Title :
Reduced-order solutions to H∞ and LPV control problems involving partial-state feedback
Author_Institution :
Dept. of Mech. Eng., California Univ., Berkeley, CA, USA
Abstract :
We solve a parameter-dependent control problem for a linear parameter-varying (LPV) plant in which both noisy outputs and/or exact measurements of some plant states are fed back. Known bounds on the parameters´ rates of variation are used to reduce conservatism. We give necessary and sufficient conditions, expressed as linear matrix inequalities (LMIs), for solvability by full- and reduced-order controllers. If the desired controller order equals the plant order minus the number of exactly measured states, then the intractable rank condition currently required for reduced-order synthesis can be avoided; moreover, this controller order is the largest needed for a solution. The solutions of the solvability LMIs are used to derive explicit controller formulae
Keywords :
H∞ control; linear systems; matrix algebra; reduced order systems; state feedback; conservatism; explicit controller formulae; full-order controllers; linear matrix inequalities; linear parameter-varying plant; necessary and sufficient conditions; parameter-dependent control problem; partial-state feedback; reduced-order controllers; reduced-order solutions; Control system synthesis; Control systems; Current measurement; Feedback; Linear matrix inequalities; Linear systems; Mechanical engineering; Mechanical variables measurement; Riccati equations; Sufficient conditions;
Conference_Titel :
American Control Conference, 1997. Proceedings of the 1997
Conference_Location :
Albuquerque, NM
Print_ISBN :
0-7803-3832-4
DOI :
10.1109/ACC.1997.610887
