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Single Parameter Combinatorial Auctions with Partially Public Valuations

arXiv:1007.3539 · doi:10.1007/978-3-642-16170-4_21

Abstract

We consider the problem of designing truthful auctions, when the bidders' valuations have a public and a private component. In particular, we consider combinatorial auctions where the valuation of an agent $i$ for a set $S$ of items can be expressed as $v_if(S)$, where $v_i$ is a private single parameter of the agent, and the function $f$ is publicly known. Our motivation behind studying this problem is two-fold: (a) Such valuation functions arise naturally in the case of ad-slots in broadcast media such as Television and Radio. For an ad shown in a set $S$ of ad-slots, $f(S)$ is, say, the number of {\em unique} viewers reached by the ad, and $v_i$ is the valuation per-unique-viewer. (b) From a theoretical point of view, this factorization of the valuation function simplifies the bidding language, and renders the combinatorial auction more amenable to better approximation factors. We present a general technique, based on maximal-in-range mechanisms, that converts any $α$-approximation non-truthful algorithm ($α\leq 1$) for this problem into $Ω(\fracα{\log{n}})$ and $Ω(α)$-approximate truthful mechanisms which run in polynomial time and quasi-polynomial time, respectively.