DocumentCode
3072874
Title
Spectral factorizaton using analytic interpolation theory
Author
Georgiou, T.T. ; Khargonekar, P.P.
Author_Institution
Iowa State University
fYear
1986
fDate
10-12 Dec. 1986
Firstpage
7
Lastpage
11
Abstract
In this paper, we present a novel spectral factorization algorithm based on linear fractional transformations and the Nevanlinna-Pick interpolation theory. The algorithm is recursive and depends on a choice of points (zk, k=1, 2, ...), inside the unit disk. A mild condition on the distribution of the zk´s ensures convergence of the algorithm. The algorithm is quite flexible and convergence can be controlled by the selection of zK´s.
Keywords
Algorithm design and analysis; Circuit stability; Control theory; Filtering theory; History; Interpolation; Mathematics; Spectral analysis; Stability analysis; Stochastic processes;
fLanguage
English
Publisher
ieee
Conference_Titel
Decision and Control, 1986 25th IEEE Conference on
Conference_Location
Athens, Greece
Type
conf
DOI
10.1109/CDC.1986.267122
Filename
4048695
Link To Document