Boundary correction for total variation regularized L^1 function with applications to image decomposition and segmentation

The total variation model with L1 norm fidelity term (TV-L1) has been proposed to serve as an effective cartoon-texture image decomposition tool because of its unique scale-dependent decomposition ability. Nevertheless, one of its largely overlooked limitations is its inability to perfectly retain the original contours of the selected patterns when the fidelity term is not sufficiently weighted. In this paper, we propose a boundary correction method to refine the contours of extracted patterns under such circumstances. A scale-driven image segmentation algorithm extended from the boundary correction method is presented as an application. Experimental results demonstrate that our works overcome the drawbacks of existing TV-L1 model and provide an alternative segmentation method

[1]  Wotao Yin,et al.  Background correction for cDNA microarray images using the TV+L1 model , 2005, Bioinform..

[2]  Roberto Manduchi,et al.  Bilateral filtering for gray and color images , 1998, Sixth International Conference on Computer Vision (IEEE Cat. No.98CH36271).

[3]  Jean-François Aujol,et al.  Color image decomposition and restoration , 2006, J. Vis. Commun. Image Represent..

[4]  Jianhong Shen,et al.  Total Variation Denoising and Enhan ement ofColor Images Based on the CB and HSV , 2000 .

[5]  Andrew Zisserman,et al.  OBJ CUT , 2005, 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05).

[6]  Thomas S. Huang,et al.  A New Coarse-to-Fine Framework for 3D Brain MR Image Registration , 2005, CVBIA.

[7]  Dorin Comaniciu,et al.  Mean Shift: A Robust Approach Toward Feature Space Analysis , 2002, IEEE Trans. Pattern Anal. Mach. Intell..

[8]  Dorin Comaniciu,et al.  Illumination normalization for face recognition and uneven background correction using total variation based image models , 2005, 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05).

[9]  Stefano Alliney,et al.  Digital filters as absolute norm regularizers , 1992, IEEE Trans. Signal Process..

[10]  L. Rudin,et al.  Nonlinear total variation based noise removal algorithms , 1992 .

[11]  Brendan J. Frey,et al.  Epitomic analysis of appearance and shape , 2003, Proceedings Ninth IEEE International Conference on Computer Vision.

[12]  Aly A. Farag,et al.  A shape-based segmentation approach: an improved technique using level sets , 2005, Tenth IEEE International Conference on Computer Vision (ICCV'05) Volume 1.

[13]  Mila Nikolova,et al.  Minimizers of Cost-Functions Involving Nonsmooth Data-Fidelity Terms. Application to the Processing of Outliers , 2002, SIAM J. Numer. Anal..

[14]  T. Chan,et al.  Edge-preserving and scale-dependent properties of total variation regularization , 2003 .