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Different dimensional fractional-order discrete chaotic systems based on the Caputo h-difference discrete operator: dynamics, control, and synchronization

Ibtissem Talbi, Adel Ouannas, Amina–Aicha Khennaoui, Abdelhak Berkane, Iqbal M. Batiha, Giuseppe Grassi, Viet–Thanh Pham

2020Advances in Difference Equations34 citationsDOIOpen Access PDF

Abstract

Abstract The paper investigates control and synchronization of fractional-order maps described by the Caputo h -difference operator. At first, two new fractional maps are introduced, i.e., the Two-Dimensional Fractional-order Lorenz Discrete System (2D-FoLDS) and Three-Dimensional Fractional-order Wang Discrete System (3D-FoWDS). Then, some novel theorems based on the Lyapunov approach are proved, with the aim of controlling and synchronizing the map dynamics. In particular, a new hybrid scheme is proposed, which enables synchronization to be achieved between a master system based on a 2D-FoLDS and a slave system based on a 3D-FoWDS. Simulation results are reported to highlight the effectiveness of the conceived approach.

Topics & Concepts

SynchronizingMathematicsSynchronization (alternating current)Operator (biology)Control theory (sociology)ChaoticLorenz systemOrdinary differential equationFractional calculusDiscrete systemApplied mathematicsControl (management)Mathematical analysisDifferential equationComputer scienceTopology (electrical circuits)AlgorithmAttractorArtificial intelligenceRepressorChemistryCombinatoricsGeneBiochemistryTranscription factorChaos control and synchronizationNonlinear Dynamics and Pattern FormationMathematical Dynamics and Fractals