Title :
Bayesian wavelet denoising using Besov priors
Author :
Leporini, D. ; Krim, H.
Author_Institution :
Lab. des Signaux et Syst., CNRS, Paris, France
Abstract :
Over the past few years, there has been a great research interest in thresholding methods for nonlinear wavelet regression over spaces of smooth functions. Near-minimax convergence rates were in particular established for simple hard and soft thresholding rules over Besov and Triebel bodies. In this paper, we propose a Bayesian approach where the functional properties of the underlying signal in noise are directly modeled using Besov norm priors on its wavelet decomposition coefficients. A Gibbs sampler is subsequently presented to estimate the model parameters and the posterior mean of the signal in the case of possibly non-Gaussian noise
Keywords :
Bayes methods; noise; parameter estimation; probability; signal sampling; wavelet transforms; Bayesian wavelet denoising; Besov norm priors; Besov priors; Gibbs sampler; functional properties; model parameter estimation; near-minimax convergence rates; non-Gaussian noise; nonlinear wavelet regression; smooth functions; thresholding methods; underlying signal; wavelet decomposition coefficients; Bayesian methods; Convergence; Intersymbol interference; Kernel; Minimax techniques; Noise reduction; Postal services; Signal processing; Testing; Wavelet domain;
Conference_Titel :
Higher-Order Statistics, 1999. Proceedings of the IEEE Signal Processing Workshop on
Conference_Location :
Caesarea
Print_ISBN :
0-7695-0140-0
DOI :
10.1109/HOST.1999.778712
