Single-point blow-up for parabolic systems with exponential nonlinearities and unequal diffusivities
Abstract
We study positive blowing-up solutions of systems of the form: ut=δ1 u+epv, vt= δ2 v+equ, with δ1,δ2>0 and p, q>0. We prove single-point blow-up for large classes of radially decreasing solutions. This answers a question left open in a paper of Friedman and Giga~(1987), where the result was obtained only for the equidiffusive case δ1=δ2 and the proof depended crucially on this assumption.
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