Research Article

Discrete Superior Hyperbolicity in Chaotic Maps

Volume: 3 Number: 1 June 30, 2021
EN

Discrete Superior Hyperbolicity in Chaotic Maps

Abstract

In the last few decades, the dynamics of one-dimensional chaotic maps have gained the tremendous attention of scientists and scholars due to their remarkable properties such as period-doubling, chaotic evolution, Lyapunov exponent, etc. The term hyperbolicity, another important property of chaotic maps is used to examine the regular and irregular behavior of the dynamical systems. In this article, we deal with the hyperbolicity and stabilization of fixed states using a superior two-step feedback system. Due to the superiority in the chaotic evolution of one-dimensional maps in the superior system we are encouraged to examine the hyperbolicity and stabilization in chaotic maps. The hyperbolic notion, hyperbolicity in periodic states of prime order, stabilization, and the hyperbolic set of the chaotic maps are studied. The numerical, as well as experimental simulations, are carried out, followed by theorems, examples, remarks, functional plots, and bifurcation diagrams.

Keywords

Supporting Institution

King Abdulaziz University, Jeddah, Saudi Arabia

Project Number

FP-108-42

Thanks

Thanks.

References

  1. Adiyaman, Y., S. Emiroglu, M. Ucar and M. Yildiz, 2020 Dynamical analysis, electronic circuit design and control application of a different chaotic system, Chaos Theory and Applications 02: 10-16.
  2. Akgul, A., Kaçar, S., Aricıoglu, B., and Pehlivan, I., Text encryption by using one-dimensional chaos generators and nonlinear equations. In 2013 8th International Conference on Electrical and Electronics Engineering (ELECO), IEEE 320-323.
  3. Alligood, K. T., T. D. Sauer and J. A. Yorke, 1996 Chaos : An Introduction to Dynamical Systems, Springer Verlag, New York Inc.
  4. Andrecut, M., 1998 Logistic map as a random number generator, International Journal of Modern Physics B 12: 101-102.
  5. Ashish, J. Cao and R. Chugh, 2018 Chaotic behavior of logistic map in superior orbit and an improved chaos-based traffic control model, Nonlinear Dynamics 94: 959-975.
  6. Ashish and J. Cao, 2019a A novel fixed point feedback approach studying the dynamcial behaviour of standard logistic map, International Journal of Bifurcation and Chaos 29: 1950010-16, 16 pages.
  7. Ashish, J. Cao and R. Chugh, 2019b Controlling chaos using superior feedback technique with applications in discrete traffic models, International Journal of Fuzzy System 21: 1467-1479.
  8. Ashish, J. Cao and R. Chugh, 2021 Discrete chaotification in modulated logistic system, International Journal of Bifurcation and Chaos 31: 2150065, 14 Pages.

Details

Primary Language

English

Subjects

Software Engineering (Other)

Journal Section

Research Article

Publication Date

June 30, 2021

Submission Date

May 13, 2021

Acceptance Date

June 15, 2021

Published in Issue

Year 2021 Volume: 3 Number: 1

APA
Ashish, A., Cao, J., Alsaadi, F., & Malik, A. K. (2021). Discrete Superior Hyperbolicity in Chaotic Maps. Chaos Theory and Applications, 3(1), 34-42. https://doi.org/10.51537/chaos.936679
AMA
1.Ashish A, Cao J, Alsaadi F, Malik AK. Discrete Superior Hyperbolicity in Chaotic Maps. CHTA. 2021;3(1):34-42. doi:10.51537/chaos.936679
Chicago
Ashish, Ashish, Jinde Cao, Fawaz Alsaadi, and A. K. Malik. 2021. “Discrete Superior Hyperbolicity in Chaotic Maps”. Chaos Theory and Applications 3 (1): 34-42. https://doi.org/10.51537/chaos.936679.
EndNote
Ashish A, Cao J, Alsaadi F, Malik AK (June 1, 2021) Discrete Superior Hyperbolicity in Chaotic Maps. Chaos Theory and Applications 3 1 34–42.
IEEE
[1]A. Ashish, J. Cao, F. Alsaadi, and A. K. Malik, “Discrete Superior Hyperbolicity in Chaotic Maps”, CHTA, vol. 3, no. 1, pp. 34–42, June 2021, doi: 10.51537/chaos.936679.
ISNAD
Ashish, Ashish - Cao, Jinde - Alsaadi, Fawaz - Malik, A. K. “Discrete Superior Hyperbolicity in Chaotic Maps”. Chaos Theory and Applications 3/1 (June 1, 2021): 34-42. https://doi.org/10.51537/chaos.936679.
JAMA
1.Ashish A, Cao J, Alsaadi F, Malik AK. Discrete Superior Hyperbolicity in Chaotic Maps. CHTA. 2021;3:34–42.
MLA
Ashish, Ashish, et al. “Discrete Superior Hyperbolicity in Chaotic Maps”. Chaos Theory and Applications, vol. 3, no. 1, June 2021, pp. 34-42, doi:10.51537/chaos.936679.
Vancouver
1.Ashish Ashish, Jinde Cao, Fawaz Alsaadi, A. K. Malik. Discrete Superior Hyperbolicity in Chaotic Maps. CHTA. 2021 Jun. 1;3(1):34-42. doi:10.51537/chaos.936679

Cited By

Chaos Theory and Applications in Applied Sciences and Engineering: An interdisciplinary journal of nonlinear science 23830 28903   

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