The move from Fujita to Kato type exponent for a class of semilinear evolution equations with time-dependent damping

Abstract

In this paper, we derive suitable optimal Lp-Lq decay estimates, 1≤ p≤ 2≤ q≤ ∞, for the solutions to the σ-evolution equation, σ>1, with scale-invariant time-dependent damping and power nonlinearity~|u|p, \[ utt+(-)σ u + μ1+t ut= |u|p, \] where μ>0, p>1. The critical exponent p=pc for the global (in time) existence of small data solutions to the Cauchy problem is related to the long time behavior of solutions, which changes accordingly μ ∈ (0, 1) or μ>1. Under the assumption of small initial data in L1 L2, we find the critical exponent \[ pc=1+ \2σ[n-σ+σμ]+, 2σn \ =cases 1+ 2σ[n-σ+σμ]+, μ ∈ (0, 1)\\ 1+ 2σn, μ>1. cases \] For μ>1 it is well known as Fujita type exponent, whereas for μ ∈ (0, 1) one can read it as a shift of Kato exponent.