Solutions blowing up on any given compact set for the energy subcritical wave equation

Abstract

We consider the focusing energy subcritical nonlinear wave equation ∂tt u - u= |u|p-1 u in RN, N 1. Given any compact set E ⊂ RN , we construct finite energy solutions which blow up at t=0 exactly on E. The construction is based on an appropriate ansatz. The initial ansatz is simply U0(t,x) = (t + A(x) ) - 2 p-1 , where A 0 vanishes exactly on E, which is a solution of the ODE h'' = hp. We refine this first ansatz inductively using only ODE techniques and taking advantage of the fact that (for suitably chosen A), space derivatives are negligible with respect to time derivatives. We complete the proof by an energy argument and a compactness method.