Title :
An LMI-based parametrization of all H∞ controllers with applications
Author :
Gahinet, Pascal ; Apkarian, Pierre
Author_Institution :
Inst. National de Recherche d´´Informatique et d´´Auto, Le Chesnay, France
Abstract :
The continuous- and discrete-time H∞ control problems are solved via elementary manipulations on linear matrix inequalities (LMI). Two interesting new features emerge through this approach: solvability conditions valid for both regular and singular problems, and an LMI-based parametrization of all H∞-suboptimal controllers, including reduced-order controllers. The solvability conditions involve Riccati inequalities rather than the usual indefinite Riccati equations. Alternatively, these conditions can be expressed as a system of three LMI´s. Efficient convex optimization techniques are available to solve this system. Moreover, its solutions parametrize the set of H∞ controllers and bear important connections with the controller order and the closed-loop Lyapunov functions. Thanks to such connections, the LMI-based characterization of H∞ controllers opens new perspectives for the refinement of H∞ design. Applications to cancellation-free design and controller order reduction are discussed and illustrated by examples
Keywords :
control system synthesis; discrete time systems; large-scale systems; matrix algebra; optimal control; state-space methods; H∞ controllers; H∞-suboptimal controllers; Riccati inequalities; cancellation-free design; closed-loop Lyapunov functions; continuous-time H∞ control; controller order reduction; convex optimization; discrete-time H∞ control; linear matrix inequalities; reduced-order controllers; regular problems; singular problems; solvability conditions; Bismuth; Instruments; Linear matrix inequalities; Null space; Symmetric matrices; Transfer functions;
Conference_Titel :
Decision and Control, 1993., Proceedings of the 32nd IEEE Conference on
Conference_Location :
San Antonio, TX
Print_ISBN :
0-7803-1298-8
DOI :
10.1109/CDC.1993.325066
