English

Interdependent Values without Single-Crossing

Computer Science and Game Theory 2018-06-12 v1

Abstract

We consider a setting where an auctioneer sells a single item to nn potential agents with {\em interdependent values}. That is, each agent has her own private signal, and the valuation of each agent is a known function of all nn private signals. This captures settings such as valuations for artwork, oil drilling rights, broadcast rights, and many more. In the interdependent value setting, all previous work has assumed a so-called {\sl single-crossing condition}. Single-crossing means that the impact of agent ii's private signal, sis_i, on her own valuation is greater than the impact of sis_i on the valuation of any other agent. It is known that without the single-crossing condition an efficient outcome cannot be obtained. We study welfare maximization for interdependent valuations through the lens of approximation. We show that, in general, without the single-crossing condition, one cannot hope to approximate the optimal social welfare any better than the approximation given by assigning the item to a random bidder. Consequently, we introduce a relaxed version of single-crossing, {\sl cc-single-crossing}, parameterized by c1c\geq 1, which means that the impact of sis_i on the valuation of agent ii is at least 1/c1/c times the impact of sis_i on the valuation of any other agent (c=1c=1 is single-crossing). Using this parameterized notion, we obtain a host of positive results. We propose a prior-free deterministic mechanism that gives an (n1)c(n-1)c-approximation guarantee to welfare. We then show that a random version of the proposed mechanism gives a prior-free universally truthful 2c2c-approximation to the optimal welfare for any concave cc-single crossing setting (and a 2nc3/22\sqrt{n}c^{3/2}-approximation in the absence of concavity). We extend this mechanism to a universally truthful mechanism that gives O(c2)O(c^2)-approximation to the optimal revenue.

Keywords

Cite

@article{arxiv.1806.03865,
  title  = {Interdependent Values without Single-Crossing},
  author = {Alon Eden and Michal Feldman and Amos Fiat and Kira Goldner},
  journal= {arXiv preprint arXiv:1806.03865},
  year   = {2018}
}
R2 v1 2026-06-23T02:25:32.095Z