Limit theorems for continuous-state branching processes with immigration

Abstract

We prove and extend some results stated by Mark Pinsky: Limit theorems for continuous state branching processes with immigration [Bull. Amer. Math. Soc. 78(1972), 242--244]. Consider a continuous-state branching process with immigration (Yt,t≥ 0) with branching mechanism and immigration mechanism (CBI(,) for short). We shed some light on two different asymptotic regimes occurring when ∫0(u)|(u)|du<∞ or ∫0(u)|(u)|du=∞. We first observe that when ∫0(u)|(u)|du<∞, supercritical CBIs have a growth rate dictated by the branching dynamics, namely there is a renormalization τ(t), only depending on , such that (τ(t)Yt,t≥ 0) converges almost-surely to a finite random variable. When ∫0(u)|(u)|du=∞, it is shown that the immigration overwhelms the branching dynamics and that no linear renormalization of the process can exist. Asymptotics in the second regime are studied in details for all non-critical CBI processes via a nonlinear time-dependent renormalization in law. Three regimes of weak convergence are then exhibited, where a misprint in Pinsky's paper is corrected. CBI processes with critical branching mechanisms subject to a regular variation assumption are also studied.