Asymptotically Efficient Multi-Unit Auctions via Posted Prices
Abstract
We study the asymptotic average-case efficiency of static and anonymous posted prices for agents and multiple identical items with . When valuations are drawn i.i.d from some fixed continuous distribution (each valuation is a vector in and independence is assumed only across agents) we show: (a) for any "upper mass" distribution there exist posted prices such that the expected revenue and welfare of the auction approaches the optimal expected welfare as goes to infinity; specifically, the ratio between the expected revenue of our posted prices auction and the expected optimal social welfare is , and (b) there do not exist posted prices that asymptotically obtain full efficiency for most of the distributions that do not satisfy the upper mass condition. When valuations are complete-information and only the arrival order is adversarial, we provide a "tiefree" condition that is sufficient and necessary for the existence of posted prices that obtain the maximal welfare. This condition is generically satisfied, i.e., it is satisfied with probability if the valuations are i.i.d.~from some continuous distribution.
Cite
@article{arxiv.1812.05870,
title = {Asymptotically Efficient Multi-Unit Auctions via Posted Prices},
author = {Urban Larsson and Ron Lavi},
journal= {arXiv preprint arXiv:1812.05870},
year = {2019}
}
Comments
14 pages, There is a flaw in the section of Lower Mass distributions