Behavior rigidity near non-isolated blow-up points for the semilinear heat equation

Abstract

We consider the semilinear heat equation with Sobolev subcritical power nonlinearity in dimension N=2, and u(x,t) a solution which blows up in finite time T. Given a non isolated blow-up point a, we assume that the Taylor expansion of the solution near (a,T) obeys some degenerate situation labeled by some even integer m(a) 4. If we have a sequence an a as n ∞, we show after a change of coordinates and the extraction of a subsequence that either an,1-a1 = o((an,2-a2)2) or |an,1-a1||an,2-a2|-β ||an,2-a2||-α L> 0 for some L>0, %up to extracting a subsequence still denoted the same, where α and β enjoy a finite number of rational values with β ∈(0,2] and L is a solution of a polynomial equation depending on the coefficients of the Taylor expansion of the solution. If m(a)=4, then α=0 and either β=3/2 or β =2.