English

On the Robust Optimal Stopping Problem

Probability 2016-04-12 v9 Systems and Control Optimization and Control Pricing of Securities

Abstract

We study a robust optimal stopping problem with respect to a set \cP\cP of mutually singular probabilities. This can be interpreted as a zero-sum controller-stopper game in which the stopper is trying to maximize its pay-off while an adverse player wants to minimize this payoff by choosing an evaluation criteria from \cP\cP. We show that the \emph{upper Snell envelope \olZ\ol{Z}} of the reward process YY is a supermartingale with respect to an appropriately defined nonlinear expectation \ul\sE\ul{\sE}, and \olZ\ol{Z} is further an \ul\sE\ul{\sE}-martingale up to the first time \t\t^* when \olZ\ol{Z} meets YY. Consequently, \t\t^* is the optimal stopping time for the robust optimal stopping problem and the corresponding zero-sum game has a value. Although the result seems similar to the one obtained in the classical optimal stopping theory, the mutual singularity of probabilities and the game aspect of the problem give rise to major technical hurdles, which we circumvent using some new methods.

Keywords

Cite

@article{arxiv.1301.0091,
  title  = {On the Robust Optimal Stopping Problem},
  author = {Erhan Bayraktar and Song Yao},
  journal= {arXiv preprint arXiv:1301.0091},
  year   = {2016}
}

Comments

Final Version, 50 pages. This is a much more comprehensive version of what appeared in the SIAM Journal on Control and Optimization

R2 v1 2026-06-21T23:02:36.116Z