English

Simple Mechanisms For Agents With Complements

Computer Science and Game Theory 2016-09-06 v2

Abstract

We study the efficiency of simple auctions in the presence of complements. [DMSW15] introduced the single-bid auction, and showed that it has a price of anarchy (PoA) of O(logm)O(\log m) for complement-free (i.e., subadditive) valuations. Prior to our work, no non-trivial upper bound on the PoA of single bid auctions was known for valuations exhibiting complements. We introduce a hierarchy over valuations, where levels of the hierarchy correspond to the degree of complementarity, and the PoA of the single bid auction degrades gracefully with the level of the hierarchy. This hierarchy is a refinement of the Maximum over Positive Hypergraphs (MPH) hierarchy [FFIILS15], where the degree of complementarity dd is captured by the maximum number of neighbors of a node in the positive hypergraph representation. We show that the price of anarchy of the single bid auction for valuations of level dd of the hierarchy is O(d2log(m/d))O(d^2 \log(m/d)), where mm is the number of items. We also establish an improved upper bound of O(dlogm)O(d \log m) for a subclass where every hyperedge in the positive hypergraph representation is of size at most 2 (but the degree is still dd). Finally, we show that randomizing between the single bid auction and the grand bundle auction has a price of anarchy of at most O(m)O(\sqrt{m}) for general valuations. All of our results are derived via the smoothness framework, thus extend to coarse-correlated equilibria and to Bayes Nash equilibria.

Keywords

Cite

@article{arxiv.1603.07939,
  title  = {Simple Mechanisms For Agents With Complements},
  author = {Michal Feldman and Ophir Friedler and Jamie Morgenstern and Guy Reiner},
  journal= {arXiv preprint arXiv:1603.07939},
  year   = {2016}
}

Comments

Proceedings of the 2016 ACM Conference on Economics and Computation

R2 v1 2026-06-22T13:18:44.504Z