On $N$-Unital Functions
Number Theory
2022-05-03 v5
Abstract
Let be a positive integer. We say a non-constant rational function is -\emph{unital} if all the zeros and poles of both and are either 0 or -th roots of unity. These functions are called admissible functions by Au in a recent paper arXiv:2007.03957 and used to study some central binomial series of Ap\'ery type via their iterated integral expression related to multiple polylogrithms and colored multiple zeta values. In this paper we determine the complete set of these functions for by elementary method, and briefly study some cases at level 5.
Cite
@article{arxiv.2103.15745,
title = {On $N$-Unital Functions},
author = {Jianqiang Zhao},
journal= {arXiv preprint arXiv:2103.15745},
year = {2022}
}
Comments
46 pages. Title changes to a shorter version. Proposition 5 replaces a Conjecture 5 in previous version since counter-examples were found at level 5