A variant of the inverted Lanczos method

Voß, Heinrich

doi:10.15480/882.168

A variant of the inverted Lanczos method

Citation Link: https://doi.org/10.15480/882.168

Publikationstyp

Working Paper

Date Issued

2000-07

Sprache

English

Author(s)

Voß, Heinrich

Institut

Mathematik E-10

TORE-DOI

10.15480/882.168

TORE-URI

http://tubdok.tub.tuhh.de/handle/11420/170

First published in

Preprints des Institutes für Mathematik

Number in series

37

In this note we study a variant of the inverted Lanczos method which computes eigenvalue approximates of a symmetric matrix A from the projection to a Krylov space of A method at least as long as reorthogonalization is not required. The method is applied to the problem of determining the smallest eigenvalue of a symmetric Toeplitz matrix. It is accelerated taking advantage of symmetry properties of the corresponding eigenvector.

Subjects

eigenvalue problem

Lanczos method

Toeplitz matrix

symmetry properties

DDC Class

510: Mathematik

Lizenz

http://rightsstatements.org/vocab/InC/1.0/

Name

rep37.pdf

Size

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Format

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A variant of the inverted Lanczos method