Open AccessAdaptive neural network backstepping control for a class of uncertain fractional-order chaotic systems with unknown backlash-like hysteresis
Author(s) -
Yimin A. Wu,
Hui Lv
Publication year - 2016
Publication title -
aip advances
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.421
H-Index - 58
ISSN - 2158-3226
DOI - 10.1063/1.4960110
Subject(s) - backstepping , control theory (sociology) , backlash , controller (irrigation) , lyapunov stability , convergence (economics) , chaotic , adaptive control , hysteresis , tracking error , artificial neural network , computer science , upper and lower bounds , mathematics , stability (learning theory) , control (management) , artificial intelligence , physics , mathematical analysis , quantum mechanics , agronomy , economics , biology , economic growth , machine learning
In this paper, we consider the control problem of a class of uncertain fractional-order chaotic systems preceded by unknown backlash-like hysteresis nonlinearities based on backstepping control algorithm. We model the hysteresis by using a differential equation. Based on the fractional Lyapunov stability criterion and the backstepping algorithm procedures, an adaptive neural network controller is driven. No knowledge of the upper bound of the disturbance and system uncertainty is required in our controller, and the asymptotical convergence of the tracking error can be guaranteed. Finally, we give two simulation examples to confirm our theoretical results
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