Uniform Robust Exact Differentiator

Author

Cruz-Zavala, Emmanuel ; Moreno, Jaime A. ; Fridman, Leonid M.

Author_Institution

Inst. de Ing., Univ. Nac. Autonoma de Mexico (UNAM), Coyoacan, Mexico

Volume

56

Issue

11

fYear

2011

Firstpage

2727

Lastpage

2733

Abstract

The differentiators based on the Super-Twisting Algorithm (STA) yield finite-time and theoretically exact convergence to the derivative of the input signal, whenever this derivative is Lipschitz. However, the convergence time grows unboundedly when the initial conditions of the differentiation error grow. In this technical note a Uniform Robust Exact Differentiator (URED) is introduced. The URED is based on a STA modification and includes high-degree terms providing finite-time, and exact convergence to the derivative of the input signal, with a convergence time that is bounded by some constant independent of the initial conditions of the differentiation error. Strong Lyapunov functions are used to prove the convergence of the URED.

Keywords

Lyapunov methods; convergence; differentiation; variable structure systems; Lyapunov functions; URED; convergence time; super-twisting algorithm; uniform robust exact differentiator; Convergence; Lyapunov methods; Noise; Observers; Robustness; Trajectory; Differentiation; Lyapunov functions; discontinuous observers; finite-time observers; second order sliding modes;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2011.2160030

Filename

5893919