DocumentCode
3630846
Title
H∞-optimal control for singularly perturbed systems part i: perfect state measurements
Author
Zigang Pan;Tamer Basar
Author_Institution
Decision and Control Laboratory, Coordinated Science Laboratory and the Department of Electrical and Computer Engineering, University of Illinois, Urbana, IL 61801/USA
fYear
1992
fDate
6/1/1992 12:00:00 AM
Firstpage
1850
Lastpage
1854
Abstract
We study the H∞-optimal control of singularly perturbed linear systems under perfect state measurements. Using a differential game theoretic approach, we show that as the singular perturbation parameter ϵ approaches zero, the optimal disturbance attenuation level for the full-order system under a quadratic performance index converges to a value that is bounded above by the maximum of the optimal disturbance attenuation levels for the slow and fast subsystems under appropriate "slow" and "fast" quadratic cost functions. Furthermore, we construct a composite controller based on the solution of the slow and fast games, which guarantees a desired achievable performance level for the full-order plant, as ϵ approaches zero. A "slow" controller, however, is not generally robust in this sense, but still under some conditions, which are delineated in the paper, the fast dynamics can be totally ignored. The paper also studies optimality when the controller includes a feedforward term in the disturbance.
Keywords
"Control systems","Optimal control","Coordinate measuring machines","Electric variables measurement","Attenuation","Nonlinear control systems","Game theory","Performance analysis","Cost function","Robust control"
Publisher
ieee
Conference_Titel
American Control Conference, 1992
Print_ISBN
0-7803-0210-9
Type
conf
Filename
4792432
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