Blow up of solutions for semilinear wave equations with noneffective damping

Abstract

In this paper, we study the finite-time blow up of solutions to the following semilinear wave equation with time-dependent damping \[ ∂t2u- u+μ1+t∂tu=|u|p \] in R+×Rn. More precisely, for 0≤μ≤ 2,μ ≠1 and n≥ 2, there is no global solution for 1<p<pS(n+μ), where pS(k) is the k-dimensional Strauss exponent and a life-span of the blow up solution will be obtained. Our work is an extension of IS, where the authors proved a similar blow up result with a larger range of μ. However, we obtain a better life-span estimate when μ∈(0,1)(1,2) by using a different method.