Dynamics near the ground state for the energy critical nonlinear heat equation in large dimensions

Abstract

We consider the energy critical semilinear heat equation ∂tu= u+|u|4d-2u, \ \ x∈ Rd and give a complete classification of the flow near the ground state solitary wave Q(x)=1( 1+|x|2d(d-2))d-22 in dimension d 7, in the energy critical topology and without radial symmetry assumption. Given an initial data Q+0 with ∇ 0L2 1, the solution either blows up in the ODE type I regime, or dissipates, and these two open sets are separated by a codimension one set of solutions asymptotically attracted by the solitary wave. In particular, non self similar type II blow up is ruled out in dimension d 7 near the solitary wave even though it is known to occur in smaller dimensions. Our proof is based on sole energy estimates deeply and draws a route map for the classification of the flow near the solitary wave in the energy critical setting. A by-product of our method is the classification of minimal elements around Q belonging to the unstable manifold.