In this paper, the preferences on stochastic payoffs are defined by quantiles, and the Nash equilibrium of the bimatrix game with stochastic payoffs is given base on the preferences.
首先,本文将引人中位数来定义随机支苟值的偏好,并在此偏好的基础上进一步定义带随机支付双矩阵博弈的纳什均衡。
Combining the separation principle with the theory of forward and backward stochastic differential equations, we obtain the explicit observable Nash equilibrium point of this kind of game problem.
结合分离原理和正倒向随机微分方程理论,我们得到了显式的可观测的Nash均衡点。
Combining the separation principle with the theory of forward and backward stochastic differential equations, we obtain the explicit observable Nash equilibrium point of this kind of game problem.
结合分离原理和正倒向随机微分方程理论,我们得到了显式的可观测的Nash均衡点。
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