Hidden Homogeneous Extreme Multistability of a Fractional-Order Hyperchaotic Discrete-Time System: Chaos, Initial Offset Boosting, Amplitude Control, Control, and Synchronization

Khennaoui, Amina–Aicha; Ouannas, Adel; Bekiros, Stelios; Aly, Ayman A.; Alotaibi, Ahmed; Jahanshahi, Hadi; Alsubaie, Hajid

doi:10.3390/sym15010139

Cited by 9 publications

(4 citation statements)

References 34 publications

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“…In [3], high-dimensional conservative chaotic systems were designed using coupled memristors. The chaotic systems exhibited two types of bifurcation enhancement behaviors, In [4], in the reported fractionalorder hyperchaotic systems, hidden homomorphism extreme multiple stability and initial offset boosting behavior were found. Ref.…”

Section: Introductionmentioning

confidence: 95%

Adaptive Fast Image Encryption Algorithm Based on Three-Dimensional Chaotic System

Wang,

Leng,

Zhang

et al. 2023

Entropy

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This paper introduces a novel three-dimensional chaotic system that exhibits diverse dynamic behaviors as parameters vary, including phase trajectory offset behaviors and expansion–contraction phenomena. This model encompasses a broad chaotic range and proves suitable for integration within image encryption. Building upon this chaotic system, the study devised a fast image encryption algorithm with an adaptive mechanism, capable of autonomously determining optimal encryption strategies to enhance algorithm security. In pursuit of heightened encryption speed, an FPGA-based chaotic sequence generator was developed for the image encryption algorithm, leveraging the proposed chaotic system. Furthermore, a more efficient scrambling algorithm was devised. Experimental results underscore the superior performance of this algorithm in terms of both encryption duration and security.

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Section: Introductionmentioning

confidence: 95%

Adaptive Fast Image Encryption Algorithm Based on Three-Dimensional Chaotic System

Wang,

Leng,

Zhang

et al. 2023

Entropy

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“…In the literature, the financial systems (1) and ( 2) have been widely studied from the point of view of dynamical system theory; see References [3][4][5][6][15][16][17]. We are inspired by these results, and therefore, we are glad to use several lines to recall the related results in these references.…”

Section: Introductionmentioning

confidence: 97%

Global Existence and Fixed-Time Synchronization of a Hyperchaotic Financial System Governed by Semi-Linear Parabolic Partial Differential Equations Equipped with the Homogeneous Neumann Boundary Condition

Wang¹,

Zhao²,

Zhang

et al. 2023

Entropy

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Chaotic nonlinear dynamical systems, in which the generated time series exhibit high entropy values, have been extensively used and play essential roles in tracking accurately the complex fluctuations of the real-world financial markets. We are concerned with a system of semi-linear parabolic partial differential equations supplemented by the homogeneous Neumann boundary condition, which governs a financial system comprising the labor force, the stock, the money, and the production sub-blocks distributed in a certain line segment or planar region. The system derived by removing the terms involved with partial derivatives with respect to space variables from our concerned system was demonstrated to be hyperchaotic. We firstly prove, via Galerkin’s method and establishing a priori inequalities, that the initial-boundary value problem for the concerned partial differential equations is globally well posed in Hadamard’s sense. Secondly, we design controls for the response system to our concerned financial system, prove under some additional conditions that our concerned system and its controlled response system achieve drive-response fixed-time synchronization, and provide an estimate on the settling time. Several modified energy functionals (i.e., Lyapunov functionals) are constructed to demonstrate the global well-posedness and the fixed-time synchronizability. Finally, we perform several numerical simulations to validate our synchronization theoretical results.

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“…A discrete map, also known as a discrete dynamical system, is a useful tool for the analysis of the behavior of chemical reactions and the spread of diseases [1]. Discrete maps can exhibit a variety of behaviors, including stability, periodicity, and chaos [2][3][4][5]. Fractional-order models and neural networks play a vital role in artificial intelligence and signal processing [6,7].…”

Section: Introductionmentioning

confidence: 99%

Design of High-Dimensional Maps with Sine Terms

Almatroud,

Pham,

Grassi

et al. 2023

Mathematics

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The use of the advancements in memristor technology to construct chaotic maps has garnered significant research attention in recent years. The combination of memristors and nonlinear terms provides an effective approach to proposing novel maps. In this study, we have leveraged memristors and sine terms to develop three-dimensional maps, capable of processing special fixed points. Additionally, we have conducted an in depth study of a specific example (TDMM1 map) to demonstrate its dynamics, feasibility, and application for lightweight encryption. Notably, our general approach could be extended to develop higher-dimensional maps, including four- and five-dimensional ones, thereby opening up the possibility to create numerous higher-dimensional maps.

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Hidden Homogeneous Extreme Multistability of a Fractional-Order Hyperchaotic Discrete-Time System: Chaos, Initial Offset Boosting, Amplitude Control, Control, and Synchronization

Cited by 9 publications

References 34 publications

Adaptive Fast Image Encryption Algorithm Based on Three-Dimensional Chaotic System

Adaptive Fast Image Encryption Algorithm Based on Three-Dimensional Chaotic System

Global Existence and Fixed-Time Synchronization of a Hyperchaotic Financial System Governed by Semi-Linear Parabolic Partial Differential Equations Equipped with the Homogeneous Neumann Boundary Condition

Design of High-Dimensional Maps with Sine Terms

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