| ID | 114911 |
| Author |
Ueta, Tetsushi
The University of Tokushima
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| Keywords | directional coloring
chaos
invariant pattern
fractal
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| Content Type |
Journal Article
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| Description | We propose a visualization method called the directional coloring for chaotic attractors in planer discrete systems. A color in the hue circle is assigned to the argument determined by the current point and its n-th mapped point. Some unstable n-periodic points embedded in the chaotic attractor become visible as radiation points and they can be accurately detected by combination of this coloring and the Newton's method. For a chaotic attractor in a non-invertible map, we find out invariant patterns around the fixed point and detect its nearest unstable n-periodic point. The computed results of their locations show a fractal property of the system.
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| Journal Title |
Nonlinear Theory and Its Applications, IEICE
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| ISSN | 21854106
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| Publisher | The Institute of Electronics, Information and Communication Engineers
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| Volume | 3
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| Issue | 4
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| Start Page | 497
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| End Page | 507
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| Published Date | 2012-10-01
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| Rights | © IEICE 2012
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| EDB ID | |
| DOI (Published Version) | |
| URL ( Publisher's Version ) | |
| FullText File | |
| language |
eng
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| TextVersion |
Publisher
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| departments |
Center for Administration of Information Technology
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