Global existence for small amplitude semilinear wave equations with time-dependent scale-invariant damping

Abstract

In this paper we prove a sharp global existence result for semilinear wave equations with time-dependent scale-invariant damping terms if the initial data is small. More specifically, we consider Cauchy problem of ∂t2u- u+μt∂tu=|u|p, where n 3, t 1 and μ∈(0,1)(1,2). For critical exponent pcrit(n,μ) which is the positive root of (n+μ-1)p2-(n+μ+1)p-2=0 and conformal exponent pconf(n,μ)=n+μ+3n+μ-1, we establish global existence for n≥3 and pcrit(n,μ)<p≤ pconf(n,μ). The proof is based on changing the wave equation into the semilinear generalized Tricomi equation ∂t2u-tm u=tα(m)|u|p, where m=m(μ)>0 and α(m)∈ R are two suitable constants, then we investigate more general semilinear Tricomi equation ∂t2v-tm v=tα|v|p and establish related weighted Strichartz estimates. Returning to the original wave equation, the corresponding global existence results on the small data solution u can be obtained.