周期系统具有新的同步稳定性类别

Sajad Jafari, Atiyeh Bayani, Fatemeh Parastesh, Karthikeyan Rajagopal, Charo I. del Genio, Ludovico Minati, Stefano Boccaletti
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引用次数: 0

摘要

主稳定函数是确定耦合系统网络中同步稳定性条件的一个强大而有用的工具。虽然在节点为混乱动力学系统的情况下存在全面的分类,但其在周期系统中的应用还未得到深入探讨。通过研究几个著名的周期系统,我们建立了一个全面的框架来理解和分类它们的可同步性特性。具体来说,在周期系统中,主稳定函数在原点消失,因此它可以显示混沌系统中无法实现的行为类别,而在混沌系统中,主稳定函数严格以正值开始。此外,我们的研究结果对人们普遍认为周期系统很容易进入稳定的同步状态这一观点提出了质疑,相反,我们的研究结果表明,同步稳定性的阈值较低,这种情况很常见。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Periodic systems have new classes of synchronization stability
The Master Stability Function is a robust and useful tool for determining the conditions of synchronization stability in a network of coupled systems. While a comprehensive classification exists in the case in which the nodes are chaotic dynamical systems, its application to periodic systems has been less explored. By studying several well-known periodic systems, we establish a comprehensive framework to understand and classify their properties of synchronizability. This allows us to define five distinct classes of synchronization stability, including some that are unique to periodic systems. Specifically, in periodic systems, the Master Stability Function vanishes at the origin, and it can therefore display behavioral classes that are not achievable in chaotic systems, where it starts, instead, at a strictly positive value. Moreover, our results challenge the widely-held belief that periodic systems are easily put in a stable synchronous state, showing, instead, the common occurrence of a lower threshold for synchronization stability.
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