Interpolation by integrals on balls
Abstract
In this work we blend interpolation theory with numerical integration, constructing an interpolator based on integrals over -dimensional balls. We show that, under hypotheses on the radius of the -balls, the problem can be treated as an interpolation problem both on a collection of -spheres and multivariate point sets, for which a wide literature is available. With the aim of exact quadrature and cubature formulae, we offer a neat strategy for the exact computation of the Vandermonde matrix of the problem and propose a meaningful Lebesgue constant. Problematic situations are evidenced and a charming aspect is enlightened: the majority of the theoretical results only deal with the centre of the domains of integration and are not really sensitive to their radius. We flank our theoretical results by a large amount of comprehensive numerical examples.
Cite
@article{arxiv.2312.10537,
title = {Interpolation by integrals on balls},
author = {Ludovico Bruni Bruno and Giacomo Elefante},
journal= {arXiv preprint arXiv:2312.10537},
year = {2023}
}