Title :
Minimax design of optimal stochastic multivariable systems
Author_Institution :
Dept. of Electron. & Electr. Eng., Stathclyde Univ., Glasgow, UK
fDate :
11/1/1988 12:00:00 AM
Abstract :
A new minimax optimal control problem is considered for a stochastic multivariable system. The cost function involves the trace of a weighted sum of spectral density matrices whose frequency response is to be limited. The Hinfinity -norm of this scalar function is therefore minimised. To obtain the solution of the minimax control problem, an auxiliary lemma is employed. This enables an equivalent LQG optimal problem to be constructed which has the desired controller as its solution. An advantage of the particular cost function employed is that the solution is obtained more easily than for the general multivariable Hinfinity problem. This makes the approach easier to understand and the results simpler.
Keywords :
control system synthesis; multivariable control systems; optimal control; optimal systems; optimisation; stochastic systems; H∞ -norm; LQG optimal problem; control system synthesis; frequency response; minimax optimal control problem; multivariable system; optimal system; optimisation; spectral density matrices; stochastic system;
Journal_Title :
Control Theory and Applications, IEE Proceedings D
