Fractional finite-time control for robust tracking of nonlinear systems subject to Hölder disturbances with application to UAVs

被引：0

作者：

Labbadi, Moussa ^{[1
]}

Guerra, Thierry-Marie ^{[2
]}

Djemai, Mohamed ^{[2
]}

机构：

[1] Aix Marseille Univ, LIS UMR CNRS 7020, F-13013 Marseille, France

[2] CNRS, LAMIH, INSA HdF UPHF, UMR 8201, F-59313 Valenciennes, France

来源：

ISA TRANSACTIONS | 2024年 / 153卷

关键词：

SMC; Fractional control; H & ouml; lder disturbances; FnT convergence; Quadrotor control; Uncertainties; SLIDING-MODE CONTROL; QUADROTOR; STABILITY; STABILIZATION; DESIGN;

D O I：

10.1016/j.isatra.2024.07.033

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

The aim of the present article is to design a robust fractional-order (FO) finite-time (FnT) control able to tackle H & ouml;lder disturbances of second-order nonlinear systems. First, a novel sliding manifold with Arc-Tangent function is suggested for second nonlinear systems. It has been proven that the system states globally converge to the origin in FnT using the proposed sliding mode variable. To ensure a FnT stability of the sliding variable, a robust control is developed. By using fractional operators, a uniformly continuous control law is designed to tackle H & ouml;lder disturbances. Furthermore, the suggested approach is shown to be resistant to matched H & ouml;lder disturbances and uncertainties that are continuous but not necessarily differentiable. Moreover, the FnT stability of quadrotors using the proposed control, that is our second result. The quadrotor simulations analysis demonstrates the practicality of the proposed FnT controller in the presence of H & ouml;lder disturbances.

引用

页码：209 / 222

页数：14

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