Coalescence for supercritical Galton-Watson processes with immigration

Abstract

In this paper, we consider Galton-Watson processes with immigration. Pick i(2) individuals randomly without replacement from the n-th generation and trace their lines of descent back in time till they coalesce into 1 individual in a certain generation, which we denote by Xi,1n and is called the coalescence time. Firstly, we give the probability distribution of Xi,1n in terms of the probability generating functions of both the offspring distribution and the immigration law. Then by studying the limit behaviors of various functionals of the Galton-Watson process with immigration, we find the limit distribution of X2,1n as n→∞.