Solutions with prescribed local blow-up surface for the nonlinear wave equation

Abstract

We prove that any sufficiently differentiable space-like hypersurface of R1+N coincides locally around any of its points with the blow-up surface of a finite-energy solution of the focusing nonlinear wave equation ∂tt u - u=|u|p-1 u on R × R N, for any 1≤ N≤ 4 and 1 < p N+2 N-2. We follow the strategy developed in our previous work [arXiv 1812.03949] on the construction of solutions of the nonlinear wave equation blowing up at any prescribed compact set. Here to prove blowup on a local space-like hypersurface, we first apply a change of variable to reduce the problem to blowup on a small ball at t=0 for a transformed equation. The construction of an appropriate approximate solution is then combined with an energy method for the existence of a solution of the transformed problem that blows up at t=0. To obtain a finite-energy solution of the original problem from trace arguments, we need to work with H2× H1 solutions for the transformed problem.