Times of a branching process with immigration in varying environment attaining a fixed level
Abstract
Consider a branching process \Zn\n 0 with immigration in varying environment. For a∈\0,1,2,...\, let C=\n0:Zn=a\ be the collection of times at which the population size of the process attains level a. We give a criterion to determine whether the set C is finite or not. For critical Galton-Watson process, we show that |C [1,n]|/ n→ S in distribution, where S is an exponentially distributed random variable with P(S>t)=e-t,\ t>0.
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