Renewal Population Dynamics and their Eternal Family Trees

Abstract

Based on a simple object, an i.i.d. sequence of positive integer-valued random variables, \an\n∈ Z, we introduce and study two random structures and their connections. First, a population dynamics, in which each individual is born at time n and dies at time n+an. This dynamics is that of a D/GI/∞ queue, with arrivals at integer times and service times given by \an\n∈ Z. Second, the directed random graph Tf on Z generated by the random map f(n)=n+an. Only assuming E[a0]<∞ and P[a0=1]>0, we show that, in steady state, the population dynamics is regenerative, with one individual alive at each regenerative epochs. We identify a unimodular structure in this dynamics. More precisely, Tf is a unimodular directed tree, in which f(n) is the parent of n. This tree has a unique bi-infinite path. Moreover, Tf splits the integers into two categories: ephemeral integers, with a finite number of descendants of all degrees, and successful integers, with an infinite number. Each regenerative epoch is a successful individual such that all integers less than it are its descendants of some order. Ephemeral, successful, and regenerative integers form stationary and mixing point processes on Z.