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arxiv: 2211.14193 · v2 · pith:CJQ5OC7Enew · submitted 2022-11-25 · 🧮 math.PR

Null recurrence and transience for a binomial catastrophe model in random environment

classification 🧮 math.PR
keywords recurrencebetatimenulltransienceenvironmentmodelparticular
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We consider a discrete time population model for which each individual alive at time $n$ survives independently of everybody else at time $n+1$ with probability $\beta_n$. The sequence $(\beta_n)$ is i.i.d. and constitutes our random environment. Moreover, at every time $n$ we add $Z_n$ individuals to the population. The sequence $(Z_n)$ is also i.i.d. We find sufficient conditions for null recurrence and transience (positive recurrence has been addressed by Neuts). We apply our results to a particular $(Z_n)$ distribution and deterministic $\beta$. This particular case shows a rather unusual phase transition in $\beta$ in the sense that the Markov chain goes from transience to null recurrence without ever reaching positive recurrence.

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