Paper Info
Title
Uniformly continuous differintegral sliding mode control of nonlinear systems subject to Hölder disturbances.
Abstract
An integral sliding mode controller based on fractional order differintegral operators is proposed. This controller generalizes the classical discontinuous (integer order) integral sliding mode scheme. By using differintegral operators, their topological properties lead to a uniformly continuous controller that enforces an integral sliding mode for any initial condition. In addition, it is demonstrated that the proposed scheme is robust against matched Hölder continuous, but not necessarily differentiable, disturbances and uncertainties. Also, asymptotic convergence of tracking errors is assured for any initial condition by means of an ideal controller, even in presence of anomalous but Hölder continuous disturbances. It is worth to mention that the salient properties of our proposal (i.e. invariance at any initial condition, uniform continuity, and robustness to non-differentiable disturbances) are not provided by any existing integer order sliding mode based controller of the literature. The viability of the proposed scheme is shown in a representative simulation study.
Year
DOI
Venue
2016
10.1016/j.automatica.2016.01.011
Automatica
Keywords
Field
DocType
Fractional control,Sliding mode control,Disturbance rejection,Robust control of nonlinear systems,Hölder spaces
Integral sliding mode,Differintegral,Control theory,Mathematical optimization,Nonlinear system,Control theory,Robustness (computer science),Uniform continuity,Initial value problem,Mathematics,Sliding mode control
Journal
Volume
Issue
ISSN
66
C
0005-1098
Citations 
PageRank 
References 
5
0.48
4
Authors
3
Name
Order
Citations
PageRank
A.-J. Munoz-Vazquez1429.97
Vicente Parra-Vega218033.57
Anand Sanchez-Orta3477.64