This paper is devoted to the problem of finite-dimensional reduction for parabolic partial differential equations. We give a detailed exposition of the classical theory of inertial manifolds as well as various attempts to generalize it based on the so-called Mañé projection theorems. The recent counter-examples showing that the underlying dynamics may in a sense be infinite dimensional if the spectral gap condition is violated, as well as a discussion of the most important open problems, are also included
. In this paper finite dimensional invariant manifolds for nonlinear parabolic partial differential ...
We reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Zehnder. ...
AbstractRecently, the theory of Inertial Manifolds has shown that the long time behavior (the dynami...
An inertial manifold (IM) is one of the key objects in the modern theory of dissipative systems gene...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
AbstractIn contrast with the existing theories of inertial manifolds, which are based on the self-ad...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
AbstractThis work is devoted to the question of existence and convergence of inertial manifolds for ...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
AbstractIn many cases an inertial manifold 2M for an infinite dimensional dissipative dynamical syst...
Inertial manifolds associated with nonlinear plate models governed by dynamical von Karman equations...
. In this paper finite dimensional invariant manifolds for nonlinear parabolic partial differential ...
We reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Zehnder. ...
AbstractRecently, the theory of Inertial Manifolds has shown that the long time behavior (the dynami...
An inertial manifold (IM) is one of the key objects in the modern theory of dissipative systems gene...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
AbstractIn contrast with the existing theories of inertial manifolds, which are based on the self-ad...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
AbstractThis work is devoted to the question of existence and convergence of inertial manifolds for ...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
AbstractIn many cases an inertial manifold 2M for an infinite dimensional dissipative dynamical syst...
Inertial manifolds associated with nonlinear plate models governed by dynamical von Karman equations...
. In this paper finite dimensional invariant manifolds for nonlinear parabolic partial differential ...
We reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Zehnder. ...
AbstractRecently, the theory of Inertial Manifolds has shown that the long time behavior (the dynami...