An optimal regularization method for convolution equations on the sourcewise represented set

Ye Zhang; Dmitry V. Lukyanenko; Anatoly G. Yagola

doi:10.1515/jiip-2014-0047

An optimal regularization method for convolution equations on the sourcewise represented set

Ye Zhang, Dmitry V. Lukyanenko, Anatoly G. Yagola

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12 引用（Scopus）

摘要

In this article, we consider an inverse problem for the integral equation of the convolution type in a multidimensional case. This problem is severely ill-posed. To deal with this problem, using a priori information (sourcewise representation) based on optimal recovery theory we propose a new method. The regularization and optimization properties of this method are proved. An optimal minimal a priori error of the problem is found. Moreover, a so-called optimal regularized approximate solution and its corresponding error estimation are considered. Efficiency and applicability of this method are demonstrated in a numerical example of the image deblurring problem with noisy data.

源语言	英语
页（从-至）	465-475
页数	11
期刊	Journal of Inverse and Ill-Posed Problems
卷	23
期	5
DOI	https://doi.org/10.1515/jiip-2014-0047
出版状态	已出版 - 1 10月 2015
已对外发布	是

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Zhang, Y., Lukyanenko, D. V., & Yagola, A. G. (2015). An optimal regularization method for convolution equations on the sourcewise represented set. Journal of Inverse and Ill-Posed Problems, 23(5), 465-475. https://doi.org/10.1515/jiip-2014-0047

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AU - Yagola, Anatoly G.

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N2 - In this article, we consider an inverse problem for the integral equation of the convolution type in a multidimensional case. This problem is severely ill-posed. To deal with this problem, using a priori information (sourcewise representation) based on optimal recovery theory we propose a new method. The regularization and optimization properties of this method are proved. An optimal minimal a priori error of the problem is found. Moreover, a so-called optimal regularized approximate solution and its corresponding error estimation are considered. Efficiency and applicability of this method are demonstrated in a numerical example of the image deblurring problem with noisy data.

AB - In this article, we consider an inverse problem for the integral equation of the convolution type in a multidimensional case. This problem is severely ill-posed. To deal with this problem, using a priori information (sourcewise representation) based on optimal recovery theory we propose a new method. The regularization and optimization properties of this method are proved. An optimal minimal a priori error of the problem is found. Moreover, a so-called optimal regularized approximate solution and its corresponding error estimation are considered. Efficiency and applicability of this method are demonstrated in a numerical example of the image deblurring problem with noisy data.

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KW - Inverse problem

KW - convolution

KW - error estimation

KW - optimal recovery

KW - regularization method

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JO - Journal of Inverse and Ill-Posed Problems

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An optimal regularization method for convolution equations on the sourcewise represented set

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