English

Bounded and finite factorization domains

Commutative Algebra 2020-10-07 v1

Abstract

An integral domain is atomic if every nonzero nonunit factors into irreducibles. Let RR be an integral domain. We say that RR is a bounded factorization domain if it is atomic and for every nonzero nonunit xRx \in R, there is a positive integer NN such that for any factorization x=a1anx = a_1 \cdots a_n of xx into irreducibles a1,,ana_1, \dots, a_n in RR, the inequality nNn \le N holds. In addition, we say that RR is a finite factorization domain if it is atomic and every nonzero nonunit in RR factors into irreducibles in only finitely many ways (up to order and associates). The notions of bounded and finite factorization domains were introduced by D. D. Anderson, D. F. Anderson, and M. Zafrullah in their systematic study of factorization in atomic integral domains. Here we provide a survey of some of the most relevant results on bounded and finite factorization domains.

Cite

@article{arxiv.2010.02722,
  title  = {Bounded and finite factorization domains},
  author = {David F. Anderson and Felix Gotti},
  journal= {arXiv preprint arXiv:2010.02722},
  year   = {2020}
}

Comments

40 pages

R2 v1 2026-06-23T19:05:14.124Z