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23 results on '"van Aarle, Wim"'

1. A Generalized Bidiagonal-Tikhonov Method Applied To Differential Phase Contrast Tomography

Author

Schenkels, Nick, Sijbers, Jan, van Aarle, Wim, and Vanroose, Wim

Subjects
Mathematics - Numerical Analysis
Abstract

Phase contrast tomography is an alternative to classic absorption contrast tomography that leads to higher contrast reconstructions in many applications. We review how phase contrast data can be acquired by using a combination of phase and absorption gratings. Using algebraic reconstruction techniques the object can be reconstructed from the measured data. In order to solve the resulting linear system we propose the Generalized Bidiagonal Tikhonov (GBiT) method, an adaptation of the generalized Arnoldi-Tikhonov method that uses the bidiagonal decomposition of the matrix instead of the Arnoldi decomposition. We also study the effect of the finite difference operator in the model by examining the reconstructions with either a forward difference or a central difference approximation. We validate our conclusions with simulated and experimental data.

Published
2015

2. A multi-level preconditioned Krylov method for the efficient solution of algebraic tomographic reconstruction problems

Author

Cools, Siegfried, Ghysels, Pieter, van Aarle, Wim, Sijbers, Jan, and Vanroose, Wim

Subjects
Tomography, Algebraic reconstruction, Krylov methods, Preconditioning, Multigrid, Wavelets, math.NA, Applied Mathematics, Numerical and Computational Mathematics, Electrical and Electronic Engineering, Numerical & Computational Mathematics
Abstract

Classical iterative methods for tomographic reconstruction include the class of Algebraic Reconstruction Techniques (ART). Convergence of these stationary linear iterative methods is however notably slow. In this paper we propose the use of Krylov solvers for tomographic linear inversion problems. These advanced iterative methods feature fast convergence at the expense of a higher computational cost per iteration, causing them to be generally uncompetitive without the inclusion of a suitable preconditioner. Combining elements from standard multigrid (MG) solvers and the theory of wavelets, a novel wavelet-based multi-level (WMG) preconditioner is introduced, which is shown to significantly speed-up Krylov convergence. The performance of the WMG-preconditioned Krylov method is analyzed through a spectral analysis, and the approach is compared to existing methods like the classical Simultaneous Iterative Reconstruction Technique (SIRT) and unpreconditioned Krylov methods on a 2D tomographic benchmark problem. Numerical experiments are promising, showing the method to be competitive with the classical Algebraic Reconstruction Techniques in terms of convergence speed and overall performance (CPU time) as well as precision of the reconstruction.

Published
2015

3. A multi-level preconditioned Krylov method for the efficient solution of algebraic tomographic reconstruction problems

Author

Cools, Siegfried, Ghysels, Pieter, van Aarle, Wim, Sijbers, J., and Vanroose, Wim

Subjects
Mathematics - Numerical Analysis
Abstract

Classical iterative methods for tomographic reconstruction include the class of Algebraic Reconstruction Techniques (ART). Convergence of these stationary linear iterative methods is however notably slow. In this paper we propose the use of Krylov solvers for tomographic linear inversion problems. These advanced iterative methods feature fast convergence at the expense of a higher computational cost per iteration, causing them to be generally uncompetitive without the inclusion of a suitable preconditioner. Combining elements from standard multigrid (MG) solvers and the theory of wavelets, a novel wavelet-based multi-level (WMG) preconditioner is introduced, which is shown to significantly speed-up Krylov convergence. The performance of the WMG-preconditioned Krylov method is analyzed through a spectral analysis, and the approach is compared to existing methods like the classical Simultaneous Iterative Reconstruction Technique (SIRT) and unpreconditioned Krylov methods on a 2D tomographic benchmark problem. Numerical experiments are promising, showing the method to be competitive with the classical Algebraic Reconstruction Techniques in terms of convergence speed and overall performance (CPU time) as well as precision of the reconstruction., Comment: Journal of Computational and Applied Mathematics (2014), 26 pages, 13 figures, 3 tables

Published
2013

9. Fast and flexible X-ray tomography using the ASTRA toolbox

Author

van Aarle, Wim, primary, Palenstijn, Willem Jan, additional, Cant, Jeroen, additional, Janssens, Eline, additional, Bleichrodt, Folkert, additional, Dabravolski, Andrei, additional, De Beenhouwer, Jan, additional, Joost Batenburg, K., additional, and Sijbers, Jan, additional

Published
2016
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10. Memory access optimization for iterative tomography on many-core architectures

Author

van Aarle, Wim, Ghysels, Pieter, Sijbers, Jan, and Vanroose, Wim

Subjects
Physics
Abstract

Iterative tomographic reconstruction methods, de- spite their virtues, are known to be slow compared to analytic reconstruction methods, mainly because of the computationally very intensive forward and backward projection operations. By relying on many-core architectures with large vector registers, modern high performance computing (HPC) systems can offer relief. However, to optimally benefit from such systems, the peak performance of the algorithms should not be bound by the memory bandwidth. In this work, a strategy is proposed that improves the performance of the tomographic forward projection by optimizing its memory accesses. Data locality is exploited to hide data access latency and knowledge of the cache architecture is used to optimally distribute the projection operation over many computing cores. Experiments performed on the recently introduced Intel R Xeon Phi TM architecture confirm a substantial boost in projection performance.

Published
2013

11. Discrete tomography in an in vivo small animal bone study.

Author

Van de Casteele, Elke, Perilli, Egon, Van Aarle, Wim, Reynolds, Karen J., and Sijbers, Jan

Subjects
DISCRETE tomography, BONE morphogenetic proteins, ATTENUATION coefficients, IMAGE reconstruction, RADIATION doses, ANIMAL experimentation, BONES, COMPUTED tomography, OVARIECTOMY, RATS, RESEARCH funding, THREE-dimensional imaging
Abstract

This study aimed at assessing the feasibility of a discrete algebraic reconstruction technique (DART) to be used in in vivo small animal bone studies. The advantage of discrete tomography is the possibility to reduce the amount of X-ray projection images, which makes scans faster and implies also a significant reduction of radiation dose, without compromising the reconstruction results. Bone studies are ideal for being performed with discrete tomography, due to the relatively small number of attenuation coefficients contained in the image [namely three: background (air), soft tissue and bone]. In this paper, a validation is made by comparing trabecular bone morphometric parameters calculated from images obtained by using DART and the commonly used standard filtered back-projection (FBP). Female rats were divided into an ovariectomized (OVX) and a sham-operated group. In vivo micro-CT scanning of the tibia was done at baseline and at 2, 4, 8 and 12 weeks after surgery. The cross-section images were reconstructed using first the full set of projection images and afterwards reducing them in number to a quarter and one-sixth (248, 62, 42 projection images, respectively). For both reconstruction methods, similar changes in morphometric parameters were observed over time: bone loss for OVX and bone growth for sham-operated rats, although for DART the actual values were systematically higher (bone volume fraction) or lower (structure model index) compared to FBP, depending on the morphometric parameter. The DART algorithm was, however, more robust when using fewer projection images, where the standard FBP reconstruction was more prone to noise, showing a significantly bigger deviation from the morphometric parameters obtained using all projection images. This study supports the use of DART as a potential alternative method to FBP in X-ray micro-CT animal studies, in particular, when the number of projections has to be drastically minimized, which directly reduces scanning time and dose. [ABSTRACT FROM AUTHOR]

Published
2018
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17. Threshold selection for segmentation of dense objects in tomograms

Author

van Aarle, Wim, Batenburg, Joost, and Sijbers, Jan

Subjects
Computer. Automation, Physics
Abstract

Tomographic reconstructions are often segmented to extract valuable quantitative information. In this paper, we consider the problem of segmenting a dense object of constant density within a continuous tomogram, by means of global hresholding. Selecting the proper threshold is a nontrivial problem, for which hardly any automatic procedures exists. We propose a new method that exploits the available projection data to accurately determine the optimal global threshold. Results from simulation experiments show that our algorithm is capable of finding a threshold that is close to the optimal threshold value.

Published
2008

22. Discrete algebraic reconstruction technique: a new approach for superresolution reconstruction of license plates.

Author

Karim Zarei Zefreh, van Aarle, Wim, Batenburg, K. Joost, and Sijbers, Jan

Subjects
*AUTOMOBILE license plates, *SURVEILLANCE detection, *TOMOGRAPHY, *IMAGE reconstruction, *HIGH resolution imaging, *PIXELS
Abstract

A new superresolution algorithmis proposed to reconstruct a high-resolution license plate image from a set of low-resolution camera images. The reconstruction methodology is based on the discrete algebraic reconstruction technique (DART), a recently developed reconstruction method. While DART has already been successfully applied in tomographic imaging, it has not yet been transferred to the field of camera imaging. DART is introduced for camera imaging through a demonstration of how prior knowledge of the colors of the license plate can be directly exploited during the reconstruction of a high-resolution image from a set of low-resolution images. Simulation experiments show that DART can reconstruct images with superior quality compared to conventional reconstruction methods. [ABSTRACT FROM AUTHOR]

Published
2013
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23. Automatic Parameter Estimation for the Discrete Algebraic Reconstruction Technique (DART).

Author

van Aarle, Wim, Batenburg, Kees Joost, and Sijbers, Jan

Subjects
*PARAMETER estimation, *IMAGE reconstruction, *DISCRETE systems, *AUTOMATIC control systems, *METRIC projections, *IMAGE segmentation
Abstract

Computed tomography (CT) is a technique for noninvasive imaging of physical objects. In the discrete algebraic reconstruction technique (DART), prior knowledge about the material's densities is exploited to obtain high quality reconstructed images from a limited number of its projections. In practice, this prior knowledge is typically not readily available. Here, a fully automatic method, called projection distance minimization DART (PDM-DART), is proposed in which the optimal grey level parameters are adaptively estimated during the reconstruction process. To apply PDM-DART, only the number of different grey levels should be known in advance. Simulation as well as real \muCT experiments show that PDM-DART is capable of computing reconstructed images of which the quality is similar to reconstructions computed by conventional DART based on exact prior knowledge, thereby eliminating the need for tedious and error-prone user interaction. [ABSTRACT FROM AUTHOR]

Published
2012
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