Title :
On the stability of low-order perturbed polynomials
Author :
Argoun, Mohammad B.
Author_Institution :
Dept. of Mech. Eng., Wisconsin Univ., Milwaukee, WI, USA
fDate :
2/1/1990 12:00:00 AM
Abstract :
It is shown that for low-order perturbed continuous system polynomials (N⩽6), stability can be guaranteed by checking very simple conditions based on the Hermite-Biehler theorem. For N ⩽5 no numerical computation of the roots is required to check stability. For N=6, one root of a third-order polynomial needs to be found, with the rest of the conditions reducing to simple algorithmic relationships. The result is illustrated by numerical examples
Keywords :
polynomials; stability; Hermite-Biehler theorem; low-order perturbed continuous system polynomials; stability; third-order polynomial; Continuous time systems; Frequency domain analysis; Polynomials; Stability; Sufficient conditions; Testing;
Journal_Title :
Automatic Control, IEEE Transactions on
