Abstract
This paper investigates the asymptotic stabilization of nonlinear fractional-order systems under unknown upper bounds on external disturbances and uncertainties. The upper bound of uncertainties is a nonlinear function of the pseudostates norm with unknown coefficients. Based on the robust fractional-order sliding mode control, the states of the nonlinear fractional-order system under unknown upper bounds on external disturbances and uncertainties have been stabled. Adaptive control laws estimate the upper bound of external disturbances and uncertainties. In all cases, the stability proof is obtained using the Lyapunov theorem to show the convergence of the sliding surface to zero. Also, by introducing a suitable sliding surface, the chattering phenomenon is eliminated. Finally, the effectiveness of the proposed fractional-order controller is demonstrated using practical examples. The simulation results show the proposed controller has a proper performance in the presence of external disturbance and uncertainties.
Additional information
Notes on contributors
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Amin Emamifard
Amin Emamifard received the MSc degree from Qazvin Islamic Azad University, Iran, in 2019. His research interest includes aerodynamics, nonlinear systems and nonlinear control. E-mail: [email protected]
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Hamid Ghadiri
Hamid Ghadiri received his MSc degree in control engineering from Tabriz University, Iran, in 2008, and PhD degree in control engineering at Tehran Science and Research Branch, Islamic Azad University, Tehran, Iran, in 2014. His research interests include switched and hybrid systems, nonlinear control, and time-delay systems.