Blow-up of nonnegative solutions of an abstract semilinear heat equation with convex source

Abstract

We give a sufficient condition for non-existence of global nonnegative mild solutions of the Cauchy problem for the semilinear heat equation u' = Lu + f(u) in Lp(X,m) for p ∈ [1,∞), where (X,m) is a σ-finite measure space, L is the infinitesimal generator of a sub-Markovian strongly continuous semigroup of bounded linear operators in Lp(X,m), and f is a strictly increasing, convex, continuous function on [0,∞) with f(0) = 0 and ∫1∞ 1/f < ∞. Since we make no further assumptions on the behaviour of the diffusion, our main result can be seen as being about the competition between the diffusion represented by L and the reaction represented by f in a general setting. We apply our result to Laplacians on manifolds, graphs, and, more generally, metric measure spaces with a heat kernel. In the process, we recover and extend some older as well as recent results in a unified framework.