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Matrix games with nonuniform payoff distributions. (English) Zbl 0993.91001
Summary: The theoretical analysis of the statistical properties of 2-person zero-sum games with random payoff matrices is generalized to payoff matrices with elements whose average and variance depend on the column they belong to. The value of the game and the distribution of the strategies are solved analytically using methods from statistical mechanics of neural networks. The analytical results are confirmed by simulations.

MSC:
91A05 2-person games
82C32 Neural nets applied to problems in time-dependent statistical mechanics
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