On $\phi$-Pr\"ufer like conditions
Commutative Algebra
2024-10-08 v1
Abstract
In this paper, we investigate the question of when a -ring is -Pr\"ufer using two types of techniques: first, by analysing the lattice structure of the nonnil ideals of -rings; and secondly, by considering content ideal techniques which were developed to study Gaussian polynomials. In particular, we conclude that every Gaussian -ring is -Pr\"ufer. Key concepts such as -weak global dimension, primary ideals and irreducible ideals are discussed, along with their hereditary properties in -Pr\"ufer rings. We also prove that any semi-local -Pr\"ufer ring is a -B\'ezout ring. This paper includes several theorems and examples that provide insights into the -Pr\"ufer rings and their implications in the field of ring theory.
Cite
@article{arxiv.2410.04181,
title = {On $\phi$-Pr\"ufer like conditions},
author = {Adam Anebri and Najib Mahdou and El Houssaine Oubouhou},
journal= {arXiv preprint arXiv:2410.04181},
year = {2024}
}