Harmonic moments and large deviations for a supercritical branching process in a random environment

Abstract

Let (Zn) be a supercritical branching process in an independent and identically distributed random environment . We study the asymptotic of the harmonic moments E[Zn-r | Z0=k ] of order r>0 as n ∞. We exhibit a phase transition with the critical value rk>0 determined by the equation E p1k = E m0-rk, where m0=Σk=0∞ k pk with pk= P(Z1=k | ), assuming that p0=0. Contrary to the constant environment case (the Galton-Watson case), this critical value is different from that for the existence of the harmonic moments of W=n∞ Zn / E (Zn|). The aforementioned phase transition is linked to that for the rate function of the lower large deviation for Zn. As an application, we obtain a lower large deviation result for Zn under weaker conditions than in previous works and give a new expression of the rate function. We also improve an earlier result about the convergence rate in the central limit theorem for W-Wn, and find an equivalence for the large deviation probabilities of the ratio Zn+1 / Zn.