Asymptotic profile of solutions for semilinear wave equations with structural damping

Abstract

This paper is concerned with the initial value problem for semilinear wave equation with structural damping utt+(-)σut - u =f(u), where σ ∈ (0,12) and f(u) |u|p or u |u|p-1 with p> 1 + 2/(n - 2 σ). We first show the global existence for initial data small in some weighted Sobolev spaces on Rn (n 2). Next, we show that the asymptotic profile of the solution above is given by a constant multiple of the fundamental solution of the corresponding parabolic equation, provided the initial data belong to weighted L1 spaces.