1. The New Four-Dimensional Fractional Chaotic Map with Constant and Variable-Order: Chaos, Control and Synchronization.
- Author
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Hamadneh, Tareq, Ahmed, Souad Bensid, Al-Tarawneh, Hassan, Alsayyed, Omar, Gharib, Gharib Mousa, Al Soudi, Maha S., Abbes, Abderrahmane, and Ouannas, Adel
- Subjects
LYAPUNOV exponents ,DIFFERENCE equations ,LORENZ equations ,SYNCHRONIZATION ,SINE-Gordon equation ,DISCRETE systems - Abstract
Using fractional difference equations to describe fractional and variable-order maps, this manuscript discusses the dynamics of the discrete 4D sinusoidal feedback sine iterative chaotic map with infinite collapse (ICMIC) modulation map (SF-SIMM) with fractional-order. Also, it presents a novel variable-order version of SF-SIMM and discusses their chaotic dynamic behavior by employing a distinct function for the variable fractional-order. To establish the existence of chaos in the suggested discrete SF-SIMM, some numerical methods such as phase plots, bifurcation and largest Lyapunov exponent diagrams, C 0 complexity and 0–1 test are utilized. After that, two different control schemes are used for the conceived discrete system. The states are stabilized and asymptotically forced towards zero by the first controller. The second controller is used to synchronize a pair of maps with non–identical parameters. Finally, MATLAB simulations will be executed to confirm the results provided. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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