Large global solutions for energy supercritical nonlinear wave equations on 3+1

Abstract

For the radial energy-supercritical nonlinear wave equation u = -utt + u = u7 on 3+1, we prove the existence of a class of global in forward time C∞-smooth solutions with infinite critical Sobolev norm H76(3)× H16(3). Moreover, these solutions are stable under suitably small perturbations . We also show that for the defocussing energy supercritical wave equation, we can construct such solutions which moreover satisfy the size condition \|u(0, ·)\|Lx∞(|x|≥ 1)>M for arbitrarily prescribed M>0. These solutions are stable under suitably small perturbations. Our method proceeds by regularization of self-similar solutions which are smooth away from the light-cone but singular on the light-cone. The argument crucially depends on the supercritical nature of the equation. Our approach should be seen as part of the program initiated in KrSchTat1, KrSchTat2, DoKri.