On the set of non radiative solutions for the energy critical wave equation

Abstract

Non radiative solutions of the energy critical non linear wave equation are global solutions u that furthermore have vanishing asymptotic energy outside the lightcone at both t ∞:\[ t ∞ \| ∇t,x u(t) \|L2(|x| |t|+R) = 0, \]for some R \> 0. They were shown to play an important role in the analysis of long time dynamics of solutions, in particular regarding the soliton resolution: we refer to the seminal works of Duyckaerts, Kenig and Merle, see DKM:23 and the references therein.We show that the set of non radiative solutions which are small in the energy space is a manifold whose tangent space at 0 is given by non radiative solutions to the linear equation (described in CL24). We also construct nonlinear solutions with an arbitrary prescribed radiation field.