Existence of a Stable Blow-up profile for the nonlinear heat equation with a critical power nonlinear gradient term

Abstract

We consider the nonlinear heat equation with a nonlinear gradient term: ∂t u = u+μ|∇ u|q+|u|p-1u,\; μ>0,\; q=2p/(p+1),\; p>3,\; t∈ (0,T),\; x∈ N. We construct a solution which blows up in finite time T>0. We also give a sharp description of its blow-up profile and show that it is stable with respect to perturbations in initial data. The proof relies on the reduction of the problem to a finite dimensional one, and uses the index theory to conclude. The blow-up profile does not scale as (T-t)1/2|(T-t)|1/2, like in the standard nonlinear heat equation, i.e. μ=0, but as (T-t)1/2|(T-t)|β with β=(p+1)/[2(p-1)]>1/2. We also show that u and ∇ u blow up simultaneously and at a single point, and give the final profile. In particular, the final profile is more singular than the case of the standard nonlinear heat equation.