Asymptotic behaviour of heavy-tailed branching processes in random environments

Abstract

Consider a heavy-tailed branching process (denoted by Zn) in random environments, under the condition which infers that E m(0)=∞. We show that (1) there exists no proper cn such that \Zn/cn\ has a proper, non-degenerate limit, (2) normalized by a sequence of functions, a proper limit can be obtained, i.e., yn(,Zn()) converges almost surely to a random variable Y(), where Y∈(0,1)~η-a.s., (3) finally, we give a necessary and sufficient conditions for the almost sure convergence of \U(,Zn())cn()\, where U() is a slowly varying function that may depends on .