On robust Hurwitz polynomials
- 1 October 1987
- journal article
- Published by Institute of Electrical and Electronics Engineers (IEEE) in IEEE Transactions on Automatic Control
- Vol. 32 (10), 909-913
- https://doi.org/10.1109/tac.1987.1104459
Abstract
In this note, Kharitonov's theorem on robust Hurwitz polynomials is simplified for low-order polynomials. Specifically, for n = 3, 4 , and 5, the number of polynomials required to check robust stability is one, two, and three, respectively, instead of four. Furthermore, it is shown that for n \geq 6 , the number of polynomials for robust stability checking is necessarily four, thus further simplification is not possible. The same simplifications arise in robust Schur polynomials by using the bilinear transformation. Applications of these simplifications to two-dimensional polynomials as well as to robustness for single parameters are indicated.Keywords
This publication has 7 references indexed in Scilit:
- On robust Hurwitz and Schur polynomialsPublished by Institute of Electrical and Electronics Engineers (IEEE) ,1986
- Some discrete-time counterparts to Kharitonov's stability criterion for uncertain systemsIEEE Transactions on Automatic Control, 1986
- Kharitonov's theorem and stability test of multidimensional digital filtersIEE Proceedings G (Electronic Circuits and Systems), 1986
- Stability of polynomials under coefficient perturbationIEEE Transactions on Automatic Control, 1985
- A system-theoretic approach to stability of sets of polynomialsContemporary Mathematics, 1985
- Invariance of the strict Hurwitz property for polynomials with perturbed coefficientsIEEE Transactions on Automatic Control, 1984
- Strictly Hurwitz property invariance of quartics under coefficient perturbationIEEE Transactions on Automatic Control, 1983