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Main Author: Kudryakov, Dmitry
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2501.05940
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author Kudryakov, Dmitry
author_facet Kudryakov, Dmitry
contents The rank of a ring $R$ is the supremum of minimal cardinalities of generating sets of $I$, among all ideals $I$ in $R$. In this paper, we obtain a characterization of Noetherian rings $R$ whose rank is not equal to the supremum of ranks of localizations of $R$ at maximal ideals. It turns out that any such ring is a direct product of a finite number of local principal Artinian rings and Dedekind domains, at least one of which is not a principal ideal ring. As an application, we show that the rank of the ring of polynomials over an Artinian ring can be computed locally.
format Preprint
id arxiv_https___arxiv_org_abs_2501_05940
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Noetherian rings of non-local rank
Kudryakov, Dmitry
Commutative Algebra
13E05, 13E15
The rank of a ring $R$ is the supremum of minimal cardinalities of generating sets of $I$, among all ideals $I$ in $R$. In this paper, we obtain a characterization of Noetherian rings $R$ whose rank is not equal to the supremum of ranks of localizations of $R$ at maximal ideals. It turns out that any such ring is a direct product of a finite number of local principal Artinian rings and Dedekind domains, at least one of which is not a principal ideal ring. As an application, we show that the rank of the ring of polynomials over an Artinian ring can be computed locally.
title Noetherian rings of non-local rank
topic Commutative Algebra
13E05, 13E15
url https://arxiv.org/abs/2501.05940