On blowup for the supercritical quadratic wave equation

Abstract

We study singularity formation for the focusing quadratic wave equation in the energy supercritical case, i.e., for d ≥ 7. We find in closed form a new, non-trivial, radial, self-similar blowup solution u* which exists for all d ≥ 7. For d=9, we study the stability of u* without any symmetry assumptions on the initial data and show that there is a family of perturbations which lead to blowup via u*. In similarity coordinates, this family represents a co-dimension one Lipschitz manifold modulo translation symmetries. In addition, in d=7 and d=9, we prove non-radial stability of the well-known ODE blowup solution. Also, for the first time we establish persistence of regularity for the wave equation in similarity coordinates.