Gelişmiş Arama

Basit öğe kaydını göster

dc.contributor.authorSteur, E.
dc.contributor.authorÜnal, Hakkı Ulaş
dc.contributor.authorvan Leeuwen, C.
dc.contributor.authorMichiels, W.
dc.date.accessioned2019-10-21T20:40:48Z
dc.date.available2019-10-21T20:40:48Z
dc.date.issued2016
dc.identifier.issn1536-0040
dc.identifier.urihttps://dx.doi.org/10.1137/15M1017752
dc.identifier.urihttps://hdl.handle.net/11421/20478
dc.descriptionWOS: 000391588600005en_US
dc.description.abstractSometimes a network of dynamical systems shows a form of incomplete synchronization, characterized by synchronization of some but not all of its component systems. This type of incomplete synchronization is called partial synchronization or cluster synchronization. Partial synchronization is associated with the existence of partial synchronization manifolds, which are linear invariant subspaces of C, the state space of the network of systems. We focus on partial synchronization manifolds in networks of identical systems, characterized by linear diffusive coupling described by a weighted graph, and allowing for time-delay in the coupling. We present equivalent existence criteria for partial synchronization manifolds in terms of invariant spaces, the block-structure of a reordered adjacency matrix, and the solvability of a Sylvester equation. We emphasize decomposable networks, according to the rational dependency structure of the coupling weights, and according to the delay values, respectively. It is obvious that if the existence conditions for partial synchronization manifolds are satisfied for all subnetworks simultaneously, they hold for the original network, yet the converse result is not always true, as we shall illustrate with an example. Furthermore, as our main results, we show that if the decomposition is according to the weights and the basis weights are rationally independent numbers, or if the decomposition is according to different delay values, then finding a partial synchronization manifold for the original network is equivalent to finding common partial synchronization manifolds for the subnetworks, i.e., restricting to the analysis of the subnetworks does not impose any conservatism, which simplifies the analysis significantly. For the case of decomposable networks according to the weights, with rationally independent basis weights, we provide a fourth existence criterion for partial synchronization manifolds in terms of a balanced coloring of an associated multigraph. In addition, we briefly describe publicly available software for detecting partial synchronization manifolds. Our equivalent existence criteria, which depend on the network and delay structure but not on the dynamics of the systems at the nodes, are sufficient for the presence of a partial synchronization manifold. We show that under a mild assumption on the systems at the nodes, namely, left-invertibility, these conditions are necessary as well. In all criteria it turns out that the distinction between noninvasive and invasive delayed coupling is important, i.e., whether or not a coupling term between two systems vanishes whenever the latter are synchronized.en_US
dc.description.sponsorshipProgramme of Interuniversity Attraction Poles of the Belgian Federal Science Policy Office (IAP P6-DYSCO); OPTEC, the Optimization in Engineering Center of KU Leuven; Research Foundation-Flanders (FWO) [G.0712.11N]; Odysseus grant from FWOen_US
dc.description.sponsorshipThis research was supported by the Programme of Interuniversity Attraction Poles of the Belgian Federal Science Policy Office (IAP P6-DYSCO), by OPTEC, the Optimization in Engineering Center of KU Leuven, and by project G.0712.11N of the Research Foundation-Flanders (FWO). The third author was supported by an Odysseus grant from FWO.en_US
dc.language.isoengen_US
dc.publisherSiam Publicationsen_US
dc.relation.isversionof10.1137/15M1017752en_US
dc.rightsinfo:eu-repo/semantics/closedAccessen_US
dc.subjectPartial Synchronizationen_US
dc.subjectDelayen_US
dc.subjectNetworksen_US
dc.titleCharacterization and Computation of Partial Synchronization Manifolds for Diffusive Delay-Coupled Systemsen_US
dc.typearticleen_US
dc.relation.journalSiam Journal On Applied Dynamical Systemsen_US
dc.contributor.departmentAnadolu Üniversitesi, Mühendislik Fakültesi, Elektrik ve Elektronik Mühendisliği Bölümüen_US
dc.identifier.volume15en_US
dc.identifier.issue4en_US
dc.identifier.startpage1874en_US
dc.identifier.endpage1915en_US
dc.relation.publicationcategoryMakale - Uluslararası Hakemli Dergi - Kurum Öğretim Elemanıen_US]
dc.contributor.institutionauthorÜnal, Hakkı Ulaş


Bu öğenin dosyaları:

Thumbnail

Bu öğe aşağıdaki koleksiyon(lar)da görünmektedir.

Basit öğe kaydını göster