Growth of Galton-Watson trees: immigration and lifetimes

Abstract

We study certain consistent families (Fλ)λ 0 of Galton-Watson forests with lifetimes as edge lengths and/or immigrants as progenitors of the trees in Fλ. Specifically, consistency here refers to the property that for each μλ, the forest Fμ has the same distribution as the subforest of Fλ spanned by the black leaves in a Bernoulli leaf colouring, where each leaf of Fλ is coloured in black independently with probability μ/λ. The case of exponentially distributed lifetimes and no immigration was studied by Duquesne and Winkel and related to the genealogy of Markovian continuous-state branching processes. We characterise here such families in the framework of arbitrary lifetime distributions and immigration according to a renewal process, related to Sagitov's (non-Markovian) generalisation of continuous-state branching renewal processes, and similar processes with immigration.