In this work, we describe a Bayesian framework for the X-ray computed tomography (CT) problem in an infinite-dimensional setting. We consider reconstructing piecewise smooth fields with discontinuities where the interface between regions is not known. Furthermore, we quantify the uncertainty in the prediction. Directly detecting the discontinuities, instead of reconstructing the entire image, drastically reduces the dimension of the problem. Therefore, the posterior distribution can be approximated with a relatively small number of samples. We show that our method provides an excellent platform for challenging X-ray CT scenarios (e.g. in case of noisy data, limited angle, or sparse angle imaging). We investigate the accuracy and the efficie...
We attack the problem of recovering an image (a function of two variables) from experimentally avail...
Distinguishing signal from noise has always been a major goal in probabilistic analysis of data. Suc...
textabstractDuring the last two decades, sparsity has emerged as a key concept to solve linear and n...
Abstract X-ray tomography has applications in various industrial fields such as sawmill industry, o...
X-ray tomographic image reconstruction consists of determining an object function from its projectio...
We provide a complete framework for performing infinite-dimensional Bayesian inference and uncertain...
We show that statistical methods enable the use of portable industrial scanners (with sparse measure...
A central theme in classical algorithms for the reconstruction of discontinuous functions from obser...
Deformable geometric models fit very naturally into the context of Bayesian analysis. The prior prob...
This paper describes an approach to prior knowledge analysis of component interfaces in data measure...
X-ray images are often used to make inferences about physical phenomena and the entities about which...
2D and 3D X-ray Computed Tomography (CT) is widely used in medical imaging as well as in Non Destruc...
An important component of analyzing images quantitatively is modeling image blur due to effects from...
A Bayesian approach to reconstruction and segmentation of tomographic data is outlined and further ...
An important part of computed tomography is the calculation of a three-dimensional reconstruction of...
We attack the problem of recovering an image (a function of two variables) from experimentally avail...
Distinguishing signal from noise has always been a major goal in probabilistic analysis of data. Suc...
textabstractDuring the last two decades, sparsity has emerged as a key concept to solve linear and n...
Abstract X-ray tomography has applications in various industrial fields such as sawmill industry, o...
X-ray tomographic image reconstruction consists of determining an object function from its projectio...
We provide a complete framework for performing infinite-dimensional Bayesian inference and uncertain...
We show that statistical methods enable the use of portable industrial scanners (with sparse measure...
A central theme in classical algorithms for the reconstruction of discontinuous functions from obser...
Deformable geometric models fit very naturally into the context of Bayesian analysis. The prior prob...
This paper describes an approach to prior knowledge analysis of component interfaces in data measure...
X-ray images are often used to make inferences about physical phenomena and the entities about which...
2D and 3D X-ray Computed Tomography (CT) is widely used in medical imaging as well as in Non Destruc...
An important component of analyzing images quantitatively is modeling image blur due to effects from...
A Bayesian approach to reconstruction and segmentation of tomographic data is outlined and further ...
An important part of computed tomography is the calculation of a three-dimensional reconstruction of...
We attack the problem of recovering an image (a function of two variables) from experimentally avail...
Distinguishing signal from noise has always been a major goal in probabilistic analysis of data. Suc...
textabstractDuring the last two decades, sparsity has emerged as a key concept to solve linear and n...