Commutative rings with $n$-$1$-absorbing prime factorization
Commutative Algebra
2025-11-27 v1
Abstract
Let be a commutative ring with and be a fixed positive integer. A proper ideal of is said to be an \textit{-OA ideal} if whenever for some nonunits , then or . A commutative ring is said to be an \textit{-OAF ring} if every proper ideal of is a product of finitely many -OA ideals. In fact, -OAF rings and -OAF -OAF-rings are exactly the general ZPI rings and OAF rings, respectively. In addition to giving various properties of -OAF rings, we give a characterization of Noetherian von Neumann regular rings in terms of our new concept. Furthermore, we investigate the -OAF property of some extension of rings such as the polynomial ring , the formal power series ring , the ring of , and the trivial extension of an -module .
Cite
@article{arxiv.2511.21200,
title = {Commutative rings with $n$-$1$-absorbing prime factorization},
author = {Abdelhaq El Khalfi and Hicham Laarabi and Suat Koç},
journal= {arXiv preprint arXiv:2511.21200},
year = {2025}
}