DocumentCode
1196023
Title
New results on stable multidimensional polynomials- Part II: Discrete case
Author
Basu, Sankar ; Fettweis, Alfred
Volume
34
Issue
11
fYear
1987
fDate
11/1/1987 12:00:00 AM
Firstpage
1264
Lastpage
1274
Abstract
Properties of various multidimensional polynomials arising in studies on discrete multidimensional systems are investigated. Reactance Schur polynomials and immittance Schur polynomials occurring, respectively, as the denominators (and numerators) of discrete reactance functions and discrete positive functions are introduced and their properties studied. The role of these polynomials in scattering or immittance descriptions of passive discrete-time domain multiports are brought out. The interrelations between various classes of multidimensional polynomials arising in studies on discrete systems and the corresponding classes of polynomials in the context of continuous systems are also studied via the bilinear transformation.
Keywords
Digital filter stability; Image filtering; Multidimensional digital filters; Multivariable functions; Polynomials; Routh stability, linear systems; Algorithm design and analysis; Continuous time systems; Design methodology; Digital filters; Discrete transforms; Helium; Multidimensional systems; Passive filters; Polynomials; Scattering;
fLanguage
English
Journal_Title
Circuits and Systems, IEEE Transactions on
Publisher
ieee
ISSN
0098-4094
Type
jour
DOI
10.1109/TCS.1987.1086065
Filename
1086065
Link To Document