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An Optimized and Scalable Eigensolver for Sequences of Eigenvalue Problems

Authors :
Edoardo Di Napoli
Daniel Wortmann
Mario Berljafa
Source :
Berljafa, M, Wortmann, D & Di Napoli, E 2014, ' An Optimized and Scalable Eigensolver for Sequences of Eigenvalue Problems ', Concurrency and Computation: Practice & Experience, vol. 27, pp. 905–922 . https://doi.org/10.1002/cpe.3394
Publication Year :
2014
Publisher :
arXiv, 2014.

Abstract

In many scientific applications the solution of non-linear differential equations are obtained through the set-up and solution of a number of successive eigenproblems. These eigenproblems can be regarded as a sequence whenever the solution of one problem fosters the initialization of the next. In addition, in some eigenproblem sequences there is a connection between the solutions of adjacent eigenproblems. Whenever it is possible to unravel the existence of such a connection, the eigenproblem sequence is said to be correlated. When facing with a sequence of correlated eigenproblems the current strategy amounts to solving each eigenproblem in isolation. We propose a alternative approach which exploits such correlation through the use of an eigensolver based on subspace iteration and accelerated with Chebyshev polynomials (ChFSI). The resulting eigensolver is optimized by minimizing the number of matrix-vector multiplications and parallelized using the Elemental library framework. Numerical results show that ChFSI achieves excellent scalability and is competitive with current dense linear algebra parallel eigensolvers.<br />Comment: 23 Pages, 6 figures. First revision of an invited submission to special issue of Concurrency and Computation: Practice and Experience

Details

Database :
OpenAIRE
Journal :
Berljafa, M, Wortmann, D & Di Napoli, E 2014, ' An Optimized and Scalable Eigensolver for Sequences of Eigenvalue Problems ', Concurrency and Computation: Practice & Experience, vol. 27, pp. 905–922 . https://doi.org/10.1002/cpe.3394
Accession number :
edsair.doi.dedup.....a3caf47dde0d0782d45cc3127054795b
Full Text :
https://doi.org/10.48550/arxiv.1404.4161