Triply Bifurcations and Metric Universalities in 1D Trimodal Maps

Authors

  • Zhong Zhou

DOI:

https://doi.org/10.54097/zbqk3193

Keywords:

Symbolic dynamics, Triply bifurcation, Metric Universalities

Abstract

The famous Feigenbaum’s constants such as scaling factor and convergence rate can be measured and recomputed in unimodal maps, one of the methods is by the n-tupling bifurcations to chaos and parameter calculation algorithm which are called star transformation and word-lifting technique respectively. In the paper, we presented a kind of simple triply star transformation rule and the corresponding proof of admissible three super-stable kneading sequences (TSSKS), a few of TSSKS to chaos by triply bifurcations and the metric universalities are investigated.

References

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[3] Ringland J, Tresser C. A genealogy for finite kneading sequences of bimodal maps on the interval. Trans Am Math Soc, 1995, 347: 4599–4624.

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[5] Peng S-L, Zhang X-S, Cao K-F. Dual star products and metric universality in symbolic dynamics of three letters. Phys Lett A, 1998, 246: 87–96.

[6] Hao B-L. Elementary Symbolic Dynamics and Chaos in Dissipative Systems. Singapore: World Scientific, 1989.

[7] Z. Zhou, K.F. Cao. An effective numerical method of the word-lifting technique in one-dimensional multimodal maps, Phys. Lett. A, 2000, 310: 52-59.

[8] Feigenbaum M J. The universal metric properties of nonlinear transformations. J Stat Phys, 1979, 21: 669–706.

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Published

15-11-2024

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Section

Articles

How to Cite

Zhou, Z. (2024). Triply Bifurcations and Metric Universalities in 1D Trimodal Maps. Journal of Computing and Electronic Information Management, 15(1), 11-15. https://doi.org/10.54097/zbqk3193