Small deviations of a Galton-Watson process with immigration

Abstract

We consider a Galton-Watson process with immigration (Zn), with offspring probabilities (pi) and immigration probabilities (qi). In the case when p0=0, p1≠ 0, q0=0 (that is, when essinf (Zn) grows linearly in n), we establish the asymptotics of the left tail P\W<\, as 0, of the martingale limit W of the process ( Zn). Further, we consider the first generation K such that ZK>essinf (ZK) and study the asymptotic behaviour of K conditionally on \W<\, as 0. We find the scale at which K goes to infinity and describe the fluctuations of K around that scale. Finally, we compare the results with those for standard Galton-Watson processes.