A nonlinear diffusion equation with reaction localized to the half-line

Abstract

We study the behaviour of the solutions to the quasilinear heat equation with a reaction restricted to a half-line ut=(um)xx+a(x) up, m, p>0 and a(x)=1 for x>0, a(x)=0 for x<0. We first characterize the global existence exponent p0=1 and the Fujita exponent pc=m+2. Then we pass to study the grow-up rate in the case p1 and the blow-up rate for p>1. In particular we show that the grow-up rate is different as for global reaction if p>m or p=1≠ m.