2017
DOI: 10.1016/j.tcs.2017.03.024
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A contour integral approach to the computation of invariant pairs

Abstract: We study some aspects of the invariant pair problem for matrix polynomials, as introduced by Betcke and Kressner [3] and by Beyn and Thümmler [6]. Invariant pairs extend the notion of eigenvalue-eigenvector pairs, providing a counterpart of invariant subspaces for the nonlinear case. We compute formulations for the condition numbers and the backward error for invariant pairs and solvents. We then adapt the Sakurai-Sugiura moment method [1] to the computation of invariant pairs, including some classes of probl… Show more

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Cited by 4 publications
(1 citation statement)
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“…Consequently, the eigenvalues of Λ are eigenvalues of Q(λ). Thus invariant pair provides a unified perspective on the problem of computing several eigenpairs for a given matrix polynomial [5,22,23,33,50]. Obviously, invariant pair extends the concepts of standard pair [28] and null pair [4].…”
Section: Introductionmentioning
confidence: 99%
“…Consequently, the eigenvalues of Λ are eigenvalues of Q(λ). Thus invariant pair provides a unified perspective on the problem of computing several eigenpairs for a given matrix polynomial [5,22,23,33,50]. Obviously, invariant pair extends the concepts of standard pair [28] and null pair [4].…”
Section: Introductionmentioning
confidence: 99%