论近势差博弈的上限

IF 1.4 Q2 MATHEMATICS, APPLIED

Results in Applied Mathematics Pub Date : 2024-04-12 DOI:10.1016/j.rinam.2024.100453

Balint Varga

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引用次数: 0

摘要

这封信提出了线性二次近势微博弈（LQ NPDG）子类的扩展分析和新上界。LQ NPDGs 是势微分博弈的一个子类，对于它来说，LQ 精确势微分博弈和 LQ NPDG 之间存在一定距离。LQ NPDGs 表现出一个独特的特征：与 LQ 精确势微博弈的距离越小，它们的动态轨迹就越接近。这封信为这个距离引入了一个新的上界。此外，该距离与所产生的轨迹误差之间还建立了线性关系，为 LQ NPDGs 的进一步应用提供了可能。

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On the Upper Bound of Near Potential Differential Games

This letter presents an extended analysis and a novel upper bound of the subclass of Linear Quadratic Near Potential Differential Games (LQ NPDG). LQ NPDGs are a subclass of potential differential games, for which there is a distance between an LQ exact potential differential game and the LQ NPDG. LQ NPDGs exhibit a unique characteristic: The smaller the distance from an LQ exact potential differential game, the more closer their dynamic trajectories. This letter introduces a novel upper bound for this distance. Moreover, a linear relation between this distance and the resulting trajectory errors is established, opening the possibility for further application of LQ NPDGs.

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来源期刊

Results in Applied Mathematics Mathematics-Applied Mathematics

CiteScore

3.20

自引率

10.00%

发文量

审稿时长

23 days