得出其博弈的纯策略的纳什均衡解。
提出了一种求解双矩阵对策多重纳什均衡解的粒子群优化算法。
Particle Swarm Optimization (PSO) algorithm for solving multiple Nash equilibrium solutions of bimatrix game is presented in this paper.
通过利用非合作博弈论方法建模,本文给出了这种情况下R&D投资额的纳什均衡解。
On the basis of a non - cooperative game - theoretic model, we provide R&D investment Nash equilibrium outcome under duopolistic competition.
通过纳什均衡解的讨论,可对行业竞争格局作出有效分析,为制订公司竞争战略提供科学依据。
By discussing the solution of Nash Equilibrium, we can effectively analyse the structure of market competition, and provide the scientific basis for company design competitive strategy.
该文根据电力市场的特点,提出一种新的博弈模型来模拟发电商的策略行为,推导了该模型的纳什均衡解。
In this paper, a new oligopolistic game model is put forward to finish the above simulation. The formulae of Nash equilibrium are obtained based on complete information.
由于显式闭环纳什均衡解反映了理性人在动态博弈时的行为方式,因此关于它的研究也具有重要的实际意义。
The explicit closed-loop Nash equilibrium solution reflected the rational behavior in the dynamic game, so the research on it also has important practical significance.
建立了一个简化的批发价格模型,求出了批发商和零售商纳什均衡解的特征,并且就其现实意义进行了讨论。
The paper builds up a simplified model of the wholesale price contract explains the characteristics of Nash equilibrium solution and discusses the application of the model.
如果一个可自由交换的竞争经济能够实现无限而且重复交换的纳什均衡,那么这个纳什均衡解就是一般均衡解。
On the condition of competition economy and free traded goods, Nash equilibrium solution is the general equilibrium solution in Walras economy.
本文在对利益相关者进行合理界定的基础上,运用合作博弈数学模型,求证利益相关者博弈的子博弈精炼纳什均衡解的唯一性。
Based on reasonable definition of stakeholder and cooperative gambling model, the uniqueness of sub-gambling refining Nash equilibrium among stakeholders is tried to get.
针对如何解算n人非合作的动态博弈对策中的纳什均衡解问题,提出一种利用退火回归神经网络极值搜索算法解算纳什均衡解的方法。
An algorithm is proposed to solve the Nash equilibrium solution for ann-person noncooperative dynamic game by an annealing recurrent neural network for extremum seeking algorithm (ESA).
重新解释界定的合作解,本质上是具有内外稳定性质的一种纳什均衡。
The cooperative solution newly explained and defined is in fact a Nash Equilibrium in nature, which is stable both internally and externally.
第三部分围绕完全信息动态博弈给予其合理的均衡解,即子博弈完美纳什均衡。
During the third part we introduce sub game perfect Nash equilibrium, which is the rational equilibrium solution of dynamic game of perfect information.
第三部分围绕完全信息动态博弈给予其合理的均衡解,即子博弈完美纳什均衡。
During the third part we introduce sub game perfect Nash equilibrium, which is the rational equilibrium solution of dynamic game of perfect information.
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