“The writer has, by such a treatment, obtained values for all finite two-person cooperative games, and some special n-person games.”

— John Nash

"Non-cooperative Games" in Annals of Mathematics, Vol. 54, No. 2 (September 1951)
1950s
Context: The writer has developed a “dynamical” approach to the study of cooperative games based upon reduction to non-cooperative form. One proceeds by constructing a model of the preplay negotiation so that the steps of negotiation become moves in a larger non-cooperative game [which will have an infinity of pure strategies] describing the total situation. This larger game is then treated in terms of the theory of this paper [extended to infinite games] and if values are obtained they are taken as the values of the cooperative game. Thus the problem of analyzing a cooperative game becomes the problem of obtaining a suitable, and convincing, non-cooperative model for the negotiation.
The writer has, by such a treatment, obtained values for all finite two-person cooperative games, and some special n-person games.

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American mathematician and Nobel Prize laureate 1928–2015

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“The writer has, by such a treatment, obtained values for all finite two-person cooperative games, and some special n-person games.”

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