5256
Comment:
|
7933
|
Deletions are marked like this. | Additions are marked like this. |
Line 9: | Line 9: |
Line 16: | Line 15: |
`Template for creating Sage packages <https://github.com/cswiercz/sage_packages>`_. - In the `Sagemath sample package example <https://github.com/nthiery/sage_sample>`_ you |
`Creating External Sage Packages <https://gist.github.com/cswiercz/c632d920565a2da519b73bd2b79d7920>`_. - With the `SageMath sample package <https://github.com/sagemath/sage_sample>`_ you |
Line 24: | Line 23: |
<https://pypi.python.org/pypi?%3Aaction=search&term=sagemath&submit=search>`_ | <https://pypi.org/search/?q=sagemath>`_ - `Sage-wiki page for SPKGs <https://wiki.sagemath.org/spkg>`_ |
Line 30: | Line 30: |
`SageManifolds <http://sagemanifolds.obspm.fr/>`_ ------------------------------------------------- by Pablo Angulo, Michał Bejger, Éric Gourgoulhon, Marco Mancini and Travis Scrimshaw cf. the metaticket `#18528 <http://trac.sagemath.org/ticket/18528>`_ |
|
Line 57: | Line 49: |
A Library of Number Theory Code that depends on Sage. |
|
Line 79: | Line 73: |
A Sage Library of Combinatorial Hopf algebras. |
|
Line 84: | Line 80: |
A semigroup (representation) theory library for SageMath. |
|
Line 86: | Line 84: |
`Automata and semigroups <https://www.irif.univ-paris-diderot.fr/~paperman/index.php?page=sage>`_ | `Automata and semigroups <https://paperman.name/soft/>`_ |
Line 146: | Line 144: |
(it is a subject of a GSoC 2016 project to port it to the current Sage) | (it is a subject of a GSoC 2016 project to `port it to Sage 7.4 <https://github.com/jsliacan/flagmatic>`_) |
Line 155: | Line 153: |
`infinite-group-relaxation-sage-code <https://github.com/mkoeppe/infinite-group-relaxation-code>`_ -------------------------------------------------------------------------------------------------- by C.Y. Hong, M. Köppe, and Y. Zhou Sage code for the Gomory-Johnson infinite group problem. `Carleman linearization of polynomial differential equations <https://github.com/mforets/carlin>`_ -------------------------------------------------------------------------------------------------- by Marcelo Forets `ore_algebra <https://github.com/mkauers/ore_algebra>`_ ------------------------------------------------------- by Manuel Kauers et al. A Sage implementation of Ore algebras and Ore polynomials. `ecfactory <https://github.com/scipr-lab/ecfactory>`_ ------------------------------------------------------- by http://www.scipr-lab.org/ The library implements algorithms to construct elliptic curves with certain desired properties. `cryptosage <https://github.com/sara62/cryptosage>`_ ------------------------------------------------------- by Sara Forouhar CryptoSage provides cryptography algorithms in SageMath. `cutgeneratingfunctionology <https://github.com/mkoeppe/cutgeneratingfunctionology>`_ -------------------------------------------------------------------------------------- by Matthias Koeppe and Yuan Zhou Python code for computation and experimentation with cut-generating functions. `multipolynomial-bases <https://github.com/VivianePons/multipolynomial-bases>`_ -------------------------------------------------------------------------------------- by Viviane Pons A Sage package to work on multipolynomials bases (Schubert, Grothendieck, Key). `Zeta <http://www.maths.nuigalway.ie/~rossmann/Zeta/>`_ ------------------------------------------------------- by Tobias Rossmann Zeta provides methods for computing local and topological zeta functions arising from the enumeration of subalgebras, ideals, submodules, representations, and conjugacy classes of suitable algebraic structures, as well as some other types of zeta functions. `Igusa and topological zeta <https://jviusos.github.io/sage.html>`_ -------------------------------------------------------------------- by Juan Viu-Sos Calculation Of The (Local) Igusa And Topological Zeta Functions Of A Non-Degenerated Polynomial With Respect To His Newton'S Polyhedron. `admcycles <https://gitlab.com/jo314schmitt/admcycles>`_ ---------------------------------------------------------- by Johannes Schmitt et alii admcycles is a SageMath module to compute with the tautological ring of the moduli spaces of complex curves. |
SageMath external packages
A tentative list of external packages for SageMath (spkg, pip-installable packages, etc).
- Feel free to add more packages, links, notes.
- Use this list to add examples to the Code Sharing Workflow wiki page.
- Note also Chris Swierczewski's Creating External Sage Packages.
- With the SageMath sample package you will find a minimal example of a Sage package.
See also
List of external packages
Modular Abelian Varities
by William Stein and Hao Chen
Links:
Python implementation of chebfun
by Chris Swierczewski
Purple Sage
by William Stein
A Library of Number Theory Code that depends on Sage.
Sébastien Labbé's research code
by Sébastien Labbé
See also this blog post
Notes:
- This is an spkg, rather than a standard pip-installable package.
- Version 0.1 contains modules on digital geometry, combinatorics on words and more.
- Version 0.2 provides modules on multidimensional continued fraction algorithms, matrix cocycles, languages and tikzpictures.
- Version 0.3 to be released will be pip-installable.
CHA
by Nicolas Borie
A Sage Library of Combinatorial Hopf algebras.
Sage-semigroups
by Nicolas M. Thiéry
A semigroup (representation) theory library for SageMath.
(very preliminary!!!)
Automata and semigroups
by Charles Paperman
ss-isogeny-software
by Luca De Feo
keywords: isogeny elliptic curve cryptography quantum
Abel Functions
by Chris Swierczewski
Discussion at https://groups.google.com/d/msg/sage-devel/29ndCD8z94k/K6H2OK5TAgAJ
Schottky uniformization
by Jeremy Upsal
Various ideas from Schottky uniformization are implemented in Sage. These now include the SK prime function and will later include the Riemann Theta function built from a RS via Schottky uniformization due to Darren Crowdy.
flatsurf: flat surfaces
by Vincent Delecroix and Samuel Lelièvre
sage-flatsurf: flat surfaces
by Vincent Delecroix and Pat Hooper
Lyapunov exponents for multidimensional continued fractions
by Vincent Delecroix and Sébastien Labbé
Links:
Sage train track
by Thierry Coulbois
Flagmatic
by Emil R. Vaughan
(it is a subject of a GSoC 2016 project to port it to Sage 7.4)
Chow
by Christoph Sorger and Manfred Lehn
A Sage library for computations in intersection theory.
infinite-group-relaxation-sage-code
by C.Y. Hong, M. Köppe, and Y. Zhou
Sage code for the Gomory-Johnson infinite group problem.
Carleman linearization of polynomial differential equations
by Marcelo Forets
ore_algebra
by Manuel Kauers et al.
A Sage implementation of Ore algebras and Ore polynomials.
ecfactory
The library implements algorithms to construct elliptic curves with certain desired properties.
cryptosage
by Sara Forouhar
CryptoSage provides cryptography algorithms in SageMath.
cutgeneratingfunctionology
by Matthias Koeppe and Yuan Zhou
Python code for computation and experimentation with cut-generating functions.
multipolynomial-bases
by Viviane Pons
A Sage package to work on multipolynomials bases (Schubert, Grothendieck, Key).
Zeta
by Tobias Rossmann
Zeta provides methods for computing local and topological zeta functions arising from the enumeration of subalgebras, ideals, submodules, representations, and conjugacy classes of suitable algebraic structures, as well as some other types of zeta functions.
Igusa and topological zeta
by Juan Viu-Sos
Calculation Of The (Local) Igusa And Topological Zeta Functions Of A Non-Degenerated Polynomial With Respect To His Newton'S Polyhedron.
admcycles
by Johannes Schmitt et alii
admcycles is a SageMath module to compute with the tautological ring of the moduli spaces of complex curves.