Title :
A lower and upper bound for the gap metric
Author :
Zhu, S.Q. ; Hautus, M.L.J. ; Praagman, C.
Author_Institution :
Fac. of Math., Eindhoven Univ. of Technol., Netherlands
Abstract :
A lower bound and an upper bound for the gap metric are presented. These bounds are sharp in the sense that there exist systems reaching the bounds. The lower bound is the H∞-norm of a rational matrix, and the upper bound is the sum of the lower bound and the norm of a Hankel operator. Only coprime fractional representations over L∞-matrices are needed to compute the lower bound. Two equivalent forms of the gap metric are presented, and using these it is shown that if the gap of two systems is smaller than 1, then the two directed gaps are the same. An L∞ -gap metric is introduced as a purely theoretical generalization of the ordinary gap metric. It turns out that the lower bound is the L∞-gap metric
Keywords :
control system synthesis; matrix algebra; optimal control; stability; H∞-norm; Hankel operator norm; L∞-matrices; coprime fractional representations; gap metric; lower bound; rational matrix; sharp bounds; upper bound; Control design; Control system analysis; Control systems; Control theory; Interpolation; Mathematics; Robust control; Robustness; Sufficient conditions; Upper bound;
Conference_Titel :
Decision and Control, 1989., Proceedings of the 28th IEEE Conference on
Conference_Location :
Tampa, FL
DOI :
10.1109/CDC.1989.70591
