Alternating Least-Squares for Low-Rank Matrix Reconstruction

Author

Zachariah, Dave ; Sundin, Martin ; Jansson, Magnus ; Chatterjee, Saikat

Author_Institution

ACCESS Linnaeus Centre, KTH R. Inst. of Technol., Stockholm, Sweden

Volume

19

Issue

4

fYear

2012

fDate

4/1/2012 12:00:00 AM

Firstpage

231

Lastpage

234

Abstract

For reconstruction of low-rank matrices from undersampled measurements, we develop an iterative algorithm based on least-squares estimation. While the algorithm can be used for any low-rank matrix, it is also capable of exploiting a-priori knowledge of matrix structure. In particular, we consider linearly structured matrices, such as Hankel and Toeplitz, as well as positive semidefinite matrices. The performance of the algorithm, referred to as alternating least-squares (ALS), is evaluated by simulations and compared to the Cramér-Rao bounds.

Keywords

iterative methods; least squares approximations; matrix algebra; signal processing; ALS; Cramer-Rao bounds; Hankel matrices; Toeplitz matrices; alternating least-squares; iterative algorithm; least-square estimation; linearly-structured matrices; low-rank matrix reconstruction; matrix structure a-priori knowledge; positive-semidefinite matrices; Eigenvalues and eigenfunctions; Image reconstruction; Matrix decomposition; Noise; Noise measurement; Signal processing algorithms; Vectors; Cramér–Rao bound; least squares; low-rank matrix reconstruction; structured matrices;

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/LSP.2012.2188026

Filename

6153051