Title :
Robust boundary control for linear time-varying infinite dimensional systems
Author :
Poznyak, A.S. ; Palacios, Alejandro Rodríguez
Author_Institution :
Seccion de Control Automatico, CINVESTAV-IPN, Mexico City, Mexico
Abstract :
The problem of robust boundary control for a class of infinite dimensional systems under mixed uncertainties is addressed. A strong solution of the Dirichlet boundary problem corresponding to the perturbed evolution operator is introduced. The Lyapunov function approach is used for proving that there is a controller that stabilizes this class of systems under the presence of smooth enough internal and external perturbations and guarantees some tolerance level for the joint cost functional. A heating boundary control process is given as an illustration of the suggested approach
Keywords :
Lyapunov methods; boundary-value problems; heat transfer; linear systems; multidimensional systems; robust control; state feedback; time-varying systems; uncertain systems; Dirichlet boundary problem; Lyapunov function approach; heating boundary control process; joint cost functional; linear time-varying infinite dimensional systems; mixed uncertainties; perturbed evolution operator; robust boundary control; tolerance level; Automatic control; Control systems; Cost function; Heating; Linear systems; Lyapunov method; Riccati equations; Robust control; Time varying systems; Uncertainty;
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.1996.573493
