On blow-up rate for the H\'enon parabolic equation with Sobolev supercritical nonlinearity
Abstract
We discuss the H\'enon parabolic equation ∂t u = u + |x|σ up in a finite ball in RN under the Dirichlet boundary condition, where N1, p>1, and σ>0. We assume that the exponent p is supercritical in the Sobolev sense. Since the spatial potential term |x|σ vanishes at the origin, solutions seem less likely to blow up at the origin. We construct a solution that blows up at the origin and also carry out an analysis of blow-up rate of solutions. In particular, if p is less than the Joseph--Lundgren exponent, all blow-ups are shown to be of Type I. The lower bound corresponding to Type I rate is also shown for some particular blow-up solutions. As by products, we present a basic result on classification to threshold solutions for every p>1+σ/N.
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