Definitions from Wiktionary (Bondareva-Shapley theorem)
▸ noun: (game theory) A theorem that describes a necessary and sufficient condition for the non-emptiness of the core of a cooperative game in characteristic function form. The game's core is non-empty if and only if the game is balanced.
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▸ noun: (game theory) A theorem that describes a necessary and sufficient condition for the non-emptiness of the core of a cooperative game in characteristic function form. The game's core is non-empty if and only if the game is balanced.
Similar:
core,
Sprague-Grundy theorem,
cooperative game,
Bertrand's postulate,
semivalue,
Gibbard's theorem,
Zermelo's theorem,
Heine-Borel theorem,
Shapley value,
Beal conjecture,
more...
▸ Words similar to Bondareva-Shapley theorem
▸ Usage examples for Bondareva-Shapley theorem
▸ Idioms related to Bondareva-Shapley theorem
▸ Wikipedia articles (New!)
▸ Words that often appear near Bondareva-Shapley theorem
▸ Rhymes of Bondareva-Shapley theorem
▸ Invented words related to Bondareva-Shapley theorem