Abstract
We study the existence of solutions for the equation $u_{tt}-\Delta_{p(x)} u - \Delta u_{t} + g(u) = f(x,t), \; x \in \Omega$ (bounded) $ \subset \mathbb R^n, \; t>0$ in both the isotropic case $(p(x) \equiv p$, a constant) and the anisotropic case $(p(x)$ a measurable function). Furthermore, in the isotropic case we obtain results concerning the asymptotic behavior of solutions. Since uniqueness for this type of problem seems rather difficult, a method implementing generalized semiflows is being used to prove the existence of a global attractor in the phase space $W_0^{1,p}(\Omega)\times L^2(\Omega)$, when $p\geq n$.
Citation
Nikolaos M. Stavrakakis. Athanasios N. Stylianou. "Global attractor for some wave equations of $p-$ and $p(x)-$Laplacian type." Differential Integral Equations 24 (1/2) 159 - 176, January/February 2011. https://doi.org/10.57262/die/1356019049
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