DocumentCode
1562195
Title
Preservation of displacement ranks and the numerical stability of time recursive fast algorithms
Author
Gueguen, C. ; Desbouvries, Francois
Author_Institution
Signal Processing Dept., Ecole Nat. Superieure Telecommun., Paris, France
fYear
1989
Firstpage
1294
Abstract
The authors investigate the role played by the preservation of the displacement rank in the update of covariance matrix time-recursive fast algorithms. Standard fast recursive-least-squares algorithms assume the constancy in time of the displacement rank and act on a supposed reduced set of generators. The authors show that some closure relationships have to be maintained in order to preserve the low displacement structure, and they advocate a preliminary canonical reduction procedure. A state-space interpretation of the Kalman gain is introduced that makes it possible to compute it from past prediction errors
Keywords
filtering and prediction theory; least squares approximations; Kalman gain; covariance matrix; fast recursive-least-squares algorithms; filtering; numerical stability; preservation of the displacement rank; state-space interpretation; time recursive fast algorithms; Adaptive algorithm; Character generation; Computational efficiency; Covariance matrix; Kalman filters; Least squares methods; Linear algebra; Numerical stability; Roundoff errors; Time varying systems;
fLanguage
English
Publisher
ieee
Conference_Titel
Acoustics, Speech, and Signal Processing, 1989. ICASSP-89., 1989 International Conference on
Conference_Location
Glasgow
ISSN
1520-6149
Type
conf
DOI
10.1109/ICASSP.1989.266673
Filename
266673
Link To Document