Dynamics on surfaces
Project description
The surface_dynamics package for SageMath adds functionality related to interval exchange transformations, translation surfaces, mapping classes and more. It is distributed as an external Python package. It installs on top of an existing Sage installation (tested on versions 8.0, 8.1 and 8.2).
This package is based on SageMath and relies heavily on:
gmp or mpir for arbitrary precision arithmetic
PARI/GP for number field computations
GAP for finite groups representation and permutation groups
PPL (Parma Polyhedra Library) and LattE (Lattice point Enumeration) for polytope computations
Prerequisites
Installing surface_dynamics requires a working Sage installation (with Cython and gcc). It is also recommanded to install the optional SageMath packages gap_packages, database_gap and latte_int.
Installation
The module is distributed on PyPI. You just need to run the following command:
$ sage -pip install surface_dynamics [--user]
The –user option is optional and allows to install the module in your user space (and does not require administrator rights).
Documentation
short tutorial: http://www.labri.fr/perso/vdelecro/flatsurf.html
complete module documentation: http://www.labri.fr/perso/vdelecro/surface-dynamics/
Check
After installing surface_dynamics, check that it works by launching Sage and typing the following commands. You should get the same output as below.:
sage: from surface_dynamics.all import * sage: o = Origami('(1,2)','(1,3)') sage: o (1,2)(3) (1,3)(2) sage: o.sum_of_lyapunov_exponents() 4/3 sage: o.lyapunov_exponents_approx() # abs tol 0.05 [0.33441823619678734] sage: o.veech_group() Arithmetic subgroup with permutations of right cosets S2=(2,3) S3=(1,2,3) L=(1,2) R=(1,3) sage: q = QuadraticStratum(1,1,1,1) sage: q.orientation_cover() H_5(2^4) sage: q.components() [Q_2(1^4)^hyp] sage: c = q.components()[0] sage: c Q_2(1^4)^hyp sage: c.orientation_cover_component() H_5(2^4)^odd sage: AbelianStrata(genus=3).list() [H_3(4), H_3(3, 1), H_3(2^2), H_3(2, 1^2), H_3(1^4)] sage: O = OrigamiDatabase() sage: q = O.query(("stratum","=",AbelianStratum(2)), ("nb_squares","=",5)) sage: q.number_of() 2 sage: for o in q: ....: print("%s\n- - - - - - - -" % o) (1)(2)(3)(4,5) (1,2,3,4)(5) - - - - - - - - (1)(2)(3,4,5) (1,2,3)(4)(5) - - - - - - - - sage: Q12_reg = QuadraticStratum(12).regular_component() sage: Q12_reg.lyapunov_exponents_H_plus(nb_iterations=2**20) # abs tol 0.05 [0.6634, 0.4496, 0.2305, 0.0871] sage: Q12_reg.lyapunov_exponents_H_minus(nb_iterations=2**20) # abs tol 0.05 [1.0000, 0.3087, 0.1192]
Installing development version. Source code
The development webpage is https://github.com/videlec/flatsurf-package
Assuming you have the program git on your computer, you can install the development version with the command:
$ sage -pip install git+https://github.com/videlec/flatsurf-package [--user]
Contact
Your comments and help are welcome: vincent.delecroix@labri.fr For problems with Mac OS X: samuel.lelievre@gmail.com
Versions
flatsurf 0.4.0 was released on 2018-05-14 (as a Python package on PyPI)
flatsurf 0.3 was released on 2017-08-11 (as a Python package on PyPI)
flatsurf 0.2 was released on 2015-11-15 (as a Sage spkg).
flatsurf 0.1 was released on 2015-07-30 (as a Sage spkg).
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