573], (1587, p2, 1657], (1657, p1, 1722], (1722, p2, 1788], [1799, p2, 1895), [1944, p1, 1977), [2048, p2, oo)} s1: {(-oo, p1, -52], [-36, p1, -11), (22, p1, 108], [147, p1, 166], (249, p1, 257), [331, p1, 375), [420, p1, 517], [535, p1, 580], [663, p1, 668), [684, p1, 704), [734, p1, 785], (802, p1, 858], [895, p1, 948], [968, p1, 1007], [1106, p1, 1156), (1156, p1, 1166], [1181, p1, 1239], (1306, p1, 1382), (1401, p1, 1463], [1519, p1, 1543], [1637, p1, 1659)} s2: {(-oo, p2, 3), [60, p2, 110], [117, p2, 186), (230, p2, 255), (281, p2, 319], (383, p2, 456], (471, p2, 541], (592, p2, 628), [664, p2, 731], (802, p2, 888), [946, p2, 1004], (1027, p2, 1118], [1211, p2, 1232], (1247, p2, 1305), (1323, p2, 1350), (1374, p2, 1462], [1488, p2, 1579), [1665, p2, 1748), [1798, p2, 1879], (1976, p2, 1995], (1996, p2, 2049), [2102, p2, oo)} union(s1, s2): {(-oo, p2, 3), (22, p1, 60), [60, p2, 110], [117, p2, 186), (230, p2, 249], (249, p1, 257), (281, p2, 319], [331, p1, 375), (383, p2, 420), [420, p1, 471], (471, p2, 535), [535, p1, 580], (592, p2, 628), [663, p1, 664), [664, p2, 731], [734, p1, 785], (802, p2, 888), [895, p1, 946), [946, p2, 968), [968, p1, 1007], (1027, p2, 1106), [1106, p1, 1156), (1156, p1, 1166], [1181, p1, 1239], (1247, p2, 1305), (1306, p1, 1374], (1374, p2, 1401], (1401, p1, 1463], [1488, p2, 1579), [1637, p1, 1659), [1665, p2, 1748), [1798, p2, 1879], (1976, p2, 1995], (1996, p2, 2049), [2102, p2, oo)} s1: {(-oo, p1, 114], [133, p1, 231], (241, p1, 323], [391, p1, 439), (457, p1, 485), [503, p1, 587), [596, p1, 627], (636, p1, 657), [735, p1, 780], [809, p1, 889], [920, p1, 952], (973, p1, 982), [994, p1, 1028], (1055, p1, 1130], [1224, p1, 1250), [1287, p1, 1335], (1408, p1, 1493), (1544, p1, 1563), (1582, p1, 1584], (1634, p1, 1666), (1713, p1, 1716)} s2: {(159, p2, 170], [243, p2, 301], [359, p2, 449], [510, p2, 605), (641, p2, 647], [711, p2, 751), [814, p2, 894), [905, p2, 1045], (1116, p2, 1159), (1211, p2, 1304), [1329, p2, 1338), [1346, p2, 1367), (1367, p2, 1381), [1403, p2, 1421], [1422, p2, 1459), (1538, p2, 1585], (1599, p2, 1600), (1631, p2, 1668), (1680, p2, 1702)} union(s1, s2): {(-oo, p1, 114], [133, p1, 231], (241, p1, 323], [359, p2, 449], (457, p1, 485), [503, p1, 510), [510, p2, 596), [596, p1, 627], (636, p1, 657), [711, p2, 735), [735, p1, 780], [809, p1, 814), [814, p2, 894), [905, p2, 1045], (1055, p1, 1116], (1116, p2, 1159), (1211, p2, 1287), [1287, p1, 1329), [1329, p2, 1338), [1346, p2, 1367), (1367, p2, 1381), [1403, p2, 1408], (1408, p1, 1493), (1538, p2, 1585], (1599, p2, 1600), (1631, p2, 1668), (1680, p2, 1702), (1713, p1, 1716)} s1: {[17, p1, 48), (139, p1, 226), [280, p1, 378), (417, p1, 437), [506, p1, 562), (600, p1, 618), (689, p1, 721), (731, p1, 805], [871, p1, 945), [1029, p1, 1029], [1089, p1, 1105], [1166, p1, 1235), [1256, p1, 1334), [1399, p1, 1478], (1571, p1, 1649), (1671, p1, 1686), [1725, p1, 1726), (1799, p1, 1808), [1867, p1, 1931), (2013, p1, 2014)} s2: {(-41, p2, 27), (36, p2, 76], (104, p2, 142], [163, p2, 200), (225, p2, 309], (312, p2, 373), (428, p2, 498), [577, p2, 659], (758, p2, 778), (827, p2, 953), (1034, p2, 1084], (1112, p2, 1120], [1136, p2, 1164), [1261, p2, 1358), (1386, p2, 1464], [1520, p2, 1617), [1669, p2, 1738), (1775, p2, 1869], (1939, p2, 1994], (2026, p2, oo)} union(s1, s2): {(-41, p2, 17), [17, p1, 36], (36, p2, 76], (104, p2, 139], (139, p1, 225], (225, p2, 280), [280, p1, 378), (417, p1, 428], (428, p2, 498), [506, p1, 562), [577, p2, 659], (689, p1, 721), (731, p1, 805], (827, p2, 953), [1029, p1, 1029], (1034, p2, 1084], [1089, p1, 1105], (1112, p2, 1120], [1136, p2, 1164), [1166, p1, 1235), [1256, p1, 1261), [1261, p2, 1358), (1386, p2, 1399), [1399, p1, 1478], [1520, p2, 1571], (1571, p1, 1649), [1669, p2, 1738), (1775, p2, 1867), [1867, p1, 1931), (1939, p2, 1994], (2013, p1, 2014), (2026, p2, oo)} s1: {(-oo, p1, 166], (202, p1, 237], [238, p1, 241], [279, p1, 330], [428, p1, 470], [556, p1, 611), [630, p1, 662), (701, p1, 714], (787, p1, 873), [883, p1, 892), [898, p1, 929), [1017, p1, 1074], [1135, p1, 1175), [1264, p1, 1316], [1371, p1, 1379), [1457, p1, 1499], (1503, p1, 1519], [1559, p1, 1567], (1593, p1, 1625], [1715, p1, 1808], [1885, p1, 1910], (1980, p1, oo)} s2: {(-oo, p2, -20), [-10, p2, 31], (69, p2, 90], [136, p2, 212], [223, p2, 285), (303, p2, 360), [457, p2, 512], (532, p2, 595), [687, p2, 691), [726, p2, 751), [828, p2, 830], (925, p2, 939], (953, p2, 1031], (1073, p2, 1077], (1137, p2, 1160], [1212, p2, 1234], (1285, p2, 1324), (1348, p2, 1382), [1419, p2, 1481], (1538, p2, 1593], (1625, p2, 1646)} union(s1, s2): {(-oo, p1, 136), [136, p2, 202], (202, p1, 223), [223, p2, 279), [279, p1, 303], (303, p2, 360), [428, p1, 457), [457, p2, 512], (532, p2, 556), [556, p1, 611), [630, p1, 662), [687, p2, 691), (701, p1, 714], [726, p2, 751), (787, p1, 873), [883, p1, 892), [898, p1, 925], (925, p2, 939], (953, p2, 1017), [1017, p1, 1073], (1073, p2, 1077], [1135, p1, 1175), [1212, p2, 1234], [1264, p1, 1285], (1285, p2, 1324), (1348, p2, 1382), [1419, p2, 1457), [1457, p1, 1499], (1503, p1, 1519], (1538, p2, 1593], (1593, p1, 1625], (1625, p2, 1646), [1715, p1, 1808], [1885, p1, 1910], (1980, p1, oo)} s1: {(210, p1, 241], [340, p1, 367), [448, p1, 545], [566, p1, 659], [714, p1, 777), (832, p1, 850), [931, p1, 999), (1026, p1, 1032), [1127, p1, 1199], [1272, p1, 1339], (1359, p1, 1429), [1444, p1, 1486], [1493, p1, 1522], (1530, p1, 1542), (1591, p1, 1592), [1664, p1, 1714), [1755, p1, 1800], [1897, p1, 1986), [2068, p1, 2082], [2119, p1, 2214)} s2: {(-2, p2, 0], (71, p2, 103], (186, p2, 231], (253, p2, 341], [413, p2, 496), [548, p2, 607), (645, p2, 684), [732, p2, 795], (828, p2, 882), [962, p2, 984], [1030, p2, 1084], [1154, p2, 1189], [1197, p2, 1216], (1272, p2, 1316), (1356, p2, 1409], [1430, p2, 1488], [1493, p2, 1521), [1602, p2, 1645), [1731, p2, 1818], (1891, p2, 1967)} union(s1, s2): {(-2, p2, 0], (71, p2, 103], (186, p2, 210], (210, p1, 241], (253, p2, 340), [340, p1, 367), [413, p2, 448), [448, p1, 545], [548, p2, 566), [566, p1, 645], (645, p2, 684), [714, p1, 732), [732, p2, 795], (828, p2, 882), [931, p1, 999), (1026, p1, 1030), [1030, p2, 1084], [1127, p1, 1197), [1197, p2, 1216], [1272, p1, 1339], (1356, p2, 1359], (1359, p1, 1429), [1430, p2, 1488], [1493, p1, 1522], (1530, p1, 1542), (1591, p1, 1592), [1602, p2, 1645), [1664, p1, 1714), [1731, p2, 1818], (1891, p2, 1897), [1897, p1, 1986), [2068, p1, 2082], [2119, p1, 2214)} s1: {[109, p1, 137], [208, p1, 248), [293, p1, 388], [443, p1, 476), [574, p1, 672), (726, p1, 737), (800, p1, 886], (966, p1, 1064], (1100, p1, 1117), [1216, p1, 1308), (1321, p1, 1353], [1395, p1, 1476), (1557, p1, 1589], [1607, p1, 1628], [1694, p1, 1735], [1824, p1, 1840), [1875, p1, 1885), (1946, p1, 2024), [2058, p1, 2094), (2188, p1, 2263]} s2: {(-oo, p2, 206), [219, p2, 261], [343, p2, 408), [445, p2, 454], (529, p2, 585), (595, p2, 613), [670, p2, 704], (709, p2, 759], [768, p2, 805], (883, p2, 907), (941, p2, 956), (970, p2, 982], (1007, p2, 1090), [1113, p2, 1201), (1258, p2, 1261), (1280, p2, 1283], [1295, p2, 1312), (1380, p2, 1429], (1457, p2, 1474), [1568, p2, 1640), (1659, p2, 1673], (1732, p2, oo)} union(s1, s2): {(-oo, p2, 206), [208, p1, 219), [219, p2, 261], [293, p1, 343), [343, p2, 408), [443, p1, 476), (529, p2, 574), [574, p1, 670), [670, p2, 704], (709, p2, 759], [768, p2, 800], (800, p1, 883], (883, p2, 907), (941, p2, 956), (966, p1, 1007], (1007, p2, 1090), (1100, p1, 1113), [1113, p2, 1201), [1216, p1, 1295), [1295, p2, 1312), (1321, p1, 1353], (1380, p2, 1395), [1395, p1, 1476), (1557, p1, 1568), [1568, p2, 1640), (1659, p2, 1673], [1694, p1, 1732], (1732, p2, oo)} s1: {(-oo, p1, 30], [109, p1, 136], (158, p1, 241], (327, p1, 423), (474, p1, 519), [552, p1, 637], (671, p1, 728], [796, p1, 888], (980, p1, 1076], (1085, p1, 1088], (1122, p1, 1200], (1204, p1, 1209), (1267, p1, 1306), (1327, p1, 1382], [1440, p1, 1495], (1528, p1, 1593), [1649, p1, 1732), [1829, p1, 1875], (1907, p1, 1977], [2074, p1, 2137), (2218, p1, 2298)} s2: {(-oo, p2, 172), (210, p2, 271], [358, p2, 388], (464, p2, 528), [581, p2, 651], (689, p2, 701), (772, p2, 867], [915, p2, 979], [1006, p2, 1102], (1144, p2, 1180], (1218, p2, 1259), (1287, p2, 1313], [1392, p2, 1401], (1475, p2, 1551], [1571, p2, 1612], [1613, p2, 1697), [1736, p2, 1763], (1844, p2, 1870), (1928, p2, 1976], (1978, p2, 2071], (2147, p2, 2201]} union(s1, s2): {(-oo, p2, 158], (158, p1, 210], (210, p2, 271], (327, p1, 423), (464, p2, 528), [552, p1, 581), [581, p2, 651], (671, p1, 728], (772, p2, 796), [796, p1, 888], [915, p2, 979], (980, p1, 1006), [1006, p2, 1102], (1122, p1, 1200], (1204, p1, 1209), (1218, p2, 1259), (1267, p1, 1287], (1287, p2, 1313], (1327, p1, 1382], [1392, p2, 1401], [1440, p1, 1475], (1475, p2, 1528], (1528, p1, 1571), [1571, p2, 1612], [1613, p2, 1649), [1649, p1, 1732), [1736, p2, 1763], [1829, p1, 1875], (1907, p1, 1977], (1978, p2, 2071], [2074, p1, 2137), (2147, p2, 2201], (2218, p1, 2298)} s1: {[-135, p1, -37), (33, p1, 74), (86, p1, 113), [200, p1, 217], (300, p1, 316), [365, p1, 403), [450, p1, 475], (566, p1, 582], (616, p1, 670], (757, p1, 773), [833, p1, 931], [999, p1, 1052], [1085, p1, 1160), [1196, p1, 1288], (1339, p1, 1403], [1485, p1, 1582], (1607, p1, 1706), [1763, p1, 1779), (1816, p1, 1908), (1947, p1, 2020), (2080, p1, oo)} s2: {(-oo, p2, -101], [-98, p2, -66], [7, p2, 63), [144, p2, 216), [231, p2, 239), (248, p2, 300], (373, p2, 418), (488, p2, 517], (576, p2, 583), (618, p2, 693), [745, p2, 805], (816, p2, 823), (882, p2, 925], [986, p2, 991), [1067, p2, 1105), [1157, p2, 1159), [1224, p2, 1287], (1352, p2, 1379), [1396, p2, 1411], [1502, p2, 1550), (1602, p2, 1608]} union(s1, s2): {(-oo, p2, -135), [-135, p1, -37), [7, p2, 33], (33, p1, 74), (86, p1, 113), [144, p2, 200), [200, p1, 217], [231, p2, 239), (248, p2, 300], (300, p1, 316), [365, p1, 373], (373, p2, 418), [450, p1, 475], (488, p2, 517], (566, p1, 576], (576, p2, 583), (616, p1, 618], (618, p2, 693), [745, p2, 805], (816, p2, 823), [833, p1, 931], [986, p2, 991), [999, p1, 1052], [1067, p2, 1085), [1085, p1, 1160), [1196, p1, 1288], (1339, p1, 1396), [1396, p2, 1411], [1485, p1, 1582], (1602, p2, 1607], (1607, p1, 1706), [1763, p1, 1779), (1816, p1, 1908), (1947, p1, 2020), (2080, p1, oo)} s1: {[263, p1, 359], [393, p1, 486], (531, p1, 549], [639, p1, 738], (785, p1, 816], (906, p1, 1001], [1091, p1, 1139), (1197, p1, 1257], (1342, p1, 1353), [1407, p1, 1437], (1470, p1, 1509], (1573, p1, 1655], (1714, p1, 1761), [1795, p1, 1857], [1886, p1, 1914), (1956, p1, 2050), (2087, p1, 2102), [2126, p1, 2198), (2278, p1, 2374], [2454, p1, 2548], (2585, p1, oo)} s2: {[82, p2, 110], (197, p2, 250], [299, p2, 365), (390, p2, 459), [493, p2, 535], (615, p2, 694], (780, p2, 816), [909, p2, 1005], [1036, p2, 1128], [1139, p2, 1222], (1315, p2, 1374), [1446, p2, 1520), (1615, p2, 1636), [1673, p2, 1763), (1775, p2, 1871], [1930, p2, 1945), [1975, p2, 2038), (2040, p2, 2077], [2143, p2, 2195], (2209, p2, 2267)} union(s1, s2): {[82, p2, 110], (197, p2, 250], [263, p1, 299), [299, p2, 365), (390, p2, 393), [393, p1, 486], [493, p2, 531], (531, p1, 549], (615, p2, 639), [639, p1, 738], (780, p2, 785], (785, p1, 816], (906, p1, 909), [909, p2, 1005], [1036, p2, 1091), [1091, p1, 1139), [1139, p2, 1197], (1197, p1, 1257], (1315, p2, 1374), [1407, p1, 1437], [1446, p2, 1520), (1573, p1, 1655], [1673, p2, 1763), (1775, p2, 1871], [1886, p1, 1914), [1930, p2, 1945), (1956, p1, 2040], (2040, p2, 2077], (2087, p1, 2102), [2126, p1, 2198), (2209, p2, 2267), (2278, p1, 2374], [2454, p1, 2548], (2585, p1, oo)} s1: {(198, p1, 227), [312, p1, 406), [499, p1, 597], [646, p1, 734), (740, p1, 825), (882, p1, 958), [1029, p1, 1086], (1127, p1, 1187), (1248, p1, 1289), [1326, p1, 1387), (1426, p1, 1522], (1578, p1, 1606], (1659, p1, 1695], [1789, p1, 1856], (1905, p1, 1935], [2022, p1, 2099], [2124, p1, 2165), [2243, p1, 2316], [2378, p1, 2401), (2407, p1, 2415]} s2: {(10, p2, 39], [41, p2, 134], [225, p2, 253), [297, p2, 381), (463, p2, 523), (607, p2, 627], (668, p2, 700), (715, p2, 765], (813, p2, 845], (921, p2, 923], [1010, p2, 1106], (1203, p2, 1215), [1289, p2, 1324), (1343, p2, 1395], [1473, p2, 1501], (1510, p2, 1554), [1560, p2, 1596], [1662, p2, 1716), [1731, p2, 1786], [1872, p2, 1968], (2023, p2, oo)} union(s1, s2): {(10, p2, 39], [41, p2, 134], (198, p1, 225), [225, p2, 253), [297, p2, 312), [312, p1, 406), (463, p2, 499), [499, p1, 597], (607, p2, 627], [646, p1, 715], (715, p2, 740], (740, p1, 813], (813, p2, 845], (882, p1, 958), [1010, p2, 1106], (1127, p1, 1187), (1203, p2, 1215), (1248, p1, 1289), [1289, p2, 1324), [1326, p1, 1343], (1343, p2, 1395], (1426, p1, 1510], (1510, p2, 1554), [1560, p2, 1578], (1578, p1, 1606], (1659, p1, 1662), [1662, p2, 1716), [1731, p2, 1786], [1789, p1, 1856], [1872, p2, 1968], [2022, p1, 2023], (2023, p2, oo)} s1: {(-oo, p1, -165], (-79, p1, -35], [29, p1, 58), (82, p1, 172], [219, p1, 239], (260, p1, 261), (305, p1, 383], (463, p1, 510], [546, p1, 616], (621, p1, 690), [700, p1, 719], [792, p1, 843), (916, p1, 1005), [1018, p1, 1071], (1094, p1, 1144], (1209, p1, 1301], (1377, p1, 1378], [1451, p1, 1478), (1571, p1, 1615], [1667, p1, 1761)} s2: {[145, p2, 197], [281, p2, 337], (387, p2, 414], [433, p2, 464], (511, p2, 540), (572, p2, 657], [720, p2, 811], (820, p2, 896], (915, p2, 969], [996, p2, 1069], [1116, p2, 1118], [1145, p2, 1209], [1255, p2, 1339], (1368, p2, 1441], [1465, p2, 1510], (1519, p2, 1601), (1687, p2, 1719], (1816, p2, 1830], (1840, p2, 1892], [1933, p2, 1981)} union(s1, s2): {(-oo, p1, -165], (-79, p1, -35], [29, p1, 58), (82, p1, 145), [145, p2, 197], [219, p1, 239], (260, p1, 261), [281, p2, 305], (305, p1, 383], (387, p2, 414], [433, p2, 463], (463, p1, 510], (511, p2, 540), [546, p1, 572], (572, p2, 621], (621, p1, 690), [700, p1, 719], [720, p2, 792), [792, p1, 820], (820, p2, 896], (915, p2, 916], (916, p1, 996), [996, p2, 1018), [1018, p1, 1071], (1094, p1, 1144], [1145, p2, 1209], (1209, p1, 1255), [1255, p2, 1339], (1368, p2, 1441], [1451, p1, 1465), [1465, p2, 1510], (1519, p2, 1571], (1571, p1, 1615], [1667, p1, 1761), (1816, p2, 1830], (1840, p2, 1892], [1933, p2, 1981)} s1: {(-oo, p1, -135], (-86, p1, -67), (-51, p1, -7], [15, p1, 108), (190, p1, 237], [265, p1, 364], [427, p1, 515), (541, p1, 569], [639, p1, 663), (746, p1, 788), (825, p1, 914), (958, p1, 990], (1021, p1, 1087], [1089, p1, 1139], (1214, p1, 1267], [1318, p1, 1382), (1462, p1, 1554], [1570, p1, 1613), (1672, p1, 1733], [1807, p1, 1810], (1834, p1, 1928], [1983, p1, oo)} s2: {(132, p2, 152), (224, p2, 287], [353, p2, 425], (523, p2, 584), (668, p2, 691], (697, p2, 761], [833, p2, 873], [967, p2, 1066), [1140, p2, 1161), [1170, p2, 1212], (1213, p2, 1296), [1360, p2, 1396), [1407, p2, 1423), (1444, p2, 1513), (1583, p2, 1676], (1740, p2, 1770], (1835, p2, 1847], [1924, p2, 1988], (2005, p2, 2007], [2083, p2, 2175]} union(s1, s2): {(-oo, p1, -135], (-86, p1, -67), (-51, p1, -7], [15, p1, 108), (132, p2, 152), (190, p1, 224], (224, p2, 265), [265, p1, 353), [353, p2, 425], [427, p1, 515), (523, p2, 584), [639, p1, 663), (668, p2, 691], (697, p2, 746], (746, p1, 788), (825, p1, 914), (958, p1, 967), [967, p2, 1021], (1021, p1, 1087], [1089, p1, 1139], [1140, p2, 1161), [1170, p2, 1212], (1213, p2, 1296), [1318, p1, 1360), [1360, p2, 1396), [1407, p2, 1423), (1444, p2, 1462], (1462, p1, 1554], [1570, p1, 1583], (1583, p2, 1672], (1672, p1, 1733], (1740, p2, 1770], [1807, p1, 1810], (1834, p1, 1924), [1924, p2, 1983), [1983, p1, oo)} s1: {(-oo, p1, -49], (49, p1, 139), (200, p1, 299], (360, p1, 421), (441, p1, 442), (455, p1, 541], [555, p1, 637], [691, p1, 757), (836, p1, 926), [992, p1, 1065), [1150, p1, 1230], (1264, p1, 1289), (1376, p1, 1450), [1524, p1, 1552), (1637, p1, 1639], [1679, p1, 1776], (1874, p1, 1918), (1943, p1, 2018), [2076, p1, 2137), (2221, p1, 2223], (2259, p1, 2325)} s2: {(182, p2, 279], (337, p2, 408), (487, p2, 534], (629, p2, 684), (754, p2, 805), (856, p2, 903], (990, p2, 997], [1065, p2, 1088), (1140, p2, 1152], [1236, p2, 1272), [1294, p2, 1331), [1395, p2, 1467), [1471, p2, 1490], [1523, p2, 1582), (1661, p2, 1681), [1703, p2, 1780), [1787, p2, 1799], [1862, p2, 1943), [1979, p2, 2013], (2043, p2, 2067]} union(s1, s2): {(-oo, p1, -49], (49, p1, 139), (182, p2, 200], (200, p1, 299], (337, p2, 360], (360, p1, 421), (441, p1, 442), (455, p1, 541], [555, p1, 629], (629, p2, 684), [691, p1, 754], (754, p2, 805), (836, p1, 926), (990, p2, 992), [992, p1, 1065), [1065, p2, 1088), (1140, p2, 1150), [1150, p1, 1230], [1236, p2, 1264], (1264, p1, 1289), [1294, p2, 1331), (1376, p1, 1395), [1395, p2, 1467), [1471, p2, 1490], [1523, p2, 1582), (1637, p1, 1639], (1661, p2, 1679), [1679, p1, 1703), [1703, p2, 1780), [1787, p2, 1799], [1862, p2, 1943), (1943, p1, 2018), (2043, p2, 2067], [2076, p1, 2137), (2221, p1, 2223], (2259, p1, 2325)} s1: {(-70, p1, -49), [16, p1, 90), [172, p1, 197), (231, p1, 278), (296, p1, 393], [457, p1, 531], [547, p1, 598], [694, p1, 792], (822, p1, 881), (938, p1, 955], [1028, p1, 1055), (1135, p1, 1156], [1201, p1, 1271], (1305, p1, 1348), [1406, p1, 1408], (1476, p1, 1567], [1610, p1, 1673], [1735, p1, 1818), (1888, p1, 1943), (1976, p1, 2015), (2051, p1, oo)} s2: {[-45, p2, 41), (101, p2, 171), [253, p2, 256), [326, p2, 391], [399, p2, 447], [525, p2, 590), [666, p2, 726), (727, p2, 781], (809, p2, 820), [843, p2, 918), (1008, p2, 1032), [1083, p2, 1098), (1186, p2, 1233), [1283, p2, 1293), [1322, p2, 1378], [1426, p2, 1475], (1478, p2, 1500), (1562, p2, 1660], (1723, p2, 1804), [1866, p2, 1935), (1948, p2, oo)} union(s1, s2): {(-70, p1, -49), [-45, p2, 16), [16, p1, 90), (101, p2, 171), [172, p1, 197), (231, p1, 278), (296, p1, 393], [399, p2, 447], [457, p1, 525), [525, p2, 547), [547, p1, 598], [666, p2, 694), [694, p1, 792], (809, p2, 820), (822, p1, 843), [843, p2, 918), (938, p1, 955], (1008, p2, 1028), [1028, p1, 1055), [1083, p2, 1098), (1135, p1, 1156], (1186, p2, 1201), [1201, p1, 1271], [1283, p2, 1293), (1305, p1, 1322), [1322, p2, 1378], [1406, p1, 1408], [1426, p2, 1475], (1476, p1, 1562], (1562, p2, 1610), [1610, p1, 1673], (1723, p2, 1735), [1735, p1, 1818), [1866, p2, 1888], (1888, p1, 1943), (1948, p2, oo)} s1: {(-oo, p1, 106), (108, p1, 168), [228, p1, 230], [251, p1, 284], (327, p1, 420], (457, p1, 534], [605, p1, 609], (689, p1, 736], [796, p1, 819), (917, p1, 977), (1068, p1, 1070], [1153, p1, 1156], (1239, p1, 1320], [1376, p1, 1413), [1504, p1, 1556), [1638, p1, 1699], [1764, p1, 1812), (1853, p1, 1867), (1948, p1, 2012], (2018, p1, 2042], (2127, p1, 2156)} s2: {(-oo, p2, 137], (231, p2, 302), [337, p2, 338), (339, p2, 387], [419, p2, 459], [507, p2, 598], [602, p2, 670), (759, p2, 781], [794, p2, 807), [906, p2, 987], [1027, p2, 1061], (1115, p2, 1163], [1187, p2, 1188], [1215, p2, 1278], [1322, p2, 1327], (1353, p2, 1354), (1430, p2, 1489], (1499, p2, 1592], (1600, p2, 1614], [1642, p2, 1702], (1728, p2, 1813], (1893, p2, oo)} union(s1, s2): {(-oo, p2, 108], (108, p1, 168), [228, p1, 230], (231, p2, 302), (327, p1, 419), [419, p2, 457], (457, p1, 507), [507, p2, 598], [602, p2, 670), (689, p1, 736], (759, p2, 781], [794, p2, 796), [796, p1, 819), [906, p2, 987], [1027, p2, 1061], (1068, p1, 1070], (1115, p2, 1163], [1187, p2, 1188], [1215, p2, 1239], (1239, p1, 1320], [1322, p2, 1327], (1353, p2, 1354), [1376, p1, 1413), (1430, p2, 1489], (1499, p2, 1592], (1600, p2, 1614], [1638, p1, 1642), [1642, p2, 1702], (1728, p2, 1813], (1853, p1, 1867), (1893, p2, oo)} s1: {[-118, p1, -102], (-40, p1, 6], (98, p1, 120], [182, p1, 258), [338, p1, 360), (442, p1, 499), (592, p1, 675), (725, p1, 760], [839, p1, 897), (936, p1, 1026), [1068, p1, 1140], (1183, p1, 1184], [1275, p1, 1312], [1395, p1, 1458), (1536, p1, 1540], [1550, p1, 1590], (1621, p1, 1678], (1745, p1, 1754], (1833, p1, 1863], [1921, p1, 1928], [2022, p1, oo)} s2: {(-oo, p2, 223), [249, p2, 251), [333, p2, 427), (498, p2, 570), [621, p2, 631], (695, p2, 724], (809, p2, 835], [898, p2, 991), [1013, p2, 1068), (1148, p2, 1195], [1287, p2, 1363), [1459, p2, 1495), [1536, p2, 1537), [1632, p2, 1694], (1697, p2, 1728], (1787, p2, 1798], (1804, p2, 1857], (1933, p2, 2009), (2082, p2, 2168], [2219, p2, 2285], [2377, p2, 2378), (2410, p2, oo)} union(s1, s2): {(-oo, p2, 182), [182, p1, 258), [333, p2, 427), (442, p1, 498], (498, p2, 570), (592, p1, 675), (695, p2, 724], (725, p1, 760], (809, p2, 835], [839, p1, 897), [898, p2, 936], (936, p1, 1013), [1013, p2, 1068), [1068, p1, 1140], (1148, p2, 1195], [1275, p1, 1287), [1287, p2, 1363), [1395, p1, 1458), [1459, p2, 1495), [1536, p2, 1536], (1536, p1, 1540], [1550, p1, 1590], (1621, p1, 1632), [1632, p2, 1694], (1697, p2, 1728], (1745, p1, 1754], (1787, p2, 1798], (1804, p2, 1833], (1833, p1, 1863], [1921, p1, 1928], (1933, p2, 2009), [2022, p1, oo)} s1: {(145, p1, 191), (254, p1, 302], (325, p1, 346), (379, p1, 409], [471, p1, 545), (571, p1, 647], (688, p1, 769], [779, p1, 862], [918, p1, 981], [1066, p1, 1107], [1199, p1, 1281), (1326, p1, 1380], [1478, p1, 1561), (1585, p1, 1621), [1669, p1, 1747], (1827, p1, 1891], (1968, p1, 1989), [2018, p1, 2109), [2164, p1, 2217), [2275, p1, 2333)} s2: {(82, p2, 139), (196, p2, 214), [235, p2, 245], (258, p2, 356), [452, p2, 479), (513, p2, 587], (680, p2, 743], (837, p2, 892), (898, p2, 961], (986, p2, 1062], (1136, p2, 1220), (1231, p2, 1299), [1324, p2, 1356], [1367, p2, 1439), [1467, p2, 1467], [1514, p2, 1549], (1639, p2, 1706), (1755, p2, 1835], (1847, p2, 1881], (1912, p2, 2011], (2085, p2, oo)} union(s1, s2): {(82, p2, 139), (145, p1, 191), (196, p2, 214), [235, p2, 245], (254, p1, 258], (258, p2, 356), (379, p1, 409], [452, p2, 471), [471, p1, 513], (513, p2, 571], (571, p1, 647], (680, p2, 688], (688, p1, 769], [779, p1, 837], (837, p2, 892), (898, p2, 918), [918, p1, 981], (986, p2, 1062], [1066, p1, 1107], (1136, p2, 1199), [1199, p1, 1231], (1231, p2, 1299), [1324, p2, 1326], (1326, p1, 1367), [1367, p2, 1439), [1467, p2, 1467], [1478, p1, 1561), (1585, p1, 1621), (1639, p2, 1669), [1669, p1, 1747], (1755, p2, 1827], (1827, p1, 1891], (1912, p2, 2011], [2018, p1, 2085], (2085, p2, oo)} s1: {[242, p1, 271], [364, p1, 373], (436, p1, 485), (562, p1, 613], [700, p1, 714], [722, p1, 772), (840, p1, 925), [959, p1, 989), (1026, p1, 1049], (1063, p1, 1083), [1152, p1, 1234), [1248, p1, 1308), (1330, p1, 1339), [1341, p1, 1343], (1396, p1, 1403), (1480, p1, 1557), (1641, p1, 1694], (1714, p1, 1769], [1781, p1, 1824), (1840, p1, 1875], [1898, p1, oo)} s2: {(-28, p2, -20), (54, p2, 58], (140, p2, 182), [191, p2, 204], [261, p2, 280], (365, p2, 464], (472, p2, 518), (534, p2, 611], (681, p2, 719], (741, p2, 803), (824, p2, 834], (858, p2, 894), (958, p2, 1026), (1082, p2, 1108], (1139, p2, 1169), (1256, p2, 1263], (1348, p2, 1356), (1374, p2, 1435), [1456, p2, 1512], (1542, p2, 1613)} union(s1, s2): {(-28, p2, -20), (54, p2, 58], (140, p2, 182), [191, p2, 204], [242, p1, 261), [261, p2, 280], [364, p1, 365], (365, p2, 436], (436, p1, 472], (472, p2, 518), (534, p2, 562], (562, p1, 613], (681, p2, 719], [722, p1, 741], (741, p2, 803), (824, p2, 834], (840, p1, 925), (958, p2, 1026), (1026, p1, 1049], (1063, p1, 1082], (1082, p2, 1108], (1139, p2, 1152), [1152, p1, 1234), [1248, p1, 1308), (1330, p1, 1339), [1341, p1, 1343], (1348, p2, 1356), (1374, p2, 1435), [1456, p2, 1480], (1480, p1, 1542], (1542, p2, 1613), (1641, p1, 1694], (1714, p1, 1769], [1781, p1, 1824), (1840, p1, 1875], [1898, p1, oo)} s1: {[21, p1, 69), [125, p1, 133), [151, p1, 225), [292, p1, 293), [379, p1, 450), [521, p1, 553), [607, p1, 706), [751, p1, 839], [854, p1, 939), (946, p1, 1008), (1036, p1, 1115), (1213, p1, 1228), [1261, p1, 1319), [1403, p1, 1455], [1476, p1, 1478], (1577, p1, 1583), [1586, p1, 1612), (1692, p1, 1730], (1811, p1, 1822), (1878, p1, 1928], [1985, p1, oo)} s2: {(-oo, p2, 177], [206, p2, 256), (257, p2, 349], [378, p2, 443], (487, p2, 525], (585, p2, 678], [772, p2, 791], (873, p2, 902], (912, p2, 960), (961, p2, 1051], (1052, p2, 1074), (1078, p2, 1097), (1130, p2, 1193), [1212, p2, 1224), (1226, p2, 1232), [1250, p2, 1333], (1393, p2, 1419), (1517, p2, 1575), [1629, p2, 1696], (1698, p2, 1749), (1759, p2, 1809), (1859, p2, oo)} union(s1, s2): {(-oo, p2, 151), [151, p1, 206), [206, p2, 256), (257, p2, 349], [378, p2, 379), [379, p1, 450), (487, p2, 521), [521, p1, 553), (585, p2, 607), [607, p1, 706), [751, p1, 839], [854, p1, 912], (912, p2, 946], (946, p1, 961], (961, p2, 1036], (1036, p1, 1115), (1130, p2, 1193), [1212, p2, 1213], (1213, p1, 1226], (1226, p2, 1232), [1250, p2, 1333], (1393, p2, 1403), [1403, p1, 1455], [1476, p1, 1478], (1517, p2, 1575), (1577, p1, 1583), [1586, p1, 1612), [1629, p2, 1692], (1692, p1, 1698], (1698, p2, 1749), (1759, p2, 1809), (1811, p1, 1822), (1859, p2, oo)} s1: {(-oo, p1, 198), [295, p1, 375), [403, p1, 480], [550, p1, 568], [570, p1, 618), [704, p1, 794], [811, p1, 833], [873, p1, 875], [955, p1, 1051), [1130, p1, 1138), [1216, p1, 1221), (1315, p1, 1398), [1408, p1, 1440], [1491, p1, 1507), (1507, p1, 1588), [1657, p1, 1679], (1778, p1, 1825), (1835, p1, 1893], (1970, p1, 2059), [2148, p1, 2196], [2249, p1, 2265)} s2: {[177, p2, 259], [324, p2, 372), (386, p2, 431], [447, p2, 448), (491, p2, 546], (559, p2, 618], [696, p2, 700], [735, p2, 799), [803, p2, 840], [902, p2, 992], (1081, p2, 1099), (1140, p2, 1173], [1265, p2, 1294), (1349, p2, 1368], (1440, p2, 1466], [1513, p2, 1556), (1636, p2, 1665), (1746, p2, 1789), [1825, p2, 1873], (1900, p2, 1965)} union(s1, s2): {(-oo, p1, 177), [177, p2, 259], [295, p1, 375), (386, p2, 403), [403, p1, 480], (491, p2, 546], [550, p1, 559], (559, p2, 618], [696, p2, 700], [704, p1, 735), [735, p2, 799), [803, p2, 840], [873, p1, 875], [902, p2, 955), [955, p1, 1051), (1081, p2, 1099), [1130, p1, 1138), (1140, p2, 1173], [1216, p1, 1221), [1265, p2, 1294), (1315, p1, 1398), [1408, p1, 1440], (1440, p2, 1466], [1491, p1, 1507), (1507, p1, 1588), (1636, p2, 1657), [1657, p1, 1679], (1746, p2, 1778], (1778, p1, 1825), [1825, p2, 1835], (1835, p1, 1893], (1900, p2, 1965), (1970, p1, 2059), [2148, p1, 2196], [2249, p1, 2265)} s1: {(-oo, p1, 45), [135, p1, 169], [177, p1, 248), (342, p1, 430], [481, p1, 519], (553, p1, 555], (635, p1, 696), [722, p1, 745], [788, p1, 821), (856, p1, 897], [958, p1, 1019), [1021, p1, 1039), [1086, p1, 1088), (1147, p1, 1206], [1262, p1, 1305], (1361, p1, 1402), (1445, p1, 1531), (1586, p1, 1641], [1663, p1, 1755), [1814, p1, 1860], (1948, p1, 2013), (2086, p1, oo)} s2: {(-oo, p2, 82), (124, p2, 190], [232, p2, 260), [264, p2, 357], [369, p2, 384), [439, p2, 468), [492, p2, 563), (573, p2, 659), [757, p2, 817), (855, p2, 863), (878, p2, 916], (928, p2, 930], [1015, p2, 1042), [1093, p2, 1180), [1204, p2, 1215], (1312, p2, 1331], (1333, p2, 1352], [1399, p2, 1411], [1463, p2, 1469], (1523, p2, 1593], [1673, p2, 1768)} union(s1, s2): {(-oo, p2, 82), (124, p2, 177), [177, p1, 232), [232, p2, 260), [264, p2, 342], (342, p1, 430], [439, p2, 468), [481, p1, 492), [492, p2, 563), (573, p2, 635], (635, p1, 696), [722, p1, 745], [757, p2, 788), [788, p1, 821), (855, p2, 856], (856, p1, 878], (878, p2, 916], (928, p2, 930], [958, p1, 1015), [1015, p2, 1042), [1086, p1, 1088), [1093, p2, 1147], (1147, p1, 1204), [1204, p2, 1215], [1262, p1, 1305], (1312, p2, 1331], (1333, p2, 1352], (1361, p1, 1399), [1399, p2, 1411], (1445, p1, 1523], (1523, p2, 1586], (1586, p1, 1641], [1663, p1, 1673), [1673, p2, 1768), [1814, p1, 1860], (1948, p1, 2013), (2086, p1, oo)} s1: {[37, p1, 54), [133, p1, 136], [202, p1, 244], [330, p1, 429), (527, p1, 542), (637, p1, 698), (729, p1, 742], (743, p1, 804), (852, p1, 899), (962, p1, 964], [1029, p1, 1101), (1187, p1, 1198), [1200, p1, 1226], [1290, p1, 1309), [1359, p1, 1405], (1452, p1, 1460), [1481, p1, 1538), [1550, p1, 1637), [1704, p1, 1753], [1842, p1, 1861), (1911, p1, oo)} s2: {(-oo, p2, -81), [-34, p2, 19], [108, p2, 174), (206, p2, 222), (287, p2, 363), (415, p2, 419), [511, p2, 564), (608, p2, 701), [730, p2, 732), [772, p2, 806], (887, p2, 923), [1011, p2, 1110), [1209, p2, 1227), [1323, p2, 1363], (1388, p2, 1405), (1418, p2, 1470), [1550, p2, 1616), (1677, p2, 1703], (1774, p2, 1797), [1880, p2, 1888), (1933, p2, 2019]} union(s1, s2): {(-oo, p2, -81), [-34, p2, 19], [37, p1, 54), [108, p2, 174), [202, p1, 244], (287, p2, 330), [330, p1, 429), [511, p2, 564), (608, p2, 701), (729, p1, 742], (743, p1, 772), [772, p2, 806], (852, p1, 887], (887, p2, 923), (962, p1, 964], [1011, p2, 1110), (1187, p1, 1198), [1200, p1, 1209), [1209, p2, 1227), [1290, p1, 1309), [1323, p2, 1359), [1359, p1, 1405], (1418, p2, 1470), [1481, p1, 1538), [1550, p1, 1637), (1677, p2, 1703], [1704, p1, 1753], (1774, p2, 1797), [1842, p1, 1861), [1880, p2, 1888), (1911, p1, oo)} s1: {(-82, p1, -40], (-13, p1, 2), (17, p1, 63), (124, p1, 155), (155, p1, 185), [213, p1, 249], (254, p1, 287), [383, p1, 404], (463, p1, 492), [566, p1, 610], (632, p1, 656), [735, p1, 816], [849, p1, 940), (994, p1, 1073), (1079, p1, 1104], (1198, p1, 1297), (1307, p1, 1372], [1429, p1, 1433], (1460, p1, 1464), (1479, p1, 1534)} s2: {(-oo, p2, 23], [76, p2, 156), [165, p2, 259), [319, p2, 325], (416, p2, 488), (530, p2, 612], (684, p2, 718], (760, p2, 811], (899, p2, 998), [1042, p2, 1054), (1090, p2, 1121], (1203, p2, 1245), [1255, p2, 1275), (1325, p2, 1388], (1400, p2, 1452], (1493, p2, 1516), [1613, p2, 1635], (1690, p2, 1752], (1834, p2, 1891], (1911, p2, 1987), [2041, p2, 2133)} union(s1, s2): {(-oo, p2, 17], (17, p1, 63), [76, p2, 155], (155, p1, 165), [165, p2, 254], (254, p1, 287), [319, p2, 325], [383, p1, 404], (416, p2, 463], (463, p1, 492), (530, p2, 612], (632, p1, 656), (684, p2, 718], [735, p1, 816], [849, p1, 899], (899, p2, 994], (994, p1, 1073), (1079, p1, 1090], (1090, p2, 1121], (1198, p1, 1297), (1307, p1, 1325], (1325, p2, 1388], (1400, p2, 1452], (1460, p1, 1464), (1479, p1, 1534), [1613, p2, 1635], (1690, p2, 1752], (1834, p2, 1891], (1911, p2, 1987), [2041, p2, 2133)} s1: {[2, p1, 97), (127, p1, 223], [278, p1, 328], [377, p1, 400), [408, p1, 495), [498, p1, 540), (540, p1, 587], (593, p1, 598], [687, p1, 712], (789, p1, 852), (949, p1, 1006), [1012, p1, 1054], (1151, p1, 1239], (1304, p1, 1329], (1362, p1, 1440], (1472, p1, 1500], (1529, p1, 1599), [1629, p1, 1640), [1715, p1, 1733], (1805, p1, 1812), (1856, p1, oo)} s2: {[108, p2, 185), [279, p2, 292], (333, p2, 379], [466, p2, 556], (575, p2, 624], [652, p2, 746], [845, p2, 885], [964, p2, 1047), (1094, p2, 1166), [1205, p2, 1222], (1315, p2, 1371], (1470, p2, 1501], [1577, p2, 1625), (1704, p2, 1742], (1746, p2, 1821), (1903, p2, 1966], [2001, p2, 2011), (2029, p2, 2038], (2085, p2, 2168), [2222, p2, 2263)} union(s1, s2): {[2, p1, 97), [108, p2, 127], (127, p1, 223], [278, p1, 328], (333, p2, 377), [377, p1, 400), [408, p1, 466), [466, p2, 540], (540, p1, 575], (575, p2, 624], [652, p2, 746], (789, p1, 845), [845, p2, 885], (949, p1, 964), [964, p2, 1012), [1012, p1, 1054], (1094, p2, 1151], (1151, p1, 1239], (1304, p1, 1315], (1315, p2, 1362], (1362, p1, 1440], (1470, p2, 1501], (1529, p1, 1577), [1577, p2, 1625), [1629, p1, 1640), (1704, p2, 1742], (1746, p2, 1821), (1856, p1, oo)} s1: {(-oo, p1, -123], [-102, p1, -44], [-29, p1, -27), [-21, p1, 49], [123, p1, 140), (154, p1, 171], (205, p1, 243), [261, p1, 272), [315, p1, 315], [375, p1, 413], [462, p1, 518], [529, p1, 540], (558, p1, 627), [701, p1, 792), [807, p1, 845), [878, p1, 947], [955, p1, 980), (1036, p1, 1082), [1145, p1, 1146), [1207, p1, 1276], [1301, p1, 1356)} s2: {[237, p2, 266), (298, p2, 375], (384, p2, 455), (475, p2, 498], (557, p2, 603], [605, p2, 659], [723, p2, 766], (824, p2, 891), [893, p2, 973), [1025, p2, 1049), [1088, p2, 1170], (1256, p2, 1315), [1391, p2, 1474), [1503, p2, 1540], [1613, p2, 1633], [1664, p2, 1760], [1811, p2, 1879], [1931, p2, 1960], [1993, p2, 2016), [2045, p2, 2120]} union(s1, s2): {(-oo, p1, -123], [-102, p1, -44], [-29, p1, -27), [-21, p1, 49], [123, p1, 140), (154, p1, 171], (205, p1, 237), [237, p2, 261), [261, p1, 272), (298, p2, 375), [375, p1, 384], (384, p2, 455), [462, p1, 518], [529, p1, 540], (557, p2, 558], (558, p1, 605), [605, p2, 659], [701, p1, 792), [807, p1, 824], (824, p2, 878), [878, p1, 893), [893, p2, 955), [955, p1, 980), [1025, p2, 1036], (1036, p1, 1082), [1088, p2, 1170], [1207, p1, 1256], (1256, p2, 1301), [1301, p1, 1356), [1391, p2, 1474), [1503, p2, 1540], [1613, p2, 1633], [1664, p2, 1760], [1811, p2, 1879], [1931, p2, 1960], [1993, p2, 2016), [2045, p2, 2120]} s1: {(1, p1, 24), (36, p1, 103], [143, p1, 201], [277, p1, 288), (331, p1, 414], (487, p1, 519), [549, p1, 550), [560, p1, 610), [679, p1, 716), [808, p1, 877], [882, p1, 956], [984, p1, 1073], [1084, p1, 1174), [1197, p1, 1280], (1339, p1, 1425], [1494, p1, 1516], (1575, p1, 1585], [1684, p1, 1703], (1733, p1, 1808], (1845, p1, 1918)} s2: {(-oo, p2, 16], (62, p2, 72], (101, p2, 147], (176, p2, 255), (338, p2, 431], [496, p2, 510), [564, p2, 623), [651, p2, 686), (715, p2, 809), [903, p2, 923], [956, p2, 1054], [1123, p2, 1124], [1178, p2, 1193), [1229, p2, 1236], (1298, p2, 1326), (1355, p2, 1427), [1520, p2, 1573), [1615, p2, 1695), [1762, p2, 1860], [1889, p2, 1893], [1978, p2, 1980], [2070, p2, oo)} union(s1, s2): {(-oo, p2, 1], (1, p1, 24), (36, p1, 101], (101, p2, 143), [143, p1, 176], (176, p2, 255), [277, p1, 288), (331, p1, 338], (338, p2, 431], (487, p1, 519), [549, p1, 550), [560, p1, 564), [564, p2, 623), [651, p2, 679), [679, p1, 715], (715, p2, 808), [808, p1, 877], [882, p1, 956), [956, p2, 984), [984, p1, 1073], [1084, p1, 1174), [1178, p2, 1193), [1197, p1, 1280], (1298, p2, 1326), (1339, p1, 1355], (1355, p2, 1427), [1494, p1, 1516], [1520, p2, 1573), (1575, p1, 1585], [1615, p2, 1684), [1684, p1, 1703], (1733, p1, 1762), [1762, p2, 1845], (1845, p1, 1918), [1978, p2, 1980], [2070, p2, oo)} s1: {(-127, p1, -103], [-101, p1, -34], [60, p1, 75), (75, p1, 169), (187, p1, 193), [257, p1, 305), (352, p1, 426), [466, p1, 553], [579, p1, 674), [764, p1, 792), [806, p1, 842), [861, p1, 888), (970, p1, 1050), [1111, p1, 1126), (1181, p1, 1207), [1305, p1, 1394], [1462, p1, 1524), (1582, p1, 1651), (1710, p1, 1772], (1813, p1, 1814], [1864, p1, oo)} s2: {(-oo, p2, 24), (107, p2, 187), (197, p2, 295], [325, p2, 374], (395, p2, 431], (527, p2, 585], [653, p2, 727], [741, p2, 748], [765, p2, 831], (930, p2, 990], [1036, p2, 1118), [1146, p2, 1192], [1221, p2, 1267], (1328, p2, 1384), [1418, p2, 1504], [1550, p2, 1573), [1601, p2, 1691], (1698, p2, 1775), (1822, p2, 1907], (1971, p2, 2026], [2074, p2, 2088]} union(s1, s2): {(-oo, p2, 24), [60, p1, 75), (75, p1, 107], (107, p2, 187), (187, p1, 193), (197, p2, 257), [257, p1, 305), [325, p2, 352], (352, p1, 395], (395, p2, 431], [466, p1, 527], (527, p2, 579), [579, p1, 653), [653, p2, 727], [741, p2, 748], [764, p1, 765), [765, p2, 806), [806, p1, 842), [861, p1, 888), (930, p2, 970], (970, p1, 1036), [1036, p2, 1111), [1111, p1, 1126), [1146, p2, 1181], (1181, p1, 1207), [1221, p2, 1267], [1305, p1, 1394], [1418, p2, 1462), [1462, p1, 1524), [1550, p2, 1573), (1582, p1, 1601), [1601, p2, 1691], (1698, p2, 1775), (1813, p1, 1814], (1822, p2, 1864), [1864, p1, oo)} s1: {(61, p1, 132), (159, p1, 258), [347, p1, 368), [449, p1, 514], (538, p1, 554], [560, p1, 613), [657, p1, 691], [764, p1, 861], (927, p1, 941), (1005, p1, 1075), (1121, p1, 1213), (1219, p1, 1223], [1235, p1, 1244], (1290, p1, 1330), [1365, p1, 1418), [1420, p1, 1504), [1548, p1, 1580], [1585, p1, 1603), [1679, p1, 1761), (1770, p1, 1775), [1830, p1, oo)} s2: {(59, p2, 115), (202, p2, 281], [379, p2, 454), (537, p2, 543], [638, p2, 735), (777, p2, 834), [852, p2, 856], (885, p2, 927], (1019, p2, 1044], [1135, p2, 1194], (1209, p2, 1224], (1254, p2, 1323], (1373, p2, 1427), (1495, p2, 1498), (1584, p2, 1668], [1719, p2, 1803], [1889, p2, 1932], (1934, p2, 1998], [2010, p2, 2059), [2072, p2, 2120]} union(s1, s2): {(59, p2, 61], (61, p1, 132), (159, p1, 202], (202, p2, 281], [347, p1, 368), [379, p2, 449), [449, p1, 514], (537, p2, 538], (538, p1, 554], [560, p1, 613), [638, p2, 735), [764, p1, 861], (885, p2, 927], (927, p1, 941), (1005, p1, 1075), (1121, p1, 1209], (1209, p2, 1224], [1235, p1, 1244], (1254, p2, 1290], (1290, p1, 1330), [1365, p1, 1373], (1373, p2, 1420), [1420, p1, 1504), [1548, p1, 1580], (1584, p2, 1668], [1679, p1, 1719), [1719, p2, 1803], [1830, p1, oo)} s1: {(-oo, p1, 42], (75, p1, 96), [142, p1, 212], (253, p1, 327), (424, p1, 516), [598, p1, 681), [778, p1, 841], (910, p1, 1009], (1028, p1, 1102), [1187, p1, 1248], [1298, p1, 1331), [1408, p1, 1408], [1495, p1, 1569), (1662, p1, 1754), (1817, p1, 1837], (1867, p1, 1883), (1919, p1, 1970], (2023, p1, 2092], (2168, p1, 2213], [2233, p1, 2304]} s2: {(1, p2, 32), [121, p2, 210), (272, p2, 289], (322, p2, 329), [405, p2, 485], [580, p2, 678), [703, p2, 709], (728, p2, 787), (884, p2, 885], [962, p2, 1038), (1049, p2, 1135), [1174, p2, 1248), [1289, p2, 1295), (1357, p2, 1393), (1462, p2, 1514], (1575, p2, 1584), (1586, p2, 1611), (1633, p2, 1715), [1800, p2, 1819], (1882, p2, 1968), [2015, p2, oo)} union(s1, s2): {(-oo, p1, 42], (75, p1, 96), [121, p2, 142), [142, p1, 212], (253, p1, 322], (322, p2, 329), [405, p2, 424], (424, p1, 516), [580, p2, 598), [598, p1, 681), [703, p2, 709], (728, p2, 778), [778, p1, 841], (884, p2, 885], (910, p1, 962), [962, p2, 1028], (1028, p1, 1049], (1049, p2, 1135), [1174, p2, 1187), [1187, p1, 1248], [1289, p2, 1295), [1298, p1, 1331), (1357, p2, 1393), [1408, p1, 1408], (1462, p2, 1495), [1495, p1, 1569), (1575, p2, 1584), (1586, p2, 1611), (1633, p2, 1662], (1662, p1, 1754), [1800, p2, 1817], (1817, p1, 1837], (1867, p1, 1882], (1882, p2, 1919], (1919, p1, 1970], [2015, p2, oo)} s1: {(-oo, p1, 151], (186, p1, 230), [299, p1, 328), (399, p1, 550), (622, p1, 715], [786, p1, 835], [910, p1, 991), [1080, p1, 1175), [1213, p1, 1220), [1221, p1, 1261), (1269, p1, 1381], [1458, p1, 1536), [1578, p1, 1596), [1665, p1, 1760], (1802, p1, 1805], [1838, p1, 1886), (1927, p1, 1948), (1999, p1, 2045), (2116, p1, 2211)} s2: {[-68, p2, 10), [100, p2, 185), (222, p2, 295], (306, p2, 374], (418, p2, 504], [507, p2, 569], [602, p2, 675), [734, p2, 783), [852, p2, 879), [939, p2, 974), (1007, p2, 1054), [1061, p2, 1108], (1200, p2, 1272], [1342, p2, 1383], (1477, p2, 1537], [1561, p2, 1572], [1667, p2, 1721], [1757, p2, 1824), (1855, p2, 1888)} union(s1, s2): {(-oo, p1, 100), [100, p2, 185), (186, p1, 222], (222, p2, 295], [299, p1, 306], (306, p2, 374], (399, p1, 507), [507, p2, 569], [602, p2, 622], (622, p1, 715], [734, p2, 783), [786, p1, 835], [852, p2, 879), [910, p1, 991), (1007, p2, 1054), [1061, p2, 1080), [1080, p1, 1175), (1200, p2, 1269], (1269, p1, 1342), [1342, p2, 1383], [1458, p1, 1477], (1477, p2, 1537], [1561, p2, 1572], [1578, p1, 1596), [1665, p1, 1757), [1757, p2, 1824), [1838, p1, 1855], (1855, p2, 1888), (1927, p1, 1948), (1999, p1, 2045), (2116, p1, 2211)} s1: {[151, p1, 206), [268, p1, 320), (333, p1, 369), [455, p1, 465], [528, p1, 611], (683, p1, 768], (834, p1, 969), (1012, p1, 1040], (1133, p1, 1172], [1252, p1, 1340), [1368, p1, 1369], (1455, p1, 1502), [1524, p1, 1527), [1595, p1, 1637], (1683, p1, 1725], (1807, p1, 1841], (1911, p1, 1970], (2037, p1, 2097], (2186, p1, 2276)} s2: {[138, p2, 213], (235, p2, 288), (304, p2, 325), [381, p2, 447), [467, p2, 483), (551, p2, 607), (622, p2, 677], [726, p2, 774], [825, p2, 919), [996, p2, 1065), [1159, p2, 1255), [1332, p2, 1363], [1414, p2, 1487], (1499, p2, 1596], (1603, p2, 1691), (1723, p2, 1781), [1821, p2, 1848], [1908, p2, 1972), (1997, p2, 2023], [2087, p2, 2164)} union(s1, s2): {[138, p2, 213], (235, p2, 268), [268, p1, 304], (304, p2, 325), (333, p1, 369), [381, p2, 447), [455, p1, 465], [467, p2, 483), [528, p1, 611], (622, p2, 677], (683, p1, 726), [726, p2, 774], [825, p2, 834], (834, p1, 969), [996, p2, 1065), (1133, p1, 1159), [1159, p2, 1252), [1252, p1, 1332), [1332, p2, 1363], [1368, p1, 1369], [1414, p2, 1455], (1455, p1, 1499], (1499, p2, 1595), [1595, p1, 1603], (1603, p2, 1683], (1683, p1, 1723], (1723, p2, 1781), (1807, p1, 1821), [1821, p2, 1848], [1908, p2, 1972), (1997, p2, 2023], (2037, p1, 2087), [2087, p2, 2164), (2186, p1, 2276)} s1: {(-22, p1, 11), (24, p1, 87], (112, p1, 186), (201, p1, 282], (285, p1, 373], [456, p1, 538), (601, p1, 647], [693, p1, 787), [811, p1, 876), (893, p1, 967), [989, p1, 999], [1052, p1, 1136), [1141, p1, 1192), (1262, p1, 1330), (1375, p1, 1409], (1433, p1, 1471], (1564, p1, 1626), (1719, p1, 1772), (1807, p1, 1895], (1936, p1, 2000]} s2: {(-oo, p2, 207), (218, p2, 317), (362, p2, 411), [509, p2, 530), (578, p2, 611), (689, p2, 741], [742, p2, 805), (895, p2, 950], [966, p2, 1056), (1060, p2, 1106], (1151, p2, 1242], (1251, p2, 1343), (1436, p2, 1489], [1509, p2, 1571], (1623, p2, 1722], [1786, p2, 1796], [1825, p2, 1922), [1987, p2, 2080], (2156, p2, 2198), (2233, p2, 2303), (2354, p2, 2414], [2498, p2, oo)} union(s1, s2): {(-oo, p2, 201], (201, p1, 218], (218, p2, 285], (285, p1, 362], (362, p2, 411), [456, p1, 538), (578, p2, 601], (601, p1, 647], (689, p2, 693), [693, p1, 742), [742, p2, 805), [811, p1, 876), (893, p1, 966), [966, p2, 1052), [1052, p1, 1136), [1141, p1, 1151], (1151, p2, 1242], (1251, p2, 1343), (1375, p1, 1409], (1433, p1, 1436], (1436, p2, 1489], [1509, p2, 1564], (1564, p1, 1623], (1623, p2, 1719], (1719, p1, 1772), [1786, p2, 1796], (1807, p1, 1825), [1825, p2, 1922), (1936, p1, 1987), [1987, p2, 2080], (2156, p2, 2198), (2233, p2, 2303), (2354, p2, 2414], [2498, p2, oo)} s1: {(-93, p1, -83], [-59, p1, 3), [85, p1, 172], [192, p1, 245), (344, p1, 382], [451, p1, 506], [567, p1, 594], (620, p1, 712), (717, p1, 760], (779, p1, 877], (964, p1, 1017], (1076, p1, 1158), (1214, p1, 1282), (1336, p1, 1429), [1459, p1, 1513], (1557, p1, 1645), [1677, p1, 1678], (1710, p1, 1755], (1805, p1, 1854], (1944, p1, 2035)} s2: {[-14, p2, 24), [79, p2, 153), (219, p2, 293], [299, p2, 331), [371, p2, 459), (530, p2, 575), (585, p2, 662), [670, p2, 680), (746, p2, 829), (911, p2, 1008), [1107, p2, 1111], (1180, p2, 1193], [1223, p2, 1244], [1261, p2, 1335], (1393, p2, 1489), [1495, p2, 1554], [1603, p2, 1638], (1711, p2, 1715], [1788, p2, 1859), [1893, p2, 1913]} union(s1, s2): {(-93, p1, -83], [-59, p1, -14), [-14, p2, 24), [79, p2, 85), [85, p1, 172], [192, p1, 219], (219, p2, 293], [299, p2, 331), (344, p1, 371), [371, p2, 451), [451, p1, 506], (530, p2, 567), [567, p1, 585], (585, p2, 620], (620, p1, 712), (717, p1, 746], (746, p2, 779], (779, p1, 877], (911, p2, 964], (964, p1, 1017], (1076, p1, 1158), (1180, p2, 1193], (1214, p1, 1261), [1261, p2, 1335], (1336, p1, 1393], (1393, p2, 1459), [1459, p1, 1495), [1495, p2, 1554], (1557, p1, 1645), [1677, p1, 1678], (1710, p1, 1755], [1788, p2, 1859), [1893, p2, 1913], (1944, p1, 2035)} s1: {(-oo, p1, 193), (236, p1, 250), (326, p1, 347], [356, p1, 377], [429, p1, 502], (563, p1, 576), [601, p1, 627], [714, p1, 793], (836, p1, 837], (887, p1, 900], [923, p1, 956], (971, p1, 1066], [1078, p1, 1126], (1131, p1, 1222], (1289, p1, 1343), [1434, p1, 1463], [1481, p1, 1500), (1533, p1, 1584], (1651, p1, 1696), [1731, p1, 1749), (1787, p1, 1885), (1968, p1, oo)} s2: {(135, p2, 154), [214, p2, 228), [313, p2, 373], [461, p2, 535), (564, p2, 639), (725, p2, 803), (828, p2, 875], (890, p2, 917), (1004, p2, 1072], (1123, p2, 1171), [1178, p2, 1197), (1213, p2, 1272), (1313, p2, 1405), (1504, p2, 1513), [1535, p2, 1604), [1685, p2, 1738], (1780, p2, 1868), (1923, p2, 2019), [2075, p2, 2168), (2235, p2, 2295], [2317, p2, oo)} union(s1, s2): {(-oo, p1, 193), [214, p2, 228), (236, p1, 250), [313, p2, 356), [356, p1, 377], [429, p1, 461), [461, p2, 535), (563, p1, 564], (564, p2, 639), [714, p1, 725], (725, p2, 803), (828, p2, 875], (887, p1, 890], (890, p2, 917), [923, p1, 956], (971, p1, 1004], (1004, p2, 1072], [1078, p1, 1123], (1123, p2, 1131], (1131, p1, 1213], (1213, p2, 1272), (1289, p1, 1313], (1313, p2, 1405), [1434, p1, 1463], [1481, p1, 1500), (1504, p2, 1513), (1533, p1, 1535), [1535, p2, 1604), (1651, p1, 1685), [1685, p2, 1731), [1731, p1, 1749), (1780, p2, 1787], (1787, p1, 1885), (1923, p2, 1968], (1968, p1, oo)} s1: {(145, p1, 202), [275, p1, 368), (454, p1, 463), [561, p1, 592), (646, p1, 737], [819, p1, 889), [921, p1, 1011], [1079, p1, 1133], (1223, p1, 1290], (1322, p1, 1420), [1463, p1, 1539), (1558, p1, 1582), (1591, p1, 1687], [1776, p1, 1795), [1883, p1, 1932], (2008, p1, 2075), (2156, p1, 2240], [2258, p1, 2387], [2405, p1, 2416), (2416, p1, oo)} s2: {[-38, p2, -32), [37, p2, 70], (84, p2, 85], [118, p2, 122), (212, p2, 221), (232, p2, 318], (383, p2, 398), (490, p2, 540], [569, p2, 628], (719, p2, 732), [740, p2, 835), [868, p2, 900), (909, p2, 926), (988, p2, 1013), (1022, p2, 1029), [1083, p2, 1173), (1240, p2, 1298], [1383, p2, 1432), (1476, p2, 1548], [1645, p2, 1731)} union(s1, s2): {[-38, p2, -32), [37, p2, 70], (84, p2, 85], [118, p2, 122), (145, p1, 202), (212, p2, 221), (232, p2, 275), [275, p1, 368), (383, p2, 398), (454, p1, 463), (490, p2, 540], [561, p1, 569), [569, p2, 628], (646, p1, 737], [740, p2, 819), [819, p1, 868), [868, p2, 900), (909, p2, 921), [921, p1, 988], (988, p2, 1013), (1022, p2, 1029), [1079, p1, 1083), [1083, p2, 1173), (1223, p1, 1240], (1240, p2, 1298], (1322, p1, 1383), [1383, p2, 1432), [1463, p1, 1476], (1476, p2, 1548], (1558, p1, 1582), (1591, p1, 1645), [1645, p2, 1731), [1776, p1, 1795), [1883, p1, 1932], (2008, p1, 2075), (2156, p1, 2240], [2258, p1, 2387], [2405, p1, 2416), (2416, p1, oo)} s1: {(-oo, p1, -68), (-8, p1, 53], (126, p1, 155], (224, p1, 323], [351, p1, 424), (497, p1, 582), [591, p1, 654], [752, p1, 759], (783, p1, 802), [849, p1, 924], [928, p1, 1007), (1096, p1, 1129], [1223, p1, 1234], (1235, p1, 1322], [1342, p1, 1400], (1417, p1, 1435], [1505, p1, 1513], (1571, p1, 1599), [1663, p1, 1692], (1699, p1, 1707), (1785, p1, 1786)} s2: {(43, p2, 122), [125, p2, 130], [137, p2, 180], [232, p2, 282), [293, p2, 370), [397, p2, 425], (506, p2, 576], [630, p2, 699], [714, p2, 778), (805, p2, 813), [860, p2, 955), [1020, p2, 1077), [1148, p2, 1151], (1193, p2, 1231], [1283, p2, 1307], [1374, p2, 1392], [1439, p2, 1520], [1527, p2, 1547), [1570, p2, 1652], (1716, p2, 1717]} union(s1, s2): {(-oo, p1, -68), (-8, p1, 43], (43, p2, 122), [125, p2, 126], (126, p1, 137), [137, p2, 180], (224, p1, 293), [293, p2, 351), [351, p1, 397), [397, p2, 425], (497, p1, 582), [591, p1, 630), [630, p2, 699], [714, p2, 778), (783, p1, 802), (805, p2, 813), [849, p1, 860), [860, p2, 928), [928, p1, 1007), [1020, p2, 1077), (1096, p1, 1129], [1148, p2, 1151], (1193, p2, 1223), [1223, p1, 1234], (1235, p1, 1322], [1342, p1, 1400], (1417, p1, 1435], [1439, p2, 1520], [1527, p2, 1547), [1570, p2, 1652], [1663, p1, 1692], (1699, p1, 1707), (1716, p2, 1717], (1785, p1, 1786)} s1: {(-oo, p1, -29], (46, p1, 143), [169, p1, 206), [288, p1, 318], (390, p1, 461], [480, p1, 498), (586, p1, 652], [732, p1, 814], [905, p1, 997], (1082, p1, 1133), [1160, p1, 1173), (1263, p1, 1330], [1374, p1, 1416], (1512, p1, 1558], (1592, p1, 1625], [1704, p1, 1747], (1843, p1, 1902), (1976, p1, 2048), (2062, p1, 2063], [2114, p1, 2115), [2147, p1, 2193], [2281, p1, oo)} s2: {(225, p2, 303], (341, p2, 402), (448, p2, 522], [524, p2, 572], (642, p2, 726], [807, p2, 896), (991, p2, 1026], (1091, p2, 1183], (1254, p2, 1316), [1366, p2, 1425), (1480, p2, 1533), (1603, p2, 1683], (1686, p2, 1701), (1751, p2, 1830], [1903, p2, 1969), (2051, p2, 2110), [2140, p2, 2145), (2155, p2, 2227), [2243, p2, 2333], [2429, p2, 2432), [2464, p2, oo)} union(s1, s2): {(-oo, p1, -29], (46, p1, 143), [169, p1, 206), (225, p2, 288), [288, p1, 318], (341, p2, 390], (390, p1, 448], (448, p2, 522], [524, p2, 572], (586, p1, 642], (642, p2, 726], [732, p1, 807), [807, p2, 896), [905, p1, 991], (991, p2, 1026], (1082, p1, 1091], (1091, p2, 1183], (1254, p2, 1263], (1263, p1, 1330], [1366, p2, 1425), (1480, p2, 1512], (1512, p1, 1558], (1592, p1, 1603], (1603, p2, 1683], (1686, p2, 1701), [1704, p1, 1747], (1751, p2, 1830], (1843, p1, 1902), [1903, p2, 1969), (1976, p1, 2048), (2051, p2, 2110), [2114, p1, 2115), [2140, p2, 2145), [2147, p1, 2155], (2155, p2, 2227), [2243, p2, 2281), [2281, p1, oo)} s1: {[147, p1, 204), [275, p1, 284), [292, p1, 384), [467, p1, 493], (496, p1, 504), (533, p1, 611], (640, p1, 672], [714, p1, 776], (802, p1, 823], (860, p1, 868), (960, p1, 979], [1012, p1, 1111), (1200, p1, 1206), [1211, p1, 1211], [1224, p1, 1306), (1313, p1, 1355], (1385, p1, 1460], [1509, p1, 1523], [1593, p1, 1679], [1758, p1, 1854), (1868, p1, oo)} s2: {(161, p2, 251), (283, p2, 328], [347, p2, 350], (422, p2, 504], [589, p2, 669), (764, p2, 849], (874, p2, 901), [982, p2, 1047], [1114, p2, 1117], [1202, p2, 1274), (1317, p2, 1389), [1390, p2, 1409], (1498, p2, 1532], [1599, p2, 1676], (1686, p2, 1754], (1835, p2, 1849], [1894, p2, 1977], (2070, p2, 2091), (2187, p2, 2284], (2291, p2, oo)} union(s1, s2): {[147, p1, 161], (161, p2, 251), [275, p1, 283], (283, p2, 292), [292, p1, 384), (422, p2, 504], (533, p1, 589), [589, p2, 640], (640, p1, 672], [714, p1, 764], (764, p2, 849], (860, p1, 868), (874, p2, 901), (960, p1, 979], [982, p2, 1012), [1012, p1, 1111), [1114, p2, 1117], (1200, p1, 1202), [1202, p2, 1224), [1224, p1, 1306), (1313, p1, 1317], (1317, p2, 1385], (1385, p1, 1460], (1498, p2, 1532], [1593, p1, 1679], (1686, p2, 1754], [1758, p1, 1854), (1868, p1, oo)} s1: {[104, p1, 200], (213, p1, 237], (248, p1, 324), (369, p1, 389), (483, p1, 526), (592, p1, 642], [713, p1, 761), (817, p1, 875], [961, p1, 1024), (1093, p1, 1167], (1234, p1, 1240], [1255, p1, 1338), (1383, p1, 1469], [1508, p1, 1533], [1624, p1, 1696], [1727, p1, 1802), (1867, p1, 1944), (2041, p1, 2057), [2073, p1, 2087), [2113, p1, 2196]} s2: {(81, p2, 133], [190, p2, 205), [208, p2, 221], [235, p2, 290], (351, p2, 356], (441, p2, 507], [580, p2, 584], [639, p2, 658), [704, p2, 773], [840, p2, 909], [950, p2, 1046), [1061, p2, 1122), (1126, p2, 1172), (1229, p2, 1254], [1284, p2, 1299], [1367, p2, 1453), [1457, p2, 1492], (1572, p2, 1652), [1718, p2, 1744], [1769, p2, 1854), [1908, p2, oo)} union(s1, s2): {(81, p2, 104), [104, p1, 190), [190, p2, 205), [208, p2, 213], (213, p1, 235), [235, p2, 248], (248, p1, 324), (351, p2, 356], (369, p1, 389), (441, p2, 483], (483, p1, 526), [580, p2, 584], (592, p1, 639), [639, p2, 658), [704, p2, 773], (817, p1, 840), [840, p2, 909], [950, p2, 1046), [1061, p2, 1093], (1093, p1, 1126], (1126, p2, 1172), (1229, p2, 1254], [1255, p1, 1338), [1367, p2, 1383], (1383, p1, 1457), [1457, p2, 1492], [1508, p1, 1533], (1572, p2, 1624), [1624, p1, 1696], [1718, p2, 1727), [1727, p1, 1769), [1769, p2, 1854), (1867, p1, 1908), [1908, p2, oo)} s1: {(161, p1, 251], [264, p1, 267), [312, p1, 316), [392, p1, 488], (491, p1, 528), (589, p1, 639], (703, p1, 795], [809, p1, 851], [921, p1, 974), [1006, p1, 1080], [1143, p1, 1164], (1165, p1, 1223), [1251, p1, 1288], (1367, p1, 1431], [1529, p1, 1609), (1672, p1, 1740), [1809, p1, 1809], [1899, p1, 1959), [2034, p1, 2119], [2154, p1, 2162]} s2: {[-105, p2, -34], (13, p2, 104), [180, p2, 259], [261, p2, 329), [401, p2, 487), (571, p2, 654], (717, p2, 737], (794, p2, 831], (862, p2, 939), [1029, p2, 1037), [1078, p2, 1110), (1184, p2, 1188), (1221, p2, 1289), (1291, p2, 1309), (1353, p2, 1431], [1448, p2, 1508), [1560, p2, 1644), (1693, p2, 1704), (1768, p2, 1800), (1816, p2, 1830]} union(s1, s2): {[-105, p2, -34], (13, p2, 104), (161, p1, 180), [180, p2, 259], [261, p2, 329), [392, p1, 488], (491, p1, 528), (571, p2, 654], (703, p1, 794], (794, p2, 809), [809, p1, 851], (862, p2, 921), [921, p1, 974), [1006, p1, 1078), [1078, p2, 1110), [1143, p1, 1164], (1165, p1, 1221], (1221, p2, 1289), (1291, p2, 1309), (1353, p2, 1431], [1448, p2, 1508), [1529, p1, 1560), [1560, p2, 1644), (1672, p1, 1740), (1768, p2, 1800), [1809, p1, 1809], (1816, p2, 1830], [1899, p1, 1959), [2034, p1, 2119], [2154, p1, 2162]} s1: {(-62, p1, -6), (55, p1, 125], [220, p1, 308], (406, p1, 487), (578, p1, 579], [619, p1, 671), (711, p1, 748], (820, p1, 897], [973, p1, 984), [1031, p1, 1097), (1100, p1, 1149], (1206, p1, 1291), [1299, p1, 1395), (1450, p1, 1527], (1558, p1, 1578], (1655, p1, 1683), [1761, p1, 1802), [1863, p1, 1878), [1923, p1, 1947), (1977, p1, 2070]} s2: {(205, p2, 235], [330, p2, 350], (418, p2, 458), (552, p2, 609), [642, p2, 648], [652, p2, 654], [744, p2, 781], (834, p2, 931), [984, p2, 1080), [1098, p2, 1179), [1220, p2, 1249), (1293, p2, 1294], (1323, p2, 1366], [1407, p2, 1412), (1433, p2, 1490], [1535, p2, 1545), [1636, p2, 1646], [1700, p2, 1758], (1769, p2, 1803), (1819, p2, 1820), [1876, p2, oo)} union(s1, s2): {(-62, p1, -6), (55, p1, 125], (205, p2, 220), [220, p1, 308], [330, p2, 350], (406, p1, 487), (552, p2, 609), [619, p1, 671), (711, p1, 744), [744, p2, 781], (820, p1, 834], (834, p2, 931), [973, p1, 984), [984, p2, 1031), [1031, p1, 1097), [1098, p2, 1179), (1206, p1, 1291), (1293, p2, 1294], [1299, p1, 1395), [1407, p2, 1412), (1433, p2, 1450], (1450, p1, 1527], [1535, p2, 1545), (1558, p1, 1578], [1636, p2, 1646], (1655, p1, 1683), [1700, p2, 1758], [1761, p1, 1769], (1769, p2, 1803), (1819, p2, 1820), [1863, p1, 1876), [1876, p2, oo)} s1: {(24, p1, 123], [217, p1, 312], (397, p1, 411), (430, p1, 481), [521, p1, 604), (610, p1, 634), (662, p1, 690], [746, p1, 813), (856, p1, 872], [918, p1, 966), [1025, p1, 1040), [1136, p1, 1147], (1166, p1, 1244), [1327, p1, 1402], (1456, p1, 1544], [1620, p1, 1667), (1734, p1, 1812), (1839, p1, 1879), [1890, p1, 1914), (1946, p1, 2038)} s2: {(-oo, p2, 181), (243, p2, 268], (293, p2, 295], (343, p2, 370], (417, p2, 433], [472, p2, 500), (546, p2, 594), [621, p2, 662), (756, p2, 787), (835, p2, 883), (977, p2, 1069), (1087, p2, 1165), [1260, p2, 1290], (1328, p2, 1409], (1465, p2, 1527), (1573, p2, 1643), (1702, p2, 1749], (1806, p2, 1822), [1885, p2, 1913), (1982, p2, 2066), [2102, p2, 2192), [2275, p2, oo)} union(s1, s2): {(-oo, p2, 181), [217, p1, 312], (343, p2, 370], (397, p1, 411), (417, p2, 430], (430, p1, 472), [472, p2, 500), [521, p1, 604), (610, p1, 621), [621, p2, 662), (662, p1, 690], [746, p1, 813), (835, p2, 883), [918, p1, 966), (977, p2, 1069), (1087, p2, 1165), (1166, p1, 1244), [1260, p2, 1290], [1327, p1, 1328], (1328, p2, 1409], (1456, p1, 1544], (1573, p2, 1620), [1620, p1, 1667), (1702, p2, 1734], (1734, p1, 1806], (1806, p2, 1822), (1839, p1, 1879), [1885, p2, 1890), [1890, p1, 1914), (1946, p1, 1982], (1982, p2, 2066), [2102, p2, 2192), [2275, p2, oo)} s1: {(-oo, p1, 174], (233, p1, 240), (283, p1, 362], [377, p1, 419], (435, p1, 480), (562, p1, 568], (644, p1, 680], (769, p1, 814], [904, p1, 958], [964, p1, 994), (1067, p1, 1152], [1172, p1, 1254), [1277, p1, 1308], [1407, p1, 1435), (1458, p1, 1488], (1522, p1, 1604), [1703, p1, 1724), (1740, p1, 1833], [1884, p1, 1941), (1979, p1, 2064), (2096, p1, 2185), [2280, p1, oo)} s2: {[7, p2, 74), (80, p2, 83], (159, p2, 200), [206, p2, 226], (246, p2, 300), (356, p2, 423), (490, p2, 559], (623, p2, 633), (691, p2, 722), (771, p2, 801], (889, p2, 979], (984, p2, 1041], (1114, p2, 1197), (1255, p2, 1337], [1395, p2, 1484], [1538, p2, 1634), [1693, p2, 1725], (1800, p2, 1879), [1915, p2, 2010), (2098, p2, 2125)} union(s1, s2): {(-oo, p1, 159], (159, p2, 200), [206, p2, 226], (233, p1, 240), (246, p2, 283], (283, p1, 356], (356, p2, 423), (435, p1, 480), (490, p2, 559], (562, p1, 568], (623, p2, 633), (644, p1, 680], (691, p2, 722), (769, p1, 814], (889, p2, 964), [964, p1, 984], (984, p2, 1041], (1067, p1, 1114], (1114, p2, 1172), [1172, p1, 1254), (1255, p2, 1337], [1395, p2, 1458], (1458, p1, 1488], (1522, p1, 1538), [1538, p2, 1634), [1693, p2, 1725], (1740, p1, 1800], (1800, p2, 1879), [1884, p1, 1915), [1915, p2, 1979], (1979, p1, 2064), (2096, p1, 2185), [2280, p1, oo)} s1: {[-83, p1, -68), (4, p1, 69), [146, p1, 219), (302, p1, 333), (357, p1, 430), (483, p1, 531], [620, p1, 669], [746, p1, 764], (847, p1, 898), (990, p1, 1059], (1107, p1, 1173), [1206, p1, 1274], [1291, p1, 1385], [1460, p1, 1553), [1562, p1, 1638], (1683, p1, 1685), [1742, p1, 1789], [1839, p1, 1868), (1951, p1, 1983), [2066, p1, 2146]} s2: {(-11, p2, 77), [166, p2, 251), (325, p2, 364], (383, p2, 396), [460, p2, 535], [567, p2, 605], [663, p2, 701), [753, p2, 763], [769, p2, 824], (902, p2, 934), [1008, p2, 1057), [1103, p2, 1174], [1253, p2, 1291], [1324, p2, 1380), (1380, p2, 1417), (1425, p2, 1472), [1503, p2, 1588], (1653, p2, 1675), (1730, p2, 1733), [1794, p2, 1832)} union(s1, s2): {[-83, p1, -68), (-11, p2, 77), [146, p1, 166), [166, p2, 251), (302, p1, 325], (325, p2, 357], (357, p1, 430), [460, p2, 535], [567, p2, 605], [620, p1, 663), [663, p2, 701), [746, p1, 764], [769, p2, 824], (847, p1, 898), (902, p2, 934), (990, p1, 1059], [1103, p2, 1174], [1206, p1, 1253), [1253, p2, 1291), [1291, p1, 1380], (1380, p2, 1417), (1425, p2, 1460), [1460, p1, 1503), [1503, p2, 1562), [1562, p1, 1638], (1653, p2, 1675), (1683, p1, 1685), (1730, p2, 1733), [1742, p1, 1789], [1794, p2, 1832), [1839, p1, 1868), (1951, p1, 1983), [2066, p1, 2146]} s1: {(-oo, p1, -55), [-50, p1, -41], (24, p1, 111], [165, p1, 233], (258, p1, 320], (409, p1, 411), [449, p1, 458], [536, p1, 632], (656, p1, 723], (801, p1, 817], (862, p1, 906), [944, p1, 1042), (1138, p1, 1143), (1194, p1, 1212), [1310, p1, 1403), [1487, p1, 1563], [1654, p1, 1662), [1721, p1, 1782), [1824, p1, 1880), (1884, p1, 1903), [1928, p1, 1939)} s2: {[49, p2, 83), (138, p2, 206), (212, p2, 225), [269, p2, 356), (389, p2, 449), [484, p2, 560], (597, p2, 682], (748, p2, 781], [829, p2, 868), [890, p2, 891], (973, p2, 1070], (1093, p2, 1188), (1286, p2, 1364], [1419, p2, 1455], [1498, p2, 1513), [1605, p2, 1655], [1659, p2, 1735], [1744, p2, 1788], (1824, p2, 1880), (1881, p2, 1883]} union(s1, s2): {(-oo, p1, -55), [-50, p1, -41], (24, p1, 111], (138, p2, 165), [165, p1, 233], (258, p1, 269), [269, p2, 356), (389, p2, 449), [449, p1, 458], [484, p2, 536), [536, p1, 597], (597, p2, 656], (656, p1, 723], (748, p2, 781], (801, p1, 817], [829, p2, 862], (862, p1, 906), [944, p1, 973], (973, p2, 1070], (1093, p2, 1188), (1194, p1, 1212), (1286, p2, 1310), [1310, p1, 1403), [1419, p2, 1455], [1487, p1, 1563], [1605, p2, 1654), [1654, p1, 1659), [1659, p2, 1721), [1721, p1, 1744), [1744, p2, 1788], [1824, p1, 1880), (1881, p2, 1883], (1884, p1, 1903), [1928, p1, 1939)} s1: {[224, p1, 312), (341, p1, 395], (493, p1, 513], (550, p1, 629), (704, p1, 789], [790, p1, 825], [916, p1, 1009), [1065, p1, 1092), [1190, p1, 1207), (1281, p1, 1297), (1320, p1, 1355), [1419, p1, 1497], (1531, p1, 1617), [1655, p1, 1724), (1735, p1, 1756], [1840, p1, 1939], [1971, p1, 1975), (1985, p1, 2044), [2051, p1, 2139], (2181, p1, 2275)} s2: {(-oo, p2, -4), [40, p2, 103], [138, p2, 140], [219, p2, 299), [370, p2, 438), [439, p2, 482), [555, p2, 635], (636, p2, 707), [713, p2, 767), [789, p2, 793], [857, p2, 928], (999, p2, 1000], [1051, p2, 1140], (1152, p2, 1154], (1234, p2, 1312], (1407, p2, 1427), (1444, p2, 1521), [1570, p2, 1634), (1701, p2, 1746), [1813, p2, 1895], [1902, p2, 2001], [2045, p2, oo)} union(s1, s2): {(-oo, p2, -4), [40, p2, 103], [138, p2, 140], [219, p2, 224), [224, p1, 312), (341, p1, 370), [370, p2, 438), [439, p2, 482), (493, p1, 513], (550, p1, 555), [555, p2, 635], (636, p2, 704], (704, p1, 789), [789, p2, 790), [790, p1, 825], [857, p2, 916), [916, p1, 1009), [1051, p2, 1140], (1152, p2, 1154], [1190, p1, 1207), (1234, p2, 1312], (1320, p1, 1355), (1407, p2, 1419), [1419, p1, 1444], (1444, p2, 1521), (1531, p1, 1570), [1570, p2, 1634), [1655, p1, 1701], (1701, p2, 1735], (1735, p1, 1756], [1813, p2, 1840), [1840, p1, 1902), [1902, p2, 1985], (1985, p1, 2044), [2045, p2, oo)} s1: {(-oo, p1, -174], (-112, p1, -50], [39, p1, 113], (158, p1, 251], [279, p1, 321), (379, p1, 385], [475, p1, 520], (589, p1, 612), (615, p1, 630], (662, p1, 663], (669, p1, 732), [805, p1, 845], (920, p1, 943), (949, p1, 1034), (1064, p1, 1099), [1198, p1, 1262), [1300, p1, 1379), [1470, p1, 1473), (1565, p1, 1573], (1656, p1, 1720), (1813, p1, 1861]} s2: {(-oo, p2, 102], [156, p2, 179], (201, p2, 254], [324, p2, 367), [444, p2, 514), [585, p2, 619), [678, p2, 718), [809, p2, 854], (905, p2, 942], (988, p2, 1024], (1090, p2, 1135], (1162, p2, 1174], [1192, p2, 1193), (1207, p2, 1208), [1243, p2, 1271], (1364, p2, 1380], (1474, p2, 1547], (1574, p2, 1604), (1656, p2, 1687], (1751, p2, 1802), [1878, p2, 1882], [1883, p2, oo)} union(s1, s2): {(-oo, p2, 39), [39, p1, 113], [156, p2, 158], (158, p1, 201], (201, p2, 254], [279, p1, 321), [324, p2, 367), (379, p1, 385], [444, p2, 475), [475, p1, 520], [585, p2, 615], (615, p1, 630], (662, p1, 663], (669, p1, 732), [805, p1, 809), [809, p2, 854], (905, p2, 920], (920, p1, 943), (949, p1, 1034), (1064, p1, 1090], (1090, p2, 1135], (1162, p2, 1174], [1192, p2, 1193), [1198, p1, 1243), [1243, p2, 1271], [1300, p1, 1364], (1364, p2, 1380], [1470, p1, 1473), (1474, p2, 1547], (1565, p1, 1573], (1574, p2, 1604), (1656, p1, 1720), (1751, p2, 1802), (1813, p1, 1861], [1878, p2, 1882], [1883, p2, oo)} s1: {(69, p1, 85], [92, p1, 177], [235, p1, 261], (271, p1, 336), [413, p1, 436], [483, p1, 579), (611, p1, 706], (724, p1, 807), (828, p1, 922], [983, p1, 984], (1016, p1, 1021], (1056, p1, 1080), (1096, p1, 1118), (1120, p1, 1206], [1219, p1, 1267], [1292, p1, 1369), (1402, p1, 1499], [1573, p1, 1632], [1638, p1, 1719], (1777, p1, 1831]} s2: {(-oo, p2, 255), (340, p2, 361), (384, p2, 475), [528, p2, 555], (622, p2, 716), [794, p2, 892), [940, p2, 984), (1072, p2, 1151], [1165, p2, 1166), [1227, p2, 1243), [1263, p2, 1351), (1428, p2, 1503), (1601, p2, 1607), [1613, p2, 1663], [1709, p2, 1758), [1810, p2, 1883], [1969, p2, 1970), (2049, p2, 2141), (2156, p2, 2242), [2315, p2, 2341), [2363, p2, 2415]} union(s1, s2): {(-oo, p2, 235), [235, p1, 261], (271, p1, 336), (340, p2, 361), (384, p2, 475), [483, p1, 579), (611, p1, 622], (622, p2, 716), (724, p1, 794), [794, p2, 828], (828, p1, 922], [940, p2, 983), [983, p1, 984], (1016, p1, 1021], (1056, p1, 1072], (1072, p2, 1120], (1120, p1, 1206], [1219, p1, 1263), [1263, p2, 1292), [1292, p1, 1369), (1402, p1, 1428], (1428, p2, 1503), [1573, p1, 1613), [1613, p2, 1638), [1638, p1, 1709), [1709, p2, 1758), (1777, p1, 1810), [1810, p2, 1883], [1969, p2, 1970), (2049, p2, 2141), (2156, p2, 2242), [2315, p2, 2341), [2363, p2, 2415]} s1: {(201, p1, 290], (314, p1, 382), (467, p1, 549), [618, p1, 712), (741, p1, 774], [823, p1, 914), (984, p1, 1069), [1122, p1, 1148), [1215, p1, 1290), [1323, p1, 1374], (1404, p1, 1475), (1532, p1, 1591), (1660, p1, 1701], [1705, p1, 1750), [1845, p1, 1890), [1902, p1, 1924), [2012, p1, 2056], [2079, p1, 2093], (2178, p1, 2210], (2244, p1, 2332], [2348, p1, oo)} s2: {(-oo, p2, -152), [-111, p2, -40), [28, p2, 95], (138, p2, 187), (202, p2, 293), (356, p2, 426), [438, p2, 476], (555, p2, 556], [561, p2, 575], (582, p2, 603], (625, p2, 647), [670, p2, 810], [826, p2, 913], (954, p2, 1019], [1105, p2, 1164], [1253, p2, 1295], [1334, p2, 1379], (1401, p2, 1526), (1540, p2, 1569), [1602, p2, oo)} union(s1, s2): {(-oo, p2, -152), [-111, p2, -40), [28, p2, 95], (138, p2, 187), (201, p1, 202], (202, p2, 293), (314, p1, 356], (356, p2, 426), [438, p2, 467], (467, p1, 549), (555, p2, 556], [561, p2, 575], (582, p2, 603], [618, p1, 670), [670, p2, 810], [823, p1, 914), (954, p2, 984], (984, p1, 1069), [1105, p2, 1164], [1215, p1, 1253), [1253, p2, 1295], [1323, p1, 1334), [1334, p2, 1379], (1401, p2, 1526), (1532, p1, 1591), [1602, p2, oo)} ------------------ s1: {} s2: {(-oo, ~p2, 1.4142135623?]} s3: {[0, p1, 2]} s4: {(-oo, ~p2, 0), [0, p1, 2]} s1: {[0, p1, 2]} s2: {[0, p2, 2]} union(s1, s2): {[0, p1, 2]} s1: {[0, p1, 2]} s2: {[-1.4142135623?, p2, 1]} union(s1, s2): {[-1.4142135623?, p2, 0), [0, p1, 2]} s1: {[-1.4142135623?, p1, 1]} s2: {[0, p2, 2]} union(s1, s2): {[-1.4142135623?, p1, 0), [0, p2, 2]} s1: {[-1.4142135623?, p1, 1]} s2: {[2, p2, 3]} union(s1, s2): {[-1.4142135623?, p1, 1], [2, p2, 3]} s1: {[-1.4142135623?, p1, 3]} s2: {[0, p2, 2]} union(s1, s2): {[-1.4142135623?, p1, 3]} s1: {[-2, p1, 2]} s2: {[-1.4142135623?, p2, 0], [1, p2, 3]} union(s1, s2): {[-2, p1, 1), [1, p2, 3]} s1: {[-2, p1, 2]} s2: {[2, p2, 3]} union(s1, s2): {[-2, p1, 2), [2, p2, 3]} s1: {[-2, p1, 2]} s2: {(2, p2, 3]} union(s1, s2): {[-2, p1, 2], (2, p2, 3]} s1: {[-2, p1, 2]} s2: {(2, p1, 3]} union(s1, s2): {[-2, p1, 3]} s1: {[-2, p1, 2)} s2: {(2, p1, 3]} union(s1, s2): {[-2, p1, 2), (2, p1, 3]} s1: {[2, p1, 2]} s2: {[2, p2, 3]} union(s1, s2): {[2, p2, 3]} s1: {[-2, p1, 0], [1, p1, 3]} s2: {(-oo, p2, -1.4142135623?]} union(s1, s2): {(-oo, p2, -2), [-2, p1, 0], [1, p1, 3]} s1: {[-2, p1, 0], [1, p1, 3]} s2: {(-oo, p2, -1.4142135623?], [1, p2, 1.4142135623?], [2, p2, oo)} union(s1, s2): {(-oo, p2, -2), [-2, p1, 0], [1, p1, 2), [2, p2, oo)} s1: {(-oo, p1, 1]} s2: {(1, p2, oo)} union(s1, s2): {(-oo, p1, 1], (1, p2, oo)}* s1: {(-oo, p1, 1]} s2: {(1, p2, 2), [2, p1, oo)} union(s1, s2): {(-oo, p1, 1], (1, p2, 2), [2, p1, oo)}* PASS (test nlsat :time 0.07 :before-memory 4.69 :after-memory 4.69) x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 1 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 2 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 0.5 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := -1 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := 1 x1 := -3 x2 := 2 x3 := 3 x3 > root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 > 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 > 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 > 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 1 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 2 x3 = root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x3 >= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 = 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 0.5 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := -1 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 > 0); !(x0 x3^2 + x1 x3 + x2 < 0); x0 x3^2 + x1 x3 + x2 x0 := -1 x1 := 3 x2 := -2 x3 := 3 x3 < root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 < 0); x3 <= root[1](x0 x3^2 + x1 x3 + x2) ==> !(4 x0 x2 - x1^2 < 0); !(x0 < 0); !(2 x0 x3 + x1 < 0); !(x0 x3^2 + x1 x3 + x2 < 0); ------------------ Off Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; On Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; ==> x3 - x0 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x5 - x3 > 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x4 < 0; x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; On Project x10 - x0 > 0; x10 - x1 > 0; x10 - x2 > 0; x10 - x3 > 0; x10 - x4 < 0; x10 - x5 < 0; x10 - x6 < 0; x10 - x7 < 0; x10 - x8 < 0; x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x1 > 0; x9 - x2 > 0; x9 - x3 > 0; x9 - x4 < 0; x9 - x5 < 0; x9 - x6 < 0; x9 - x7 < 0; x9 - x8 < 0; Off Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; ==> x5 > 0; x3 - x0 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x3 < 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; x5 x10 - x9 = 0; ==> x9 - x0 > 0; x9 - x4 < 0; x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x5 x10 - x0 > 0; x5 x10 - x1 > 0; x5 x10 - x2 > 0; x5 x10 - x3 > 0; x5 x10 - x4 < 0; x5 x10 - x5 < 0; x5 x10 - x6 < 0; x5 x10 - x7 < 0; x5 x10 - x8 < 0; x5 x10 - x9 = 0; ==> x5 x9 - x0 x5 > 0; x5 x9 - x1 x5 > 0; x5 x9 - x2 x5 > 0; x5 x9 - x3 x5 > 0; x5 x9 - x4 x5 < 0; x5 x9 - x5^2 < 0; x5 x9 - x5 x6 < 0; x5 x9 - x5 x7 < 0; x5 x9 - x5 x8 < 0; x5 > 0; Off Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; ==> x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; ==> x3 - x0 < 0; x1 < 0; x3 - x1 < 0; x3 - x2 < 0; x4 - x3 > 0; x5 - x3 > 0; x6 - x3 > 0; x7 - x3 > 0; x8 - x3 > 0; Off Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; x10 - x9 = 0; ==> x9 > root[1](x1 x9 - x4); x9 < root[1](x1 x9 - x0); x8 - x7 > 0; x7 - x6 > 0; x6 - x5 > 0; x5 - x4 > 0; x4 - x0 > 0; x3 - x2 < 0; x2 - x1 < 0; x1 - x0 < 0; x0 < 0; On Project x1 x10 - x0 > 0; x1 x10 - x1 > 0; x1 x10 - x2 > 0; x1 x10 - x3 > 0; x1 x10 - x4 < 0; x1 x10 - x5 < 0; x1 x10 - x6 < 0; x1 x10 - x7 < 0; x1 x10 - x8 < 0; x10 - x9 = 0; ==> x1 x9 - x0 > 0; x1 x9 - x1 > 0; x1 x9 - x2 > 0; x1 x9 - x3 > 0; x1 x9 - x4 < 0; x1 x9 - x5 < 0; x1 x9 - x6 < 0; x1 x9 - x7 < 0; x1 x9 - x8 < 0; ------------------ Project x0 x6^2 - x1 x6 - x2 = 0; ==> x2 > root[1](4 x0 x2 + x1^2); x0 > 0; ------------------ x5 + x4 > 0 x5 + x4 < 0 true b0 -> true x0 -> -0.5 x1 -> -0.5 x2 -> 1 x3 -> -1 x4 -> 0.5 x5 -> 1 x6 -> 2 0.5 1 2 ------------------ Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; ==> x6 + 2 > 0; x1 > 0; x0 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; ==> x6 + x0 x4^2 + 2 > 0; x6 + x2 x4 + 1 > 0; x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; ==> x5 > root[1](x1 x5 + 2 x2 x4 - x4 + 10); x2^2 - 4 x0 = 0; x0 > 0; 2 x0 x4 - x2 > 0; x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; ==> x5 > root[1](x1 x5 + 2 x0 x4^2 - x4 + 12); x1 > 0; Project x6 + x0 x4^2 + 2 > 0; - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; 5 x6 - x5 + x3 x4 > 0; ==> x5 > root[1](5 x1 x5 - 2 x5 + 2 x3 x4 - 5 x4 + 40); x2^2 - 4 x0 = 0; x0 > 0; 2 x0 x4 - x2 > 0; x1^2 x3^2 - 10 x1^2 x2 x3 - 2 x1 x3 + 25 x1^2 x2^2 + 10 x1 x2 + 40 x0 x1 - 96 x0 + 1 > 0; 2 x0 > 0; 4 x0 x4 + x1 x3 - 5 x1 x2 - 1 < 0; 2 x0 x4^2 + x1 x3 x4 - 5 x1 x2 x4 - x4 - 5 x1 + 12 < 0; x1^2 x3^2 - 15 x1^2 x2 x3 + 14 x1 x2 x3 - 2 x1 x3 + 50 x1^2 x2^2 - 80 x1 x2^2 + 24 x2^2 + 15 x1 x2 - 14 x2 + 25 x0 x1^2 - 100 x0 x1 + 100 x0 + 1 = 0; 800 x0 x1^4 - 800 x0 x1^3 = 0; x1^2 > 0; x1^2 x3 + 2 x1 x2 - x1 > 0; 160 x0 x1^3 - 384 x0 x1^2 < 0; x1^2 x3 - 5 x1^2 x2 - x1 < 0; x1 - 1 = 0; x2 > root[2](25 x1^2 x2^4 + 20 x1 x2^4 + 4 x2^4 - 400 x0 x1^2 x2^2 + 480 x0 x1 x2^2 - 192 x0 x2^2 + 1600 x0^2 x1^2 - 3840 x0^2 x1 + 2304 x0^2); 40 x0 x1 - 96 x0 < 0; x2 > 0; x2^2 + 10 x0 x1 - 24 x0 < 0; 35 x1 - 27 > 0; 175 x1^2 - 270 x1 + 96 > 0; 40 x1 - 19 > 0; 20 x1^2 - 19 x1 - 2 < 0; Project - 2 x6 + x1 x5 - x4 + 8 > 0; x6 + x2 x4 + 1 > 0; 5 x6 - x5 + x3 x4 > 0; ==> x5 > root[1](5 x1 x5 - 2 x5 + 2 x3 x4 - 5 x4 + 40); x4 > root[1](x1 x3 x4 - 5 x1 x2 x4 + 2 x2 x4 - x4 - 5 x1 + 10); x3 < root[1](x1 x3 - 5 x1 x2 + 2 x2 - 1); 5 x1 - 2 > 0; ------------------ 1) {(-oo, ~p1, -1.4142135623?), (1.4142135623?, ~p1, oo)} 2) {(-oo, ~p1, -1.4142135623?), (1.4142135623?, ~p1, oo)} ------------------ s1: {(-oo, p1, -13], (-12, p1, -11], [-9, p1, -7), (-7, p1, -5), (-3, p1, -2], (0, p1, 2), [4, p1, 7), (9, p1, 11), [12, p1, 14), [16, p1, 16]} s2: {(-10, p2, -7), [-5, p2, -4], [-2, p2, -1], [1, p2, 2), (4, p2, 5), (6, p2, 7), [8, p2, 9)} union(s1, s2): {(-oo, p1, -13], (-12, p1, -11], (-10, p2, -7), (-7, p1, -5), [-5, p2, -4], (-3, p1, -2), [-2, p2, -1], (0, p1, 2), [4, p1, 7), [8, p2, 9), (9, p1, 11), [12, p1, 14), [16, p1, 16]} s1: {[-16, p1, -15), (-14, p1, -13), (-13, p1, -12), [-11, p1, -9], [-7, p1, -6), (-4, p1, 2]} s2: {(-oo, p2, -15], [-14, p2, -12), (-10, p2, -8), [-7, p2, -6), (-4, p2, -2], (0, p2, 1), (1, p2, 2], (4, p2, 6)} union(s1, s2): {(-oo, p2, -15], [-14, p2, -12), [-11, p1, -10], (-10, p2, -8), [-7, p1, -6), (-4, p1, 2], (4, p2, 6)} s1: {(-15, p1, -13), (-13, p1, -12], (-11, p1, -8), (-8, p1, -6), (-5, p1, -4), [-2, p1, 0], (2, p1, 4], [5, p1, 6), [8, p1, 9)} s2: {(-oo, p2, -14], [-12, p2, -11), (-9, p2, -7), (-6, p2, -4), (-2, p2, 0), [1, p2, 2], (3, p2, 6), (6, p2, 8), [10, p2, oo)} union(s1, s2): {(-oo, p2, -15], (-15, p1, -13), (-13, p1, -12), [-12, p2, -11), (-11, p1, -9], (-9, p2, -8], (-8, p1, -6), (-6, p2, -4), [-2, p1, 0], [1, p2, 2], (2, p1, 3], (3, p2, 6), (6, p2, 8), [8, p1, 9), [10, p2, oo)} s1: {[-14, p1, -12], (-10, p1, -9), [-7, p1, -5], [-3, p1, -2), (-2, p1, -1), [1, p1, 2], [3, p1, 5), (5, p1, 7], (9, p1, 10), [12, p1, oo)} s2: {[-10, p2, -9), [-7, p2, -4), (-2, p2, 1), (1, p2, 2], (3, p2, 5], (7, p2, 8]} union(s1, s2): {[-14, p1, -12], [-10, p2, -9), [-7, p2, -4), [-3, p1, -2), (-2, p2, 1), [1, p1, 2], [3, p1, 3], (3, p2, 5], (5, p1, 7], (7, p2, 8], (9, p1, 10), [12, p1, oo)} s1: {(-14, p1, -13), (-11, p1, -9), (-9, p1, -8), (-6, p1, -5), (-4, p1, -2], [-1, p1, 1), [3, p1, 6], (8, p1, 9]} s2: {(-10, p2, -8), (-7, p2, -5), [-3, p2, -3], [-2, p2, -2], (0, p2, 1), [3, p2, 6), [8, p2, 9)} union(s1, s2): {(-14, p1, -13), (-11, p1, -10], (-10, p2, -8), (-7, p2, -5), (-4, p1, -2], [-1, p1, 1), [3, p1, 6], [8, p2, 8], (8, p1, 9]} s1: {(-12, p1, -11), (-9, p1, -8), (-6, p1, -5], [-4, p1, -4], (-3, p1, -2), [-1, p1, 2), (2, p1, 3], (5, p1, 7]} s2: {(-oo, p2, -15), [-13, p2, -13], [-11, p2, -9], (-8, p2, -7], (-6, p2, -4), (-4, p2, -2), (0, p2, 3], (5, p2, 7]} union(s1, s2): {(-oo, p2, -15), [-13, p2, -13], (-12, p1, -11), [-11, p2, -9], (-9, p1, -8), (-8, p2, -7], (-6, p2, -4), [-4, p1, -4], (-4, p2, -2), [-1, p1, 0], (0, p2, 3], (5, p1, 7]} s1: {(-11, p1, -8], (-6, p1, -4], (-2, p1, 0), (0, p1, 1), (2, p1, 4), [6, p1, 8), [10, p1, 11], (13, p1, 14), [16, p1, 17)} s2: {[-16, p2, -15], [-14, p2, -13], (-11, p2, -8], [-6, p2, -4), (-3, p2, 0]} union(s1, s2): {[-16, p2, -15], [-14, p2, -13], (-11, p1, -8], [-6, p2, -6], (-6, p1, -4], (-3, p2, 0], (0, p1, 1), (2, p1, 4), [6, p1, 8), [10, p1, 11], (13, p1, 14), [16, p1, 17)} s1: {[-19, p1, -17), (-17, p1, -16), (-16, p1, -13), [-12, p1, -11), (-11, p1, -10], [-9, p1, -9], [-7, p1, -3]} s2: {(-oo, p2, -15), [-13, p2, -10), (-8, p2, -6], [-5, p2, -4), [-3, p2, -2), [0, p2, 3), [5, p2, 6), (8, p2, 9]} union(s1, s2): {(-oo, p2, -16], (-16, p1, -13), [-13, p2, -11], (-11, p1, -10], [-9, p1, -9], (-8, p2, -7), [-7, p1, -3), [-3, p2, -2), [0, p2, 3), [5, p2, 6), (8, p2, 9]} s1: {(-10, p1, -9], (-8, p1, -6], (-5, p1, -4], [-3, p1, -2], [0, p1, 1), (1, p1, 3), [5, p1, 6], [8, p1, 9), [10, p1, oo)} s2: {[-10, p2, -9), [-8, p2, -7], [-6, p2, -5], (-4, p2, -2), [-1, p2, 0], [2, p2, 4], (6, p2, 7), [9, p2, 10)} union(s1, s2): {[-10, p2, -10], (-10, p1, -9], [-8, p2, -8], (-8, p1, -6), [-6, p2, -5], (-5, p1, -4], (-4, p2, -3), [-3, p1, -2], [-1, p2, 0), [0, p1, 1), (1, p1, 2), [2, p2, 4], [5, p1, 6], (6, p2, 7), [8, p1, 9), [9, p2, 10), [10, p1, oo)} s1: {(-oo, p1, -10], (-9, p1, -7), (-6, p1, -5], (-4, p1, -3], (-1, p1, 1], [3, p1, 4), (5, p1, 7), [9, p1, 10), (10, p1, 11], (12, p1, 14)} s2: {[-16, p2, -15), (-15, p2, -13), (-11, p2, -9], (-8, p2, -5], (-3, p2, -1), [1, p2, 3)} union(s1, s2): {(-oo, p1, -11], (-11, p2, -9], (-9, p1, -8], (-8, p2, -5], (-4, p1, -3], (-3, p2, -1), (-1, p1, 1), [1, p2, 3), [3, p1, 4), (5, p1, 7), [9, p1, 10), (10, p1, 11], (12, p1, 14)} s1: {(-oo, p1, -17), [-15, p1, -15], (-13, p1, -11), (-10, p1, -8], (-7, p1, -5), [-3, p1, 1], [3, p1, oo)} s2: {[-10, p2, -9], [-7, p2, -5], [-3, p2, -1), [0, p2, 1], [3, p2, 5), (5, p2, 6), [8, p2, 10), [11, p2, 13], [14, p2, 16]} union(s1, s2): {(-oo, p1, -17), [-15, p1, -15], (-13, p1, -11), [-10, p2, -10], (-10, p1, -8], [-7, p2, -5], [-3, p1, 1], [3, p1, oo)} s1: {(-13, p1, -11], (-10, p1, -9), (-8, p1, -6), (-4, p1, -3], (-2, p1, -1], (1, p1, 2), (3, p1, 5), [7, p1, 8], [9, p1, 10), [11, p1, oo)} s2: {(-7, p2, -6], [-4, p2, -3), (-3, p2, -2), (-2, p2, -1], [0, p2, 0], (2, p2, 4), (6, p2, 8], (9, p2, 11], [13, p2, 14), [15, p2, oo)} union(s1, s2): {(-13, p1, -11], (-10, p1, -9), (-8, p1, -7], (-7, p2, -6], [-4, p2, -4], (-4, p1, -3], (-3, p2, -2), (-2, p1, -1], [0, p2, 0], (1, p1, 2), (2, p2, 3], (3, p1, 5), (6, p2, 8], [9, p1, 9], (9, p2, 11), [11, p1, oo)} s1: {(-14, p1, -12), (-10, p1, -9), (-7, p1, -6), (-5, p1, -3), [-2, p1, -2], [0, p1, 0], (1, p1, 2), (4, p1, 7), (7, p1, oo)} s2: {[-18, p2, -16), (-16, p2, -14], [-13, p2, -11], [-10, p2, -9], [-7, p2, -5), [-4, p2, -4]} union(s1, s2): {[-18, p2, -16), (-16, p2, -14], (-14, p1, -13), [-13, p2, -11], [-10, p2, -9], [-7, p2, -5), (-5, p1, -3), [-2, p1, -2], [0, p1, 0], (1, p1, 2), (4, p1, 7), (7, p1, oo)} s1: {(-9, p1, -8), [-7, p1, -5), [-3, p1, -1], [1, p1, 2), [3, p1, 6], [8, p1, 9), (10, p1, 12], [13, p1, 14), (16, p1, 17)} s2: {(-oo, p2, -16), [-14, p2, -12), [-11, p2, -9], (-8, p2, -7), [-5, p2, -2), (0, p2, 1], (3, p2, 5)} union(s1, s2): {(-oo, p2, -16), [-14, p2, -12), [-11, p2, -9], (-9, p1, -8), (-8, p2, -7), [-7, p1, -5), [-5, p2, -3), [-3, p1, -1], (0, p2, 1), [1, p1, 2), [3, p1, 6], [8, p1, 9), (10, p1, 12], [13, p1, 14), (16, p1, 17)} s1: {(-oo, p1, -16], [-14, p1, -12], (-10, p1, -9], (-8, p1, -7), [-6, p1, -5), (-3, p1, -1), (-1, p1, 1), (3, p1, 5], (7, p1, 8]} s2: {(-18, p2, -16], [-15, p2, -14), [-13, p2, -12), (-11, p2, -9], (-7, p2, -4], [-2, p2, 0], [1, p2, oo)} union(s1, s2): {(-oo, p1, -16], [-15, p2, -14), [-14, p1, -12], (-11, p2, -9], (-8, p1, -7), (-7, p2, -4], (-3, p1, -2), [-2, p2, -1], (-1, p1, 1), [1, p2, oo)} s1: {(-oo, p1, -12], (-11, p1, -10], (-8, p1, -7), [-5, p1, -4), (-2, p1, 2], (4, p1, 7), [8, p1, 9), (10, p1, 11), (12, p1, oo)} s2: {(-oo, p2, -8], [-7, p2, -5], [-4, p2, -2), (0, p2, 2), (3, p2, 7], (9, p2, 11], [12, p2, 16], (17, p2, 19]} union(s1, s2): {(-oo, p2, -8], (-8, p1, -7), [-7, p2, -5), [-5, p1, -4), [-4, p2, -2), (-2, p1, 2], (3, p2, 7], [8, p1, 9), (9, p2, 11], [12, p2, 12], (12, p1, oo)} s1: {(-13, p1, -11), (-10, p1, -8], (-7, p1, -6), [-4, p1, -2), [-1, p1, 2), (3, p1, 4], (6, p1, 8), (8, p1, oo)} s2: {(-oo, p2, -18], (-16, p2, -14], [-12, p2, -10], (-9, p2, -7], (-5, p2, -3], (-1, p2, 0], [2, p2, 4], [5, p2, 6), (6, p2, 7]} union(s1, s2): {(-oo, p2, -18], (-16, p2, -14], (-13, p1, -12), [-12, p2, -10], (-10, p1, -9], (-9, p2, -7], (-7, p1, -6), (-5, p2, -4), [-4, p1, -2), [-1, p1, 2), [2, p2, 4], [5, p2, 6), (6, p1, 8), (8, p1, oo)} s1: {(-oo, p1, -9], [-8, p1, -6), (-6, p1, -5], [-3, p1, -2], (0, p1, 2), (3, p1, 5), (5, p1, 6), [7, p1, 8), [10, p1, 11), (13, p1, oo)} s2: {(-13, p2, -12), (-10, p2, -9], (-8, p2, -7], [-6, p2, -4], (-2, p2, -1], [0, p2, 1], [3, p2, 4), [5, p2, 6), (6, p2, 7]} union(s1, s2): {(-oo, p1, -9], [-8, p1, -6), [-6, p2, -4], [-3, p1, -2], (-2, p2, -1], [0, p2, 0], (0, p1, 2), [3, p2, 3], (3, p1, 5), [5, p2, 6), (6, p2, 7), [7, p1, 8), [10, p1, 11), (13, p1, oo)} s1: {[-15, p1, -15], (-14, p1, -12], [-10, p1, -8], [-7, p1, -7], (-5, p1, 2], [4, p1, 5]} s2: {(-14, p2, -13], (-11, p2, -9], [-7, p2, -6), [-5, p2, -3], [-2, p2, -2], [-1, p2, 0], (1, p2, 2), [4, p2, 5], [7, p2, 8], (9, p2, 10], (11, p2, oo)} union(s1, s2): {[-15, p1, -15], (-14, p1, -12], (-11, p2, -10), [-10, p1, -8], [-7, p2, -6), [-5, p2, -5], (-5, p1, 2], [4, p1, 5], [7, p2, 8], (9, p2, 10], (11, p2, oo)} s1: {(-14, p1, -12], (-11, p1, -10], [-9, p1, -8), (-7, p1, -6], (-4, p1, -3), (-2, p1, -1], (1, p1, 2], (3, p1, 6]} s2: {(-oo, p2, -17), (-15, p2, -14), (-12, p2, -10], [-8, p2, -8], (-6, p2, -5), [-4, p2, -3), (-2, p2, 0], [1, p2, 3], [5, p2, 7], (8, p2, 9)} union(s1, s2): {(-oo, p2, -17), (-15, p2, -14), (-14, p1, -12], (-12, p2, -10], [-9, p1, -8), [-8, p2, -8], (-7, p1, -6], (-6, p2, -5), [-4, p2, -3), (-2, p2, 0], [1, p2, 3], (3, p1, 5), [5, p2, 7], (8, p2, 9)} s1: {(-oo, p1, -15), (-14, p1, -13], [-12, p1, -11), (-10, p1, -8], [-6, p1, -4], (-3, p1, -2], (0, p1, 1), (3, p1, 5], [7, p1, 11]} s2: {[-11, p2, -10), (-10, p2, -9], [-7, p2, -6), (-4, p2, -2), [0, p2, 3], (4, p2, 5), (5, p2, 6), (6, p2, 7], (9, p2, oo)} union(s1, s2): {(-oo, p1, -15), (-14, p1, -13], [-12, p1, -11), [-11, p2, -10), (-10, p1, -8], [-7, p2, -6), [-6, p1, -4], (-4, p2, -3], (-3, p1, -2], [0, p2, 3], (3, p1, 5], (5, p2, 6), (6, p2, 7), [7, p1, 9], (9, p2, oo)} s1: {(-8, p1, -6], (-4, p1, -3], [-1, p1, 1), (1, p1, 2], (4, p1, 5), (7, p1, 9], [11, p1, 13), [14, p1, 15]} s2: {(-oo, p2, -16], (-14, p2, -13), (-13, p2, -12), (-10, p2, -9], (-7, p2, -6], [-5, p2, -3], (-2, p2, 1), (2, p2, 3), [5, p2, 6], (7, p2, oo)} union(s1, s2): {(-oo, p2, -16], (-14, p2, -13), (-13, p2, -12), (-10, p2, -9], (-8, p1, -6], [-5, p2, -3], (-2, p2, 1), (1, p1, 2], (2, p2, 3), (4, p1, 5), [5, p2, 6], (7, p2, oo)} s1: {(-8, p1, -7], (-5, p1, -3), (-3, p1, -1), [1, p1, 4], [5, p1, 7], (8, p1, 10), (10, p1, 11], [13, p1, oo)} s2: {(-oo, p2, -19], (-17, p2, -12), [-11, p2, -11], (-10, p2, -9), (-8, p2, -7], (-6, p2, -1), [0, p2, oo)} union(s1, s2): {(-oo, p2, -19], (-17, p2, -12), [-11, p2, -11], (-10, p2, -9), (-8, p1, -7], (-6, p2, -1), [0, p2, oo)} s1: {(-11, p1, -10], [-8, p1, -7), (-7, p1, -6], (-4, p1, -3), (-3, p1, -1], (1, p1, 2], (4, p1, 7), [8, p1, 10], [11, p1, 12], (13, p1, oo)} s2: {[-9, p2, -8], (-6, p2, -5), [-4, p2, -3), (-3, p2, -2), (-2, p2, -1), (0, p2, 2), [3, p2, 5], [6, p2, 8]} union(s1, s2): {(-11, p1, -10], [-9, p2, -8), [-8, p1, -7), (-7, p1, -6], (-6, p2, -5), [-4, p2, -3), (-3, p1, -1], (0, p2, 1], (1, p1, 2], [3, p2, 4], (4, p1, 6), [6, p2, 8), [8, p1, 10], [11, p1, 12], (13, p1, oo)} s1: {[-9, p1, -8), (-6, p1, -2), (-1, p1, 1), (2, p1, 6), (7, p1, 9], (10, p1, 11], (13, p1, 14], [15, p1, 16)} s2: {[-20, p2, -19), [-18, p2, -16], [-15, p2, -13], [-11, p2, -10], [-9, p2, -7], [-6, p2, -5), [-3, p2, -2), (0, p2, 1]} union(s1, s2): {[-20, p2, -19), [-18, p2, -16], [-15, p2, -13], [-11, p2, -10], [-9, p2, -7], [-6, p2, -6], (-6, p1, -2), (-1, p1, 0], (0, p2, 1], (2, p1, 6), (7, p1, 9], (10, p1, 11], (13, p1, 14], [15, p1, 16)} s1: {[-11, p1, -9), [-7, p1, -6], (-5, p1, -4), (-2, p1, 1], (3, p1, 4), (6, p1, 9), (11, p1, 12], (14, p1, 15), (15, p1, oo)} s2: {[-18, p2, -17], (-16, p2, -14], (-13, p2, -12), (-12, p2, -11], (-10, p2, -9), [-7, p2, -7], (-6, p2, -5], (-4, p2, -3)} union(s1, s2): {[-18, p2, -17], (-16, p2, -14], (-13, p2, -12), (-12, p2, -11), [-11, p1, -9), [-7, p1, -6], (-6, p2, -5], (-5, p1, -4), (-4, p2, -3), (-2, p1, 1], (3, p1, 4), (6, p1, 9), (11, p1, 12], (14, p1, 15), (15, p1, oo)} s1: {(-8, p1, -6), (-4, p1, -3), [-2, p1, 0), (2, p1, 5), [7, p1, 7], (9, p1, 10], [11, p1, 12], [14, p1, oo)} s2: {[-12, p2, -12], (-11, p2, -10], (-8, p2, -6], [-4, p2, 0), (0, p2, 2), (4, p2, 5), (7, p2, 9), [11, p2, oo)} union(s1, s2): {[-12, p2, -12], (-11, p2, -10], (-8, p2, -6], [-4, p2, 0), (0, p2, 2), (2, p1, 5), [7, p1, 7], (7, p2, 9), (9, p1, 10], [11, p2, oo)} s1: {[-10, p1, -9), [-8, p1, -6], (-5, p1, -4], [-2, p1, 0], [2, p1, 3), [4, p1, 5), [6, p1, 6], (7, p1, 10)} s2: {(-14, p2, -13), (-13, p2, -11], [-9, p2, -8], (-6, p2, -5), [-3, p2, -1), [1, p2, 2), (4, p2, 5), [7, p2, 8], [9, p2, 11)} union(s1, s2): {(-14, p2, -13), (-13, p2, -11], [-10, p1, -9), [-9, p2, -8), [-8, p1, -6], (-6, p2, -5), (-5, p1, -4], [-3, p2, -2), [-2, p1, 0], [1, p2, 2), [2, p1, 3), [4, p1, 5), [6, p1, 6], [7, p2, 7], (7, p1, 9), [9, p2, 11)} s1: {(-oo, p1, -17), (-17, p1, -16), (-16, p1, -15], (-14, p1, -13], [-11, p1, -10], (-8, p1, -4], (-3, p1, 1), [2, p1, 3), (3, p1, 4)} s2: {[-15, p2, -12], [-10, p2, -8), [-6, p2, -4], (-3, p2, -1), [1, p2, 4), [5, p2, 7)} union(s1, s2): {(-oo, p1, -17), (-17, p1, -16), (-16, p1, -15), [-15, p2, -12], [-11, p1, -10), [-10, p2, -8), (-8, p1, -4], (-3, p1, 1), [1, p2, 4), [5, p2, 7)} s1: {[-18, p1, -17], (-16, p1, -15), [-13, p1, -10], [-9, p1, -7], [-6, p1, -5), [-3, p1, -1), (0, p1, 2], (3, p1, 5]} s2: {(-9, p2, -8), (-6, p2, -4), [-2, p2, -1], (1, p2, 2), (3, p2, 6), (8, p2, 10), [12, p2, 14], (15, p2, oo)} union(s1, s2): {[-18, p1, -17], (-16, p1, -15), [-13, p1, -10], [-9, p1, -7], [-6, p1, -6], (-6, p2, -4), [-3, p1, -2), [-2, p2, -1], (0, p1, 2], (3, p2, 6), (8, p2, 10), [12, p2, 14], (15, p2, oo)} s1: {(-18, p1, -16], [-14, p1, -12], [-10, p1, -9), (-9, p1, -8), [-7, p1, -4], [-3, p1, -3], [-1, p1, 1), [2, p1, 2]} s2: {(-17, p2, -16), [-15, p2, -14), (-14, p2, -13), [-11, p2, -10), (-8, p2, -7), (-5, p2, -4), (-2, p2, -1], (0, p2, 2), (3, p2, 4], (5, p2, 6]} union(s1, s2): {(-18, p1, -16], [-15, p2, -14), [-14, p1, -12], [-11, p2, -10), [-10, p1, -9), (-9, p1, -8), (-8, p2, -7), [-7, p1, -4], [-3, p1, -3], (-2, p2, -1), [-1, p1, 0], (0, p2, 2), [2, p1, 2], (3, p2, 4], (5, p2, 6]} s1: {(-11, p1, -9], [-7, p1, -6), [-4, p1, -1), [0, p1, 1), (3, p1, 5), (6, p1, 8), [10, p1, 12], (14, p1, oo)} s2: {[-10, p2, -8), (-6, p2, -5), (-4, p2, -3), [-2, p2, -2], (-1, p2, 0], [2, p2, 4], (5, p2, 6), (8, p2, 10], [12, p2, oo)} union(s1, s2): {(-11, p1, -10), [-10, p2, -8), [-7, p1, -6), (-6, p2, -5), [-4, p1, -1), (-1, p2, 0), [0, p1, 1), [2, p2, 3], (3, p1, 5), (5, p2, 6), (6, p1, 8), (8, p2, 10), [10, p1, 12), [12, p2, oo)} s1: {[-17, p1, -15), (-15, p1, -13], [-12, p1, -10), (-9, p1, -7), [-6, p1, -4), (-4, p1, -3), [-2, p1, 2], [3, p1, oo)} s2: {(-17, p2, -16), (-15, p2, -12], [-11, p2, -9], [-7, p2, -5), [-4, p2, -3), [-1, p2, 1], [2, p2, 3), (3, p2, oo)} union(s1, s2): {[-17, p1, -15), (-15, p2, -12), [-12, p1, -11), [-11, p2, -9], (-9, p1, -7), [-7, p2, -6), [-6, p1, -4), [-4, p2, -3), [-2, p1, 2), [2, p2, 3), [3, p1, oo)} s1: {(-oo, p1, -12], [-11, p1, -8], (-6, p1, -5], (-3, p1, -1), [1, p1, 2], [3, p1, 4), (5, p1, 6), [7, p1, 8], (9, p1, 11], [13, p1, oo)} s2: {[-13, p2, -11], [-10, p2, -8), (-7, p2, -6), [-4, p2, -2], [0, p2, 0], [1, p2, 2), (3, p2, 4], [6, p2, 7), [9, p2, 12]} union(s1, s2): {(-oo, p1, -13), [-13, p2, -11), [-11, p1, -8], (-7, p2, -6), (-6, p1, -5], [-4, p2, -3], (-3, p1, -1), [0, p2, 0], [1, p1, 2], [3, p1, 3], (3, p2, 4], (5, p1, 6), [6, p2, 7), [7, p1, 8], [9, p2, 12], [13, p1, oo)} s1: {[-18, p1, -17], (-16, p1, -14), (-13, p1, -11), [-9, p1, -7), (-5, p1, -3), (-2, p1, -1), (0, p1, 3]} s2: {(-oo, p2, -11), (-9, p2, -8), [-7, p2, -6), (-6, p2, -5], (-3, p2, -1), [0, p2, 2), (4, p2, 6), (6, p2, 7), [8, p2, 10), [11, p2, 12), [13, p2, 14]} union(s1, s2): {(-oo, p2, -11), [-9, p1, -7), [-7, p2, -6), (-6, p2, -5], (-5, p1, -3), (-3, p2, -1), [0, p2, 0], (0, p1, 3], (4, p2, 6), (6, p2, 7), [8, p2, 10), [11, p2, 12), [13, p2, 14]} s1: {(-17, p1, -15], (-13, p1, -9], [-8, p1, -7], (-5, p1, -4], [-3, p1, -1]} s2: {[-7, p2, -4), (-4, p2, -3], (-1, p2, 0), [1, p2, 5], (6, p2, 7), (7, p2, 8), [10, p2, 11)} union(s1, s2): {(-17, p1, -15], (-13, p1, -9], [-8, p1, -7), [-7, p2, -5], (-5, p1, -4], (-4, p2, -3), [-3, p1, -1], (-1, p2, 0), [1, p2, 5], (6, p2, 7), (7, p2, 8), [10, p2, 11)} s1: {(-oo, p1, -13], [-12, p1, -10), [-9, p1, -6), [-4, p1, -2), [-1, p1, 1), (3, p1, 4), (5, p1, 7], [9, p1, 11), (11, p1, 12], (14, p1, 15]} s2: {[-14, p2, -12), (-11, p2, -10), [-8, p2, -7), [-5, p2, -5], (-4, p2, -3], [-1, p2, 1], (2, p2, 3), (3, p2, 5), (7, p2, 8], [10, p2, oo)} union(s1, s2): {(-oo, p1, -14), [-14, p2, -12), [-12, p1, -10), [-9, p1, -6), [-5, p2, -5], [-4, p1, -2), [-1, p2, 1], (2, p2, 3), (3, p2, 5), (5, p1, 7], (7, p2, 8], [9, p1, 10), [10, p2, oo)} s1: {[-9, p1, -8), [-7, p1, -5], [-3, p1, -3], (-1, p1, 1), (1, p1, 3), [5, p1, 6), (6, p1, 8)} s2: {(-oo, p2, -18], (-17, p2, -13], [-11, p2, -10), (-8, p2, -7), (-7, p2, -4], [-3, p2, oo)} union(s1, s2): {(-oo, p2, -18], (-17, p2, -13], [-11, p2, -10), [-9, p1, -8), (-8, p2, -7), [-7, p1, -7], (-7, p2, -4], [-3, p2, oo)} s1: {[-17, p1, -14), [-13, p1, -11), (-11, p1, -10), (-8, p1, -7], (-6, p1, -4], (-3, p1, -1), (1, p1, 2), [3, p1, 5), (7, p1, oo)} s2: {[-18, p2, -17), (-16, p2, -14), [-12, p2, -12], [-11, p2, -9), (-8, p2, -4), [-3, p2, -1], (1, p2, 2), (3, p2, 4)} union(s1, s2): {[-18, p2, -17), [-17, p1, -14), [-13, p1, -11), [-11, p2, -9), (-8, p2, -6], (-6, p1, -4], [-3, p2, -1], (1, p1, 2), [3, p1, 5), (7, p1, oo)} s1: {[-15, p1, -14), (-13, p1, -9), [-7, p1, -5), [-4, p1, -2], [0, p1, 2), [3, p1, 4]} s2: {(-9, p2, -7), [-6, p2, -3], (-2, p2, -1], (0, p2, 1), [3, p2, 4), [5, p2, 6], [7, p2, 8), (9, p2, 11)} union(s1, s2): {[-15, p1, -14), (-13, p1, -9), (-9, p2, -7), [-7, p1, -6), [-6, p2, -4), [-4, p1, -2], (-2, p2, -1], [0, p1, 2), [3, p1, 4], [5, p2, 6], [7, p2, 8), (9, p2, 11)} s1: {[-20, p1, -18], (-17, p1, -16), [-14, p1, -12), [-11, p1, -9], [-8, p1, -6), (-4, p1, -2], [-1, p1, -1], (1, p1, 3], (5, p1, 6), (6, p1, 7]} s2: {(-13, p2, -12), [-11, p2, -10), [-8, p2, -7), [-6, p2, -5), (-5, p2, -4), (-3, p2, -1), (-1, p2, 0), (0, p2, 3]} union(s1, s2): {[-20, p1, -18], (-17, p1, -16), [-14, p1, -12), [-11, p1, -9], [-8, p1, -6), [-6, p2, -5), (-5, p2, -4), (-4, p1, -3], (-3, p2, -1), [-1, p1, -1], (-1, p2, 0), (0, p2, 3], (5, p1, 6), (6, p1, 7]} s1: {(-11, p1, -9], [-7, p1, -6), (-6, p1, -4), [-3, p1, 0], [2, p1, 3), (5, p1, 7]} s2: {[-9, p2, -6], (-4, p2, -3], (-2, p2, -1), [0, p2, 1], (3, p2, 6], [7, p2, 9), [10, p2, 11], (12, p2, 13]} union(s1, s2): {(-11, p1, -9), [-9, p2, -6], (-6, p1, -4), (-4, p2, -3), [-3, p1, 0), [0, p2, 1], [2, p1, 3), (3, p2, 5], (5, p1, 7), [7, p2, 9), [10, p2, 11], (12, p2, 13]} s1: {[-8, p1, -6), (-6, p1, -5), (-5, p1, -4], [-2, p1, -1), [1, p1, 2], [4, p1, 6), [8, p1, 10], (11, p1, 12], (13, p1, 16]} s2: {(-oo, p2, -10], [-8, p2, -4), (-4, p2, -3), (-2, p2, 0], [1, p2, 7], [9, p2, oo)} union(s1, s2): {(-oo, p2, -10], [-8, p2, -5], (-5, p1, -4], (-4, p2, -3), [-2, p1, -2], (-2, p2, 0], [1, p2, 7], [8, p1, 9), [9, p2, oo)} s1: {(-oo, p1, -15], (-13, p1, -12], [-10, p1, -9), (-7, p1, -5), (-5, p1, -4], [-3, p1, -2), [0, p1, 1), [3, p1, 4), (6, p1, 9]} s2: {(-oo, p2, -19), (-19, p2, -16], [-15, p2, -14], [-12, p2, -10), (-10, p2, -8], [-7, p2, -6), (-4, p2, 0), [1, p2, 3]} union(s1, s2): {(-oo, p1, -15), [-15, p2, -14], (-13, p1, -12), [-12, p2, -10), [-10, p1, -10], (-10, p2, -8], [-7, p2, -7], (-7, p1, -5), (-5, p1, -4], (-4, p2, 0), [0, p1, 1), [1, p2, 3), [3, p1, 4), (6, p1, 9]} s1: {[-9, p1, -8), [-6, p1, -4], (-3, p1, -2], (0, p1, 2), (2, p1, 3), (3, p1, 4), (4, p1, 8), (8, p1, 11]} s2: {(-13, p2, -11), (-9, p2, -7), [-5, p2, -4), (-3, p2, -1], [1, p2, 3), (3, p2, 5], (7, p2, 8]} union(s1, s2): {(-13, p2, -11), [-9, p1, -9], (-9, p2, -7), [-6, p1, -4], (-3, p2, -1], (0, p1, 1), [1, p2, 3), (3, p2, 4], (4, p1, 7], (7, p2, 8], (8, p1, 11]} s1: {[-19, p1, -18), (-17, p1, -15), [-14, p1, -7], [-6, p1, -6], (-5, p1, oo)} s2: {(-14, p2, -13), [-11, p2, -7], [-6, p2, -5), [-3, p2, 0], [1, p2, 2), (3, p2, 4), (5, p2, 6), (8, p2, oo)} union(s1, s2): {[-19, p1, -18), (-17, p1, -15), [-14, p1, -7], [-6, p2, -5), (-5, p1, oo)} s1: {[-14, p1, -13], [-11, p1, -10], [-9, p1, -8], [-7, p1, -6), [-5, p1, 1), (2, p1, 3]} s2: {[-10, p2, -9), [-7, p2, -6), [-5, p2, -3], [-2, p2, 0], [2, p2, 3), [5, p2, 6), (7, p2, 9), [10, p2, 11]} union(s1, s2): {[-14, p1, -13], [-11, p1, -10), [-10, p2, -9), [-9, p1, -8], [-7, p1, -6), [-5, p1, 1), [2, p2, 2], (2, p1, 3], [5, p2, 6), (7, p2, 9), [10, p2, 11]} s1: {(-12, p1, -11), [-9, p1, -9], (-8, p1, -7), (-7, p1, -5), (-3, p1, -2], (-1, p1, 0], (1, p1, 4), (5, p1, 6], [7, p1, 8)} s2: {[-16, p2, -14], (-13, p2, -12), (-12, p2, -11], [-9, p2, -8], [-6, p2, -4], [-3, p2, -2], (-1, p2, 2), (3, p2, 4), (4, p2, 5], [7, p2, oo)} union(s1, s2): {[-16, p2, -14], (-13, p2, -12), (-12, p2, -11], [-9, p2, -8], (-8, p1, -7), (-7, p1, -6), [-6, p2, -4], [-3, p2, -2], (-1, p2, 1], (1, p1, 4), (4, p2, 5], (5, p1, 6], [7, p2, oo)} s1: {[-13, p1, -11], (-9, p1, -7), (-7, p1, -5], (-3, p1, -2], [-1, p1, 1], [2, p1, 3), [5, p1, 7), (9, p1, 10]} s2: {(-8, p2, -7], (-6, p2, -5], [-4, p2, -2), (0, p2, 2], (3, p2, 4), (5, p2, 6], (7, p2, 8], [10, p2, 11)} union(s1, s2): {[-13, p1, -11], (-9, p1, -8], (-8, p2, -7], (-7, p1, -5], [-4, p2, -3], (-3, p1, -2], [-1, p1, 0], (0, p2, 2), [2, p1, 3), (3, p2, 4), [5, p1, 7), (7, p2, 8], (9, p1, 10), [10, p2, 11)} s1: {(-12, p1, -10), [-9, p1, -8), [-6, p1, -5), (-3, p1, -1], [1, p1, 3], (5, p1, 6], [7, p1, 7], [9, p1, 10), (12, p1, oo)} s2: {[-11, p2, -9), (-9, p2, -8), (-6, p2, -4], [-3, p2, 1], [2, p2, 3], (4, p2, 5), [7, p2, 9], [11, p2, oo)} union(s1, s2): {(-12, p1, -11), [-11, p2, -9), [-9, p1, -8), [-6, p1, -6], (-6, p2, -4], [-3, p2, 1), [1, p1, 3], (4, p2, 5), (5, p1, 6], [7, p2, 9), [9, p1, 10), [11, p2, oo)} s1: {[-10, p1, -8], (-7, p1, -4), [-3, p1, -3], [-1, p1, 0], [2, p1, 3), [4, p1, 5], (6, p1, 8], [10, p1, 11], (13, p1, 14)} s2: {(-oo, p2, -12], (-10, p2, -8], (-7, p2, -6], (-5, p2, -4), (-4, p2, -1], (0, p2, 2], [4, p2, 8]} union(s1, s2): {(-oo, p2, -12], [-10, p1, -8], (-7, p1, -4), (-4, p2, -1), [-1, p1, 0], (0, p2, 2), [2, p1, 3), [4, p2, 8], [10, p1, 11], (13, p1, 14)} s1: {[-10, p1, -9), [-7, p1, -6), (-4, p1, -2), [0, p1, 0], (2, p1, 3), [5, p1, 6), [7, p1, 9), (9, p1, 10), (12, p1, 14], [16, p1, 18], [19, p1, oo)} s2: {(-10, p2, -9], [-7, p2, -3], [-1, p2, 1], (2, p2, 4], [5, p2, 8), [9, p2, 10), (10, p2, 12), (14, p2, oo)} union(s1, s2): {[-10, p1, -10], (-10, p2, -9], [-7, p2, -4], (-4, p1, -2), [-1, p2, 1], (2, p2, 4], [5, p2, 7), [7, p1, 9), [9, p2, 10), (10, p2, 12), (12, p1, 14], (14, p2, oo)} s1: {(-oo, p1, -16), (-16, p1, -15), (-13, p1, -11), [-9, p1, -7), [-6, p1, 0), [2, p1, 4]} s2: {(-oo, p2, -18], [-16, p2, -16], (-15, p2, -14], [-12, p2, -10], [-8, p2, -7), (-7, p2, -6), [-5, p2, -5], [-4, p2, -3], [-1, p2, 1)} union(s1, s2): {(-oo, p1, -16), [-16, p2, -16], (-16, p1, -15), (-15, p2, -14], (-13, p1, -12), [-12, p2, -10], [-9, p1, -7), (-7, p2, -6), [-6, p1, -1), [-1, p2, 1), [2, p1, 4]} s1: {(-oo, p1, -13), (-12, p1, -11], [-10, p1, -10], (-9, p1, -8), (-6, p1, -4], (-3, p1, -2), [-1, p1, 1), (1, p1, 4), (6, p1, 7), (7, p1, 8)} s2: {[-13, p2, -12), (-11, p2, -9], [-7, p2, -6), [-5, p2, -1), (0, p2, 3), (4, p2, oo)} union(s1, s2): {(-oo, p1, -13), [-13, p2, -12), (-12, p1, -11], (-11, p2, -9], (-9, p1, -8), [-7, p2, -6), (-6, p1, -5), [-5, p2, -1), [-1, p1, 0], (0, p2, 1], (1, p1, 4), (4, p2, oo)} s1: {[-10, p1, -8], [-7, p1, -6), (-6, p1, -4], [-2, p1, -1], (1, p1, 3), [4, p1, 5), (5, p1, 6]} s2: {[-11, p2, -10], [-8, p2, -7), (-5, p2, -4), [-2, p2, -1], (0, p2, 2), (2, p2, 6), (7, p2, 8), (10, p2, 11), [13, p2, 15)} union(s1, s2): {[-11, p2, -10), [-10, p1, -8), [-8, p2, -7), [-7, p1, -6), (-6, p1, -4], [-2, p1, -1], (0, p2, 1], (1, p1, 2], (2, p2, 5], (5, p1, 6], (7, p2, 8), (10, p2, 11), [13, p2, 15)} s1: {(-16, p1, -13), (-13, p1, -11), [-10, p1, -5), [-3, p1, -1), (1, p1, 2), [4, p1, 6], (8, p1, 9)} s2: {(-14, p2, -13), [-11, p2, -10), [-8, p2, -7), (-7, p2, -6), (-5, p2, -4], (-2, p2, -1), (0, p2, 1), (3, p2, 5), [7, p2, oo)} union(s1, s2): {(-16, p1, -13), (-13, p1, -11), [-11, p2, -10), [-10, p1, -5), (-5, p2, -4], [-3, p1, -1), (0, p2, 1), (1, p1, 2), (3, p2, 4), [4, p1, 6], [7, p2, oo)} s1: {(-11, p1, -10), (-10, p1, -8), [-7, p1, -4), (-4, p1, -3], (-1, p1, 0], (2, p1, 4], [5, p1, 6), (7, p1, oo)} s2: {[-14, p2, -14], [-13, p2, -12), [-11, p2, -8), (-8, p2, -6], [-5, p2, -4), [-2, p2, -1), [0, p2, 1], [3, p2, oo)} union(s1, s2): {[-14, p2, -14], [-13, p2, -12), [-11, p2, -8), (-8, p2, -7), [-7, p1, -4), (-4, p1, -3], [-2, p2, -1), (-1, p1, 0), [0, p2, 1], (2, p1, 3), [3, p2, oo)} s1: {(-oo, p1, -18), (-16, p1, -15), (-15, p1, -14], [-13, p1, -11), (-11, p1, -9], [-8, p1, -7], (-5, p1, -1), (0, p1, 1], (2, p1, 3], [4, p1, 5]} s2: {(-oo, p2, -14), (-12, p2, -11), [-10, p2, -9], [-7, p2, -5), [-4, p2, 0], [2, p2, 2], (4, p2, 6), (8, p2, 9), [10, p2, 12)} union(s1, s2): {(-oo, p2, -15], (-15, p1, -14], [-13, p1, -11), (-11, p1, -9], [-8, p1, -7), [-7, p2, -5), (-5, p1, -4), [-4, p2, 0], (0, p1, 1], [2, p2, 2], (2, p1, 3], [4, p1, 4], (4, p2, 6), (8, p2, 9), [10, p2, 12)} s1: {[-13, p1, -12], [-10, p1, -9), [-7, p1, -4), [-2, p1, 0], (2, p1, 6), (6, p1, oo)} s2: {(-14, p2, -13), (-13, p2, -12], [-11, p2, -9], [-8, p2, -7], (-6, p2, -4], (-2, p2, 1), (3, p2, 4], (6, p2, 8]} union(s1, s2): {(-14, p2, -13), [-13, p1, -12], [-11, p2, -9], [-8, p2, -7), [-7, p1, -6], (-6, p2, -4], [-2, p1, -2], (-2, p2, 1), (2, p1, 6), (6, p1, oo)} s1: {(-oo, p1, -16], [-14, p1, -12], [-10, p1, -8], (-6, p1, -4), [-2, p1, -1), [1, p1, 3], (5, p1, 6], (8, p1, 10), (10, p1, 12], [14, p1, 15]} s2: {(-17, p2, -16], (-15, p2, -14], (-13, p2, -9], [-7, p2, 1], (3, p2, 4]} union(s1, s2): {(-oo, p1, -16], (-15, p2, -14), [-14, p1, -13], (-13, p2, -10), [-10, p1, -8], [-7, p2, 1), [1, p1, 3], (3, p2, 4], (5, p1, 6], (8, p1, 10), (10, p1, 12], [14, p1, 15]} s1: {(-14, p1, -13), (-12, p1, -11), (-9, p1, -8), (-7, p1, -5], (-3, p1, -1], [0, p1, 1), (3, p1, 4], (5, p1, 6], (8, p1, 9)} s2: {(-9, p2, -8), (-7, p2, -6], (-5, p2, -2], [0, p2, 1], (2, p2, 4], (5, p2, 7]} union(s1, s2): {(-14, p1, -13), (-12, p1, -11), (-9, p1, -8), (-7, p1, -5], (-5, p2, -3], (-3, p1, -1], [0, p2, 1], (2, p2, 4], (5, p2, 7], (8, p1, 9)} s1: {[-11, p1, -9], [-7, p1, -5), [-3, p1, 0], [2, p1, 3), (5, p1, 7), [8, p1, 14]} s2: {(-18, p2, -17), (-17, p2, -15), [-14, p2, -12], [-10, p2, -9], [-8, p2, -6], (-4, p2, -3), (-3, p2, -1], (1, p2, 2), [4, p2, 5), [6, p2, oo)} union(s1, s2): {(-18, p2, -17), (-17, p2, -15), [-14, p2, -12], [-11, p1, -9], [-8, p2, -7), [-7, p1, -5), (-4, p2, -3), [-3, p1, 0], (1, p2, 2), [2, p1, 3), [4, p2, 5), (5, p1, 6), [6, p2, oo)} s1: {(-10, p1, -9], (-8, p1, -6], (-4, p1, -3], [-2, p1, -1), (-1, p1, 1), (1, p1, 3), [4, p1, 5), (5, p1, 7), (9, p1, 11)} s2: {(-oo, p2, -17), (-15, p2, -14], (-12, p2, -11), (-11, p2, -10), [-8, p2, -7), (-6, p2, -5], [-4, p2, -3), [-2, p2, -1], [0, p2, 1), [2, p2, 3]} union(s1, s2): {(-oo, p2, -17), (-15, p2, -14], (-12, p2, -11), (-11, p2, -10), (-10, p1, -9], [-8, p2, -8], (-8, p1, -6], (-6, p2, -5], [-4, p2, -4], (-4, p1, -3], [-2, p2, -1], (-1, p1, 1), (1, p1, 2), [2, p2, 3], [4, p1, 5), (5, p1, 7), (9, p1, 11)} s1: {[-10, p1, -5), (-4, p1, -3], (-2, p1, -1], [0, p1, 2], (4, p1, 5], [7, p1, 9], (10, p1, 12]} s2: {(-14, p2, -11), [-9, p2, -8), (-8, p2, -5), (-4, p2, -2), (-2, p2, 0], [1, p2, 2), (2, p2, 4)} union(s1, s2): {(-14, p2, -11), [-10, p1, -5), (-4, p2, -2), (-2, p2, 0), [0, p1, 2], (2, p2, 4), (4, p1, 5], [7, p1, 9], (10, p1, 12]} s1: {(-oo, p1, -16), (-16, p1, -15), [-14, p1, -12), (-12, p1, -11), [-10, p1, -8], (-6, p1, -4], (-3, p1, -2), (0, p1, 1], [3, p1, 5]} s2: {(-oo, p2, -15), (-15, p2, -14), (-14, p2, -12), (-12, p2, -11], [-10, p2, -9), [-7, p2, -5), (-5, p2, -3), [-1, p2, 2]} union(s1, s2): {(-oo, p2, -15), (-15, p2, -14), [-14, p1, -12), (-12, p2, -11], [-10, p1, -8], [-7, p2, -6], (-6, p1, -5], (-5, p2, -3), (-3, p1, -2), [-1, p2, 2], [3, p1, 5]} s1: {[-14, p1, -10), (-9, p1, -7), (-7, p1, -6), (-6, p1, -5], [-3, p1, -2), (-2, p1, -1), [1, p1, 4), (5, p1, oo)} s2: {[-9, p2, -7), (-5, p2, -3), (-2, p2, 0], (2, p2, 4), (6, p2, 8), (8, p2, 11)} union(s1, s2): {[-14, p1, -10), [-9, p2, -7), (-7, p1, -6), (-6, p1, -5], (-5, p2, -3), [-3, p1, -2), (-2, p2, 0], [1, p1, 4), (5, p1, oo)} s1: {[-12, p1, -11), [-9, p1, -7], [-6, p1, -5), (-3, p1, -1), [1, p1, 2), (3, p1, 5], [7, p1, 9], (11, p1, 12], [14, p1, 16], [18, p1, oo)} s2: {(-14, p2, -10], [-8, p2, -7], (-6, p2, -4), [-3, p2, 0), (1, p2, 2), (3, p2, 5)} union(s1, s2): {(-14, p2, -10], [-9, p1, -7], [-6, p1, -6], (-6, p2, -4), [-3, p2, 0), [1, p1, 2), (3, p1, 5], [7, p1, 9], (11, p1, 12], [14, p1, 16], [18, p1, oo)} s1: {(-11, p1, -10], [-8, p1, -5), [-4, p1, -2], [0, p1, 3], (5, p1, 6), (8, p1, 10]} s2: {[-18, p2, -16], [-15, p2, -13), [-12, p2, -8], (-7, p2, -6], (-4, p2, 0], [1, p2, 2], (4, p2, 5]} union(s1, s2): {[-18, p2, -16], [-15, p2, -13), [-12, p2, -8), [-8, p1, -5), [-4, p1, -4], (-4, p2, 0), [0, p1, 3], (4, p2, 5], (5, p1, 6), (8, p1, 10]} s1: {(-14, p1, -13), [-11, p1, -7), [-5, p1, -4), (-3, p1, -2], [-1, p1, 0], [2, p1, 3), (4, p1, 5), (5, p1, 6), (8, p1, oo)} s2: {(-oo, p2, -15], (-13, p2, -12], [-11, p2, -10], (-9, p2, -8], (-7, p2, -4], [-3, p2, -1], (0, p2, 1), (3, p2, 4)} union(s1, s2): {(-oo, p2, -15], (-14, p1, -13), (-13, p2, -12], [-11, p1, -7), (-7, p2, -4], [-3, p2, -1), [-1, p1, 0], (0, p2, 1), [2, p1, 3), (3, p2, 4), (4, p1, 5), (5, p1, 6), (8, p1, oo)} s1: {[-8, p1, -6), (-4, p1, -2), [-1, p1, 1], [3, p1, 7), [8, p1, 10], (12, p1, 14], (15, p1, 19)} s2: {(-17, p2, -16), (-15, p2, -14), (-14, p2, -13), (-12, p2, -10), [-9, p2, -7), (-6, p2, -4), (-2, p2, -1], [0, p2, 1), (3, p2, oo)} union(s1, s2): {(-17, p2, -16), (-15, p2, -14), (-14, p2, -13), (-12, p2, -10), [-9, p2, -8), [-8, p1, -6), (-6, p2, -4), (-4, p1, -2), (-2, p2, -1), [-1, p1, 1], [3, p1, 3], (3, p2, oo)} s1: {(-oo, p1, -9], [-8, p1, -6], [-5, p1, -4), (-4, p1, -1], [0, p1, 1], (3, p1, 4), [6, p1, 8]} s2: {(-18, p2, -17), [-16, p2, -14), [-13, p2, -11), (-9, p2, -6), (-4, p2, -3), [-2, p2, 1]} union(s1, s2): {(-oo, p1, -9], (-9, p2, -8), [-8, p1, -6], [-5, p1, -4), (-4, p1, -2), [-2, p2, 1], (3, p1, 4), [6, p1, 8]} s1: {(-16, p1, -15), (-13, p1, -11], [-9, p1, -8), [-7, p1, -5], (-3, p1, -2), (-2, p1, -1], [0, p1, 2), (4, p1, 6), [7, p1, 8], [10, p1, 11), [13, p1, oo)} s2: {(-12, p2, -11], [-9, p2, -4], (-2, p2, -1], (0, p2, 2), [4, p2, 4], (5, p2, 7)} union(s1, s2): {(-16, p1, -15), (-13, p1, -11], [-9, p2, -4], (-3, p1, -2), (-2, p1, -1], [0, p1, 2), [4, p2, 4], (4, p1, 5], (5, p2, 7), [7, p1, 8], [10, p1, 11), [13, p1, oo)} s1: {(-17, p1, -16), [-14, p1, -13), [-12, p1, -10], (-8, p1, -6), [-4, p1, -3), [-1, p1, 0], (2, p1, 4]} s2: {(-oo, p2, -14], [-12, p2, -11], [-9, p2, -8], (-6, p2, -5), (-5, p2, -3], [-1, p2, 1), (3, p2, 4), (6, p2, 9]} union(s1, s2): {(-oo, p2, -14), [-14, p1, -13), [-12, p1, -10], [-9, p2, -8], (-8, p1, -6), (-6, p2, -5), (-5, p2, -3], [-1, p2, 1), (2, p1, 4], (6, p2, 9]} s1: {(-oo, p1, -17], (-15, p1, -14], [-12, p1, -12], [-10, p1, -6), (-6, p1, -5), (-3, p1, -1], [1, p1, 4), (4, p1, 6]} s2: {(-oo, p2, -11), (-11, p2, -9), (-9, p2, -7), (-6, p2, -5], [-3, p2, -2), (-2, p2, -1), [0, p2, 2), [4, p2, 6]} union(s1, s2): {(-oo, p2, -11), (-11, p2, -10), [-10, p1, -6), (-6, p2, -5], [-3, p2, -3], (-3, p1, -1], [0, p2, 1), [1, p1, 4), [4, p2, 6]} s1: {(-oo, p1, -17), [-15, p1, -14), (-14, p1, -12], [-10, p1, -10], (-9, p1, -8), [-6, p1, -6], [-5, p1, -5], [-3, p1, 0), (0, p1, 1]} s2: {[-11, p2, -11], (-10, p2, -9), [-7, p2, -5], [-4, p2, -3], [-1, p2, 0), (1, p2, 2), (3, p2, 5], [6, p2, 8], (9, p2, 11), (13, p2, 14)} union(s1, s2): {(-oo, p1, -17), [-15, p1, -14), (-14, p1, -12], [-11, p2, -11], [-10, p1, -10], (-10, p2, -9), (-9, p1, -8), [-7, p2, -5], [-4, p2, -3), [-3, p1, 0), (0, p1, 1], (1, p2, 2), (3, p2, 5], [6, p2, 8], (9, p2, 11), (13, p2, 14)} s1: {[-17, p1, -16), (-16, p1, -15), [-13, p1, -11), [-9, p1, -7], [-6, p1, -6], (-5, p1, -1), (0, p1, 1), (3, p1, 4]} s2: {(-oo, p2, -17), [-15, p2, -13], [-12, p2, -11], (-9, p2, -6), (-6, p2, -5], [-4, p2, -3), (-1, p2, 0), (2, p2, 3], [4, p2, 4], [6, p2, oo)} union(s1, s2): {(-oo, p2, -17), [-17, p1, -16), (-16, p1, -15), [-15, p2, -13), [-13, p1, -12), [-12, p2, -11], [-9, p1, -9], (-9, p2, -6), [-6, p1, -6], (-6, p2, -5], (-5, p1, -1), (-1, p2, 0), (0, p1, 1), (2, p2, 3], (3, p1, 4], [6, p2, oo)} s1: {[-16, p1, -15), [-13, p1, -11], [-10, p1, -9], [-8, p1, -6), [-5, p1, -4), (-4, p1, -3], (-2, p1, -1), [0, p1, 1], [2, p1, 5)} s2: {(-oo, p2, -12), (-11, p2, -8), (-6, p2, -3], [-2, p2, -1), [0, p2, 2), (2, p2, 4), [6, p2, 8], (9, p2, 10)} union(s1, s2): {(-oo, p2, -13), [-13, p1, -11], (-11, p2, -8), [-8, p1, -6), (-6, p2, -3], [-2, p2, -1), [0, p2, 2), [2, p1, 5), [6, p2, 8], (9, p2, 10)} s1: {(-11, p1, -10], [-8, p1, -7), [-5, p1, -4), (-4, p1, -2), (-1, p1, 2], [4, p1, 5), [7, p1, 8), (8, p1, 9), [11, p1, 12]} s2: {(-16, p2, -15), (-13, p2, -12), (-11, p2, -9), [-8, p2, -7), (-6, p2, -4], (-2, p2, -1), (0, p2, 1], (2, p2, 3]} union(s1, s2): {(-16, p2, -15), (-13, p2, -12), (-11, p2, -9), [-8, p1, -7), (-6, p2, -4], (-4, p1, -2), (-2, p2, -1), (-1, p1, 2], (2, p2, 3], [4, p1, 5), [7, p1, 8), (8, p1, 9), [11, p1, 12]} s1: {(-13, p1, -9), (-8, p1, -6), (-6, p1, -4), (-2, p1, -1), (0, p1, 3), (5, p1, 6)} s2: {(-18, p2, -17], [-15, p2, -14), [-13, p2, -13], [-11, p2, -9), [-8, p2, -6), (-5, p2, -4], [-2, p2, 0], [1, p2, 3], [4, p2, oo)} union(s1, s2): {(-18, p2, -17], [-15, p2, -14), [-13, p2, -13], (-13, p1, -9), [-8, p2, -6), (-6, p1, -5], (-5, p2, -4], [-2, p2, 0], (0, p1, 1), [1, p2, 3], [4, p2, oo)} s1: {[-11, p1, -10), [-9, p1, -8], (-6, p1, -5), (-4, p1, -3], (-2, p1, -1], (1, p1, 2], (3, p1, 4), [5, p1, 6), [8, p1, 9]} s2: {(-oo, p2, -13), [-11, p2, -10], [-8, p2, -6), [-5, p2, -5], [-4, p2, -3), [-2, p2, -1], (0, p2, 3], [5, p2, 6), [8, p2, 9)} union(s1, s2): {(-oo, p2, -13), [-11, p2, -10], [-9, p1, -8), [-8, p2, -6), (-6, p1, -5), [-5, p2, -5], [-4, p2, -4], (-4, p1, -3], [-2, p2, -1], (0, p2, 3], (3, p1, 4), [5, p1, 6), [8, p1, 9]} s1: {[-18, p1, -17), [-15, p1, -14], (-12, p1, -10), [-8, p1, -5), (-3, p1, -1), (-1, p1, 2), (2, p1, 3), (4, p1, 5]} s2: {[-14, p2, -13], (-11, p2, -9), [-7, p2, -3), (-3, p2, -1), [1, p2, 4)} union(s1, s2): {[-18, p1, -17), [-15, p1, -14), [-14, p2, -13], (-12, p1, -11], (-11, p2, -9), [-8, p1, -7), [-7, p2, -3), (-3, p1, -1), (-1, p1, 1), [1, p2, 4), (4, p1, 5]} s1: {(-15, p1, -13), [-11, p1, -10), (-9, p1, -8], (-7, p1, -6], (-5, p1, -4), (-3, p1, -2), (-2, p1, -1], [0, p1, 1), [2, p1, 3), (4, p1, 6)} s2: {[-8, p2, -6), [-4, p2, -3), [-2, p2, -1], (0, p2, 2], [3, p2, 4), (5, p2, 6], [8, p2, 9), [10, p2, 13), [14, p2, 16], (17, p2, oo)} union(s1, s2): {(-15, p1, -13), [-11, p1, -10), (-9, p1, -8), [-8, p2, -7], (-7, p1, -6], (-5, p1, -4), [-4, p2, -3), (-3, p1, -2), [-2, p2, -1], [0, p1, 0], (0, p2, 2), [2, p1, 3), [3, p2, 4), (4, p1, 5], (5, p2, 6], [8, p2, 9), [10, p2, 13), [14, p2, 16], (17, p2, oo)} s1: {[-8, p1, -6), [-4, p1, -3), (-1, p1, 0), [2, p1, 6), (6, p1, 7), [8, p1, 12)} s2: {(-17, p2, -15), (-13, p2, -11], (-9, p2, -8], [-6, p2, -4), (-3, p2, -2), (-2, p2, 2], (4, p2, oo)} union(s1, s2): {(-17, p2, -15), (-13, p2, -11], (-9, p2, -8), [-8, p1, -6), [-6, p2, -4), [-4, p1, -3), (-3, p2, -2), (-2, p2, 2), [2, p1, 4], (4, p2, oo)} s1: {(-oo, p1, -14), (-13, p1, -12), (-12, p1, -10], (-9, p1, -4], [-2, p1, 2], (3, p1, 4]} s2: {[-19, p2, -16], [-14, p2, -12], (-11, p2, -10), (-8, p2, -6], (-4, p2, -2], [0, p2, 4), [5, p2, 6)} union(s1, s2): {(-oo, p1, -14), [-14, p2, -12], (-12, p1, -10], (-9, p1, -4], (-4, p2, -2), [-2, p1, 0), [0, p2, 3], (3, p1, 4], [5, p2, 6)} s1: {(-oo, p1, -17), [-15, p1, -13), [-12, p1, -11), (-11, p1, -10], [-9, p1, -7), [-5, p1, -4), [-3, p1, -3], [-2, p1, -1), (-1, p1, 0], [1, p1, 3), (4, p1, oo)} s2: {(-oo, p2, -19), [-18, p2, -18], [-17, p2, -16), [-15, p2, -13), (-12, p2, -10), (-10, p2, -9), (-7, p2, -6], (-5, p2, -3], (-2, p2, 1], [2, p2, 4), (5, p2, oo)} union(s1, s2): {(-oo, p1, -17), [-17, p2, -16), [-15, p1, -13), [-12, p1, -12], (-12, p2, -11], (-11, p1, -10], (-10, p2, -9), [-9, p1, -7), (-7, p2, -6], [-5, p1, -5], (-5, p2, -3], [-2, p1, -2], (-2, p2, 1), [1, p1, 2), [2, p2, 4), (4, p1, oo)} s1: {[-15, p1, -13), (-12, p1, -11), (-10, p1, -9], [-7, p1, -6], [-4, p1, -2), (-2, p1, -1], [1, p1, 6), (8, p1, 9]} s2: {(-19, p2, -17], [-15, p2, -15], [-14, p2, -12), (-11, p2, -9), (-8, p2, -7), (-7, p2, -5], [-4, p2, -2], (0, p2, oo)} union(s1, s2): {(-19, p2, -17], [-15, p1, -14), [-14, p2, -12), (-12, p1, -11), (-11, p2, -10], (-10, p1, -9], (-8, p2, -7), [-7, p1, -7], (-7, p2, -5], [-4, p2, -2], (-2, p1, -1], (0, p2, oo)} s1: {(-oo, p1, -16), (-16, p1, -15), (-14, p1, -12), [-10, p1, -8), [-7, p1, -4), [-2, p1, 0), (0, p1, 1), (3, p1, 4), (6, p1, oo)} s2: {[-15, p2, -13), [-11, p2, -10), (-8, p2, -5), (-3, p2, -1), (1, p2, 3), (4, p2, 6), (8, p2, oo)} union(s1, s2): {(-oo, p1, -16), (-16, p1, -15), [-15, p2, -14], (-14, p1, -12), [-11, p2, -10), [-10, p1, -8), (-8, p2, -7), [-7, p1, -4), (-3, p2, -2), [-2, p1, 0), (0, p1, 1), (1, p2, 3), (3, p1, 4), (4, p2, 6), (6, p1, oo)} s1: {[-15, p1, -11], (-10, p1, -8), [-6, p1, -4), [-3, p1, -1), [0, p1, 3), (4, p1, 5), (5, p1, 6)} s2: {[-11, p2, -9], [-8, p2, -4), (-3, p2, -1), [0, p2, 1), (1, p2, 2), (3, p2, 5), (6, p2, 9), (9, p2, oo)} union(s1, s2): {[-15, p1, -11), [-11, p2, -10], (-10, p1, -8), [-8, p2, -4), [-3, p1, -1), [0, p1, 3), (3, p2, 5), (5, p1, 6), (6, p2, 9), (9, p2, oo)} s1: {[-14, p1, -14], (-12, p1, -10], [-9, p1, -7], (-6, p1, -4), (-4, p1, -3], (-2, p1, -1], [1, p1, 3], (4, p1, 7), (7, p1, 8]} s2: {[-11, p2, -9), [-8, p2, -5), [-3, p2, -2), [0, p2, 2), (2, p2, 3], (5, p2, 6], [7, p2, 9], (10, p2, 11), [13, p2, 14), [15, p2, oo)} union(s1, s2): {[-14, p1, -14], (-12, p1, -11), [-11, p2, -9), [-9, p1, -8), [-8, p2, -6], (-6, p1, -4), (-4, p1, -3), [-3, p2, -2), (-2, p1, -1], [0, p2, 1), [1, p1, 3], (4, p1, 7), [7, p2, 9], (10, p2, 11), [13, p2, 14), [15, p2, oo)} s1: {(-10, p1, -7), [-5, p1, -4), [-2, p1, -1), [0, p1, 0], (2, p1, 4], [6, p1, 10], [12, p1, 12]} s2: {(-11, p2, -9], (-8, p2, -6), (-6, p2, -2], (0, p2, 2), (3, p2, 5), (5, p2, 6]} union(s1, s2): {(-11, p2, -10], (-10, p1, -8], (-8, p2, -6), (-6, p2, -2), [-2, p1, -1), [0, p1, 0], (0, p2, 2), (2, p1, 3], (3, p2, 5), (5, p2, 6), [6, p1, 10], [12, p1, 12]} s1: {(-15, p1, -14), (-13, p1, -12], (-11, p1, -10], (-9, p1, -7], (-5, p1, -4], (-3, p1, 1], [3, p1, oo)} s2: {(-12, p2, -11), (-10, p2, -7], [-6, p2, -6], (-5, p2, -4], (-3, p2, -1], [0, p2, 2], (3, p2, 4)} union(s1, s2): {(-15, p1, -14), (-13, p1, -12], (-12, p2, -11), (-11, p1, -10], (-10, p2, -7], [-6, p2, -6], (-5, p1, -4], (-3, p1, 0), [0, p2, 2], [3, p1, oo)} s1: {(-oo, p1, -12), [-10, p1, -7), (-5, p1, -3), [-2, p1, 0], [2, p1, 4), [5, p1, 8], (9, p1, 11), [13, p1, 15], (17, p1, 18)} s2: {[-17, p2, -14), [-13, p2, -12), [-10, p2, -9), (-8, p2, -7), [-5, p2, -5], (-4, p2, -3), [-1, p2, 1), [2, p2, 2], [3, p2, 5]} union(s1, s2): {(-oo, p1, -12), [-10, p1, -7), [-5, p2, -5], (-5, p1, -3), [-2, p1, -1), [-1, p2, 1), [2, p1, 3), [3, p2, 5), [5, p1, 8], (9, p1, 11), [13, p1, 15], (17, p1, 18)} s1: {(-oo, p1, -12], (-10, p1, -9], [-7, p1, -7], (-5, p1, -3), [-1, p1, 1), (1, p1, 2), [3, p1, 4), (4, p1, 6], [8, p1, 10), [12, p1, 14], (16, p1, 17]} s2: {[-14, p2, -12), [-10, p2, -9), (-7, p2, -4), [-3, p2, -3], [-2, p2, 0], (1, p2, 2), [3, p2, 3], [5, p2, oo)} union(s1, s2): {(-oo, p1, -12], [-10, p2, -10], (-10, p1, -9], [-7, p1, -7], (-7, p2, -5], (-5, p1, -3), [-3, p2, -3], [-2, p2, -1), [-1, p1, 1), (1, p1, 2), [3, p1, 4), (4, p1, 5), [5, p2, oo)} s1: {(-15, p1, -13), [-12, p1, -10], [-8, p1, -7), (-5, p1, -1), (-1, p1, 2], (3, p1, 5]} s2: {(-11, p2, -10], (-9, p2, -7], [-6, p2, -5), (-5, p2, -4], (-2, p2, 0), [2, p2, 4), (6, p2, 8), [10, p2, 12)} union(s1, s2): {(-15, p1, -13), [-12, p1, -10], (-9, p2, -7], [-6, p2, -5), (-5, p1, -2], (-2, p2, -1], (-1, p1, 2), [2, p2, 3], (3, p1, 5], (6, p2, 8), [10, p2, 12)} s1: {(-14, p1, -12), (-12, p1, -10), (-9, p1, -8), (-6, p1, -5], (-4, p1, -3], (-1, p1, 1), (3, p1, 4), (5, p1, 6]} s2: {(-oo, p2, -10], (-8, p2, -6), [-5, p2, -4), [-3, p2, -2), (-2, p2, -1), (0, p2, 2), [4, p2, 5], (6, p2, 7], (9, p2, 10), (12, p2, 13]} union(s1, s2): {(-oo, p2, -10], (-9, p1, -8), (-8, p2, -6), (-6, p1, -5), [-5, p2, -4), (-4, p1, -3), [-3, p2, -2), (-2, p2, -1), (-1, p1, 0], (0, p2, 2), (3, p1, 4), [4, p2, 5], (5, p1, 6], (6, p2, 7], (9, p2, 10), (12, p2, 13]} s1: {(-18, p1, -16], [-15, p1, -15], (-14, p1, -7), (-5, p1, -4), (-4, p1, -3], [-1, p1, 3)} s2: {(-oo, p2, -7], (-5, p2, -3), (-1, p2, 1), [2, p2, 3), (5, p2, 6), (7, p2, 8), (9, p2, 10], (12, p2, 13], (15, p2, 17], [19, p2, 20)} union(s1, s2): {(-oo, p2, -7], (-5, p2, -4], (-4, p1, -3], [-1, p1, 3), (5, p2, 6), (7, p2, 8), (9, p2, 10], (12, p2, 13], (15, p2, 17], [19, p2, 20)} s1: {[-19, p1, -15], [-13, p1, -12), [-10, p1, -9], (-7, p1, -3), [-2, p1, 0)} s2: {[-9, p2, -8], [-7, p2, -4), (-2, p2, -1], [1, p2, 3], [4, p2, 5), (6, p2, 7), (9, p2, 10], [12, p2, 13), (15, p2, 16)} union(s1, s2): {[-19, p1, -15], [-13, p1, -12), [-10, p1, -9), [-9, p2, -8], [-7, p2, -7], (-7, p1, -3), [-2, p1, 0), [1, p2, 3], [4, p2, 5), (6, p2, 7), (9, p2, 10], [12, p2, 13), (15, p2, 16)} s1: {(-oo, p1, -16), (-16, p1, -15), (-14, p1, -12), [-10, p1, -9), (-8, p1, -7), (-6, p1, -4], [-2, p1, -2], (0, p1, 2], [3, p1, oo)} s2: {(-oo, p2, -15), (-13, p2, -11], (-10, p2, -9), (-8, p2, -6), (-4, p2, -3], (-1, p2, 0), (2, p2, oo)} union(s1, s2): {(-oo, p2, -15), (-14, p1, -13], (-13, p2, -11], [-10, p1, -9), (-8, p2, -6), (-6, p1, -4], (-4, p2, -3], [-2, p1, -2], (-1, p2, 0), (0, p1, 2], (2, p2, oo)} s1: {(-oo, p1, -8], [-7, p1, -5], [-3, p1, 1], (2, p1, 4], [5, p1, 7), (9, p1, 10), [11, p1, 12), (14, p1, 15]} s2: {(-10, p2, -9), [-7, p2, -5), (-5, p2, -3], [-1, p2, 1], [2, p2, 4], [6, p2, 9), (11, p2, 13), [15, p2, 16)} union(s1, s2): {(-oo, p1, -8], [-7, p1, -5], (-5, p2, -3), [-3, p1, 1], [2, p2, 4], [5, p1, 6), [6, p2, 9), (9, p1, 10), [11, p1, 11], (11, p2, 13), (14, p1, 15), [15, p2, 16)} s1: {(-18, p1, -17], [-16, p1, -15), [-14, p1, -13), (-12, p1, -7], (-6, p1, -5), (-4, p1, -2), (-2, p1, -1]} s2: {(-8, p2, -7], [-6, p2, -5], (-3, p2, -1), [1, p2, 2), [4, p2, 9], (10, p2, 11), (13, p2, oo)} union(s1, s2): {(-18, p1, -17], [-16, p1, -15), [-14, p1, -13), (-12, p1, -7], [-6, p2, -5], (-4, p1, -3], (-3, p2, -2], (-2, p1, -1], [1, p2, 2), [4, p2, 9], (10, p2, 11), (13, p2, oo)} s1: {(-oo, p1, 26), (89, p1, 174], [238, p1, 320), (358, p1, 413], (471, p1, 512), [545, p1, 546), [574, p1, 623), (678, p1, 760), [794, p1, 802), (874, p1, 876], [957, p1, 1039], (1122, p1, 1202), (1235, p1, 1318], [1357, p1, 1384), [1444, p1, 1514], [1562, p1, 1650), [1662, p1, 1754], [1778, p1, 1868], [1957, p1, 2003], (2006, p1, 2080), [2120, p1, 2127), (2127, p1, oo)} s2: {(-oo, p2, 12), (39, p2, 72), [113, p2, 184), [255, p2, 344], (438, p2, 469), (492, p2, 527), (576, p2, 636), (653, p2, 748), [767, p2, 833), [919, p2, 988], (1012, p2, 1022), (1109, p2, 1173], [1197, p2, 1284], [1330, p2, 1364], [1389, p2, 1438], [1501, p2, 1506), [1520, p2, 1557], [1581, p2, 1626), [1677, p2, 1751], (1816, p2, 1820), (1911, p2, 1993), [2042, p2, oo)} union(s1, s2): {(-oo, p1, 26), (39, p2, 72), (89, p1, 113), [113, p2, 184), [238, p1, 255), [255, p2, 344], (358, p1, 413], (438, p2, 469), (471, p1, 492], (492, p2, 527), [545, p1, 546), [574, p1, 576], (576, p2, 636), (653, p2, 678], (678, p1, 760), [767, p2, 833), (874, p1, 876], [919, p2, 957), [957, p1, 1039], (1109, p2, 1122], (1122, p1, 1197), [1197, p2, 1235], (1235, p1, 1318], [1330, p2, 1357), [1357, p1, 1384), [1389, p2, 1438], [1444, p1, 1514], [1520, p2, 1557], [1562, p1, 1650), [1662, p1, 1754], [1778, p1, 1868], (1911, p2, 1957), [1957, p1, 2003], (2006, p1, 2042), [2042, p2, oo)} s1: {(-121, p1, -107), [-78, p1, 0], [98, p1, 123), [124, p1, 219), [261, p1, 269], (354, p1, 373), [385, p1, 482], [565, p1, 605), (624, p1, 660], [682, p1, 774), (856, p1, 887], [927, p1, 943), (950, p1, 958), [971, p1, 999), [1079, p1, 1166), [1199, p1, 1292], (1374, p1, 1375), (1408, p1, 1425), (1490, p1, 1544], (1595, p1, 1622]} s2: {(4, p2, 82), [181, p2, 212], [262, p2, 349), (380, p2, 416), (439, p2, 473], [546, p2, 572], (610, p2, 659), [728, p2, 746], [773, p2, 837), [934, p2, 987], (1003, p2, 1087), (1097, p2, 1141], [1190, p2, 1242], (1307, p2, 1396), [1445, p2, 1520], (1539, p2, 1620), (1652, p2, 1664], (1685, p2, 1754), [1773, p2, 1801], [1830, p2, 1865], [1937, p2, oo)} union(s1, s2): {(-121, p1, -107), [-78, p1, 0], (4, p2, 82), [98, p1, 123), [124, p1, 219), [261, p1, 262), [262, p2, 349), (354, p1, 373), (380, p2, 385), [385, p1, 482], [546, p2, 565), [565, p1, 605), (610, p2, 624], (624, p1, 660], [682, p1, 773), [773, p2, 837), (856, p1, 887], [927, p1, 934), [934, p2, 971), [971, p1, 999), (1003, p2, 1079), [1079, p1, 1166), [1190, p2, 1199), [1199, p1, 1292], (1307, p2, 1396), (1408, p1, 1425), [1445, p2, 1490], (1490, p1, 1539], (1539, p2, 1595], (1595, p1, 1622], (1652, p2, 1664], (1685, p2, 1754), [1773, p2, 1801], [1830, p2, 1865], [1937, p2, oo)} s1: {(-oo, p1, 62), (155, p1, 207), (234, p1, 262], (333, p1, 403), [419, p1, 490], (496, p1, 570], (606, p1, 669), [707, p1, 719], [778, p1, 873), [899, p1, 956], (1032, p1, 1094), [1179, p1, 1189], (1190, p1, 1285), (1378, p1, 1474), [1500, p1, 1538), (1578, p1, 1595], (1685, p1, 1686), (1775, p1, 1824), (1882, p1, 1889), [1890, p1, 1912], (1992, p1, 2089]} s2: {(-oo, p2, -27], (37, p2, 75], (97, p2, 106], [162, p2, 192), (240, p2, 326), (395, p2, 464), [510, p2, 514], [582, p2, 636), [643, p2, 701), (711, p2, 808], [828, p2, 911), (941, p2, 999], (1004, p2, 1034), (1040, p2, 1110], (1170, p2, 1177), [1226, p2, 1281), (1322, p2, 1407], (1467, p2, 1474), [1513, p2, 1595], [1632, p2, 1641), [1691, p2, 1760), (1796, p2, oo)} union(s1, s2): {(-oo, p1, 37], (37, p2, 75], (97, p2, 106], (155, p1, 207), (234, p1, 240], (240, p2, 326), (333, p1, 395], (395, p2, 419), [419, p1, 490], (496, p1, 570], [582, p2, 606], (606, p1, 643), [643, p2, 701), [707, p1, 711], (711, p2, 778), [778, p1, 828), [828, p2, 899), [899, p1, 941], (941, p2, 999], (1004, p2, 1032], (1032, p1, 1040], (1040, p2, 1110], (1170, p2, 1177), [1179, p1, 1189], (1190, p1, 1285), (1322, p2, 1378], (1378, p1, 1474), [1500, p1, 1513), [1513, p2, 1595], [1632, p2, 1641), (1685, p1, 1686), [1691, p2, 1760), (1775, p1, 1796], (1796, p2, oo)} s1: {[-161, p1, -126], [-68, p1, -67), [32, p1, 54), (133, p1, 216], (219, p1, 309), (364, p1, 433], [445, p1, 500], (563, p1, 608], (692, p1, 700], (744, p1, 836), (872, p1, 888], [950, p1, 1048], (1082, p1, 1102], (1145, p1, 1196], [1282, p1, 1349), (1435, p1, 1494], (1590, p1, 1652), [1745, p1, 1810), (1899, p1, 1962], (2009, p1, 2029]} s2: {[-97, p2, -19), (-3, p2, 47), (77, p2, 91], [132, p2, 132], (134, p2, 208], [214, p2, 246], [321, p2, 413), (428, p2, 435], [438, p2, 479), (487, p2, 561], (653, p2, 671), (754, p2, 816], (886, p2, 916), [935, p2, 988), [1026, p2, 1074), (1166, p2, 1213], [1279, p2, 1349), (1361, p2, 1376], [1414, p2, 1493), (1543, p2, oo)} union(s1, s2): {[-161, p1, -126], [-97, p2, -19), (-3, p2, 32), [32, p1, 54), (77, p2, 91], [132, p2, 132], (133, p1, 214), [214, p2, 219], (219, p1, 309), [321, p2, 364], (364, p1, 428], (428, p2, 435], [438, p2, 445), [445, p1, 487], (487, p2, 561], (563, p1, 608], (653, p2, 671), (692, p1, 700], (744, p1, 836), (872, p1, 886], (886, p2, 916), [935, p2, 950), [950, p1, 1026), [1026, p2, 1074), (1082, p1, 1102], (1145, p1, 1166], (1166, p2, 1213], [1279, p2, 1349), (1361, p2, 1376], [1414, p2, 1435], (1435, p1, 1494], (1543, p2, oo)} s1: {[39, p1, 108), [131, p1, 177), [242, p1, 257), (283, p1, 321], (348, p1, 418), (490, p1, 525), [583, p1, 606], [686, p1, 735), (776, p1, 785), (815, p1, 851], [870, p1, 964), (1055, p1, 1152], (1247, p1, 1267], [1321, p1, 1404), [1410, p1, 1427], (1501, p1, 1532], (1628, p1, 1659], (1724, p1, 1801), (1876, p1, 1944], (2014, p1, 2043)} s2: {(-78, p2, -74), (-19, p2, 49], (139, p2, 197], (263, p2, 354], (363, p2, 460), (558, p2, 579), [582, p2, 642), (678, p2, 696], (790, p2, 869), (961, p2, 1004), (1078, p2, 1079), (1175, p2, 1228], (1289, p2, 1322), [1379, p2, 1380), [1452, p2, 1453], (1538, p2, 1599), (1648, p2, 1655], [1730, p2, 1818), [1901, p2, 1978), (2031, p2, 2130)} union(s1, s2): {(-78, p2, -74), (-19, p2, 39), [39, p1, 108), [131, p1, 139], (139, p2, 197], [242, p1, 257), (263, p2, 348], (348, p1, 363], (363, p2, 460), (490, p1, 525), (558, p2, 579), [582, p2, 642), (678, p2, 686), [686, p1, 735), (776, p1, 785), (790, p2, 869), [870, p1, 961], (961, p2, 1004), (1055, p1, 1152], (1175, p2, 1228], (1247, p1, 1267], (1289, p2, 1321), [1321, p1, 1404), [1410, p1, 1427], [1452, p2, 1453], (1501, p1, 1532], (1538, p2, 1599), (1628, p1, 1659], (1724, p1, 1730), [1730, p2, 1818), (1876, p1, 1901), [1901, p2, 1978), (2014, p1, 2031], (2031, p2, 2130)} s1: {[49, p1, 74], (110, p1, 177), [261, p1, 297], [373, p1, 404), [474, p1, 488), [546, p1, 576], (669, p1, 702], [772, p1, 845), [882, p1, 884), (890, p1, 934], [1031, p1, 1117), (1128, p1, 1218), [1307, p1, 1337), [1373, p1, 1455], (1528, p1, 1560], [1637, p1, 1637], [1689, p1, 1713], [1774, p1, 1821), [1883, p1, 1918), [1960, p1, 1988], (2031, p1, oo)} s2: {(-oo, p2, -123], [-105, p2, -49], (4, p2, 57), (132, p2, 156), [219, p2, 242), [256, p2, 297), [300, p2, 348], [374, p2, 413), (502, p2, 556], [654, p2, 660], [703, p2, 736], [824, p2, 893], [978, p2, 1006], (1038, p2, 1134), [1169, p2, 1260], (1333, p2, 1403), (1404, p2, 1438), (1478, p2, 1561), (1561, p2, 1630], [1654, p2, 1657), (1667, p2, 1693]} union(s1, s2): {(-oo, p2, -123], [-105, p2, -49], (4, p2, 49), [49, p1, 74], (110, p1, 177), [219, p2, 242), [256, p2, 261), [261, p1, 297], [300, p2, 348], [373, p1, 374), [374, p2, 413), [474, p1, 488), (502, p2, 546), [546, p1, 576], [654, p2, 660], (669, p1, 702], [703, p2, 736], [772, p1, 824), [824, p2, 890], (890, p1, 934], [978, p2, 1006], [1031, p1, 1038], (1038, p2, 1128], (1128, p1, 1169), [1169, p2, 1260], [1307, p1, 1333], (1333, p2, 1373), [1373, p1, 1455], (1478, p2, 1561), (1561, p2, 1630], [1637, p1, 1637], [1654, p2, 1657), (1667, p2, 1689), [1689, p1, 1713], [1774, p1, 1821), [1883, p1, 1918), [1960, p1, 1988], (2031, p1, oo)} s1: {(-146, p1, -133], (-53, p1, 25], (92, p1, 96), [169, p1, 242), [249, p1, 314), (385, p1, 415), (513, p1, 603), (625, p1, 678], [762, p1, 854), (902, p1, 928], (983, p1, 1077], [1155, p1, 1195], [1231, p1, 1329), (1423, p1, 1464], (1471, p1, 1483), (1563, p1, 1620), (1676, p1, 1693), (1761, p1, 1778], [1807, p1, 1812)} s2: {(-oo, p2, -27], (5, p2, 81], [117, p2, 149], (220, p2, 233], [284, p2, 315], (376, p2, 427], [438, p2, 501], [560, p2, 654], (728, p2, 729], [746, p2, 777), (791, p2, 794], [876, p2, 919], (933, p2, 1019), [1063, p2, 1070), (1169, p2, 1194), (1244, p2, 1307], (1351, p2, 1364), [1408, p2, 1478), [1549, p2, 1608), (1626, p2, 1658], [1740, p2, 1778), (1862, p2, oo)} union(s1, s2): {(-oo, p2, -53], (-53, p1, 5], (5, p2, 81], (92, p1, 96), [117, p2, 149], [169, p1, 242), [249, p1, 284), [284, p2, 315], (376, p2, 427], [438, p2, 501], (513, p1, 560), [560, p2, 625], (625, p1, 678], (728, p2, 729], [746, p2, 762), [762, p1, 854), [876, p2, 902], (902, p1, 928], (933, p2, 983], (983, p1, 1077], [1155, p1, 1195], [1231, p1, 1329), (1351, p2, 1364), [1408, p2, 1471], (1471, p1, 1483), [1549, p2, 1563], (1563, p1, 1620), (1626, p2, 1658], (1676, p1, 1693), [1740, p2, 1761], (1761, p1, 1778], [1807, p1, 1812), (1862, p2, oo)} s1: {(-oo, p1, 180], (249, p1, 250), [293, p1, 346], [395, p1, 448), (504, p1, 540), (629, p1, 683], [684, p1, 768), (826, p1, 903), (957, p1, 960), [1001, p1, 1049), [1101, p1, 1107], (1123, p1, 1216), (1260, p1, 1356], [1399, p1, 1482), (1520, p1, 1563), [1624, p1, 1682], [1745, p1, 1806], [1837, p1, 1873), (1957, p1, 2034), [2098, p1, 2125), [2210, p1, 2277)} s2: {(136, p2, 175), [190, p2, 234), [301, p2, 363], (416, p2, 468], [522, p2, 549), [593, p2, 638], (691, p2, 738), [790, p2, 841), [847, p2, 934], [957, p2, 1037], [1075, p2, 1141), (1195, p2, 1250], (1331, p2, 1389], (1486, p2, 1569], (1647, p2, 1743), (1842, p2, 1883], (1939, p2, 1994), (2041, p2, 2054], [2115, p2, 2163], (2207, p2, 2240), [2285, p2, oo)} union(s1, s2): {(-oo, p1, 180], [190, p2, 234), (249, p1, 250), [293, p1, 301), [301, p2, 363], [395, p1, 416], (416, p2, 468], (504, p1, 522), [522, p2, 549), [593, p2, 629], (629, p1, 683], [684, p1, 768), [790, p2, 826], (826, p1, 847), [847, p2, 934], [957, p2, 1001), [1001, p1, 1049), [1075, p2, 1123], (1123, p1, 1195], (1195, p2, 1250], (1260, p1, 1331], (1331, p2, 1389], [1399, p1, 1482), (1486, p2, 1569], [1624, p1, 1647], (1647, p2, 1743), [1745, p1, 1806], [1837, p1, 1842], (1842, p2, 1883], (1939, p2, 1957], (1957, p1, 2034), (2041, p2, 2054], [2098, p1, 2115), [2115, p2, 2163], (2207, p2, 2210), [2210, p1, 2277), [2285, p2, oo)} s1: {(-oo, p1, -5), [32, p1, 74], [111, p1, 170), (228, p1, 248], (326, p1, 392], (409, p1, 443], (483, p1, 503], [511, p1, 603], [683, p1, 713), [773, p1, 774), (794, p1, 835), [912, p1, 959), (977, p1, 991), [1088, p1, 1179), [1246, p1, 1280), [1317, p1, 1318), (1415, p1, 1490], [1502, p1, 1505), [1530, p1, 1534), (1564, p1, 1649], (1702, p1, 1779), (1816, p1, oo)} s2: {(8, p2, 59], [125, p2, 131], [190, p2, 271], [309, p2, 325), [423, p2, 440], [494, p2, 552], (613, p2, 678], [690, p2, 778], (849, p2, 948), (991, p2, 994), [1077, p2, 1171], [1269, p2, 1293], (1378, p2, 1434), [1508, p2, 1547], (1571, p2, 1615], (1674, p2, 1756), (1850, p2, 1912), (1935, p2, 1986], [2085, p2, 2115), [2194, p2, 2251)} union(s1, s2): {(-oo, p1, -5), (8, p2, 32), [32, p1, 74], [111, p1, 170), [190, p2, 271], [309, p2, 325), (326, p1, 392], (409, p1, 443], (483, p1, 494), [494, p2, 511), [511, p1, 603], (613, p2, 678], [683, p1, 690), [690, p2, 778], (794, p1, 835), (849, p2, 912), [912, p1, 959), (977, p1, 991), (991, p2, 994), [1077, p2, 1088), [1088, p1, 1179), [1246, p1, 1269), [1269, p2, 1293], [1317, p1, 1318), (1378, p2, 1415], (1415, p1, 1490], [1502, p1, 1505), [1508, p2, 1547], (1564, p1, 1649], (1674, p2, 1702], (1702, p1, 1779), (1816, p1, oo)} s1: {(-oo, p1, 178), [254, p1, 332], [408, p1, 487), [488, p1, 550], [557, p1, 563), (658, p1, 706], [773, p1, 785], [834, p1, 836], [897, p1, 934), [975, p1, 1037], [1094, p1, 1145], (1199, p1, 1261), (1308, p1, 1341), [1348, p1, 1368), (1421, p1, 1470), (1487, p1, 1573), (1588, p1, 1608), [1706, p1, 1733), (1823, p1, 1858], [1898, p1, 1955], [2020, p1, 2052)} s2: {[167, p2, 247), (330, p2, 370), [383, p2, 479], (507, p2, 540], (550, p2, 570), [632, p2, 716], [761, p2, 779), (822, p2, 839], (852, p2, 895), [958, p2, 1009], [1010, p2, 1077), (1095, p2, 1156], (1204, p2, 1234], [1239, p2, 1337), [1346, p2, 1388], [1486, p2, 1493), (1521, p2, 1603), (1691, p2, 1768], (1799, p2, 1828), (1919, p2, 1935], (1980, p2, oo)} union(s1, s2): {(-oo, p1, 167), [167, p2, 247), [254, p1, 330], (330, p2, 370), [383, p2, 408), [408, p1, 487), [488, p1, 550], (550, p2, 570), [632, p2, 716], [761, p2, 773), [773, p1, 785], (822, p2, 839], (852, p2, 895), [897, p1, 934), [958, p2, 975), [975, p1, 1010), [1010, p2, 1077), [1094, p1, 1095], (1095, p2, 1156], (1199, p1, 1239), [1239, p2, 1308], (1308, p1, 1341), [1346, p2, 1388], (1421, p1, 1470), [1486, p2, 1487], (1487, p1, 1521], (1521, p2, 1588], (1588, p1, 1608), (1691, p2, 1768], (1799, p2, 1823], (1823, p1, 1858], [1898, p1, 1955], (1980, p2, oo)} s1: {(-14, p1, 28], (100, p1, 187), [264, p1, 280], (290, p1, 327), (395, p1, 404], [429, p1, 440), [531, p1, 534), (566, p1, 569], [611, p1, 701], [726, p1, 817), [863, p1, 894], (905, p1, 946], (1010, p1, 1040], (1080, p1, 1169), (1238, p1, 1257], (1321, p1, 1418], [1470, p1, 1500], (1552, p1, 1553], (1648, p1, 1683), (1695, p1, 1711)} s2: {(148, p2, 246], (315, p2, 373), [472, p2, 492], [520, p2, 580), [601, p2, 651), (733, p2, 793], (823, p2, 905], (962, p2, 1044], (1066, p2, 1096], [1145, p2, 1169], (1257, p2, 1346), [1410, p2, 1475), (1477, p2, 1563), (1601, p2, 1669], [1721, p2, 1781], [1791, p2, 1862], [1871, p2, 1880), [1911, p2, 1931], (1976, p2, 2043], [2135, p2, 2159), (2196, p2, oo)} union(s1, s2): {(-14, p1, 28], (100, p1, 148], (148, p2, 246], [264, p1, 280], (290, p1, 315], (315, p2, 373), (395, p1, 404], [429, p1, 440), [472, p2, 492], [520, p2, 580), [601, p2, 611), [611, p1, 701], [726, p1, 817), (823, p2, 905], (905, p1, 946], (962, p2, 1044], (1066, p2, 1080], (1080, p1, 1145), [1145, p2, 1169], (1238, p1, 1257], (1257, p2, 1321], (1321, p1, 1410), [1410, p2, 1470), [1470, p1, 1477], (1477, p2, 1563), (1601, p2, 1648], (1648, p1, 1683), (1695, p1, 1711), [1721, p2, 1781], [1791, p2, 1862], [1871, p2, 1880), [1911, p2, 1931], (1976, p2, 2043], [2135, p2, 2159), (2196, p2, oo)} s1: {(-157, p1, -119), (-56, p1, -49), (49, p1, 80), [94, p1, 108], (205, p1, 245], [298, p1, 302], (323, p1, 397), [484, p1, 558], (628, p1, 631), [677, p1, 712), (802, p1, 843], (909, p1, 926], (979, p1, 1078), [1138, p1, 1180), (1203, p1, 1245], [1304, p1, 1320), (1393, p1, 1410], (1416, p1, 1478), (1542, p1, 1572), [1596, p1, 1597)} s2: {[81, p2, 116], [118, p2, 181), (187, p2, 237), (280, p2, 379], (402, p2, 449), (467, p2, 527), (560, p2, 585), (635, p2, 710), (757, p2, 828], (910, p2, 970), [1030, p2, 1061), [1114, p2, 1287), [1294, p2, 1339), (1348, p2, 1393], (1423, p2, 1425], [1444, p2, 1543), (1570, p2, 1593), (1629, p2, 1680], (1682, p2, 1745], [1767, p2, oo)} union(s1, s2): {(-157, p1, -119), (-56, p1, -49), (49, p1, 80), [81, p2, 116], [118, p2, 181), (187, p2, 205], (205, p1, 245], (280, p2, 323], (323, p1, 397), (402, p2, 449), (467, p2, 484), [484, p1, 558], (560, p2, 585), (628, p1, 631), (635, p2, 677), [677, p1, 712), (757, p2, 802], (802, p1, 843], (909, p1, 910], (910, p2, 970), (979, p1, 1078), [1114, p2, 1287), [1294, p2, 1339), (1348, p2, 1393], (1393, p1, 1410], (1416, p1, 1444), [1444, p2, 1542], (1542, p1, 1570], (1570, p2, 1593), [1596, p1, 1597), (1629, p2, 1680], (1682, p2, 1745], [1767, p2, oo)} s1: {(-oo, p1, 101), [179, p1, 218), (295, p1, 381), (477, p1, 480], [569, p1, 601), [647, p1, 725), (733, p1, 767], (810, p1, 907], [914, p1, 926), [979, p1, 1058), (1069, p1, 1161], (1213, p1, 1223], [1315, p1, 1381], (1465, p1, 1487], (1560, p1, 1621), [1714, p1, 1728], [1773, p1, 1801), (1878, p1, 1951], [2024, p1, 2121), (2142, p1, 2156], (2220, p1, 2317]} s2: {(63, p2, 160), (246, p2, 277), (366, p2, 391), (459, p2, 478), [517, p2, 535), [577, p2, 604], [623, p2, 720], [776, p2, 807), (823, p2, 828), [886, p2, 891), [919, p2, 940], (1032, p2, 1124], (1160, p2, 1230], (1297, p2, 1369), (1441, p2, 1528), [1571, p2, 1574), [1590, p2, 1641], [1695, p2, 1774], [1803, p2, 1850], [1910, p2, 1968], [2053, p2, oo)} union(s1, s2): {(-oo, p1, 63], (63, p2, 160), [179, p1, 218), (246, p2, 277), (295, p1, 366], (366, p2, 391), (459, p2, 477], (477, p1, 480], [517, p2, 535), [569, p1, 577), [577, p2, 604], [623, p2, 647), [647, p1, 725), (733, p1, 767], [776, p2, 807), (810, p1, 907], [914, p1, 919), [919, p2, 940], [979, p1, 1032], (1032, p2, 1069], (1069, p1, 1160], (1160, p2, 1230], (1297, p2, 1315), [1315, p1, 1381], (1441, p2, 1528), (1560, p1, 1590), [1590, p2, 1641], [1695, p2, 1773), [1773, p1, 1801), [1803, p2, 1850], (1878, p1, 1910), [1910, p2, 1968], [2024, p1, 2053), [2053, p2, oo)} s1: {(-oo, p1, 114], (148, p1, 247], [263, p1, 264), [323, p1, 360], [414, p1, 474), [514, p1, 610), [613, p1, 711), [808, p1, 880], (940, p1, 965), (1027, p1, 1040), (1094, p1, 1148], [1213, p1, 1260), (1352, p1, 1404), [1417, p1, 1431), [1476, p1, 1540], (1553, p1, 1567), [1655, p1, 1701), [1796, p1, 1865], [1870, p1, 1957], [2026, p1, 2050), (2148, p1, 2149], [2159, p1, oo)} s2: {[228, p2, 250), (343, p2, 391), [423, p2, 448), [515, p2, 572), (619, p2, 696), (758, p2, 810), [817, p2, 874), (898, p2, 961], (991, p2, 1067], [1091, p2, 1185), [1204, p2, 1208), (1218, p2, 1310), [1370, p2, 1439], (1469, p2, 1564], (1605, p2, 1651], (1733, p2, 1742), [1838, p2, 1920), [1941, p2, 2001], [2019, p2, 2036)} union(s1, s2): {(-oo, p1, 114], (148, p1, 228), [228, p2, 250), [263, p1, 264), [323, p1, 343], (343, p2, 391), [414, p1, 474), [514, p1, 610), [613, p1, 711), (758, p2, 808), [808, p1, 880], (898, p2, 940], (940, p1, 965), (991, p2, 1067], [1091, p2, 1185), [1204, p2, 1208), [1213, p1, 1218], (1218, p2, 1310), (1352, p1, 1370), [1370, p2, 1439], (1469, p2, 1553], (1553, p1, 1567), (1605, p2, 1651], [1655, p1, 1701), (1733, p2, 1742), [1796, p1, 1838), [1838, p2, 1870), [1870, p1, 1941), [1941, p2, 2001], [2019, p2, 2026), [2026, p1, 2050), (2148, p1, 2149], [2159, p1, oo)} s1: {(-133, p1, -66], (-64, p1, 31], (48, p1, 104], (106, p1, 132), [171, p1, 250], [286, p1, 353), (385, p1, 480], (502, p1, 516), (560, p1, 602), (648, p1, 665], [667, p1, 676), [768, p1, 824), (855, p1, 878), [883, p1, 954), [982, p1, 1080), (1089, p1, 1137), [1162, p1, 1215], [1309, p1, 1385), [1452, p1, 1472], (1503, p1, 1601)} s2: {(-oo, p2, -138], [-82, p2, -81), (-29, p2, 19), (83, p2, 166], (251, p2, 330], (374, p2, 420), (506, p2, 586], [589, p2, 682], [750, p2, 824], [902, p2, 908], [968, p2, 985), [997, p2, 1069], [1129, p2, 1217), (1275, p2, 1355), [1437, p2, 1457], [1473, p2, 1489], [1546, p2, 1637], (1723, p2, 1803), (1837, p2, 1911), [1946, p2, 1954), [1974, p2, 2026)} union(s1, s2): {(-oo, p2, -138], (-133, p1, -66], (-64, p1, 31], (48, p1, 83], (83, p2, 166], [171, p1, 250], (251, p2, 286), [286, p1, 353), (374, p2, 385], (385, p1, 480], (502, p1, 506], (506, p2, 560], (560, p1, 589), [589, p2, 682], [750, p2, 824], (855, p1, 878), [883, p1, 954), [968, p2, 982), [982, p1, 1080), (1089, p1, 1129), [1129, p2, 1217), (1275, p2, 1309), [1309, p1, 1385), [1437, p2, 1452), [1452, p1, 1472], [1473, p2, 1489], (1503, p1, 1546), [1546, p2, 1637], (1723, p2, 1803), (1837, p2, 1911), [1946, p2, 1954), [1974, p2, 2026)} s1: {(-oo, p1, 124], [157, p1, 177], (270, p1, 298], (314, p1, 337], (419, p1, 434], [503, p1, 540], [573, p1, 631], (683, p1, 741), (763, p1, 783], (798, p1, 805), (881, p1, 898), [958, p1, 1020], [1108, p1, 1159), (1208, p1, 1240], [1248, p1, 1342), (1436, p1, 1514), (1595, p1, 1680), [1779, p1, 1795], (1824, p1, 1856), [1887, p1, 1951), (1973, p1, 2041]} s2: {[-116, p2, -111), (-96, p2, -41], [50, p2, 118], [184, p2, 195], (258, p2, 295], [327, p2, 364], (377, p2, 401), [459, p2, 475), (552, p2, 601], [681, p2, 757], (801, p2, 884), (890, p2, 902], [966, p2, 1028), [1071, p2, 1088], (1127, p2, 1209), (1293, p2, 1315), (1399, p2, 1409), [1467, p2, 1562), [1603, p2, 1609], [1641, p2, 1672)} union(s1, s2): {(-oo, p1, 124], [157, p1, 177], [184, p2, 195], (258, p2, 270], (270, p1, 298], (314, p1, 327), [327, p2, 364], (377, p2, 401), (419, p1, 434], [459, p2, 475), [503, p1, 540], (552, p2, 573), [573, p1, 631], [681, p2, 757], (763, p1, 783], (798, p1, 801], (801, p2, 881], (881, p1, 890], (890, p2, 902], [958, p1, 966), [966, p2, 1028), [1071, p2, 1088], [1108, p1, 1127], (1127, p2, 1208], (1208, p1, 1240], [1248, p1, 1342), (1399, p2, 1409), (1436, p1, 1467), [1467, p2, 1562), (1595, p1, 1680), [1779, p1, 1795], (1824, p1, 1856), [1887, p1, 1951), (1973, p1, 2041]} s1: {[183, p1, 273], [335, p1, 406), (445, p1, 513], [612, p1, 699), (730, p1, 782), (825, p1, 877), (882, p1, 883), [942, p1, 982], [1023, p1, 1028], [1074, p1, 1093), (1173, p1, 1180), [1206, p1, 1264), [1293, p1, 1375), [1398, p1, 1467), [1559, p1, 1569], (1622, p1, 1685], [1715, p1, 1807], [1901, p1, 1994], (2016, p1, 2020), [2110, p1, 2177)} s2: {[179, p2, 205), [244, p2, 295], [344, p2, 362), (368, p2, 425), [429, p2, 507), [554, p2, 630], (659, p2, 695), (730, p2, 784), (874, p2, 926), [961, p2, 1044], [1051, p2, 1090), (1180, p2, 1203), (1221, p2, 1318), (1412, p2, 1443], [1530, p2, 1626), [1701, p2, 1778), (1874, p2, 1904], (1923, p2, 1986], [2064, p2, 2126), [2177, p2, 2209]} union(s1, s2): {[179, p2, 183), [183, p1, 244), [244, p2, 295], [335, p1, 368], (368, p2, 425), [429, p2, 445], (445, p1, 513], [554, p2, 612), [612, p1, 699), (730, p2, 784), (825, p1, 874], (874, p2, 926), [942, p1, 961), [961, p2, 1044], [1051, p2, 1074), [1074, p1, 1093), (1173, p1, 1180), (1180, p2, 1203), [1206, p1, 1221], (1221, p2, 1293), [1293, p1, 1375), [1398, p1, 1467), [1530, p2, 1622], (1622, p1, 1685], [1701, p2, 1715), [1715, p1, 1807], (1874, p2, 1901), [1901, p1, 1994], (2016, p1, 2020), [2064, p2, 2110), [2110, p1, 2177), [2177, p2, 2209]} s1: {[-72, p1, -27), [12, p1, 33), (35, p1, 131), (179, p1, 192), (247, p1, 310), [322, p1, 412), [425, p1, 455], [465, p1, 550], [633, p1, 664), [701, p1, 782], [872, p1, 919), [1004, p1, 1073), [1159, p1, 1182), [1232, p1, 1243], [1278, p1, 1293), [1340, p1, 1368], (1446, p1, 1448), [1452, p1, 1501], (1568, p1, 1664), (1697, p1, 1756], [1830, p1, oo)} s2: {(-33, p2, 64], (114, p2, 200), [285, p2, 383), [443, p2, 480], [494, p2, 583], [677, p2, 693), (746, p2, 816), (830, p2, 900], (991, p2, 1022], [1120, p2, 1157], [1249, p2, 1288], (1383, p2, 1450), (1481, p2, 1541], (1624, p2, 1675), [1728, p2, 1742), [1799, p2, 1860), (1890, p2, 1944], [1988, p2, 1990), [2013, p2, 2021), [2102, p2, 2111]} union(s1, s2): {[-72, p1, -33], (-33, p2, 35], (35, p1, 114], (114, p2, 200), (247, p1, 285), [285, p2, 322), [322, p1, 412), [425, p1, 443), [443, p2, 465), [465, p1, 494), [494, p2, 583], [633, p1, 664), [677, p2, 693), [701, p1, 746], (746, p2, 816), (830, p2, 872), [872, p1, 919), (991, p2, 1004), [1004, p1, 1073), [1120, p2, 1157], [1159, p1, 1182), [1232, p1, 1243], [1249, p2, 1278), [1278, p1, 1293), [1340, p1, 1368], (1383, p2, 1450), [1452, p1, 1481], (1481, p2, 1541], (1568, p1, 1624], (1624, p2, 1675), (1697, p1, 1756], [1799, p2, 1830), [1830, p1, oo)} s1: {[66, p1, 155], [202, p1, 270], [279, p1, 283), (371, p1, 377], (412, p1, 469], (525, p1, 609], (678, p1, 693], [738, p1, 811], (819, p1, 876), (880, p1, 954], [1015, p1, 1061), (1093, p1, 1127], [1142, p1, 1201), (1297, p1, 1354), (1366, p1, 1410], [1468, p1, 1530), [1606, p1, 1661), [1708, p1, 1790), (1875, p1, 1900), (1948, p1, 1949)} s2: {(181, p2, 213], (296, p2, 363), [400, p2, 431], (471, p2, 549), (619, p2, 620], [652, p2, 697], (739, p2, 820], (885, p2, 935), (1021, p2, 1076), [1121, p2, 1143), (1180, p2, 1210), (1303, p2, 1325), (1405, p2, 1464], (1477, p2, 1534], (1629, p2, 1641), [1732, p2, 1748), (1806, p2, 1827), (1915, p2, 1932), [1948, p2, 1994), [2064, p2, 2161], [2168, p2, oo)} union(s1, s2): {[66, p1, 155], (181, p2, 202), [202, p1, 270], [279, p1, 283), (296, p2, 363), (371, p1, 377], [400, p2, 412], (412, p1, 469], (471, p2, 525], (525, p1, 609], (619, p2, 620], [652, p2, 697], [738, p1, 739], (739, p2, 819], (819, p1, 876), (880, p1, 954], [1015, p1, 1021], (1021, p2, 1076), (1093, p1, 1121), [1121, p2, 1142), [1142, p1, 1180], (1180, p2, 1210), (1297, p1, 1354), (1366, p1, 1405], (1405, p2, 1464], [1468, p1, 1477], (1477, p2, 1534], [1606, p1, 1661), [1708, p1, 1790), (1806, p2, 1827), (1875, p1, 1900), (1915, p2, 1932), [1948, p2, 1994), [2064, p2, 2161], [2168, p2, oo)} s1: {(50, p1, 142), [189, p1, 239), [324, p1, 364], (450, p1, 532), [572, p1, 661], (700, p1, 763), (768, p1, 848), [919, p1, 956), [962, p1, 1023], [1055, p1, 1130], (1229, p1, 1252), (1290, p1, 1342), (1369, p1, 1423], (1424, p1, 1439], (1475, p1, 1514], [1583, p1, 1659), (1741, p1, 1748], (1821, p1, 1829], (1885, p1, 1965), [2062, p1, 2131], [2185, p1, oo)} s2: {(15, p2, 54), [126, p2, 186], (283, p2, 360), [380, p2, 422), (477, p2, 508], [583, p2, 662], [727, p2, 773), [820, p2, 908], (910, p2, 956], [1006, p2, 1067), (1105, p2, 1150], [1168, p2, 1183), [1269, p2, 1331], (1350, p2, 1420], [1496, p2, 1498), [1533, p2, 1629), [1713, p2, 1740), [1771, p2, 1839], (1872, p2, 1956], (1987, p2, 2075], [2121, p2, oo)} union(s1, s2): {(15, p2, 50], (50, p1, 126), [126, p2, 186], [189, p1, 239), (283, p2, 324), [324, p1, 364], [380, p2, 422), (450, p1, 532), [572, p1, 583), [583, p2, 662], (700, p1, 727), [727, p2, 768], (768, p1, 820), [820, p2, 908], (910, p2, 956], [962, p1, 1006), [1006, p2, 1055), [1055, p1, 1105], (1105, p2, 1150], [1168, p2, 1183), (1229, p1, 1252), [1269, p2, 1290], (1290, p1, 1342), (1350, p2, 1369], (1369, p1, 1423], (1424, p1, 1439], (1475, p1, 1514], [1533, p2, 1583), [1583, p1, 1659), [1713, p2, 1740), (1741, p1, 1748], [1771, p2, 1839], (1872, p2, 1885], (1885, p1, 1965), (1987, p2, 2062), [2062, p1, 2121), [2121, p2, oo)} s1: {(-oo, p1, 38], (115, p1, 124), [165, p1, 212), [296, p1, 316), (363, p1, 388), (414, p1, 473), (561, p1, 609], (639, p1, 654), (681, p1, 699], [715, p1, 757), (810, p1, 904], (976, p1, 1012), [1107, p1, 1204], (1280, p1, 1308), [1353, p1, 1425), [1466, p1, 1475), [1529, p1, 1529], (1612, p1, 1665), (1709, p1, 1723), [1815, p1, 1852], (1866, p1, 1897)} s2: {[-107, p2, -54), [-49, p2, 20), [114, p2, 129), [136, p2, 160], [227, p2, 259), [313, p2, 343), (424, p2, 455], (456, p2, 529), [577, p2, 595], [632, p2, 714), [759, p2, 777), (779, p2, 800], [835, p2, 843], (915, p2, 983), (1078, p2, 1136), [1183, p2, 1263), [1303, p2, 1330], [1413, p2, 1425), (1461, p2, 1540], [1617, p2, 1633]} union(s1, s2): {(-oo, p1, 38], [114, p2, 129), [136, p2, 160], [165, p1, 212), [227, p2, 259), [296, p1, 313), [313, p2, 343), (363, p1, 388), (414, p1, 456], (456, p2, 529), (561, p1, 609], [632, p2, 714), [715, p1, 757), [759, p2, 777), (779, p2, 800], (810, p1, 904], (915, p2, 976], (976, p1, 1012), (1078, p2, 1107), [1107, p1, 1183), [1183, p2, 1263), (1280, p1, 1303), [1303, p2, 1330], [1353, p1, 1425), (1461, p2, 1540], (1612, p1, 1665), (1709, p1, 1723), [1815, p1, 1852], (1866, p1, 1897)} s1: {(-oo, p1, 116), (208, p1, 242), (265, p1, 364], [426, p1, 481], (561, p1, 646), (706, p1, 798), (800, p1, 857), (948, p1, 986), (1006, p1, 1077], [1158, p1, 1200], (1203, p1, 1247), [1279, p1, 1357), [1417, p1, 1462], [1550, p1, 1576], [1579, p1, 1615), [1668, p1, 1707), [1798, p1, 1855), (1937, p1, 2024], (2044, p1, 2143), (2175, p1, 2250), [2255, p1, 2256)} s2: {(-oo, p2, 143), (196, p2, 266), [293, p2, 362], [458, p2, 524], (577, p2, 674], [742, p2, 800], [848, p2, 911), [975, p2, 989), [1081, p2, 1131], (1219, p2, 1269), (1271, p2, 1332), [1386, p2, 1417], (1449, p2, 1482), [1552, p2, 1635), [1698, p2, 1728), [1795, p2, 1839], (1843, p2, 1889], (1893, p2, 1907], (1911, p2, 2007), (2031, p2, 2121), (2137, p2, 2143)} union(s1, s2): {(-oo, p2, 143), (196, p2, 265], (265, p1, 364], [426, p1, 458), [458, p2, 524], (561, p1, 577], (577, p2, 674], (706, p1, 742), [742, p2, 800], (800, p1, 848), [848, p2, 911), (948, p1, 975), [975, p2, 989), (1006, p1, 1077], [1081, p2, 1131], [1158, p1, 1200], (1203, p1, 1219], (1219, p2, 1269), (1271, p2, 1279), [1279, p1, 1357), [1386, p2, 1417), [1417, p1, 1449], (1449, p2, 1482), [1550, p1, 1552), [1552, p2, 1635), [1668, p1, 1698), [1698, p2, 1728), [1795, p2, 1798), [1798, p1, 1843], (1843, p2, 1889], (1893, p2, 1907], (1911, p2, 1937], (1937, p1, 2024], (2031, p2, 2044], (2044, p1, 2143), (2175, p1, 2250), [2255, p1, 2256)} s1: {(-42, p1, -13], (68, p1, 162], [257, p1, 350), (442, p1, 464], [535, p1, 607), (663, p1, 681], [741, p1, 773], [842, p1, 843), (855, p1, 877), (931, p1, 980], (1005, p1, 1044), (1140, p1, 1186), (1270, p1, 1321), (1405, p1, 1473], (1504, p1, 1553], (1594, p1, 1666], (1765, p1, 1851], [1874, p1, 1991], [2068, p1, 2136)} s2: {[34, p2, 62), (132, p2, 175), (240, p2, 338], (399, p2, 449), (543, p2, 560), [587, p2, 598], (693, p2, 790], [856, p2, 879), [965, p2, 974), (1049, p2, 1086), (1138, p2, 1148], (1214, p2, 1282], (1333, p2, 1343), [1347, p2, 1395), [1410, p2, 1441], (1465, p2, 1518], (1590, p2, 1647], (1733, p2, 1784), [1862, p2, 1886], (1941, p2, 1961]} union(s1, s2): {(-42, p1, -13], [34, p2, 62), (68, p1, 132], (132, p2, 175), (240, p2, 257), [257, p1, 350), (399, p2, 442], (442, p1, 464], [535, p1, 607), (663, p1, 681], (693, p2, 790], [842, p1, 843), (855, p1, 856), [856, p2, 879), (931, p1, 980], (1005, p1, 1044), (1049, p2, 1086), (1138, p2, 1140], (1140, p1, 1186), (1214, p2, 1270], (1270, p1, 1321), (1333, p2, 1343), [1347, p2, 1395), (1405, p1, 1465], (1465, p2, 1504], (1504, p1, 1553], (1590, p2, 1594], (1594, p1, 1666], (1733, p2, 1765], (1765, p1, 1851], [1862, p2, 1874), [1874, p1, 1991], [2068, p1, 2136)} s1: {(202, p1, 213), (255, p1, 261), (333, p1, 355], (411, p1, 475], (494, p1, 574], [639, p1, 671), (749, p1, 810], [871, p1, 956), [1037, p1, 1066), (1130, p1, 1150), [1239, p1, 1320), (1320, p1, 1370), (1459, p1, 1463), [1560, p1, 1620], [1632, p1, 1725), [1769, p1, 1782], (1803, p1, 1837), (1850, p1, 1914), [1958, p1, 1966)} s2: {[124, p2, 131], [193, p2, 253], [264, p2, 355), (358, p2, 418), (472, p2, 498), [503, p2, 506], (531, p2, 579), [590, p2, 625), (670, p2, 725], (784, p2, 839), (917, p2, 1006), [1019, p2, 1020), [1031, p2, 1121), [1125, p2, 1221), (1304, p2, 1367), (1414, p2, 1497), [1590, p2, 1618], (1691, p2, 1692), [1721, p2, 1796), (1842, p2, 1852]} union(s1, s2): {[124, p2, 131], [193, p2, 253], (255, p1, 261), [264, p2, 333], (333, p1, 355], (358, p2, 411], (411, p1, 472], (472, p2, 494], (494, p1, 531], (531, p2, 579), [590, p2, 625), [639, p1, 670], (670, p2, 725], (749, p1, 784], (784, p2, 839), [871, p1, 917], (917, p2, 1006), [1019, p2, 1020), [1031, p2, 1121), [1125, p2, 1221), [1239, p1, 1304], (1304, p2, 1320], (1320, p1, 1370), (1414, p2, 1497), [1560, p1, 1620], [1632, p1, 1721), [1721, p2, 1796), (1803, p1, 1837), (1842, p2, 1850], (1850, p1, 1914), [1958, p1, 1966)} s1: {[207, p1, 251], [310, p1, 398), [479, p1, 550], [609, p1, 646], (707, p1, 708], (737, p1, 771], (789, p1, 828], (875, p1, 885], (913, p1, 943], (1034, p1, 1049), (1051, p1, 1066], [1078, p1, 1121], (1138, p1, 1225], [1261, p1, 1267], (1287, p1, 1366], (1382, p1, 1463], (1537, p1, 1555), [1584, p1, 1593], (1684, p1, 1774], [1833, p1, 1842]} s2: {(104, p2, 185), (209, p2, 251], (258, p2, 292], (300, p2, 319], [412, p2, 443], (451, p2, 539), (604, p2, 667], [702, p2, 794), (871, p2, 928), (986, p2, 1002), [1030, p2, 1112], [1201, p2, 1294], (1340, p2, 1364), [1387, p2, 1440), (1456, p2, 1540), (1563, p2, 1569], (1622, p2, 1679], [1756, p2, 1846), (1864, p2, 1866], [1911, p2, 1924]} union(s1, s2): {(104, p2, 185), [207, p1, 251], (258, p2, 292], (300, p2, 310), [310, p1, 398), [412, p2, 443], (451, p2, 479), [479, p1, 550], (604, p2, 667], [702, p2, 789], (789, p1, 828], (871, p2, 913], (913, p1, 943], (986, p2, 1002), [1030, p2, 1078), [1078, p1, 1121], (1138, p1, 1201), [1201, p2, 1287], (1287, p1, 1366], (1382, p1, 1456], (1456, p2, 1537], (1537, p1, 1555), (1563, p2, 1569], [1584, p1, 1593], (1622, p2, 1679], (1684, p1, 1756), [1756, p2, 1846), (1864, p2, 1866], [1911, p2, 1924]} s1: {(-52, p1, -7), (47, p1, 127), [175, p1, 256), [345, p1, 359], (424, p1, 458], (462, p1, 469), (479, p1, 520), [610, p1, 619], (651, p1, 654], [735, p1, 759), [856, p1, 864], [880, p1, 963], (1047, p1, 1127), (1209, p1, 1276], (1370, p1, 1373], [1433, p1, 1464], [1492, p1, 1523), [1525, p1, 1614), (1636, p1, 1725), [1823, p1, 1883)} s2: {(-48, p2, -37), [62, p2, 145], (225, p2, 265), (283, p2, 326), [354, p2, 425), [500, p2, 598), (630, p2, 668], (683, p2, 771], (790, p2, 827], [878, p2, 904], [916, p2, 986), (1030, p2, 1096], [1155, p2, 1239), [1334, p2, 1380], (1473, p2, 1554), (1571, p2, 1624], (1671, p2, 1747), [1835, p2, 1930), (2005, p2, 2006), (2083, p2, 2163]} union(s1, s2): {(-52, p1, -7), (47, p1, 62), [62, p2, 145], [175, p1, 225], (225, p2, 265), (283, p2, 326), [345, p1, 354), [354, p2, 424], (424, p1, 458], (462, p1, 469), (479, p1, 500), [500, p2, 598), [610, p1, 619], (630, p2, 668], (683, p2, 771], (790, p2, 827], [856, p1, 864], [878, p2, 880), [880, p1, 916), [916, p2, 986), (1030, p2, 1047], (1047, p1, 1127), [1155, p2, 1209], (1209, p1, 1276], [1334, p2, 1380], [1433, p1, 1464], (1473, p2, 1525), [1525, p1, 1571], (1571, p2, 1624], (1636, p1, 1671], (1671, p2, 1747), [1823, p1, 1835), [1835, p2, 1930), (2005, p2, 2006), (2083, p2, 2163]} s1: {(-oo, p1, 106), (159, p1, 232], [279, p1, 345], (347, p1, 441), [528, p1, 611), [696, p1, 763], (814, p1, 905), (995, p1, 1090], (1099, p1, 1105], (1162, p1, 1245), (1272, p1, 1360], (1427, p1, 1517], [1552, p1, 1594], (1675, p1, 1685], [1739, p1, 1798], (1889, p1, 1910], [1958, p1, 2045), [2135, p1, 2228], (2249, p1, 2348], [2387, p1, 2443], (2503, p1, 2546]} s2: {(-oo, p2, -50), (-43, p2, -5), (44, p2, 110), [208, p2, 284], [378, p2, 406), [440, p2, 457], (529, p2, 537], (576, p2, 662], [665, p2, 734), (793, p2, 870], (876, p2, 923), [987, p2, 1002), [1009, p2, 1028), [1070, p2, 1165), (1173, p2, 1195), [1287, p2, 1288), (1348, p2, 1442), [1498, p2, 1506], [1550, p2, 1635], [1655, p2, 1739), (1786, p2, 1830)} union(s1, s2): {(-oo, p1, 44], (44, p2, 110), (159, p1, 208), [208, p2, 279), [279, p1, 345], (347, p1, 440), [440, p2, 457], [528, p1, 576], (576, p2, 662], [665, p2, 696), [696, p1, 763], (793, p2, 814], (814, p1, 876], (876, p2, 923), [987, p2, 995], (995, p1, 1070), [1070, p2, 1162], (1162, p1, 1245), (1272, p1, 1348], (1348, p2, 1427], (1427, p1, 1517], [1550, p2, 1635], [1655, p2, 1739), [1739, p1, 1786], (1786, p2, 1830), (1889, p1, 1910], [1958, p1, 2045), [2135, p1, 2228], (2249, p1, 2348], [2387, p1, 2443], (2503, p1, 2546]} s1: {[65, p1, 135), [191, p1, 271], [359, p1, 379), (435, p1, 512), [528, p1, 608), [622, p1, 668], [752, p1, 810), (875, p1, 901], (905, p1, 990), (1045, p1, 1100), [1111, p1, 1203], (1250, p1, 1332], [1360, p1, 1384], (1412, p1, 1415], (1420, p1, 1464], (1516, p1, 1538], [1627, p1, 1641), (1711, p1, 1759), (1819, p1, 1898), (1951, p1, 1963), [2046, p1, oo)} s2: {(-oo, p2, 37), (132, p2, 212), [259, p2, 333), (422, p2, 425), [481, p2, 563), (587, p2, 642], [657, p2, 678], (680, p2, 741], [801, p2, 803], [890, p2, 931], (1017, p2, 1064], [1103, p2, 1103], (1192, p2, 1275), [1349, p2, 1356), (1411, p2, 1483], [1530, p2, 1533], [1601, p2, 1642], [1681, p2, 1692), [1747, p2, 1809), [1850, p2, 1883), (1897, p2, 1964)} union(s1, s2): {(-oo, p2, 37), [65, p1, 132], (132, p2, 191), [191, p1, 259), [259, p2, 333), [359, p1, 379), (422, p2, 425), (435, p1, 481), [481, p2, 528), [528, p1, 587], (587, p2, 622), [622, p1, 657), [657, p2, 678], (680, p2, 741], [752, p1, 810), (875, p1, 890), [890, p2, 905], (905, p1, 990), (1017, p2, 1045], (1045, p1, 1100), [1103, p2, 1103], [1111, p1, 1192], (1192, p2, 1250], (1250, p1, 1332], [1349, p2, 1356), [1360, p1, 1384], (1411, p2, 1483], (1516, p1, 1538], [1601, p2, 1642], [1681, p2, 1692), (1711, p1, 1747), [1747, p2, 1809), (1819, p1, 1897], (1897, p2, 1964), [2046, p1, oo)} s1: {(-oo, p1, 5), (74, p1, 168), [248, p1, 301), (395, p1, 471], (474, p1, 513], [532, p1, 587], [628, p1, 681], (758, p1, 848], [924, p1, 993), (1074, p1, 1103], [1132, p1, 1148), (1230, p1, 1299], [1387, p1, 1421], (1445, p1, 1534), (1623, p1, 1651), (1674, p1, 1716], [1753, p1, 1801), [1853, p1, 1937), [1979, p1, 2056), [2064, p1, 2115], [2209, p1, 2270]} s2: {[-88, p2, -24), [5, p2, 63), [151, p2, 223), (307, p2, 404], [426, p2, 428), (503, p2, 513], (580, p2, 587), (594, p2, 666), (668, p2, 747], (784, p2, 857), (930, p2, 1006), [1087, p2, 1127), [1188, p2, 1237), [1244, p2, 1312), [1360, p2, 1397), [1485, p2, 1548), [1565, p2, 1603), [1628, p2, 1701], [1744, p2, 1818], [1851, p2, 1865), [1918, p2, oo)} union(s1, s2): {(-oo, p1, 5), [5, p2, 63), (74, p1, 151), [151, p2, 223), [248, p1, 301), (307, p2, 395], (395, p1, 471], (474, p1, 513], [532, p1, 587], (594, p2, 628), [628, p1, 668], (668, p2, 747], (758, p1, 784], (784, p2, 857), [924, p1, 930], (930, p2, 1006), (1074, p1, 1087), [1087, p2, 1127), [1132, p1, 1148), [1188, p2, 1230], (1230, p1, 1244), [1244, p2, 1312), [1360, p2, 1387), [1387, p1, 1421], (1445, p1, 1485), [1485, p2, 1548), [1565, p2, 1603), (1623, p1, 1628), [1628, p2, 1674], (1674, p1, 1716], [1744, p2, 1818], [1851, p2, 1853), [1853, p1, 1918), [1918, p2, oo)} s1: {(-140, p1, -116], (-68, p1, -17), [49, p1, 171], (200, p1, 222], [231, p1, 267), (294, p1, 350), [414, p1, 435], (514, p1, 522), [523, p1, 558], (649, p1, 737), [786, p1, 833], [891, p1, 893), [942, p1, 966], (1020, p1, 1069], (1099, p1, 1136), (1231, p1, 1325], [1332, p1, 1374), [1460, p1, 1519), [1546, p1, 1624], [1693, p1, oo)} s2: {(-oo, p2, -73], (-31, p2, 53], [74, p2, 162), [224, p2, 252), (263, p2, 271], (320, p2, 364], [419, p2, 518], [566, p2, 663), [752, p2, 804], [813, p2, 825), [879, p2, 944], [985, p2, 1014), (1042, p2, 1139], (1238, p2, 1299), (1355, p2, 1411), (1431, p2, 1507), [1554, p2, 1623], [1704, p2, 1775], (1861, p2, 1908), (1911, p2, 1966), (1996, p2, 2024]} union(s1, s2): {(-oo, p2, -73], (-68, p1, -31], (-31, p2, 49), [49, p1, 171], (200, p1, 222], [224, p2, 231), [231, p1, 263], (263, p2, 271], (294, p1, 320], (320, p2, 364], [414, p1, 419), [419, p2, 514], (514, p1, 522), [523, p1, 558], [566, p2, 649], (649, p1, 737), [752, p2, 786), [786, p1, 833], [879, p2, 942), [942, p1, 966], [985, p2, 1014), (1020, p1, 1042], (1042, p2, 1139], (1231, p1, 1325], [1332, p1, 1355], (1355, p2, 1411), (1431, p2, 1460), [1460, p1, 1519), [1546, p1, 1624], [1693, p1, oo)} s1: {[118, p1, 198], [280, p1, 315], (386, p1, 480], [559, p1, 634), [666, p1, 723], [760, p1, 817], [893, p1, 906], (1003, p1, 1077), [1101, p1, 1136], [1210, p1, 1308), [1381, p1, 1427], [1452, p1, 1512], [1562, p1, 1636], (1663, p1, 1698], (1758, p1, 1798), [1809, p1, 1811], (1815, p1, 1844], [1894, p1, 1922), [1947, p1, 2030], (2091, p1, 2117]} s2: {(94, p2, 180), (207, p2, 240], (273, p2, 357], (454, p2, 497), [573, p2, 635), [645, p2, 682], [721, p2, 756], [770, p2, 840], (925, p2, 978), [1039, p2, 1130], [1193, p2, 1231], [1262, p2, 1295], [1327, p2, 1369], [1378, p2, 1468), [1478, p2, 1526], [1575, p2, 1632], [1678, p2, 1731), [1785, p2, 1878), [1922, p2, 1936], (2002, p2, 2101)} union(s1, s2): {(94, p2, 118), [118, p1, 198], (207, p2, 240], (273, p2, 357], (386, p1, 454], (454, p2, 497), [559, p1, 573), [573, p2, 635), [645, p2, 666), [666, p1, 721), [721, p2, 756], [760, p1, 770), [770, p2, 840], [893, p1, 906], (925, p2, 978), (1003, p1, 1039), [1039, p2, 1101), [1101, p1, 1136], [1193, p2, 1210), [1210, p1, 1308), [1327, p2, 1369], [1378, p2, 1452), [1452, p1, 1478), [1478, p2, 1526], [1562, p1, 1636], (1663, p1, 1678), [1678, p2, 1731), (1758, p1, 1785), [1785, p2, 1878), [1894, p1, 1922), [1922, p2, 1936], [1947, p1, 2002], (2002, p2, 2091], (2091, p1, 2117]} s1: {[-83, p1, -54), (45, p1, 65), [100, p1, 113), (189, p1, 258), [268, p1, 329), [366, p1, 443), [537, p1, 549], (570, p1, 642), (655, p1, 656), (715, p1, 716), (720, p1, 793], [827, p1, 881], (948, p1, 998], [1097, p1, 1186], [1269, p1, 1360], (1398, p1, 1516], [1553, p1, 1599], (1646, p1, 1655), (1690, p1, 1786)} s2: {(-102, p2, -12), [12, p2, 18], (93, p2, 112], [197, p2, 209), (270, p2, 290), [301, p2, 330], [401, p2, 450], [512, p2, 557), [599, p2, 647), (668, p2, 737], (802, p2, 865], [907, p2, 931], [942, p2, 1036), (1042, p2, 1136), [1155, p2, 1216], [1243, p2, 1295), [1343, p2, 1374], (1461, p2, 1475), (1532, p2, 1618), [1710, p2, 1799]} union(s1, s2): {(-102, p2, -12), [12, p2, 18], (45, p1, 65), (93, p2, 100), [100, p1, 113), (189, p1, 258), [268, p1, 301), [301, p2, 330], [366, p1, 401), [401, p2, 450], [512, p2, 557), (570, p1, 599), [599, p2, 647), (655, p1, 656), (668, p2, 720], (720, p1, 793], (802, p2, 827), [827, p1, 881], [907, p2, 931], [942, p2, 1036), (1042, p2, 1097), [1097, p1, 1155), [1155, p2, 1216], [1243, p2, 1269), [1269, p1, 1343), [1343, p2, 1374], (1398, p1, 1516], (1532, p2, 1618), (1646, p1, 1655), (1690, p1, 1710), [1710, p2, 1799]} s1: {[65, p1, 75], (162, p1, 227], (307, p1, 402], [475, p1, 518), [549, p1, 597), [641, p1, 661), (749, p1, 846), (880, p1, 891], [983, p1, 1008], [1059, p1, 1237), [1244, p1, 1267], [1289, p1, 1303], (1321, p1, 1351), (1364, p1, 1378], (1438, p1, 1454], [1518, p1, 1587), [1621, p1, 1704), (1803, p1, 1842], [1921, p1, 1972], (2054, p1, oo)} s2: {(-61, p2, 37], (83, p2, 94), [171, p2, 188], (271, p2, 337], (380, p2, 436], [530, p2, 550], (578, p2, 580), [616, p2, 695], [770, p2, 858), (881, p2, 883), [899, p2, 945), [1007, p2, 1078), [1159, p2, 1205], (1219, p2, 1261], (1355, p2, 1359], (1370, p2, 1402], (1407, p2, 1488], [1543, p2, 1584], (1671, p2, 1688], [1740, p2, 1763], [1783, p2, oo)} union(s1, s2): {(-61, p2, 37], [65, p1, 75], (83, p2, 94), (162, p1, 227], (271, p2, 307], (307, p1, 380], (380, p2, 436], [475, p1, 518), [530, p2, 549), [549, p1, 597), [616, p2, 695], (749, p1, 770), [770, p2, 858), (880, p1, 891], [899, p2, 945), [983, p1, 1007), [1007, p2, 1059), [1059, p1, 1219], (1219, p2, 1244), [1244, p1, 1267], [1289, p1, 1303], (1321, p1, 1351), (1355, p2, 1359], (1364, p1, 1370], (1370, p2, 1402], (1407, p2, 1488], [1518, p1, 1587), [1621, p1, 1704), [1740, p2, 1763], [1783, p2, oo)} s1: {(-oo, p1, 71), [166, p1, 187), [249, p1, 250), (338, p1, 352), [403, p1, 478), [568, p1, 583], (623, p1, 642), (673, p1, 770), (796, p1, 816], (875, p1, 927], [1022, p1, 1066), (1149, p1, 1239], (1295, p1, 1298), (1311, p1, 1375], [1470, p1, 1486), [1495, p1, 1518], (1556, p1, 1567], (1611, p1, 1680), [1702, p1, 1743], (1811, p1, 1904), [1925, p1, 1968]} s2: {[6, p2, 51), [110, p2, 125), [158, p2, 208], (280, p2, 378], (473, p2, 508], [544, p2, 632), [668, p2, 714], [720, p2, 786), (814, p2, 866], [961, p2, 1017), (1076, p2, 1162), (1209, p2, 1241], [1243, p2, 1286], [1377, p2, 1464], (1489, p2, 1568], (1649, p2, 1738), [1786, p2, 1787], (1830, p2, 1870), (1920, p2, 1938], [1971, p2, 2031]} union(s1, s2): {(-oo, p1, 71), [110, p2, 125), [158, p2, 208], [249, p1, 250), (280, p2, 378], [403, p1, 473], (473, p2, 508], [544, p2, 623], (623, p1, 642), [668, p2, 673], (673, p1, 720), [720, p2, 786), (796, p1, 814], (814, p2, 866], (875, p1, 927], [961, p2, 1017), [1022, p1, 1066), (1076, p2, 1149], (1149, p1, 1209], (1209, p2, 1241], [1243, p2, 1286], (1295, p1, 1298), (1311, p1, 1375], [1377, p2, 1464], [1470, p1, 1486), (1489, p2, 1568], (1611, p1, 1649], (1649, p2, 1702), [1702, p1, 1743], [1786, p2, 1787], (1811, p1, 1904), (1920, p2, 1925), [1925, p1, 1968], [1971, p2, 2031]} s1: {(128, p1, 170], (238, p1, 313], (363, p1, 418), (442, p1, 465], [490, p1, 498], (506, p1, 568), [638, p1, 639), [654, p1, 713], [725, p1, 811], [853, p1, 876), [954, p1, 993], (1051, p1, 1120], [1179, p1, 1220), [1235, p1, 1381], [1475, p1, 1547), (1605, p1, 1699], (1745, p1, 1766], [1791, p1, 1818]} s2: {(235, p2, 280], [328, p2, 416), (464, p2, 543), (568, p2, 647], (740, p2, 833), (867, p2, 942], (996, p2, 1061], [1124, p2, 1198), (1293, p2, 1376], (1433, p2, 1441), (1511, p2, 1564), [1571, p2, 1633), (1637, p2, 1707], [1779, p2, 1803), (1836, p2, 1847], [1934, p2, 1998], (2082, p2, 2083], [2134, p2, 2206), [2271, p2, 2332), [2391, p2, 2459)} union(s1, s2): {(128, p1, 170], (235, p2, 238], (238, p1, 313], [328, p2, 363], (363, p1, 418), (442, p1, 464], (464, p2, 506], (506, p1, 568), (568, p2, 647], [654, p1, 713], [725, p1, 740], (740, p2, 833), [853, p1, 867], (867, p2, 942], [954, p1, 993], (996, p2, 1051], (1051, p1, 1120], [1124, p2, 1179), [1179, p1, 1220), [1235, p1, 1381], (1433, p2, 1441), [1475, p1, 1511], (1511, p2, 1564), [1571, p2, 1605], (1605, p1, 1637], (1637, p2, 1707], (1745, p1, 1766], [1779, p2, 1791), [1791, p1, 1818], (1836, p2, 1847], [1934, p2, 1998], (2082, p2, 2083], [2134, p2, 2206), [2271, p2, 2332), [2391, p2, 2459)} s1: {(-oo, p1, 205), [299, p1, 313), (364, p1, 365), [445, p1, 484), (582, p1, 608), (609, p1, 680], [750, p1, 783), [815, p1, 816], (822, p1, 824), [884, p1, 922], (1018, p1, 1089], [1119, p1, 1128), (1159, p1, 1221], [1280, p1, 1352], [1421, p1, 1459], (1490, p1, 1520), (1530, p1, 1555), (1558, p1, 1598], (1613, p1, 1706], [1766, p1, 1826), [1838, p1, 1874), (1950, p1, oo)} s2: {(-oo, p2, -167], (-143, p2, -94], (-68, p2, -15], (53, p2, 99), (146, p2, 213), [252, p2, 308), (372, p2, 448), [538, p2, 610], [695, p2, 719], (738, p2, 811], (870, p2, 902], (911, p2, 997], [1012, p2, 1085), [1145, p2, 1223], (1294, p2, 1313), [1396, p2, 1483), [1515, p2, 1562], [1646, p2, 1718), (1736, p2, 1806], [1841, p2, 1868], [1899, p2, 1935), (1998, p2, oo)} union(s1, s2): {(-oo, p1, 146], (146, p2, 213), [252, p2, 299), [299, p1, 313), (364, p1, 365), (372, p2, 445), [445, p1, 484), [538, p2, 609], (609, p1, 680], [695, p2, 719], (738, p2, 811], [815, p1, 816], (822, p1, 824), (870, p2, 884), [884, p1, 911], (911, p2, 997], [1012, p2, 1018], (1018, p1, 1089], [1119, p1, 1128), [1145, p2, 1223], [1280, p1, 1352], [1396, p2, 1483), (1490, p1, 1515), [1515, p2, 1558], (1558, p1, 1598], (1613, p1, 1646), [1646, p2, 1718), (1736, p2, 1766), [1766, p1, 1826), [1838, p1, 1874), [1899, p2, 1935), (1950, p1, oo)} s1: {[51, p1, 118], [201, p1, 227], [256, p1, 318), (399, p1, 451), [531, p1, 536), (548, p1, 582), (607, p1, 654], [672, p1, 734], (803, p1, 889], (912, p1, 1000), [1015, p1, 1039), (1120, p1, 1207], (1209, p1, 1268], (1362, p1, 1454), (1482, p1, 1512], [1572, p1, 1582], [1665, p1, 1763], (1843, p1, 1890], [1962, p1, 1979), (2002, p1, 2016], (2035, p1, oo)} s2: {[4, p2, 97), [121, p2, 197], [228, p2, 268], (291, p2, 293), [386, p2, 464), (522, p2, 553), (599, p2, 632], (684, p2, 730], [815, p2, 907), [948, p2, 988), (1044, p2, 1061), (1074, p2, 1169), (1226, p2, 1240], (1298, p2, 1314], [1384, p2, 1445], (1467, p2, 1523), [1577, p2, 1584], (1678, p2, 1693), (1758, p2, 1780], [1861, p2, 1913)} union(s1, s2): {[4, p2, 51), [51, p1, 118], [121, p2, 197], [201, p1, 227], [228, p2, 256), [256, p1, 318), [386, p2, 464), (522, p2, 548], (548, p1, 582), (599, p2, 607], (607, p1, 654], [672, p1, 734], (803, p1, 815), [815, p2, 907), (912, p1, 1000), [1015, p1, 1039), (1044, p2, 1061), (1074, p2, 1120], (1120, p1, 1207], (1209, p1, 1268], (1298, p2, 1314], (1362, p1, 1454), (1467, p2, 1523), [1572, p1, 1577), [1577, p2, 1584], [1665, p1, 1758], (1758, p2, 1780], (1843, p1, 1861), [1861, p2, 1913), [1962, p1, 1979), (2002, p1, 2016], (2035, p1, oo)} s1: {(-135, p1, -45], [4, p1, 90], (157, p1, 246], [256, p1, 284), [310, p1, 392), (430, p1, 509], [517, p1, 547), [553, p1, 614], (655, p1, 743], [785, p1, 860], [894, p1, 968], [1006, p1, 1079], [1083, p1, 1156], [1165, p1, 1197), (1269, p1, 1334], (1383, p1, 1435), [1444, p1, 1458), [1543, p1, 1635), [1708, p1, 1800), [1827, p1, 1920]} s2: {[-80, p2, -29], [59, p2, 62], [136, p2, 198), (245, p2, 336], [371, p2, 414], [469, p2, 520], (594, p2, 607], (638, p2, 676), [715, p2, 810), (906, p2, 944], [1004, p2, 1103], (1117, p2, 1207), [1208, p2, 1259], (1310, p2, 1311], (1368, p2, 1439), [1511, p2, 1576], (1600, p2, 1649], (1706, p2, 1775), [1822, p2, 1914], (1944, p2, 2007]} union(s1, s2): {(-135, p1, -80), [-80, p2, -29], [4, p1, 90], [136, p2, 157], (157, p1, 245], (245, p2, 310), [310, p1, 371), [371, p2, 414], (430, p1, 469), [469, p2, 517), [517, p1, 547), [553, p1, 614], (638, p2, 655], (655, p1, 715), [715, p2, 785), [785, p1, 860], [894, p1, 968], [1004, p2, 1083), [1083, p1, 1117], (1117, p2, 1207), [1208, p2, 1259], (1269, p1, 1334], (1368, p2, 1439), [1444, p1, 1458), [1511, p2, 1543), [1543, p1, 1600], (1600, p2, 1649], (1706, p2, 1708), [1708, p1, 1800), [1822, p2, 1827), [1827, p1, 1920], (1944, p2, 2007]} s1: {[-122, p1, -33), (5, p1, 58], [99, p1, 128), (224, p1, 318], [346, p1, 388), (396, p1, 473), [568, p1, 586], [601, p1, 689], (779, p1, 785], [797, p1, 889], (897, p1, 912), (1004, p1, 1058), [1124, p1, 1214], [1291, p1, 1366), [1397, p1, 1405), [1497, p1, 1542), (1568, p1, 1582), [1673, p1, 1736), [1824, p1, 1866], (1917, p1, 1973)} s2: {[195, p2, 254), (273, p2, 337], [377, p2, 472), [492, p2, 570], [658, p2, 703), (768, p2, 817], (819, p2, 831], [901, p2, 985], (1056, p2, 1108), [1179, p2, 1194), (1203, p2, 1275], (1287, p2, 1348), (1407, p2, 1439], (1484, p2, 1579], (1670, p2, 1701], [1715, p2, 1810), (1874, p2, 1908), [1988, p2, 2054], (2072, p2, 2091], [2154, p2, 2209)} union(s1, s2): {[-122, p1, -33), (5, p1, 58], [99, p1, 128), [195, p2, 224], (224, p1, 273], (273, p2, 337], [346, p1, 377), [377, p2, 396], (396, p1, 473), [492, p2, 568), [568, p1, 586], [601, p1, 658), [658, p2, 703), (768, p2, 797), [797, p1, 889], (897, p1, 901), [901, p2, 985], (1004, p1, 1056], (1056, p2, 1108), [1124, p1, 1203], (1203, p2, 1275], (1287, p2, 1291), [1291, p1, 1366), [1397, p1, 1405), (1407, p2, 1439], (1484, p2, 1568], (1568, p1, 1582), (1670, p2, 1673), [1673, p1, 1715), [1715, p2, 1810), [1824, p1, 1866], (1874, p2, 1908), (1917, p1, 1973), [1988, p2, 2054], (2072, p2, 2091], [2154, p2, 2209)} s1: {(283, p1, 338], (366, p1, 367], (390, p1, 445), (473, p1, 491], [496, p1, 580), (589, p1, 638], (715, p1, 782), (800, p1, 874), (932, p1, 999), [1081, p1, 1090], (1105, p1, 1113), (1153, p1, 1202), [1284, p1, 1315], [1404, p1, 1485], [1575, p1, 1602), [1651, p1, 1700), [1769, p1, 1806], (1808, p1, 1833), (1875, p1, 1908), [1943, p1, 1977]} s2: {(-oo, p2, 201), (252, p2, 324], [419, p2, 475], (489, p2, 532), (594, p2, 648], [664, p2, 755), [790, p2, 842), [886, p2, 959], [985, p2, 996], (1021, p2, 1092], [1188, p2, 1230), (1285, p2, 1347), [1364, p2, 1409], (1491, p2, 1524), [1589, p2, 1644), (1692, p2, 1707), [1734, p2, 1738], [1836, p2, 1925), [1994, p2, 2086), [2141, p2, 2146), (2204, p2, 2281), (2305, p2, oo)} union(s1, s2): {(-oo, p2, 201), (252, p2, 283], (283, p1, 338], (366, p1, 367], (390, p1, 419), [419, p2, 473], (473, p1, 489], (489, p2, 496), [496, p1, 580), (589, p1, 594], (594, p2, 648], [664, p2, 715], (715, p1, 782), [790, p2, 800], (800, p1, 874), [886, p2, 932], (932, p1, 999), (1021, p2, 1092], (1105, p1, 1113), (1153, p1, 1188), [1188, p2, 1230), [1284, p1, 1285], (1285, p2, 1347), [1364, p2, 1404), [1404, p1, 1485], (1491, p2, 1524), [1575, p1, 1589), [1589, p2, 1644), [1651, p1, 1692], (1692, p2, 1707), [1734, p2, 1738], [1769, p1, 1806], (1808, p1, 1833), [1836, p2, 1925), [1943, p1, 1977], [1994, p2, 2086), [2141, p2, 2146), (2204, p2, 2281), (2305, p2, oo)} s1: {(-124, p1, -108], [-54, p1, 30], [48, p1, 74), [86, p1, 126], (138, p1, 202], [207, p1, 291), [302, p1, 323], (416, p1, 513], [587, p1, 595], (639, p1, 731], [828, p1, 884), (933, p1, 947), (1022, p1, 1042], [1114, p1, 1163), [1236, p1, 1296), (1385, p1, 1434), (1504, p1, 1510), (1532, p1, 1600], (1617, p1, 1619], (1640, p1, 1654), (1713, p1, oo)} s2: {(134, p2, 179], [203, p2, 235), [278, p2, 336], [360, p2, 437), [481, p2, 505), [602, p2, 697), [717, p2, 780), (873, p2, 935), [942, p2, 1002], (1062, p2, 1100), [1107, p2, 1198], [1238, p2, 1287), (1322, p2, 1408), [1417, p2, 1440), [1476, p2, 1480), (1486, p2, 1511), (1610, p2, 1677], [1703, p2, 1721], [1769, p2, 1820), (1891, p2, 1988], [2036, p2, oo)} union(s1, s2): {(-124, p1, -108], [-54, p1, 30], [48, p1, 74), [86, p1, 126], (134, p2, 138], (138, p1, 202], [203, p2, 207), [207, p1, 278), [278, p2, 336], [360, p2, 416], (416, p1, 513], [587, p1, 595], [602, p2, 639], (639, p1, 717), [717, p2, 780), [828, p1, 873], (873, p2, 933], (933, p1, 942), [942, p2, 1002], (1022, p1, 1042], (1062, p2, 1100), [1107, p2, 1198], [1236, p1, 1296), (1322, p2, 1385], (1385, p1, 1417), [1417, p2, 1440), [1476, p2, 1480), (1486, p2, 1511), (1532, p1, 1600], (1610, p2, 1677], [1703, p2, 1713], (1713, p1, oo)} s1: {(-oo, p1, -120), (-37, p1, -24), [36, p1, 117], (130, p1, 177], (187, p1, 263), [302, p1, 302], (390, p1, 463], [474, p1, 512], (520, p1, 596), [643, p1, 740], [743, p1, 750], [759, p1, 826], [908, p1, 911], (920, p1, 933], [1029, p1, 1094], [1184, p1, 1233), [1278, p1, 1360), (1445, p1, 1455], [1492, p1, 1500], (1580, p1, 1675], (1697, p1, 1768]} s2: {[244, p2, 254], (264, p2, 344], (362, p2, 389), [402, p2, 479], (568, p2, 665), [715, p2, 735], (782, p2, 798), [895, p2, 966], [975, p2, 1003], (1010, p2, 1109), (1176, p2, 1267), (1278, p2, 1301], (1382, p2, 1431], (1461, p2, 1560], [1603, p2, 1654), (1658, p2, 1680], (1742, p2, 1822], [1843, p2, 1849], [1906, p2, 1909), (1981, p2, 2080)} union(s1, s2): {(-oo, p1, -120), (-37, p1, -24), [36, p1, 117], (130, p1, 177], (187, p1, 263), (264, p2, 344], (362, p2, 389), (390, p1, 402), [402, p2, 474), [474, p1, 512], (520, p1, 568], (568, p2, 643), [643, p1, 740], [743, p1, 750], [759, p1, 826], [895, p2, 966], [975, p2, 1003], (1010, p2, 1109), (1176, p2, 1267), [1278, p1, 1360), (1382, p2, 1431], (1445, p1, 1455], (1461, p2, 1560], (1580, p1, 1658], (1658, p2, 1680], (1697, p1, 1742], (1742, p2, 1822], [1843, p2, 1849], [1906, p2, 1909), (1981, p2, 2080)} s1: {(-oo, p1, -115), (-76, p1, -18), (57, p1, 89), (145, p1, 233), (297, p1, 328), [408, p1, 467), [564, p1, 605], [674, p1, 731), [774, p1, 818], [893, p1, 906], [914, p1, 969], (977, p1, 1008), [1082, p1, 1124], [1175, p1, 1224), (1263, p1, 1270], [1279, p1, 1378], (1386, p1, 1425], (1452, p1, 1508], [1571, p1, 1586), (1649, p1, 1704), [1776, p1, 1860], (1863, p1, oo)} s2: {[118, p2, 194], [281, p2, 348), [405, p2, 504], (547, p2, 596), (656, p2, 717], [734, p2, 884], [952, p2, 980), (983, p2, 1075], [1128, p2, 1166], [1243, p2, 1301], [1382, p2, 1432), (1473, p2, 1502], (1562, p2, 1574), (1613, p2, 1683), [1697, p2, 1741), (1777, p2, 1846], [1862, p2, 1958), (1975, p2, 1999], [2098, p2, 2181), (2235, p2, oo)} union(s1, s2): {(-oo, p1, -115), (-76, p1, -18), (57, p1, 89), [118, p2, 145], (145, p1, 233), [281, p2, 348), [405, p2, 504], (547, p2, 564), [564, p1, 605], (656, p2, 674), [674, p1, 731), [734, p2, 884], [893, p1, 906], [914, p1, 952), [952, p2, 977], (977, p1, 983], (983, p2, 1075], [1082, p1, 1124], [1128, p2, 1166], [1175, p1, 1224), [1243, p2, 1279), [1279, p1, 1378], [1382, p2, 1432), (1452, p1, 1508], (1562, p2, 1571), [1571, p1, 1586), (1613, p2, 1649], (1649, p1, 1697), [1697, p2, 1741), [1776, p1, 1860], [1862, p2, 1863], (1863, p1, oo)} s1: {(-oo, p1, 9], [28, p1, 81), (136, p1, 163), (172, p1, 226], (228, p1, 310], (393, p1, 456], [495, p1, 541), [619, p1, 718), (774, p1, 799), [856, p1, 885], (915, p1, 999], [1044, p1, 1112), (1180, p1, 1189), [1248, p1, 1252), [1347, p1, 1435], [1508, p1, 1603), [1683, p1, 1714), [1720, p1, 1813), [1875, p1, 1952), [1990, p1, 2046), (2111, p1, 2153]} s2: {[-52, p2, -13), (83, p2, 113], (123, p2, 202), [290, p2, 376], (425, p2, 478), (523, p2, 567], [578, p2, 653], [669, p2, 747), [820, p2, 887), [895, p2, 915], (957, p2, 1004), (1081, p2, 1167), (1255, p2, 1311], [1390, p2, 1413), (1507, p2, 1579), (1631, p2, 1690), [1774, p2, 1830), (1920, p2, 2006), [2012, p2, 2074], (2159, p2, 2183]} union(s1, s2): {(-oo, p1, 9], [28, p1, 81), (83, p2, 113], (123, p2, 172], (172, p1, 226], (228, p1, 290), [290, p2, 376], (393, p1, 425], (425, p2, 478), [495, p1, 523], (523, p2, 567], [578, p2, 619), [619, p1, 669), [669, p2, 747), (774, p1, 799), [820, p2, 887), [895, p2, 915], (915, p1, 957], (957, p2, 1004), [1044, p1, 1081], (1081, p2, 1167), (1180, p1, 1189), [1248, p1, 1252), (1255, p2, 1311], [1347, p1, 1435], (1507, p2, 1508), [1508, p1, 1603), (1631, p2, 1683), [1683, p1, 1714), [1720, p1, 1774), [1774, p2, 1830), [1875, p1, 1920], (1920, p2, 1990), [1990, p1, 2012), [2012, p2, 2074], (2111, p1, 2153], (2159, p2, 2183]} s1: {(-oo, p1, 43], [106, p1, 145), [183, p1, 216], [276, p1, 289), [353, p1, 383), [449, p1, 484), (499, p1, 524], [609, p1, 616], (703, p1, 774), [794, p1, 840], (847, p1, 920), (984, p1, 1028], (1097, p1, 1192), [1259, p1, 1294), (1307, p1, 1331), [1384, p1, 1461), [1491, p1, 1582), [1665, p1, 1702], (1796, p1, 1839), [1926, p1, 1932), (1957, p1, 1969]} s2: {(-33, p2, 17), [115, p2, 128), [142, p2, 228), [302, p2, 340], [341, p2, 440), [449, p2, 493], (541, p2, 615], (707, p2, 783), (815, p2, 844], (884, p2, 927], (994, p2, 1012), (1079, p2, 1149), [1158, p2, 1160), (1242, p2, 1295], [1312, p2, 1314), (1400, p2, 1488], [1492, p2, 1530), (1548, p2, 1609), (1659, p2, 1664), (1751, p2, 1783], (1814, p2, oo)} union(s1, s2): {(-oo, p1, 43], [106, p1, 142), [142, p2, 228), [276, p1, 289), [302, p2, 340], [341, p2, 440), [449, p2, 493], (499, p1, 524], (541, p2, 609), [609, p1, 616], (703, p1, 707], (707, p2, 783), [794, p1, 815], (815, p2, 844], (847, p1, 884], (884, p2, 927], (984, p1, 1028], (1079, p2, 1097], (1097, p1, 1192), (1242, p2, 1295], (1307, p1, 1331), [1384, p1, 1400], (1400, p2, 1488], [1491, p1, 1548], (1548, p2, 1609), (1659, p2, 1664), [1665, p1, 1702], (1751, p2, 1783], (1796, p1, 1814], (1814, p2, oo)} s1: {(-150, p1, -53), [-38, p1, -37), [60, p1, 80], (97, p1, 128], (137, p1, 176], [253, p1, 350], [357, p1, 432], [530, p1, 556), [565, p1, 704), [739, p1, 755), [837, p1, 875), [880, p1, 934), (943, p1, 983], [993, p1, 1008), (1039, p1, 1136), (1215, p1, 1309], (1366, p1, 1451), [1453, p1, 1518], (1555, p1, 1622]} s2: {(-oo, p2, 188], [255, p2, 315], (322, p2, 348), (426, p2, 428), (441, p2, 497), [570, p2, 635), (666, p2, 734), (824, p2, 917], [975, p2, 1038], (1043, p2, 1119], [1204, p2, 1234), [1304, p2, 1367], (1372, p2, 1467], [1484, p2, 1565], (1632, p2, 1731), [1737, p2, 1805], (1849, p2, 1859), [1941, p2, 1982), (2036, p2, 2084), [2087, p2, 2169)} union(s1, s2): {(-oo, p2, 188], [253, p1, 350], [357, p1, 432], (441, p2, 497), [530, p1, 556), [565, p1, 666], (666, p2, 734), [739, p1, 755), (824, p2, 880), [880, p1, 934), (943, p1, 975), [975, p2, 1038], (1039, p1, 1136), [1204, p2, 1215], (1215, p1, 1304), [1304, p2, 1366], (1366, p1, 1372], (1372, p2, 1453), [1453, p1, 1484), [1484, p2, 1555], (1555, p1, 1622], (1632, p2, 1731), [1737, p2, 1805], (1849, p2, 1859), [1941, p2, 1982), (2036, p2, 2084), [2087, p2, 2169)} s1: {(-oo, p1, 235], [254, p1, 295), (375, p1, 406], [414, p1, 454), [473, p1, 486], (548, p1, 576), (625, p1, 656), [685, p1, 692], [752, p1, 785], (804, p1, 828), [924, p1, 1003], [1062, p1, 1118), (1155, p1, 1156], [1247, p1, 1296), [1329, p1, 1340), (1387, p1, 1478), (1510, p1, 1523), (1595, p1, 1633), [1682, p1, 1766], [1792, p1, 1817), (1909, p1, 1932]} s2: {[-47, p2, -44), (-27, p2, 70], (119, p2, 139], (199, p2, 226], [246, p2, 264), (327, p2, 396], (440, p2, 488], [579, p2, 658), [708, p2, 716), (753, p2, 823], (835, p2, 847), [921, p2, 944], (958, p2, 975), (1064, p2, 1099), (1108, p2, 1152), (1237, p2, 1290), (1346, p2, 1381), (1456, p2, 1499), [1517, p2, 1519), [1569, p2, 1631), (1670, p2, oo)} union(s1, s2): {(-oo, p1, 235], [246, p2, 254), [254, p1, 295), (327, p2, 375], (375, p1, 406], [414, p1, 440], (440, p2, 488], (548, p1, 576), [579, p2, 658), [685, p1, 692], [708, p2, 716), [752, p1, 753], (753, p2, 804], (804, p1, 828), (835, p2, 847), [921, p2, 924), [924, p1, 1003], [1062, p1, 1108], (1108, p2, 1152), (1155, p1, 1156], (1237, p2, 1247), [1247, p1, 1296), [1329, p1, 1340), (1346, p2, 1381), (1387, p1, 1456], (1456, p2, 1499), (1510, p1, 1523), [1569, p2, 1595], (1595, p1, 1633), (1670, p2, oo)} s1: {(44, p1, 117], [145, p1, 216], [277, p1, 290), (335, p1, 412], [500, p1, 551), (606, p1, 618), (711, p1, 780], [795, p1, 829], [895, p1, 951), [1040, p1, 1067], [1106, p1, 1194], [1267, p1, 1309], [1405, p1, 1430), (1512, p1, 1596], (1694, p1, 1713), [1730, p1, 1807), [1890, p1, 1958], (1977, p1, 2014), [2056, p1, 2069), [2165, p1, 2261)} s2: {(201, p2, 230], (255, p2, 268], [344, p2, 403], [480, p2, 511), [597, p2, 654], (667, p2, 685], [726, p2, 824), (826, p2, 857), (923, p2, 975], [1051, p2, 1148], (1182, p2, 1208], (1245, p2, 1328), [1402, p2, 1477), (1492, p2, 1500], (1548, p2, 1614], (1656, p2, 1753), (1800, p2, 1848), (1851, p2, 1886], (1925, p2, 1974], (2042, p2, 2141]} union(s1, s2): {(44, p1, 117], [145, p1, 201], (201, p2, 230], (255, p2, 268], [277, p1, 290), (335, p1, 412], [480, p2, 500), [500, p1, 551), [597, p2, 654], (667, p2, 685], (711, p1, 726), [726, p2, 795), [795, p1, 826], (826, p2, 857), [895, p1, 923], (923, p2, 975], [1040, p1, 1051), [1051, p2, 1106), [1106, p1, 1182], (1182, p2, 1208], (1245, p2, 1328), [1402, p2, 1477), (1492, p2, 1500], (1512, p1, 1548], (1548, p2, 1614], (1656, p2, 1730), [1730, p1, 1800], (1800, p2, 1848), (1851, p2, 1886], [1890, p1, 1925], (1925, p2, 1974], (1977, p1, 2014), (2042, p2, 2141], [2165, p1, 2261)} s1: {(148, p1, 210), (257, p1, 274), (313, p1, 338), [421, p1, 442], [464, p1, 544), (633, p1, 651], (726, p1, 800], [826, p1, 853], [885, p1, 931], (966, p1, 1053], (1124, p1, 1180], (1185, p1, 1219), (1308, p1, 1353), [1444, p1, 1498], (1573, p1, 1632), [1643, p1, 1698), (1751, p1, 1809], (1894, p1, 1945), [1979, p1, 1988], [2079, p1, 2102), (2149, p1, oo)} s2: {(-oo, p2, 210], (216, p2, 251], [331, p2, 430), (469, p2, 552), [560, p2, 581), [632, p2, 720), (766, p2, 807), (841, p2, 847), (880, p2, 974), [1048, p2, 1058), (1091, p2, 1175), (1228, p2, 1277), [1346, p2, 1365], [1448, p2, 1509], (1512, p2, 1519), [1571, p2, 1588), (1614, p2, 1624], (1691, p2, 1787), (1882, p2, 1923), [2013, p2, 2030), [2047, p2, 2118)} union(s1, s2): {(-oo, p2, 210], (216, p2, 251], (257, p1, 274), (313, p1, 331), [331, p2, 421), [421, p1, 442], [464, p1, 469], (469, p2, 552), [560, p2, 581), [632, p2, 720), (726, p1, 766], (766, p2, 807), [826, p1, 853], (880, p2, 966], (966, p1, 1048), [1048, p2, 1058), (1091, p2, 1124], (1124, p1, 1180], (1185, p1, 1219), (1228, p2, 1277), (1308, p1, 1346), [1346, p2, 1365], [1444, p1, 1448), [1448, p2, 1509], (1512, p2, 1519), [1571, p2, 1573], (1573, p1, 1632), [1643, p1, 1691], (1691, p2, 1751], (1751, p1, 1809], (1882, p2, 1894], (1894, p1, 1945), [1979, p1, 1988], [2013, p2, 2030), [2047, p2, 2118), (2149, p1, oo)} s1: {(-oo, p1, -57], (-4, p1, 52), [120, p1, 122], [206, p1, 211), [259, p1, 340], (399, p1, 492), [506, p1, 559), (609, p1, 619), (676, p1, 685], (780, p1, 809], (814, p1, 909], [942, p1, 949), [1041, p1, 1097), [1105, p1, 1113], [1149, p1, 1210], [1220, p1, 1292), (1388, p1, 1436), (1497, p1, 1550), [1552, p1, 1617), (1700, p1, 1714), [1729, p1, 1771]} s2: {[215, p2, 222], [243, p2, 299), (396, p2, 441), (537, p2, 636], (675, p2, 680], [745, p2, 760), (786, p2, 859], (929, p2, 971), [1061, p2, 1148], (1210, p2, 1219), [1230, p2, 1292], (1367, p2, 1369], (1414, p2, 1434), (1521, p2, 1579), [1623, p2, 1678), (1733, p2, 1816), (1829, p2, 1830), (1833, p2, 1837), (1889, p2, 1918], (1998, p2, 2046], (2135, p2, oo)} union(s1, s2): {(-oo, p1, -57], (-4, p1, 52), [120, p1, 122], [206, p1, 211), [215, p2, 222], [243, p2, 259), [259, p1, 340], (396, p2, 399], (399, p1, 492), [506, p1, 537], (537, p2, 636], (675, p2, 676], (676, p1, 685], [745, p2, 760), (780, p1, 786], (786, p2, 814], (814, p1, 909], (929, p2, 971), [1041, p1, 1061), [1061, p2, 1148], [1149, p1, 1210], (1210, p2, 1219), [1220, p1, 1230), [1230, p2, 1292], (1367, p2, 1369], (1388, p1, 1436), (1497, p1, 1521], (1521, p2, 1552), [1552, p1, 1617), [1623, p2, 1678), (1700, p1, 1714), [1729, p1, 1733], (1733, p2, 1816), (1829, p2, 1830), (1833, p2, 1837), (1889, p2, 1918], (1998, p2, 2046], (2135, p2, oo)} s1: {(-oo, p1, 138], [162, p1, 189], [201, p1, 275], [363, p1, 455), (502, p1, 593], (672, p1, 754], [774, p1, 852], [884, p1, 947], [1003, p1, 1060], (1081, p1, 1103), (1178, p1, 1187], (1249, p1, 1250], [1324, p1, 1390], (1446, p1, 1447), [1532, p1, 1561), [1608, p1, 1707], (1757, p1, 1846], (1907, p1, 1993], (2030, p1, 2032], (2085, p1, 2184), (2186, p1, 2251), [2306, p1, oo)} s2: {(-oo, p2, 32), (125, p2, 144], (194, p2, 216], [275, p2, 346), [360, p2, 454], (459, p2, 535), [628, p2, 723], (799, p2, 846], (942, p2, 1008), (1067, p2, 1087), (1141, p2, 1220), [1247, p2, 1303), (1390, p2, 1457], [1543, p2, 1634), (1674, p2, 1684], [1731, p2, 1732), [1782, p2, 1836], [1866, p2, 1895), (1994, p2, 2084], (2113, p2, 2173), [2184, p2, 2215]} union(s1, s2): {(-oo, p1, 125], (125, p2, 144], [162, p1, 189], (194, p2, 201), [201, p1, 275), [275, p2, 346), [360, p2, 363), [363, p1, 455), (459, p2, 502], (502, p1, 593], [628, p2, 672], (672, p1, 754], [774, p1, 852], [884, p1, 942], (942, p2, 1003), [1003, p1, 1060], (1067, p2, 1081], (1081, p1, 1103), (1141, p2, 1220), [1247, p2, 1303), [1324, p1, 1390], (1390, p2, 1457], [1532, p1, 1543), [1543, p2, 1608), [1608, p1, 1707], [1731, p2, 1732), (1757, p1, 1846], [1866, p2, 1895), (1907, p1, 1993], (1994, p2, 2084], (2085, p1, 2184), [2184, p2, 2186], (2186, p1, 2251), [2306, p1, oo)} s1: {[6, p1, 30), (112, p1, 173), [265, p1, 315), (391, p1, 443], (494, p1, 570], (612, p1, 624), (648, p1, 686), [712, p1, 761], [835, p1, 887), (934, p1, 974), (1071, p1, 1125), (1215, p1, 1305], (1376, p1, 1386), (1391, p1, 1469], [1491, p1, 1514], (1534, p1, 1628], [1664, p1, 1698], [1701, p1, 1731), (1740, p1, 1788], [1849, p1, 1913], (1942, p1, oo)} s2: {(-oo, p2, 183], (247, p2, 326), [378, p2, 444), (464, p2, 499), [557, p2, 613), (678, p2, 718), (791, p2, 795), [859, p2, 918], (923, p2, 992], [998, p2, 1068], [1150, p2, 1158), (1220, p2, 1306], (1382, p2, 1449), (1506, p2, 1536), (1567, p2, 1654), (1709, p2, 1731), [1802, p2, 1824], [1852, p2, 1925], (1975, p2, 2013), (2041, p2, 2044), (2133, p2, 2209), [2301, p2, oo)} union(s1, s2): {(-oo, p2, 183], (247, p2, 326), [378, p2, 444), (464, p2, 494], (494, p1, 557), [557, p2, 612], (612, p1, 624), (648, p1, 678], (678, p2, 712), [712, p1, 761], (791, p2, 795), [835, p1, 859), [859, p2, 918], (923, p2, 992], [998, p2, 1068], (1071, p1, 1125), [1150, p2, 1158), (1215, p1, 1220], (1220, p2, 1306], (1376, p1, 1382], (1382, p2, 1391], (1391, p1, 1469], [1491, p1, 1506], (1506, p2, 1534], (1534, p1, 1567], (1567, p2, 1654), [1664, p1, 1698], [1701, p1, 1731), (1740, p1, 1788], [1802, p2, 1824], [1849, p1, 1852), [1852, p2, 1925], (1942, p1, oo)} s1: {(-oo, p1, 201], (267, p1, 304], (364, p1, 461], [559, p1, 617), (674, p1, 756), [805, p1, 880), (920, p1, 973], (1013, p1, 1085), [1109, p1, 1208), (1295, p1, 1299], [1305, p1, 1343), (1390, p1, 1427), (1478, p1, 1551), (1580, p1, 1657), [1676, p1, 1729], (1822, p1, 1828), (1912, p1, 1933], (2018, p1, 2056), (2061, p1, 2103), (2134, p1, 2182), [2234, p1, 2238)} s2: {(-138, p2, -42), (53, p2, 66), (93, p2, 145), [181, p2, 252), (296, p2, 338), [376, p2, 469], [518, p2, 538], (618, p2, 678], (774, p2, 837), (854, p2, 902), (991, p2, 1042], [1091, p2, 1124), [1153, p2, 1242], (1328, p2, 1378], [1387, p2, 1460], (1539, p2, 1620], (1716, p2, 1755], (1760, p2, 1777), (1822, p2, 1916), (1977, p2, 2074)} union(s1, s2): {(-oo, p1, 181), [181, p2, 252), (267, p1, 296], (296, p2, 338), (364, p1, 376), [376, p2, 469], [518, p2, 538], [559, p1, 617), (618, p2, 674], (674, p1, 756), (774, p2, 805), [805, p1, 854], (854, p2, 902), (920, p1, 973], (991, p2, 1013], (1013, p1, 1085), [1091, p2, 1109), [1109, p1, 1153), [1153, p2, 1242], (1295, p1, 1299], [1305, p1, 1328], (1328, p2, 1378], [1387, p2, 1460], (1478, p1, 1539], (1539, p2, 1580], (1580, p1, 1657), [1676, p1, 1716], (1716, p2, 1755], (1760, p2, 1777), (1822, p2, 1912], (1912, p1, 1933], (1977, p2, 2061], (2061, p1, 2103), (2134, p1, 2182), [2234, p1, 2238)} s1: {(22, p1, 93), (115, p1, 183), (222, p1, 261), [351, p1, 436], [527, p1, 541], (553, p1, 633], (711, p1, 780], (791, p1, 859], (892, p1, 983), (1082, p1, 1160], [1166, p1, 1184], [1219, p1, 1289], (1336, p1, 1354], [1393, p1, 1476], [1557, p1, 1646], (1713, p1, 1721), [1779, p1, 1875), (1893, p1, 1924], [2008, p1, 2033], (2109, p1, 2206]} s2: {[-71, p2, 26), [105, p2, 166), [201, p2, 281), [287, p2, 385), (420, p2, 436], (528, p2, 567], (614, p2, 664), (683, p2, 751), [765, p2, 819], [901, p2, 905], (950, p2, 1019], (1053, p2, 1129), (1217, p2, 1275], (1348, p2, 1366], (1461, p2, 1523), [1533, p2, 1579), (1633, p2, 1639), (1649, p2, 1701], (1719, p2, 1739], [1795, p2, 1855), [1861, p2, oo)} union(s1, s2): {[-71, p2, 22], (22, p1, 93), [105, p2, 115], (115, p1, 183), [201, p2, 281), [287, p2, 351), [351, p1, 436], [527, p1, 528], (528, p2, 553], (553, p1, 614], (614, p2, 664), (683, p2, 711], (711, p1, 765), [765, p2, 791], (791, p1, 859], (892, p1, 950], (950, p2, 1019], (1053, p2, 1082], (1082, p1, 1160], [1166, p1, 1184], (1217, p2, 1219), [1219, p1, 1289], (1336, p1, 1348], (1348, p2, 1366], [1393, p1, 1461], (1461, p2, 1523), [1533, p2, 1557), [1557, p1, 1646], (1649, p2, 1701], (1713, p1, 1719], (1719, p2, 1739], [1779, p1, 1861), [1861, p2, oo)} s1: {[140, p1, 221), (231, p1, 288], [358, p1, 423], (508, p1, 547), (639, p1, 699), (752, p1, 828], [902, p1, 921], [979, p1, 1076), [1123, p1, 1154], [1186, p1, 1281), (1349, p1, 1403), (1422, p1, 1465], [1489, p1, 1544), [1558, p1, 1601), [1687, p1, 1729], (1805, p1, 1853], [1891, p1, 1948), (1971, p1, 2049), (2133, p1, 2165], (2169, p1, 2247]} s2: {(-oo, p2, 43), [54, p2, 124), [130, p2, 177), (222, p2, 312], (399, p2, 467), (472, p2, 540], (552, p2, 608), (660, p2, 673], [762, p2, 801], [865, p2, 893), (925, p2, 1018], (1051, p2, 1073), (1109, p2, 1148], (1221, p2, 1301], (1331, p2, 1418], [1463, p2, 1530], [1553, p2, 1580], (1666, p2, 1749], [1844, p2, 1915], (1943, p2, 1980], (2054, p2, 2146]} union(s1, s2): {(-oo, p2, 43), [54, p2, 124), [130, p2, 140), [140, p1, 221), (222, p2, 312], [358, p1, 399], (399, p2, 467), (472, p2, 508], (508, p1, 547), (552, p2, 608), (639, p1, 699), (752, p1, 828], [865, p2, 893), [902, p1, 921], (925, p2, 979), [979, p1, 1076), (1109, p2, 1123), [1123, p1, 1154], [1186, p1, 1221], (1221, p2, 1301], (1331, p2, 1418], (1422, p1, 1463), [1463, p2, 1489), [1489, p1, 1544), [1553, p2, 1558), [1558, p1, 1601), (1666, p2, 1749], (1805, p1, 1844), [1844, p2, 1891), [1891, p1, 1943], (1943, p2, 1971], (1971, p1, 2049), (2054, p2, 2133], (2133, p1, 2165], (2169, p1, 2247]} s1: {[39, p1, 40), [102, p1, 142], [177, p1, 222], [267, p1, 331], (418, p1, 479), (521, p1, 535), (565, p1, 620), [696, p1, 784), [805, p1, 872), [915, p1, 1006], [1037, p1, 1109), [1140, p1, 1231], [1244, p1, 1288), [1303, p1, 1382], [1395, p1, 1447], [1487, p1, 1538), [1606, p1, 1624], (1692, p1, 1744), [1812, p1, 1846], (1869, p1, 1928], (2006, p1, oo)} s2: {(-oo, p2, 125], [154, p2, 170], (220, p2, 301), [339, p2, 395], (397, p2, 476), (530, p2, 561), [652, p2, 692], [707, p2, 708), (719, p2, 794), (796, p2, 855], (937, p2, 1012), (1033, p2, 1131], [1156, p2, 1216), (1294, p2, 1391], [1450, p2, 1531], (1587, p2, 1675], (1741, p2, 1752), [1760, p2, 1826], [1898, p2, 1957], (2018, p2, 2061]} union(s1, s2): {(-oo, p2, 102), [102, p1, 142], [154, p2, 170], [177, p1, 220], (220, p2, 267), [267, p1, 331], [339, p2, 395], (397, p2, 418], (418, p1, 479), (521, p1, 530], (530, p2, 561), (565, p1, 620), [652, p2, 692], [696, p1, 719], (719, p2, 794), (796, p2, 805), [805, p1, 872), [915, p1, 937], (937, p2, 1012), (1033, p2, 1131], [1140, p1, 1231], [1244, p1, 1288), (1294, p2, 1391], [1395, p1, 1447], [1450, p2, 1487), [1487, p1, 1538), (1587, p2, 1675], (1692, p1, 1741], (1741, p2, 1752), [1760, p2, 1812), [1812, p1, 1846], (1869, p1, 1898), [1898, p2, 1957], (2006, p1, oo)} s1: {(-oo, p1, -112), (-53, p1, -45), (-30, p1, -22], (-4, p1, 82], (140, p1, 239), [261, p1, 302), [364, p1, 414], [462, p1, 466), [467, p1, 535), [562, p1, 614], [650, p1, 715), (758, p1, 826), (892, p1, 987), (1006, p1, 1066), [1113, p1, 1151], (1211, p1, 1214], (1287, p1, 1312], [1348, p1, 1404], [1455, p1, 1534], (1549, p1, 1571], [1572, p1, 1643]} s2: {(-oo, p2, 32), (44, p2, 101], (150, p2, 221), (263, p2, 264), (297, p2, 360), [367, p2, 436], (458, p2, 550], (557, p2, 631], (643, p2, 660), (732, p2, 809], (895, p2, 912), [1002, p2, 1076], [1174, p2, 1192], [1213, p2, 1253], [1303, p2, 1394), [1396, p2, 1467), [1544, p2, 1578], (1644, p2, 1696), [1790, p2, 1888], (1987, p2, 2048], [2089, p2, 2184), [2277, p2, oo)} union(s1, s2): {(-oo, p2, -4], (-4, p1, 44], (44, p2, 101], (140, p1, 239), [261, p1, 297], (297, p2, 360), [364, p1, 367), [367, p2, 436], (458, p2, 550], (557, p2, 631], (643, p2, 650), [650, p1, 715), (732, p2, 758], (758, p1, 826), (892, p1, 987), [1002, p2, 1076], [1113, p1, 1151], [1174, p2, 1192], (1211, p1, 1213), [1213, p2, 1253], (1287, p1, 1303), [1303, p2, 1348), [1348, p1, 1396), [1396, p2, 1455), [1455, p1, 1534], [1544, p2, 1572), [1572, p1, 1643], (1644, p2, 1696), [1790, p2, 1888], (1987, p2, 2048], [2089, p2, 2184), [2277, p2, oo)} s1: {(44, p1, 84), [134, p1, 229], (266, p1, 332], (430, p1, 439), (495, p1, 519], (536, p1, 556), [574, p1, 602), [647, p1, 703), (750, p1, 822], (839, p1, 848), [941, p1, 981], [1047, p1, 1142], [1159, p1, 1167], (1236, p1, 1294), (1328, p1, 1374], [1397, p1, 1408), (1505, p1, 1587), [1675, p1, 1744], (1775, p1, 1864), [1953, p1, 2006]} s2: {[-92, p2, -74], (19, p2, 102], (108, p2, 169), [255, p2, 329], (400, p2, 484), [574, p2, 608), [663, p2, 723), [758, p2, 797], [856, p2, 918), (1003, p2, 1031], [1111, p2, 1198], [1251, p2, 1287), [1378, p2, 1457], (1495, p2, 1509), [1599, p2, 1652], (1675, p2, 1724], (1802, p2, 1825], (1867, p2, 1941), [2017, p2, 2080]} union(s1, s2): {[-92, p2, -74], (19, p2, 102], (108, p2, 134), [134, p1, 229], [255, p2, 266], (266, p1, 332], (400, p2, 484), (495, p1, 519], (536, p1, 556), [574, p2, 608), [647, p1, 663), [663, p2, 723), (750, p1, 822], (839, p1, 848), [856, p2, 918), [941, p1, 981], (1003, p2, 1031], [1047, p1, 1111), [1111, p2, 1198], (1236, p1, 1294), (1328, p1, 1374], [1378, p2, 1457], (1495, p2, 1505], (1505, p1, 1587), [1599, p2, 1652], [1675, p1, 1744], (1775, p1, 1864), (1867, p2, 1941), [1953, p1, 2006], [2017, p2, 2080]} s1: {(-oo, p1, 145], (175, p1, 227], (272, p1, 341), (353, p1, 354), [393, p1, 431], (476, p1, 493], (548, p1, 646], (705, p1, 742), [801, p1, 898), [908, p1, 978], (1028, p1, 1113), (1163, p1, 1194], (1200, p1, 1231], (1328, p1, 1336], [1366, p1, 1396), (1483, p1, 1508), (1533, p1, 1538], [1570, p1, 1610], (1708, p1, 1740), [1817, p1, 1868), [1890, p1, 1965)} s2: {[-38, p2, -2], [-1, p2, 13), [107, p2, 111), [159, p2, 194), (246, p2, 306), (359, p2, 413), (444, p2, 542), (586, p2, 631], (658, p2, 743), (791, p2, 792), (880, p2, 940], [985, p2, 1032), (1084, p2, 1133), (1149, p2, 1221], (1275, p2, 1329], [1352, p2, 1418), (1507, p2, 1563), (1597, p2, 1659), [1736, p2, 1803], [1846, p2, 1932]} union(s1, s2): {(-oo, p1, 145], [159, p2, 175], (175, p1, 227], (246, p2, 272], (272, p1, 341), (353, p1, 354), (359, p2, 393), [393, p1, 431], (444, p2, 542), (548, p1, 646], (658, p2, 743), (791, p2, 792), [801, p1, 880], (880, p2, 908), [908, p1, 978], [985, p2, 1028], (1028, p1, 1084], (1084, p2, 1133), (1149, p2, 1200], (1200, p1, 1231], (1275, p2, 1328], (1328, p1, 1336], [1352, p2, 1418), (1483, p1, 1507], (1507, p2, 1563), [1570, p1, 1597], (1597, p2, 1659), (1708, p1, 1736), [1736, p2, 1803], [1817, p1, 1846), [1846, p2, 1890), [1890, p1, 1965)} s1: {(-oo, p1, -42], [35, p1, 101), [153, p1, 206), (234, p1, 284], [361, p1, 457], [501, p1, 548], (620, p1, 680), [742, p1, 754], (788, p1, 866), (935, p1, 974), [995, p1, 1062], (1082, p1, 1171), (1217, p1, 1227], [1300, p1, 1362), (1391, p1, 1478), [1485, p1, 1495), [1589, p1, 1668), [1745, p1, 1754), [1762, p1, 1848), [1901, p1, 2045], (2095, p1, oo)} s2: {(258, p2, 294), [382, p2, 472], [529, p2, 534], (583, p2, 634], (694, p2, 698), [788, p2, 865), [960, p2, 961), (1060, p2, 1130], (1131, p2, 1159), (1252, p2, 1253], [1340, p2, 1404), (1494, p2, 1579), (1591, p2, 1603), [1619, p2, 1620], [1670, p2, 1711), (1737, p2, 1820], (1823, p2, 1840], [1841, p2, 1873], (1962, p2, 2000], [2096, p2, 2166)} union(s1, s2): {(-oo, p1, -42], [35, p1, 101), [153, p1, 206), (234, p1, 258], (258, p2, 294), [361, p1, 382), [382, p2, 472], [501, p1, 548], (583, p2, 620], (620, p1, 680), (694, p2, 698), [742, p1, 754], [788, p2, 788], (788, p1, 866), (935, p1, 974), [995, p1, 1060], (1060, p2, 1082], (1082, p1, 1171), (1217, p1, 1227], (1252, p2, 1253], [1300, p1, 1340), [1340, p2, 1391], (1391, p1, 1478), [1485, p1, 1494], (1494, p2, 1579), [1589, p1, 1668), [1670, p2, 1711), (1737, p2, 1762), [1762, p1, 1841), [1841, p2, 1873], [1901, p1, 2045], (2095, p1, oo)} s1: {[-125, p1, -124), [-76, p1, -43), (43, p1, 81], (136, p1, 188], (284, p1, 333), [342, p1, 369], (442, p1, 534], [589, p1, 657), [702, p1, 783], [832, p1, 897), (970, p1, 1009], (1052, p1, 1055), (1152, p1, 1155), [1234, p1, 1280], (1379, p1, 1439), (1499, p1, 1510), [1548, p1, 1632], [1640, p1, 1717), [1785, p1, 1882], (1945, p1, 1961], (2050, p1, oo)} s2: {(-oo, p2, -31), [-15, p2, 57), (86, p2, 99), [107, p2, 188], [203, p2, 209], [229, p2, 299), (342, p2, 394), [468, p2, 557), [643, p2, 644), (716, p2, 769), (855, p2, 899), [917, p2, 970], (1013, p2, 1048), (1130, p2, 1166], (1188, p2, 1245], (1250, p2, 1321], (1387, p2, 1421], [1476, p2, 1502), (1592, p2, 1606), [1704, p2, 1731), (1820, p2, 1878)} union(s1, s2): {(-oo, p2, -31), [-15, p2, 43], (43, p1, 81], (86, p2, 99), [107, p2, 188], [203, p2, 209], [229, p2, 284], (284, p1, 333), [342, p1, 342], (342, p2, 394), (442, p1, 468), [468, p2, 557), [589, p1, 657), [702, p1, 783], [832, p1, 855], (855, p2, 899), [917, p2, 970], (970, p1, 1009], (1013, p2, 1048), (1052, p1, 1055), (1130, p2, 1166], (1188, p2, 1234), [1234, p1, 1250], (1250, p2, 1321], (1379, p1, 1439), [1476, p2, 1499], (1499, p1, 1510), [1548, p1, 1632], [1640, p1, 1704), [1704, p2, 1731), [1785, p1, 1882], (1945, p1, 1961], (2050, p1, oo)} s1: {(-127, p1, -33), (-29, p1, 3), [94, p1, 190), (224, p1, 272], (278, p1, 280), (377, p1, 411), (413, p1, 461), (496, p1, 547], (616, p1, 661), [718, p1, 745], [762, p1, 845], (918, p1, 922], (970, p1, 1041], [1099, p1, 1151), (1181, p1, 1219], (1250, p1, 1348), [1358, p1, 1374], (1429, p1, 1430), (1504, p1, 1521), [1597, p1, 1645]} s2: {(69, p2, 72], [95, p2, 104], [191, p2, 237), [253, p2, 257], [281, p2, 307), (403, p2, 467], [566, p2, 627), (687, p2, 731], (772, p2, 814], (836, p2, 853], [878, p2, 914), (918, p2, 1003], (1017, p2, 1111), [1144, p2, 1185], (1265, p2, 1351), (1374, p2, 1380], (1455, p2, 1536), [1632, p2, 1648], [1728, p2, 1813], (1834, p2, 1908)} union(s1, s2): {(-127, p1, -33), (-29, p1, 3), (69, p2, 72], [94, p1, 190), [191, p2, 224], (224, p1, 272], (278, p1, 280), [281, p2, 307), (377, p1, 403], (403, p2, 467], (496, p1, 547], [566, p2, 616], (616, p1, 661), (687, p2, 718), [718, p1, 745], [762, p1, 836], (836, p2, 853], [878, p2, 914), (918, p2, 970], (970, p1, 1017], (1017, p2, 1099), [1099, p1, 1144), [1144, p2, 1181], (1181, p1, 1219], (1250, p1, 1265], (1265, p2, 1351), [1358, p1, 1374], (1374, p2, 1380], (1429, p1, 1430), (1455, p2, 1536), [1597, p1, 1632), [1632, p2, 1648], [1728, p2, 1813], (1834, p2, 1908)} s1: {(-oo, p1, 59), [66, p1, 94], (163, p1, 261), [270, p1, 300], (330, p1, 427], [475, p1, 489), (538, p1, 583), (622, p1, 657), (679, p1, 746), (794, p1, 798], (826, p1, 898), (909, p1, 970], (998, p1, 1060], (1067, p1, 1139], (1151, p1, 1216], (1249, p1, 1274), (1299, p1, 1378], [1473, p1, 1491), [1541, p1, 1634], [1656, p1, 1708), (1787, p1, 1875], (1907, p1, oo)} s2: {(-oo, p2, 202), [238, p2, 288), [291, p2, 376), [384, p2, 566], [596, p2, 692], [789, p2, 875), (912, p2, 995), [1036, p2, 1104], [1107, p2, 1151), [1247, p2, 1334), [1335, p2, 1393), (1412, p2, 1423], [1487, p2, 1530], [1604, p2, 1659], (1674, p2, 1705], (1742, p2, 1834), (1908, p2, 1918], (1981, p2, 2030], (2037, p2, 2056], (2146, p2, 2160]} union(s1, s2): {(-oo, p2, 163], (163, p1, 238), [238, p2, 270), [270, p1, 291), [291, p2, 330], (330, p1, 384), [384, p2, 538], (538, p1, 583), [596, p2, 679], (679, p1, 746), [789, p2, 826], (826, p1, 898), (909, p1, 912], (912, p2, 995), (998, p1, 1036), [1036, p2, 1067], (1067, p1, 1107), [1107, p2, 1151), (1151, p1, 1216], [1247, p2, 1299], (1299, p1, 1335), [1335, p2, 1393), (1412, p2, 1423], [1473, p1, 1487), [1487, p2, 1530], [1541, p1, 1604), [1604, p2, 1656), [1656, p1, 1708), (1742, p2, 1787], (1787, p1, 1875], (1907, p1, oo)} s1: {(-oo, p1, 227], (312, p1, 351], (381, p1, 393], [405, p1, 421], (480, p1, 572], [597, p1, 683], [761, p1, 839), (911, p1, 957), (1009, p1, 1055], [1067, p1, 1068), (1087, p1, 1114), [1152, p1, 1227], (1284, p1, 1317], (1414, p1, 1421], [1500, p1, 1509], [1574, p1, 1587], (1626, p1, 1658], [1694, p1, 1713], [1731, p1, 1780), [1832, p1, 1909], (1988, p1, 2010]} s2: {(-oo, p2, 211), (254, p2, 294], [317, p2, 401), (463, p2, 504), (526, p2, 588), (616, p2, 636], (713, p2, 755], (826, p2, 830), [853, p2, 884], (890, p2, 971], (979, p2, 1031), (1040, p2, 1075], [1080, p2, 1162), (1202, p2, 1271], [1282, p2, 1284], (1366, p2, 1456], [1503, p2, 1548), [1556, p2, 1643), (1669, p2, 1693], (1707, p2, 1733)} union(s1, s2): {(-oo, p1, 227], (254, p2, 294], (312, p1, 317), [317, p2, 401), [405, p1, 421], (463, p2, 480], (480, p1, 526], (526, p2, 588), [597, p1, 683], (713, p2, 755], [761, p1, 839), [853, p2, 884], (890, p2, 971], (979, p2, 1009], (1009, p1, 1040], (1040, p2, 1075], [1080, p2, 1152), [1152, p1, 1202], (1202, p2, 1271], [1282, p2, 1284], (1284, p1, 1317], (1366, p2, 1456], [1500, p1, 1503), [1503, p2, 1548), [1556, p2, 1626], (1626, p1, 1658], (1669, p2, 1693], [1694, p1, 1707], (1707, p2, 1731), [1731, p1, 1780), [1832, p1, 1909], (1988, p1, 2010]} s1: {[-95, p1, -64], [-31, p1, 65), (119, p1, 197], [293, p1, 362), (430, p1, 444), (511, p1, 542], (594, p1, 669), [736, p1, 744], [757, p1, 804), [811, p1, 907], (967, p1, 1002), (1069, p1, 1099], [1187, p1, 1274], [1356, p1, 1440], (1457, p1, 1459], (1508, p1, 1555), (1593, p1, 1656), [1717, p1, 1753], (1796, p1, 1873), (1886, p1, 1922], [1989, p1, oo)} s2: {(-oo, p2, 249], [278, p2, 301), [356, p2, 440), (499, p2, 533], (611, p2, 710), [807, p2, 854], (937, p2, 1025), (1102, p2, 1168], (1180, p2, 1181], [1214, p2, 1241], [1288, p2, 1290), [1328, p2, 1333), (1408, p2, 1417], (1429, p2, 1473), (1546, p2, 1608], (1619, p2, 1620), [1652, p2, 1728], [1756, p2, 1812], [1858, p2, 1871], [1876, p2, 1931), [2008, p2, 2068], (2146, p2, oo)} union(s1, s2): {(-oo, p2, 249], [278, p2, 293), [293, p1, 356), [356, p2, 430], (430, p1, 444), (499, p2, 511], (511, p1, 542], (594, p1, 611], (611, p2, 710), [736, p1, 744], [757, p1, 804), [807, p2, 811), [811, p1, 907], (937, p2, 1025), (1069, p1, 1099], (1102, p2, 1168], (1180, p2, 1181], [1187, p1, 1274], [1288, p2, 1290), [1328, p2, 1333), [1356, p1, 1429], (1429, p2, 1473), (1508, p1, 1546], (1546, p2, 1593], (1593, p1, 1652), [1652, p2, 1717), [1717, p1, 1753], [1756, p2, 1796], (1796, p1, 1873), [1876, p2, 1931), [1989, p1, oo)} s1: {(-oo, p1, 109), (151, p1, 177], [232, p1, 326], [357, p1, 382], [465, p1, 513), (574, p1, 619), (699, p1, 787], (855, p1, 903], [973, p1, 1044], (1106, p1, 1167), (1177, p1, 1258], (1356, p1, 1436], (1445, p1, 1463), [1526, p1, 1615), [1646, p1, 1651), (1662, p1, 1743], [1780, p1, 1816], [1825, p1, 1893), (1949, p1, 2018], (2037, p1, 2066), (2142, p1, 2185], (2231, p1, oo)} s2: {[-165, p2, -114), [-105, p2, -14), (45, p2, 69), [148, p2, 181), [280, p2, 377], (426, p2, 431], (470, p2, 471], (569, p2, 619), (669, p2, 739], [754, p2, 780], [838, p2, 894], [929, p2, 1015], [1053, p2, 1098], [1197, p2, 1220], [1306, p2, 1368], (1415, p2, 1463), (1478, p2, 1554], [1649, p2, 1734], (1742, p2, 1776], [1800, p2, 1806]} union(s1, s2): {(-oo, p1, 109), [148, p2, 181), [232, p1, 280), [280, p2, 357), [357, p1, 382], (426, p2, 431], [465, p1, 513), (569, p2, 619), (669, p2, 699], (699, p1, 787], [838, p2, 855], (855, p1, 903], [929, p2, 973), [973, p1, 1044], [1053, p2, 1098], (1106, p1, 1167), (1177, p1, 1258], [1306, p2, 1356], (1356, p1, 1415], (1415, p2, 1463), (1478, p2, 1526), [1526, p1, 1615), [1646, p1, 1649), [1649, p2, 1662], (1662, p1, 1742], (1742, p2, 1776], [1780, p1, 1816], [1825, p1, 1893), (1949, p1, 2018], (2037, p1, 2066), (2142, p1, 2185], (2231, p1, oo)} s1: {(20, p1, 68), (115, p1, 140), (173, p1, 242], [258, p1, 279], (376, p1, 402), (456, p1, 470), [538, p1, 614], (674, p1, 693), (710, p1, 753], (769, p1, 792), (876, p1, 890], (943, p1, 1015], [1061, p1, 1152), (1218, p1, 1257], [1280, p1, 1281], (1317, p1, 1387], [1436, p1, 1476), (1523, p1, 1532], [1622, p1, 1674], [1763, p1, 1831]} s2: {[18, p2, 84), (89, p2, 158), [212, p2, 247), [283, p2, 283], (319, p2, 415), [428, p2, 494), (553, p2, 579], (666, p2, 674], (678, p2, 771), [816, p2, 873), (957, p2, 1007), [1074, p2, 1107), (1204, p2, 1246), [1249, p2, 1249], [1336, p2, 1353), (1373, p2, 1412), [1468, p2, 1505), [1552, p2, 1600), [1649, p2, 1650), [1715, p2, 1792)} union(s1, s2): {[18, p2, 84), (89, p2, 158), (173, p1, 212), [212, p2, 247), [258, p1, 279], [283, p2, 283], (319, p2, 415), [428, p2, 494), [538, p1, 614], (666, p2, 674], (674, p1, 678], (678, p2, 769], (769, p1, 792), [816, p2, 873), (876, p1, 890], (943, p1, 1015], [1061, p1, 1152), (1204, p2, 1218], (1218, p1, 1257], [1280, p1, 1281], (1317, p1, 1373], (1373, p2, 1412), [1436, p1, 1468), [1468, p2, 1505), (1523, p1, 1532], [1552, p2, 1600), [1622, p1, 1674], [1715, p2, 1763), [1763, p1, 1831]} s1: {(-oo, p1, 154), [248, p1, 249), [330, p1, 408), (435, p1, 465], [511, p1, 582), (660, p1, 691), (754, p1, 777), (820, p1, 888], [919, p1, 971), (984, p1, 1035), (1087, p1, 1162], [1223, p1, 1256), [1310, p1, 1379), (1447, p1, 1480), (1557, p1, 1617), [1671, p1, 1681], (1689, p1, 1780), (1838, p1, 1909), [2002, p1, 2091], [2169, p1, 2266]} s2: {[-17, p2, 25), [37, p2, 136), [188, p2, 286], [335, p2, 396], [480, p2, 568], [661, p2, 708), [769, p2, 821), [853, p2, 930], [1001, p2, 1031), [1057, p2, 1063), (1096, p2, 1160), [1236, p2, 1236], [1270, p2, 1352), (1438, p2, 1515), [1580, p2, 1640), (1691, p2, 1736), [1758, p2, 1765], (1812, p2, 1846), (1932, p2, 2008], [2084, p2, 2110), (2185, p2, oo)} union(s1, s2): {(-oo, p1, 154), [188, p2, 286], [330, p1, 408), (435, p1, 465], [480, p2, 511), [511, p1, 582), (660, p1, 661), [661, p2, 708), (754, p1, 769), [769, p2, 820], (820, p1, 853), [853, p2, 919), [919, p1, 971), (984, p1, 1035), [1057, p2, 1063), (1087, p1, 1162], [1223, p1, 1256), [1270, p2, 1310), [1310, p1, 1379), (1438, p2, 1515), (1557, p1, 1580), [1580, p2, 1640), [1671, p1, 1681], (1689, p1, 1780), (1812, p2, 1838], (1838, p1, 1909), (1932, p2, 2002), [2002, p1, 2084), [2084, p2, 2110), [2169, p1, 2185], (2185, p2, oo)} s1: {(-oo, p1, -55), [6, p1, 84], [163, p1, 171), [243, p1, 262), (339, p1, 408), [477, p1, 526], [543, p1, 586), (590, p1, 621), (670, p1, 729), (730, p1, 818], (868, p1, 911), (923, p1, 924), [1018, p1, 1088), [1176, p1, 1272), (1278, p1, 1338], (1399, p1, 1449), (1533, p1, 1568), (1571, p1, 1590), (1608, p1, 1651), [1719, p1, 1786], (1852, p1, 1939]} s2: {(-oo, p2, 104], (130, p2, 229), [317, p2, 357), [388, p2, 460], [558, p2, 600], [689, p2, 707], (804, p2, 892], (896, p2, 962], [1011, p2, 1060], (1154, p2, 1174], [1230, p2, 1305], (1336, p2, 1382), [1440, p2, 1442), (1519, p2, 1549], (1615, p2, 1661], [1721, p2, 1749), (1800, p2, 1877), (1885, p2, 1956], [2055, p2, 2093], [2123, p2, 2166], (2234, p2, 2269]} union(s1, s2): {(-oo, p2, 104], (130, p2, 229), [243, p1, 262), [317, p2, 339], (339, p1, 388), [388, p2, 460], [477, p1, 526], [543, p1, 558), [558, p2, 590], (590, p1, 621), (670, p1, 729), (730, p1, 804], (804, p2, 868], (868, p1, 896], (896, p2, 962], [1011, p2, 1018), [1018, p1, 1088), (1154, p2, 1174], [1176, p1, 1230), [1230, p2, 1278], (1278, p1, 1336], (1336, p2, 1382), (1399, p1, 1449), (1519, p2, 1533], (1533, p1, 1568), (1571, p1, 1590), (1608, p1, 1615], (1615, p2, 1661], [1719, p1, 1786], (1800, p2, 1852], (1852, p1, 1885], (1885, p2, 1956], [2055, p2, 2093], [2123, p2, 2166], (2234, p2, 2269]} s1: {(-oo, p1, 207], (299, p1, 364], (411, p1, 429], [491, p1, 508], [572, p1, 653], [690, p1, 728), (762, p1, 769], (823, p1, 852], (867, p1, 937), [966, p1, 1045], [1124, p1, 1126], (1218, p1, 1231], [1247, p1, 1302), (1309, p1, 1379], [1467, p1, 1520), [1614, p1, 1624), [1647, p1, 1651], [1741, p1, 1800], [1847, p1, 1895], [1947, p1, 2042), [2096, p1, 2122)} s2: {[220, p2, 312], (320, p2, 372), (395, p2, 405], [450, p2, 544), [625, p2, 649), [699, p2, 713), [750, p2, 761), [793, p2, 846), (937, p2, 1033], (1117, p2, 1160], [1200, p2, 1247), [1339, p2, 1425], (1454, p2, 1471), (1487, p2, 1560), [1564, p2, 1623), [1712, p2, 1730), [1779, p2, 1811], (1836, p2, 1912), [2011, p2, 2022], [2099, p2, 2101)} union(s1, s2): {(-oo, p1, 207], [220, p2, 299], (299, p1, 320], (320, p2, 372), (395, p2, 405], (411, p1, 429], [450, p2, 544), [572, p1, 653], [690, p1, 728), [750, p2, 761), (762, p1, 769], [793, p2, 823], (823, p1, 852], (867, p1, 937), (937, p2, 966), [966, p1, 1045], (1117, p2, 1160], [1200, p2, 1247), [1247, p1, 1302), (1309, p1, 1339), [1339, p2, 1425], (1454, p2, 1467), [1467, p1, 1487], (1487, p2, 1560), [1564, p2, 1614), [1614, p1, 1624), [1647, p1, 1651], [1712, p2, 1730), [1741, p1, 1779), [1779, p2, 1811], (1836, p2, 1912), [1947, p1, 2042), [2096, p1, 2122)} s1: {[-27, p1, 39), [48, p1, 89], [107, p1, 204), [282, p1, 370), (444, p1, 499], (537, p1, 605), [673, p1, 743), [748, p1, 768), (852, p1, 858), (908, p1, 1000], (1002, p1, 1094], [1176, p1, 1222), (1280, p1, 1374], [1441, p1, 1511), (1529, p1, 1566], (1636, p1, 1707), [1803, p1, 1813], [1850, p1, 1874), (1895, p1, 1973], [2071, p1, 2119]} s2: {[33, p2, 59], [76, p2, 84), (86, p2, 133), [227, p2, 251], (283, p2, 370], (444, p2, 523], (596, p2, 626), (646, p2, 695], [699, p2, 739], (764, p2, 776), [831, p2, 832), [876, p2, 906), (991, p2, 1049), (1061, p2, 1109), (1204, p2, 1271], (1331, p2, 1339), [1347, p2, 1422], (1500, p2, 1568], (1570, p2, 1576), (1613, p2, 1617), (1649, p2, oo)} union(s1, s2): {[-27, p1, 33), [33, p2, 48), [48, p1, 86], (86, p2, 107), [107, p1, 204), [227, p2, 251], [282, p1, 283], (283, p2, 370], (444, p2, 523], (537, p1, 596], (596, p2, 626), (646, p2, 673), [673, p1, 743), [748, p1, 764], (764, p2, 776), [831, p2, 832), (852, p1, 858), [876, p2, 906), (908, p1, 991], (991, p2, 1002], (1002, p1, 1061], (1061, p2, 1109), [1176, p1, 1204], (1204, p2, 1271], (1280, p1, 1347), [1347, p2, 1422], [1441, p1, 1500], (1500, p2, 1568], (1570, p2, 1576), (1613, p2, 1617), (1636, p1, 1649], (1649, p2, oo)} s1: {(-oo, p1, -109), [-43, p1, 4], (15, p1, 26), [44, p1, 56), [141, p1, 211), [277, p1, 307), (344, p1, 428], (438, p1, 440), (484, p1, 583], [610, p1, 707], [743, p1, 831], [925, p1, 1004), (1007, p1, 1082), [1157, p1, 1244), [1335, p1, 1376], [1470, p1, 1496], (1568, p1, 1633), (1690, p1, 1766), [1823, p1, 1842), (1917, p1, 1918], [1977, p1, 2058)} s2: {(67, p2, 105), [149, p2, 204], [237, p2, 316], (379, p2, 421), [470, p2, 504], [589, p2, 607), (633, p2, 663], [710, p2, 752), (820, p2, 844], [922, p2, 984], (1074, p2, 1180], [1222, p2, 1227], (1229, p2, 1268), (1367, p2, 1399), (1428, p2, 1521], [1611, p2, 1619], [1704, p2, 1710], [1775, p2, 1831], [1908, p2, 1930)} union(s1, s2): {(-oo, p1, -109), [-43, p1, 4], (15, p1, 26), [44, p1, 56), (67, p2, 105), [141, p1, 211), [237, p2, 316], (344, p1, 428], (438, p1, 440), [470, p2, 484], (484, p1, 583], [589, p2, 607), [610, p1, 707], [710, p2, 743), [743, p1, 820], (820, p2, 844], [922, p2, 925), [925, p1, 1004), (1007, p1, 1074], (1074, p2, 1157), [1157, p1, 1229], (1229, p2, 1268), [1335, p1, 1367], (1367, p2, 1399), (1428, p2, 1521], (1568, p1, 1633), (1690, p1, 1766), [1775, p2, 1823), [1823, p1, 1842), [1908, p2, 1930), [1977, p1, 2058)} s1: {(-oo, p1, 144), (185, p1, 253), (341, p1, 431], [435, p1, 499], (583, p1, 584], [592, p1, 622], [665, p1, 697), (778, p1, 841], [844, p1, 852], (873, p1, 960], [990, p1, 1071], [1165, p1, 1168], (1192, p1, 1214], [1222, p1, 1292), [1328, p1, 1380], [1472, p1, 1561], [1631, p1, 1678], (1744, p1, 1818], [1914, p1, 1985], (1997, p1, 2057), [2063, p1, 2128)} s2: {(21, p2, 100), [142, p2, 237), (304, p2, 351], (374, p2, 459), [556, p2, 655), (715, p2, 777), (844, p2, 923), (1019, p2, 1034], (1068, p2, 1125], [1186, p2, 1211], (1294, p2, 1330], (1359, p2, 1372), (1427, p2, 1485), (1541, p2, 1612), (1676, p2, 1681], (1780, p2, 1807], [1817, p2, 1907), (1987, p2, 1990), (2020, p2, 2037), (2096, p2, 2139)} union(s1, s2): {(-oo, p1, 142), [142, p2, 185], (185, p1, 253), (304, p2, 341], (341, p1, 374], (374, p2, 435), [435, p1, 499], [556, p2, 655), [665, p1, 697), (715, p2, 777), (778, p1, 841], [844, p1, 844], (844, p2, 873], (873, p1, 960], [990, p1, 1068], (1068, p2, 1125], [1165, p1, 1168], [1186, p2, 1192], (1192, p1, 1214], [1222, p1, 1292), (1294, p2, 1328), [1328, p1, 1380], (1427, p2, 1472), [1472, p1, 1541], (1541, p2, 1612), [1631, p1, 1676], (1676, p2, 1681], (1744, p1, 1817), [1817, p2, 1907), [1914, p1, 1985], (1987, p2, 1990), (1997, p1, 2057), [2063, p1, 2096], (2096, p2, 2139)} s1: {[49, p1, 143], (239, p1, 319), [326, p1, 328), [353, p1, 381), (381, p1, 426], [477, p1, 487), (499, p1, 517], (592, p1, 617), [651, p1, 743], (825, p1, 906], (968, p1, 1063), [1162, p1, 1246], [1327, p1, 1336], (1356, p1, 1401], [1454, p1, 1532), (1549, p1, 1577), [1642, p1, 1646), (1702, p1, 1747], [1794, p1, 1862), [1938, p1, 1963)} s2: {(171, p2, 256], [286, p2, 380), (457, p2, 526], [565, p2, 597), [610, p2, 629), (665, p2, 669], (709, p2, 791), [809, p2, 813), [851, p2, 949], (950, p2, 1047), [1086, p2, 1122), [1186, p2, 1207], [1222, p2, 1235], [1267, p2, 1346], [1376, p2, 1443], [1515, p2, 1605], (1619, p2, 1718], (1728, p2, 1750), (1822, p2, 1826), (1839, p2, 1893)} union(s1, s2): {[49, p1, 143], (171, p2, 239], (239, p1, 286), [286, p2, 353), [353, p1, 381), (381, p1, 426], (457, p2, 526], [565, p2, 592], (592, p1, 610), [610, p2, 629), [651, p1, 709], (709, p2, 791), [809, p2, 813), (825, p1, 851), [851, p2, 949], (950, p2, 968], (968, p1, 1063), [1086, p2, 1122), [1162, p1, 1246], [1267, p2, 1346], (1356, p1, 1376), [1376, p2, 1443], [1454, p1, 1515), [1515, p2, 1605], (1619, p2, 1702], (1702, p1, 1728], (1728, p2, 1750), [1794, p1, 1839], (1839, p2, 1893), [1938, p1, 1963)} s1: {(-oo, p1, 142], [153, p1, 218), [239, p1, 295], [338, p1, 386], (391, p1, 439), [462, p1, 495], (570, p1, 587], [673, p1, 714], [739, p1, 771], (778, p1, 779), (869, p1, 898), [981, p1, 1031], (1081, p1, 1084), (1177, p1, 1246], [1314, p1, 1379], [1411, p1, 1463], (1511, p1, 1574], [1615, p1, 1701), [1734, p1, 1829], (1855, p1, 1878], (1898, p1, 1987), (1997, p1, oo)} s2: {[139, p2, 221), [246, p2, 314), (344, p2, 399), (432, p2, 447], (470, p2, 557], (563, p2, 646], [681, p2, 725], (808, p2, 886], [950, p2, 1040], [1041, p2, 1114], [1131, p2, 1182), [1233, p2, 1328), (1329, p2, 1334), (1347, p2, 1376], (1461, p2, 1513), (1567, p2, 1599), (1653, p2, 1674], [1765, p2, 1790], (1889, p2, 1916], (1975, p2, 2071]} union(s1, s2): {(-oo, p1, 139), [139, p2, 221), [239, p1, 246), [246, p2, 314), [338, p1, 344], (344, p2, 391], (391, p1, 432], (432, p2, 447], [462, p1, 470], (470, p2, 557], (563, p2, 646], [673, p1, 681), [681, p2, 725], [739, p1, 771], (778, p1, 779), (808, p2, 869], (869, p1, 898), [950, p2, 1040], [1041, p2, 1114], [1131, p2, 1177], (1177, p1, 1233), [1233, p2, 1314), [1314, p1, 1379], [1411, p1, 1461], (1461, p2, 1511], (1511, p1, 1567], (1567, p2, 1599), [1615, p1, 1701), [1734, p1, 1829], (1855, p1, 1878], (1889, p2, 1898], (1898, p1, 1975], (1975, p2, 1997], (1997, p1, oo)} s1: {(36, p1, 122), [202, p1, 276), [320, p1, 409], (432, p1, 497], [551, p1, 628], (702, p1, 704), [738, p1, 746), [782, p1, 801), (811, p1, 853], (951, p1, 1039], (1071, p1, 1096), (1166, p1, 1201], (1229, p1, 1306], (1391, p1, 1463], [1473, p1, 1494], [1507, p1, 1574], (1655, p1, 1656], (1716, p1, 1781], (1785, p1, 1791), (1866, p1, 1952]} s2: {(50, p2, 94), [184, p2, 254], (301, p2, 313), (399, p2, 409), (488, p2, 498), [510, p2, 556), (613, p2, 711], [758, p2, 767], (859, p2, 878], (890, p2, 905], [964, p2, 1001], [1036, p2, 1079], [1163, p2, 1170), [1226, p2, 1231], [1238, p2, 1285), (1312, p2, 1316], (1353, p2, 1414), (1415, p2, 1456), (1522, p2, 1526], (1615, p2, 1638)} union(s1, s2): {(36, p1, 122), [184, p2, 202), [202, p1, 276), (301, p2, 313), [320, p1, 409], (432, p1, 488], (488, p2, 498), [510, p2, 551), [551, p1, 613], (613, p2, 711], [738, p1, 746), [758, p2, 767], [782, p1, 801), (811, p1, 853], (859, p2, 878], (890, p2, 905], (951, p1, 1036), [1036, p2, 1071], (1071, p1, 1096), [1163, p2, 1166], (1166, p1, 1201], [1226, p2, 1229], (1229, p1, 1306], (1312, p2, 1316], (1353, p2, 1391], (1391, p1, 1463], [1473, p1, 1494], [1507, p1, 1574], (1615, p2, 1638), (1655, p1, 1656], (1716, p1, 1781], (1785, p1, 1791), (1866, p1, 1952]} s1: {(-oo, p1, -45], (48, p1, 137], (187, p1, 215), [222, p1, 253], (257, p1, 349), [361, p1, 428], [474, p1, 557], (582, p1, 594], [661, p1, 745), (802, p1, 811), (822, p1, 856], (944, p1, 978), (1009, p1, 1018], [1043, p1, 1087], (1164, p1, 1171], (1262, p1, 1271), [1296, p1, 1388), [1431, p1, 1452], [1543, p1, 1546), (1570, p1, 1657), [1696, p1, 1746]} s2: {(-oo, p2, -6), [52, p2, 93), (114, p2, 168), (216, p2, 229), (316, p2, 352), (393, p2, 408), (471, p2, 530), [597, p2, 638], (671, p2, 705), (791, p2, 888), (911, p2, 986), (1082, p2, 1180), [1214, p2, 1283), (1328, p2, 1379), [1449, p2, 1464], [1528, p2, 1563), (1600, p2, 1679], [1743, p2, 1794], (1818, p2, 1917), (1917, p2, 1976], (2037, p2, 2101], (2155, p2, oo)} union(s1, s2): {(-oo, p2, -6), (48, p1, 114], (114, p2, 168), (187, p1, 215), (216, p2, 222), [222, p1, 253], (257, p1, 316], (316, p2, 352), [361, p1, 428], (471, p2, 474), [474, p1, 557], (582, p1, 594], [597, p2, 638], [661, p1, 745), (791, p2, 888), (911, p2, 986), (1009, p1, 1018], [1043, p1, 1082], (1082, p2, 1180), [1214, p2, 1283), [1296, p1, 1388), [1431, p1, 1449), [1449, p2, 1464], [1528, p2, 1563), (1570, p1, 1600], (1600, p2, 1679], [1696, p1, 1743), [1743, p2, 1794], (1818, p2, 1917), (1917, p2, 1976], (2037, p2, 2101], (2155, p2, oo)} s1: {(-74, p1, 14], [39, p1, 117), [122, p1, 157), [209, p1, 242], (253, p1, 315], (352, p1, 365], [437, p1, 506], [585, p1, 640), (649, p1, 686], (722, p1, 821], (863, p1, 940], [1000, p1, 1088], [1139, p1, 1149], [1225, p1, 1269), (1271, p1, 1309), (1396, p1, 1486], [1581, p1, 1605], [1641, p1, 1691), (1766, p1, 1812], [1850, p1, 1919], [1925, p1, oo)} s2: {[88, p2, 133), (176, p2, 246], (263, p2, 270], [295, p2, 357], [421, p2, 462), (529, p2, 531], (544, p2, 554], [634, p2, 724), (809, p2, 835], [837, p2, 861), [930, p2, 943], [1021, p2, 1043], [1062, p2, 1128], [1152, p2, 1202), [1244, p2, 1321), (1405, p2, 1477], [1564, p2, 1617], (1650, p2, 1726), (1747, p2, 1841), [1894, p2, 1936]} union(s1, s2): {(-74, p1, 14], [39, p1, 88), [88, p2, 122), [122, p1, 157), (176, p2, 246], (253, p1, 295), [295, p2, 352], (352, p1, 365], [421, p2, 437), [437, p1, 506], (529, p2, 531], (544, p2, 554], [585, p1, 634), [634, p2, 722], (722, p1, 809], (809, p2, 835], [837, p2, 861), (863, p1, 930), [930, p2, 943], [1000, p1, 1062), [1062, p2, 1128], [1139, p1, 1149], [1152, p2, 1202), [1225, p1, 1244), [1244, p2, 1321), (1396, p1, 1486], [1564, p2, 1617], [1641, p1, 1650], (1650, p2, 1726), (1747, p2, 1841), [1850, p1, 1894), [1894, p2, 1925), [1925, p1, oo)} s1: {[57, p1, 148), (168, p1, 223], [273, p1, 305), (396, p1, 397], (470, p1, 545], (609, p1, 666], [695, p1, 741), [770, p1, 836], [869, p1, 947], [955, p1, 1047), (1130, p1, 1196], [1201, p1, 1267), (1362, p1, 1431], [1460, p1, 1537), [1614, p1, 1657), [1696, p1, 1737], [1824, p1, 1844], (1879, p1, 1921), (2013, p1, 2039], (2089, p1, 2128)} s2: {(-oo, p2, -86), [-28, p2, -25], [41, p2, 130), (184, p2, 280), (294, p2, 379], [415, p2, 476], [518, p2, 549], [564, p2, 573], (635, p2, 731), (750, p2, 842), (868, p2, 889), (935, p2, 973), (987, p2, 1083], (1101, p2, 1199], [1243, p2, 1269), (1305, p2, 1350], (1395, p2, 1397), [1494, p2, 1530], [1598, p2, 1695), [1790, p2, 1807), (1850, p2, 1870]} union(s1, s2): {(-oo, p2, -86), [-28, p2, -25], [41, p2, 57), [57, p1, 148), (168, p1, 184], (184, p2, 273), [273, p1, 294], (294, p2, 379], (396, p1, 397], [415, p2, 470], (470, p1, 518), [518, p2, 549], [564, p2, 573], (609, p1, 635], (635, p2, 695), [695, p1, 741), (750, p2, 842), (868, p2, 869), [869, p1, 935], (935, p2, 955), [955, p1, 987], (987, p2, 1083], (1101, p2, 1199], [1201, p1, 1243), [1243, p2, 1269), (1305, p2, 1350], (1362, p1, 1431], [1460, p1, 1537), [1598, p2, 1695), [1696, p1, 1737], [1790, p2, 1807), [1824, p1, 1844], (1850, p2, 1870], (1879, p1, 1921), (2013, p1, 2039], (2089, p1, 2128)} s1: {(-oo, p1, 256], [301, p1, 353), [442, p1, 524), [614, p1, 618), (682, p1, 738], [767, p1, 838], (852, p1, 879), (917, p1, 922], (949, p1, 980), [1008, p1, 1050), [1093, p1, 1188), [1236, p1, 1296), (1326, p1, 1354], [1407, p1, 1477), [1484, p1, 1569], (1619, p1, 1682], [1716, p1, 1809], (1840, p1, 1895], (1993, p1, 2018], [2071, p1, 2096], (2191, p1, 2245), [2297, p1, oo)} s2: {[38, p2, 98], (184, p2, 219), [253, p2, 310), (378, p2, 395), (411, p2, 413], [437, p2, 438), [461, p2, 492], [514, p2, 527], (599, p2, 632], (676, p2, 691], [732, p2, 788], [829, p2, 832], (911, p2, 991), (996, p2, 1018], [1113, p2, 1169], [1233, p2, 1249], [1274, p2, 1369), (1460, p2, 1535], [1547, p2, 1616], (1706, p2, 1715]} union(s1, s2): {(-oo, p1, 253), [253, p2, 301), [301, p1, 353), (378, p2, 395), (411, p2, 413], [437, p2, 438), [442, p1, 514), [514, p2, 527], (599, p2, 632], (676, p2, 682], (682, p1, 732), [732, p2, 767), [767, p1, 838], (852, p1, 879), (911, p2, 991), (996, p2, 1008), [1008, p1, 1050), [1093, p1, 1188), [1233, p2, 1236), [1236, p1, 1274), [1274, p2, 1369), [1407, p1, 1460], (1460, p2, 1484), [1484, p1, 1547), [1547, p2, 1616], (1619, p1, 1682], (1706, p2, 1715], [1716, p1, 1809], (1840, p1, 1895], (1993, p1, 2018], [2071, p1, 2096], (2191, p1, 2245), [2297, p1, oo)} s1: {(-oo, p1, 94), (176, p1, 196], [248, p1, 321], [405, p1, 455], (493, p1, 506], (555, p1, 578], (644, p1, 726), (818, p1, 830], [875, p1, 973], (1061, p1, 1132], (1148, p1, 1171], (1195, p1, 1243], [1318, p1, 1386), (1427, p1, 1478], [1549, p1, 1631], (1679, p1, 1771), [1867, p1, 1891), (1908, p1, 1983], (2051, p1, 2114), [2171, p1, 2172], [2250, p1, 2333]} s2: {(260, p2, 291], [314, p2, 330), [351, p2, 412), (500, p2, 521), [587, p2, 638], [719, p2, 725), [770, p2, 844), (873, p2, 963), [1036, p2, 1123), [1198, p2, 1270), (1283, p2, 1330], (1336, p2, 1395], [1475, p2, 1572], (1670, p2, 1706), (1800, p2, 1852], [1925, p2, 2024], [2065, p2, 2099), (2102, p2, 2140], (2157, p2, 2243), [2333, p2, 2396], [2463, p2, oo)} union(s1, s2): {(-oo, p1, 94), (176, p1, 196], [248, p1, 314), [314, p2, 330), [351, p2, 405), [405, p1, 455], (493, p1, 500], (500, p2, 521), (555, p1, 578], [587, p2, 638], (644, p1, 726), [770, p2, 844), (873, p2, 875), [875, p1, 973], [1036, p2, 1061], (1061, p1, 1132], (1148, p1, 1171], (1195, p1, 1198), [1198, p2, 1270), (1283, p2, 1318), [1318, p1, 1336], (1336, p2, 1395], (1427, p1, 1475), [1475, p2, 1549), [1549, p1, 1631], (1670, p2, 1679], (1679, p1, 1771), (1800, p2, 1852], [1867, p1, 1891), (1908, p1, 1925), [1925, p2, 2024], (2051, p1, 2102], (2102, p2, 2140], (2157, p2, 2243), [2250, p1, 2333), [2333, p2, 2396], [2463, p2, oo)} s1: {(-oo, p1, 90], [129, p1, 160), [226, p1, 245], [263, p1, 332], [338, p1, 344), [388, p1, 458], (507, p1, 531), [593, p1, 650], [662, p1, 665], (744, p1, 754), [801, p1, 896), (927, p1, 998), (1075, p1, 1113], (1138, p1, 1146], (1208, p1, 1220), [1318, p1, 1369], [1434, p1, 1497], (1513, p1, 1566], [1572, p1, 1584), (1612, p1, 1643), (1668, p1, 1705]} s2: {[-112, p2, -23), (54, p2, 147], [150, p2, 196], [223, p2, 273), [301, p2, 396], [485, p2, 504), (514, p2, 575), (641, p2, 685), (759, p2, 817], (821, p2, 848), [936, p2, 963), (998, p2, 1043), (1109, p2, 1123), (1208, p2, 1226], [1314, p2, 1391), [1435, p2, 1447], [1450, p2, 1527), [1617, p2, 1661), [1700, p2, 1724], (1818, p2, 1852], [1935, p2, oo)} union(s1, s2): {(-oo, p1, 54], (54, p2, 129), [129, p1, 150), [150, p2, 196], [223, p2, 263), [263, p1, 301), [301, p2, 388), [388, p1, 458], [485, p2, 504), (507, p1, 514], (514, p2, 575), [593, p1, 641], (641, p2, 685), (744, p1, 754), (759, p2, 801), [801, p1, 896), (927, p1, 998), (998, p2, 1043), (1075, p1, 1109], (1109, p2, 1123), (1138, p1, 1146], (1208, p2, 1226], [1314, p2, 1391), [1434, p1, 1450), [1450, p2, 1513], (1513, p1, 1566], [1572, p1, 1584), (1612, p1, 1617), [1617, p2, 1661), (1668, p1, 1700), [1700, p2, 1724], (1818, p2, 1852], [1935, p2, oo)} s1: {(218, p1, 269], (350, p1, 443], (481, p1, 553], (559, p1, 591], [644, p1, 713], [782, p1, 869], (880, p1, 963], (997, p1, 1061), (1065, p1, 1104), [1137, p1, 1153), [1222, p1, 1264), [1317, p1, 1386), (1446, p1, 1519), [1533, p1, 1563), (1604, p1, 1658], [1742, p1, 1761), (1805, p1, 1835], [1840, p1, 1906), [1923, p1, 1944), (1983, p1, 2078], [2083, p1, oo)} s2: {(175, p2, 253], (343, p2, 345], [392, p2, 444], [471, p2, 568], (636, p2, 733), (733, p2, 781), [869, p2, 968), (1067, p2, 1142), (1146, p2, 1228], (1296, p2, 1343], (1440, p2, 1538], (1578, p2, 1622], (1720, p2, 1744), [1757, p2, 1832), [1874, p2, 1925], (2016, p2, 2082], (2147, p2, 2213), [2222, p2, 2293), [2336, p2, 2423]} union(s1, s2): {(175, p2, 218], (218, p1, 269], (343, p2, 345], (350, p1, 392), [392, p2, 444], [471, p2, 559], (559, p1, 591], (636, p2, 733), (733, p2, 781), [782, p1, 869), [869, p2, 968), (997, p1, 1061), (1065, p1, 1067], (1067, p2, 1137), [1137, p1, 1146], (1146, p2, 1222), [1222, p1, 1264), (1296, p2, 1317), [1317, p1, 1386), (1440, p2, 1533), [1533, p1, 1563), (1578, p2, 1604], (1604, p1, 1658], (1720, p2, 1742), [1742, p1, 1757), [1757, p2, 1805], (1805, p1, 1835], [1840, p1, 1874), [1874, p2, 1923), [1923, p1, 1944), (1983, p1, 2016], (2016, p2, 2082], [2083, p1, oo)} s1: {(-oo, p1, 170), [218, p1, 265), (299, p1, 358], [409, p1, 463), [513, p1, 528), (627, p1, 650], [672, p1, 736], (745, p1, 766], [841, p1, 916), [967, p1, 1018], [1112, p1, 1192), (1208, p1, 1293), [1320, p1, 1322), [1331, p1, 1370], (1377, p1, 1459), (1478, p1, 1501], (1589, p1, 1641], (1735, p1, 1749], (1832, p1, 1869], [1941, p1, 1967), (2032, p1, 2103)} s2: {(-53, p2, -26), [-4, p2, 76], (104, p2, 177], (240, p2, 284), (348, p2, 352], [411, p2, 491], [575, p2, 646), (715, p2, 757], [765, p2, 851], [911, p2, 928], [957, p2, 1047), [1090, p2, 1113), [1124, p2, 1223], (1229, p2, 1253), [1315, p2, 1377), (1408, p2, 1484), [1517, p2, 1548), [1606, p2, 1679), [1689, p2, 1733), (1830, p2, 1845)} union(s1, s2): {(-oo, p1, 104], (104, p2, 177], [218, p1, 240], (240, p2, 284), (299, p1, 358], [409, p1, 411), [411, p2, 491], [513, p1, 528), [575, p2, 627], (627, p1, 650], [672, p1, 715], (715, p2, 745], (745, p1, 765), [765, p2, 841), [841, p1, 911), [911, p2, 928], [957, p2, 1047), [1090, p2, 1112), [1112, p1, 1124), [1124, p2, 1208], (1208, p1, 1293), [1315, p2, 1377), (1377, p1, 1408], (1408, p2, 1478], (1478, p1, 1501], [1517, p2, 1548), (1589, p1, 1606), [1606, p2, 1679), [1689, p2, 1733), (1735, p1, 1749], (1830, p2, 1832], (1832, p1, 1869], [1941, p1, 1967), (2032, p1, 2103)} s1: {[232, p1, 312], (390, p1, 406], [464, p1, 494), [562, p1, 594), [603, p1, 645], [657, p1, 778], [850, p1, 897], (955, p1, 1032), (1100, p1, 1121], [1128, p1, 1165), (1203, p1, 1219), [1271, p1, 1284], (1313, p1, 1368), [1430, p1, 1520), [1521, p1, 1613), (1672, p1, 1673], (1730, p1, 1805), (1898, p1, 1923], (1929, p1, 1944], (1951, p1, oo)} s2: {[25, p2, 43), [52, p2, 118), [128, p2, 220], (238, p2, 256], [280, p2, 335], (370, p2, 453), [532, p2, 546), [641, p2, 740], [803, p2, 854), [944, p2, 1041), (1071, p2, 1123), (1130, p2, 1173], [1178, p2, 1227], [1240, p2, 1274), (1319, p2, 1355], [1410, p2, 1431], (1470, p2, 1510), (1537, p2, 1574), [1607, p2, 1702), (1777, p2, 1789], (1860, p2, oo)} union(s1, s2): {[25, p2, 43), [52, p2, 118), [128, p2, 220], [232, p1, 280), [280, p2, 335], (370, p2, 453), [464, p1, 494), [532, p2, 546), [562, p1, 594), [603, p1, 641), [641, p2, 657), [657, p1, 778], [803, p2, 850), [850, p1, 897], [944, p2, 1041), (1071, p2, 1123), [1128, p1, 1130], (1130, p2, 1173], [1178, p2, 1227], [1240, p2, 1271), [1271, p1, 1284], (1313, p1, 1368), [1410, p2, 1430), [1430, p1, 1520), [1521, p1, 1607), [1607, p2, 1702), (1730, p1, 1805), (1860, p2, oo)} s1: {[240, p1, 303], (344, p1, 392], (403, p1, 453), [550, p1, 648), (663, p1, 664), (744, p1, 783), [860, p1, 911), (965, p1, 980], [1015, p1, 1031], (1123, p1, 1136), [1184, p1, 1281), [1324, p1, 1338], (1349, p1, 1410), (1453, p1, 1496], [1577, p1, 1578], (1652, p1, 1659], [1746, p1, 1831], [1861, p1, 1903), (1940, p1, 2008], (2082, p1, 2155)} s2: {[115, p2, 140], (212, p2, 269], (320, p2, 362), [443, p2, 462), (466, p2, 528], [533, p2, 606), (654, p2, 707), [784, p2, 790], (821, p2, 863), [918, p2, 978], [1029, p2, 1075), (1126, p2, 1136), (1215, p2, 1260), (1346, p2, 1387], [1454, p2, 1547], [1581, p2, 1604], [1694, p2, 1743), [1760, p2, 1767], (1778, p2, 1829), [1923, p2, 1981), (2051, p2, oo)} union(s1, s2): {[115, p2, 140], (212, p2, 240), [240, p1, 303], (320, p2, 344], (344, p1, 392], (403, p1, 443), [443, p2, 462), (466, p2, 528], [533, p2, 550), [550, p1, 648), (654, p2, 707), (744, p1, 783), [784, p2, 790], (821, p2, 860), [860, p1, 911), [918, p2, 965], (965, p1, 980], [1015, p1, 1029), [1029, p2, 1075), (1123, p1, 1136), [1184, p1, 1281), [1324, p1, 1338], (1346, p2, 1349], (1349, p1, 1410), (1453, p1, 1454), [1454, p2, 1547], [1577, p1, 1578], [1581, p2, 1604], (1652, p1, 1659], [1694, p2, 1743), [1746, p1, 1831], [1861, p1, 1903), [1923, p2, 1940], (1940, p1, 2008], (2051, p2, oo)} s1: {(225, p1, 257), [298, p1, 308], (368, p1, 447], (458, p1, 500], (501, p1, 532), (625, p1, 661], [748, p1, 781], [851, p1, 877), [917, p1, 930), (984, p1, 1054), [1142, p1, 1201), (1264, p1, 1348], (1387, p1, 1478), (1557, p1, 1653), (1731, p1, 1821), [1910, p1, 1923), [1950, p1, 1981], (2077, p1, 2169), [2197, p1, 2204), (2290, p1, 2328]} s2: {(-oo, p2, 178), [208, p2, 230], (237, p2, 311), (383, p2, 451], [486, p2, 500), (593, p2, 656], (751, p2, 817], (893, p2, 911], (972, p2, 1059], [1145, p2, 1202], (1221, p2, 1284), (1379, p2, 1434], [1466, p2, 1482), (1541, p2, 1621], [1714, p2, 1745], (1824, p2, 1839), [1892, p2, 1918], (2015, p2, 2108], (2138, p2, 2144), (2195, p2, 2279), [2337, p2, 2390]} union(s1, s2): {(-oo, p2, 178), [208, p2, 225], (225, p1, 237], (237, p2, 311), (368, p1, 383], (383, p2, 451], (458, p1, 500], (501, p1, 532), (593, p2, 625], (625, p1, 661], [748, p1, 751], (751, p2, 817], [851, p1, 877), (893, p2, 911], [917, p1, 930), (972, p2, 1059], [1142, p1, 1145), [1145, p2, 1202], (1221, p2, 1264], (1264, p1, 1348], (1379, p2, 1387], (1387, p1, 1466), [1466, p2, 1482), (1541, p2, 1557], (1557, p1, 1653), [1714, p2, 1731], (1731, p1, 1821), (1824, p2, 1839), [1892, p2, 1910), [1910, p1, 1923), [1950, p1, 1981], (2015, p2, 2077], (2077, p1, 2169), (2195, p2, 2279), (2290, p1, 2328], [2337, p2, 2390]} s1: {(-119, p1, -52], [-26, p1, 44], (118, p1, 125], (162, p1, 164), [210, p1, 243), [284, p1, 339], [340, p1, 354), (429, p1, 505], (580, p1, 588), (607, p1, 628], [630, p1, 669), (727, p1, 781), (810, p1, 829), (877, p1, 976], [1002, p1, 1025), [1028, p1, 1126], [1182, p1, 1219), (1233, p1, 1245], (1294, p1, 1345), [1417, p1, 1433)} s2: {(-oo, p2, 34), (90, p2, 105), [146, p2, 180), (241, p2, 273), [310, p2, 312], (316, p2, 413), (494, p2, 498), (594, p2, 633), [705, p2, 727], (764, p2, 824], (908, p2, 988), (1036, p2, 1065), [1149, p2, 1159], (1227, p2, 1284], (1308, p2, 1323], [1369, p2, 1445], (1473, p2, 1568), (1574, p2, 1623], [1652, p2, 1690), (1738, p2, 1739), (1789, p2, 1880]} union(s1, s2): {(-oo, p2, -26), [-26, p1, 44], (90, p2, 105), (118, p1, 125], [146, p2, 180), [210, p1, 241], (241, p2, 273), [284, p1, 316], (316, p2, 413), (429, p1, 505], (580, p1, 588), (594, p2, 630), [630, p1, 669), [705, p2, 727], (727, p1, 764], (764, p2, 810], (810, p1, 829), (877, p1, 908], (908, p2, 988), [1002, p1, 1025), [1028, p1, 1126], [1149, p2, 1159], [1182, p1, 1219), (1227, p2, 1284], (1294, p1, 1345), [1369, p2, 1445], (1473, p2, 1568), (1574, p2, 1623], [1652, p2, 1690), (1738, p2, 1739), (1789, p2, 1880]} s1: {(-114, p1, -73), (-57, p1, 10], (66, p1, 73], [140, p1, 141), (188, p1, 235], (237, p1, 272], (322, p1, 390], [421, p1, 474], [540, p1, 555), (571, p1, 605], [616, p1, 658), (710, p1, 744), (786, p1, 793), [862, p1, 951], [1034, p1, 1035], (1078, p1, 1084], (1127, p1, 1221], (1309, p1, 1376], [1471, p1, 1526), [1544, p1, 1616)} s2: {(-28, p2, 53), [141, p2, 206), (222, p2, 320], (342, p2, 422], [502, p2, 563], (658, p2, 671), [696, p2, 760), (858, p2, 875), (883, p2, 936], [978, p2, 1055), [1141, p2, 1169), (1196, p2, 1212), [1237, p2, 1311), [1369, p2, 1457], [1514, p2, 1538), [1583, p2, 1665), (1745, p2, 1791], (1835, p2, 1925], [2007, p2, 2079], [2124, p2, 2140)} union(s1, s2): {(-114, p1, -73), (-57, p1, -28], (-28, p2, 53), (66, p1, 73], [140, p1, 141), [141, p2, 188], (188, p1, 222], (222, p2, 320], (322, p1, 342], (342, p2, 421), [421, p1, 474], [502, p2, 563], (571, p1, 605], [616, p1, 658), (658, p2, 671), [696, p2, 760), (786, p1, 793), (858, p2, 862), [862, p1, 951], [978, p2, 1055), (1078, p1, 1084], (1127, p1, 1221], [1237, p2, 1309], (1309, p1, 1369), [1369, p2, 1457], [1471, p1, 1514), [1514, p2, 1538), [1544, p1, 1583), [1583, p2, 1665), (1745, p2, 1791], (1835, p2, 1925], [2007, p2, 2079], [2124, p2, 2140)} s1: {[-122, p1, -112), (-91, p1, -28], [-7, p1, 35), [66, p1, 82], (125, p1, 184), [201, p1, 249), [301, p1, 360], [457, p1, 528), (562, p1, 628], [656, p1, 723), [751, p1, 753), [850, p1, 949], [998, p1, 1021), (1089, p1, 1177), (1210, p1, 1329], (1417, p1, 1465), [1515, p1, 1563), [1624, p1, 1633), (1716, p1, 1751)} s2: {[145, p2, 211), [226, p2, 255], [315, p2, 387), (427, p2, 485), (512, p2, 610], [670, p2, 759), (811, p2, 901], (991, p2, 1019), [1036, p2, 1098), [1128, p2, 1135], [1208, p2, 1279), [1365, p2, 1463], [1507, p2, 1534), [1594, p2, 1606], [1624, p2, 1692), [1726, p2, 1771], (1784, p2, 1872], (1962, p2, 2031), [2049, p2, 2120], [2198, p2, 2293), (2340, p2, oo)} union(s1, s2): {[-122, p1, -112), (-91, p1, -28], [-7, p1, 35), [66, p1, 82], (125, p1, 145), [145, p2, 201), [201, p1, 226), [226, p2, 255], [301, p1, 315), [315, p2, 387), (427, p2, 457), [457, p1, 512], (512, p2, 562], (562, p1, 628], [656, p1, 670), [670, p2, 759), (811, p2, 850), [850, p1, 949], (991, p2, 998), [998, p1, 1021), [1036, p2, 1089], (1089, p1, 1177), [1208, p2, 1210], (1210, p1, 1329], [1365, p2, 1417], (1417, p1, 1465), [1507, p2, 1515), [1515, p1, 1563), [1594, p2, 1606], [1624, p2, 1692), (1716, p1, 1726), [1726, p2, 1771], (1784, p2, 1872], (1962, p2, 2031), [2049, p2, 2120], [2198, p2, 2293), (2340, p2, oo)} s1: {(-oo, p1, -100], [-77, p1, 17), (67, p1, 99), [172, p1, 180], (203, p1, 205), (291, p1, 320], [377, p1, 417), [449, p1, 529], (572, p1, 646], (647, p1, 705), [772, p1, 816), [906, p1, 916), (965, p1, 1051), (1133, p1, 1134), (1173, p1, 1213], [1249, p1, 1332), [1379, p1, 1474), (1564, p1, 1667], [1670, p1, 1761), [1795, p1, 1870), (1929, p1, oo)} s2: {(-oo, p2, 89), [103, p2, 176], [228, p2, 310), [320, p2, 328], (367, p2, 409], (468, p2, 534], [555, p2, 604], (698, p2, 776], (785, p2, 833], (874, p2, 950], [1037, p2, 1128], (1208, p2, 1236), [1241, p2, 1298), (1391, p2, 1414], (1485, p2, 1560), (1641, p2, 1671], (1715, p2, 1755], [1824, p2, 1889], [1956, p2, 1980], (1994, p2, 2078], (2109, p2, 2125)} union(s1, s2): {(-oo, p2, 67], (67, p1, 99), [103, p2, 172), [172, p1, 180], (203, p1, 205), [228, p2, 291], (291, p1, 320), [320, p2, 328], (367, p2, 377), [377, p1, 417), [449, p1, 468], (468, p2, 534], [555, p2, 572], (572, p1, 646], (647, p1, 698], (698, p2, 772), [772, p1, 785], (785, p2, 833], (874, p2, 950], (965, p1, 1037), [1037, p2, 1128], (1133, p1, 1134), (1173, p1, 1208], (1208, p2, 1236), [1241, p2, 1249), [1249, p1, 1332), [1379, p1, 1474), (1485, p2, 1560), (1564, p1, 1641], (1641, p2, 1670), [1670, p1, 1761), [1795, p1, 1824), [1824, p2, 1889], (1929, p1, oo)} s1: {[36, p1, 67), [88, p1, 111), (208, p1, 227), [314, p1, 360], (429, p1, 446), (527, p1, 613], [629, p1, 630), (723, p1, 776], (862, p1, 863), [907, p1, 907], [960, p1, 969), [1016, p1, 1071], [1095, p1, 1107], (1172, p1, 1185], [1196, p1, 1210], [1304, p1, 1386], [1482, p1, 1515), (1561, p1, 1620], [1649, p1, 1729), (1753, p1, 1775]} s2: {(-oo, p2, 212), [259, p2, 317), [412, p2, 504], (564, p2, 602), (700, p2, 743), (832, p2, 835], [909, p2, 945], (946, p2, 1029), [1106, p2, 1195), (1235, p2, 1300], (1348, p2, 1377], [1475, p2, 1502], [1591, p2, 1617), [1663, p2, 1707), (1803, p2, 1834), [1855, p2, 1938], [2001, p2, 2099], [2118, p2, 2149), [2154, p2, 2201), [2211, p2, 2252], (2302, p2, 2381)} union(s1, s2): {(-oo, p2, 208], (208, p1, 227), [259, p2, 314), [314, p1, 360], [412, p2, 504], (527, p1, 613], [629, p1, 630), (700, p2, 723], (723, p1, 776], (832, p2, 835], (862, p1, 863), [907, p1, 907], [909, p2, 945], (946, p2, 1016), [1016, p1, 1071], [1095, p1, 1106), [1106, p2, 1195), [1196, p1, 1210], (1235, p2, 1300], [1304, p1, 1386], [1475, p2, 1482), [1482, p1, 1515), (1561, p1, 1620], [1649, p1, 1729), (1753, p1, 1775], (1803, p2, 1834), [1855, p2, 1938], [2001, p2, 2099], [2118, p2, 2149), [2154, p2, 2201), [2211, p2, 2252], (2302, p2, 2381)} s1: {(183, p1, 217], [232, p1, 310), (351, p1, 413], [452, p1, 493], [504, p1, 514], [530, p1, 572), [666, p1, 715], (733, p1, 778), (852, p1, 911], (915, p1, 990), (992, p1, 1075), (1093, p1, 1167), (1178, p1, 1276), (1315, p1, 1362], [1372, p1, 1374], (1398, p1, 1445], (1467, p1, 1468], (1559, p1, 1573], (1669, p1, 1722], (1814, p1, 1896), (1987, p1, oo)} s2: {[-75, p2, -30], [51, p2, 149], [180, p2, 213], [219, p2, 270], [271, p2, 327], (349, p2, 381), (418, p2, 513), [540, p2, 628], (664, p2, 717), [758, p2, 800), [834, p2, 858], [865, p2, 933], [1014, p2, 1070), [1126, p2, 1171), [1182, p2, 1192], (1259, p2, 1319], [1390, p2, 1441], [1504, p2, 1516], [1548, p2, 1579), (1603, p2, 1613], [1683, p2, oo)} union(s1, s2): {[-75, p2, -30], [51, p2, 149], [180, p2, 183], (183, p1, 217], [219, p2, 232), [232, p1, 271), [271, p2, 327], (349, p2, 351], (351, p1, 413], (418, p2, 504), [504, p1, 514], [530, p1, 540), [540, p2, 628], (664, p2, 717), (733, p1, 758), [758, p2, 800), [834, p2, 852], (852, p1, 865), [865, p2, 915], (915, p1, 990), (992, p1, 1075), (1093, p1, 1126), [1126, p2, 1171), (1178, p1, 1259], (1259, p2, 1315], (1315, p1, 1362], [1372, p1, 1374], [1390, p2, 1398], (1398, p1, 1445], (1467, p1, 1468], [1504, p2, 1516], [1548, p2, 1579), (1603, p2, 1613], (1669, p1, 1683), [1683, p2, oo)} s1: {[-61, p1, 30], [64, p1, 105], [154, p1, 213], [284, p1, 380], [388, p1, 406], (419, p1, 470], (518, p1, 592), (669, p1, 700), (784, p1, 869), (890, p1, 953), [1004, p1, 1096], (1135, p1, 1186), [1237, p1, 1285], (1316, p1, 1387), (1429, p1, 1496), [1522, p1, 1585), (1632, p1, 1694), [1791, p1, 1839], [1857, p1, 1947]} s2: {[-28, p2, 24), [61, p2, 72], (170, p2, 195], (214, p2, 260), (329, p2, 378), (403, p2, 499], (536, p2, 631), [661, p2, 666], [706, p2, 751], [832, p2, 915], [945, p2, 1018], [1036, p2, 1040], [1053, p2, 1136), (1180, p2, 1208], [1221, p2, 1245], [1254, p2, 1310], (1350, p2, 1435], [1440, p2, 1456], (1535, p2, 1625), (1629, p2, 1662)} union(s1, s2): {[-61, p1, 30], [61, p2, 64), [64, p1, 105], [154, p1, 213], (214, p2, 260), [284, p1, 380], [388, p1, 403], (403, p2, 499], (518, p1, 536], (536, p2, 631), [661, p2, 666], (669, p1, 700), [706, p2, 751], (784, p1, 832), [832, p2, 890], (890, p1, 945), [945, p2, 1004), [1004, p1, 1053), [1053, p2, 1135], (1135, p1, 1180], (1180, p2, 1208], [1221, p2, 1237), [1237, p1, 1254), [1254, p2, 1310], (1316, p1, 1350], (1350, p2, 1429], (1429, p1, 1496), [1522, p1, 1535], (1535, p2, 1625), (1629, p2, 1632], (1632, p1, 1694), [1791, p1, 1839], [1857, p1, 1947]} s1: {(59, p1, 102], (170, p1, 175), [227, p1, 257], [354, p1, 369], [433, p1, 514), [609, p1, 654), [683, p1, 697), [759, p1, 823), (826, p1, 879], [924, p1, 986], [996, p1, 1069), [1162, p1, 1258), [1315, p1, 1348], (1408, p1, 1467), [1475, p1, 1518], [1569, p1, 1570), [1629, p1, 1689], [1705, p1, 1777), (1810, p1, 1820], (1916, p1, 1997), [2037, p1, oo)} s2: {(216, p2, 272], (342, p2, 362], [449, p2, 546], (548, p2, 587), [678, p2, 729), (757, p2, 818], (826, p2, 853), (952, p2, 988), [1019, p2, 1047], (1073, p2, 1080], [1145, p2, 1194), (1230, p2, 1311], (1322, p2, 1411), (1448, p2, 1516), (1530, p2, 1543], (1605, p2, 1656), [1728, p2, 1822), [1918, p2, 1923], (1928, p2, 2016), (2090, p2, 2154]} union(s1, s2): {(59, p1, 102], (170, p1, 175), (216, p2, 272], (342, p2, 354), [354, p1, 369], [433, p1, 449), [449, p2, 546], (548, p2, 587), [609, p1, 654), [678, p2, 729), (757, p2, 759), [759, p1, 823), (826, p1, 879], [924, p1, 952], (952, p2, 988), [996, p1, 1069), (1073, p2, 1080], [1145, p2, 1162), [1162, p1, 1230], (1230, p2, 1311], [1315, p1, 1322], (1322, p2, 1408], (1408, p1, 1448], (1448, p2, 1475), [1475, p1, 1518], (1530, p2, 1543], [1569, p1, 1570), (1605, p2, 1629), [1629, p1, 1689], [1705, p1, 1728), [1728, p2, 1822), (1916, p1, 1928], (1928, p2, 2016), [2037, p1, oo)} s1: {(7, p1, 38), [79, p1, 122], [132, p1, 133], [209, p1, 211], (237, p1, 257), (350, p1, 371], [431, p1, 511], [601, p1, 610), [673, p1, 700), (796, p1, 871], (954, p1, 994], [1045, p1, 1114), [1209, p1, 1231), [1232, p1, 1255], [1339, p1, 1376], [1394, p1, 1505], [1556, p1, 1645], [1710, p1, 1796), [1858, p1, 1886)} s2: {(-oo, p2, -77), (-13, p2, 5], [56, p2, 116], (186, p2, 213), (289, p2, 365], (404, p2, 497), [537, p2, 580], (616, p2, 711], [802, p2, 812), [875, p2, 954], (998, p2, 1039), [1136, p2, 1180), [1241, p2, 1302], (1381, p2, 1382], [1400, p2, 1409], [1430, p2, 1474), (1549, p2, 1638], [1716, p2, 1748), (1773, p2, 1839], (1853, p2, 1880], [1916, p2, 1996]} union(s1, s2): {(-oo, p2, -77), (-13, p2, 5], (7, p1, 38), [56, p2, 79), [79, p1, 122], [132, p1, 133], (186, p2, 213), (237, p1, 257), (289, p2, 350], (350, p1, 371], (404, p2, 431), [431, p1, 511], [537, p2, 580], [601, p1, 610), (616, p2, 711], (796, p1, 871], [875, p2, 954], (954, p1, 994], (998, p2, 1039), [1045, p1, 1114), [1136, p2, 1180), [1209, p1, 1231), [1232, p1, 1241), [1241, p2, 1302], [1339, p1, 1376], (1381, p2, 1382], [1394, p1, 1505], (1549, p2, 1556), [1556, p1, 1645], [1710, p1, 1773], (1773, p2, 1839], (1853, p2, 1858), [1858, p1, 1886), [1916, p2, 1996]} s1: {(-oo, p1, 94), (130, p1, 149], (224, p1, 277), (323, p1, 352], (377, p1, 441), [477, p1, 519], [543, p1, 576], (657, p1, 744), [800, p1, 809), (889, p1, 960), (975, p1, 997], [999, p1, 1055), [1148, p1, 1207), [1302, p1, 1394], [1400, p1, 1469), (1494, p1, 1511), (1554, p1, 1597), [1601, p1, 1683), (1764, p1, 1835], (1919, p1, 1958], (2022, p1, 2097]} s2: {[133, p2, 134], [187, p2, 195], [215, p2, 228), (285, p2, 361], [379, p2, 427), [489, p2, 518], (542, p2, 597), (668, p2, 722], (774, p2, 873], (972, p2, 973], (1019, p2, 1066), (1128, p2, 1137), [1224, p2, 1237), [1327, p2, 1404), [1441, p2, 1451], [1526, p2, 1569), (1570, p2, 1611], [1682, p2, 1699), (1722, p2, 1771), [1778, p2, 1801)} union(s1, s2): {(-oo, p1, 94), (130, p1, 149], [187, p2, 195], [215, p2, 224], (224, p1, 277), (285, p2, 361], (377, p1, 441), [477, p1, 519], (542, p2, 597), (657, p1, 744), (774, p2, 873], (889, p1, 960), (972, p2, 973], (975, p1, 997], [999, p1, 1019], (1019, p2, 1066), (1128, p2, 1137), [1148, p1, 1207), [1224, p2, 1237), [1302, p1, 1327), [1327, p2, 1400), [1400, p1, 1469), (1494, p1, 1511), [1526, p2, 1554], (1554, p1, 1570], (1570, p2, 1601), [1601, p1, 1682), [1682, p2, 1699), (1722, p2, 1764], (1764, p1, 1835], (1919, p1, 1958], (2022, p1, 2097]} s1: {[62, p1, 74], (118, p1, 186], (220, p1, 263], (306, p1, 312], [343, p1, 393], (442, p1, 473), [497, p1, 545], (588, p1, 596), (600, p1, 648], (742, p1, 773), [852, p1, 878], (928, p1, 996), (1042, p1, 1107), (1149, p1, 1162), (1240, p1, 1264], (1301, p1, 1361], [1425, p1, 1467), [1479, p1, 1487), [1571, p1, 1661], [1675, p1, 1766)} s2: {[-9, p2, 57), [150, p2, 218], (259, p2, 356], (366, p2, 405], (466, p2, 519), [589, p2, 662), [695, p2, 758), [829, p2, 837), [842, p2, 924), [928, p2, 938], [1014, p2, 1043), [1073, p2, 1116], (1135, p2, 1176], (1211, p2, 1229], (1263, p2, 1356], (1418, p2, 1471], (1500, p2, 1508], [1533, p2, 1565), [1662, p2, 1677), (1738, p2, 1744), (1776, p2, oo)} union(s1, s2): {[-9, p2, 57), [62, p1, 74], (118, p1, 150), [150, p2, 218], (220, p1, 259], (259, p2, 343), [343, p1, 366], (366, p2, 405], (442, p1, 466], (466, p2, 497), [497, p1, 545], (588, p1, 589), [589, p2, 662), [695, p2, 742], (742, p1, 773), [829, p2, 837), [842, p2, 924), [928, p2, 928], (928, p1, 996), [1014, p2, 1042], (1042, p1, 1073), [1073, p2, 1116], (1135, p2, 1176], (1211, p2, 1229], (1240, p1, 1263], (1263, p2, 1301], (1301, p1, 1361], (1418, p2, 1471], [1479, p1, 1487), (1500, p2, 1508], [1533, p2, 1565), [1571, p1, 1661], [1662, p2, 1675), [1675, p1, 1766), (1776, p2, oo)} s1: {(-oo, p1, -104], (-39, p1, 30], [65, p1, 157], (203, p1, 253), (305, p1, 344], [361, p1, 437), (517, p1, 581], (586, p1, 625), [693, p1, 718), (723, p1, 774], (835, p1, 921), (1004, p1, 1040], (1090, p1, 1112), [1159, p1, 1225), [1283, p1, 1377), [1414, p1, 1483], (1526, p1, 1565), [1651, p1, 1750), (1794, p1, 1852], (1924, p1, 1989), [2065, p1, 2144)} s2: {[-16, p2, 49], (112, p2, 192], [245, p2, 315], [398, p2, 438], (512, p2, 557], [568, p2, 591], [678, p2, 696], (759, p2, 783], (802, p2, 875), [956, p2, 969], [999, p2, 1095], [1192, p2, 1262], [1301, p2, 1380), [1430, p2, 1486), (1514, p2, 1597), [1679, p2, 1758), (1764, p2, 1776], [1853, p2, 1882], (1931, p2, 1993), (2044, p2, 2096]} union(s1, s2): {(-oo, p1, -104], (-39, p1, -16), [-16, p2, 49], [65, p1, 112], (112, p2, 192], (203, p1, 245), [245, p2, 305], (305, p1, 344], [361, p1, 398), [398, p2, 438], (512, p2, 517], (517, p1, 568), [568, p2, 586], (586, p1, 625), [678, p2, 693), [693, p1, 718), (723, p1, 759], (759, p2, 783], (802, p2, 835], (835, p1, 921), [956, p2, 969], [999, p2, 1090], (1090, p1, 1112), [1159, p1, 1192), [1192, p2, 1262], [1283, p1, 1301), [1301, p2, 1380), [1414, p1, 1430), [1430, p2, 1486), (1514, p2, 1597), [1651, p1, 1679), [1679, p2, 1758), (1764, p2, 1776], (1794, p1, 1852], [1853, p2, 1882], (1924, p1, 1931], (1931, p2, 1993), (2044, p2, 2065), [2065, p1, 2144)} s1: {(13, p1, 91), [186, p1, 226], [300, p1, 337], [419, p1, 515], [587, p1, 658), (724, p1, 841], [865, p1, 924), [993, p1, 1085], (1120, p1, 1151], [1176, p1, 1212], [1307, p1, 1315), (1347, p1, 1418), [1505, p1, 1534], [1576, p1, 1666), (1689, p1, 1771], (1793, p1, 1804), [1838, p1, 1854), (1881, p1, 1883), (1952, p1, 2013]} s2: {(-oo, p2, 92), (177, p2, 182], (242, p2, 297), (335, p2, 424], (461, p2, 556), [637, p2, 640), (692, p2, 718), [728, p2, 804), [853, p2, 886], [894, p2, 987], (996, p2, 1048], [1119, p2, 1198), [1291, p2, 1329], [1341, p2, 1391], (1441, p2, 1469), [1549, p2, 1583], (1621, p2, 1663), (1716, p2, 1757], (1819, p2, 1889), [1977, p2, 2016], [2106, p2, 2164]} union(s1, s2): {(-oo, p2, 92), (177, p2, 182], [186, p1, 226], (242, p2, 297), [300, p1, 335], (335, p2, 419), [419, p1, 461], (461, p2, 556), [587, p1, 658), (692, p2, 718), (724, p1, 841], [853, p2, 865), [865, p1, 894), [894, p2, 987], [993, p1, 1085], [1119, p2, 1176), [1176, p1, 1212], [1291, p2, 1329], [1341, p2, 1347], (1347, p1, 1418), (1441, p2, 1469), [1505, p1, 1534], [1549, p2, 1576), [1576, p1, 1666), (1689, p1, 1771], (1793, p1, 1804), (1819, p2, 1889), (1952, p1, 1977), [1977, p2, 2016], [2106, p2, 2164]} ------------------ s1: {} s2: {(-oo, ~p2, 1.4142135623?]} s3: {[0, p1, 2]} s4: {(-oo, ~p2, 0), [0, p1, 2]} s1: {[0, p1, 2]} s2: {[0, p2, 2]} union(s1, s2): {[0, p1, 2]} s1: {[0, p1, 2]} s2: {[-1.4142135623?, p2, 1]} union(s1, s2): {[-1.4142135623?, p2, 0), [0, p1, 2]} s1: {[-1.4142135623?, p1, 1]} s2: {[0, p2, 2]} union(s1, s2): {[-1.4142135623?, p1, 0), [0, p2, 2]} s1: {[-1.4142135623?, p1, 1]} s2: {[2, p2, 3]} union(s1, s2): {[-1.4142135623?, p1, 1], [2, p2, 3]} s1: {[-1.4142135623?, p1, 3]} s2: {[0, p2, 2]} union(s1, s2): {[-1.4142135623?, p1, 3]} s1: {[-2, p1, 2]} s2: {[-1.4142135623?, p2, 0], [1, p2, 3]} union(s1, s2): {[-2, p1, 1), [1, p2, 3]} s1: {[-2, p1, 2]} s2: {[2, p2, 3]} union(s1, s2): {[-2, p1, 2), [2, p2, 3]} s1: {[-2, p1, 2]} s2: {(2, p2, 3]} union(s1, s2): {[-2, p1, 2], (2, p2, 3]} s1: {[-2, p1, 2]} s2: {(2, p1, 3]} union(s1, s2): {[-2, p1, 3]} s1: {[-2, p1, 2)} s2: {(2, p1, 3]} union(s1, s2): {[-2, p1, 2), (2, p1, 3]} s1: {[2, p1, 2]} s2: {[2, p2, 3]} union(s1, s2): {[2, p2, 3]} s1: {[-2, p1, 0], [1, p1, 3]} s2: {(-oo, p2, -1.4142135623?]} union(s1, s2): {(-oo, p2, -2), [-2, p1, 0], [1, p1, 3]} s1: {[-2, p1, 0], [1, p1, 3]} s2: {(-oo, p2, -1.4142135623?], [1, p2, 1.4142135623?], [2, p2, oo)} union(s1, s2): {(-oo, p2, -2), [-2, p1, 0], [1, p1, 2), [2, p2, oo)} s1: {(-oo, p1, 1]} s2: {(1, p2, oo)} union(s1, s2): {(-oo, p1, 1], (1, p2, oo)}* s1: {(-oo, p1, 1]} s2: {(1, p2, 2), [2, p1, oo)} union(s1, s2): {(-oo, p1, 1], (1, p2, 2), [2, p1, oo)}* PASS (test nlsat :time 0.07 :before-memory 4.69 :after-memory 4.69) rm -f interval_lemma_* trigo-lemmas.math make[1]: Leaving directory '/<>' create-stamp debian/debhelper-build-stamp fakeroot debian/rules binary-arch if [ yes = yes ]; then \ if [ yes = yes ]; then \ dh binary-arch --parallel --with python2,javahelper,ocaml,cli; \ else \ dh binary-arch --parallel --with python2,javahelper,ocaml; \ fi; \ else \ dh binary-arch --parallel --with python2,ocaml; \ fi dh_testroot -a -O--parallel dh_prep -a -O--parallel debian/rules override_dh_auto_install make[1]: Entering directory '/<>' mkdir -p debian/tmp/usr/lib/python2.7/dist-packages/ # dh_auto_install additionally specifies DESTDIR to # 'make install', which causes the files to end up in the # wrong directory make install make[2]: Entering directory '/<>' make -C build install make[3]: Entering directory '/<>/build' Package exported to: /<>/debian/tmp/usr/lib/mono/Microsoft.Z3.Sharp/Microsoft.Z3.dll -> ../gac/Microsoft.Z3/4.8.4.0__069bebe4eea24785/Microsoft.Z3.dll Installed Microsoft.Z3.dll into the gac (/<>/debian/tmp/usr/lib/mono/gac) Z3 was successfully installed. make[3]: Leaving directory '/<>/build' make[2]: Leaving directory '/<>' rm -f debian/tmp/usr/lib/python2.7/dist-packages/libz3.so ln -s ../../i386-linux-gnu/libz3.so \ debian/tmp/usr/lib/python2.7/dist-packages/libz3.so mv debian/tmp/usr/lib/libz3.so debian/tmp/usr/lib/libz3.so.4 ln -s libz3.so.4 debian/tmp/usr/lib/libz3.so mkdir -p debian/tmp/usr/lib/i386-linux-gnu/jni mv debian/tmp/usr/lib/libz3java.so* \ debian/tmp/usr/lib/i386-linux-gnu/jni/ mv debian/tmp/usr/lib/libz3.so* \ debian/tmp/usr/lib/i386-linux-gnu/ make[1]: Leaving directory '/<>' debian/rules override_dh_install make[1]: Entering directory '/<>' dh_install cp build/api/ml/*.cmxa debian/libz3-ocaml-dev/usr/lib/ocaml/z3/ cp: cannot stat 'build/api/ml/*.cmxa': No such file or directory make[1]: [debian/rules:153: override_dh_install] Error 1 (ignored) cp build/api/ml/*.cmx debian/libz3-ocaml-dev/usr/lib/ocaml/z3/ cp: cannot stat 'build/api/ml/*.cmx': No such file or directory make[1]: [debian/rules:154: override_dh_install] Error 1 (ignored) make[1]: Leaving directory '/<>' jh_installjavadoc -a -O--parallel dh_ocamldoc -a -O--parallel dh_installdocs -a -O--parallel debian/rules override_dh_installchangelogs make[1]: Entering directory '/<>' dh_installchangelogs RELEASE_NOTES for p in python-z3 libz3-ocaml-dev libz3-cil libz3-java libz3-jni ; do \ rm -f -rf debian/$p/usr/share/doc/$p/ ; \ ln -s libz3-dev debian/$p/usr/share/doc/$p || true ; \ done make[1]: Leaving directory '/<>' dh_installman -a -O--parallel dh_python2 -a -O--parallel dh_installinit -a -O--parallel dh_installsystemduser -a -O--parallel dh_perl -a -O--parallel dh_link -a -O--parallel jh_installlibs -a -O--parallel jh_classpath -a -O--parallel jh_manifest -a -O--parallel jh_exec -a -O--parallel jh_depends -a -O--parallel dh_strip_nondeterminism -a -O--parallel dh_compress -a -O--parallel dh_fixperms -a -O--parallel dh_clifixperms -a -O--parallel dh_missing -a -O--parallel dh_missing: usr/lib/pkgconfig/Microsoft.Z3.Sharp.pc exists in debian/tmp but is not installed to anywhere dh_missing: usr/lib/mono/Microsoft.Z3.Sharp/Microsoft.Z3.dll exists in debian/tmp but is not installed to anywhere dh_missing: usr/lib/mono/gac/Microsoft.Z3/4.8.4.0__069bebe4eea24785/Microsoft.Z3.dll exists in debian/tmp but is not installed to anywhere dh_missing: usr/lib/mono/gac/Microsoft.Z3/4.8.4.0__069bebe4eea24785/Microsoft.Z3.dll.config exists in debian/tmp but is not installed to anywhere The following debhelper tools have reported what they installed (with files per package) * dh_install: libz3-4 (1), libz3-cil (2), libz3-dev (15), libz3-java (1), libz3-jni (1), libz3-ocaml-dev (11), python-z3 (1), z3 (1) * dh_installdocs: libz3-4 (0), libz3-cil (0), libz3-dev (0), libz3-java (0), libz3-jni (0), libz3-ocaml-dev (0), python-z3 (0), z3 (1) * dh_installman: libz3-4 (0), libz3-cil (0), libz3-dev (0), libz3-java (0), libz3-jni (0), libz3-ocaml-dev (0), python-z3 (0), z3 (1) If the missing files are installed by another tool, please file a bug against it. When filing the report, if the tool is not part of debhelper itself, please reference the "Logging helpers and dh_missing" section from the "PROGRAMMING" guide for debhelper (10.6.3+). (in the debhelper package: /usr/share/doc/debhelper/PROGRAMMING.gz) Be sure to test with dpkg-buildpackage -A/-B as the results may vary when only a subset is built For a short-term work-around: Add the files to debian/not-installed dh_dwz -a -O--parallel dh_strip -a -O--parallel dh_makeshlibs -a -O--parallel dh_shlibdeps -a -O--parallel dh_clistrip -a -O--parallel dh_cligacpolicy -a -O--parallel dh_cligacpolicy: Warning! No Build-Depends(-Indep) on cli-common-dev (>= 0.5.7)! dh_makeclilibs -a -O--parallel dh_installcligac -a -O--parallel dh_installcliframework -a -O--parallel debian/rules override_dh_clideps make[1]: Entering directory '/<>' # dh_clideps fails to find libz3.so automatically # So we have to depend on libz3-dev manually in d/control dh_clideps --exclude-moduleref=libz3 make[1]: Leaving directory '/<>' dh_installdeb -a -O--parallel dh_ocaml -a -O--parallel dh_gencontrol -a -O--parallel dpkg-gencontrol: warning: Depends field of package libz3-cil: substitution variable ${shlibs:Depends} used, but is not defined dpkg-gencontrol: warning: Depends field of package python-z3: substitution variable ${shlibs:Depends} used, but is not defined dpkg-gencontrol: warning: package python-z3: substitution variable ${python:Provides} unused, but is defined dpkg-gencontrol: warning: package python-z3: substitution variable ${python:Versions} unused, but is defined dpkg-gencontrol: warning: package libz3-ocaml-dev: substitution variable ${ocaml:Provides} unused, but is defined dpkg-gencontrol: warning: package libz3-ocaml-dev: substitution variable ${ocaml:Provides} unused, but is defined dh_md5sums -a -O--parallel dh_builddeb -a -O--parallel INFO: pkgstriptranslations version 144 INFO: pkgstriptranslations version 144 INFO: pkgstriptranslations version 144 INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-java (in debian/libz3-java); do_strip: , oemstrip: pkgstriptranslations: processing libz3-cil (in debian/libz3-cil); do_strip: , oemstrip: pkgstriptranslations: processing z3 (in debian/z3); do_strip: , oemstrip: pkgstriptranslations: processing libz3-4-dbgsym (in debian/.debhelper/libz3-4/dbgsym-root); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgstripfiles: processing control file: debian/libz3-java/DEBIAN/control, package libz3-java, directory debian/libz3-java INFO: pkgstripfiles: waiting for lock (libz3-java) ... pkgstripfiles: processing control file: debian/z3/DEBIAN/control, package z3, directory debian/z3 .. removing usr/share/doc/z3/changelog.gz pkgstripfiles: processing control file: debian/libz3-cil/DEBIAN/control, package libz3-cil, directory debian/libz3-cil INFO: pkgstripfiles: waiting for lock (libz3-cil) ... pkgstripfiles: processing control file: debian/.debhelper/libz3-4/dbgsym-root/DEBIAN/control, package libz3-4-dbgsym, directory debian/.debhelper/libz3-4/dbgsym-root dpkg-deb: building package 'libz3-4-dbgsym' in 'debian/.debhelper/scratch-space/build-libz3-4/libz3-4-dbgsym_4.8.4-1build1_i386.deb'. pkgstripfiles: Truncating usr/share/doc/z3/changelog.Debian.gz to topmost ten records pkgstripfiles: Running PNG optimization (using 4 cpus) for package z3 ... pkgstripfiles: No PNG files. dpkg-deb: building package 'z3' in '../z3_4.8.4-1build1_i386.deb'. INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... Renaming libz3-4-dbgsym_4.8.4-1build1_i386.deb to libz3-4-dbgsym_4.8.4-1build1_i386.ddeb INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-dev (in debian/libz3-dev); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... pkgstripfiles: processing control file: debian/libz3-dev/DEBIAN/control, package libz3-dev, directory debian/libz3-dev .. removing usr/share/doc/libz3-dev/changelog.gz INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstriptranslations version 144 pkgstriptranslations: processing z3-dbgsym (in debian/.debhelper/z3/dbgsym-root); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgstripfiles: processing control file: debian/.debhelper/z3/dbgsym-root/DEBIAN/control, package z3-dbgsym, directory debian/.debhelper/z3/dbgsym-root dpkg-deb: building package 'z3-dbgsym' in 'debian/.debhelper/scratch-space/build-z3/z3-dbgsym_4.8.4-1build1_i386.deb'. INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... Renaming z3-dbgsym_4.8.4-1build1_i386.deb to z3-dbgsym_4.8.4-1build1_i386.ddeb INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-4 (in debian/libz3-4); do_strip: , oemstrip: INFO: pkgstripfiles: waiting for lock (libz3-java) ... pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " INFO: pkgstripfiles: waiting for lock (libz3-cil) ... INFO: pkgstripfiles: waiting for lock (libz3-dev) ... pkgstripfiles: processing control file: debian/libz3-4/DEBIAN/control, package libz3-4, directory debian/libz3-4 .. removing usr/share/doc/libz3-4/changelog.gz pkgstripfiles: Truncating usr/share/doc/libz3-4/changelog.Debian.gz to topmost ten records pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-4 ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-4' in '../libz3-4_4.8.4-1build1_i386.deb'. INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... Searching for duplicated docs in dependency libz3-4... symlinking changelog.Debian.gz in libz3-dev to file in libz3-4 pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-dev ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-dev' in '../libz3-dev_4.8.4-1build1_i386.deb'. INFO: pkgstriptranslations version 144 pkgstriptranslations: processing python-z3 (in debian/python-z3); do_strip: , oemstrip: INFO: pkgstripfiles: waiting for lock (libz3-java) ... INFO: pkgstripfiles: waiting for lock (libz3-cil) ... pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgstripfiles: processing control file: debian/python-z3/DEBIAN/control, package python-z3, directory debian/python-z3 pkgstripfiles: Running PNG optimization (using 4 cpus) for package python-z3 ... pkgstripfiles: No PNG files. dpkg-deb: building package 'python-z3' in '../python-z3_4.8.4-1build1_i386.deb'. INFO: pkgstripfiles: waiting for lock (libz3-java) ... pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-cil ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-cil' in '../libz3-cil_4.8.4-1build1_i386.deb'. INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-ocaml-dev (in debian/libz3-ocaml-dev); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " INFO: pkgstripfiles: waiting for lock (libz3-java) ... pkgstripfiles: processing control file: debian/libz3-ocaml-dev/DEBIAN/control, package libz3-ocaml-dev, directory debian/libz3-ocaml-dev pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-ocaml-dev ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-ocaml-dev' in '../libz3-ocaml-dev_4.8.4-1build1_i386.deb'. pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-java ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-java' in '../libz3-java_4.8.4-1build1_i386.deb'. INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-jni (in debian/libz3-jni); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgstripfiles: processing control file: debian/libz3-jni/DEBIAN/control, package libz3-jni, directory debian/libz3-jni pkgstripfiles: Running PNG optimization (using 4 cpus) for package libz3-jni ... pkgstripfiles: No PNG files. dpkg-deb: building package 'libz3-jni' in '../libz3-jni_4.8.4-1build1_i386.deb'. INFO: pkgstriptranslations version 144 pkgstriptranslations: processing libz3-ocaml-dev-dbgsym (in debian/.debhelper/libz3-ocaml-dev/dbgsym-root); do_strip: , oemstrip: pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " INFO: pkgstriptranslations version 144 pkgstripfiles: processing control file: debian/.debhelper/libz3-ocaml-dev/dbgsym-root/DEBIAN/control, package libz3-ocaml-dev-dbgsym, directory debian/.debhelper/libz3-ocaml-dev/dbgsym-root dpkg-deb: building package 'libz3-ocaml-dev-dbgsym' in 'debian/.debhelper/scratch-space/build-libz3-ocaml-dev/libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.deb'. pkgstriptranslations: processing libz3-jni-dbgsym (in debian/.debhelper/libz3-jni/dbgsym-root); do_strip: , oemstrip: Renaming libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.deb to libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.ddeb pkgmaintainermangler: Maintainer field overridden to "Ubuntu Developers " pkgstripfiles: processing control file: debian/.debhelper/libz3-jni/dbgsym-root/DEBIAN/control, package libz3-jni-dbgsym, directory debian/.debhelper/libz3-jni/dbgsym-root dpkg-deb: building package 'libz3-jni-dbgsym' in 'debian/.debhelper/scratch-space/build-libz3-jni/libz3-jni-dbgsym_4.8.4-1build1_i386.deb'. Renaming libz3-jni-dbgsym_4.8.4-1build1_i386.deb to libz3-jni-dbgsym_4.8.4-1build1_i386.ddeb dpkg-genbuildinfo --build=any dpkg-genchanges --build=any -mLaunchpad Build Daemon >../z3_4.8.4-1build1_i386.changes dpkg-genchanges: info: binary-only arch-specific upload (source code and arch-indep packages not included) dpkg-source --after-build . dpkg-buildpackage: info: binary-only upload (no source included) -------------------------------------------------------------------------------- Build finished at 20190913-0856 Finished -------- I: Built successfully +------------------------------------------------------------------------------+ | Post Build Chroot | +------------------------------------------------------------------------------+ +------------------------------------------------------------------------------+ | Changes | +------------------------------------------------------------------------------+ z3_4.8.4-1build1_i386.changes: ------------------------------ Format: 1.8 Date: Fri, 13 Sep 2019 10:27:08 +0200 Source: z3 Binary: libz3-4 libz3-cil libz3-dev libz3-java libz3-jni libz3-ocaml-dev python-z3 z3 Architecture: i386 Version: 4.8.4-1build1 Distribution: eoan-proposed Urgency: medium Maintainer: Launchpad Build Daemon Changed-By: Gianfranco Costamagna Description: libz3-4 - theorem prover from Microsoft Research - runtime libraries libz3-cil - theorem prover from Microsoft Research - CLI bindings libz3-dev - theorem prover from Microsoft Research - development files libz3-java - theorem prover from Microsoft Research - java bindings libz3-jni - theorem prover from Microsoft Research - JNI library libz3-ocaml-dev - theorem prover from Microsoft Research - OCaml bindings python-z3 - theorem prover from Microsoft Research - Python bindings z3 - theorem prover from Microsoft Research Changes: z3 (4.8.4-1build1) eoan; urgency=medium . * Rebuild against new OCAML ABI. Checksums-Sha1: 84c4bcde145dd16f80680b63926f4a10f10370bd 95773212 libz3-4-dbgsym_4.8.4-1build1_i386.ddeb b2ea10acd78f9287744ff6ccc798a458c919a9b2 7178800 libz3-4_4.8.4-1build1_i386.deb 6bc3f689532a17d703e40e52f03baec257211719 45024 libz3-cil_4.8.4-1build1_i386.deb 42bcc9a267d32f4499de506460d804c10e502530 65104 libz3-dev_4.8.4-1build1_i386.deb 2d47e0a1fef59bceaa017ee972efc5176268640f 152324 libz3-java_4.8.4-1build1_i386.deb 5fbf5b20d28b20f7c45192e798de84ebe70614ae 143720 libz3-jni-dbgsym_4.8.4-1build1_i386.ddeb 553951db322e82392c3ed71a9cc269083bd0afe8 41380 libz3-jni_4.8.4-1build1_i386.deb 1c91f6adc636f41d63fe8924d07fc388ee587f8e 342636 libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.ddeb 37d6752660c2808ec05c1a863e5acb6ab2a4bd56 459748 libz3-ocaml-dev_4.8.4-1build1_i386.deb 521ef8ca11922df9ce0dc06df361139023d85a7a 1388 python-z3_4.8.4-1build1_i386.deb 88ba2f2ba76e5e2036c3c2cae334ed826f278515 98569324 z3-dbgsym_4.8.4-1build1_i386.ddeb 98794e105da78392913aab0bf318536e0ffc4b1b 23472 z3_4.8.4-1build1_i386.buildinfo 412c6a92a8e016eb837386d3006b49e5293fb440 7336440 z3_4.8.4-1build1_i386.deb Checksums-Sha256: bf19ea24954e095d6c3cb18673aeb60fe450413b96a9711e341710202db28fa2 95773212 libz3-4-dbgsym_4.8.4-1build1_i386.ddeb 847248f5e62ca32ba7161b92e218ff35d2e787dc4326c7920cdbd172ca7e238b 7178800 libz3-4_4.8.4-1build1_i386.deb 3af5f5424bb00aa0e0bb36bb27aa4bc4bbc3c97e9f9320db0f073d2609ca0249 45024 libz3-cil_4.8.4-1build1_i386.deb 1c150bc2b998324a0f20eab90e47f0e9a6790df8752d39c2d22c2ff981d07bdc 65104 libz3-dev_4.8.4-1build1_i386.deb 68ff6468063d9846d38deefe6a96b6e97b749583304f7b505b6426f239f4ede6 152324 libz3-java_4.8.4-1build1_i386.deb 9322b30902dbbd9561dc6c8441cbe029b71d506c8238fde8ca8d8bd7b81b8938 143720 libz3-jni-dbgsym_4.8.4-1build1_i386.ddeb 574d8137f8bbebdd0817370270eea8b492f3af1b442abd7b64a250a746bf19fc 41380 libz3-jni_4.8.4-1build1_i386.deb 6926d36de66f1ce39ccd6374514cdffadb568f3f453d6546b5ebc671a9898ab5 342636 libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.ddeb 225cb70a6bf69b19557eceaa9474643249d1cfd71bb931e8d3aa0dcf09b3a57e 459748 libz3-ocaml-dev_4.8.4-1build1_i386.deb 0253d5e4483a337a9331af719aa35bd886b374df20041769bd0b0c5dbf137651 1388 python-z3_4.8.4-1build1_i386.deb 8c9676229b7c838885e20c5cbc57edf4ac4f2024181648b1e1f0053eea6a2571 98569324 z3-dbgsym_4.8.4-1build1_i386.ddeb 1bb6ca17af3dd97e2f97ebfc5442facf857b96c94cfdea6c0f5d30cd566010cb 23472 z3_4.8.4-1build1_i386.buildinfo 40915b2488919281219181437b2c2550f50e65718ca85442caf83d8c8cb5f091 7336440 z3_4.8.4-1build1_i386.deb Files: 0f9500d535015b25c06ceda6735148ca 95773212 debug optional libz3-4-dbgsym_4.8.4-1build1_i386.ddeb 312c2e4ae2efd81f8c75d05eacda0deb 7178800 libs optional libz3-4_4.8.4-1build1_i386.deb 7744507b3116bee5bf29cfbef736fb10 45024 cli-mono optional libz3-cil_4.8.4-1build1_i386.deb 76930dc0c3b0f295ce06b982c2165855 65104 libdevel optional libz3-dev_4.8.4-1build1_i386.deb b07c6bbb4cb8e42e13636e3b80d2fc32 152324 java optional libz3-java_4.8.4-1build1_i386.deb f963da1ebbd977f25e523a3e5ea533aa 143720 debug optional libz3-jni-dbgsym_4.8.4-1build1_i386.ddeb 8cc986e58ffe151be656d5b15b696ceb 41380 java optional libz3-jni_4.8.4-1build1_i386.deb 8b8a20267deaaed950a6ec96399547eb 342636 debug optional libz3-ocaml-dev-dbgsym_4.8.4-1build1_i386.ddeb daa5744afd2cda212c945efb638f0983 459748 ocaml optional libz3-ocaml-dev_4.8.4-1build1_i386.deb 6271f313b57b88da868f106f5ddcd964 1388 python optional python-z3_4.8.4-1build1_i386.deb bfbd7452e6b92dcf3ec355dc7fd9e6d4 98569324 debug optional z3-dbgsym_4.8.4-1build1_i386.ddeb a49cd8b5895f247982419710b8cb0151 23472 science optional z3_4.8.4-1build1_i386.buildinfo ac91c2661c7cb3473fb8e33197752743 7336440 science optional z3_4.8.4-1build1_i386.deb +------------------------------------------------------------------------------+ | Package contents | +------------------------------------------------------------------------------+ libz3-4_4.8.4-1build1_i386.deb ------------------------------ new debian package, version 2.0. size 7178800 bytes: control archive=1072 bytes. 950 bytes, 23 lines control 210 bytes, 3 lines md5sums 27 bytes, 1 lines shlibs 72 bytes, 2 lines triggers Package: libz3-4 Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 23008 Depends: libc6 (>= 2.29), libgcc1 (>= 1:7), libgomp1 (>= 4.9), libstdc++6 (>= 9) Breaks: libz3-dev (<< 4.4.1) Replaces: libz3-dev (<< 4.4.1) Section: libs Priority: optional Multi-Arch: same Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - runtime libraries Z3 is a state-of-the art theorem prover from Microsoft Research. It can be used to check the satisfiability of logical formulas over one or more theories. Z3 offers a compelling match for software analysis and verification tools, since several common software constructs map directly into supported theories. . This package contains runtime libraries. You shouldn't have to install it manually. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/ -rw-r--r-- root/root 23526432 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/libz3.so.4 drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-4/ -rw-r--r-- root/root 2122 2019-09-13 08:27 ./usr/share/doc/libz3-4/changelog.Debian.gz -rw-r--r-- root/root 2131 2019-08-27 12:30 ./usr/share/doc/libz3-4/copyright libz3-cil_4.8.4-1build1_i386.deb -------------------------------- new debian package, version 2.0. size 45024 bytes: control archive=1020 bytes. 49 bytes, 1 lines clilibs 730 bytes, 16 lines control 131 bytes, 2 lines md5sums 363 bytes, 21 lines * preinst #!/bin/sh Package: libz3-cil Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 227 Depends: libz3-dev (= 4.8.4-1build1), libmono-corlib4.5-cil (>= 5.18.0.240), libmono-system-core4.0-cil (>= 5.18.0.240), libmono-system-numerics4.0-cil (>= 5.16.0.220) Section: cli-mono Priority: optional Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - CLI bindings Z3 is a state-of-the art theorem prover from Microsoft Research. See the z3 package for a detailed description. . This package can be used to invoke Z3 via its .NET API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/z3/ -rw-r--r-- root/root 221184 2019-09-13 08:27 ./usr/lib/z3/Microsoft.Z3.dll -rw-r--r-- root/root 113 2019-09-13 08:27 ./usr/lib/z3/Microsoft.Z3.dll.config drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-cil -> libz3-dev libz3-dev_4.8.4-1build1_i386.deb -------------------------------- new debian package, version 2.0. size 65104 bytes: control archive=1208 bytes. 818 bytes, 20 lines control 881 bytes, 15 lines md5sums Package: libz3-dev Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 490 Depends: libz3-4 (= 4.8.4-1build1) Section: libdevel Priority: optional Multi-Arch: same Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - development files Z3 is a state-of-the art theorem prover from Microsoft Research. It can be used to check the satisfiability of logical formulas over one or more theories. Z3 offers a compelling match for software analysis and verification tools, since several common software constructs map directly into supported theories. . This package can be used to invoke Z3 via its C++ API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/include/ -rw-r--r-- root/root 145422 2019-09-13 08:27 ./usr/include/z3++.h -rw-r--r-- root/root 536 2019-09-13 08:27 ./usr/include/z3.h -rw-r--r-- root/root 6683 2019-09-13 08:27 ./usr/include/z3_algebraic.h -rw-r--r-- root/root 227500 2019-09-13 08:27 ./usr/include/z3_api.h -rw-r--r-- root/root 5781 2019-09-13 08:27 ./usr/include/z3_ast_containers.h -rw-r--r-- root/root 14873 2019-09-13 08:27 ./usr/include/z3_fixedpoint.h -rw-r--r-- root/root 34772 2019-09-13 08:27 ./usr/include/z3_fpa.h -rw-r--r-- root/root 315 2019-09-13 08:27 ./usr/include/z3_macros.h -rw-r--r-- root/root 11549 2019-09-13 08:27 ./usr/include/z3_optimization.h -rw-r--r-- root/root 1096 2019-09-13 08:27 ./usr/include/z3_polynomial.h -rw-r--r-- root/root 6002 2019-09-13 08:27 ./usr/include/z3_rcf.h -rw-r--r-- root/root 3931 2019-09-13 08:27 ./usr/include/z3_spacer.h -rw-r--r-- root/root 2248 2019-09-13 08:27 ./usr/include/z3_v1.h -rw-r--r-- root/root 190 2019-09-13 08:27 ./usr/include/z3_version.h drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/libz3.so -> libz3.so.4 drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-dev/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-dev/changelog.Debian.gz -> ../libz3-4/changelog.Debian.gz -rw-r--r-- root/root 2131 2019-08-27 12:30 ./usr/share/doc/libz3-dev/copyright libz3-java_4.8.4-1build1_i386.deb --------------------------------- new debian package, version 2.0. size 152324 bytes: control archive=924 bytes. 662 bytes, 17 lines control 70 bytes, 1 lines md5sums 364 bytes, 21 lines * preinst #!/bin/sh Package: libz3-java Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 176 Depends: libz3-jni (>= 4.8.4-1build1), libz3-jni (<< 4.8.4-1build1.1~), libz3-dev Section: java Priority: optional Multi-Arch: foreign Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - java bindings Z3 is a state-of-the art theorem prover from Microsoft Research. See the z3 package for a detailed description. . This package can be used to invoke Z3 via its Java API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-java -> libz3-dev drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/java/ -rw-r--r-- root/root 171922 2019-09-13 08:27 ./usr/share/java/com.microsoft.z3.jar libz3-jni_4.8.4-1build1_i386.deb -------------------------------- new debian package, version 2.0. size 41380 bytes: control archive=956 bytes. 681 bytes, 17 lines control 74 bytes, 1 lines md5sums 363 bytes, 21 lines * preinst #!/bin/sh Package: libz3-jni Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 240 Depends: libz3-dev (= 4.8.4-1build1), libc6 (>= 2.4), libstdc++6 (>= 4.9), libz3-4 (>= 4.8.4) Section: java Priority: optional Multi-Arch: same Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - JNI library Z3 is a state-of-the art theorem prover from Microsoft Research. See the z3 package for a detailed description. . This package provides the JNI library to invoke Z3 via its Java API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/jni/ -rw-r--r-- root/root 234856 2019-09-13 08:27 ./usr/lib/i386-linux-gnu/jni/libz3java.so drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-jni -> libz3-dev libz3-ocaml-dev_4.8.4-1build1_i386.deb -------------------------------------- new debian package, version 2.0. size 459748 bytes: control archive=1300 bytes. 686 bytes, 17 lines control 834 bytes, 13 lines md5sums 369 bytes, 21 lines * preinst #!/bin/sh Package: libz3-ocaml-dev Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 3248 Depends: libz3-dev (= 4.8.4-1build1), ocaml-nox-4.05.0, libc6 (>= 2.4), libz3-4 (>= 4.8.4) Recommends: ocaml-findlib Section: ocaml Priority: optional Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - OCaml bindings Z3 is a state-of-the art theorem prover from Microsoft Research. See the z3 package for a detailed description. . This package can be used to invoke Z3 via its OCaml API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ocaml/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ocaml/z3/ -rw-r--r-- root/root 393 2019-09-13 08:27 ./usr/lib/ocaml/z3/META -rw-r--r-- root/root 456656 2019-09-13 08:27 ./usr/lib/ocaml/z3/dllz3ml.so -rw-r--r-- root/root 507500 2019-09-13 08:27 ./usr/lib/ocaml/z3/libz3ml.a -rw-r--r-- root/root 86655 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3.cmi -rw-r--r-- root/root 127773 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3.mli -rw-r--r-- root/root 9977 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3enums.cmi -rw-r--r-- root/root 5987 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3enums.mli -rw-r--r-- root/root 131459 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3ml.cma -rw-r--r-- root/root 112169 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3native.cmi -rw-r--r-- root/root 60537 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3native.mli -rw-r--r-- root/root 1804616 2019-09-13 08:27 ./usr/lib/ocaml/z3/z3native_stubs.o drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/libz3-ocaml-dev -> libz3-dev drwxr-xr-x root/root 0 2019-09-13 08:27 ./var/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./var/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./var/lib/ocaml/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./var/lib/ocaml/lintian/ -rw-r--r-- root/root 176 2019-09-13 08:27 ./var/lib/ocaml/lintian/libz3-ocaml-dev.info drwxr-xr-x root/root 0 2019-09-13 08:27 ./var/lib/ocaml/md5sums/ -rw-r--r-- root/root 233 2019-09-13 08:27 ./var/lib/ocaml/md5sums/libz3-ocaml-dev.md5sums python-z3_4.8.4-1build1_i386.deb -------------------------------- new debian package, version 2.0. size 1388 bytes: control archive=864 bytes. 644 bytes, 16 lines control 0 bytes, 0 lines md5sums 363 bytes, 21 lines * preinst #!/bin/sh Package: python-z3 Source: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 11 Depends: libz3-dev (= 4.8.4-1build1), python:any (<< 2.8), python:any (>= 2.7~) Section: python Priority: optional Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research - Python bindings Z3 is a state-of-the art theorem prover from Microsoft Research. See the z3 package for a detailed description. . This package can be used to invoke Z3 via its Python API. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/python2.7/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/lib/python2.7/dist-packages/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/lib/python2.7/dist-packages/libz3.so -> ../../i386-linux-gnu/libz3.so drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ lrwxrwxrwx root/root 0 2019-09-13 08:27 ./usr/share/doc/python-z3 -> libz3-dev z3_4.8.4-1build1_i386.deb ------------------------- new debian package, version 2.0. size 7336440 bytes: control archive=964 bytes. 840 bytes, 19 lines control 302 bytes, 5 lines md5sums Package: z3 Version: 4.8.4-1build1 Architecture: i386 Maintainer: Ubuntu Developers Original-Maintainer: LLVM Packaging Team Installed-Size: 23484 Depends: libc6 (>= 2.29), libgcc1 (>= 1:7), libgomp1 (>= 4.9), libstdc++6 (>= 9) Section: science Priority: optional Homepage: https://github.com/Z3Prover/z3 Description: theorem prover from Microsoft Research Z3 is a state-of-the art theorem prover from Microsoft Research. It can be used to check the satisfiability of logical formulas over one or more theories. Z3 offers a compelling match for software analysis and verification tools, since several common software constructs map directly into supported theories. . The Z3 input format is an extension of the one defined by the SMT-LIB 2.0 standard. drwxr-xr-x root/root 0 2019-09-13 08:27 ./ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/bin/ -rwxr-xr-x root/root 24009864 2019-09-13 08:27 ./usr/bin/z3 drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/doc/z3/ -rw-r--r-- root/root 2673 2018-12-20 18:32 ./usr/share/doc/z3/README.md.gz -rw-r--r-- root/root 2122 2019-09-13 08:27 ./usr/share/doc/z3/changelog.Debian.gz -rw-r--r-- root/root 2131 2019-08-27 12:30 ./usr/share/doc/z3/copyright drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/man/ drwxr-xr-x root/root 0 2019-09-13 08:27 ./usr/share/man/man1/ -rw-r--r-- root/root 1389 2019-09-13 08:27 ./usr/share/man/man1/z3.1.gz +------------------------------------------------------------------------------+ | Post Build | +------------------------------------------------------------------------------+ +------------------------------------------------------------------------------+ | Cleanup | +------------------------------------------------------------------------------+ Purging /<> Not removing build depends: as requested +------------------------------------------------------------------------------+ | Summary | +------------------------------------------------------------------------------+ Build Architecture: i386 Build-Space: 3991852 Build-Time: 1474 Distribution: eoan-proposed Host Architecture: i386 Install-Time: 135 Job: z3_4.8.4-1build1.dsc Machine Architecture: amd64 Package: z3 Package-Time: 1610 Source-Version: 4.8.4-1build1 Space: 3991852 Status: successful Version: 4.8.4-1build1 -------------------------------------------------------------------------------- Finished at 20190913-0856 Build needed 00:26:50, 3991852k disc space RUN: /usr/share/launchpad-buildd/bin/in-target scan-for-processes --backend=chroot --series=eoan --arch=i386 PACKAGEBUILD-17760547 Scanning for processes to kill in build PACKAGEBUILD-17760547