Conditional limit theorems for critical continuous-state branching processes

Abstract

In this paper we study the conditional limit theorems for critical continuous-state branching processes with branching mechanism (λ)=λ1+αL(1/λ) where α∈ [0,1] and L is slowly varying at ∞. We prove that if α∈ (0,1], there are norming constants Qt 0 (as t +∞) such that for every x>0, Px(QtXt∈·|Xt>0) converges weakly to a non-degenerate limit. The converse assertion is also true provided the regularity of at 0. We give a conditional limit theorem for the case α=0. The limit theorems we obtain in this paper allow infinite variance of the branching process.