The anti-disturbance property of a closed-loop system of 1-d wave equation with boundary control matched disturbance

Xiao-Rui Wang; Gen-Qi Xu

Applications of Mathematics (2019)

  • Volume: 64, Issue: 6, page 695-714
  • ISSN: 0862-7940

Abstract

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We study the anti-disturbance problem of a 1-d wave equation with boundary control matched disturbance. In earlier literature, the authors always designed the controller such as the sliding mode control and the active disturbance rejection control to stabilize the system. However, most of the corresponding closed-loop systems are boundedly stable. In this paper we show that the linear feedback control also has a property of anti-disturbance, even if the disturbance includes some information of the system. By choosing suitable parameters introduced in the proof, we can ensure the solution of the closed-loop system is bounded in an admissible range. As an application, we discuss the control problem of a nonlinear system. As a result, it is shown that the bounded estimation of the solution is suitable.

How to cite

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Wang, Xiao-Rui, and Xu, Gen-Qi. "The anti-disturbance property of a closed-loop system of 1-d wave equation with boundary control matched disturbance." Applications of Mathematics 64.6 (2019): 695-714. <http://eudml.org/doc/294861>.

@article{Wang2019,
abstract = {We study the anti-disturbance problem of a 1-d wave equation with boundary control matched disturbance. In earlier literature, the authors always designed the controller such as the sliding mode control and the active disturbance rejection control to stabilize the system. However, most of the corresponding closed-loop systems are boundedly stable. In this paper we show that the linear feedback control also has a property of anti-disturbance, even if the disturbance includes some information of the system. By choosing suitable parameters introduced in the proof, we can ensure the solution of the closed-loop system is bounded in an admissible range. As an application, we discuss the control problem of a nonlinear system. As a result, it is shown that the bounded estimation of the solution is suitable.},
author = {Wang, Xiao-Rui, Xu, Gen-Qi},
journal = {Applications of Mathematics},
keywords = {boundary control; disturbance; wave equation; anti-disturbance},
language = {eng},
number = {6},
pages = {695-714},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {The anti-disturbance property of a closed-loop system of 1-d wave equation with boundary control matched disturbance},
url = {http://eudml.org/doc/294861},
volume = {64},
year = {2019},
}

TY - JOUR
AU - Wang, Xiao-Rui
AU - Xu, Gen-Qi
TI - The anti-disturbance property of a closed-loop system of 1-d wave equation with boundary control matched disturbance
JO - Applications of Mathematics
PY - 2019
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 64
IS - 6
SP - 695
EP - 714
AB - We study the anti-disturbance problem of a 1-d wave equation with boundary control matched disturbance. In earlier literature, the authors always designed the controller such as the sliding mode control and the active disturbance rejection control to stabilize the system. However, most of the corresponding closed-loop systems are boundedly stable. In this paper we show that the linear feedback control also has a property of anti-disturbance, even if the disturbance includes some information of the system. By choosing suitable parameters introduced in the proof, we can ensure the solution of the closed-loop system is bounded in an admissible range. As an application, we discuss the control problem of a nonlinear system. As a result, it is shown that the bounded estimation of the solution is suitable.
LA - eng
KW - boundary control; disturbance; wave equation; anti-disturbance
UR - http://eudml.org/doc/294861
ER -

References

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