Title :
Algebraic phase unwrapping and zero distribution of polynomial for continuous-time systems
Author :
Yamada, Isao ; Bose, N.K.
Author_Institution :
Dept. of Commun. & Integrated Syst., Tokyo Inst. of Technol., Japan
fDate :
3/1/2002 12:00:00 AM
Abstract :
An analytic solution is provided to the symbolic algebra-based computational problem for the unwrapped phase (that can be uniquely expressed as an integral involving itself and its derivative) of a continuous-time linear time-invariant system whose characteristic polynomial has coefficients belonging to the algebraically closed field of complex numbers. This solution is based on the use of the classical Cauchy indices. Application and adaptation of this analytic solution to an arbitrary univariate polynomial, yields its zero distribution with respect to the unbounded imaginary axis in the complex plane. Importantly, the algorithm that yields this zero distribution is designed to enforce the nonoccurrence of singular cases and can be implemented to any desired accuracy by rational operations
Keywords :
continuous time systems; linear systems; polynomials; zero assignment; Cauchy index; Sturm sequence; algebraically closed complex number field; arbitrary univariate polynomial; characteristic polynomial coefficients; complex plane; continuous-time linear time-invariant system; continuous-time systems; polynomial algebraic phase unwrapping; polynomial zero distribution; rational operations; singular case nonoccurrence; symbolic algebra-based computational problem; unbounded imaginary axis; unwrapped phase; unwrapped phase integral; unwrapped phase integral derivative; Algorithm design and analysis; Distributed computing; Documentation; Image analysis; Knowledge engineering; Pervasive computing; Polynomials; Testing;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
