English

The high-level error bound for shifted surface spline interpolation

Numerical Analysis 2017-02-17 v1

Abstract

Radial function interpolation of scattered data is a frequently used method for multivariate data fitting. One of the most frequently used radial functions is called shifted surface spline, introduced by Dyn, Levin and Rippa in \cite{Dy1} for R2R^{2}. Then it's extended to RnR^{n} for n1n\geq 1. Many articles have studied its properties, as can be seen in \cite{Bu,Du,Dy2,Po,Ri,Yo1,Yo2,Yo3,Yo4}. When dealing with this function, the most commonly used error bounds are the one raised by Wu and Schaback in \cite{WS}, and the one raised by Madych and Nelson in \cite{MN2}. Both are O(dl)O(d^{l}) as d0d\to 0, where ll is a positive integer and dd is the fill-distance. In this paper we present an improved error bound which is O(ω1/d)O(\omega^{1/d}) as d0d\to 0, where 0<ω<10<\omega <1 is a constant which can be accurately calculated.

Cite

@article{arxiv.math/0601162,
  title  = {The high-level error bound for shifted surface spline interpolation},
  author = {Lin-Tian Luh},
  journal= {arXiv preprint arXiv:math/0601162},
  year   = {2017}
}

Comments

14 pages, radial basis functions, approximation theory. arXiv admin note: text overlap with arXiv:math/0601158