Grow-up for a quasilinear heat equation with a localized reaction

Abstract

We study the behaviour of global solutions to the quasilinear heat equation with a reaction localized ut=(um)xx+a(x) up, m, p>0 and a(x) being the characteristic function of an interval. we prove that there exists p0=\1,m+12\ such that all global solution are bounded if p>p0, while for p p0 all the solution are global and unbounded. In the last case, we prove that if p<m the grow-up rate is different to the one obtained when a(x)1, while if p>m the grow-up rate coincides with that rate, but only inside the support of a; outside the interval the rate is smaller.