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-Uniform attractor and asymptotic smoothing effect of solutions for a nonautonomous micropolar fluid flow in 2D unbounded domains

✍ Scribed by Caidi Zhao; Shengfan Zhou; Xinze Lian

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
275 KB
Volume
9
Category
Article
ISSN
1468-1218

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✦ Synopsis

This paper discusses the long time behavior of solutions for a two-dimensional (2D) nonautonomous micropolar fluid flow in 2D unbounded domains in which the Poincaré inequality holds. We use the energy method to obtain the so-called asymptotic compactness of the family of processes associated with the fluid flow and establish the existence of H 1 -uniform attractor. Then we prove that an L 2 -uniform attractor belongs to the H 1 -uniform attractor, which implies the asymptotic smoothing effect for the fluid flow in the sense that the solutions become eventually more regular than the initial data.

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