Title :
Explicit formulas for optimally robust controllers for delay systems
Author :
Dym, Harry ; Georgiou, Tryphon T. ; Smith, Malcolm C.
Author_Institution :
Dept. of Theor. Math., Weizmann Inst. of Sci., Rehovot, Israel
fDate :
4/1/1995 12:00:00 AM
Abstract :
This paper considers single-input/single-output systems whose transfer functions take the form of a strictly proper rational function times a delay. A closed-form expression is presented for the controller which is optimally robust with respect to perturbations measured in the gap metric. The formula allows the H∞ loop-shaping procedure of Glover-McFarlane to be carried out explicitly for this class of systems without the need to first find a rational approximation of the plant. The form of the controller involves a certain algebra of “pseudo-derivation” operators. These operators, and their matrix generalizations, play a central role in the derivation of the controller. A discussion of the main properties of these operators is given. An example is presented of a controller design to achieve disturbance attenuation and robust set-point following for a plant with two lightly damped poles and a nontrivial time delay. The performance is compared, and shown to be superior, to that of a Smith predictor
Keywords :
H∞ control; approximation theory; closed loop systems; delay systems; poles and zeros; robust control; transfer functions; Glover-McFarlane procedure; H∞ loop-shaping; SISO systems; closed-form expression; delay systems; disturbance attenuation; feedback system; gap metric; lightly damped poles; matrix generalizations; optimally robust controllers; perturbations; rational approximation; time delay; transfer functions; Algebra; Closed-form solution; Control system synthesis; Control systems; Delay systems; Lighting control; Optical attenuators; Optimal control; Robust control; Transfer functions;
Journal_Title :
Automatic Control, IEEE Transactions on
