Localization of unique factorization semidomains
Commutative Algebra
2024-12-09 v1
Abstract
A semidomain is a subsemiring of an integral domain. Within this class, a unique factorization semidomain (UFS) is characterized by the property that every nonzero, nonunit element can be factored into a product of finitely many prime elements. In this paper, we investigate the localization of semidomains, focusing specifically on UFSs. We demonstrate that the localization of a UFS remains a UFS, leading to the conclusion that a UFS is either a unique factorization domain or is additively reduced. In addition, we provide an example of a subsemiring of such that and are both half-factorial, shedding light on a conjecture posed by Baeth, Chapman, and Gotti.
Cite
@article{arxiv.2412.05261,
title = {Localization of unique factorization semidomains},
author = {Victor Gonzalez and Harold Polo and Pedro Rodriguez},
journal= {arXiv preprint arXiv:2412.05261},
year = {2024}
}