On Positive Game Matrices and Their Extensions
نویسنده
چکیده
In this paper we study some relations between the optimal strategies, the characteristic roots and the characteristic vectors of a positive square matrix whose rows and columns correspond to the pure strategy spaces of players in a zero-sum two-person game. Further we study a property of the game values of positive matrices that commute. The results are extended to infinite games on the unit square, with positive kernels as pay-off functions.
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