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Paper detail

Second Order Properties of Thinned Counts in Finite Birth--Death Processes

The paper studies the counting process arising as a subset of births and deaths in a birth--death process on a finite state space. Whenever a birth or death occurs, the process is incremented or not depending on the outcome of an independent Bernoulli experiment whose probability is a state-dependent function of the birth and death and also depends on whether it is a birth or death that has occurred. We establish a formula for the asymptotic variance rate of this process, also presented as the ratio of the asymptotic variance and the asymptotic mean. Several examples including queueing models illustrate the scope of applicability of the results. An analogous formula for the countably infinite state space is conjectured and tested.

preprint2026arXivOpen access
Daryl. J. DaleyYoni NazarathyJiesen Wang
math.PR
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Open access3 authors1 topic
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Daryl. J. DaleyYoni NazarathyJiesen Wang

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