The article presents a new scheme for studying the dynamics of a quintic wave equation with nonlocal weak damping in a 3D smooth bounded domain. The key highlights and insights are:
The authors establish the global well-posedness and dissipativity of the Shatah-Struwe (S-S) solutions for the quintic wave equation with nonlocal weak damping.
They introduce the concept of evolutionary systems to study the asymptotic dynamics of the S-S solutions and prove the existence and structure of the weak global attractor.
The authors investigate the backward asymptotic regularity of complete trajectories within the closure of the evolutionary system, which is crucial for establishing the asymptotic compactness of the S-S solutions.
Using the backward regularity and an energy method combined with a decomposition technique, the authors demonstrate the existence of a strongly compact global attractor.
Furthermore, the authors prove the existence of an exponential attractor for the strong solution semigroup and establish the higher regularity and finite fractal dimension of the global attractor.
The article provides a comprehensive analysis of the well-posedness and long-term dynamics of the quintic wave equation with nonlocal weak damping, addressing several challenges posed by the critical nonlinearity and the nonlocal damping term.
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arxiv.org
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