Optimal Hermite-Fejér interpolation of algebraic polynomials and the best one-sided approximation on the interval [−1,1]

In this paper, we give the relations of the optimal Hermite-Fejér interpolation and the best one-sided approximation to the smooth function classes BC2r,+, r∈N in weighted space L1,ω([−1,1]), with a positive, continuous and integrable weight function ω on (−1,1). We proved that the Hermite-Fejér int...

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Bibliographic Details
Published in	Journal of mathematical analysis and applications Vol. 536; no. 1; p. 128142
Main Authors	Liu, Yongping, Guo, Dandan
Format	Journal Article
Language	English
Published	Elsevier Inc 01.08.2024
Subjects	Hermite-Fejér interpolation One-sided approximation Smooth function Hermite-Fejér interpolation One-sided approximation Smooth function
Online Access	Get full text
ISSN	0022-247X 1096-0813
DOI	10.1016/j.jmaa.2024.128142

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Summary:	In this paper, we give the relations of the optimal Hermite-Fejér interpolation and the best one-sided approximation to the smooth function classes BC2r,+, r∈N in weighted space L1,ω([−1,1]), with a positive, continuous and integrable weight function ω on (−1,1). We proved that the Hermite-Fejér interpolation based on the set of the zeros of some orthogonal polynomials is optimal respectively in the space L1,ω([−1,1]) and the space L∞([−1,1]) and gave the exact constants of the approximation errors of these Hermite-Fejér interpolation. We also obtained the exact constant of the approximation errors of the optimal Hermite-Fejér interpolation when the endpoints of the interval [−1,1] are included in the considered sets of the nodes.
ISSN:	0022-247X 1096-0813
DOI:	10.1016/j.jmaa.2024.128142