Title :
Finite dimensional controller design via the largest robust stability radius
Author_Institution :
Dept. of Math. Sci., Clemson Univ., SC, USA
Abstract :
Consideration is given to the space of transfer matrices with entries in the quotient field of H-infinity, in which the gap metric is defined. The largest robust stability radius of a transfer matrix is defined as the radius of the largest ball centered at the transfer matrix which can be stabilized by a single controller. There are two schemes presented for designing finite dimensional stabilizing controllers by means of the largest robust stability radius. Both schemes guarantee that the finite dimensional controllers stabilize the original infinite dimensional system. Moreover, the closed-loop response can be estimated
Keywords :
control system synthesis; matrix algebra; multidimensional systems; stability; H-infinity; closed-loop response; control system synthesis; finite dimensional stabilizing controllers; gap metric; infinite dimensional system; largest robust stability radius; multidimensional systems; quotient field; transfer matrices; Control systems; Frequency domain analysis; H infinity control; Heat transfer; Optimal control; Robust control; Robust stability; Robustness; Temperature control; Time invariant systems;
Conference_Titel :
System Theory, 1990., Twenty-Second Southeastern Symposium on
Conference_Location :
Cookeville, TN
Print_ISBN :
0-8186-2038-2
DOI :
10.1109/SSST.1990.138178
