On the critical exponent and sharp lifespan estimates for semilinear damped wave equations with data from Sobolev spaces of negative order

Abstract

We study semilinear damped wave equations with power nonlinearity |u|p and initial data belonging to Sobolev spaces of negative order H-γ. In the present paper, we obtain a new critical exponent p=pcrit(n,γ):=1+4n+2γ for some γ∈(0,n2) and low dimensions in the framework of Soblev spaces of negative order. Precisely, global (in time) existence of small data Sobolev solutions of lower regularity is proved for p>pcrit(n,γ), and blow-up of weak solutions in finite time even for small data if 1<p<pcrit(n,γ). Furthermore, in order to more accurately describe the blow-up time, we investigate sharp upper bound and lower bound estimates for the lifespan in the subcritical case.