Smooth stable and unstable manifolds for stochastic partial differential
  equations

B. Schmalfuß; B. Schmalfuß; Bj�rn Schmalfuss; C. Castaing; D. Henry; D. Ruelle; G. Da Prato; G. Da Prato; H. Kunita; J. Hadamard; Jinqiao Duan; Kening Lu; L. Arnold; O. Perron; S-N. Chow; S.-E.A. Mohammed; T. Caraballo; T. V. Girya; T. Wanner

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Smooth stable and unstable manifolds for stochastic partial differential equations

Authors: B. Schmalfuß
B. Schmalfuß
Bj�rn Schmalfuss
C. Castaing
D. Henry
D. Ruelle
G. Da Prato
G. Da Prato
H. Kunita
J. Hadamard
Jinqiao Duan
Kening Lu
L. Arnold
O. Perron
S-N. Chow
S.-E.A. Mohammed
T. Caraballo
T. V. Girya
T. Wanner
Publication date: 24 September 2004
Publisher: 'Springer Science and Business Media LLC'
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Abstract

Invariant manifolds are fundamental tools for describing and understanding nonlinear dynamics. In this paper, we present a theory of stable and unstable manifolds for infinite dimensional random dynamical systems generated by a class of stochastic partial differential equations. We first show the existence of Lipschitz continuous stable and unstable manifolds by the Lyapunov-Perron's method. Then, we prove the smoothness of these invariant manifolds

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