Bibliograph. Daten | Avrutin, Viktor; Schanz, Michael; Schenke, Björn: Coexistence of the Bandcount-Adding and Bandcount-Increment Scenarios. In: Discrete Dynamics in Nature and Society. Vol. 2011(Article ID 681565). Universität Stuttgart, Fakultät Informatik, Elektrotechnik und Informationstechnik. S. 1-30, englisch. Online (Hindawi Publishing Corporation), Januar 2011. DOI: 10.1155/2011/681565. Artikel in Zeitschrift.
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CR-Klassif. | J.2 (Physical Sciences and Engineering) G.2 (Discrete Mathematics)
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Kurzfassung | We investigate the structure of the chaotic domain of a specific one-dimensional piecewise linear map with one discontinuity. In this system, the region of “robust" chaos is embedded between two periodic domains. One of them is organized by the period-adding scenario whereas the other one by the period-increment scenario with coexisting attractors. In the chaotic domain, the influence of both adjacent periodic domains leads to the coexistence of the recently discovered bandcount adding and bandcount-increment scenarios. In this work, we focus on the explanation of the overall structure of the chaotic domain and a description of the bandcount adding and bandcount increment scenarios.
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Volltext und andere Links | Online
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Kontakt | E-Mail: Bjoern.Schenke@ipvs.uni-stuttgart.de |
Abteilung(en) | Universität Stuttgart, Institut für Parallele und Verteilte Systeme, Bildverstehen
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Projekt(e) | AnT, OCiND
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Eingabedatum | 25. Mai 2011 |
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