DocumentCode :
307089
Title :
Quadratic stabilizability problem of structural uncertainties
Author :
Dai, Qionghai ; Hu, Sanqing ; Chai, T.Y.
Author_Institution :
Res. Center of Autom., Northeastern Univ., Shenyang, China
Volume :
3
fYear :
1996
fDate :
11-13 Dec 1996
Firstpage :
3490
Abstract :
This paper investigates the problem of designing a linear state feedback control to stabilize a class of multi-input linear dynamical systems. We first show that to ensure a stabilizable system some entries of the system matrices must be sign invariant. And then, we derive a sufficient condition under which a system can be quadratically stabilized by a linear control
Keywords :
control system synthesis; matrix algebra; multivariable control systems; stability criteria; state feedback; uncertain systems; linear control; linear state feedback control design; multi-input linear dynamical systems; quadratic stabilizability; sign invariant system matrix entries; structural uncertainties; Control systems; Equations; Feedback control; Linear feedback control systems; Lyapunov method; Stability; State feedback; Time varying systems; Uncertain systems; Uncertainty;
fLanguage :
English
Publisher :
ieee
Conference_Titel :
Decision and Control, 1996., Proceedings of the 35th IEEE Conference on
Conference_Location :
Kobe
ISSN :
0191-2216
Print_ISBN :
0-7803-3590-2
Type :
conf
DOI :
10.1109/CDC.1996.573705
Filename :
573705
Link To Document :
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