English

On Primitive Covering Numbers

Number Theory 2014-06-27 v1

Abstract

In 2007, Zhi-Wei Sun defined a \emph{covering number} to be a positive integer LL such that there exists a covering system of the integers where the moduli are distinct divisors of LL greater than 1. A covering number LL is called \emph{primitive} if no proper divisor of LL is a covering number. Sun constructed an infinite set L\mathcal L of primitive covering numbers, and he conjectured that every primitive covering number must satisfy a certain condition. In this paper, for a given LLL\in \mathcal L, we derive a formula that gives the exact number of coverings that have LL as the least common multiple of the set MM of moduli, under certain restrictions on MM. Additionally, we disprove Sun's conjecture by constructing an infinite set of primitive covering numbers that do not satisfy his primitive covering number condition.

Cite

@article{arxiv.1406.6851,
  title  = {On Primitive Covering Numbers},
  author = {Lenny Jones and Daniel White},
  journal= {arXiv preprint arXiv:1406.6851},
  year   = {2014}
}
R2 v1 2026-06-22T04:47:53.756Z