Title :
Quadratic invariance is necessary and sufficient for convexity
Author :
Lessard, L. ; Lall, S.
Author_Institution :
Dept. of Aeronaut. & Astronaut., Stanford Univ., Stanford, CA, USA
fDate :
June 29 2011-July 1 2011
Abstract :
In decentralized control problems, a standard approach is to specify the set of allowable decentralized controllers as a closed subspace of linear operators. This then induces a corresponding set of of Youla parameters. Previous work has shown that quadratic invariance of the controller set implies that the the set of Youla parameters is convex. In this short note, we prove the converse. We thereby show that the only decentralized control problems for which the set of Youla parameters is convex are those which are quadratically invariant.
Keywords :
decentralised control; invariance; linear systems; set theory; Youla parameter set; closed subspace; convexity; decentralized control problem; linear operator; quadratic invariance; Aerospace electronics; Complexity theory; Convex functions; Distributed control; Feedback control; Optimization; USA Councils;
Conference_Titel :
American Control Conference (ACC), 2011
Conference_Location :
San Francisco, CA
Print_ISBN :
978-1-4577-0080-4
DOI :
10.1109/ACC.2011.5990928
