Litcius/Paper detail

Synchrony for Weak Coupling in the Complexified Kuramoto Model

Moritz Thümler, Shesha Gopal Marehalli Srinivas, Malte Schröder, Marc Timme

2023Physical Review Letters18 citationsDOIOpen Access PDF

Abstract

We present the finite-size Kuramoto model analytically continued from real to complex variables and analyze its collective dynamics. For strong coupling, synchrony appears through locked states that constitute attractors, as for the real-variable system. However, synchrony persists in the form of complex locked states for coupling strengths K below the transition K^{(pl)} to classical phase locking. Stable complex locked states indicate a locked subpopulation of zero mean frequency in the real-variable model and their imaginary parts help identifying which units comprise that subpopulation. We uncover a second transition at K^{'}<K^{(pl)} below which complex locked states become linearly unstable yet still exist for arbitrarily small coupling strengths.

Topics & Concepts

Kuramoto modelCoupling (piping)AttractorPhysicsComplex systemStatistical physicsVariable (mathematics)Phase lockingPhase (matter)Phase transitionZero (linguistics)Quantum mechanicsSynchronization (alternating current)Topology (electrical circuits)Mathematical analysisComputer scienceMathematicsMaterials scienceCombinatoricsArtificial intelligenceLinguisticsPhilosophyMetallurgyNonlinear Dynamics and Pattern FormationSlime Mold and Myxomycetes ResearchNeural dynamics and brain function