DocumentCode :
822077
Title :
Some geometric questions in the theory of linear systems
Author :
Brockett, Roger W.
Author_Institution :
Harvard University, Cambridge, MA, USA
Volume :
21
Issue :
4
fYear :
1976
fDate :
8/1/1976 12:00:00 AM
Firstpage :
449
Lastpage :
455
Abstract :
In this paper we discuss certain geometrical aspects of linear systems which, even though they arise in the case of single input-single output systems, do not seem to have been explicitly recognized and studied before. We show, among other things, that the set of minimal, single input-single output, linear systems of degree 
, when topologized in the obvious way, consists of 
connected components. The Cauchy index (equivalently, the signature of the Hankel matrix) characterizes the components and the geometry of each component is investigated. We also study the effect of various constraints such as asking that the system be stable or minimum phase.
, when topologized in the obvious way, consists of connected components. The Cauchy index (equivalently, the signature of the Hankel matrix) characterizes the components and the geometry of each component is investigated. We also study the effect of various constraints such as asking that the system be stable or minimum phase.Keywords :
Linear systems, time-invariant continuous-time; Control theory; Geometry; Linear systems; Physics; Poles and zeros; Transfer functions;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1976.1101301
Filename :
1101301
Link To Document :
