References
- Trans. Amer. Math. Soc. v.344 Measures of chaos and a spectral decomposition of dynamical systems on the interval B. Schweizer;J. Smital
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- Phys. Lett. A v.87 Odd chaos T. Y. Li;M. Misiurewicz;G. Pianigiam;J. Yorke
- Northeast Math. J. v.2 Chian recurrent orbits of mappping of the interval G. F. Liao
- An Introduction to Ergodic Theory P. Walters
- Science of China (A) v.25 no.5 Administrative levels of orbit structure and topological semiconjugate Z. L. Zhou;W. H. He
- Journal of Jilin Normal University v.24 no.1 Recurrence, strong chaos and unique ergodicity L. D. Wang;Z. Y. Chu;G. F. Liao
- Dynamics in One Dimension L. S. Block;W. A. Coppel
- Bull. Austral. Math. Soc. v.39 Every chaotic interval map has a scrambled set in the recurrent set B. S. Du
- Acta. Math. Sci., New Series v.2 Set of almost periodic points of a continuous self-map of an interval J. C. Xiong
- Amer. Math. Monthly v.82 Period 3 implies chaos T. Y. Li;J. A. Yorke
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Prog. Theor. Phys. F
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${\neq}2^n$ implies chaos Y. Oono - J. Appl. Math. & Computing(old KJCAM) v.7 no.2 An algorithm for minimal dynamic flow Eleonor Ciurea