Your search keyword '"Ouannas, Adel"' showing total 5 results

1. HYPERCHAOTIC DYNAMICS OF A NEW FRACTIONAL DISCRETE-TIME SYSTEM.

Author

KHENNAOUI, AMINA-AICHA, OUANNAS, ADEL, MOMANI, SHAHER, DIBI, ZOHIR, GRASSI, GIUSEPPE, BALEANU, DUMITRU, and PHAM, VIET-THANH

Subjects

*DISCRETE-time systems, *LYAPUNOV exponents, *BIFURCATION diagrams, *POINCARE maps (Mathematics), *FRACTIONAL calculus, *ENTROPY

Abstract

In recent years, some efforts have been devoted to nonlinear dynamics of fractional discrete-time systems. A number of papers have so far discussed results related to the presence of chaos in fractional maps. However, less results have been published to date regarding the presence of hyperchaos in fractional discrete-time systems. This paper aims to bridge the gap by introducing a new three-dimensional fractional map that shows, for the first time, complex hyperchaotic behaviors. A detailed analysis of the map dynamics is conducted via computation of Lyapunov exponents, bifurcation diagrams, phase portraits, approximated entropy and C 0 complexity. Simulation results confirm the effectiveness of the approach illustrated herein. [ABSTRACT FROM AUTHOR]

Published

2021

2. On the Dynamics and Control of Fractional Chaotic Maps with Sine Terms.

Author

Gasri, Ahlem, Ouannas, Adel, Khennaoui, Amina-Aicha, Bendoukha, Samir, and Pham, Viet-Thanh

Subjects

*POINCARE maps (Mathematics), *BIFURCATION diagrams, *LYAPUNOV exponents, *CHARTS, diagrams, etc., *FRACTIONAL calculus

Abstract

This paper studies the dynamics of two fractional-order chaotic maps based on two standard chaotic maps with sine terms. The dynamic behavior of this map is analyzed using numerical tools such as phase plots, bifurcation diagrams, Lyapunov exponents and 0–1 test. With the change of fractional-order, it is shown that the proposed fractional maps exhibit a range of different dynamical behaviors including coexisting attractors. The existence of coexistence attractors is depicted by plotting bifurcation diagram for two symmetrical initial conditions. In addition, three control schemes are introduced. The first two controllers stabilize the states of the proposed maps and ensure their convergence to zero asymptotically whereas the last synchronizes a pair of non-identical fractional maps. Numerical results are used to verify the findings. [ABSTRACT FROM AUTHOR]

Published

2020

3. Bifurcations, Hidden Chaos and Control in Fractional Maps.

Author

Ouannas, Adel, Almatroud, Othman Abdullah, Khennaoui, Amina Aicha, Alsawalha, Mohammad Mossa, Baleanu, Dumitru, Huynh, Van Van, and Pham, Viet-Thanh

Subjects

*NONLINEAR dynamical systems, *POINCARE maps (Mathematics), *BIFURCATION diagrams, *CHAOS theory, *FRACTIONAL calculus

Abstract

Recently, hidden attractors with stable equilibria have received considerable attention in chaos theory and nonlinear dynamical systems. Based on discrete fractional calculus, this paper proposes a simple two-dimensional and three-dimensional fractional maps. Both fractional maps are chaotic and have a unique equilibrium point. Results show that the dynamics of the proposed fractional maps are sensitive to both initial conditions and fractional order. There are coexisting attractors which have been displayed in terms of bifurcation diagrams, phase portraits and a 0-1 test. Furthermore, control schemes are introduced to stabilize the chaotic trajectories of the two novel systems. [ABSTRACT FROM AUTHOR]

Published

2020

4. On New Symmetric Fractional Discrete-Time Systems: Chaos, Complexity, and Control.

Author

Hammad, Ma'mon Abu, Diabi, Louiza, Dababneh, Amer, Zraiqat, Amjed, Momani, Shaher, Ouannas, Adel, and Hioual, Amel

Subjects

*BIFURCATION diagrams, *LYAPUNOV exponents, *DISCRETE-time systems, *FRACTIONAL calculus, *CHAOS theory

Abstract

This paper introduces a new symmetric fractional-order discrete system. The dynamics and symmetry of the suggested model are studied under two initial conditions, mainly a comparison of the commensurate order and incommensurate order maps, which highlights their effect on symmetry-breaking bifurcations. In addition, a theoretical analysis examines the stability of the zero equilibrium point. It proves that the map generates typical nonlinear features, including chaos, which is confirmed numerically: phase attractors are plotted in a two-dimensional (2D) and three-dimensional (3D) space, bifurcation diagrams are drawn with variations in the derivative fractional values and in the system parameters, and we calculate the Maximum Lyapunov Exponents (MLEs) associated with the bifurcation diagram. Additionally, we use the C 0 algorithm and entropy approach to measure the complexity of the chaotic symmetric fractional map. Finally, nonlinear 3D controllers are revealed to stabilize the symmetric fractional order map's states in commensurate and incommensurate cases. [ABSTRACT FROM AUTHOR]

Published

2024

5. On Chaos and Complexity Analysis for a New Sine-Based Memristor Map with Commensurate and Incommensurate Fractional Orders.

Author

Hamadneh, Tareq, Abbes, Abderrahmane, Al-Tarawneh, Hassan, Gharib, Gharib Mousa, Salameh, Wael Mahmoud Mohammad, Al Soudi, Maha S., and Ouannas, Adel

Subjects

*BIFURCATION diagrams, *NONLINEAR analysis, *LYAPUNOV exponents, *FRACTIONAL calculus

Abstract

In this study, we expand a 2D sine map via adding the discrete memristor to introduce a new 3D fractional-order sine-based memristor map. Under commensurate and incommensurate orders, we conduct an extensive exploration and analysis of its nonlinear dynamic behaviors, employing diverse numerical techniques, such as analyzing Lyapunov exponents, visualizing phase portraits, and plotting bifurcation diagrams. The results emphasize the sine-based memristor map's sensitivity to fractional-order parameters, resulting in the emergence of distinct and diverse dynamic patterns. In addition, we employ the sample entropy ( S a m p E n ) method and C 0 complexity to quantitatively measure complexity, and we also utilize the 0–1 test to validate the presence of chaos in the proposed fractional-order sine-based memristor map. Finally, MATLAB simulations are be executed to confirm the results provided. [ABSTRACT FROM AUTHOR]

Published

2023