An Alternating Algorithm for Finding Linear Arrow-Debreu Market Equilibria

Po-An Chen, Chi-Jen Lu, Yu-Sin Lu

研究成果: Paper同行評審

摘要

Motivated by the convergence result of mirror-descent algorithms to market equilibria in linear Fisher markets, it is natural for one to consider designing dynamics (specifically, iterative algorithms) for agents to arrive at linear Arrow-Debreu market equilibria. Jain reduced equilibrium computation in linear Arrow-Debreu markets to the equilibrium computation in bijective markets, where everyone is a seller of only one good and a buyer for a bundle of goods. In this paper, we design an algorithm for computing linear bijective market equilibrium, based on solving the rational convex program formulated by Devanur et al. The algorithm repeatedly alternates between a step of gradient-descent-like updates and a distributed step of optimization exploiting the property of such convex program. Convergence can be ensured by a new analysis different from the analysis for linear Fisher market equilibria.
原文English
DOIs
出版狀態Published - 8月 2019
事件The 6th International Conference on Continuous Optimization - Berlin, Germany
持續時間: 5 8月 20198 8月 2019

Conference

ConferenceThe 6th International Conference on Continuous Optimization
國家/地區Germany
城市Berlin
期間5/08/198/08/19

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