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Longtime dynamics of a semilinear Lamé system

Published 7 Mar 2020 in math.AP | (2003.03646v2)

Abstract: This paper is concerned with longtime dynamics of semilinear Lam\'e systems $$ \partial2_t u - \mu \Delta u - (\lambda + \mu) \nabla {\rm div} u + \alpha \partial_t u + f(u) = 0, $$ defined in bounded domains of $\mathbb{R}3$ with Dirichlet boundary condition. Firstly, we establish the existence of finite dimensional global attractors subjected to critical forcings $f(u)$. Writing $\lambda + \mu$ as a positive parameter $\varepsilon$, we discuss some physical aspects of the limit case $\varepsilon \to 0$. Then, we show the upper-semicontinuity of attractors with respect to the parameter when $\varepsilon \to 0$. To our best knowledge, the analysis of attractors for dynamics of Lam\'e systems has not been studied before.

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