Branching processes in random environment die slowly

Abstract

Let Zn,n=0,1,..., be a branching process evolving in the random environment generated by a sequence of iid generating functions % f0(s),f1(s),..., and let S0=0,Sk=X1+...+Xk,k≥ 1, be the associated random walk with Xi= fi-1(1), τ (m,n) be the left-most point of minimum of \Sk,k≥ 0\ on the interval [m,n], and T= \k:Zk=0\ . Assuming that the associated random walk satisfies the Doney condition P(Sn>0) ∈ (0,1),n ∞ , we prove (under the quenched approach) conditional limit theorems, as n ∞ , for the distribution of Znt, Zτ (0,nt), and Zτ (nt,n), t∈ (0,1), given T=n. It is shown that the form of the limit distributions essentially depends on the location of τ (0,n) with respect to the point nt.