Image denoising via bivariate shrinkage function based on a new structure of dual contourlet transform

Image denoising is a basic procedure of image processing, and the purpose of image denoising is to remove noises entirely and well preserve image boundaries and texture information simultaneously. However, conventional filtering methods easily lead to the loss of texture and details information. This paper proposes a new image denoising method to improve this problem, first proposing a new structure called dual contourlet transform (DCT) which is improved from contourlet transform and dual tree complex wavelet transform (DTCWT). The DCT employs a dual tree Laplacian Pyramid (LP) transform to improve the shift invariance and adopts directional filter banks (DFB) to achieve higher directional selectivity. Compared to other existing structures of multiresolution analysis, the main advantage of the DCT is that it not only possesses the advantages of other structures, but also it has simple structure and easy to implement. The most noteworthy is the redundancy of DCT is 8/3 at most; it is the envy of other existing structures. Second, after studying the distribution of DCT coefficients and the correlation between the interscale and intrascale dependencies, we take this account into denoising and use bivariate threshold function on DCT coefficients. Simulation experiments show that the proposed method achieves better performance than those outstanding denoising algorithms in terms of peak signal-to-noise ratio (PSNR), as well as visual quality. In addition, to verify the validity of our method, we give the difference between the original image and the denoised image that rarely used in other denoising literatures. A new image transform structure with the name of dual contourlet transform (DCT) is presented, which conducted with both dual LP and DFBS.A new image denoising method is developed with using bivariate shrinkage threshold on the coefficients of DCT. It is worth mentioning that it is the first time using bivariate shrinkage threshold on DCT domain.In evaluating process, we use a new measure that the difference between the original image and the denoised image to identify the denoised result, which is rarely used in other denoising literatures.

[1]  Aleksandra Pizurica,et al.  Removal of Correlated Noise by Modeling the Signal of Interest in the Wavelet Domain , 2009, IEEE Transactions on Image Processing.

[2]  Mark J. T. Smith,et al.  A filter bank for the directional decomposition of images: theory and design , 1992, IEEE Trans. Signal Process..

[3]  Soontorn Oraintara,et al.  The Shiftable Complex Directional Pyramid—Part II: Implementation and Applications , 2008, IEEE Transactions on Signal Processing.

[4]  Emmanuel J. Candès,et al.  The curvelet transform for image denoising , 2002, IEEE Trans. Image Process..

[5]  Ling Shao,et al.  A local descriptor based on Laplacian pyramid coding for action recognition , 2013, Pattern Recognit. Lett..

[6]  Soontorn Oraintara,et al.  The Shiftable Complex Directional Pyramid—Part I: Theoretical Aspects , 2008, IEEE Transactions on Signal Processing.

[7]  M. Do Directional multiresolution image representations , 2002 .

[8]  Levent Sendur,et al.  A bivariate shrinkage function for wavelet-based denoising , 2002, 2002 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[9]  Lishan Qiao,et al.  A general non-local denoising model using multi-kernel-induced measures , 2014, Pattern Recognit..

[10]  Alexander Wong,et al.  Adaptive bilateral filtering of image signals using local phase characteristics , 2008, Signal Process..

[11]  Richard Baraniuk,et al.  The Dual-tree Complex Wavelet Transform , 2007 .

[12]  Partha Sarathi Mukherjee,et al.  Edge structure preserving image denoising , 2010, Signal Process..

[13]  Liangcai Cao,et al.  Image denoising with anisotropic bivariate shrinkage , 2011, Signal Process..

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

[15]  Xiangchu Feng,et al.  Image denoising via 2D dictionary learning and adaptive hard thresholding , 2013, Pattern Recognit. Lett..

[16]  Dong Min,et al.  A Complex Contourlet Transform and its HMT model for denoising and texture retrieval , 2012, 2012 IEEE 11th International Conference on Signal Processing.

[17]  Ann Dooms,et al.  The near shift-invariance of the dual-tree complex wavelet transform revisited , 2012, 1304.7932.

[18]  Kun Liu,et al.  Oil Spill in SAR Image Denoising Method Based on Contourlet HMT , 2012 .

[19]  I. Selesnick,et al.  Bivariate shrinkage with local variance estimation , 2002, IEEE Signal Processing Letters.

[20]  Xin Zhang,et al.  Image denoising in contourlet domain based on a normal inverse Gaussian prior , 2010, Digit. Signal Process..

[21]  Reza Nezafat,et al.  Wavelet-Domain Medical Image Denoising Using Bivariate Laplacian Mixture Model , 2009, IEEE Transactions on Biomedical Engineering.

[22]  Minh N. Do,et al.  Framing pyramids , 2003, IEEE Trans. Signal Process..

[23]  Wei Liu,et al.  Image denoising using trivariate prior model in nonsubsampled dual-tree complex contourlet transform domain and non-local means filter in spatial domain , 2013 .

[24]  Bo Hu,et al.  A Novel Scheme for the Design of Approximate Hilbert Transform Pairs of Orthonormal Wavelet Bases , 2008, IEEE Transactions on Signal Processing.

[25]  Zhou Dengwen,et al.  Image denoising with an optimal threshold and neighbouring window , 2008 .

[26]  D. D.-Y. Po,et al.  Directional multiscale modeling of images using the contourlet transform , 2006, IEEE Transactions on Image Processing.

[27]  Martin J. Wainwright,et al.  Image denoising using scale mixtures of Gaussians in the wavelet domain , 2003, IEEE Trans. Image Process..

[28]  Minh N. Do,et al.  Ieee Transactions on Image Processing the Contourlet Transform: an Efficient Directional Multiresolution Image Representation , 2022 .

[29]  Minh N. Do,et al.  The Nonsubsampled Contourlet Transform: Theory, Design, and Applications , 2006, IEEE Transactions on Image Processing.

[30]  Yu Zhang,et al.  Image denoising using SVM classification in nonsubsampled contourlet transform domain , 2013, Inf. Sci..

[31]  Yong He,et al.  [Application of wavelet threshold denoising model to infrared spectral signal processing]. , 2009, Guang pu xue yu guang pu fen xi = Guang pu.