2013
DOI: 10.1090/s0025-5718-2013-02695-6
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The structure of matrices in rational Gauss quadrature

Abstract: Abstract. This paper is concerned with the approximation of matrix functionals defined by a large, sparse or structured, symmetric definite matrix. These functionals are Stieltjes integrals with a measure supported on a compact real interval. Rational Gauss quadrature rules that are designed to exactly integrate Laurent polynomials with a fixed pole in the vicinity of the support of the measure may yield better approximations of these functionals than standard Gauss quadrature rules with the same number of nod… Show more

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Cited by 10 publications
(8 citation statements)
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References 25 publications
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“…When the measure has discrete support, a situation that arises when evaluating inner products involving matrix functions, we show the existence of a rational Gauss quadrature rule with linear algebra techniques by exploiting the structure of matrices determined by the recursion relations. This results extends the discussions by Golub and Meurant [11,12] and that in [15] to rational Gauss rules determined by several distinct finite poles.…”
Section: Discussionsupporting
confidence: 89%
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“…When the measure has discrete support, a situation that arises when evaluating inner products involving matrix functions, we show the existence of a rational Gauss quadrature rule with linear algebra techniques by exploiting the structure of matrices determined by the recursion relations. This results extends the discussions by Golub and Meurant [11,12] and that in [15] to rational Gauss rules determined by several distinct finite poles.…”
Section: Discussionsupporting
confidence: 89%
“…Our analysis extends the discussion in [15] on Laurent polynomials to rational functions with several distinct finite poles.…”
Section: Miroslav S Pranić and Lothar Reichelsupporting
confidence: 64%
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“…In the present work, we also consider Krylov techniques related to rational Gauss-Radau quadrature formulae. These quadrature formulae integrate rational function r = p/|q| 2 exactly, where p is a polynomial of degree ≤ 2m − 2, q is the given denominator, and one of the m quadrature nodes is preassigned, see also [LLRW08,JR13]. For rational Gauss-Radau quadrature formulae in a more general setting see also [Gau04,DBVD10,DB12].…”
Section: Introduction and Historical Contextmentioning
confidence: 99%