Title :
Convex synthesis of controllers for consensus
Author :
De Castro, Gustavo Ayres ; Paganini, Fernando
Author_Institution :
Electr. Eng. Dept., UCLA, Los Angeles, CA, USA
fDate :
June 30 2004-July 2 2004
Abstract :
We develop convex conditions that are necessary and sufficient for the existence of a controller that yields a closed loop that achieves consensus. The conditions generate controllers with no particular communication structure, but with optimal /spl Hscr//sub 2/ performance on the non-consensus part of the closed loop. We further explore the conditions to impose topology on the interconnection structure generated by the controllers. This is achieved by restricting a certain Lyapunov matrix to be block diagonal, in order to produce convex synthesis results.
Keywords :
H/sup /spl infin// control; Lyapunov matrix equations; closed loop systems; control system synthesis; interconnected systems; topology; Lyapunov matrix; closed loop controller; consensus analysis; convex synthesis; interconnection structure; necessary condition; optimal /spl Hscr//sub 2/ control; sufficient condition; topology;
Conference_Titel :
American Control Conference, 2004. Proceedings of the 2004
Conference_Location :
Boston, MA, USA
Print_ISBN :
0-7803-8335-4
