Decay properties and asymptotic behaviors for a wave equation with general strong damping

Abstract

In this paper, we study the Cauchy problem for a wave equation with general strong damping -μ(|D|) ut motivated by [Tao, Anal. PDE (2009)] and [Ebert-Girardi-Reissig, Math. Ann. (2020)]. By employing energy methods in the Fourier space and WKB analysis, we derive decay estimates for solutions under a large class of μ(|D|). In particularly, a threshold ||∞μ(||)=∞ is discovered for the regularity-loss phenomenon, where μ(||) denotes the symbol of μ(|D|). Furthermore, we investigate different asymptotic profiles of solution with additionally L1 initial data, where some refined estimates in the sense of enhanced decay rate and reduced regularity are found. The derived results almost cover the known results with sufficiently small loss.

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