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High-order phase reduction for coupled oscillators

Erik Gengel, Erik Teichmann, Michael G. Rosenblum, Arkady Pikovsky

2020Journal of Physics Complexity43 citationsDOIOpen Access PDF

Abstract

Abstract We explore the phase reduction in networks of coupled oscillators in the higher orders of the coupling parameter. For coupled Stuart–Landau oscillators, where the phase can be introduced explicitly, we develop an analytic perturbation procedure to explicitly obtain the higher-order approximation. We demonstrate this by deriving the second-order phase equations for a network of three Stuart–Landau oscillators. For systems where explicit expressions of the phase are not available, we present a numerical procedure that constructs the phase dynamics equations for a small network of coupled units. We apply this approach to a network of three van der Pol oscillators and reveal components in the coupling with different scaling in the interaction strength.

Topics & Concepts

Coupling (piping)Coupling strengthScalingPerturbation (astronomy)Reduction (mathematics)Phase (matter)Statistical physicsOrder (exchange)Perturbation theory (quantum mechanics)Van der Pol oscillatorPhysicsTopology (electrical circuits)MathematicsQuantum mechanicsNonlinear systemEngineeringCombinatoricsGeometryEconomicsFinanceMechanical engineeringCondensed matter physicsNonlinear Dynamics and Pattern FormationLiquid Crystal Research AdvancementsPhotonic and Optical Devices
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