论文信息 - Structure in the parameter dependence of order and chaos for the quadratic map

Structure in the parameter dependence of order and chaos for the quadratic map

Many dynamical systems are thought to exhibit windows of attracting periodic behaviour for arbitrarily small perturbations from parameter values yielding chaotic attractors. This structural instability of chaos is particularly well documented and understood for the case of the one-dimensional quadratic map. In this paper we attempt to numerically characterize the global parameter-space structure of the dense set of periodic `windows' occurring in the chaotic regime of the quadratic map. In particular, we use scaling techniques to extract information on the probability distribution of window parameter widths as a function of period and location of the window in parameter space. We also use this information to obtain the uncertainty exponent which is a quantity that globally characterizes the ability to identify chaos in the presence of small parameter uncertainties.

Edward Ott | Brian R. Hunt | E. Ott | B. Hunt

[1] J. Yorke,et al. Final state sensitivity: An obstruction to predictability , 1983 .

[2] Celso Grebogi,et al. Exterior dimension of fat fractals , 1985 .

[3] Hiroki Hata,et al. On Partial Dimensions and Spectra of Singularities of Strange Attractors , 1987 .

[4] Grebogi,et al. Scaling behavior of windows in dissipative dynamical systems. , 1985, Physical review letters.

[5] Grzegorz Swiatek,et al. Generic hyperbolicity in the logistic family , 1997 .

[6] H. Capel,et al. Windows in one-dimensional maps , 1991 .

[7] Farmer. Sensitive dependence on parameters in nonlinear dynamics. , 1985, Physical review letters.

[8] J. Yorke,et al. Fractal basin boundaries , 1985 .

[9] P. Grassberger,et al. Scaling laws for invariant measures on hyperbolic and nonhyperbolic atractors , 1988 .