AbstractA generalization of the well-known unstable manifold theorem near hyperbolic equilibrium points of functional differential equations is formulated. The result says that the unstable manifold of the functional differential equation is close to its discretized counterpart if the stepsize of the discretization is sufficiently small
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractLet the equation x¨=f(t,x) be periodic in time, and let the equilibrium x∗≡0 be a periodic m...
International audienceOur purpose is to give a proof of the existence and smoothness of the invaria...
AbstractA generalization of the well-known unstable manifold theorem near hyperbolic equilibrium poi...
AbstractWe state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non-linear stochastic d...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
AbstractA classical result, studied, among others, by Carathéodory [C. Carathéodory, Calculus of Var...
Using numerical methods we study the hyperbolic manifolds in a model of a priori unstable dynamical ...
AbstractThe simplification resulting from reduction of dimension involved in the study of invariant ...
A new definition of the stability of ordinary differential equations is proposed as an alternative t...
stability of equilibrium manifolds, quadratic differential systems related riel Berke ty, Jer anuar ...
This paper considers invariant manifolds of global trajectories of retarded Functional Differential ...
We study dynamical and topological properties of the unstable manifold of isolated invariant compact...
ABSTRACT. We introduce a new technique for proving the classical Stable Manifold theorem for hyperbo...
Abstract. Unstable minimal surfaces are the unstable stationary points of the Dirichlet integral. In...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractLet the equation x¨=f(t,x) be periodic in time, and let the equilibrium x∗≡0 be a periodic m...
International audienceOur purpose is to give a proof of the existence and smoothness of the invaria...
AbstractA generalization of the well-known unstable manifold theorem near hyperbolic equilibrium poi...
AbstractWe state and prove a Local Stable Manifold Theorem (Theorem 4.1) for non-linear stochastic d...
We study polynomial expansions of local unstable manifolds attached to equilibrium solutions of para...
AbstractA classical result, studied, among others, by Carathéodory [C. Carathéodory, Calculus of Var...
Using numerical methods we study the hyperbolic manifolds in a model of a priori unstable dynamical ...
AbstractThe simplification resulting from reduction of dimension involved in the study of invariant ...
A new definition of the stability of ordinary differential equations is proposed as an alternative t...
stability of equilibrium manifolds, quadratic differential systems related riel Berke ty, Jer anuar ...
This paper considers invariant manifolds of global trajectories of retarded Functional Differential ...
We study dynamical and topological properties of the unstable manifold of isolated invariant compact...
ABSTRACT. We introduce a new technique for proving the classical Stable Manifold theorem for hyperbo...
Abstract. Unstable minimal surfaces are the unstable stationary points of the Dirichlet integral. In...
A class of nonlinear dissipative partial differential equations that possess finite dimensional attr...
AbstractLet the equation x¨=f(t,x) be periodic in time, and let the equilibrium x∗≡0 be a periodic m...
International audienceOur purpose is to give a proof of the existence and smoothness of the invaria...
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