Sufficient and necessary criteria for existence of pullback attractors for non-compact random dynamical systems

We study pullback attractors of non-autonomous non-compact dynamical systems generated by differential equations with non-autonomous deterministic as well as stochastic forcing terms. We first introduce the concepts of pullback attractors and asymptotic compactness for such systems. We then prove a...

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Bibliographic Details
Published in:Journal of Differential Equations 2012-09, Vol.253 (5), p.1544-1583
Main Author: Wang, Bixiang
Format: Article
Language:English
Subjects:
Periodic random attractor
Pullback attractor
Random complete solution
Unbounded domain
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Summary:We study pullback attractors of non-autonomous non-compact dynamical systems generated by differential equations with non-autonomous deterministic as well as stochastic forcing terms. We first introduce the concepts of pullback attractors and asymptotic compactness for such systems. We then prove a sufficient and necessary condition for existence of pullback attractors. We also introduce the concept of complete orbits for this sort of systems and use these special solutions to characterize the structures of pullback attractors. For random systems containing periodic deterministic forcing terms, we show the pullback attractors are also periodic under certain conditions. As an application of the abstract theory, we prove the existence of a unique pullback attractor for Reaction–Diffusion equations on Rn with both deterministic and random external terms. Since Sobolev embeddings are not compact on unbounded domains, the uniform estimates on the tails of solutions are employed to establish the asymptotic compactness of solutions.
ISSN:0022-0396
1090-2732
DOI:10.1016/j.jde.2012.05.015