DocumentCode
844085
Title
Proper and stable, minimal MacMillan degrees bases of rational vector spaces
Author
Vardulakis, Antonis I.G. ; Karcanias, Nicos
Author_Institution
Aristotle University of Thessaloniki, Greece
Volume
29
Issue
12
fYear
1984
fDate
12/1/1984 12:00:00 AM
Firstpage
1118
Lastpage
1120
Abstract
The structure of proper and stable bases of rational vector spaces is investigated. We prove that if 
is a rational vector space, then among the proper bases of 3(s) there is a subfamily of proper bases which are 1) stable, 2) have no zeros in 
and therefore are column (row) reduced at infinity, and 3) their MacMillan degree is minimum among the MacMillan degrees of all other proper bases of 3(s) and it is given by the sum of the MacMillan degrees of their columns taken separately. It is shown that this notion is the counterpart of Forney\´s concept of a minimal polynomial basis for the family of proper and stable bases of 3(s).
is a rational vector space, then among the proper bases of 3(s) there is a subfamily of proper bases which are 1) stable, 2) have no zeros in and therefore are column (row) reduced at infinity, and 3) their MacMillan degree is minimum among the MacMillan degrees of all other proper bases of 3(s) and it is given by the sum of the MacMillan degrees of their columns taken separately. It is shown that this notion is the counterpart of Forney\´s concept of a minimal polynomial basis for the family of proper and stable bases of 3(s).Keywords
Rational functions; Vector spaces; H infinity control; Mathematics; Poles and zeros; Polynomials; Tin;
fLanguage
English
Journal_Title
Automatic Control, IEEE Transactions on
Publisher
ieee
ISSN
0018-9286
Type
jour
DOI
10.1109/TAC.1984.1103456
Filename
1103456
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