English

The Last Success Problem with Samples

Probability 2024-07-24 v2 Computer Science and Game Theory

Abstract

The last success problem is an optimal stopping problem that aims to maximize the probability of stopping on the last success in a sequence of independent nn Bernoulli trials. In the classical setting where complete information about the distributions is available, Bruss~\cite{B00} provided an optimal stopping policy that ensures a winning probability of 1/e1/e. However, assuming complete knowledge of the distributions is unrealistic in many practical applications. This paper investigates a variant of the last success problem where samples from each distribution are available instead of complete knowledge of them. When a single sample from each distribution is allowed, we provide a deterministic policy that guarantees a winning probability of 1/41/4. This is best possible by the upper bound provided by Nuti and Vondr\'{a}k~\cite{NV23}. Furthermore, for any positive constant ϵ\epsilon, we show that a constant number of samples from each distribution is sufficient to guarantee a winning probability of 1/eϵ1/e-\epsilon.

Keywords

Cite

@article{arxiv.2308.09356,
  title  = {The Last Success Problem with Samples},
  author = {Toru Yoshinaga and Yasushi Kawase},
  journal= {arXiv preprint arXiv:2308.09356},
  year   = {2024}
}
R2 v1 2026-06-28T11:58:29.692Z