DocumentCode
2379814
Title
Optimal state filtering and parameter identification for linear time-delay systems
Author
Basin, Michael ; Shi, Peng ; Calderon-Alvarez, Dario
Author_Institution
Dept. of Phys. & Math. Sci., Autonomous Univ. of Nuevo Leon, Nuevo Leon
fYear
2008
fDate
11-13 June 2008
Firstpage
7
Lastpage
12
Abstract
This paper presents the optimal joint state filtering and parameter identification problem for linear stochastic time- delay systems with unknown parameters. The original identification problem is reduced to the optimal filtering problem for incompletely measured polynomial (bilinear) time-delay system states over linear observations with an arbitrary, not necessarily invertible, observation matrix, where the unknown parameters are considered standard Wiener processes and incorporated as additional states in the extended state vector. The obtained solution is based on the designed optimal filter for incompletely measured bilinear time-delay states over linear observations, taking into account that the optimal filter for the extended state vector also serves as the optimal identifier for the unknown parameters. In the example, performance of the designed optimal state filter and parameter identifier is verified for a linear time-delay system with an unknown multiplicative parameter over linear observations. Both, stable and unstable, linear systems are examined.
Keywords
delay systems; filtering theory; identification; optimal control; stochastic systems; linear stochastic time-delay systems; optimal state filtering; parameter identification; Equations; Filtering; Indium tin oxide; Maximum likelihood estimation; Measurement standards; Nonlinear filters; Parameter estimation; State estimation; Stochastic systems; Vectors;
fLanguage
English
Publisher
ieee
Conference_Titel
American Control Conference, 2008
Conference_Location
Seattle, WA
ISSN
0743-1619
Print_ISBN
978-1-4244-2078-0
Electronic_ISBN
0743-1619
Type
conf
DOI
10.1109/ACC.2008.4586457
Filename
4586457
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