Convergent and oscillatory solutions in infinite-dimensional synchronization systems

Q3 Physics and Astronomy

Cybernetics and Physics Pub Date : 2023-12-31 DOI:10.35470/2226-4116-2023-12-4-257-263

Alexandr P. Elsakov, A. Proskurnikov, V. Smirnova

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Abstract

Control systems that arise in phase synchronization problems are featured by infinite sets of stable and unstable equilibria, caused by presence of periodic nonlinearities. For this reason, such systems are often called “pendulum-like”. Their dynamics are thus featured by multi-stability and cannot be examined by classical methods that have been developed to test the global stability of a unique equilibrium point. In general, only sufficient conditions for the solution convergence are known that are usually derived for pendulum-like systems of Lurie type, that is, interconnections of stable LTI blocks and periodic nonlinearities, which obey sector or slope restrictions. Most typically, these conditions are written as multi-parametric frequency-domain inequalities, which should be satisfied by the transfer function of the system’s linear part. Remarkably, if the frequency-domain inequalities hold outside some bounded range of frequencies, then the absence of periodic solutions with frequencies in this range is guaranteed, which can be considered as a weaker asymptotical property.

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无穷维同步系统中的收敛解和振荡解

相位同步问题中出现的控制系统的特点是，由于存在周期性非线性因素，会出现无穷多个稳定和不稳定的平衡点。因此，这类系统通常被称为 "钟摆式 "系统。因此，它们的动力学具有多重稳定性，无法用为测试唯一平衡点的全局稳定性而开发的经典方法进行检验。一般来说，我们只知道解收敛的充分条件，这些条件通常是针对 Lurie 类型的类摆系统得出的，即稳定的 LTI 块和周期性非线性的相互连接，服从扇形或斜率限制。最典型的情况是，这些条件被写成多参数频域不等式，系统线性部分的传递函数应满足这些条件。值得注意的是，如果频域不等式在某个有界频率范围外成立，那么就能保证在此范围内不存在周期性解，这可以看作是一种较弱的渐近特性。

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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来源期刊

Cybernetics and Physics Chemical Engineering-Fluid Flow and Transfer Processes

CiteScore

1.70

自引率

0.00%

发文量

审稿时长

10 weeks

期刊介绍： The scope of the journal includes: -Nonlinear dynamics and control -Complexity and self-organization -Control of oscillations -Control of chaos and bifurcations -Control in thermodynamics -Control of flows and turbulence -Information Physics -Cyber-physical systems -Modeling and identification of physical systems -Quantum information and control -Analysis and control of complex networks -Synchronization of systems and networks -Control of mechanical and micromechanical systems -Dynamics and control of plasma, beams, lasers, nanostructures -Applications of cybernetic methods in chemistry, biology, other natural sciences The papers in cybernetics with physical flavor as well as the papers in physics with cybernetic flavor are welcome. Cybernetics is assumed to include, in addition to control, such areas as estimation, filtering, optimization, identification, information theory, pattern recognition and other related areas.