English

Static pricing for multi-unit prophet inequalities

Computer Science and Game Theory 2023-06-21 v4 Data Structures and Algorithms

Abstract

We study a pricing problem where a seller has kk identical copies of a product, buyers arrive sequentially, and the seller prices the items aiming to maximize social welfare. When k=1k=1, this is the so called "prophet inequality" problem for which there is a simple pricing scheme achieving a competitive ratio of 1/21/2. On the other end of the spectrum, as kk goes to infinity, the asymptotic performance of both static and adaptive pricing is well understood. We provide a static pricing scheme for the small-supply regime: where kk is small but larger than 11. Prior to our work, the best competitive ratio known for this setting was the 1/21/2 that follows from the single-unit prophet inequality. Our pricing scheme is easy to describe as well as practical -- it is anonymous, non-adaptive, and order-oblivious. We pick a single price that equalizes the expected fraction of items sold and the probability that the supply does not sell out before all customers are served; this price is then offered to each customer while supply lasts. This extends an approach introduced by Samuel-Cahn for the case of k=1k=1. This pricing scheme achieves a competitive ratio that increases gradually with the supply. Subsequent work by Jiang, Ma, and Zhang shows that our pricing scheme is the optimal static pricing for every value of kk.

Keywords

Cite

@article{arxiv.2007.07990,
  title  = {Static pricing for multi-unit prophet inequalities},
  author = {Shuchi Chawla and Nikhil Devanur and Thodoris Lykouris},
  journal= {arXiv preprint arXiv:2007.07990},
  year   = {2023}
}
R2 v1 2026-06-23T17:09:09.668Z