Sudden extinction of a critical branching process in random environment

Abstract

Let T be the extinction moment of a critical branching process Z=(Zn,n≥ 0) in a random environment specified by iid probability generating functions. We study the asymptotic behavior of the probability of extinction of the process Z at moment n ∞, and show that if the logarithm of the (random) expectation of the offspring number belongs to the domain of attraction of a non-gaussian stable law then the extinction occurs owing to very unfavorable environment forcing the process, having at moment T-1 exponentially large population, to die out. We also give an interpretation of the obtained results in terms of random walks in random environment.