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Games of infinite length and perfect information have been studied for many years. There are numerous determinacy results for these games, and there is a wide body of work on consequences of their determinacy.Except for games with very special payoff functions, games of infinite length and imperfect information have been little studied. In 1969, David Blackwell [1] introduced a class of such games and proved a determinacy theorem for a subclass. During the intervening time, there has not been much progress in proving the determinacy of Blackwell's games. Orkin [17] extended Blackwell's result to a slightly wider class. Blackwell [2] found a new proof of his own result. Maitra and Sudderth [9, 10] improved Blackwell's result in a different direction from that of Orkin and also generalized to the case of stochastic games. Recently Vervoort [18] has obtained a substantial improvement. Nevertheless, almost all the basic questions have remained open.In this paper we associate with each Blackwell game a family of perfect information games, and we show that the (mixed strategy) determinacy of the former follows from the (pure strategy) determinacy of the latter. The complexity of the payoff function for the Blackwell game is approximately the same as the complexity of the payoff sets for the perfect information games. In particular, this means that the determinacy of Blackwell games with Borel measurable payoff functions follows from the known determinacy of perfect information games with Borel payoff sets.

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Classes of Recursively Enumerable Sets and Degrees of Unsolvability

Martin¹

1966

Mathematical Logic Qtrly

193

170

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Internal cohen extensions

Martin

Solovay

1970

Annals of Mathematical Logic

394

148

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A Proof of Projective Determinacy

Martin¹,

Steel²

1989

Journal of the American Mathematical Society

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The axiom of determinateness and reduction principles in the analytical hierarchy

Martin¹

1968

Bull. Amer. Math. Soc.

138

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A proof of projective determinacy

Martin¹,

Steel²

1989

J. Amer. Math. Soc.

187

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The Degrees of Hyperimmune Sets

Miller

Martin²

1968

Mathematical Logic Qtrly

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Donald A. Martin

Borel Determinacy

The determinacy of Blackwell games

Classes of Recursively Enumerable Sets and Degrees of Unsolvability

Internal cohen extensions

A Proof of Projective Determinacy

The axiom of determinateness and reduction principles in the analytical hierarchy

A proof of projective determinacy

The Degrees of Hyperimmune Sets

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