Self-similar solutions of semilinear heat equations with positive speed
Abstract
We classify the smooth self-similar solutions of the semilinear heat equation ut= u+|u|p-1u in Rn× (0,T) satisfying an integral condition for all p>1 with positive speed. As a corollary, we prove that finite time blowing up solutions of this equation on a bounded convex domain with u(·,0)≥ 0 and ut(·,0)≥ 0 converges to a positive constant after rescaling at the blow-up point for all p>1.
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