An extension of the entropic chaos degree and its positive effect
暂无分享,去创建一个
Ken Umeno | Kei Inoue | Hidetoshi Okutomi | Tomoyuki Mao | K. Umeno | Kei Inoue | Tomoyuki Mao | Hidetoshi Okutomi
[1] M. Ohya,et al. On relations among the entropic chaos degree, the Kolmogorov-Sinai entropy and the Lyapunov exponent , 2014 .
[2] Jon Wright. Method for calculating a Lyapunov exponent , 1984 .
[3] Masanori Ohya,et al. On a Combined Quantum Baker's Map and Its Characterization by Entropic Chaos Degree , 2009, Open Syst. Inf. Dyn..
[4] Sawada,et al. Measurement of the Lyapunov spectrum from a chaotic time series. , 1985, Physical review letters.
[5] I. V. Volovich,et al. Semiclassical properties and chaos degree for the quantum Baker’s map , 2002 .
[6] M. Rosenstein,et al. A practical method for calculating largest Lyapunov exponents from small data sets , 1993 .
[7] Yasuji Sawada,et al. Practical Methods of Measuring the Generalized Dimension and the Largest Lyapunov Exponent in High Dimensional Chaotic Systems , 1987 .
[8] Celso Grebogi,et al. Predictability in time series , 1995 .
[9] Ken Umeno,et al. Investigation of the difference between Chaos Degree and Lyapunov exponent for asymmetric tent maps , 2019, JSIAM Letters.
[10] A. Wolf,et al. Determining Lyapunov exponents from a time series , 1985 .
[11] M. Ohya. Complexities and Their Applications to Characterization of Chaos , 1998 .
[12] Keiko Sato,et al. APPLICATION OF CHAOS DEGREE TO SOME DYNAMICAL SYSTEMS , 1998, math-ph/9809026.
[13] Eckmann,et al. Liapunov exponents from time series. , 1986, Physical review. A, General physics.