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Paper detail

Integrable order parameter dynamics of globally coupled oscillators

We study the nonlinear dynamics of globally coupled nonidentical oscillators in the framework of two order parameter (mean field and amplitude-frequency correlator) reduction. The main result of the paper is the exact solution of the corresponding nonlinear system on an attracting manifold. We present a complete classification of phase portraits and bifurcations, obtain explicit expressions for invariant manifolds (a limit cycle among them) and derive analytical solutions for arbitrary initial data and different regimes.

preprint2016arXivOpen access
G. M. PritulaV. I. PrytulaO. V. Usatenko
nlin.CDnlin.SI
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G. M. PritulaV. I. PrytulaO. V. Usatenko

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