Title :
Optimal linear control systems with incomplete state measurements
Author :
Ferguson, Johan D. ; Rekasius, Zenonas V., III
Author_Institution :
University of Illinois, Chicago, Ill
fDate :
4/1/1969 12:00:00 AM
Abstract :
Optimal control laws usually require the complete measurement of the plant state. However, in practice one often has available only a small number of measurements. A procedure is developed that leads to a dynamic feedback control law which is a function of any given set of measurements. The resulting closed-loop system is optimal for all initial states of the system in the sense of minimizing a quadratic performance index. The order of the controller depends upon the observability properties of the plant. The development is extended to time-variable problems.
Keywords :
Linear systems; Optimal control; Control systems; Control theory; Feedback control; Inverse problems; Kalman filters; Observability; Optimal control; Performance analysis; Proportional control; Regulators;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.1969.1099132
