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Mean-field nature of synchronization stability in networks with multiple interaction layers

Charo I. del Genio, Sergio Faci-Lázaro, Jesús Gómez‐Gardeñes, Stefano Boccaletti

2022Communications Physics14 citationsDOIOpen Access PDF

Abstract

Abstract The interactions between the components of many real-world systems are best modelled by networks with multiple layers. Different theories have been proposed to explain how multilayered connections affect the linear stability of synchronization in dynamical systems. However, the resulting equations are computationally expensive, and therefore difficult, if not impossible, to solve for large systems. To bridge this gap, we develop a mean-field theory of synchronization for networks with multiple interaction layers. By assuming quasi-identical layers, we obtain accurate assessments of synchronization stability that are comparable with the exact results. In fact, the accuracy of our theory remains high even for networks with very dissimilar layers, thus posing a general question about the mean-field nature of synchronization stability in multilayer networks. Moreover, the computational complexity of our approach is only quadratic in the number of nodes, thereby allowing the study of systems whose investigation was thus far precluded.

Topics & Concepts

Synchronization (alternating current)Stability (learning theory)Quadratic equationComputer scienceMean field theoryField (mathematics)Complex networkSynchronization networksDynamical systems theoryMathematicsStatistical physicsTopology (electrical circuits)PhysicsPure mathematicsCombinatoricsWorld Wide WebMachine learningQuantum mechanicsGeometryNonlinear Dynamics and Pattern FormationNeural Networks Stability and SynchronizationOpinion Dynamics and Social Influence
Mean-field nature of synchronization stability in networks with multiple interaction layers | Litcius