Limit theorems for a class of critical superprocesses with stable branching

Abstract

We consider a critical superprocess \X; Pμ\ with general spatial motion and spatially dependent stable branching mechanism with lowest stable index γ0 > 1. We first show that, under some conditions, Pμ(\|Xt\|≠ 0) converges to 0 as t ∞ and is regularly varying with index (γ0-1)-1. Then we show that, for a large class of non-negative testing functions f, the distribution of \Xt(f); Pμ(·|\|Xt\|≠ 0)\, after appropriate rescaling, converges weakly to a positive random variable z(γ0-1) with Laplace transform E[e-u z(γ0-1)]=1-(1+u-(γ0-1))-1/(γ0-1).