Department of Physics, University of Warwick, Coventry CV47AL, England
Ref: J. C. Sprott, and G. Rowlands, International Journal of Bifurcation and Chaos 11, 1865-1880 (2001)
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Fig. 1. Shapes of general symmetric maps for various alpha
Fig. 2. Probability density for the logistic map with A =
Fig. 3. Average measure for the maximum x values for the
Fig. 4. Plot showing slow convergence of the correlation dimension
the logistic map.
Fig. 5. Calculated correlation dimension for the maps in Eq. (3) for
Fig. 6. A measure of the slowness of convergence for the maps in Eq.
(3) for various alpha.
Fig. 7. The Zaslavsky map switches back and forth from 1-D to 2-D
on the scale.
Fig. 8. Convergence of the correlation dimension for the Zaslavsky
shows large oscillations.
Fig. 9. Convergence of the correlation dimension for the Rossler
resembles the logistic map.