Total variation with overlapping group sparsity for deblurring images under Cauchy noise
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摘要
The methods based on the total variation are effective for image deblurring and denoising, which can preserve edges and details of images. However, these methods usually produce some staircase effects. In order to alleviate the staircase effects, we propose a new convex model based on the total variation with overlapping group sparsity for recovering blurred images corrupted by Cauchy noise. Moreover, we develop an algorithm under the framework of the alternating direction method with multipliers, and use the majorization minimization to solve subproblems of the proposed algorithm. Numerical results illustrate that the proposed method outperforms other methods both in visual effects and quantitative measures, such as the peak signal-to-noise ratio and the structural similarity index.
论文关键词:Cauchy noise,Overlapping group sparsity,Total variation,Alternating direction method with multipliers,Majorization minimization
论文评审过程:Received 28 December 2017, Revised 6 August 2018, Accepted 13 August 2018, Available online 21 September 2018, Version of Record 21 September 2018.
论文官网地址:https://doi.org/10.1016/j.amc.2018.08.014