Limit theorems for discrete multitype branching processes counted with a characteristic

Abstract

For a discrete time multitype supercritical Galton-Watson process (Zn)n∈ N and corresponding genealogical tree T, we associate a new discrete time process (Zn)n∈N such that, for each n∈ N, the contribution of each individual u∈T to Zn is determined by a (random) characteristic evaluated at the age of u at time n. In other words, Zn is obtained by summing over all u∈ T the corresponding contributions u, where (u)u∈ T are i.i.d. copies of . Such processes are known in the literature under the name of Crump-Mode-Jagers (CMJ) processes counted with characteristic . We derive a LLN and a CLT for the process (Zn)n∈N in the discrete time setting, and in particular, we show a dichotomy in its limit behavior. By applying our main result, we also obtain a generalization of the results in Kesten-Stigum [17].

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