Title :
Sensitivity of roots to errors in the coefficient of polynomials obtained by frequency-domain estimation methods
Author :
Guillaume, Patrick ; Schoukens, J. ; Pintelon, Rik
Author_Institution :
Dept. of Electr. Meas., Vrije Univ. Brussels, Belgium
fDate :
12/1/1989 12:00:00 AM
Abstract :
Although the roots of a polynomial of high order are extremely sensitive to perturbations in its coefficients, experience has demonstrated that frequency-domain estimation techniques succeed in the determination of accurate poles and zeros, even in the case of high-order transfer function models. The authors prove that this is due to the correlations among the estimated coefficients. When the result of a measurement is a set of correlated values, they conclude that it is not justifiable to use the standard deviation to determine the number of significant digits. Additional digits have to be considered in order to maintain the information enclosed in the correlations
Keywords :
correlation methods; error analysis; frequency-domain analysis; measurement theory; poles and zeros; polynomials; coefficient of polynomials; correlations; estimated coefficients; frequency-domain estimation; high-order transfer function models; perturbations; poles and zeros; polynomial; roots sensitivity to errors; Electric variables measurement; Equations; Frequency estimation; Measurement errors; Measurement standards; Poles and zeros; Pollution measurement; Polynomials; Predictive models; Transfer functions;
Journal_Title :
Instrumentation and Measurement, IEEE Transactions on
