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Generalized splay states in phase oscillator networks

Rico Berner, Serhiy Yanchuk, Yuri Maistrenko, Eckehard Schöll

2021Chaos An Interdisciplinary Journal of Nonlinear Science26 citationsDOIOpen Access PDF

Abstract

Networks of coupled phase oscillators play an important role in the analysis of emergent collective phenomena. In this article, we introduce generalized m-splay states constituting a special subclass of phase-locked states with vanishing mth order parameter. Such states typically manifest incoherent dynamics, and they often create high-dimensional families of solutions (splay manifolds). For a general class of phase oscillator networks, we provide explicit linear stability conditions for splay states and exemplify our results with the well-known Kuramoto-Sakaguchi model. Importantly, our stability conditions are expressed in terms of just a few observables such as the order parameter or the trace of the Jacobian. As a result, these conditions are simple and applicable to networks of arbitrary size. We generalize our findings to phase oscillators with inertia and adaptively coupled phase oscillator models.

Topics & Concepts

ObservableStability (learning theory)MathematicsClass (philosophy)Simple (philosophy)Phase (matter)TRACE (psycholinguistics)Order (exchange)Statistical physicsState (computer science)ObservabilityTopology (electrical circuits)PhysicsControl theory (sociology)Network analysisCoherent statesInertiaApplied mathematicsNonlinear Dynamics and Pattern FormationNonlinear Photonic SystemsCellular Automata and Applications