On the Best Uniform Polynomial Approximation to the Checkmark Function
Classical Analysis and ODEs
2022-01-19 v2
Abstract
The best uniform polynomial approximation of the checkmark function is considered, as varies in . For each fixed degree , the minimax error is shown to be piecewise analytic in . In addition, is shown to feature piecewise linear decreasing/increasing sections, called V-shapes. The points of the alternation set are proven to be monotone increasing in and their dynamics are completely characterized. We also prove a conjecture of Shekhtman that for odd , has a local maximum at .
Cite
@article{arxiv.2102.09502,
title = {On the Best Uniform Polynomial Approximation to the Checkmark Function},
author = {Peter D. Dragnev and Alan R. Legg and Ramon Orive},
journal= {arXiv preprint arXiv:2102.09502},
year = {2022}
}
Comments
23 pages, 6 figures, now accepted for publication in Journal of Approximation Theory