Randomized algorithms for generalized Hermitian eigenvalue problems with application to computing Karhunen-Loève expansion

Summary We describe randomized algorithms for computing the dominant eigenmodes of the generalized Hermitian eigenvalue problem Ax = λBx, with A Hermitian and B Hermitian and positive definite. The algorithms we describe only require forming operations Ax,Bx and B−1x and avoid forming square roots o...

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Vydáno v:	Numerical linear algebra with applications Ročník 23; číslo 2; s. 314 - 339
Hlavní autoři:	Saibaba, Arvind K., Lee, Jonghyun, Kitanidis, Peter K.
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Oxford Blackwell Publishing Ltd 01.03.2016 Wiley Subscription Services, Inc
Témata:	Algorithms Approximation Computation Eigenvalues Error analysis Expansion Forming generalized Hermitian eigenvalue problems Karhunen-Loeve expansion Karhunen-Loève expansion Mathematical analysis Matrix Randomized algorithms
ISSN:	1070-5325, 1099-1506
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Shrnutí:	Summary We describe randomized algorithms for computing the dominant eigenmodes of the generalized Hermitian eigenvalue problem Ax = λBx, with A Hermitian and B Hermitian and positive definite. The algorithms we describe only require forming operations Ax,Bx and B−1x and avoid forming square roots of B (or operations of the form, B1/2x or B−1/2x). We provide a convergence analysis and a posteriori error bounds and derive some new results that provide insight into the accuracy of the eigenvalue calculations. The error analysis shows that the randomized algorithm is most accurate when the generalized singular values of B−1A decay rapidly. A randomized algorithm for the generalized singular value decomposition is also provided. Finally, we demonstrate the performance of our algorithm on computing an approximation to the Karhunen–Loève expansion, which involves a computationally intensive generalized Hermitian eigenvalue problem with rapidly decaying eigenvalues. Copyright © 2015 John Wiley & Sons, Ltd.
Bibliografie:	ark:/67375/WNG-S8B8V1P6-P istex:1A8236D73465AED8BFFD5300C06E6620807240FC ArticleID:NLA2026 National Science Foundation - No. NSF EEC-1028968 ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14 content type line 23
ISSN:	1070-5325 1099-1506
DOI:	10.1002/nla.2026