Some functionals for random walks and critical branching processes in extreme random environment
Abstract
Let \ Sn,n≥ 0\ be a random walk whose increment distribution belongs without centering to the domain of attraction of an % α -stable law, i.e., there are some scaling constants an such that the sequence Sn/an,n=1,2,..., weakly converges, as % n→ ∞ to a random variable having an α -stable distribution. Let S0=0,% equation* Ln:= ( S1,...,Sn) ,τ n:= \ 0≤ k≤ n:Sk= (0,Ln)\ . equation*% Assuming that Sn≤ h(n), where h(n) is o(an) and % n→ ∞ h(n)∈ -∞ ,+∞ ] exists we prove several limit theorems describing the asymptotic behavior of the functionals equation* E[ eSτ n;Sn≤ h(n)] equation*% as n→ ∞ . The obtained results are applied for studying the survival probability of a critical branching process evolving in an extremely unfavorable random environment. Key words: random walk, branching processes, random environment, survival probability, unfavorable environment
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