DocumentCode :
795738
Title :
The factorization of discrete-process spectral matrices
Author :
Motyka, Paul R. ; Cadzow, James A.
Author_Institution :
State University of New York, Buffalo, NY, USA
Volume :
12
Issue :
6
fYear :
1967
fDate :
12/1/1967 12:00:00 AM
Firstpage :
698
Lastpage :
707
Abstract :
A technique is presented for salving the discrete version of the multidimensional Wiener-Hopf equation by spectral factorization. This equation is derived to establish a need for spectral factorization and to determine the requirements of the factors of the spectral matrix. The method of factoring the spectral matrix of continuous systems, developed by Davis, is then extended to discrete systems. More specifically, a matrix 
must be found such that the matrix of the spectra of the input signals equals the product of 
and 
. A technique for finding this matrix is presented. The nonanticipatoriness as well as the stability of the elements of and 
must be and is guaranteed. It is then shown that the solution to the discrete Wiener-Hopf equation is unique.
must be found such that the matrix of the spectra of the input signals equals the product of and . A technique for finding this matrix is presented. The nonanticipatoriness as well as the stability of the elements of and must be and is guaranteed. It is then shown that the solution to the discrete Wiener-Hopf equation is unique.Keywords :
Discrete-process control; Matrix factorization; Wiener-Hopf theory; Autocorrelation; Equations; Filtering; Linear systems; Multidimensional systems; Random processes; Vectors;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1967.1098733
Filename :
1098733
Link To Document :
