An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant manifolds, based on the graph transform and Newton's method. It fits in the perturbation theory of discrete dynamical systems and therefore allows application to the setting of continuation. A convergence proof is included. The scope of application is not restricted to hyperbolic attractors, but extends to normally hyperbolic manifolds of saddle type. It also computes stable and unstable manifolds. The method is robust and needs only little specification of the dynamics, which makes it applicable to e.g. Poincaré maps. Its performance is illustrated on examples in 2D and 3D, where a numerical discussion is included
We describe a method for finding periodic orbits contained in a hyperbolic invariant set and of cons...
We present an efficient numerical method for computing Fourier-Taylor expansions of (un)stable manif...
The present work deals with numerical methods for computing slow stable invariant manifolds as well ...
An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant ma...
This paper deals with the numerical continuation of invariant manifolds regardless of the restricted...
This paper deals with the numerical computation of invariant manifolds using a method of discretizin...
Abstract. This paper deals with the numerical continuation of invariant manifolds, regardless of the...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
Algorithms for computing stable manifolds of hyperbolic stationary solutions of autonomous systems a...
We describe a method for finding periodic orbits contained in a hyperbolic invariant set and of cons...
We describe a method for finding periodic orbits contained in a hyperbolic invariant set and of cons...
We present an efficient numerical method for computing Fourier-Taylor expansions of (un)stable manif...
The present work deals with numerical methods for computing slow stable invariant manifolds as well ...
An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant ma...
This paper deals with the numerical continuation of invariant manifolds regardless of the restricted...
This paper deals with the numerical computation of invariant manifolds using a method of discretizin...
Abstract. This paper deals with the numerical continuation of invariant manifolds, regardless of the...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
This paper deals with the numerical continuation of invariant manifolds, regardless of the restricte...
Algorithms for computing stable manifolds of hyperbolic stationary solutions of autonomous systems a...
We describe a method for finding periodic orbits contained in a hyperbolic invariant set and of cons...
We describe a method for finding periodic orbits contained in a hyperbolic invariant set and of cons...
We present an efficient numerical method for computing Fourier-Taylor expansions of (un)stable manif...
The present work deals with numerical methods for computing slow stable invariant manifolds as well ...