Poles and zeros at infinity of linear time-varying systems

Author

Bourlès, Henri ; Marinescu, Bogdan

Author_Institution

Lab. d´´Autom. des Arts et Metiers, CNAM-ENSAM, Paris, France

Volume

44

Issue

10

fYear

1999

fDate

10/1/1999 12:00:00 AM

Firstpage

1981

Lastpage

1985

Abstract

The notions of poles and zeros at infinity and their relations are extended to the case of linear continuous time-varying systems. This study is based on the notion of a “newborn systems which is, in a mathematical point of view, a graded module extension over the noncommutative ring of differential operators. It is proved to be a relevant generalization to the time-varying case of the equivalence class, for the so-called “restricted equivalence” of Rosenbrock´s polynomial matrix descriptions. The authors´ approach is intrinsic and unifies the definitions previously given in the literature in the time-invariant case

Keywords

continuous time systems; equivalence classes; linear systems; poles and zeros; polynomial matrices; time-varying systems; Rosenbrock´s polynomial matrix descriptions; differential operators; equivalence class; graded module extension; linear continuous time-varying systems; newborn systems; noncommutative ring; restricted equivalence; Art; Filtering theory; Frequency; H infinity control; Linear systems; Pediatrics; Poles and zeros; Polynomials; Switches; Time varying systems;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/9.793790

Filename

793790