rheolef 5.93-2 source package in Ubuntu
Changelog
rheolef (5.93-2) unstable; urgency=low
* debian/control:
- "vtk-tcl" dependency changed to "tcl-vtk|vtk-tcl" (closes: #619917)
- "doxygen" dependency removed (closes: #616276)
* debian/rheolef-doc.install : add refman in .info format
* debian/rheolef-doc.doc-base.refman: created for .pdf .html & .info
* debian/rules:
- clean some obsolete Makefile commandes
rheolef (5.93-1) unstable; urgency=low
* New upstream release (minor changes):
- some extra warning message deleted in heap_allocator
- graphic output with mayavi2 fixed
- add doc refman in .pdf format
-- Ubuntu Archive Auto-Sync <email address hidden> Sat, 30 Apr 2011 13:39:41 +0000
Upload details
- Uploaded by:
- Ubuntu Archive Auto-Sync
- Uploaded to:
- Oneiric
- Original maintainer:
- Debian Science Team
- Architectures:
- any
- Section:
- math
- Urgency:
- Low Urgency
See full publishing history Publishing
| Series | Published | Component | Section | |
|---|---|---|---|---|
| Precise | release | universe | math |
Downloads
| File | Size | SHA-256 Checksum |
|---|---|---|
| rheolef_5.93.orig.tar.gz | 13.2 MiB | 4ff826c192c37ad70aa212a98bfa843d71067d9048d92143c487830914305343 |
| rheolef_5.93-2.debian.tar.gz | 6.1 KiB | 3e8564fc194dcee16ae89e9bacb879e9191f44a3209762efa9d44eea6a40aac9 |
| rheolef_5.93-2.dsc | 1.7 KiB | 332d9c175ef4475e911a665ba3e1f3674003f9692549e5752b6968116ae7b49b |
Available diffs
- diff from 5.92-2 to 5.93-2 (1.0 MiB)
Binary packages built by this source
- librheolef-dev: No summary available for librheolef-dev in ubuntu oneiric.
No description available for librheolef-dev in ubuntu oneiric.
- librheolef1: Finite elements for partial differential equations (shared library)
Rheolef is a computer environment that serves as a convenient
laboratory for computations in applied mathematics, involving finite
element-like methods. It provides a set of unix commands and C++
algorithms and containers.
.
Containers covers first the classic graph data structure for sparse
matrix formats and finite element meshes.
.
An higher level of abstraction is provided by containers related to
approximate finite element spaces, discrete fields and bilinear forms.
.
.
Current applications cover
.
- Poisson problems in 1D 2D and 3D with P1 or P2 elements
- Stokes problems in 2D and 3D, with P2-P1 or P1 bubble-P1 elements
- linear elasticity in 2D and 3D, with P1 and P2 elements,
including the incompressible and nearly incompressible elasticity
- characteristic method for convection-difusion, time-dependent problems
and Navier-Stokes equations.
- auto-adaptive mesh based for 2D problems
- axisymetric problems
- multi-regions and non-constant coefficients
- axisymetric problems
- rheolef: Finite elements for partial differential equations
Rheolef is a computer environment that serves as a convenient
laboratory for computations in applied mathematics, involving finite
element-like methods. It provides a set of unix commands and C++
algorithms and containers.
.
Containers covers first the classic graph data structure for sparse
matrix formats and finite element meshes.
.
An higher level of abstraction is provided by containers related to
approximate finite element spaces, discrete fields and bilinear forms.
.
.
Current applications cover
.
- Poisson problems in 1D 2D and 3D with P1 or P2 elements
- Stokes problems in 2D and 3D, with P2-P1 or P1 bubble-P1 elements
- linear elasticity in 2D and 3D, with P1 and P2 elements,
including the incompressible and nearly incompressible elasticity
- characteristic method for convection-difusion, time-dependent problems
and Navier-Stokes equations.
- auto-adaptive mesh based for 2D problems
- axisymetric problems
- multi-regions and non-constant coefficients
- axisymetric problems
.
Input and Output in various file format for meshes generators
and numerical data visualization systems (mayavi, vtk, plotmtv, gnuplot).
- rheolef-doc: Finite elements for partial differential equations (documentation)
Rheolef is a computer environment that serves as a convenient
laboratory for computations in applied mathematics, involving finite
element-like methods. It provides a set of unix commands and C++
algorithms and containers.
.
Containers covers first the classic graph data structure for sparse
matrix formats and finite element meshes.
.
An higher level of abstraction is provided by containers related to
approximate finite element spaces, discrete fields and bilinear forms.
.
.
Current applications cover
.
- Poisson problems in 1D 2D and 3D with P1 or P2 elements
- Stokes problems in 2D and 3D, with P2-P1 or P1 bubble-P1 elements
- linear elasticity in 2D and 3D, with P1 and P2 elements,
including the incompressible and nearly incompressible elasticity
- characteristic method for convection-difusion, time-dependent problems
and Navier-Stokes equations.
- auto-adaptive mesh based for 2D problems
- axisymetric problems
- multi-regions and non-constant coefficients
- axisymetric problems
