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The transition to synchronization of networked systems

Atiyeh Bayani, Fahimeh Nazarimehr, Sajad Jafari, Kirill Kovalenko, Gonzalo Contreras-Aso, K. Alfaro-Bittner, Rubén J. Sánchez-García, Stefano Boccaletti

2024Nature Communications42 citationsDOIOpen Access PDF

Abstract

We study the synchronization properties of a generic networked dynamical system, and show that, under a suitable approximation, the transition to synchronization can be predicted with the only help of eigenvalues and eigenvectors of the graph Laplacian matrix. The transition comes out to be made of a well defined sequence of events, each of which corresponds to a specific clustered state. The network's nodes involved in each of the clusters can be identified, and the value of the coupling strength at which the events are taking place can be approximately ascertained. Finally, we present large-scale simulations which show the accuracy of the approximation made, and of our predictions in describing the synchronization transition of both synthetic and real-world large size networks, and we even report that the observed sequence of clusters is preserved in heterogeneous networks made of slightly non-identical systems.

Topics & Concepts

Eigenvalues and eigenvectorsSynchronization (alternating current)Laplacian matrixCoupling strengthStochastic matrixSequence (biology)Computer scienceComplex networkGraphTopology (electrical circuits)Complex systemStatistical physicsMathematicsTheoretical computer sciencePhysicsCombinatoricsArtificial intelligenceChemistryMachine learningMarkov chainCondensed matter physicsQuantum mechanicsWorld Wide WebBiochemistryNonlinear Dynamics and Pattern FormationNeural Networks Stability and SynchronizationOpinion Dynamics and Social Influence