Title :
Searching beyond SVD for rank reduction
Author_Institution :
Dept. of Electr. & Electron. Eng., Melbourne Univ., Vic., Australia
Abstract :
Singular value decomposition (SVD) is analytically inherent in various reduced rank filters and/or estimators. But the computation of SVD is generally not an efficient way for rank reduction. This paper introduces an efficient approach to computing for rank reduction. This approach, referred to as the alternate power (AP) method, is globally and exponentially convergent under a weak condition, and is a generalization of the conventional power method for subspace computation. The AP method is especially useful for computing the reduced rank filter (RRF) by Brillinger (1975), the reduced rank Wiener filter (RRWF) by Scharf (1991), and the reduced rank maximum likelihood estimate (RRMLE) by Stoica and Viberg (1996)
Keywords :
Wiener filters; convergence of numerical methods; filtering theory; iterative methods; maximum likelihood estimation; SVD; alternate power method; exponentially convergent method; globally convergent method; instantaneous filters; iterative algorithm; rank reduction; reduced rank Wiener filter; reduced rank estimators; reduced rank filters; reduced rank maximum likelihood estimate; singular value decomposition; subspace computation; Data compression; Feature extraction; Filtering; Matrix decomposition; Maximum likelihood detection; Maximum likelihood estimation; Power engineering computing; Signal processing; Singular value decomposition; Wiener filter;
Conference_Titel :
Sensor Array and Multichannel Signal Processing Workshop. 2000. Proceedings of the 2000 IEEE
Conference_Location :
Cambridge, MA
Print_ISBN :
0-7803-6339-6
DOI :
10.1109/SAM.2000.878037
