Verfügbarkeit: Domain decomposition methods for the numerical solution of partial differential equations

Domain decomposition methods for the numerical solution of partial differential equations:

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Bibliographische Detailangaben
1. Verfasser:	Mathew, Tarek P. A. (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin [u.a.] Springer 2008
Schriftenreihe:	Lecture notes in computational science and engineering 61
Schlagworte:	Decomposition method Differential equations, Partial > Numerical solutions Partielle Differentialgleichung Gebietszerlegungsmethode
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Literaturverz. S. 711 - 760
Beschreibung:	XIII, 764 S.
ISBN:	9783540772057

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adam_text	Contents 1 Decomposition Frameworks................................ 1 1.1 Hybrid Formulations..................................... 2 1.2 Schwarz Framework...................................... 9 1.3 Steklov-Poincaré Framework.............................. 16 1.4 Lagrange Multiplier Framework........................... 27 1.5 Least Squares-Control Framework......................... 36 2 Schwarz Iterative Algorithms .............................. 47 2.1 Background ............................................. 48 2.2 Projection Formulation of Schwarz Algorithms .............. 56 2.3 Matrix Form of Schwarz Subspace Algorithms .............. 66 2.4 Implementational Issues .................................. 72 2.5 Theoretical Results ...................................... 77 3 Schur Complement and Iterative Substructuring Algorithms ................................107 3.1 Background .............................................108 3.2 Schur Complement System ...............................110 3.3 FFT Based Direct Solvers ................................125 3.4 Two Subdomain Preconditioners ..........................140 3.5 Preconditioners in Two Dimensions ........................155 3.6 Preconditioners in Three Dimensions ,......................162 3.7 Neumann-Neumann and Balancing Preconditioners ..........175 3.8 Implementational Issues ..................................185 3.9 Theoretical Results ......................................192 4 Lagrange Multiplier Based Substructuring: FETI Method .............................................231 4.1 Constrained Minimization Formulation .....................232 4.2 Lagrange Multiplier Formulation ___...................... 239 4.3 Projected Gradient Algorithm .............................241 4.4 FETI-DP and BDDC Methods ............................250 XII Contents 5 Computational Issues and Parallelization ..................263 5.1 Algorithms for Automated Partitioning of Domains ..........264 5.2 Parallelizabiłity of Domain Decomposition Solvers ...........280 6 Least Squares-Control Theory: Iterative Algorithms ......295 6.1 Two Overlapping Subdomains .............................296 6.2 Two Non-Overlapping Subdomains ........................303 6.3 Extensions to Multiple Subdomains ........................310 7 Multilevel and Local Grid Refinement Methods ...........313 7.1 Multilevel Iterative Algorithms ............................314 7.2 Iterative Algorithms for Locally Refined Grids ..............321 8 Non-Self Adjoint Elliptic Equations: Iterative Methods ___333 8.1 Background .............................................334 8.2 Diffusion Dominated Case ................................340 8.3 Advection Dominated Case ...............................348 8.4 Time Stepping Applications ..............................364 8.5 Theoretical Results ......................................366 9 Parabolic Equations .......................................377 9.1 Background .............................................378 9.2 Iterative Algorithms .....................................381 9.3 Non-Iterative Algorithms .................................384 9.4 Parareal-Multiple Shooting Method ........................401 9.5 Theoretical Results .....................................408 10 Saddle Point Problems ....................................417 10.1 Properties of Saddle Point Systems ........................418 10.2 Algorithms Based on Duality .............................426 10.3 Penalty and Regularization Methods .......................434 10.4 Projection Methods ......................................437 10.5 Krylov Space and Block Matrix Methods ...................445 10.6 Applications to the Stokes and Navier-Stokes Equations ......456 10.7 Applications to Mixed Formulations of Elliptic Equations .....474 10.8 Applications to Optimal Control Problems ..................489 11 Non-Matching Grid Discretizations ........................515 11.1 Multi-Subdomain Hybrid Formulations .....................516 11.2 Mortar Element Discretization: Saddle Point Approach .......523 11.3 Mortar Element Discretization: Nonconforming Approach .....551 11.4 Schwarz Discretizations on Overlapping Grids ...............555 11.5 Alternative Nonmatching Grid Discretization Methods .......559 11.6 Applications to Parabolic Equations .......................564 Contents XIII 12 Heterogeneous Domain Decomposition Methods ...........575 12.1 Steklov-Poincaré Heterogeneous Model .....................576 12.2 Schwarz Heterogeneous Models ............................585 12.3 Least Squares-Control Heterogeneous Models ...............589 12.4 χ -Formulation .......................................... 594 12.5 Applications to Parabolic Equations .......................603 13 Fictitious Domain and Domain Imbedding Methods .......607 13.1 Background .............................................608 13.2 Preconditioners for Neumann Problems ....................610 13.3 Preconditioners for Dirichlet Problems .....................611 13.4 Lagrange Multiplier and Least Squares-Control Solvers .......614 14 Variational Inequalities and Obstacle Problems ............621 14.1 Background .............................................622 14.2 Projected Gradient and Relaxation Algorithms ..............628 14.3 Schwarz Algorithms for Variational Inequalities .............633 14.4 Monotone Convergence of Schwarz Algorithms ..............636 14.5 Applications to Parabolic Variational Inequalities ............644 15 Maximum Norm Theory ...................................647 15.1 Maximum Principles and Comparison Theorems .............648 15.2 Well Posedness of the Schwarz Hybrid Formulation ..........659 15.3 Convergence of Schwarz Iterative Algorithms ................661 15.4 Analysis of Schwarz Nonmatching Grid Discretizations .......668 15.5 Analysis of Schwarz Heterogeneous Approximations ..........674 15.6 Applications to Parabolic Equations .......................677 16 Eigenvalue Problems .......................................679 16.1 Background .............................................680 16.2 Gradient and Preconditioned Gradient Methods .............682 16.3 Schur Complement Methods ..............................683 16.4 Schwarz Subspace Methods ...............................684 16.5 Modal Synthesis Method .................................686 17 Optimization Problems ....................................689 17.1 Traditional Algorithms ...................................690 17.2 Schwarz Minimization Algorithms .........................697 18 Helmholtz Scattering Problem .............................699 18.1 Background .............................................700 18.2 Non-Overlapping and Overlapping Subdomain Methods ......701 18.3 Fictitious Domain and Control Formulations ................704 18.4 Hubert Uniqueness Method for Standing Waves .............705 References .....................................................711 Index ..........................................................761
adam_txt	Contents 1 Decomposition Frameworks. 1 1.1 Hybrid Formulations. 2 1.2 Schwarz Framework. 9 1.3 Steklov-Poincaré Framework. 16 1.4 Lagrange Multiplier Framework. 27 1.5 Least Squares-Control Framework. 36 2 Schwarz Iterative Algorithms . 47 2.1 Background . 48 2.2 Projection Formulation of Schwarz Algorithms . 56 2.3 Matrix Form of Schwarz Subspace Algorithms . 66 2.4 Implementational Issues . 72 2.5 Theoretical Results . 77 3 Schur Complement and Iterative Substructuring Algorithms .107 3.1 Background .108 3.2 Schur Complement System .110 3.3 FFT Based Direct Solvers .125 3.4 Two Subdomain Preconditioners .140 3.5 Preconditioners in Two Dimensions .155 3.6 Preconditioners in Three Dimensions ,.162 3.7 Neumann-Neumann and Balancing Preconditioners .175 3.8 Implementational Issues .185 3.9 Theoretical Results .192 4 Lagrange Multiplier Based Substructuring: FETI Method .231 4.1 Constrained Minimization Formulation .232 4.2 Lagrange Multiplier Formulation _. 239 4.3 Projected Gradient Algorithm .241 4.4 FETI-DP and BDDC Methods .250 XII Contents 5 Computational Issues and Parallelization .263 5.1 Algorithms for Automated Partitioning of Domains .264 5.2 Parallelizabiłity of Domain Decomposition Solvers .280 6 Least Squares-Control Theory: Iterative Algorithms .295 6.1 Two Overlapping Subdomains .296 6.2 Two Non-Overlapping Subdomains .303 6.3 Extensions to Multiple Subdomains .310 7 Multilevel and Local Grid Refinement Methods .313 7.1 Multilevel Iterative Algorithms .314 7.2 Iterative Algorithms for Locally Refined Grids .321 8 Non-Self Adjoint Elliptic Equations: Iterative Methods _333 8.1 Background .334 8.2 Diffusion Dominated Case .340 8.3 Advection Dominated Case .348 8.4 Time Stepping Applications .364 8.5 Theoretical Results .366 9 Parabolic Equations .377 9.1 Background .378 9.2 Iterative Algorithms .381 9.3 Non-Iterative Algorithms .384 9.4 Parareal-Multiple Shooting Method .401 9.5 Theoretical Results .408 10 Saddle Point Problems .417 10.1 Properties of Saddle Point Systems .418 10.2 Algorithms Based on Duality .426 10.3 Penalty and Regularization Methods .434 10.4 Projection Methods .437 10.5 Krylov Space and Block Matrix Methods .445 10.6 Applications to the Stokes and Navier-Stokes Equations .456 10.7 Applications to Mixed Formulations of Elliptic Equations .474 10.8 Applications to Optimal Control Problems .489 11 Non-Matching Grid Discretizations .515 11.1 Multi-Subdomain Hybrid Formulations .516 11.2 Mortar Element Discretization: Saddle Point Approach .523 11.3 Mortar Element Discretization: Nonconforming Approach .551 11.4 Schwarz Discretizations on Overlapping Grids .555 11.5 Alternative Nonmatching Grid Discretization Methods .559 11.6 Applications to Parabolic Equations .564 Contents XIII 12 Heterogeneous Domain Decomposition Methods .575 12.1 Steklov-Poincaré Heterogeneous Model .576 12.2 Schwarz Heterogeneous Models .585 12.3 Least Squares-Control Heterogeneous Models .589 12.4 χ -Formulation . 594 12.5 Applications to Parabolic Equations .603 13 Fictitious Domain and Domain Imbedding Methods .607 13.1 Background .608 13.2 Preconditioners for Neumann Problems .610 13.3 Preconditioners for Dirichlet Problems .611 13.4 Lagrange Multiplier and Least Squares-Control Solvers .614 14 Variational Inequalities and Obstacle Problems .621 14.1 Background .622 14.2 Projected Gradient and Relaxation Algorithms .628 14.3 Schwarz Algorithms for Variational Inequalities .633 14.4 Monotone Convergence of Schwarz Algorithms .636 14.5 Applications to Parabolic Variational Inequalities .644 15 Maximum Norm Theory .647 15.1 Maximum Principles and Comparison Theorems .648 15.2 Well Posedness of the Schwarz Hybrid Formulation .659 15.3 Convergence of Schwarz Iterative Algorithms .661 15.4 Analysis of Schwarz Nonmatching Grid Discretizations .668 15.5 Analysis of Schwarz Heterogeneous Approximations .674 15.6 Applications to Parabolic Equations .677 16 Eigenvalue Problems .679 16.1 Background .680 16.2 Gradient and Preconditioned Gradient Methods .682 16.3 Schur Complement Methods .683 16.4 Schwarz Subspace Methods .684 16.5 Modal Synthesis Method .686 17 Optimization Problems .689 17.1 Traditional Algorithms .690 17.2 Schwarz Minimization Algorithms .697 18 Helmholtz Scattering Problem .699 18.1 Background .700 18.2 Non-Overlapping and Overlapping Subdomain Methods .701 18.3 Fictitious Domain and Control Formulations .704 18.4 Hubert Uniqueness Method for Standing Waves .705 References .711 Index .761
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spelling	Mathew, Tarek P. A. Verfasser (DE-588)135628962 aut Domain decomposition methods for the numerical solution of partial differential equations Tarek P. A. Mathew Berlin [u.a.] Springer 2008 XIII, 764 S. txt rdacontent n rdamedia nc rdacarrier Lecture notes in computational science and engineering 61 Literaturverz. S. 711 - 760 Decomposition method Differential equations, Partial Numerical solutions Partielle Differentialgleichung (DE-588)4044779-0 gnd rswk-swf Gebietszerlegungsmethode (DE-588)4309232-9 gnd rswk-swf Partielle Differentialgleichung (DE-588)4044779-0 s Gebietszerlegungsmethode (DE-588)4309232-9 s DE-604 Erscheint auch als Online-Ausgabe 978-3-540-77209-5 Lecture notes in computational science and engineering 61 (DE-604)BV011386476 61 Digitalisierung UB Regensburg application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=016667731&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Mathew, Tarek P. A. Domain decomposition methods for the numerical solution of partial differential equations Lecture notes in computational science and engineering Decomposition method Differential equations, Partial Numerical solutions Partielle Differentialgleichung (DE-588)4044779-0 gnd Gebietszerlegungsmethode (DE-588)4309232-9 gnd
subject_GND	(DE-588)4044779-0 (DE-588)4309232-9
title	Domain decomposition methods for the numerical solution of partial differential equations
title_auth	Domain decomposition methods for the numerical solution of partial differential equations
title_exact_search	Domain decomposition methods for the numerical solution of partial differential equations
title_exact_search_txtP	Domain decomposition methods for the numerical solution of partial differential equations
title_full	Domain decomposition methods for the numerical solution of partial differential equations Tarek P. A. Mathew
title_fullStr	Domain decomposition methods for the numerical solution of partial differential equations Tarek P. A. Mathew
title_full_unstemmed	Domain decomposition methods for the numerical solution of partial differential equations Tarek P. A. Mathew
title_short	Domain decomposition methods for the numerical solution of partial differential equations
title_sort	domain decomposition methods for the numerical solution of partial differential equations
topic	Decomposition method Differential equations, Partial Numerical solutions Partielle Differentialgleichung (DE-588)4044779-0 gnd Gebietszerlegungsmethode (DE-588)4309232-9 gnd
topic_facet	Decomposition method Differential equations, Partial Numerical solutions Partielle Differentialgleichung Gebietszerlegungsmethode
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=016667731&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV011386476
work_keys_str_mv	AT mathewtarekpa domaindecompositionmethodsforthenumericalsolutionofpartialdifferentialequations

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