Primal-dual first order methods for total variation image restoration in presence of poisson noise

S. Bonettini, A. Benfenati, V. Ruggiero
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引用次数: 13

Abstract

Image restoration often requires the minimization of a convex, possibly nonsmooth functional, given by the sum of a data fidelity measure plus a regularization term. In order to face the lack of smoothness, alternative formulations of the minimization problem could be exploited via the duality principle. Indeed, the primal-dual and the dual formulation have been well explored in the literature when the data suffer from Gaussian noise and, thus, the data fidelity term is quadratic. Unfortunately, the most part of the approaches proposed for the Gaussian are difficult to apply to general data discrepancy terms, such as the Kullback-Leibler divergence. In this work we propose primal-dual methods which apply to the minimization of the sum of general convex functions and whose iteration is easy to compute, regardless of the form of the objective function, since it essentially consists in a subgradient projection step. We provide the convergence analysis and we suggest some strategies to improve the convergence speed by means of a careful selection of the steplength parameters. A numerical experience on Total Variation based denoising and deblurring problems from Poisson data shows the behavior of the proposed method with respect to other state-of-the-art algorithms.
泊松噪声下全变分图像恢复的原始-对偶一阶方法
图像恢复通常需要最小化凸函数,可能是非光滑函数,由数据保真度度量加上正则化项的总和给出。为了解决光滑性不足的问题,可以利用对偶原理开发最小化问题的备选公式。事实上,当数据受到高斯噪声的影响,因此数据保真度项是二次项时,文献中已经很好地探讨了原始对偶和对偶公式。不幸的是,大多数针对高斯分布提出的方法很难应用于一般的数据差异项,比如Kullback-Leibler散度。在这项工作中,我们提出了适用于一般凸函数和的最小化的原始对偶方法,其迭代易于计算,无论目标函数的形式如何,因为它本质上由一个次梯度投影步骤组成。给出了收敛性分析,并通过对步长参数的选择提出了提高收敛速度的策略。基于全变分的泊松数据去噪和去模糊问题的数值经验表明,该方法相对于其他最先进的算法具有良好的性能。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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