Kuramoto模型
同步(交流)
理论(学习稳定性)
计算机科学
控制理论(社会学)
惯性
黑森矩阵
稳定性条件
电力系统
数学优化
李雅普诺夫函数
复杂网络
功率(物理)
数学
应用数学
离散时间和连续时间
非线性系统
物理
人工智能
万维网
频道(广播)
机器学习
统计
经典力学
控制(管理)
量子力学
计算机网络
作者
Bo Li,K. Y. Michael Wong
出处
期刊:Physical review
[American Physical Society]
日期:2017-01-13
卷期号:95 (1)
被引量:34
标识
DOI:10.1103/physreve.95.012207
摘要
Maintaining the stability of synchronization state is crucial for the functioning of many natural and artificial systems. In this study, we develop methods to optimize the synchronization stability of the Kuramoto model by minimizing the dominant Lyapunov exponent. Using the recently proposed cut-set space approximation of the steady states, we greatly simplify the objective function, and further derive its gradient and Hessian with respect to natural frequencies, which leads to an efficient algorithm with the quasi-Newton's method. The optimized systems are demonstrated to achieve better synchronization stability for the Kuramoto model with or without inertia in certain regimes. Hence our method is applicable in improving the stability of power grids. It is also viable to adjust the coupling strength of each link to improve the stability of the system. Various operational constraints can also be easily integrated into our scope by employing the interior point method in convex optimization. The properties of the optimized networks are also discussed.
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