Information Technology Reference
In-Depth Information
27. Rosenstein, M.T., Collins, J.J., De Luca, C.J. A practical method for calculating largest Lya-
punov exponents from small data sets. Physica D
65
, 117-134 (1993)
28. Sano, M., Sawada, Y. Measurement of the Lyapunov spectrum from a chaotic time series. Phys
Rev Lett
55
, 1082-1085 (1985)
29. Serfaty DeMarkus, A. Detection of the onset of numerical chaotic instabilities by Lyapunov
exponents. Discrete Dyn Nat Soc,
6
, 121-128 (2001)
30. Shimada, I., Nagashima, T. A Numerical approach to ergodic problem of dissipative dynami-
cal systems. Progr Theor Phys,
61
, 1605-1616 (1979)
31. Strogatz, S.H. Nonlinear Dynamics and Chaos. Perseus Books Publishing, Cambridge, MA
(1994)
32. Takens, F. Detecting strange attractors in turbulence. In: Rand, D.A., Young, L.-S. (eds.)
Dynamical Systems and Turbulence,
Lecture Notes in Mathematics
,Vol.
898
, pp. 366-381.
Springer-Verlag, New York (1981)
33. Wiesel,W.E. Modal feedback control on chaotic trajectories. Phys Rev E
49
, 1990-1996
(1994)
34. Wolf, A., Swift, J.B., Swinney, H.L., Vastano, J.A. Determining Lyapunov exponents from a
time series. Physica D
16
, 285-317 (1985)
35. Zeni, A.R., Gallas, J.A.C. Lyapunov exponents for a Duffing oscillator. Physica D
89
, 71-82
(1995)
