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Special Fractional-Order Map and Its Realization

Amina–Aicha Khennaoui, Adel Ouannas, Shaher Momani, Othman Abdullah Almatroud, Mohammed Mossa Al-Sawalha, Salah Boulaaras, Viet–Thanh Pham

2022Mathematics32 citationsDOIOpen Access PDF

Abstract

Recent works have focused the analysis of chaotic phenomena in fractional discrete memristor. However, most of the papers have been related to simulated results on the system dynamics rather than on their hardware implementations. This work reports the implementation of a new chaotic fractional memristor map with “hidden attractors”. The fractional memristor map is developed based on a memristive map by using the Grunwald–Letnikov difference operator. The fractional memristor map has flexible fixed points depending on a system’s parameters. We study system dynamics for different values of the fractional orders by using bifurcation diagrams, phase portraits, Lyapunov exponents, and the 0–1 test. We see that the fractional map generates rich dynamical behavior, including coexisting hidden dynamics and initial offset boosting.

Topics & Concepts

Phase portraitAttractorMemristorChaoticLyapunov exponentBifurcationLogistic mapMathematicsDynamical systems theoryFixed pointRealization (probability)Chaotic mapComputer scienceAlgorithmMathematical analysisArtificial intelligencePhysicsNonlinear systemStatisticsQuantum mechanicsChaos control and synchronizationNeural Networks Stability and Synchronizationstochastic dynamics and bifurcation