Global existence for wave equations with scale-invariant time-dependent damping and time derivative nonlinearity

Abstract

This paper addresses the Cauchy problem for wave equations with scale-invariant time-dependent damping and nonlinear time-derivative terms, modeled as ∂t2u- u +μ1+t∂tu= f(∂tu), x∈ Rn, t>0, where f(∂tu)=|∂tu|p or |∂tu|p-1∂tu with p>1 and μ>0. We prove global existence of small data solutions in low dimensions 1≤ n≤ 3 by using energy estimates in appropriate Sobolev spaces. Our primary contribution is an existence result for p>1+2μ, in the one-dimensional case, when μ 2, which in conjunction with prior blow-up results from Our2, establish that the critical exponent for small data solutions in one dimension is pG(1,μ)=1+2μ, when μ 2. To the best of our knowledge, this is the first identification of the critical exponent range for the time-dependent damped wave equations with scale-invariant and time-derivative nonlinearity.