Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces
Recently total variation (TV) regularization has been proven very successful in image restoration and segmentation. In image restoration, TV based models offer a good edge preservation property. In image segmentation, TV (or vectorial TV) helps to obtain convex formulations of the problems and thus...
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sg-ntu-dr.10356-959952020-05-28T07:17:18Z Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces Tai, Xue Cheng Wu, Chunlin Zhang, Juyong Duan, Yuping School of Computer Engineering DRNTU::Engineering::Computer science and engineering Recently total variation (TV) regularization has been proven very successful in image restoration and segmentation. In image restoration, TV based models offer a good edge preservation property. In image segmentation, TV (or vectorial TV) helps to obtain convex formulations of the problems and thus provides global minimizations. Due to these advantages, TV based models have been extended to image restoration and data segmentation on manifolds. However, TV based restoration and segmentation models are difficult to solve, due to the nonlinearity and non-differentiability of the TV term. Inspired by the success of operator splitting and the augmented Lagrangian method (ALM) in 2D planar image processing, we extend the method to TV and vectorial TV based image restoration and segmentation on triangulated surfaces, which are widely used in computer graphics and computer vision. In particular, we will focus on the following problems. First, several Hilbert spaces will be given to describe TV and vectorial TV based variational models in the discrete setting. Second, we present ALM applied to TV and vectorial TV image restoration on mesh surfaces, leading to efficient algorithms for both gray and color image restoration. Third, we discuss ALM for vectorial TV based multi-region image segmentation, which also works for both gray and color images. The proposed method benefits from fast solvers for sparse linear systems and closed form solutions to subproblems. Experiments on both gray and color images demonstrate the efficiency of our algorithms. 2013-07-15T08:42:25Z 2019-12-06T19:24:07Z 2013-07-15T08:42:25Z 2019-12-06T19:24:07Z 2011 2011 Journal Article Wu, C., Zhang, J., Duan, Y., & Tai, X.-C. (2012). Augmented Lagrangian Method for Total Variation Based Image Restoration and Segmentation Over Triangulated Surfaces. Journal of Scientific Computing, 50(1), 145-166. 1573-7691 https://hdl.handle.net/10356/95995 http://hdl.handle.net/10220/11470 10.1007/s10915-011-9477-3 en Journal of scientific computing © 2011 Springer Science+Business Media, LLC. |
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DRNTU::Engineering::Computer science and engineering Tai, Xue Cheng Wu, Chunlin Zhang, Juyong Duan, Yuping Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
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Recently total variation (TV) regularization has been proven very successful in image restoration and segmentation. In image restoration, TV based models offer a good edge preservation property. In image segmentation, TV (or vectorial TV) helps to obtain convex formulations of the problems and thus provides global minimizations. Due to these advantages, TV based models have been extended to image restoration and data segmentation on manifolds. However, TV based restoration and segmentation models are difficult to solve, due to the nonlinearity and non-differentiability of the TV term. Inspired by the success of operator splitting and the augmented Lagrangian method (ALM) in 2D planar image processing, we extend the method to TV and vectorial TV based image restoration and segmentation on triangulated surfaces, which are widely used in computer graphics and computer vision. In particular, we will focus on the following problems. First, several Hilbert spaces will be given to describe TV and vectorial TV based variational models in the discrete setting. Second, we present ALM applied to TV and vectorial TV image restoration on mesh surfaces, leading to efficient algorithms for both gray and color image restoration. Third, we discuss ALM for vectorial TV based multi-region image segmentation, which also works for both gray and color images. The proposed method benefits from fast solvers for sparse linear systems and closed form solutions to subproblems. Experiments on both gray and color images demonstrate the efficiency of our algorithms. |
| author2 |
School of Computer Engineering |
| author_facet |
School of Computer Engineering Tai, Xue Cheng Wu, Chunlin Zhang, Juyong Duan, Yuping |
| format |
Article |
| author |
Tai, Xue Cheng Wu, Chunlin Zhang, Juyong Duan, Yuping |
| author_sort |
Tai, Xue Cheng |
| title |
Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| title_short |
Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| title_full |
Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| title_fullStr |
Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| title_full_unstemmed |
Augmented Lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| title_sort |
augmented lagrangian method for total variation based image restoration and segmentation over triangulated surfaces |
| publishDate |
2013 |
| url |
https://hdl.handle.net/10356/95995 http://hdl.handle.net/10220/11470 |
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1681058221842759680 |