Computation of derivatives of repeated eigenvalues and the corresponding eigenvectors of symmetric matrix pencils

Andrew, A.L.; Tan, R.C.E.

Publication

Computation of derivatives of repeated eigenvalues and the corresponding eigenvectors of symmetric matrix pencils

Andrew, A.L.
; Tan, R.C.E.

Abstract

This paper presents and analyzes new algorithms for computing the numerical values of derivatives, of arbitrary order, and of eigenvalues and eigenvectors of Α(ρ)×(ρ) = λ(ρ)Β(ρ)×(ρ) at a point ρ = ρ0 at which the eigenvalues considered are multiple. Here Α(ρ) and Β(ρ) are hermitian matrices which depend analytically on a single real variable ρ, and Β(ρ0) is positive definite. The algorithms are valid under more general conditions than previous algorithms. Numerical results support the theoretical analysis and show that the algorithms are also useful when eigenvalues are merely very close rather than coincident.

Keywords

Close eigenvalues, Eigenvalue and eigenvector sensitivities, Multiple eigenvalues

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SIAM Journal on Matrix Analysis and Applications

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MATHEMATICS

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Date

1998-09

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https://scholarbank.nus.edu.sg/handle/10635/103023

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Article

Computation of derivatives of repeated eigenvalues and the corresponding eigenvectors of symmetric matrix pencils

Andrew, A.L.
; Tan, R.C.E.

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Computation of derivatives of repeated eigenvalues and the corresponding eigenvectors of symmetric matrix pencils

Andrew, A.L. ; Tan, R.C.E.

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Alternative Title

Abstract

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Andrew, A.L.
; Tan, R.C.E.