Lp-Lq estimates for the damped wave equation and the critical exponent for the nonlinear problem with slowly decaying data

Abstract

We study the Cauchy problem of the damped wave equation align* ∂t2 u - u + ∂t u = 0 align* and give sharp Lp-Lq estimates of the solution for 1 q p < ∞\ (p≠ 1) with derivative loss. This is an improvement of the so-called Matsumura estimates. Moreover, as its application, we consider the nonlinear problem with initial data in (Hs Hrβ) × (Hs-1 Lr) with r ∈ (1,2], s 0, and β = (n-1)|12-1r|, and prove the local and global existence of solutions. In particular, we prove the existence of the global solution with small initial data for the critical nonlinearity with the power 1+2rn, while it is known that the critical power 1+2n belongs to the blow-up region when r=1. We also discuss the asymptotic behavior of the global solution in supercritical cases. Moreover, we present blow-up results in subcritical cases. We give estimates of lifespan and blow-up rates by an ODE argument.