论文信息 - Kuhn's Equivalence Theorem for Games in Product Form

Kuhn's Equivalence Theorem for Games in Product Form

We propose an alternative to the tree representation of extensive form games. Games in product form represent information with σ-fields over a product set, and do not require an explicit description of the play temporality, as opposed to extensive form games on trees. This representation encompasses games with a continuum of actions, randomness and players, as well as games for which the play order cannot be determined in advance. We adapt and prove Kuhn’s theorem — regarding equivalence between mixed and behavioral strategies under perfect recall — for games in product form with continuous action sets.

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