Trust your source: quantifying source condition elements for variational regularisation methods

IF 1.4 4区 数学 Q2 MATHEMATICS, APPLIED
Martin Benning, Tatiana A Bubba, Luca Ratti, Danilo Riccio
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引用次数: 0

Abstract

Source conditions are a key tool in regularisation theory that are needed to derive error estimates and convergence rates for ill-posed inverse problems. In this paper, we provide a recipe to practically compute source condition elements as the solution of convex minimisation problems that can be solved with first-order algorithms. We demonstrate the validity of our approach by testing it on two inverse problem case studies in machine learning and image processing: sparse coefficient estimation of a polynomial via LASSO regression and recovering an image from a subset of the coefficients of its discrete Fourier transform. We further demonstrate that the proposed approach can easily be modified to solve the machine learning task of identifying the optimal sampling pattern in the Fourier domain for a given image and variational regularisation method, which has applications in the context of sparsity promoting reconstruction from magnetic resonance imaging data.
相信你的来源:量化变分正则化方法的来源条件要素
源条件是正则化理论中的一个关键工具,需要它来推导误差估计值和错构逆问题的收敛率。在本文中,我们提供了一种计算源条件元素的方法,作为凸最小化问题的解,可以用一阶算法求解。我们通过对机器学习和图像处理中的两个逆问题案例研究进行测试,证明了我们方法的有效性:通过 LASSO 回归对多项式进行稀疏系数估计,以及从离散傅里叶变换的系数子集恢复图像。我们进一步证明,所提出的方法可以很容易地进行修改,以解决为给定图像和变分正则化方法确定傅里叶域最佳采样模式的机器学习任务,这在促进磁共振成像数据稀疏性重建的背景下具有应用价值。
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
CiteScore
2.30
自引率
8.30%
发文量
32
审稿时长
24 months
期刊介绍: The IMA Journal of Applied Mathematics is a direct successor of the Journal of the Institute of Mathematics and its Applications which was started in 1965. It is an interdisciplinary journal that publishes research on mathematics arising in the physical sciences and engineering as well as suitable articles in the life sciences, social sciences, and finance. Submissions should address interesting and challenging mathematical problems arising in applications. A good balance between the development of the application(s) and the analysis is expected. Papers that either use established methods to address solved problems or that present analysis in the absence of applications will not be considered. The journal welcomes submissions in many research areas. Examples are: continuum mechanics materials science and elasticity, including boundary layer theory, combustion, complex flows and soft matter, electrohydrodynamics and magnetohydrodynamics, geophysical flows, granular flows, interfacial and free surface flows, vortex dynamics; elasticity theory; linear and nonlinear wave propagation, nonlinear optics and photonics; inverse problems; applied dynamical systems and nonlinear systems; mathematical physics; stochastic differential equations and stochastic dynamics; network science; industrial applications.
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