Self-similar blow-up profiles for a reaction-diffusion equation with strong weighted reaction

Abstract

We study the self-similar blow-up profiles associated to the following second order reaction-diffusion equation with strong weighted reaction and unbounded weight: ∂tu=∂xx(um) + |x|σup, posed for x∈, t≥0, where m>1, 0<p<1 and σ>2(1-p)/(m-1). As a first outcome, we show that finite time blow-up solutions in self-similar form exist for m+p>2 and σ in the considered range, a fact that is completely new: in the already studied reaction-diffusion equation without weights there is no finite time blow-up when p<1. We moreover prove that, if the condition m+p>2 is fulfilled, all the self-similar blow-up profiles are compactly supported and there exist two different interface behaviors for solutions of the equation, corresponding to two different interface equations. We classify the self-similar blow-up profiles having both types of interfaces and show that in some cases global blow-up occurs, and in some other cases finite time blow-up occurs only at space infinity. We also show that there is no self-similar solution if m+p<2, while the critical range m+p=2 with σ>2 is postponed to a different work due to significant technical differences.