English

On transfer Krull monoids

Commutative Algebra 2021-09-13 v1

Abstract

Let HH be a cancellative commutative monoid, let A(H)\mathcal{A}(H) be the set of atoms of HH and let H~\widetilde{H} be the root closure of HH. Then HH is called transfer Krull if there exists a transfer homomorphism from HH into a Krull monoid. It is well known that both half-factorial monoids and Krull monoids are transfer Krull monoids. In spite of many examples and counter examples of transfer Krull monoids (that are neither Krull nor half-factorial), transfer Krull monoids have not been studied systematically (so far) as objects on their own. The main goal of the present paper is to attempt the first in-depth study of transfer Krull monoids. We investigate how the root closure of a monoid can affect the transfer Krull property and under what circumstances transfer Krull monoids have to be half-factorial or Krull. In particular, we show that if H~\widetilde{H} is a DVM, then HH is transfer Krull if and only if HH~H\subseteq\widetilde{H} is inert. Moreover, we prove that if H~\widetilde{H} is factorial, then HH is transfer Krull if and only if A(H~)={uεuA(H),εH~×}\mathcal{A}(\widetilde{H})=\{u\varepsilon\mid u\in\mathcal{A}(H),\varepsilon\in\widetilde{H}^{\times}\}. We also show that if H~\widetilde{H} is half-factorial, then HH is transfer Krull if and only if A(H)A(H~)\mathcal{A}(H)\subseteq\mathcal{A}(\widetilde{H}). Finally, we point out that characterizing the transfer Krull property is more intricate for monoids whose root closure is Krull. This is done by providing a series of counterexamples involving reduced affine monoids.

Cite

@article{arxiv.2109.04764,
  title  = {On transfer Krull monoids},
  author = {Aqsa Bashir and Andreas Reinhart},
  journal= {arXiv preprint arXiv:2109.04764},
  year   = {2021}
}
R2 v1 2026-06-24T05:51:17.190Z