On the real symmetric inverse eigenvalue problem

Shalaby, M. A.

Published 1994

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On the real symmetric inverse eigenvalue problem

Shalaby, M. A.¹

1. UNESCO

Abstract The inverse eigenvalue problem of a real symmetric matrix, dependent on several parameters, is studied. A new solution, based on obtaining perturbation expansions of the eigensystem of such a matrix, is presented. The proposed solution is a modification of the well-known Newton method, based on investigating the analyticity of the eigenvalues and the eigenvectors of the matrix.

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Journal: Journal of Computational and Applied Mathematics

Publisher: Elsevier BV

ISSN: 03770427

Volume: 56

Pages: 331-340

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MAGID 2082623392

DOI 10.1016/0377-0427(94)90087-6 Read more

COREID 203275262 Read more

COREID 82743120 Read more

References

Friedland . The formulation and analysis of numerical methods for inverse eigenv... Read more

Hu . Parameter-insensitive pole assignment, Systems Control Lett.. 1986; 8 115. Read more

Chu . Solving additive inverse eigenvalue problem for symmetric matrices by homo... Read more

039-764-578-519-964 Read more

Lancaster . On eigenvalues of matrices dependent on a parameter, Numer. Math.. 1... Read more

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On the real symmetric inverse eigenvalue problem

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