For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipschitz continuity of nonlinearity and the dissipativity of semiflows, there exist approximate inertial manifolds (AIM) in the energy space and that the approximate inertial manifolds are constructed as the graph of the steady-state determining mapping based on the spectral decomposition. It is also shown that the thickness of the exponentially attracting neighborhood of the AIM converges to zero at a fractional power rate as the dimension of the AIM increases. Applications of the obtained results to Burgers\u27 equation, higher dimensional reaction-diffusion equations, 2D Ginzburg-Landau equations, and axially symmetric Kuramoto-Sivashinsky equ...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
AbstractAn inertial manifold is constructed for the scalar reaction-diffusion equation ut = vuxx+ƒ(u...
Approximate solutions for an advection-diffusion problem, via a new modified Galerkin method Anca Ve...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
Abstract. A fairly general class of nonlinear evolution equations with a self-adjoint or non self-ad...
It is shown that a perturbation argument that guarantees persistence of inertial (invariant and expo...
AbstractIn this paper we introduce the concept of an inertial manifold for nonlinear evolutionary eq...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractA new method of construction of approximate inertial manifolds (AIMs) is derived for a very ...
AbstractThis work is devoted to the question of existence and convergence of inertial manifolds for ...
An inertial manifold (IM) is one of the key objects in the modern theory of dissipative systems gene...
This paper is devoted to the problem of finite-dimensional reduction for parabolic partial different...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
AbstractAn inertial manifold is constructed for the scalar reaction-diffusion equation ut = vuxx+ƒ(u...
Approximate solutions for an advection-diffusion problem, via a new modified Galerkin method Anca Ve...
For nonlinear parabolic evolution equations, it is proved that, under the assumptions of local Lipsc...
ABSTRACT. For nonlinear parabolic evolution equations, it is proved that, under the assumptions oflo...
Abstract. A fairly general class of nonlinear evolution equations with a self-adjoint or non self-ad...
It is shown that a perturbation argument that guarantees persistence of inertial (invariant and expo...
AbstractIn this paper we introduce the concept of an inertial manifold for nonlinear evolutionary eq...
AbstractIn this paper we study a class of nonlinear dissipative partial differential equations that ...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractA new method of construction of approximate inertial manifolds (AIMs) is derived for a very ...
AbstractThis work is devoted to the question of existence and convergence of inertial manifolds for ...
An inertial manifold (IM) is one of the key objects in the modern theory of dissipative systems gene...
This paper is devoted to the problem of finite-dimensional reduction for parabolic partial different...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
Abstract. This paper discusses two numerical schemes that can be used to approximate inertial manifo...
AbstractAn inertial manifold is constructed for the scalar reaction-diffusion equation ut = vuxx+ƒ(u...
Approximate solutions for an advection-diffusion problem, via a new modified Galerkin method Anca Ve...