On the Lebesgue constant of barycentric rational interpolation at equidistant nodes
- Bos, Len Department of Computer Science, University of Verona, Italy
- De Marchi, Stefano Department of Pure and Applied Mathematics, University of Padova, Italy
- Hormann, Kai Faculty of Informatics, University of Lugano, Switzerland
- Klein, Georges Department of Mathematics, University of Fribourg, Switzerland
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18.12.2011
Published in:
- Numerische Mathematik. - 2012, vol. 121, p. 461–471
English
Recent results reveal that the family of barycentric rational interpolants introduced by Floater and Hormann is very well-suited for the approximation of functions as well as their derivatives, integrals and primitives. Especially in the case of equidistant interpolation nodes, these infinitely smooth interpolants offer a much better choice than their polynomial analogue. A natural and important question concerns the condition of this rational approximation method. In this paper we extend a recent study of the Lebesgue function and constant associated with Berrut’s rational interpolant at equidistant nodes to the family of Floater–Hormann interpolants, which includes the former as a special case.
- Faculty
- Faculté des sciences et de médecine
- Department
- Département de Mathématiques
- Language
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- English
- Classification
- Mathematics
- License
- License undefined
- Identifiers
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- RERO DOC 28617
- DOI 10.1007/s00211-011-0442-8
- Persistent URL
- https://folia.unifr.ch/unifr/documents/302284
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