Critical norm blow-up for the energy supercritical nonlinear heat equation

Abstract

We address the critical norm blow-up problem for the nonlinear heat equation ut- u=|u|p-1u in Rn×(0,T). In the supercritical range p>(n+2)/(n-2), we prove that if the maximal existence time T is finite, then t T\|u(·,t)\|Ln(p-1)/2(Rn) =∞ without assuming extra conditions such as radial symmetry or the type of blow-up.

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