Exterior scattering of non-radial solutions to energy subcritical wave equations

Abstract

We consider the defocusing, energy subcritical wave equation ∂t2 u - u = -|u|p-1 u in dimension d ∈ \3,4,5\ and prove the exterior scattering of solutions if 3≤ d ≤ 5 and 1+6/d<p<1+4/(d-2). More precisely, given any solution with a finite energy, there exists a solution uL to the homogeneous linear wave equation, so that the following limit holds \[ t→ +∞ ∫|x|>t+R |∇x,t u(x,t)- ∇x,t uL(x,t)|2 dx = 0 \] for any fixed real number R. This generalize the previously known exterior scattering result in the radial case.