# Interpolation by Linear Functions on an $n$-Dimensional Ball

**Authors:** Mikhail Nevskii, Alexey Ukhalov

arXiv: 1905.03141 · 2020-02-25

## TL;DR

This paper derives a formula for the norm of a linear interpolation operator on an n-dimensional ball, focusing on regular simplices inscribed in the ball, to understand approximation properties of linear functions.

## Contribution

It provides an explicit formula for the operator norm of linear interpolation on an n-dimensional ball using vertices of a simplex, especially for regular inscribed simplices.

## Key findings

- Derived a formula for the interpolation operator norm.
- Analyzed the case of regular simplices inscribed in the unit ball.
- Enhanced understanding of linear approximation on high-dimensional balls.

## Abstract

By $B=B(x^{(0)};R)$ we denote the Euclidean ball in ${\mathbb R}^n$ given by the inequality $\|x-x^{(0)}\|\leq R$. Here $x^{(0)}\in{\mathbb R}^n, R>0$, $\|x\|:=\left(\sum_{i=1}^n x_i^2\right)^{1/2}$. We mean by $C(B)$ the space of continuous functions $f:B\to{\mathbb R}$ with the norm $\|f\|_{C(B)}:=\max_{x\in B}|f(x)|$ and by $\Pi_1\left({\mathbb R}^n\right)$ the set of polynomials in $n$ variables of degree $\leq 1$, i.e., linear functions on ${\mathbb R}^n$. Let $x^{(1)}, \ldots, x^{(n+1)}$ be the vertices of $n$-dimensional nondegenerate simplex $S\subset B$. The interpolation projector   $P:C(B)\to \Pi_1({\mathbb R}^n)$ corresponding to $S$ is defined by the equalities $Pf\left(x^{(j)}\right)=f\left(x^{(j)}\right).$ We obtain the formula to compute the norm of $P$ as an operator from $C(B)$ into $C(B)$ via $x^{(0)}$, $R$ and coefficients of basic Lagrange polynomials of $S$. In more details we study the case when $S$ is a regular simplex inscribed into $B_n=B(0,1)$.

## Full text

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## Figures

6 figures with captions in the complete paper: https://tomesphere.com/paper/1905.03141/full.md

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Source: https://tomesphere.com/paper/1905.03141