期刊
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
卷 349, 期 -, 页码 292-301出版社
ELSEVIER
DOI: 10.1016/j.cam.2018.06.011
关键词
Hermite interpolation; Barycentric interpolation; Rational interpolation; Lebesgue constant; Condition
资金
- Swiss National Science Foundation (SNSF) [200021_150053]
- Swiss National Science Foundation (SNF) [200021_150053] Funding Source: Swiss National Science Foundation (SNF)
Barycentric rational Floater-Hormann interpolants compare favourably to classical polynomial interpolants in the case of equidistant nodes, because the Lebesgue constant associated with these interpolants grows logarithmically in this setting, in contrast to the exponential growth experienced by polynomials. In the Hermite setting, in which also the first derivatives of the interpolant are prescribed at the nodes, the same exponential growth has been proven for polynomial interpolants, and the main goal of this paper is to show that much better results can be obtained with a recent generalization of Floater-Hormann interpolants. After summarizing the construction of these barycentric rational Hermite interpolants, we study the behaviour of the corresponding Lebesgue constant and prove that it is bounded from above by a constant. Several numerical examples confirm this result. (C) 2018 Elsevier B.V. All rights reserved.
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