A particle system with explosions: law of large numbers for the density of particles and the blow-up time

Abstract

Consider a system of independent random walks in the discrete torus with creation-annihilation of particles and possible explosion of the total number of particles in finite time. Rescaling space and rates for diffusion/creation/annihilation of particles, we obtain a stong law of large numbers for the density of particles in the supremum norm. The limiting object is a classical solution to the semilinear heat equation ut =uxx + f(u). If f(u)=up, 1<p 3, we also obtain a law of large numbers for the explosion time.