Increasing the Synchronization Stability in Complex Networks
Xian Wu, Kaihua Xi, Aijie Cheng, Hai Xiang Lin, Jan H. van Schuppen
TL;DR
This paper introduces an optimization approach to enhance synchronization stability in coupled phase oscillators affected by Gaussian noise, by increasing the mean first hitting time and identifying high-risk edges.
Contribution
It proposes a novel metric based on the invariant distribution to optimize and improve synchronization stability under stochastic disturbances.
Findings
Mean first hitting time can be significantly increased through optimization.
Vulnerable edges leading to desynchronization can be effectively identified.
Maximizing order parameter may reduce synchronization stability.
Abstract
We aim to increase the ability of a of coupled phase oscillators to maintain the synchronization when the system is affected by stochastic disturbances. We model the disturbances by Gaussian noise and use the mean first hitting time when the state hits the boundary of a secure domain, that is a subset of the basin of the attraction, to measure the synchronization stability. Based on the invariant probability distribution of a system of phase oscillators subject to Gaussian disturbances, we propose an optimization method to increase the mean first hitting time, and thus increase the synchronization stability. In this method, a new metric for the synchronization stability is defined as the probability of the state being absent from the secure domain, which reflects the impact of all the system parameters and the strength of the disturbances. Furthermore, by this new metric, one may…
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Taxonomy
TopicsNonlinear Dynamics and Pattern Formation · Cellular Automata and Applications