English

Robust Market Equilibria with Uncertain Preferences

Computer Science and Game Theory 2019-12-11 v1 Optimization and Control

Abstract

The problem of allocating scarce items to individuals is an important practical question in market design. An increasingly popular set of mechanisms for this task uses the concept of market equilibrium: individuals report their preferences, have a budget of real or fake currency, and a set of prices for items and allocations is computed that sets demand equal to supply. An important real world issue with such mechanisms is that individual valuations are often only imperfectly known. In this paper, we show how concepts from classical market equilibrium can be extended to reflect such uncertainty. We show that in linear, divisible Fisher markets a robust market equilibrium (RME) always exists; this also holds in settings where buyers may retain unspent money. We provide theoretical analysis of the allocative properties of RME in terms of envy and regret. Though RME are hard to compute for general uncertainty sets, we consider some natural and tractable uncertainty sets which lead to well behaved formulations of the problem that can be solved via modern convex programming methods. Finally, we show that very mild uncertainty about valuations can cause RME allocations to outperform those which take estimates as having no underlying uncertainty.

Keywords

Cite

@article{arxiv.1912.04867,
  title  = {Robust Market Equilibria with Uncertain Preferences},
  author = {Riley Murray and Christian Kroer and Alex Peysakhovich and Parikshit Shah},
  journal= {arXiv preprint arXiv:1912.04867},
  year   = {2019}
}

Comments

Extended preprint of an article accepted to AAAI-20. Contains supplementary material as appendices. Due to figures, this manuscript is best printed in color

R2 v1 2026-06-23T12:41:48.187Z