The Last-Success Stopping Problem with Random Observation Times

Abstract

Suppose N independent Bernoulli trials are observed sequentially at random times of a mixed binomial process. The task is to maximise, by using a nonanticipating stopping strategy, the probability of stopping at the last success. We focus on the version of the problem where the kth trial is a success with probability pk=θ/(θ+k-1) and the prior distribution of N is negative binomial with shape parameter . Exploring properties of the Gaussian hypergeometric function, we find that the myopic stopping strategy is optimal if and only if ≥θ. We derive formulas to assess the winning probability and discuss limit forms of the problem for large N.

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