Bayesian inference with hierarchical prior models for inverse problems in imaging systems

2013 8th International Workshop on Systems, Signal Processing and their Applications (WoSSPA) Pub Date : 2013-05-12 DOI:10.1109/WOSSPA.2013.6602329

A. Mohammad-Djafari

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引用次数: 4

Abstract

Bayesian approach is nowadays commonly used for inverse problems. Simple prior laws (Gaussian, Generalized Gaussian, Gauss-Markov and more general Markovian priors) are common in modeling and in their use in Bayesian inference methods. But, we need still more appropriate prior models which can account for non station-narities in signals and for the presence of the contours and homogeneous regions in images. Recently, we proposed a family of hierarchical prior models, called Gauss-Markov-Potts, which seems to be more appropriate for many applications in Imaging systems such as X ray Computed Tomography (CT) or Microwave imaging in Non Destructive Testing (NDT). In this tutorial paper, first some backgrounds on the Bayesian inference and the tools for assignment of priors and doing efficiently the Bayesian computation is presented. Then, more specifically hiearachical models and particularly the Gauss-Markov-Potts family of prior models are presented. Finally, their real applications in image restoration, in different practical Computed Tomography (CT) or other imaging systems are presented.

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成像系统反问题的层次先验贝叶斯推理

贝叶斯方法是目前常用的求解反问题的方法。简单先验定律(高斯，广义高斯，高斯-马尔可夫和更一般的马尔可夫先验)在建模和贝叶斯推理方法中很常见。但是，我们仍然需要更合适的先验模型来解释信号中的非平稳性以及图像中轮廓和均匀区域的存在。最近，我们提出了一种称为高斯-马尔可夫-波茨的分层先验模型，它似乎更适合于成像系统中的许多应用，例如X射线计算机断层扫描(CT)或无损检测(NDT)中的微波成像。在本教程中，首先介绍了贝叶斯推理的一些背景，以及分配先验和有效地进行贝叶斯计算的工具。然后，给出了更具体的层次模型，特别是先验模型的高斯-马尔可夫-波茨族。最后，介绍了它们在图像恢复、不同的实际计算机断层扫描(CT)或其他成像系统中的实际应用。

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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2013 8th International Workshop on Systems, Signal Processing and their Applications (WoSSPA)

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