Software for maps

Diffeomorphisms

BOV-method

Non-Public software for the computation of normally hyperbolic invariant manifolds in discrete dynamical systems.

CANDYS/QA

Computer Analysis of Nonlinear DYnamical Systems/Qualitative Analysis. A software package for numerical bifurcation analysis of dynamical systems.

CONTENT 1.3

CONTENT is designed to perform simulation, continuation, and normal form analysis of dynamical systems. The current version supports bifurcation analysis of ODE's, iterated maps, and evolution PDE's in the unit interval.

DsTool

DsTool is a toolkit for exploring dynamical systems. It can do simulation of diffeomorphisms and ODE's, find equilibria and compute their one-dimensional stable and unstable manifolds.

Dynamics

Dynamics is designed for the exploration of two-dimensional maps, both diffeomorphisms and noninvertible maps.

Dynamics Solver

Dynamics Solver is intended to solve initial and boundary-value problems for continuous and discrete dynamical systems. It is possible to draw phase-space portraits, Poincaré maps, Liapunov exponents, cobweb diagrams, histograms and bifurcation diagrams.

GAIO

GAIO is experimental software for the approximation of invariant sets and invariant measures in dynamical systems.

Global Manifolds 1D

Software for globalizing one-dimensional stable and unstable manifolds for maps. This upgraded version contains the method to find the stable manifold of a planar map without using the inverse.

Global Manifolds 2D

Non-Public software for globalizing two-dimensional stable and unstable manifolds for maps in R³.

Noninvertible maps

CANDYS/QA

Computer Analysis of Nonlinear DYnamical Systems/Qualitative Analysis. A software package for numerical bifurcation analysis of dynamical systems.

Dynamics

Dynamics is designed for the exploration of two-dimensional maps, both diffeomorphisms and noninvertible maps.

Global Manifolds 1D

Software for globalizing one-dimensional stable and unstable manifolds for maps. This upgraded version contains the method to find the stable manifold of a planar map without using the inverse.