Influence of cumulative damage on synchronizationof Kuramoto oscillators on networks

Journal of Physics A Pub Date : 2023-10-30 DOI:10.1088/1751-8121/ad043b

L K Eraso-Hernandez, Alejandro P Riascos

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引用次数: 1

Abstract

Abstract In this paper, we study the synchronization of identical Kuramoto phase oscillators under cumulative stochastic damage to the edges of networks. We analyze the capacity of coupled oscillators to reach a coherent state from initial random phases. The process of synchronization is a global function performed by a system that gradually changes when the damage weakens individual connections of the network. We explore diverse structures characterized by different topologies. Among these are deterministic networks as a wheel or the lattice formed by the movements of the knight on a chess board, and random networks generated with the Erdős–Rényi and Barabási–Albert algorithms. In addition, we study the synchronization times of 109 non-isomorphic graphs with six nodes. The synchronization times and other introduced quantities are sensitive to the impact of damage, allowing us to measure the reduction of the capacity of synchronization and classify the effect of damage in the systems under study. This approach is general and paves the way for the exploration of the effect of damage accumulation in diverse dynamical processes in complex systems.

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累积损伤对网络上Kuramoto振子同步的影响

摘要研究了在网络边缘随机累积损伤情况下，相同Kuramoto相位振子的同步问题。我们分析了耦合振荡器从初始随机相位达到相干态的能力。同步过程是一个系统执行的全局功能，当破坏削弱了网络的单个连接时，系统会逐渐发生变化。我们探索具有不同拓扑结构的不同结构。其中包括确定性网络，如一个轮子或棋盘上骑士的移动形成的格子，以及由Erdős-Rényi和Barabási-Albert算法生成的随机网络。此外，我们还研究了109个六节点非同构图的同步时间。同步时间和其他引入的量对损坏的影响很敏感，使我们能够测量同步能力的减少，并对所研究的系统中的损坏影响进行分类。该方法具有通用性，为探索复杂系统中不同动力过程的损伤累积效应铺平了道路。

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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Journal of Physics A

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