On the existence and nonexistence of global solutions of the semilinear heat equation

Abstract

We consider the semilinear heat equation ut- u=|u|p-1u,\ \ (t,x)∈R+×Rn. The well-known difficulty with this problem is that the potential well method cannot be applied directly, due to the scaling invariance which leads to a potential well of zero depth. We employ the forward similarity transform to convert the equation into a new parabolic equation, so that we can apply the potential well method in weighted Sobolev spaces. As a result, we obtain a new criterion that establishes whether solutions to the heat equation blow up in finite time or exist globally. This work extends the partial results of Ikehata et al. (Ann. Inst. H. Poincar\'e Anal. Non Lin\'eaire, 27 (2010) 877-900) from critical Sobolev exponent to the case pF<p<pS, where pF=1+2/n is the Fujita exponent and pS=(n+2)/(n-2) (for n3) is the critical Sobolev exponent.