2014
DOI: 10.1137/130920642
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Multicore Performance of Block Algebraic Iterative Reconstruction Methods

Abstract: Abstract. Algebraic iterative methods are routinely used for solving the ill-posed sparse linear systems arising in tomographic image reconstruction. Here we consider the Algebraic Reconstruction Techniques (ART) and the Simultaneous Iterative Reconstruction Techniques (SIRT), both of which rely on semi-convergence. Block versions of these methods, based on a partitioning of the linear system, are able to combine the fast semi-convergence of ART with the better multi-core properties of SIRT. These block method… Show more

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Cited by 27 publications
(15 citation statements)
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“…All the iterative methods can include constraints that can be formulated as a projection on a convex set; we provide box constraints which include, as a special case, nonnegativity constraints. Our package does not include implementations of any block versions [39] of the above methods; such methods are highly suitable for large-scale problems but MATLAB is not the right platform for such software.…”
Section: Introductionmentioning
confidence: 99%
“…All the iterative methods can include constraints that can be formulated as a projection on a convex set; we provide box constraints which include, as a special case, nonnegativity constraints. Our package does not include implementations of any block versions [39] of the above methods; such methods are highly suitable for large-scale problems but MATLAB is not the right platform for such software.…”
Section: Introductionmentioning
confidence: 99%
“…In a practical sense this amounts to ordering the projection data so that the achieved by a randomised ordering scheme [21]. …”
mentioning
confidence: 99%
“…A proper directed graph depends to the problem (application), how to implement the algorithm and what are the objects of running the algorithm (reducing time, getting a regularized solution, controlling semi‐convergence, ⋯) and so on. However, the paper deals with some special combination of operators. They tested those combinations in single and parallel processors and suggest using sequential block algorithms among full simultaneous, full sequential and simultaneous block algorithms (simple kind of string‐averaging methods).…”
Section: Patternmentioning
confidence: 99%