Title :
Uniqueness of the general mixed H2/H∞ optimal controller
Author :
Walker, David E. ; Ridgely, D. Brett
Author_Institution :
US Air Force Inst. of Technol., Wright-Patterson AFB, OH, USA
Abstract :
A convex analysis approach to the general mixed H2/H ∞ optimal control design with single and multiple H∞ constraints is developed. The system consists of a plant and stable weights on the H2 and H∞ transfer functions, and is linear-time-invariant. The controller order is relaxed to an unknown but optimal order and the nature of the solution is examined. It is shown that the optimal controller is unique through the use of a Youla parametrization and convex analysis. Uniqueness is combined with the Kuhn-Tucker conditions to characterise the solution to the mixed problem with a finite set of H∞ constraints. Finally, the nature of a fixed order controller is examined
Keywords :
H∞ control; constraint theory; control system analysis; linear systems; optimisation; transfer functions; Kuhn-Tucker conditions; Youla parametrization; convex analysis; fixed order controller; linear-time-invariant systems; mixed H2/H∞ controller; optimal controller; transfer functions; uniqueness; Control design; Control systems; Force control; Hydrogen; Optimal control; Output feedback; Space technology; State feedback; Transfer functions; US Government;
Conference_Titel :
American Control Conference, Proceedings of the 1995
Conference_Location :
Seattle, WA
Print_ISBN :
0-7803-2445-5
DOI :
10.1109/ACC.1995.520991
