Bounds for Bernstein Basis Functions and Meyer–König and Zeller Basis Functions

We present the complete asymptotic expansion for the Meyer-Konig and Zeller Ž Ž . . yk Ž . operators M f t ; x as n tends to infinity. All coefficients of n ks1, 2, . . . n are calculated explicitly in terms of Stirling numbers of the first and second kind.

## Abstract High‐dimensional data are becoming more and more common, especially in the field of chemometrics. Nevertheless, it is generally known that most of the commonly used prediction models suffer from curse of dimensionality that is the prediction performance degrades as data dimension grows.

## Abstract This paper presents a method of moments (MoM) formulation for large thin‐wire structures. In our approach, a modified version of the well‐known Rao–Wilton–Glisson (RWG) basis functions for wires including a linear phase term is considered. This additional term allows an efficient repres

This paper discusses approximation errors for interpolation in a variational setting which may be obtained from the analysis given by Golomb and Weinberger. We show how this analysis may be used to derive the power function estimate of the error as introduced by Schaback and Powell. A simple error t