Lee metrics on groups
Abstract
In this work we consider interval metrics on groups; that is, integral invariant metrics whose associated weight functions do not have gaps. We give conditions for a group to have and to have not interval metrics. Then we study Lee metrics on general groups, that is interval metrics having the finest unitary symmetric associated partition. These metrics generalize the classic Lee metric on cyclic groups. In the case that is a torsion-free group or a finite group of odd order, we prove that has a Lee metric if and only if is cyclic. Also, if is a group admitting Lee metrics then always have Lee metrics for every . Then, we show that some families of metacyclic groups, such as cyclic, dihedral, and dicyclic groups, always have Lee metrics. Finally, we give conditions for non-cyclic groups such that they do not have Lee metrics. We end with tables of all groups of order indicating which of them have (or have not) Lee metrics and why (not).
Cite
@article{arxiv.2206.04555,
title = {Lee metrics on groups},
author = {Ricardo A. Podestá and Maximiliano G. Vides},
journal= {arXiv preprint arXiv:2206.04555},
year = {2023}
}
Comments
26 pages, 5 tables