The sharp estimate of the lifespan for the semilinear wave equation with time-dependent damping

Abstract

We consider the following semilinear wave equation with time-dependent damping. align NLDW \ arrayll ∂t2 u - u + b(t)∂t u = |u|p, & (t,x) ∈ [0,T) × Rn, \\ u(0,x)= u0(x), ut(0,x)= u1(x), & x ∈ Rn, array . align where n ∈ N, p>1, >0, and b(t) (t+1)-β with β ∈ [-1,1). It is known that small data blow-up occurs when 1<p< pF and, on the other hand, small data global existence holds when p>pF, where pF:=1+2/n is the Fujita exponent. The sharp estimate of the lifespan was well studied when 1<p< pF. In the critical case p=pF, the lower estimate of the lifespan was also investigated. Recently, Lai and Zhou obtained the sharp upper estimate of the lifespan when p=pF and b(t)=1. In the present paper, we give the sharp upper estimate of the lifespan when p=pF and b(t) (t+1)-β with β ∈ [-1,1) by the Lai--Zhou method.