Scattering of solutions to the defocusing energy sub-critical semi-linear wave equation in 3D

Abstract

In this paper we consider a semi-linear, energy sub-critical, defocusing wave equation ∂t2 u - u = - |u|p -1 u in the 3-dimensional space with p ∈ [3,5). We prove that if initial data (u0, u1) are radial so that \|∇ u0\|L2 ( R3; dμ), \|u1\|L2 ( R3; dμ) ≤ ∞, where d μ = (|x|+1)1+2 with > 0, then the corresponding solution u must exist for all time t ∈ R and scatter. The key ingredients of the proof include a transformation T so that v = T u solves the equation vτ τ - y v = - (|y| |y|)p-1 e-(p-3)τ |v|p-1v with a finite energy, and a couple of global space-time integral estimates regarding a solution v as above.