Bayesian Denoising: From MAP to MMSE Using Consistent Cycle Spinning

Author

Kazerouni, A. ; Kamilov, Ulugbek S. ; Bostan, Emrah ; Unser, Michael

Author_Institution

Biomed. Imaging Group, Ecole Polytech. Fed. de Lausanne (EPFL), Lausanne, Switzerland

Volume

20

Issue

3

fYear

2013

fDate

Mar-13

Firstpage

249

Lastpage

252

Abstract

We introduce a new approach for the implementation of minimum mean-square error (MMSE) denoising for signals with decoupled derivatives. Our method casts the problem as a penalized least-squares regression in the redundant wavelet domain. It exploits the link between the discrete gradient and Haar-wavelet shrinkage with cycle spinning. The redundancy of the representation implies that some wavelet-domain estimates are inconsistent with the underlying signal model. However, by imposing additional constraints, our method finds wavelet-domain solutions that are mutually consistent. We confirm the MMSE performance of our method through statistical estimation of Lévy processes that have sparse derivatives.

Keywords

Bayes methods; estimation theory; gradient methods; least mean squares methods; regression analysis; signal denoising; wavelet transforms; Bayesian denoising; Haar-wavelet shrinkage; Levy processes; MAP; MMSE denoising; MMSE performance; additional constraints; cycle spinning; decoupled derivatives; discrete gradient; minimum mean-square error denoising; penalized least-squares regression; redundant wavelet domain; signal model; sparse derivatives; statistical estimation; wavelet-domain estimates; wavelet-domain solutions; Bayesian methods; Estimation; Noise reduction; TV; Wavelet domain; Wavelet transforms; Augmented Lagrangian; MMSE estimation; total variation denoising; wavelet denoising;

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/LSP.2013.2242061

Filename

6417960