CONVERGENCE OF NEWTON＇S METHOD FOR A MINIMIZATION PROBLEM IN IMPULSE NOISE REMOVAL 被引量：8

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摘要 Recently, two-phase schemes for removing salt-and-pepper and random-valued impulse noise are proposed in [6, 7]. The first phase uses decision-based median filters to locate those pixels which are likely to be corrupted by noise (noise candidates). In the second phase, these noise candidates are restored using a detail-preserving regularization method which allows edges and noise-free pixels to be preserved. As shown in [18], this phase is equivalent to solving a one-dimensional nonlinear equation for each noise candidate.One can solve these equations by using Newton's method. However, because of the edgepreserving term, the domain of convergence of Newton's method will be very narrow. In this paper, we determine the initial guesses for these equations such that Newton's method will always converge.

作者 RaymondH.Chan Chung-waHo MilaNikolova

机构地区 DepartmentofMathematics CentredeMathématiquesetdeLeursApplications(CMLA-CNRSUMR

出处《Journal of Computational Mathematics》 SCIE CSCD 2004年第2期168-177,共10页 计算数学（英文）

分类号 O42 [理学—声学]

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1G. R. Arce and R. E. Foster, Detail-preserving ranked-order based filters for image processing,IEEE Transactions on Acoustics, Speech, and Signal Processing, 37 (1989), 83-98.
2J. Astola and P. Kuosmanen, Fundamentals of Nonlinear Digital Filtering. Boca Raton, CRC,1997.
3M. Black and A. Rangarajan, On the unification of line processes, outlier rejection, and robust statistics with applications to early vision, International Journal of Computer Vision, 19 (1996),57-91.
4C. Bouman and K. Sauer, A generalized Gaussian image model for edge-preserving MAP estimation, IEEE Transactions on Image Processing, 2 (1993), 296-310.
5C. Bouman and K. Sauer, On discontinuity-adaptive smoothness priors in computer vision, IEEE Transactions on Pattern Analysis and Machine Intelligence, 17 (1995), 576-586.
6R. H. Chan, C.-W. Ho, and M. Nikolova, Impulse noise removal by median-type noise detectors and edge-preserving regularization, Report, Department of Mathematics, The Chinese University of Hong Kong, 2003-28 (302).
7R. H. Chan, C. Hu, and M. Nikolova, An iterative procedure for removing random-valued impulse noise, Report, Department of Mathematics, The Chinese University of Hong Kong, 2003-33 (307).
8P. Charbonnier, L. Blanc-F6raud, G. Aubert, and M. Barlaud, Deterministic edge-preserving regularization in computed imaging, IEEE Transactions on Imaqe Processina, 6 (1997), 298-311.
9T. Chen and H. R. Wu, Space variant median filters for the restoration of impulse noise corrupted images, IEEE Transactions on Circuits and Systems Ⅱ, 48 (2001), 784-789.
10P. J. Green, Bayesian reconstructions from emission tomography data using a modified EM algorithm, IEEE Transactions on Medical Imaging, MI-9 (1990), 84-93.

同被引文献68

1郭晓新,卢奕南,许志闻,王云霄,庞云阶.自适应定向加权中值滤波[J].吉林大学学报（理学版）,2005,43(4):494-498. 被引量：11
2王明佳,张旭光,韩广良,王延杰.自适应权值滤波消除图像椒盐噪声的方法[J].光学精密工程,2007,15(5):779-783. 被引量：23
3Bertero M, Mol C De and Pike E R. Linear inverse problems with discrete datat I: General formulation and singular system analysis[J]. Inverse Problem, 1985,1 (4) : 301 - 330.
4Bertero M, Poggio T and Torre V. III posed problems in early vision[J]. Proc. IEEE, 1988,76(8) :869 - 889.
5Lange K. Convergence of EM image reconstruction algorithms with Gibbs smoothness [ J ]. IEEE Transactions on Medical Imaging, 1990,9(4) :439 - 446.
6Geman S and G-eman D. Stochastic relaxation, Gibbs distribution,and the Bayesian restoration of images[ J]. IEEE. Transactions on Pattern Analysis and Machine Intelligence, 1984, 6 (6) :721 - 741.
7Stan Z Li. Markov Random Field Modeling in Image Analysis [ M ]. Springer-Verlag , Tokyo, 2001.
8Buades A, CoU B and Morel J M. A nonlocal algorithm for image denoising[ J]. IEEE Computer Society Conference on Computer Vision and Pattem Regcognition, 2005,2: 60 - 65.
9Buades A, Coil B and Morel J M. A review of image denoising algorithms, with a new one[J]. Multiscale Modeling and Simulation (SIAM interdisciplinary journal) ,2005,4(2) :490- 530.
10Gilboa G and Osher S. Nonlocal linear image regularization and supervised segmentation[ OL]. ftp://ftp, math. ucla. edu/pub/ camrepolX/cam06- 47. pdf, UCLA CAM Report,2006:47.

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2董艺秋,徐树方.一个高效的椒盐噪声去除方法(英文)[J].北京大学学报（自然科学版）,2006,42(5):604-612. 被引量：6
3张垒,白仲瑞,王超,叶中付.基于一种图像恢复技术的光谱CCD图像宇宙线剔除算法(英文)[J].中国科学技术大学学报,2007,37(6):688-694. 被引量：2
4王超,叶中付.基于自适应中值滤波器和TV修复的椒盐噪声去除(英文)[J].中国科学技术大学学报,2008,38(3):282-287. 被引量：3
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6黄静,马建华,路利军,毕一鸣,陈武凡.基于广义Gibbs先验的优质PET成像[J].电子学报,2010,38(4):899-903. 被引量：1
7孙海英,李锋,商慧亮.改进的变分自适应中值滤波算法[J].电子与信息学报,2011,33(7):1743-1747. 被引量：24
8王敏,赵金宇,陈涛,崔博川,高扬.基于能量函数的极值中值滤波星图去噪算法[J].电子与信息学报,2017,39(6):1387-1393. 被引量：8

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2雷超阳,刘军华,张敏.一种基于自适应的新型中值滤波算法[J].计算机工程与应用,2008,44(12):60-62. 被引量：14
3雷超阳,廖海洲,周训斌.采用一种新的滤波方法去除图像噪声[J].微电子学与计算机,2009,26(1):162-165. 被引量：4
4彭良玉,杨辉,黄满池.一种新的基于脉冲噪声点检测的自适应中值滤波算法[J].兰州理工大学学报,2009,35(1):77-80. 被引量：9
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6周优军,潘建方,曹亮.基于同值压缩的自适应中值滤波[J].广西科学,2009,16(2):167-169.
7苏锋,朱旻芸,杨秋菊.基于自适应开关插值算法的图像椒盐噪声滤波[J].计算机应用研究,2011,28(2):769-771. 被引量：5
8刘新,葛洪伟,徐冰纯.基于相似性噪声检测的边缘保护滤波算法[J].计算机应用,2012,32(3):739-741. 被引量：1
9郑裕民,高娜,刘梁.基于GPU超级计算系统的天文科学应用[J].科研信息化技术与应用,2011,2(6):144-152. 被引量：2
10沈德海,刘大成,邢涛.一种纵横窗口关联的多级中值滤波算法[J].计算机科学,2012,39(5):246-248. 被引量：7

1He Lei Pan Zhen-kuan.Multiplicative Noise Removal using Gradient and Laplacian[J].科技信息,2009(24).
2严树森,张正杰.A MINIMIZATION PROBLEM ON R^N WITH NONZERO DATA[J].Acta Mathematica Scientia,1995,15(S1):16-31.
3JIN Zheng-meng LI Zhi-xin.A Fast Total Variation Algorithm for Multiplicative Noise Removal[J].南京邮电大学学报（自然科学版）,2011,31(5):124-128.
4蒋慧琴.Application　of　the　Regularization　Method　to　the　Numberical　Inversion　of　a　Class　of　Generalized　Radon　Transform[J].Chinese Quarterly Journal of Mathematics,1995,10(3):52-58.
5王国灿.ASYMPTOTIC ESTIMatION OF ROBIN BOUNDARY VALUE PROBLEM FOR THIRD NONLINEAR EQUATION[J].Annals of Differential Equations,1997,13(1):23-30. 被引量：1
6H.G.Abdelwahed,E.K.ElShewy,A.A.Mahmoud.On Time-Fractional Cylindrical Nonlinear Equation[J].Chinese Physics Letters,2016,33(11):62-66.
7林詒勋,原晋江.PROFILE MINIMIZATION PROBLEM FOR MATRICES AND GRAPHS[J].Acta Mathematicae Applicatae Sinica,1994,10(1):107-112. 被引量：4
8An Elementary Method on a Minimization Problem[J].数学理论与应用,2000,20(4):83-84.
9周性伟,闫宁.Recurrent sequences in median filters (II)[J].Chinese Science Bulletin,1996,41(16):1332-1334.
10周性伟,王翠香.Recurrent sequences in median filters (Ⅰ)[J].Chinese Science Bulletin,1995,40(3):185-189.

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CONVERGENCE OF NEWTON＇S METHOD FOR A MINIMIZATION PROBLEM IN IMPULSE NOISE REMOVAL 被引量：8

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