Parallel Eigenvalue Computation for Banded Generalized Eigenvalue Problems

Dokumenttyp:: Zeitschriftenaufsatz
Autor(en):: Rippl, Michael; Lang, Bruno; Huckle, Thomas
Titel:: Parallel Eigenvalue Computation for Banded Generalized Eigenvalue Problems
Abstract:: We consider generalized eigenvalue problems $Ax=Bx\lambda$ with banded hermitian matrix $A$ and hermitian positive definite $B$. To reduce the generalized eigenvalue problem to standard form $Cy=y\lambda$ the algorithm proposed by Crawford is applied preserving the banded structure in $C$. We present a parallel implementation of this method included in the ELPA library. Numerical experiments show the advantages of this approach compared to standard solvers.
Kongresstitel:: International Workshop on Parallel Matrix Algorithms and Applications
Zeitschriftentitel:: Parallel Computing
Jahr:: 2019
Band / Volume:: 88
Jahr / Monat:: 2019-04
Quartal:: 2. Quartal
Monat:: Apr
Seitenangaben Beitrag:: 102542
Reviewed:: ja
Sprache:: en
Volltext / DOI:: doi:10.1016/j.parco.2019.07.002
WWW:: https://www.sciencedirect.com/science/article/pii/S0167819119301279
Verlag / Institution:: Elsevier
Status:: Verlagsversion / published
Angenommen (von Zeitschrift):: 29.07.2019
Publikationsdatum:: 04.08.2019
TUM Einrichtung:: Department of Informatics
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