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Fractional-Order sliding mode control of a 4D memristive chaotic system

Abdullah Gokyildirim, Haris Çalgan, Metin Demirtaş

2023Journal of Vibration and Control39 citationsDOI

Abstract

Chaotic systems depict complex dynamics, thanks to their nonlinear behaviors. With recent studies on fractional-order nonlinear systems, it is deduced that fractional-order analysis of a chaotic system enriches its dynamic behavior. Therefore, the investigation of the chaotic behavior of a 4D memristive Chen system is aimed in this study by taking the order of the system as fractional. The nonlinear behavior of the system is observed numerically by comparing the fractional-order bifurcation diagrams and Lyapunov Exponents Spectra with 2D phase portraits. Based on these analyses, two different fractional orders (i.e., q = 0.948 and q = 0.97) are determined where the 4D memristive system shows chaotic behavior. Furthermore, a single state fractional-order sliding mode controller (FOSMC) is designed to maintain the states of the fractional-order memristive chaotic system on the equilibrium points. Then, control method results are obtained by both numerical simulations and different illustrative experiments of microcontroller-based realization. As expected, voltage outputs of the microcontroller-based realization are in good agreement with the time series of numerical simulations.

Topics & Concepts

Phase portraitChaoticNonlinear systemLyapunov exponentRealization (probability)Control theory (sociology)BifurcationFractional-order systemController (irrigation)MathematicsComputer scienceFractional calculusApplied mathematicsPhysicsControl (management)Artificial intelligenceBiologyQuantum mechanicsStatisticsAgronomyChaos control and synchronizationNeural Networks Stability and SynchronizationNonlinear Dynamics and Pattern Formation
Fractional-Order sliding mode control of a 4D memristive chaotic system | Litcius