A method for calculating the extreme eigensolution of a real symmetric matrix of high order

1 July 1980

journal article
Published by IOP Publishing in Journal of Physics A: General Physics

Vol. 13 (7) , 2369-2374
https://doi.org/10.1088/0305-4470/13/7/019

Abstract

A simple method for calculating the extreme eigensolution of a real symmetric matrix of high order, alternative to Davidson's method, is investigated and compared with other similar methods.

Keywords

SYMMETRIC MATRIX

This publication has 6 references indexed in Scilit:

Davidson's algorithm with and without perturbation corrections
Journal of Physics A: General Physics, 1980
An iterative method for calculating low lying eigenvalues of an Hermitian operator
Journal of Physics A: General Physics, 1977
The iterative calculation of a few of the lowest eigenvalues and corresponding eigenvectors of large real-symmetric matrices
Journal of Computational Physics, 1975
The eigenvalue problem (A − λB)x = 0 for symmetric matrices of high order
Computer Methods in Applied Mechanics and Engineering, 1974
The iterative calculation of several of the lowest or highest eigenvalues and corresponding eigenvectors of very large symmetric matrices
Journal of Computational Physics, 1973
An iteration method for the solution of the eigenvalue problem of linear differential and integral operators
Journal of Research of the National Bureau of Standards, 1950