The blow-up rate for a non-scaling invariant semilinear heat equation

Abstract

We consider the semilinear heat equation ∂t u - u =f(u), (x,t)∈ RN× [0,T), (1) with f(u)=|u|p-1ua (2+u2), where p>1 is Sobolev subcritical and a∈ R. We first show an upper bound for any blow-up solution of (1). Then, using this estimate and the logarithmic property, we prove that the exact blow-up rate of any singular solution of (1) is given by the ODE solution associated with (1), namely u' =|u|p-1ua (2+u2). In other terms, all blow-up solutions in the Sobolev subcritical range are Type I solutions. Up to our knowledge, this is the first determination of the blow-up rate for a semilinear heat equation where the main nonlinear term is not homogeneous.