Title :
Manifold control of a class of distributed parameter systems using modal expansion
Author :
Drakunov, Sergey ; Barbieri, Enrique
Author_Institution :
Dept. of Electr. Eng., Tulane Univ., New Orleans, LA, USA
Abstract :
The paper discusses stability analysis and design of control strategies for distributed parameter systems described by a class of partial differential equations which includes diffusions with multidimensional spatial variable. Our approach is to find a manifold in the system´s infinite dimensional state space such that if confined to the manifold the system has the desired properties. Then we design a control which makes this manifold an area of attraction for the closed loop system. The states are steered towards and maintained within the manifold. In particular we design a sliding mode controller which is well known to have strong robustness properties against matched disturbances. We study the conditions for the system dynamics within the equilibrium manifold to be stable
Keywords :
closed loop systems; control system analysis; control system synthesis; distributed parameter systems; multidimensional systems; partial differential equations; stability; state-space methods; variable structure systems; attraction area; closed loop system; control strategy design; distributed parameter systems; equilibrium manifold; infinite dimensional state space; manifold control; matched disturbances; modal expansion; multidimensional spatial variable; partial differential equations; sliding mode controller; stability analysis; strong robustness properties; system dynamics; Closed loop systems; Control systems; Distributed control; Distributed parameter systems; Multidimensional systems; Partial differential equations; Robust control; Sliding mode control; Stability analysis; State-space methods;
Conference_Titel :
Decision and Control, 1997., Proceedings of the 36th IEEE Conference on
Conference_Location :
San Diego, CA
Print_ISBN :
0-7803-4187-2
DOI :
10.1109/CDC.1997.657590
