Identification methods for ordinal potential differential games

Balint Varga, Da Huang, Sören Hohmann
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Abstract

This paper introduces two new identification methods for linear quadratic (LQ) ordinal potential differential games (OPDGs). Potential games are notable for their benefits, such as the computability and guaranteed existence of Nash Equilibria. While previous research has analyzed ordinal potential static games, their applicability to various engineering applications remains limited. Despite the earlier introduction of OPDGs, a systematic method for identifying a potential game for a given LQ differential game has not yet been developed. To address this gap, we propose two identification methods to provide the quadratic potential cost function for a given LQ differential game. Both methods are based on linear matrix inequalities (LMIs). The first method aims to minimize the condition number of the potential cost function’s parameters, offering a faster and more precise technique compared to earlier solutions. In addition, we present an evaluation of the feasibility of the structural requirements of the system. The second method, with a less rigid formulation, can identify LQ OPDGs in cases where the first method fails. These novel identification methods are verified through simulations, demonstrating their advantages and potential in designing and analyzing cooperative control systems.

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序数势差博弈的识别方法
本文介绍了线性二次(LQ)序数势差博弈(OPDGs)的两种新识别方法。潜在博弈因其可计算性和保证纳什均衡的存在等优点而备受关注。虽然之前的研究已经分析了顺序势能静态博弈,但它们在各种工程应用中的适用性仍然有限。尽管 OPDGs 的引入时间较早,但对于给定的 LQ 微分博弈,尚未开发出一种识别潜在博弈的系统方法。针对这一空白,我们提出了两种识别方法,以提供给定 LQ 微分博弈的二次潜在成本函数。这两种方法都基于线性矩阵不等式(LMI)。第一种方法旨在最小化潜在成本函数参数的条件数,与早期的解决方案相比,提供了一种更快、更精确的技术。此外,我们还对系统结构要求的可行性进行了评估。第二种方法的表述不那么严格,可以在第一种方法失败的情况下识别 LQ OPDG。我们通过模拟验证了这些新颖的识别方法,证明了它们在设计和分析协同控制系统方面的优势和潜力。
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自引率
11.50%
发文量
352
期刊介绍: Computational & Applied Mathematics began to be published in 1981. This journal was conceived as the main scientific publication of SBMAC (Brazilian Society of Computational and Applied Mathematics). The objective of the journal is the publication of original research in Applied and Computational Mathematics, with interfaces in Physics, Engineering, Chemistry, Biology, Operations Research, Statistics, Social Sciences and Economy. The journal has the usual quality standards of scientific international journals and we aim high level of contributions in terms of originality, depth and relevance.
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