On length densities
Abstract
For a commutative cancellative monoid , we introduce the notion of the length density of both a nonunit , denoted , and the entire monoid , denoted . This invariant is related to three widely studied invariants in the theory of non-unit factorizations, , , and . We consider some general properties of and and give a wide variety of examples using numerical semigroups, Puiseux monoids, and Krull monoids. While we give an example of a monoid with irrational length density, we show that if is finitely generated, then is rational and there is a nonunit element with (such a monoid is said to have accepted length density). While it is well-known that the much studied asymptotic versions of , and (denoted , , and ) always exist, we show the somewhat surprising result that may not exist. We also give some finiteness conditions on that force the existence of .
Keywords
Cite
@article{arxiv.2008.06725,
title = {On length densities},
author = {Scott T. Chapman and Christopher O'Neill and Vadim Ponomarenko},
journal= {arXiv preprint arXiv:2008.06725},
year = {2020}
}