Onesided, intertwining, positive and copositive polynomial approximation with interpolatory constraints
Abstract
Given , a nonnegative function , , an arbitrary finite collection of points , and a corresponding collection of nonnegative integers with , , is it true that, for sufficiently large , there exists a polynomial of degree such that (i) , , where and is the classical -th modulus of smoothness, (ii) , for all and all , and (iii) either on (\emph{onesided} approximation), or on (\emph{positive} approximation)? We provide {\em precise answers} not only to this question, but also to similar questions for more general {\em intertwining} and {\em copositive} polynomial approximation. It turns out that many of these answers are quite unexpected. We also show that, in general, similar questions for -monotone approximation with have negative answers, i.e., -monotone approximation with general interpolatory constraints is impossible if .
Cite
@article{arxiv.2305.01745,
title = {Onesided, intertwining, positive and copositive polynomial approximation with interpolatory constraints},
author = {German Dzyubenko and Kirill A. Kopotun},
journal= {arXiv preprint arXiv:2305.01745},
year = {2023}
}