Existence of blow-up self-similar solutions for the supercritical quasilinear reaction-diffusion equation

Abstract

We establish the existence of self-similar solutions presenting finite time blow-up to the quasilinear reaction-diffusion equation ut= um + up, posed in dimension N≥3, m>1. More precisely, we show that there is always at least one solution in backward self-similar form if p>ps=m(N+2)/(N-2). In particular, this establishes non-optimality of the Lepin critical exponent introduced in Le90 in the semilinear case m=1 and extended for m>1 in GV97, GV02, for the existence of self-similar blow-up solutions. We also prove that there are multiple solutions in the same range, provided N is sufficiently large. This is in strong contrast with the semilinear case, where the Lepin critical exponent has been proved to be optimal.