About Advances in Tensor Data Denoising Methods

Tensor methods are of great interest since the development of multicomponent sensors. The acquired multicomponent data are represented by tensors, that is, multiway arrays. This paper presents advances on filtering methods to improve tensor data denoising. Channel-by-channel and multiway methods are...

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Main Authors: Salah Bourennane, Caroline Fossati, Julien Marot
Format: Article
Language:English
Published: SpringerOpen 2008-10-01
Series:EURASIP Journal on Advances in Signal Processing
Online Access:http://dx.doi.org/10.1155/2008/235357
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spelling doaj-565422d387d349deb1f28d5574092f4b2020-11-25T01:01:10ZengSpringerOpenEURASIP Journal on Advances in Signal Processing1687-61721687-61802008-10-01200810.1155/2008/235357About Advances in Tensor Data Denoising MethodsSalah BourennaneCaroline FossatiJulien MarotTensor methods are of great interest since the development of multicomponent sensors. The acquired multicomponent data are represented by tensors, that is, multiway arrays. This paper presents advances on filtering methods to improve tensor data denoising. Channel-by-channel and multiway methods are presented. The first multiway method is based on the lower-rank (K1,…,KN) truncation of the HOSVD. The second one consists of an extension of Wiener filtering to data tensors. When multiway tensor filtering is performed, the processed tensor is flattened along each mode successively, and singular value decomposition of the flattened matrix is performed. Data projection on the singular vectors associated with dominant singular values results in noise reduction. We propose a synthesis of crucial issues which were recently solved, that is, the estimation of the number of dominant singular vectors, the optimal choice of flattening directions, and the reduction of the computational load of multiway tensor filtering methods. The presented methods are compared through an application to a color image and a seismic signal, multiway Wiener filtering providing the best denoising results. We apply multiway Wiener filtering and its fast version to a hyperspectral image. The fast multiway filtering method is 29 times faster and yields very close denoising results.http://dx.doi.org/10.1155/2008/235357
collection DOAJ
language English
format Article
sources DOAJ
author Salah Bourennane
Caroline Fossati
Julien Marot
spellingShingle Salah Bourennane
Caroline Fossati
Julien Marot
About Advances in Tensor Data Denoising Methods
EURASIP Journal on Advances in Signal Processing
author_facet Salah Bourennane
Caroline Fossati
Julien Marot
author_sort Salah Bourennane
title About Advances in Tensor Data Denoising Methods
title_short About Advances in Tensor Data Denoising Methods
title_full About Advances in Tensor Data Denoising Methods
title_fullStr About Advances in Tensor Data Denoising Methods
title_full_unstemmed About Advances in Tensor Data Denoising Methods
title_sort about advances in tensor data denoising methods
publisher SpringerOpen
series EURASIP Journal on Advances in Signal Processing
issn 1687-6172
1687-6180
publishDate 2008-10-01
description Tensor methods are of great interest since the development of multicomponent sensors. The acquired multicomponent data are represented by tensors, that is, multiway arrays. This paper presents advances on filtering methods to improve tensor data denoising. Channel-by-channel and multiway methods are presented. The first multiway method is based on the lower-rank (K1,…,KN) truncation of the HOSVD. The second one consists of an extension of Wiener filtering to data tensors. When multiway tensor filtering is performed, the processed tensor is flattened along each mode successively, and singular value decomposition of the flattened matrix is performed. Data projection on the singular vectors associated with dominant singular values results in noise reduction. We propose a synthesis of crucial issues which were recently solved, that is, the estimation of the number of dominant singular vectors, the optimal choice of flattening directions, and the reduction of the computational load of multiway tensor filtering methods. The presented methods are compared through an application to a color image and a seismic signal, multiway Wiener filtering providing the best denoising results. We apply multiway Wiener filtering and its fast version to a hyperspectral image. The fast multiway filtering method is 29 times faster and yields very close denoising results.
url http://dx.doi.org/10.1155/2008/235357
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