A fractional-order regularization with sparsity constraint for blind restoration of images

IF 1.1 4区工程技术 Q3 ENGINEERING, MULTIDISCIPLINARY

Inverse Problems in Science and Engineering Pub Date : 2021-10-25 DOI:10.1080/17415977.2021.1988590

Shaowen Yan, Guoxi Ni, Jingjing Liu

引用次数: 3

Abstract

Blind image deconvolution is one of the most challenging problems in image restoration. Inspired by the work on sparsity constraint and deblurring of blind motion, we propose a model with fractional-order regularization and sparsity constraint for blind restoration and construct split Bregman combining an iterative thresholding algorithm. Fractional-order penalty term in Besov space is expanded by wavelet basis and computed using iterative thresholding algorithm. The regularized terms of blur kernel under tight wavelet frame systems are solved by the split Bregman method. Numerical experiments show that our algorithm can effectively remove different kinds of blur without requiring any prior information of the blur kernels and obtain higher signal-to-noise ratios and lower relative errors. In addition, fractional-order derivative in Besov space can preserve both edges and smoothness better than the integer-order derivative.

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基于稀疏性约束的分数阶正则化图像盲恢复

图像盲反卷积是图像恢复中最具挑战性的问题之一。受盲运动稀疏性约束和去模糊工作的启发，我们提出了一种基于分数阶正则化和稀疏性约束的盲恢复模型，并结合迭代阈值算法构造了分裂Bregman。采用小波基展开Besov空间中的分数阶惩罚项，并采用迭代阈值算法进行计算。采用分裂Bregman方法求解了紧小波框架系统下模糊核的正则化项。数值实验表明，该算法可以在不需要任何模糊核先验信息的情况下有效去除不同类型的模糊，获得较高的信噪比和较小的相对误差。此外，在Besov空间中，分数阶导数比整数阶导数能更好地保持边缘和平滑性。

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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来源期刊

Inverse Problems in Science and Engineering 工程技术-工程：综合

自引率

0.00%

发文量

审稿时长

6 months

期刊介绍： Inverse Problems in Science and Engineering provides an international forum for the discussion of conceptual ideas and methods for the practical solution of applied inverse problems. The Journal aims to address the needs of practising engineers, mathematicians and researchers and to serve as a focal point for the quick communication of ideas. Papers must provide several non-trivial examples of practical applications. Multidisciplinary applied papers are particularly welcome. Topics include: -Shape design: determination of shape, size and location of domains (shape identification or optimization in acoustics, aerodynamics, electromagnets, etc; detection of voids and cracks). -Material properties: determination of physical properties of media. -Boundary values/initial values: identification of the proper boundary conditions and/or initial conditions (tomographic problems involving X-rays, ultrasonics, optics, thermal sources etc; determination of thermal, stress/strain, electromagnetic, fluid flow etc. boundary conditions on inaccessible boundaries; determination of initial chemical composition, etc.). -Forces and sources: determination of the unknown external forces or inputs acting on a domain (structural dynamic modification and reconstruction) and internal concentrated and distributed sources/sinks (sources of heat, noise, electromagnetic radiation, etc.). -Governing equations: inference of analytic forms of partial and/or integral equations governing the variation of measured field quantities.