Gaussian moments for noisy independent component analysis

Author

Hyvärinen, Aapo

Author_Institution

Lab. of Comput. & Inf. Sci., Helsinki Univ. of Technol., Espoo, Finland

Volume

6

Issue

6

fYear

1999

fDate

6/1/1999 12:00:00 AM

Firstpage

145

Lastpage

147

Abstract

A novel approach for the problem of estimating the data model of independent component analysis (or blind source separation) in the presence of Gaussian noise is introduced. We define the Gaussian moments of a random variable as the expectations of the Gaussian function (and some related functions) with different scale parameters, and show how the Gaussian moments of a random variable can be estimated from noisy observations. This enables us to use Gaussian moments as one-unit contrast functions that have no asymptotic bias even in the presence of noise, and that are robust against outliers. To implement the maximization of the contrast functions based on Gaussian moments, a modification of the fixed-point (FastICA) algorithm is introduced.

Keywords

Gaussian noise; parameter estimation; random processes; signal processing; statistical analysis; FastICA; Gaussian function; Gaussian moments; Gaussian noise; blind source separation; contrast functions; data model estimation; fixed-point algorithm; maximization; noisy independent component analysis; noisy observations; one-unit contrast functions; outliers; random variable; scale parameters; Blind source separation; Covariance matrix; Data models; Gaussian noise; Independent component analysis; Multidimensional signal processing; Noise robustness; Random variables; Signal processing algorithms; Vectors;

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/97.763148

Filename

763148