ID | 115703 |
Author |
Inaba, Naohiko
Meiji University
Sekikawa, Munehisa
Utsunomiya University
Shinotsuka, Yoshimasa
Meiji University
Kamiyama, Kyohei
Meiji University
Yoshinaga, Tetsuya
The University of Tokushima
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Endo, Tetsuro
Meiji University
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Content Type |
Journal Article
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Description | Bifurcation transitions between a 1D invariant closed curve (ICC), corresponding to a 2D torus in vector fields, and a 2D invariant torus (IT), corresponding to a 3D torus in vector fields, have been the subjects of intensive research in recent years. An existing hypothesis involves the bifurcation boundary between a region generating an ICC and a region generating an IT. It asserts that an IT would be generated from a stable fixed point as a consequence of two Hopf (or two Neimark–Sacker) bifurcations. We assume that this hypothesis may puzzle many researchers because it is difficult to assess its validity, although it seems to be a reasonable bifurcation scenario at first glance. To verify this hypothesis, we conduct a detailed Lyapunov analysis for a coupled delayed logistic map that can generate an IT, and indicate that this hypothesis does not hold according to numerical results. Furthermore, we show that a saddle-node bifurcation of unstable periodic points does not coincide with the bifurcation boundary between an ICC and an IT. In addition, the bifurcation boundaries of torus doubling do not coincide with a period-doubling bifurcation of unstable periodic points. To conclude, torus bifurcations have no relation with the bifurcations of unstable periodic points. Additionally, we exactly derive a quasi-periodic Hopf bifurcation boundary introducing a double Poincaré map.
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Journal Title |
Progress of Theoretical and Experimental Physics
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ISSN | 20503911
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Publisher | The Physical Society of Japan|Oxford University Press
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Volume | 2014
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Issue | 2
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Start Page | 023A01
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Published Date | 2014-02-01
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Remark | 著者英表記誤記あり (誤)Naohikio Inaba →(正)Naohiko Inaba
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Rights | This is an Open Access article distributed under the terms of the Creative Commons Attribution License (http://creativecommons.org/licenses/by/3.0/), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
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language |
eng
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departments |
Medical Sciences
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