Image denoising based on a mixture of circular symmetric Laplacian models in complex wavelet domain

For maximum a posteriori (MAP) estimation of noise-free data from noisy observation, it is necessary to consider a proper distribution for modeling probability density function (pdf) of noise-free data. Recently, it has been shown that bivariate pdfs, that exploit dependencies between coefficients in adjacent scales of wavelet coefficients, can better model the statistical property of wavelet coefficients. Thus wavelet based image denoising algorithms employing bivariate pdfs achieves better performance compared with the ones based on the independence assumption. In this paper, we design a bivariate MAP estimator which uses a mixture of circular symmetric Laplacian pdfs. This model not only is bivariate but also is mixture. Mixture pdf models the heavy-tailed natures of the data and the bivariate pdf model the interscale dependencies of wavelet coefficients. Experimental results show that our new algorithm achieves better results than several methods, such as denoising based on univariate mixture pdfs and denoising employing bivariate pdfs, visually and in terms of peak signal-to-noise ratio (PSNR).

[1]  Kannan Ramchandran,et al.  Low-complexity image denoising based on statistical modeling of wavelet coefficients , 1999, IEEE Signal Processing Letters.

[2]  Alin Achim,et al.  SAR image denoising via Bayesian wavelet shrinkage based on heavy-tailed modeling , 2003, IEEE Trans. Geosci. Remote. Sens..

[3]  I. Johnstone,et al.  Adapting to Unknown Smoothness via Wavelet Shrinkage , 1995 .

[4]  Saeed Gazor,et al.  Image Denoising Based on A Mixture of Bivariate Laplacian Models in Complex Wavelet Domain , 2006, 2006 IEEE Workshop on Multimedia Signal Processing.

[5]  H. Rabbani,et al.  Image Denoising Based on A Mixture of Bivariate Gaussian Models in Complex Wavelet Domain , 2006, 2006 3rd IEEE/EMBS International Summer School on Medical Devices and Biosensors.

[6]  Saeed Gazor,et al.  Image Denoising Based on a Mixture of Laplace Distributions with Local Parameters in Complex Wavelet Domain , 2006, 2006 International Conference on Image Processing.

[7]  Eero P. Simoncelli,et al.  Image denoising using a local Gaussian scale mixture model in the wavelet domain , 2000, SPIE Optics + Photonics.

[8]  H Rabani,et al.  WAVELET-BASED IMAGE DENOISING WITH MIXTURE LAPLACE MODEL USING LOCAL VARIANCES , 2007 .

[9]  I. Johnstone,et al.  Ideal spatial adaptation by wavelet shrinkage , 1994 .

[10]  Levent Sendur,et al.  Bivariate shrinkage functions for wavelet-based denoising exploiting interscale dependency , 2002, IEEE Trans. Signal Process..

[11]  David L. Donoho,et al.  De-noising by soft-thresholding , 1995, IEEE Trans. Inf. Theory.

[12]  H. Rabbani,et al.  Image Denoising Employing a Bivariate Cauchy Distribution with Local Variance in Complex Wavelet Domain , 2006, 2006 IEEE 12th Digital Signal Processing Workshop & 4th IEEE Signal Processing Education Workshop.