具有扰动收益的有限对策的稳定性核

Q4 Engineering

Control and Cybernetics Pub Date : 2022-03-01 DOI:10.2478/candc-2022-0001

V. Emelichev, Y. Nikulin

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引用次数: 0

摘要

摘要引入了几个参与人的有限合作博弈的参数化均衡概念。这个概念是通过将一组玩家划分成联盟来定义的。这种划分的两个极端情况分别对应于帕累托最优和纳什均衡结果。游戏的特点是它的矩阵，其中每个元素都是独立扰动的主题。，即由一组加性矩阵组成一组摄动矩阵，在结果空间和判据空间中分别指定两个任意Hölder范数。我们对所谓的稳定性核进行后最优分析。找到了这种扰动的最高水平的解析表达式。数值例子说明了一些相关的情况。

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Stability kernel in finite games with perturbed payoffs

Abstract The parametric concept of equilibrium in a finite cooperative game of several players in a normal form is introduced. This concept is defined by the partitioning of a set of players into coalitions. Two extreme cases of such partitioning correspond to Pareto optimal and Nash equilibrium outcomes, respectively. The game is characterized by its matrix, in which each element is a subject for independent perturbations., i.e. a set of perturbing matrices is formed by a set of additive matrices, with two arbitrary Hölder norms specified independently in the outcome and criterion spaces. We undertake post-optimal analysis for the so-called stability kernel. The analytical expression for supreme levels of such perturbations is found. Numerical examples illustrate some of the pertinent cases.

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来源期刊

Control and Cybernetics 工程技术-计算机：控制论

CiteScore

0.50

自引率

0.00%

发文量

期刊介绍： The field of interest covers general concepts, theories, methods and techniques associated with analysis, modelling, control and management in various systems (e.g. technological, economic, ecological, social). The journal is particularly interested in results in the following areas of research: Systems and control theory: general systems theory, optimal cotrol, optimization theory, data analysis, learning, artificial intelligence, modelling & identification, game theory, multicriteria optimisation, decision and negotiation methods, soft approaches: stochastic and fuzzy methods, computer science,