2015
DOI: 10.1137/140998081
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Generalized Rational Krylov Decompositions with an Application to Rational Approximation

Abstract: Abstract. Generalized rational Krylov decompositions are matrix relations which, under certain conditions, are associated with rational Krylov spaces. We study the algebraic properties of such decompositions and present an implicit Q theorem for rational Krylov spaces. Transformations on rational Krylov decompositions allow for changing the poles of a rational Krylov space without recomputation, and two algorithms are presented for this task. Using such transformations we develop a rational Krylov method for r… Show more

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Cited by 75 publications
(114 citation statements)
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“…Such a right-multiplication of the decomposition by R m is equivalent to changing the parameters (η j /ρ j , t j ) during the rational Arnoldi algorithm. The two RADs for Q m+1 (A, b, q m ) are essentially equal ; see [5,Def. 3.1] for a precise definition.…”
Section: S198mentioning
confidence: 99%
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“…Such a right-multiplication of the decomposition by R m is equivalent to changing the parameters (η j /ρ j , t j ) during the rational Arnoldi algorithm. The two RADs for Q m+1 (A, b, q m ) are essentially equal ; see [5,Def. 3.1] for a precise definition.…”
Section: S198mentioning
confidence: 99%
“…3.1] for a precise definition. In fact, the rational implicit Q theorem [5,Thm. 3.2] asserts that the RADs related to Q m+1 (A, b, q m ) are essentially uniquely determined by A, b, and the ordering of the poles of the decomposition.…”
Section: S198mentioning
confidence: 99%
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