2008
DOI: 10.3934/dcds.2008.21.415
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Non--autonomous and random attractors for delay random semilinear equations without uniqueness

Abstract: Abstract. We first prove the existence and uniqueness of pullback and random attractors for abstract multi-valued non-autonomous and random dynamical systems. The standard assumption of compactness of these systems can be replaced by the assumption of asymptotic compactness. Then, we apply the abstract theory to handle a random reaction-diffusion equation with memory or delay terms which can be considered on the complete past defined by R − . In particular, we do not assume the uniqueness of solutions of these… Show more

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Cited by 155 publications
(85 citation statements)
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“…The following lemma is concerning the properties for a random set, which will be needed in the following arguments. See [8,12,22].…”
Section: 2mentioning
confidence: 99%
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“…The following lemma is concerning the properties for a random set, which will be needed in the following arguments. See [8,12,22].…”
Section: 2mentioning
confidence: 99%
“…In general, the continuity and measurability of a solution of an SPDE in the initial space are easy to check, and therefore to derive a (measurable) random attractor in such a space we only need to look for the compact condition and the absorption property, which has been extensively studied ever since [14,15,37] first introduced the concept of random attractor. For example, we may refer to [8,9,10,19] for the autonomous case and [6,43,44,45,48] for the non-autonomous case. However, it is challenging to prove the continuity and measurability of solution of an SPDE in the corresponding regular spaces, see the statements in the introductions of the literature [7,8,31].…”
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confidence: 99%
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