A universal right tail upper bound for supercritical Galton-Watson processes with bounded offspring

Abstract

We consider a supercritical Galton-Watson process Zn whose offspring distribution has mean m>1 and is bounded by some d∈ \2,3,…\. As well-known, the associated martingale Wn=Zn/mn converges a.s. to some nonnegative random variable W∞. We provide a universal upper bound for the right tail of W∞ and Wn, which is uniform in n and in all offspring distributions with given m and d, namely: \[ P(Wn x) c1 \-c2 m-1m x d\, ∀ n∈ N \+∞\, ∀ x 0, \] for some explicit constants c1,c2>0. For a given offspring distribution, our upper bound decays exponentially as x ∞, which is actually suboptimal, but our bound is universal: it provides a single effective expression, which is nonasymptotic - it does not require x large - and valid simultaneously for all supercritical bounded offspring distributions.