Limit theorems for critical branching processes in a finite state space Markovian environment

Abstract

Let (Zn)n≥ 0 be a critical branching process in a random environment defined by a Markov chain (Xn)n≥ 0 with values in a finite state space X. Let Sn = Σk=1n fXk'(1) be the Markov walk associated to (Xn)n≥ 0, where fi is the offspring generating function when the environment is i ∈ X. Conditioned on the event \ Zn>0\, we show the non degeneracy of limit law of the normalized number of particles Zn/eSn and determine the limit of the law of Snn jointly with Xn. Based on these results we establish a Yaglom-type theorem which specifies the limit of the joint law of Zn and Xn given Zn>0.

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