Arbeitspapier
Axiomatizations of Two Types of Shapley Values for Games on Union Closed Systems
A situation in which a finite set of players can obtain certain payoffs by cooperation can be described by a cooperative game with transferable utility, or simply a TU-game. A (single-valued) solution for TU-games assigns a payoff distribution to every TU-game. A well-known solution is the Shapley value. In the literature various models of games with restricted cooperation can be found. So, instead of allowing all subsets of the player set N to form, it is assumed that the set of feasible coalitions is a subset of the power set of N. In this paper we consider such sets of feasible coalitions that are closed under union, i.e. for any two feasible coalitions also their union is feasible. We consider and axiomatize two solutions or rules for these games that generalize the Shapley value: one is obtained as the conjunctive permission value using a corresponding superior graph, the other is defined as the Shapley value of a modified game similar as the Myerson rule for conference structures.
- Language
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Englisch
- Bibliographic citation
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Series: Tinbergen Institute Discussion Paper ; No. 09-064/1
- Classification
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Wirtschaft
Cooperative Games
- Subject
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TU-game
restricted cooperation
union closed system
Shapley value
permission value
superior graph
axiomatization
Transferable Utility Games
Shapley-Wert
Theorie
- Event
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Geistige Schöpfung
- (who)
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van den Brink, Rene
Katsev, Ilya
van der Laan, Gerard
- Event
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Veröffentlichung
- (who)
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Tinbergen Institute
- (where)
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Amsterdam and Rotterdam
- (when)
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2009
- Handle
- Last update
-
10.03.2025, 11:43 AM CET
Data provider
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Object type
- Arbeitspapier
Associated
- van den Brink, Rene
- Katsev, Ilya
- van der Laan, Gerard
- Tinbergen Institute
Time of origin
- 2009
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