Critical branching processes evolving in an unfavorable random environment

Abstract

Let \ Zn,n=0,1,2,...\ be a critical branching process in random environment and let \ Sn,n=0,1,2,...\ be its associated random walk. It is known that if the increments of this random walk belong (without centering) to the domain of attraction of a stable law, then there exists a sequence a1,a2,..., slowly varying at infinity such that the conditional distributions equation* P( Snan≤ x|Zn>0) , x∈ (-∞ ,+∞ ), equation*% weakly converges, as n→ ∞ to the distribution of a strictly positive and proper random variable. In this paper we supplement this result with a description of the asymptotic behavior of the probability equation* P( Sn≤ (n);Zn>0) , equation*% if (n)→ ∞ \ as n→ ∞ in such a way that (n)=o(an).