The Stationary Prophet Inequality Problem
Abstract
We study a continuous and infinite time horizon counterpart to the classic prophet inequality, which we term the stationary prophet inequality problem. Here, copies of a good arrive and perish according to Poisson point processes. Buyers arrive similarly and make take-it-or-leave-it offers for unsold items. The objective is to maximize the (infinite) time average revenue of the seller. Our main results are pricing-based policies which (i) achieve a -approximation of the optimal offline policy, which is best possible, and (ii) achieve a better than -approximation of the optimal online policy. Result (i) improves upon bounds implied by recent work of Collina et al. (WINE'20), and is the first optimal prophet inequality for a stationary problem. Result (ii) improves upon a bound implied by recent work of Aouad and Sarita\c{c} (EC'20), and shows that this prevalent bound in online algorithms is not optimal for this problem.
Cite
@article{arxiv.2107.10516,
title = {The Stationary Prophet Inequality Problem},
author = {Kristen Kessel and Amin Saberi and Ali Shameli and David Wajc},
journal= {arXiv preprint arXiv:2107.10516},
year = {2021}
}