Bornological Metrics on Groups
Abstract
Let be a countable group. We study left-invariant metrics on that are not necessarily proper, introducing the notion of a \emph{bornological metric}: a metric such that for every there exists with the property that implies for all . We show that each coarse equivalence class of bornological metrics is determined by a bornology on , and that every such class contains a canonical left-invariant representative. The metrizability of a bornology is characterized in terms of countable generation of the associated coarse structure, and a criterion for strong -invariance of a coarse structure is established. As an application, we construct families of improper left-invariant metrics on finitely generated groups that are pairwise non-equivalent and not coarsely equivalent to any proper left-invariant metric.
Keywords
Cite
@article{arxiv.2605.10997,
title = {Bornological Metrics on Groups},
author = {Andronick Arutyunov and Artem Perelygin},
journal= {arXiv preprint arXiv:2605.10997},
year = {2026}
}