We derive a numerical scheme to compute invariant manifolds for time-variant discrete dynamical systems, i.e., nonautonomous difference equations. Our universally applicable method is based on a truncated Lyapunov-Perron operator and computes invariant manifolds using a system of nonlinear algebraic equations which can be solved both locally using (nonsmooth) inexact Newton, and globally using continuation algorithms. Compared to other algorithms, our approach is quite flexible, since it captures time-dependent, nonsmooth, noninvertible or implicit equations and enables us to tackle the full hierarchy of strongly stable, stable and center-stable manifolds, as well as their unstable counterparts. Our results are illustrated using a test exam...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant ma...
AbstractFor autonomous difference equations with an invariant manifold, conditions are known which g...
We use a modification of the parameterization method to study invariant manifolds for difference equ...
We derive two numerical approximation schemes for local invariant manifolds of nonautonomous ordinar...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
There are many methods for computing stable and unstable manifolds in autonomous flows. When the flo...
This paper deals with the numerical computation of invariant manifolds using a method of discretizin...
We present the Constructive Methods of Invariant Manifolds for model reduction in physical and chemi...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
We present the Constructive Methods of Invariant Manifolds for model reduction in physical and chemi...
Nonautonomous dynamical systems provide a mathematical framework for temporally changing phenomena, ...
In this paper, we study stable invariant manifolds for a class of nonautonomous non-instantaneous im...
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...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant ma...
AbstractFor autonomous difference equations with an invariant manifold, conditions are known which g...
We use a modification of the parameterization method to study invariant manifolds for difference equ...
We derive two numerical approximation schemes for local invariant manifolds of nonautonomous ordinar...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
There are many methods for computing stable and unstable manifolds in autonomous flows. When the flo...
This paper deals with the numerical computation of invariant manifolds using a method of discretizin...
We present the Constructive Methods of Invariant Manifolds for model reduction in physical and chemi...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
We present the Constructive Methods of Invariant Manifolds for model reduction in physical and chemi...
Nonautonomous dynamical systems provide a mathematical framework for temporally changing phenomena, ...
In this paper, we study stable invariant manifolds for a class of nonautonomous non-instantaneous im...
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...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
An effcient algorithm is developed for the numerical computation of normally hyperbolic invariant ma...
AbstractFor autonomous difference equations with an invariant manifold, conditions are known which g...