Universally Balanced Combinatorial Optimization Games

Universally Balanced Combinatorial Optimization Games

This article surveys studies on universally balanced properties of cooperative games defined in a succinct form. In particular, we focus on combinatorial optimization games in which the values to coalitions are defined through linear optimization programs, possibly combinatorial, that is subject to...

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Bibliographic Details
Main Authors: Xiaotie Deng, Gabrielle Demange
Format: Article
Language:English
Published: MDPI AG 2010-09-01
Series:Games
Subjects:
combinatorial cooperative games
balanced
blocking
core
integrality
Online Access:http://www.mdpi.com/2073-4336/1/3/299/
Description
Summary:This article surveys studies on universally balanced properties of cooperative games defined in a succinct form. In particular, we focus on combinatorial optimization games in which the values to coalitions are defined through linear optimization programs, possibly combinatorial, that is subject to integer constraints. In economic settings, the integer requirement reflects some forms of indivisibility. We are interested in the classes of games that guarantee a non-empty core no matter what are the admissible values assigned to the parameters defining these programs. We call such classes universally balanced. We present characterization and complexity results on the universally balancedness property for some classes of interesting combinatorial optimization games. In particular, we focus on the algorithmic properties for identifying universally balancedness for the games under discussion.
ISSN:2073-4336

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