Bayesian imaging inverse problem with SA-Roundtrip prior via HMC-pCN sampler

IF 1.5 3区数学 Q3 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS

Computational Statistics & Data Analysis Pub Date : 2024-04-10 DOI:10.1016/j.csda.2024.107930

Jiayu Qian , Yuanyuan Liu , Jingya Yang , Qingping Zhou

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Abstract

Bayesian inference with deep generative prior has received considerable interest for solving imaging inverse problems in many scientific and engineering fields. The selection of the prior distribution is learned from, and therefore an important representation learning of, available prior measurements. The SA-Roundtrip, a novel deep generative prior, is introduced to enable controlled sampling generation and identify the data's intrinsic dimension. This prior incorporates a self-attention structure within a bidirectional generative adversarial network. Subsequently, Bayesian inference is applied to the posterior distribution in the low-dimensional latent space using the Hamiltonian Monte Carlo with preconditioned Crank-Nicolson (HMC-pCN) algorithm, which is proven to be ergodic under specific conditions. Experiments conducted on computed tomography (CT) reconstruction with the MNIST and TomoPhantom datasets reveal that the proposed method outperforms state-of-the-art comparisons, consistently yielding a robust and superior point estimator along with precise uncertainty quantification.

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通过 HMC-pCN 采样器解决具有 SA-Roundtrip 先验的贝叶斯成像反演问题

在解决许多科学和工程领域的成像反演问题时，使用深度生成先验的贝叶斯推理受到了广泛关注。先验分布的选择是从可用的先验测量中学习的，因此也是先验测量的重要表征学习。SA-Roundtrip 是一种新颖的深度生成先验，用于控制采样生成和识别数据的内在维度。该先验在双向生成对抗网络中加入了自注意结构。随后，使用汉密尔顿蒙特卡洛预处理 Crank-Nicolson 算法（HMC-pCN）对低维潜空间中的后验分布进行贝叶斯推理。利用 MNIST 和 TomoPhantom 数据集对计算机断层扫描（CT）重建进行的实验表明，所提出的方法优于最先进的比较方法，能持续产生稳健、卓越的点估算器以及精确的不确定性量化。

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

Computational Statistics & Data Analysis 数学-计算机：跨学科应用

CiteScore

3.70

自引率

5.60%

发文量

167

审稿时长

60 days

期刊介绍： Computational Statistics and Data Analysis (CSDA), an Official Publication of the network Computational and Methodological Statistics (CMStatistics) and of the International Association for Statistical Computing (IASC), is an international journal dedicated to the dissemination of methodological research and applications in the areas of computational statistics and data analysis. The journal consists of four refereed sections which are divided into the following subject areas: I) Computational Statistics - Manuscripts dealing with: 1) the explicit impact of computers on statistical methodology (e.g., Bayesian computing, bioinformatics,computer graphics, computer intensive inferential methods, data exploration, data mining, expert systems, heuristics, knowledge based systems, machine learning, neural networks, numerical and optimization methods, parallel computing, statistical databases, statistical systems), and 2) the development, evaluation and validation of statistical software and algorithms. Software and algorithms can be submitted with manuscripts and will be stored together with the online article. II) Statistical Methodology for Data Analysis - Manuscripts dealing with novel and original data analytical strategies and methodologies applied in biostatistics (design and analytic methods for clinical trials, epidemiological studies, statistical genetics, or genetic/environmental interactions), chemometrics, classification, data exploration, density estimation, design of experiments, environmetrics, education, image analysis, marketing, model free data exploration, pattern recognition, psychometrics, statistical physics, image processing, robust procedures. [...] III) Special Applications - [...] IV) Annals of Statistical Data Science [...]