Robust Stability Analysis of Coupled Oscillators

S. Saleh, B. Barmish
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Abstract

Following Kharitonov's seminal theorem, a number of authors have developed criteria for analyzing the stability of a so-called polytope of polynomials. In this paper, we present a case study involving a polytope of polynomials carried out using the new results in [8]. More specifically, we consider a state space model describing a pair of coupled oscillators. Motivated by the fact that stability is guaranteed for small coupling, we consider the following question: How large can the off-diagonal interactions be before instabilty occurs? To this end, we use the new theory in [8] to generate bounds on the off-diagonal interactions under which stability is guaranteed. Our results indicate that these bounds increase as the frequency difference between the oscillators increases and as the damping increases.
耦合振荡器的鲁棒稳定性分析
继Kharitonov的开创性定理之后,许多作者开发了分析所谓多项式多面体稳定性的准则。在本文中,我们提出了一个案例研究,涉及使用[8]中的新结果进行的多项式多面体。更具体地说,我们考虑描述一对耦合振荡器的状态空间模型。考虑到小耦合保证稳定性的事实,我们考虑以下问题:在不稳定发生之前,非对角线相互作用可以有多大?为此,我们利用[8]中的新理论生成了保证稳定性的非对角相互作用的界。我们的结果表明,这些边界随着振子之间频率差的增加和阻尼的增加而增加。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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