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AuthorHashemi, Behnam
AuthorNakatsukasa, Yuji
Available date2022-10-18T10:24:26Z
Publication Date2022-10-11
Publication NameSIAM Journal on Scientific Computing
Identifierhttp://dx.doi.org/10.1137/21M1445934
CitationHashemi, B., & Nakatsukasa, Y. (2022). Least-squares spectral methods for ODE eigenvalue problems. SIAM Journal on Scientific Computing, 44(5), A3244-A3264.
ISSN1064-8275
URIhttp://hdl.handle.net/10576/35191
AbstractWe develop spectral methods for ODEs and operator eigenvalue problems that are based on a least-squares formulation of the problem. The key tool is a method for rectangular generalized eigenvalue problems, which we extend to quasimatrices and objects combining quasimatrices and matrices. The strength of the approach is its flexibility that lies in the quasimatrix formulation allowing the basis functions to be chosen arbitrarily, a good choice (e.g. those obtained by solving nearby problems) leading to rapid convergence, and often giving high accuracy. We also show how our algorithm can easily be modified to solve problems with eigenvalue-dependent boundary conditions, and discuss reformulations as an integral equation, which often improves the accuracy.
SponsorIran National Science Foundation (INSF) grant 98012590 and by a grant from IPM (No. 1400650036).
Languageen
PublisherSociety for Industrial and Applied Mathematics
Subjectoperator eigenvalue problems
least-squares method
rectangular matrix pencils
spectral methods
quasimatrix
TitleLeast-squares spectral methods for ODE eigenvalue problems
TypeArticle
PaginationA3244 - A3264
Issue Number5
Volume Number44
ESSN1095-7197
dc.accessType Full Text


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