离散时间情况下的合作动态博弈

Sutrisno, Salmah, I. E. Wijayanti
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引用次数: 3

摘要

本文研究离散时间情况下的合作动态对策问题。我们通过确定帕累托解来解决这个问题,继续寻找纳什议价解。我们假设这个问题中的差分方程是线性时不变的。每个参与者的目标函数具有二次型和正定型。我们可以证明Pareto解可以通过最小化所有目标函数的线性凸组合来确定。通过寻找极大极小点得到所有参与者的分歧点。纳什议价解是在帕累托边界上选择一个点,使得不一致点的效用收益乘积最大。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Cooperative dynamic game, discrete time case
In this paper, we study the cooperative dynamic game problem for discrete time case. We solved this problem by determining Pareto solution, continued by finding Nash-bargaining solution. We assume the difference equation in this problem is linear and time invariant. The objective function for each player has the quadratic form and positive definite. We can proof that Pareto solution can be determined by minimizing linear convex combination of all objective functions. The disagreement point of all players is obtained by finding minimax point. The Nash-bargaining solution is selecting a point in Pareto frontier such that the product of utility gains from disagreement point is maximal.
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