Title :
On (A, B)-invariance of polyhedral domains for discrete-time systems
Author :
Dórea, Carlos E T ; Hennet, Jean-Claude
Author_Institution :
Lab. d´´Autom. et d´´Anal. des Syst., CNRS, Toulouse, France
Abstract :
The problem of confining the trajectory of a discrete-time linear system in a given polyhedral set is addressed using the positive invariance approach. The property of (A, B)-invariance of polyhedral domains is introduced. It is then geometrically and analytically characterized. In particular, this property is verified by the maximal admissible set included in a given polyhedral domain. An important class of (A, B)-invariant polyhedral domains admitting a linear state feedback invariant control law is exhibited. The results are extended to systems subject to additive disturbances
Keywords :
closed loop systems; computational geometry; discrete time systems; invariance; linear systems; matrix algebra; state feedback; discrete-time systems; invariance; invariant control law; linear system; polyhedral domains; state feedback; Additives; Bridges; Control systems; Control theory; Linear matrix inequalities; Linear systems; Power system modeling; State feedback; Symmetric matrices; Vectors;
Conference_Titel :
Decision and Control, 1996., Proceedings of the 35th IEEE Conference on
Conference_Location :
Kobe
Print_ISBN :
0-7803-3590-2
DOI :
10.1109/CDC.1996.577470
