Life-span of blowup solutions to semilinear wave equation with space-dependent critical damping

Abstract

This paper is concerned with the blowup phenomena for initial value problem of semilinear wave equation with critical space-dependent damping term (DW:V). The main result of the present paper is to give a solution of the problem and to provide a sharp estimate for lifespan for such a solution when NN-1<p≤ pS(N+V0), where pS(N) is the Strauss exponent for (DW:0). The main idea of the proof is due to the technique of test functions for (DW:0) originated by Zhou--Han (2014, MR3169791). Moreover, we find a new threshold value V0=(N-1)2N+1 for the coefficient of critical and singular damping |x|-1.