Parameter Estimation and Non-Collocated Adaptive Stabilization for a Wave Equation Subject to General Boundary Harmonic Disturbance

Author

Wei Guo ; Bao-Zhu Guo

Author_Institution

Sch. of Stat., Univ. of Int. Bus. & Econ., Beijing, China

Volume

58

Issue

7

fYear

2013

fDate

Jul-13

Firstpage

1631

Lastpage

1643

Abstract

This paper is concerned with the parameter estimation and asymptotic stabilization of a 1-D wave equation that is subject to general harmonic disturbances at the controlled end and suffers from instability at the other end. First, we design an adaptive observer in terms of measured position and velocity. We then adopt the backstepping method for infinite-dimensional systems to design an observer-based output feedback law. The resulting closed-loop system is shown to be asymptotically stable. And the estimates of the parameters converge to the unknown parameters.

Keywords

adaptive control; asymptotic stability; closed loop systems; control system synthesis; distributed parameter systems; feedback; harmonic analysis; multidimensional systems; observers; parameter estimation; position measurement; velocity measurement; wave equations; 1D wave equation; adaptive observer; asymptotic stabilization; backstepping method; closed-loop system; general boundary harmonic disturbance; infinite-dimensional systems; instability; noncollocated adaptive stabilization; observer-based output feedback law; parameter estimation; position measurement; velocity measurement; Backstepping; Combustion; Equations; Harmonic analysis; Observers; Propagation; Backstepping; boundary control; distributed parameter systems; harmonic disturbance rejection;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2013.2239003

Filename

6409395