Weighted moments of the limit of a branching process in a random environment

Abstract

Let (Zn) be a supercritical branching process in a random environment % ζ, and W be the limit of the normalized population size Zn/E%(Zn|ζ). We show necessary and sufficient conditions for the existence of weighted moments of W of the form Wα(W), where α≥ 1, is a positive function slowly varying at ∞. In the Galton-Watson case, the results improve those of Bingham and Doney (1974).