Tail asymptotics for the supercritical Galton-Watson process in the heavy-tailed case

Abstract

As well known, for a supercritical Galton-Watson process Zn whose offspring distribution has mean m>1, the ratio Wn:=Zn/mn has a.s. limit, say W. We study tail behaviour of the distributions of Wn and W in the case where Z1 has heavy-tailed distribution, that is, eλ Z1=∞ for every λ>0. We show how different types of distributions of Z1 lead to different asymptotic behaviour of the tail of Wn and W. We describe the most likely way how large values of the process occur.