Controlling Synchronization Patterns in Complex Networks

Lehnert, Judith

doi:10.1007/978-3-319-25115-8

Cited by 20 publications

(12 citation statements)

References 245 publications

(487 reference statements)

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“…The master stability function [50] (MSF) is elegant method that is often applied in physics because it separates the network properties from the dynamical properties of individual oscillators. This method also requires one to assume a form for the dynamic system, such as a normalized SNIPER bifurcation, Fitzhugh-Nagumo or Stuart-Landau [51]. Moreover, the derivation of the master stability function assumes linear coupling between the state variables of the oscillators; diffusive coupling is an example of linear coupling.…”

Section: Discussionmentioning

confidence: 99%

Globally attracting synchrony in a network of oscillators with all-to-all inhibitory pulse coupling

Canavier

Tikidji-Hamburyan

2017

Phys. Rev. E

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The synchronization tendencies of networks of oscillators have been studied intensely. We assume a network of all-to-all pulse-coupled oscillators in which the effect of a pulse is independent of the number of oscillators that simultaneously emit a pulse and the normalized delay (the phase resetting) is a monotonically increasing function of oscillator phase with the slope everywhere less than one and a value greater than 2φ−1, where φ is the normalized phase. Order switching cannot occur; the only possible solutions are globally attracting synchrony and cluster solutions with a fixed firing order. For small conduction delays, we prove the former stable and all other possible attractors nonexistent due to the destabilizing discontinuity of the phase resetting at a phase of 0.

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Section: Discussionmentioning

confidence: 99%

Globally attracting synchrony in a network of oscillators with all-to-all inhibitory pulse coupling

Canavier

Tikidji-Hamburyan

2017

Phys. Rev. E

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“…This fact allows for the relation between dynamical properties and the Laplacian structure of a network. It has been used, for instance, to introduce the powerful methodology of the master stability function [PEC98,LEH15b] . Linear coupling is in some sense the simplest type of coupling.…”

Section: Types Of Couplingmentioning

confidence: 99%

Patterns of Synchrony in Complex Networks of Adaptively Coupled Oscillators

Berner¹

2021

Springer Theses

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Collective phenomena in systems of interconnected dynamical units are omnipresent in nature. The swarm behavior in flocks of birds or schools of fish, the synchronous flashing of fireflies or even coherent spiking of neurons in the human brain are just a few examples of collective motion. Elucidating the mechanisms that give rise to synchronization is crucial in order to understand biological self-organization. For this sake, the theory of dynamical networks has been successfully applied over the last decades to boil down the complex dynamics from natural systems to their essentials. In addition, dynamical networks with adaptive couplings and hence non-constant network structure appear naturally in real-world systems such as power grid networks, social networks as well as neuronal networks. In this thesis, we study adaptive networks and their properties which give rise to the emergence of a variety of synchronization patterns, including complete and cluster synchronization as well as solitary and chimera-like states. One of the main fields of application that is investigated in this thesis concerns neuroscience. However, the methods and approaches developed in this work are not restricted to a specific field of application.aus gekoppelten Phasenoszillatoren an und zeigen, wie das subtile Zusammenspiel zwischen Adaptivität und Netzwerkstruktur die Entstehung komplexer partieller Synchronisationsmuster hervorruft.Trotz des regen Interesses an adaptiven Netzwerken ist über das Zusammenspiel adaptiv gekoppelter Netzwerkgruppen wenig bekannt. Solche adaptiven Mehrschicht-oder Multiplex-Netzwerke kommen in neuronalen Netzwerken ganz natürlich vor. Wir schlagen ein Konzept zur Erzeugung und Stabilisierung diverser partieller Synchronisationsmuster (Phasen-Cluster) in adaptiven Netzwerken vor. Wir zeigen, dass das "Multiplexen" verschiedene stabile Phasen-Cluster-Zustände induzieren kann, selbst wenn diese in den Einschicht-Systemen nicht stabil sind oder gar nicht existieren. Weiterhin entwickeln wir eine Methode zur Analyse von Laplace-Matrizen von Multiplex-Netzwerken, die einen Einblick in die spektrale Struktur dieser Netzwerke ermöglicht und damit eine Reduktion des Stabilitätsproblems auf die von Einschicht-Netzwerken ermöglicht. Wir setzen die neue Methode ein, um analytische Ergebnisse für die Stabilität der Zustände im Mehrschicht-System zu erhalten.

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“…There are a lot of synchronization phenomena in physical sciences and in mathematics. Several books and reviews [6][7][8][9] have also dealt with this topic. Such applications are pervasive and include clock synchronization in complex networks [10][11][12], coordination of unmanned aerial vehicles [13], and fair allocation of network resources [14].…”

Section: Introductionmentioning

confidence: 99%

Analysis and Design of Adaptive Synchronization of a Complex Dynamical Network with Time-Delayed Nodes and Coupling Delays

Zhao

et al. 2017

Mathematical Problems in Engineering

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This paper is devoted to the study of synchronization problems in uncertain dynamical networks with time-delayed nodes and coupling delays. First, a complex dynamical network model with time-delayed nodes and coupling delays is given. Second, for a complex dynamical network with known or unknown but bounded nonlinear couplings, an adaptive controller is designed, which can ensure that the state of a dynamical network asymptotically synchronizes at the individual node state locally or globally in an arbitrary specified network. Then, the Lyapunov-Krasovskii stability theory is employed to estimate the network coupling parameters. The main results provide sufficient conditions for synchronization under local or global circumstances, respectively. Finally, two typical examples are given, using the M-G system as the nodes of the ring dynamical network and second-order nodes in the dynamical network with time-varying communication delays and switching communication topologies, which illustrate the effectiveness of the proposed controller design methods.

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Controlling Synchronization Patterns in Complex Networks

Cited by 20 publications

References 245 publications

Globally attracting synchrony in a network of oscillators with all-to-all inhibitory pulse coupling

Globally attracting synchrony in a network of oscillators with all-to-all inhibitory pulse coupling

Patterns of Synchrony in Complex Networks of Adaptively Coupled Oscillators

Analysis and Design of Adaptive Synchronization of a Complex Dynamical Network with Time-Delayed Nodes and Coupling Delays

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