A new definition of the stability of ordinary differential equations is proposed as an alternative to structural stability. It is particularly aimed at dissipative nonlinear systems, including those with chaos or strange attractors. The definition is as follows. Given a vector field v on an oriented manifold X, and given epsilon > 0, let u be the steady state of the Fokker-Planck equation for v with epsilon-diffusion. The existence, uniqueness and global attraction of v is proved in the case when Xis compact (in the non-compact case a suitable boundary condition on v is required for the existence of U). Vector fields are defined to be equivalent, or stable, according to whether their steady states are. A similar theory is developed for ...
[[abstract]]This paper deals with reaction-diffusion systems with skew-gradient structure. In connec...
AbstractChaotic motions of non-linear dynamical systems are decomposed into mean components and fluc...
AbstractA local stability theorem, an analog of the Hartman-Grobman Theorem, is formulated and prove...
In the thesis we analyse qualitative properties of dynamical systems near equilibria. We mainly deal...
Two fundamental problems in the qualitative theory of ordinary differential equations dynamical syst...
The goal of this investigation was to derive strictly new properties of chaotic systems and their mu...
The objective in these notes is to present an approach to dynamical systems in infinite dimensions. ...
The goal of this thesis was to examine global behaviour of solutions of a particular non-linear syst...
The main purpose of developing stability theory is to examine dynamic responses of a system to distu...
Abstract. In this paper we consider a set of vector fields over the torus for which we can associate...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
We study the stability of attractors under non-autonomous perturbations that are uniformly small in ...
This is a graduate text in differentiable dynamical systems. It focuses on structural stability and ...
The objective of the theory of stability of motion is to establish signs that make it possible to ju...
AbstractWe give a condition which implies that the trivial solution, U ≡ 0, of a class of reaction-d...
[[abstract]]This paper deals with reaction-diffusion systems with skew-gradient structure. In connec...
AbstractChaotic motions of non-linear dynamical systems are decomposed into mean components and fluc...
AbstractA local stability theorem, an analog of the Hartman-Grobman Theorem, is formulated and prove...
In the thesis we analyse qualitative properties of dynamical systems near equilibria. We mainly deal...
Two fundamental problems in the qualitative theory of ordinary differential equations dynamical syst...
The goal of this investigation was to derive strictly new properties of chaotic systems and their mu...
The objective in these notes is to present an approach to dynamical systems in infinite dimensions. ...
The goal of this thesis was to examine global behaviour of solutions of a particular non-linear syst...
The main purpose of developing stability theory is to examine dynamic responses of a system to distu...
Abstract. In this paper we consider a set of vector fields over the torus for which we can associate...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
We study the stability of attractors under non-autonomous perturbations that are uniformly small in ...
This is a graduate text in differentiable dynamical systems. It focuses on structural stability and ...
The objective of the theory of stability of motion is to establish signs that make it possible to ju...
AbstractWe give a condition which implies that the trivial solution, U ≡ 0, of a class of reaction-d...
[[abstract]]This paper deals with reaction-diffusion systems with skew-gradient structure. In connec...
AbstractChaotic motions of non-linear dynamical systems are decomposed into mean components and fluc...
AbstractA local stability theorem, an analog of the Hartman-Grobman Theorem, is formulated and prove...