研究了支付矩阵元素为模糊数的模糊矩阵对策问题。
The fuzzy matrix games with imprecise pay-off matrix is studied.
人们将模糊概念引入到策略集、支付矩阵、对策的解、结盟及多目标等。
A few research achievements appeared and mainly introduced fuzzy concepts to strategy sets, payoff matrix, solutions of game, coalition, multiobjects and so on.
对支付矩阵建立了进化博弈模型,分析了参与者策略选择动态进化过程。
On the base of assumed payoff matrix, we constructed the evolutionary game model to analyze the dynamic evolutionary procedure of participants' choice of strategies in games.
研究显示参与者策略选择的稳定性受博弈系统最初状态及支付矩阵相关参数的设定有关。
The result shows that the stabilization of participants' strategies is related to the parameters in payoff matrix and influenced by initial status of the game system.
分析结果发现,该系统的演化方向与双方博弈的支付矩阵相关,也受到系统初始状态的影响。
The results show that the systems evolutionary direction is closely related to players payoff, and influenced by systems initial status.
您可以赚取无限量的收入和支付的矩阵结构到至无限远让你提高你的收入每一个未来一周。
You can earn unlimited amount of income and the matrix structure pays till infinity allowing you to enhance your income every coming week.
运用OECD的政策矩阵评估模型计算了市场价格支持和直接支付两种支持政策对我国农业的政策效应。
By using policy matrix evaluation models developed by the OECD, this paper evaluates the effects of different China agricultural support policies.
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。
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。
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.
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