DocumentCode
1353797
Title
Convergence bounds of an SMI/Gram-Schmidt canceler in colored noise
Author
Gerlach, K.
Author_Institution
US Naval Res. Lab., Washington, DC
Volume
27
Issue
4
fYear
1991
fDate
7/1/1991 12:00:00 AM
Firstpage
655
Lastpage
666
Abstract
The performance of the sampled matrix inversion (SMI) adaptive algorithm in colored noise is investigated using the Gram-Schmidt (GS) canceler as an analysis tool. Lower and upper bounds of average convergence are derived, indicating that average convergence slows as the input time samples become correlated. When the input samples are uncorrelated, the fastest SMI algorithm convergence occurs. When the input samples are correlated then the convergence bounds depend on the number of channels N , the number of samples per channels K , and the eigenvalues associated with K ×K correlation matrix of the samples in a given channel. This matrix is assumed identical for all channels
Keywords
antenna phased arrays; antenna theory; correlation theory; eigenvalues and eigenfunctions; interference suppression; matrix algebra; random noise; signal processing; colored noise; convergence bound; correlation matrix; eigenvalues; sampled matrix inversion adaptive algorithm; Adaptive arrays; Colored noise; Convergence; Covariance matrix; Decorrelation; Gaussian noise; Laboratories; Noise cancellation; Samarium; Upper bound;
fLanguage
English
Journal_Title
Aerospace and Electronic Systems, IEEE Transactions on
Publisher
ieee
ISSN
0018-9251
Type
jour
DOI
10.1109/7.85039
Filename
85039
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