Two Necessary Conditions for a Complex Polynomial to be Strictly Hurwitz and Their Applications in Robust Stability Analysis
Document Type
Article
Publication Date
1-1-1993
Abstract
In this note, two necessary conditions for a complex polynomial to be strictly Hurwitz (formerly available only in Chinese [1]), are reviewed and rigorously proved. Both necessary conditions have been extended to cover nonmonic polynomials instead of monic polynomials as restricted in [1], Also, based on these two results, some necessary conditions for an interval polynomial to be stable in terms of being strict Hurwitz are obtained. They can be used to quickly determine the instability of a complex interval polynomial family. Finally, their application to the study of robust stability, in the case where coefficient perturbation intervals are functions of a single parameter, is briefly discussed. © 1993 IEEE
Identifier
0027306535 (Scopus)
Publication Title
IEEE Transactions on Automatic Control
External Full Text Location
https://doi.org/10.1109/9.186322
e-ISSN
15582523
ISSN
00189286
First Page
125
Last Page
128
Issue
1
Volume
38
Recommended Citation
Shi, Y. Q., "Two Necessary Conditions for a Complex Polynomial to be Strictly Hurwitz and Their Applications in Robust Stability Analysis" (1993). Faculty Publications. 17224.
https://digitalcommons.njit.edu/fac_pubs/17224
