English

Sum the Probabilities to $m$ and Stop

Probability 2024-11-13 v2

Abstract

This work investigates the optimal selection of the mmth last success in a sequence of nn independent Bernoulli trials. We propose a threshold strategy that is ε\varepsilon-optimal under minimal assumptions about the monotonicity of the trials' success probabilities. This new strategy ensures stopping at most one step earlier than the optimal rule. Specifically, the new threshold coincides with the point where the sum of success probabilities in the remaining trials equals mm. We show that the underperformance of the new rule, in comparison to the optimal one, is of the order O(n2)O(n^{-2}) in the case of a Karamata-Stirling success profile with parameter θ>0\theta > 0 where pk=θ/(θ+k1)p_k = \theta / (\theta + k - 1) for the kkth trial. We further leverage the classical weak convergence of the number of successes in the trials to a Poisson random variable to derive the asymptotic solution of the stopping problem. Finally, we present illustrative examples highlighting the close performance between the two rules.

Keywords

Cite

@article{arxiv.2406.07283,
  title  = {Sum the Probabilities to $m$ and Stop},
  author = {Zakaria Derbazi},
  journal= {arXiv preprint arXiv:2406.07283},
  year   = {2024}
}

Comments

16 pages, 4 tables

R2 v1 2026-06-28T17:01:34.594Z