A Kesten Stigum theorem for Galton-Watson processes with infinitely many types in a random environment

Abstract

In this paper, we study a Galton-Watson process (Zn) with infinitely many types in a random ergodic environment =(n)n≥ 0. We focus on the supercritical regime of the process, where the quenched average of the size of the population grows exponentially fast to infinity. We work under Doeblin-type assumptions coming from a previous paper, which ensure that the quenched mean semi group of (Zn) satisfies some ergodicity property and admits a -measurable family of space-time harmonic functions. We use these properties to derive an associated nonnegative martingale (Wn). Under a L(L)1+-integrabilty assumption on the offspring distribution, we prove that the almost sure limit W of the martingale (Wn) is not degenerate. Assuming some uniform L2-integrability of the offspring distribution, we prove that conditionally on \W>0\, at a large time n, both the size of the population and the distribution of types correspond to those of the quenched mean of the population E[Zn|, Z0]. We finally introduce an example of a process modelling a population with a discrete age structure. In this context, we provide more tractable criterions which guarantee our various assumptions are met.

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