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Spectral computations for bounded operators

Exact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges can rarely be found. Therefore, one must approximate such operators by finite rank operators, then solve the original eigenvalue problem approximately. Serving as both an outstanding text for graduat...

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Detalles Bibliográficos
Autores principales: Ahues, Mario, Largillier, Alain, Limaye, Balmohan
Lenguaje:eng
Publicado: Taylor and Francis 2001
Materias:
Acceso en línea:http://cds.cern.ch/record/1991426
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author Ahues, Mario
Largillier, Alain
Limaye, Balmohan
author_facet Ahues, Mario
Largillier, Alain
Limaye, Balmohan
author_sort Ahues, Mario
collection CERN
description Exact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges can rarely be found. Therefore, one must approximate such operators by finite rank operators, then solve the original eigenvalue problem approximately. Serving as both an outstanding text for graduate students and as a source of current results for research scientists, Spectral Computations for Bounded Operators addresses the issue of solving eigenvalue problems for operators on infinite dimensional spaces. From a review of classical spectral theory through concrete approximation techniques to finite dimensional situations that can be implemented on a computer, this volume illustrates the marriage of pure and applied mathematics. It contains a variety of recent developments, including a new type of approximation that encompasses a variety of approximation methods but is simple to verify in practice. It also suggests a new stopping criterion for the QR Method and outlines advances in both the iterative refinement and acceleration techniques for improving the accuracy of approximations. The authors illustrate all definitions and results with elementary examples and include numerous exercises.Spectral Computations for Bounded Operators thus serves as both an outstanding text for second-year graduate students and as a source of current results for research scientists.
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spelling cern-19914262021-04-21T20:28:31Zhttp://cds.cern.ch/record/1991426engAhues, MarioLargillier, AlainLimaye, BalmohanSpectral computations for bounded operatorsMathematical Physics and MathematicsExact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges can rarely be found. Therefore, one must approximate such operators by finite rank operators, then solve the original eigenvalue problem approximately. Serving as both an outstanding text for graduate students and as a source of current results for research scientists, Spectral Computations for Bounded Operators addresses the issue of solving eigenvalue problems for operators on infinite dimensional spaces. From a review of classical spectral theory through concrete approximation techniques to finite dimensional situations that can be implemented on a computer, this volume illustrates the marriage of pure and applied mathematics. It contains a variety of recent developments, including a new type of approximation that encompasses a variety of approximation methods but is simple to verify in practice. It also suggests a new stopping criterion for the QR Method and outlines advances in both the iterative refinement and acceleration techniques for improving the accuracy of approximations. The authors illustrate all definitions and results with elementary examples and include numerous exercises.Spectral Computations for Bounded Operators thus serves as both an outstanding text for second-year graduate students and as a source of current results for research scientists.Taylor and Francisoai:cds.cern.ch:19914262001
spellingShingle Mathematical Physics and Mathematics
Ahues, Mario
Largillier, Alain
Limaye, Balmohan
Spectral computations for bounded operators
title Spectral computations for bounded operators
title_full Spectral computations for bounded operators
title_fullStr Spectral computations for bounded operators
title_full_unstemmed Spectral computations for bounded operators
title_short Spectral computations for bounded operators
title_sort spectral computations for bounded operators
topic Mathematical Physics and Mathematics
url http://cds.cern.ch/record/1991426
work_keys_str_mv AT ahuesmario spectralcomputationsforboundedoperators
AT largillieralain spectralcomputationsforboundedoperators
AT limayebalmohan spectralcomputationsforboundedoperators