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- Shapley_value abstract "In game theory, the Shapley value, named in honour of Lloyd Shapley, who introduced it in 1953, is a solution concept in cooperative game theory. To each cooperative game it assigns a unique distribution (among the players) of a total surplus generated by the coalition of all players. The Shapley value is characterized by a collection of desirable properties. Hart (1989) provides a survey of the subject.The setup is as follows: a coalition of players cooperates, and obtains a certain overall gain from that cooperation. Since some players may contribute more to the coalition than others or may possess different bargaining power (for example threatening to destroy the whole surplus), what final distribution of generated surplus among the players should arise in any particular game? Or phrased differently: how important is each player to the overall cooperation, and what payoff can he or she reasonably expect? The Shapley value provides one possible answer to this question.".
- Shapley_value wikiPageID "198965".
- Shapley_value wikiPageLength "13106".
- Shapley_value wikiPageOutDegree "18".
- Shapley_value wikiPageRevisionID "683825412".
- Shapley_value wikiPageWikiLink Abraham_Neyman.
- Shapley_value wikiPageWikiLink Airport_problem.
- Shapley_value wikiPageWikiLink Atom_(measure_theory).
- Shapley_value wikiPageWikiLink Banzhaf_power_index.
- Shapley_value wikiPageWikiLink Category:Cooperative_games.
- Shapley_value wikiPageWikiLink Category:Fair_division.
- Shapley_value wikiPageWikiLink Category:Game_theory.
- Shapley_value wikiPageWikiLink Cooperative_game.
- Shapley_value wikiPageWikiLink Diagonal_formula.
- Shapley_value wikiPageWikiLink Function_(mathematics).
- Shapley_value wikiPageWikiLink Game_theory.
- Shapley_value wikiPageWikiLink Jean-François_Mertens.
- Shapley_value wikiPageWikiLink Lloyd_Shapley.
- Shapley_value wikiPageWikiLink Measure_(mathematics).
- Shapley_value wikiPageWikiLink Permutation.
- Shapley_value wikiPageWikiLink Robert_Aumann.
- Shapley_value wikiPageWikiLink Shapley–Shubik_power_index.
- Shapley_value wikiPageWikiLinkText "Shapley value and the Aumann–Shapley value".
- Shapley_value wikiPageWikiLinkText "Shapley value".
- Shapley_value wikiPageWikiLinkText "Shapley value#Aumann–Shapley value".
- Shapley_value wikiPageWikiLinkText "Shapley_value".
- Shapley_value wikiPageWikiLinkText "fair prices".
- Shapley_value wikiPageWikiLinkText "fair values".
- Shapley_value hasPhotoCollection Shapley_value.
- Shapley_value id "p/s084780".
- Shapley_value title "Shapley value".
- Shapley_value wikiPageUsesTemplate Template:Cite_journal.
- Shapley_value wikiPageUsesTemplate Template:Game_theory.
- Shapley_value wikiPageUsesTemplate Template:Refbegin.
- Shapley_value wikiPageUsesTemplate Template:Refend.
- Shapley_value wikiPageUsesTemplate Template:Reflist.
- Shapley_value wikiPageUsesTemplate Template:Sfrac.
- Shapley_value wikiPageUsesTemplate Template:Springer.
- Shapley_value subject Category:Cooperative_games.
- Shapley_value subject Category:Fair_division.
- Shapley_value subject Category:Game_theory.
- Shapley_value hypernym Concept.
- Shapley_value comment "In game theory, the Shapley value, named in honour of Lloyd Shapley, who introduced it in 1953, is a solution concept in cooperative game theory. To each cooperative game it assigns a unique distribution (among the players) of a total surplus generated by the coalition of all players. The Shapley value is characterized by a collection of desirable properties.".
- Shapley_value label "Shapley value".
- Shapley_value sameAs Shapley-Wert.
- Shapley_value sameAs Valor_de_Shapley.
- Shapley_value sameAs Valeur_de_Shapley.
- Shapley_value sameAs ערך_שפלי.
- Shapley_value sameAs Valore_di_Shapley.
- Shapley_value sameAs シャープレイ値.
- Shapley_value sameAs m.01c7t9.
- Shapley_value sameAs Вектор_Шепли.
- Shapley_value sameAs Q240046.
- Shapley_value sameAs Q240046.
- Shapley_value wasDerivedFrom Shapley_value?oldid=683825412.
- Shapley_value isPrimaryTopicOf Shapley_value.