Global convergence of RTLSQEP : a solver of regularized total least squares problems via quadratic eigenproblems

Lampe, Jörg; Voß, Heinrich

doi:10.15480/882.2328

Global convergence of RTLSQEP : a solver of regularized total least squares problems via quadratic eigenproblems

Citation Link: https://doi.org/10.15480/882.2328

Publikationstyp

Journal Article

Date Issued

2008-02-15

Sprache

English

Author(s)

Lampe, Jörg

Voß, Heinrich

Institut

Mathematik E-10

Numerische Simulation E-10 (H)

TORE-DOI

10.15480/882.2328

TORE-URI

http://hdl.handle.net/11420/2924

Journal

Mathematical modelling and analysis

Volume

13

Issue

1

Start Page

55

End Page

66

Citation

Mathematical Modelling and Analysis 1 (13): 55-66 (2008)

Publisher DOI

10.3846/1392-6292.2008.13.55-66

Scopus ID

2-s2.0-41149113440

Publisher

Vilnius Gediminas Technical University

The total least squares (TLS) method is a successful approach for linear problems if both the matrix and the right hand side are contaminated by some noise. In a recent paper Sima, Van Huffel and Golub suggested an iterative method for solving regularized TLS problems, where in each iteration step a quadratic eigenproblem has to be solved. In this paper we prove its global convergence, and we present an efficient implementation using an iterative projection method with thick updates.

Subjects

total least squares method

regularization

quadratic eigenvalue problem

DDC Class

510: Mathematik

More Funding Information

Bundesministerium für Bildung und Forschung, BMBF

Lizenz

https://creativecommons.org/licenses/by/4.0/

Name

document_Lampe_Voss_2008.pdf

Size

232.67 KB

Format

Adobe PDF

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Global convergence of RTLSQEP : a solver of regularized total least squares problems via quadratic eigenproblems