Abstract

We study the problem of setting a price for a potential buyer with a valuation drawn from an unknown distribution $D$. The seller has “data” about $D$ in the form of $m \ge 1$ independent and identically distributed samples, and the algorithmic challenge is to use these samples to obtain expected revenue as close as possible to what could be achieved with advance knowledge of $D$. Our first set of results quantifies the number of samples $m$ that are necessary and sufficient to obtain a $(1-\epsilon)$-approximation. For example, for an unknown distribution that satisfies the monotone hazard rate (MHR) condition, we prove that $\tilde{\Theta}(\epsilon^{-3/2})$ samples are necessary and sufficient. Remarkably, this uses fewer samples than is necessary to accurately estimate the expected revenue obtained for such a distribution by even a single reserve price. We also prove essentially tight sample complexity bounds for regular distributions, bounded-support distributions, and a wide class of irregular distributions. Our lower bound approach, which applies to all randomized pricing strategies, borrows tools from differential privacy and information theory, and we believe it could find further applications in auction theory. Our second set of results considers the single-sample case. While no deterministic pricing strategy is better than $\tfrac{1}{2}$-approximate for regular distributions, for MHR distributions we show how to do better: there is a simple deterministic pricing strategy that guarantees expected revenue at least 0.589 times the maximum possible. We also prove that no deterministic pricing strategy achieves an approximation guarantee better than $\frac{e}{4} \approx .68$.

Keywords

  1. pricing
  2. auctions
  3. sample complexity
  4. information theory

MSC codes

  1. 68Q25
  2. 91A99

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Information & Authors

Information

Published In

cover image SIAM Journal on Computing
SIAM Journal on Computing
Pages: 651 - 674
ISSN (online): 1095-7111

History

Submitted: 14 March 2016
Accepted: 22 January 2018
Published online: 8 May 2018

Keywords

  1. pricing
  2. auctions
  3. sample complexity
  4. information theory

MSC codes

  1. 68Q25
  2. 91A99

Authors

Affiliations

Funding Information

Israeli Ministry of Science
Israeli Centers for Research Excellence https://doi.org/10.13039/501100005386 : Center No. 4/11
Office of Naval Research https://doi.org/10.13039/100000006
Israel Science Foundation https://doi.org/10.13039/501100003977
National Science Foundation https://doi.org/10.13039/100000001 : CCF-1016885, CCF-1215965
United States - Israel Binational Science Foundation https://doi.org/10.13039/100006221

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