DocumentCode
1404838
Title
A continuity proof of Rudin´s theorem for polynomials and a generalization
Author
Curtin, Eugene ; Saba, Salim
Author_Institution
Dept. of Math., Southwest Texas State Univ., San Marcos, TX, USA
Volume
47
Issue
9
fYear
2000
fDate
9/1/2000 12:00:00 AM
Firstpage
1319
Lastpage
1322
Abstract
We assign to each nonzero complex polynomial the minimum of the absolute values of its roots. We show the simple principle that this minimum depends continuously on the coefficients of the polynomial and is sufficiently powerful to give a very elementary proof of Rudin´s stability theorem for multivariable polynomials. Moreover, we show that the polynomial version of a generalization on Rudin´s theorem due to Hertz and Zeheb is obtained as a consequence of this principle.
Keywords
multidimensional systems; polynomials; stability; Rudin´s theorem; continuity proof; multidimensional systems; multivariable polynomials; nonzero complex polynomial; stability theorem; Circuits; Digital filters; Digital signal processing; Mathematics; Multidimensional signal processing; Multidimensional systems; Polynomials; Stability criteria; Testing;
fLanguage
English
Journal_Title
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
Publisher
ieee
ISSN
1057-7122
Type
jour
DOI
10.1109/81.883326
Filename
883326
Link To Document