Title :
Controller reduction preserving the closed-loop performance for a class of linear multivariable systems
Author :
Ohse, Nagato ; Kunitomi, Takeshi
Author_Institution :
Kyoto Inst. of Technol., Japan
Abstract :
In this paper, a new method of controller reduction preserving both stability and performance of the closed-loop system is proposed. First, a quadratic cost is introduced which represents a performance of the closed-loop system constructed by linear multivariable plant and high-order dynamic controller. Then the controller reduction problem is formulated as finding the fixed low-order dynamic controller preserving stability and value of the quadratic cost. Secondly, by using the Lyapunov equation, the problem is converted into the convex optimization problem with constraint described by a linear matrix inequality (LMI), and the sufficient condition for the existence of such an optimal reduced-order controller is shown. Finally, a numerical example is demonstrated
Keywords :
Lyapunov methods; closed loop systems; control system analysis; controllers; linear systems; matrix algebra; multivariable control systems; optimisation; reduced order systems; stability; Lyapunov equation; closed-loop performance; closed-loop system; controller reduction; convex optimization problem; high-order dynamic controller; linear matrix inequality; linear multivariable systems; optimal reduced-order controller; quadratic cost; Constraint optimization; Control systems; Costs; Electrical equipment industry; Linear matrix inequalities; MIMO; Mathematical model; Radio control; Signal synthesis; Stability;
Conference_Titel :
Industrial Electronics, Control, and Instrumentation, 1995., Proceedings of the 1995 IEEE IECON 21st International Conference on
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-3026-9
DOI :
10.1109/IECON.1995.483855
