DocumentCode
1066247
Title
An alternative proof of Kharitonov´s theorem
Author
Chapellat, Herve ; Bhattacharyya, S.P.
Author_Institution
Dept. of Electr. Eng., Texas A&M Univ., College Station, TX, USA
Volume
34
Issue
4
fYear
1989
fDate
4/1/1989 12:00:00 AM
Firstpage
448
Lastpage
450
Abstract
An alternative proof is presented of Kharitonov´s theorem for real polynomials. The proof shows that if an unstable root exists in the interval family, then another unstable root must also show up in what is called the Kharitonov plane, which is delimited by the four Kharitonov polynomials. This fact is proved by using a simple lemma dealing with convex combinations of polynomials. Then a well-known result is utilized to prove that when the four Kharitonov polynomials are stable, the Kharitonov plane must also be stable, and this contradiction proves the theorem
Keywords
polynomials; Kharitonov´s theorem; convex combinations; polynomials; unstable root; Convolution; Costs; Engineering drawings; Linear systems; Matrix decomposition; Polynomials; Robust control; Signal processing algorithms;
fLanguage
English
Journal_Title
Automatic Control, IEEE Transactions on
Publisher
ieee
ISSN
0018-9286
Type
jour
DOI
10.1109/9.28021
Filename
28021
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