genus2reduction 0.3-2.1ubuntu1 source package in Ubuntu
Changelog
genus2reduction (0.3-2.1ubuntu1) oneiric; urgency=low * Merge from debian unstable to fix FTBFS (LP: #831247). Remaining changes: - Libraries needed to link the package should go into LDADD and after sources on the linker command line to fix an issue with ld --as-needed genus2reduction (0.3-2.1) unstable; urgency=medium * Non-maintainer upload. * debian/patches/pari_2.5.patch: - Port to pari 2.5 API (Closes: #635507, #635917). -- Julian Taylor <email address hidden> Thu, 25 Aug 2011 14:49:26 +0200
Upload details
- Uploaded by:
- Julian Taylor
- Sponsored by:
- Michael Terry
- Uploaded to:
- Oneiric
- Original maintainer:
- Ubuntu Developers
- Architectures:
- any
- Section:
- math
- Urgency:
- Medium Urgency
See full publishing history Publishing
Series | Published | Component | Section |
---|
Downloads
File | Size | SHA-256 Checksum |
---|---|---|
genus2reduction_0.3.orig.tar.gz | 16.9 KiB | da90c1e3798bb4e1f15f8184f0c3d083b55e330238179a0eaec215ee0a1ade0e |
genus2reduction_0.3-2.1ubuntu1.diff.gz | 5.5 KiB | 5bb1a91d951c02d92846dcb9e8370c81d40837319cb24eff9861773552eb7829 |
genus2reduction_0.3-2.1ubuntu1.dsc | 1.2 KiB | a0e3c4ec44dd60a7ec0b6ff5caa1df4708a1528a9a5a2629a1f348abdb654f53 |
Available diffs
- diff from 0.3-2ubuntu1 to 0.3-2.1ubuntu1 (3.7 KiB)
Binary packages built by this source
- genus2reduction: Conductor and Reduction Types for Genus 2 Curves
genus2reduction is a program for computing the conductor and
reduction types for a genus 2 hyperelliptic curve.
.
As an example of genus2reduction's functionality, let C be a proper smooth
curve of genus 2 defined by a hyperelliptic equation y^2+Q(x)y=P(x), where
P(x) and Q(x) are polynomials with rational coefficients such that
deg(Q(x))<4, deg(P(x))<7. Let J(C) be the Jacobian of C, let X be the minimal
regular model of C over the ring of integers Z.
.
This program determines the reduction of C at any prime number p (that
is the special fiber X_p of X over p), and the exponent f of the conductor
of J(C) at p.