AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that have inertial manifolds. This means that the long-time behavior is equivalent to a certain finite system of ordinary differential equations. We investigate ways in which these finite systems can be approximated in theC1sense. Geometrically this may be interpreted as constructing manifolds in phase space that areC1close to the inertial manifold of the partial differential equation. Under such approximations the invariant hyperbolic sets of the global attractor persist
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
AbstractThe existence of inertial manifolds for dissipative nonlinear evolutionary equationsunder ti...
AbstractIn many cases an inertial manifold 2M for an infinite dimensional dissipative dynamical syst...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
AbstractRecently, the theory of Inertial Manifolds has shown that the long time behavior (the dynami...
AbstractIn this paper we introduce the concept of an inertial manifold for nonlinear evolutionary eq...
Since one can rarely write down the analytical solutions to nonlinear dissipative partial differenti...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractIn a previous work, we established the existence of finite dimensional attractors for partly...
High- and infinite-dimensional nonlinear dynamical systems often exhibit complicated flow (spatiote...
In this article the numerical analysis of dissipative semilinear evolution equations with sectorial ...
AbstractThe concept of approximate inertial manifold is related to the study of the longtime behavio...
AbstractWe introduce the concept of a weakly, normally hyperbolic set for a system of ordinary diffe...
AbstractWe show that results concerning the persistence of invariant sets of ordinary differential e...
AbstractIn contrast with the existing theories of inertial manifolds, which are based on the self-ad...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
AbstractThe existence of inertial manifolds for dissipative nonlinear evolutionary equationsunder ti...
AbstractIn many cases an inertial manifold 2M for an infinite dimensional dissipative dynamical syst...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
AbstractRecently, the theory of Inertial Manifolds has shown that the long time behavior (the dynami...
AbstractIn this paper we introduce the concept of an inertial manifold for nonlinear evolutionary eq...
Since one can rarely write down the analytical solutions to nonlinear dissipative partial differenti...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractIn a previous work, we established the existence of finite dimensional attractors for partly...
High- and infinite-dimensional nonlinear dynamical systems often exhibit complicated flow (spatiote...
In this article the numerical analysis of dissipative semilinear evolution equations with sectorial ...
AbstractThe concept of approximate inertial manifold is related to the study of the longtime behavio...
AbstractWe introduce the concept of a weakly, normally hyperbolic set for a system of ordinary diffe...
AbstractWe show that results concerning the persistence of invariant sets of ordinary differential e...
AbstractIn contrast with the existing theories of inertial manifolds, which are based on the self-ad...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
AbstractThe existence of inertial manifolds for dissipative nonlinear evolutionary equationsunder ti...
AbstractIn many cases an inertial manifold 2M for an infinite dimensional dissipative dynamical syst...