Kuhn's theorem: Difference between revisions
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Kuhn's Theorem is a theorem in game theory, which relates perfect recall, mixed and unmixed strategies, and the expected payoffs thereof. |
Kuhn's Theorem is a theorem in game theory, which relates perfect recall, mixed and unmixed strategies, and the expected payoffs thereof. |
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The theorem states that if a [Game | Game theory] is a game of perfect recall (ie a [C-game]), for every [mixed strategy] there is a [behavioral strategy] that has an equivalent payoff(ie the strategies are equivalent). |
The theorem states that if a [[Game | Game theory]] is a game of perfect recall (ie a [[C-game]]), for every [[mixed strategy]] there is a [[behavioral strategy]] that has an equivalent payoff(ie the strategies are equivalent). |
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Revision as of 17:58, 11 May 2014
Kuhn's Theorem is a theorem in game theory, which relates perfect recall, mixed and unmixed strategies, and the expected payoffs thereof.
The theorem states that if a Game theory is a game of perfect recall (ie a C-game), for every mixed strategy there is a behavioral strategy that has an equivalent payoff(ie the strategies are equivalent).