978-3-031-25820-6.pdf

978-3-031-25820-6.pdf

Large sparse linear systems of equations are ubiquitous in science, engineering and beyond. This open access monograph focuses on factorization algorithms for solving such systems. It presents classical techniques for complete factorizations that are used in sparse direct methods and discusses the c...

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Γλώσσα:English
Έκδοση: Springer Nature 2023
Διαθέσιμο Online:https://link.springer.com/978-3-031-25820-6
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spelling oapen-20.500.12657-629872024-03-28T08:18:50Z Algorithms for Sparse Linear Systems Scott, Jennifer Tůma, Miroslav Sparse Matrices Algebraic Preconditioners Sparse Direct Methods Incomplete Factorizations Approximate Inverses thema EDItEUR::P Mathematics and Science::PB Mathematics::PBK Calculus and mathematical analysis::PBKS Numerical analysis thema EDItEUR::P Mathematics and Science::PB Mathematics::PBF Algebra thema EDItEUR::P Mathematics and Science::PD Science: general issues::PDE Maths for scientists Large sparse linear systems of equations are ubiquitous in science, engineering and beyond. This open access monograph focuses on factorization algorithms for solving such systems. It presents classical techniques for complete factorizations that are used in sparse direct methods and discusses the computation of approximate direct and inverse factorizations that are key to constructing general-purpose algebraic preconditioners for iterative solvers. A unified framework is used that emphasizes the underlying sparsity structures and highlights the importance of understanding sparse direct methods when developing algebraic preconditioners. Theoretical results are complemented by sparse matrix algorithm outlines. This monograph is aimed at students of applied mathematics and scientific computing, as well as computational scientists and software developers who are interested in understanding the theory and algorithms needed to tackle sparse systems. It is assumed that the reader has completed a basic course in linear algebra and numerical mathematics. 2023-05-16T15:06:16Z 2023-05-16T15:06:16Z 2023 book ONIX_20230516_9783031258206_22 9783031258206 9783031258190 https://library.oapen.org/handle/20.500.12657/62987 eng Nečas Center Series application/pdf n/a 978-3-031-25820-6.pdf https://link.springer.com/978-3-031-25820-6 Springer Nature Birkhäuser 10.1007/978-3-031-25820-6 10.1007/978-3-031-25820-6 6c6992af-b843-4f46-859c-f6e9998e40d5 fb471c48-61d1-40b5-a8d7-7abd9278f351 9783031258206 9783031258190 Birkhäuser 242 Cham [...] University of Reading UoR open access
institution OAPEN
collection DSpace
language English
description Large sparse linear systems of equations are ubiquitous in science, engineering and beyond. This open access monograph focuses on factorization algorithms for solving such systems. It presents classical techniques for complete factorizations that are used in sparse direct methods and discusses the computation of approximate direct and inverse factorizations that are key to constructing general-purpose algebraic preconditioners for iterative solvers. A unified framework is used that emphasizes the underlying sparsity structures and highlights the importance of understanding sparse direct methods when developing algebraic preconditioners. Theoretical results are complemented by sparse matrix algorithm outlines. This monograph is aimed at students of applied mathematics and scientific computing, as well as computational scientists and software developers who are interested in understanding the theory and algorithms needed to tackle sparse systems. It is assumed that the reader has completed a basic course in linear algebra and numerical mathematics.
title 978-3-031-25820-6.pdf
spellingShingle 978-3-031-25820-6.pdf
title_short 978-3-031-25820-6.pdf
title_full 978-3-031-25820-6.pdf
title_fullStr 978-3-031-25820-6.pdf
title_full_unstemmed 978-3-031-25820-6.pdf
title_sort 978-3-031-25820-6.pdf
publisher Springer Nature
publishDate 2023
url https://link.springer.com/978-3-031-25820-6
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