Dispersive estimates for wave-type equations with time-dependent damping

Abstract

In this paper, we study the Cauchy problem for a class of semilinear evolution equations with scale-invariant time-dependent dissipation equation* cases utt + Lw2u + μ1+tut = Δθ f(u), & t>0,\ x∈Rn,\\ u(0,x) = 0, ut(0,x) = u1(x), & x∈Rn, cases equation* where μ>0, f(u)=|u|α with α>1, θ∈\0,1\, and the operator Lw2 is defined on the Fourier transform by multiplication by w(ξ)2. We prove the global (in time) existence of small data solutions for α>αcrit, where the critical exponent αcrit depends on the choice of the operator Lw2, the parameter μ, and the nonlinear term. In particular, we consider two model cases. For Boussinesq-type operators with w(ξ)=|ξ|2+|ξ|4, combined with the derivative-type nonlinearity Δ|u|α, we obtain a Strauss-type critical exponent. On the other hand, for plate-type operators with w(ξ)=|ξ|σ, σ≥2, and power-type nonlinearity |u|α, the critical exponent is of Fujita type.