One‐dimensional maps with complete grammar are investigated in both permanent and transient chaotic cases. The discussion focuses on statistical characteristics such as Lyapunov exponent, generalized entropies and dimensions, free energies, and their finite size corrections. Our approach is based on the eigenvalue problem of generalized Frobenius–Perron operators, which are treated numerically as well as by perturbative and other analytical methods. The examples include the universal chaos function relevant near the period doubling threshold. Special emphasis is put on the entropies and their decay rates because of their invariance under the most general class of coordinate changes. Phase‐transition‐like phenomena at the border state of chaos due to intermittency and super instability are presented.
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January 1993
Research Article|
January 01 1993
Statistical properties of chaos demonstrated in a class of one‐dimensional maps
András Csordás;
András Csordás
Research Institute for Solid State Physics of the Hungarian Academy of Sciences, P. O. Box 49, H‐1525 Budapest, Hungary
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Géza Györgyi;
Géza Györgyi
Institute for Theoretical Physics, Eötvös University, Puskin u. 5‐7, H‐1088 Budapest, Hungary
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Péter Szépfalusy;
Péter Szépfalusy
Institute for Solid State Physics, Eötvös University, Múzeum krt. 6‐8, H‐1088 Budapest, Hungary
Research Institute for Solid State Physics of the Hungarian Academy of Sciences, P. O. Box 49, H‐1525 Budapest, Hungary
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Tamás Tél
Tamás Tél
Institute for Theoretical Physics, Eötvös University, Puskin u. 5‐7, H‐1088 Budapest, Hungary
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Chaos 3, 31–49 (1993)
Article history
Received:
February 04 1992
Accepted:
November 16 1992
Citation
András Csordás, Géza Györgyi, Péter Szépfalusy, Tamás Tél; Statistical properties of chaos demonstrated in a class of one‐dimensional maps. Chaos 1 January 1993; 3 (1): 31–49. https://doi.org/10.1063/1.165977
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