具有混合整数变量的广义纳什均衡问题

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
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引用次数: 0

摘要

摘要 我们考虑的是具有非凸策略空间和非凸成本函数的广义纳什均衡问题(GNEPs)。这一类博弈包括具有混合整数变量的重要博弈,文献中仅有少数几个结果。我们提出了一种新方法,通过使用 Nikaido-Isoda 函数的凸化技术来表征均衡。对于任何给定的 GNEP 实例,我们都会构建一组凸化实例,并证明当且仅当一个可行策略剖面是任何凸化实例的均衡且凸化成本函数与初始函数重合时,该策略剖面才是原始实例的均衡。我们从三个维度发展了这种凸化方法:我们首先证明,对于准线性模型,即存在一个凸化实例,其中对于对手棋手的固定策略,每个棋手的成本函数都是线性的,并且各自的策略空间都是多面体的,凸化将 GNEP 简化为一个标准(非线性)优化问题。其次,我们对凸化分别导致联合约束或联合凸GNEP的GNEP进行了两个完整的描述。这些特征需要与应用于可行策略受限子集的凸壳算子的相互作用有关的新概念,它们本身可能也很有趣。需要注意的是,这种表征在计算上也是相关的,因为文献中已经对共凸 GNEP 进行了广泛研究。最后,我们通过对与积分网络流和离散市场均衡相关的三类 GNEP 的均衡计算进行数值研究,证明了我们结果的适用性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Generalized Nash equilibrium problems with mixed-integer variables

Abstract

We consider generalized Nash equilibrium problems (GNEPs) with non-convex strategy spaces and non-convex cost functions. This general class of games includes the important case of games with mixed-integer variables for which only a few results are known in the literature. We present a new approach to characterize equilibria via a convexification technique using the Nikaido–Isoda function. To any given instance of the GNEP, we construct a set of convexified instances and show that a feasible strategy profile is an equilibrium for the original instance if and only if it is an equilibrium for any convexified instance and the convexified cost functions coincide with the initial ones. We develop this convexification approach along three dimensions: We first show that for quasi-linear models, where a convexified instance exists in which for fixed strategies of the opponent players, the cost function of every player is linear and the respective strategy space is polyhedral, the convexification reduces the GNEP to a standard (non-linear) optimization problem. Secondly, we derive two complete characterizations of those GNEPs for which the convexification leads to a jointly constrained or a jointly convex GNEP, respectively. These characterizations require new concepts related to the interplay of the convex hull operator applied to restricted subsets of feasible strategies and may be interesting on their own. Note that this characterization is also computationally relevant as jointly convex GNEPs have been extensively studied in the literature. Finally, we demonstrate the applicability of our results by presenting a numerical study regarding the computation of equilibria for three classes of GNEPs related to integral network flows and discrete market equilibria.

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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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