research-article

Coalition Games on Interaction Graphs: A Horticultural Perspective

Authors:

Nicolas Bousquet,

Adrian VettaAuthors Info & Claims

EC '15: Proceedings of the Sixteenth ACM Conference on Economics and Computation

Pages 95 - 112

https://doi.org/10.1145/2764468.2764477

Published: 15 June 2015 Publication History

Abstract

We examine cooperative games where the viability of a coalition is determined by whether or not its members have the ability to communicate amongst themselves independently of non-members. This necessary condition for viability was proposed by Myerson [1977] and is modeled via an interaction graph G=(V,E); a coalition S ⊆ V is then viable if and only if the induced graph G[S] is connected. The non-emptiness of the core of a coalition game can be tested by a well-known covering LP. Moreover, the integrality gap of its dual packing LP defines exactly the multiplicative least-core and the relative cost of stability of the coalition game. This gap is upper bounded by the packing-covering ratio which, for graphical coalition games, is known to be at most the treewidth of the interaction graph plus one [Meir et al. 2013].

We examine the packing-covering ratio and integrality gaps of graphical coalition games in more detail. We introduce the thicket parameter of a graph, and prove it precisely measures the packing-covering ratio. It also approximately measures the primal and dual integrality gaps. The thicket number provides an upper bound of both integrality gaps. Moreover we show that for any interaction graph, the primal integrality gap is, in the worst case, linear in terms of the thicket number while the dual integrality gap is polynomial in terms of it. At the heart of our results, is a graph theoretic minmax theorem showing the thicket number is equal to the minimum width of a vine decomposition of the coalition graph (a vine decomposition is a generalization of a tree decomposition). We also explain how the thicket number relates to the VC-dimension of the set system produced by the game.

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Cited By

Zou RLin BUetz MWalter M(2024)Algorithmic solutions for maximizing shareable costsNetworks10.1002/net.2224084:4(385-397)Online publication date: 25-Jun-2024
https://doi.org/10.1002/net.22240
Stoian MDas SPandis ISelçuk Candan KAmer-Yahia S(2023)Fast Joint Shapley ValuesCompanion of the 2023 International Conference on Management of Data10.1145/3555041.3589393(285-287)Online publication date: 4-Jun-2023
https://dl.acm.org/doi/10.1145/3555041.3589393
Caskurlu BEkici OErdem Kizilkaya F(2020)On Existence of Equilibrium Under Social Coalition StructuresTheory and Applications of Models of Computation10.1007/978-3-030-59267-7_23(263-274)Online publication date: 9-Oct-2020
https://doi.org/10.1007/978-3-030-59267-7_23
Show More Cited By

Index Terms

Coalition Games on Interaction Graphs: A Horticultural Perspective
1. Applied computing
  1. Physical sciences and engineering
    1. Mathematics and statistics
2. Mathematics of computing
  1. Discrete mathematics

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cover image ACM Conferences

EC '15: Proceedings of the Sixteenth ACM Conference on Economics and Computation

June 2015

852 pages

ISBN:9781450334105

DOI:10.1145/2764468

General Chair:
Tim Roughgarden
Stanford University, USA
,
Program Chairs:
Michal Feldman
Tel Aviv University, Israel
,
Michael Schwarz
Google, USA

Copyright © 2015 ACM.

Permission to make digital or hard copies of all or part of this work for personal or classroom use is granted without fee provided that copies are not made or distributed for profit or commercial advantage and that copies bear this notice and the full citation on the first page. Copyrights for components of this work owned by others than the author(s) must be honored. Abstracting with credit is permitted. To copy otherwise, or republish, to post on servers or to redistribute to lists, requires prior specific permission and/or a fee. Request permissions from [email protected].

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Published: 15 June 2015

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EC '15: ACM Conference on Economics and Computation

June 15 - 19, 2015

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Cited By

Zou RLin BUetz MWalter M(2024)Algorithmic solutions for maximizing shareable costsNetworks10.1002/net.2224084:4(385-397)Online publication date: 25-Jun-2024
https://doi.org/10.1002/net.22240
Stoian MDas SPandis ISelçuk Candan KAmer-Yahia S(2023)Fast Joint Shapley ValuesCompanion of the 2023 International Conference on Management of Data10.1145/3555041.3589393(285-287)Online publication date: 4-Jun-2023
https://dl.acm.org/doi/10.1145/3555041.3589393
Caskurlu BEkici OErdem Kizilkaya F(2020)On Existence of Equilibrium Under Social Coalition StructuresTheory and Applications of Models of Computation10.1007/978-3-030-59267-7_23(263-274)Online publication date: 9-Oct-2020
https://doi.org/10.1007/978-3-030-59267-7_23
Bachrach YElkind EMalizia EMeir RPasechnik DRosenschein JRothe JZuckerman M(2018)Bounds on the cost of stabilizing a cooperative gameJournal of Artificial Intelligence Research10.1613/jair.1.1127063:1(987-1023)Online publication date: 1-Sep-2018
https://dl.acm.org/doi/10.1613/jair.1.11270
Nguyen TZick Y(2018)Resource Based Cooperative Games: Optimization, Fairness and StabilityAlgorithmic Game Theory10.1007/978-3-319-99660-8_21(239-244)Online publication date: 27-Aug-2018
https://doi.org/10.1007/978-3-319-99660-8_21
Li ZLiu YTang PXu TZhan WLarson KWinikoff MDas SDurfee E(2017)Stability of Generalized Two-sided Markets with Transaction ThresholdsProceedings of the 16th Conference on Autonomous Agents and MultiAgent Systems10.5555/3091125.3091172(290-298)Online publication date: 8-May-2017
https://dl.acm.org/doi/10.5555/3091125.3091172
Chalkiadakis GGreco GMarkakis E(2016)Characteristic function games with restricted agent interactionsArtificial Intelligence10.1016/j.artint.2015.12.005232:C(76-113)Online publication date: 1-Mar-2016
https://dl.acm.org/doi/10.1016/j.artint.2015.12.005

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