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Dynamics in the Kuramoto Model with a Discontinuous Bimodal Distribution of Natural Frequencies |
WU Xiao-Li, YANG Jun-Zhong** |
School of Science, Beijing University of Posts and Telecommunications, Beijing 100876
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Cite this article: |
WU Xiao-Li, YANG Jun-Zhong 2014 Chin. Phys. Lett. 31 060507 |
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Abstract We consider a Kuramoto model in which the natural frequencies of oscillators follow a discontinuous bimodal distribution constructed from a Lorentzian one. Different synchronous dynamics (such as different types of travelling wave states, standing wave states, and stationary synchronous states) are identified and the transitions between them are investigated. We find that increasing the asymmetry in frequency distribution brings the critical coupling strength to a low value and that strong asymmetry is unfavorable to standing wave states.
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Published: 26 May 2014
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PACS: |
05.45.-a
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(Nonlinear dynamics and chaos)
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05.45.Xt
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(Synchronization; coupled oscillators)
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Abstract
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