039812720240111140836.520131106235959.90003279098000078488731685810.1016/j.jfranklin.2013.03.019Robust synchronization of a class of chaotic networks13 s.Ecav_un_epca*02537790016-0032Journal of the Franklin Institute-Engineering and Applied Mathematics35010 (2013)2936-2948Elseviergeneralized Lorenz systemrobust synchronizationdynamical complex networkcav_un_auth*0101074ČelikovskýSergejTeorie řízeníDepartment of Control Theory TŘTRUTIA-BDepartment of Control TheoryÚstav teorie informace a automatizace AV ČR, v. v. i.cav_un_auth*0215855LynnykVolodymyrTeorie řízeníDepartment of Control Theory TŘTRUTIA-BDepartment of Control TheoryÚstav teorie informace a automatizace AV ČR, v. v. i.cav_un_auth*0293225ChenG.CNtextový dokumenthttp://library.utia.cas.cz/separaty/2013/TR/celikovsky-0398127.pdf1,2 MBGAP103/12/1794GA ČRCZcav_un_auth*0283207This paper studies synchronization of a dynamical complex network consisting of nodes being generalized Lorenz chaotic systems and connections created with transmitted synchronizing signals. The focus is on the robustness of the network synchronization with respect to its topology. The robustness is analyzed theoretically for the case of two nodes with two-sided (bidirectional) connections, and numerically for various cases with large numbers of nodes. It is shown that, unless a certai nminimal coherent topology is present in the network, synchronization is always preserved. While for a minimal network where,the resulting synchrony reduces to semi-global if redundant connections are added.2014BC3 4 A 4a 20231122135900.0 RVO:67985556 http://hdl.handle.net/11104/0225710 1 cav_un_auth*0295056ČVUTČeské vysoké učení technické v PrazeCZPraha 6AUTOMATIONCONTROLSYSTEMS|ENGINEERINGELECTRICALELECTRONIC|ENGINEERINGMULTIDISCIPLINARY|MATHEMATICSINTERDISCIPLINARYAPPLICATIONS2.3960.2544.IV0.005950.57625461971.046ScienceCitationIndexExpandedQ154.21584.584Q2Q22013 Soubory v repozitáři: celikovsky-0398127.pdf 84887316858 SCOPUS 000327909800007 WOS textový dokument 1,2 MB cav_un_epca*0253779 Journal of the Franklin Institute-Engineering and Applied Mathematics 0016-0032 1879-2693 Roč. 350 č. 10 2013 2936 2948 Elsevier