Tight Revenue Gaps among Simple Mechanisms

Abstract

We consider a fundamental problem in microeconomics: selling a single item to a number of potential buyers, whose values are drawn from known independent and regular (not necessarily identical) distributions. There are four widely-used and widely-studied mechanisms in the literature: Myerson Auction~( OPT), Sequential Posted-Pricing~( SPM), Second-Price Auction with Anonymous Reserve~( AR), and Anonymous Pricing~( AP). OPT is revenue-optimal but complicated, which also experiences several issues in practice such as fairness; AP is the simplest mechanism, but also generates the lowest revenue among these four mechanisms; SPM and AR are of intermediate complexity and revenue. We explore revenue gaps among these mechanisms, each of which is defined as the largest ratio between revenues from a pair of mechanisms. We establish two tight bounds and one improved bound: 1. SPM vs.\ AP: this ratio studies the power of discrimination in pricing schemes. We obtain the tight ratio of C* ≈ 2.62, closing the gap between [ee - 1, e] left before. 2. AR vs.\ AP: this ratio measures the relative power of auction scheme vs.\ pricing scheme, when no discrimination is allowed. We attain the tight ratio of π26 ≈ 1.64, closing the previously known bounds [ee - 1, e]. 3. OPT vs.\ AR: this ratio quantifies the power of discrimination in auction schemes, and is previously known to be somewhere between [2, e]. The lower-bound of 2 was conjectured to be tight by Hartline and Roughgarden (2009) and Alaei et al.\ (2015). We acquire a better lower-bound of 2.15, and thus disprove this conjecture.