Convergence rates for a branching process in a random environment

Abstract

Let (Zn) be a supercritical branching process in a random environment . We study the convergence rates of the martingale Wn = Zn/ E[Zn| ] to its limit W. The following results about the convergence almost sur (a.s.), in law or in probability, are shown. (1) Under a moment condition of order p∈ (1,2), W-Wn = o (e-na) a.s. for some a>0 that we find explicitly; assuming only EW1 W1α+1 < ∞ for some α >0, we have W-Wn = o (n-α) a.s.; similar conclusions hold for a branching process in a varying environment. (2) Under a second moment condition, there are norming constants an() (that we calculate explicitly) such that an() (W-Wn) converges in law to a non-degenerate distribution. (3) For a branching process in a finite state random environment, if W1 has a finite exponential moment, then so does W, and the decay rate of P(|W-Wn| > ε) is supergeometric.