On best constants in $L^2$ approximation
Numerical Analysis
2020-09-28 v2 Numerical Analysis
Classical Analysis and ODEs
Abstract
In this paper we provide explicit upper and lower bounds on certain -widths, i.e., best constants in approximation. We further describe a numerical method to compute these -widths approximately, and prove that this method is superconvergent. Based on our numerical results we formulate a conjecture on the asymptotic behaviour of the -widths. Finally we describe how the numerical method can be used to compute the breakpoints of the optimal spline spaces of Melkman and Micchelli, which have recently received renewed attention in the field of Isogeometric Analysis.
Cite
@article{arxiv.1909.13736,
title = {On best constants in $L^2$ approximation},
author = {Andrea Bressan and Michael S. Floater and Espen Sande},
journal= {arXiv preprint arXiv:1909.13736},
year = {2020}
}
Comments
15 pages, 4 figures and 1 table. Improved the presentation. Article now published in IMAJNA