Non radial type II blow up for the energy supercritical semilinear heat equation

Abstract

We consider the semilinear heat equation in large dimension d≥ 11 ∂t u = u+|u| p-1u, \ \ p=2q+1, \ \ q∈ N on a smooth bounded domain ⊂ Rd with Dirichlet boundary condition. In the supercritical range p≥ p(d)>1+4d-2 we prove the existence of a countable family (u) ∈ N of solutions blowing-up at time T>0 with type II blow up: u(t) L∞ C (T-t)-c with blow-up speed c>1p-1. They concentrate the ground state Q being the only radially and decaying solution of Q+Qp=0: u(x,t) 1λ (t)2p-1Q(x-x0λ (t) ), \ λ C(un)(T-t)c(p-1)2 at some point x0∈ . The result generalizes previous works on the existence of type II blow-up solutions, which only existed in the radial setting. The present proof uses robust nonlinear analysis tools instead, based on energy methods and modulation techniques. This is the first non-radial construction of a solution blowing up by concentration of a stationary state in the supercritical regime, and provides a general strategy to prove similar results for dispersive equations or parabolic systems and to extend it to multiple blow ups.