Random walks conditioned to stay non-negative and branching processes in non-favorable random environment

Abstract

Let \Sn,n≥ 0\ be a random walk whose increments belong without centering to the domain of attraction of an α-stable law \Yt,t≥ 0\, i.e. Snt/an⇒ Yt,t≥ 0, for some scaling constants an. Assuming that S0=o(an) and Sn≤ (n)=o(an), we prove several conditional limit theorems for the distribution of Sn-m given m=o(n) and 0≤ k≤ nSk≥ 0. These theorems complement the statements established by F. Caravenna and L. Chaumont in 2013. The obtained results are applied for studying the population size of a critical branching process evolving in non-favorable environment.