Bayesian neural network priors for edge-preserving inversion

IF 1.2 4区 数学 Q2 MATHEMATICS, APPLIED Inverse Problems and Imaging Pub Date : 2022-01-01 DOI:10.3934/ipi.2022022
Chen Li,Matthew Dunlop,Georg Stadler
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Abstract

<p style='text-indent:20px;'>We consider Bayesian inverse problems wherein the unknown state is assumed to be a function with discontinuous structure a priori. A class of prior distributions based on the output of neural networks with heavy-tailed weights is introduced, motivated by existing results concerning the infinite-width limit of such networks. We show theoretically that samples from such priors have desirable discontinuous-like properties even when the network width is finite, making them appropriate for edge-preserving inversion. Numerically we consider deconvolution problems defined on one- and two-dimensional spatial domains to illustrate the effectiveness of these priors; MAP estimation, dimension-robust MCMC sampling and ensemble-based approximations are utilized to probe the posterior distribution. The accuracy of point estimates is shown to exceed those obtained from non-heavy tailed priors, and uncertainty estimates are shown to provide more useful qualitative information.</p>
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边缘保持反演的贝叶斯神经网络先验算法
<p style='text-indent:20px;'>我们考虑贝叶斯逆问题,其中未知状态被假定为具有先验不连续结构的函数。基于已有的关于重尾权神经网络的无限宽极限的研究结果,引入了一类基于重尾权神经网络输出的先验分布。我们从理论上证明,即使当网络宽度有限时,这种先验的样本也具有理想的不连续性质,使它们适合于保持边缘的反演。在数值上,我们考虑在一维和二维空间域中定义的反卷积问题,以说明这些先验算法的有效性;利用MAP估计、维鲁棒MCMC抽样和基于集合的近似来探测后验分布。结果表明,点估计的准确性优于非重尾先验估计,不确定性估计提供了更有用的定性信息。
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来源期刊
Inverse Problems and Imaging
Inverse Problems and Imaging 数学-物理:数学物理
CiteScore
2.50
自引率
0.00%
发文量
55
审稿时长
>12 weeks
期刊介绍: Inverse Problems and Imaging publishes research articles of the highest quality that employ innovative mathematical and modeling techniques to study inverse and imaging problems arising in engineering and other sciences. Every published paper has a strong mathematical orientation employing methods from such areas as control theory, discrete mathematics, differential geometry, harmonic analysis, functional analysis, integral geometry, mathematical physics, numerical analysis, optimization, partial differential equations, and stochastic and statistical methods. The field of applications includes medical and other imaging, nondestructive testing, geophysical prospection and remote sensing as well as image analysis and image processing. This journal is committed to recording important new results in its field and will maintain the highest standards of innovation and quality. To be published in this journal, a paper must be correct, novel, nontrivial and of interest to a substantial number of researchers and readers.
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