关于 $FP_{n}$ 投射模块的一些评论

arXiv - MATH - Rings and Algebras Pub Date : 2024-09-12 DOI:arxiv-2409.08334

Viviana Gubitosi, Rafael Parra

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引用次数: 0

摘要

让 $R$ 是一个环。在《{MD4}中中，Mao 和 Ding 定义了一类特殊的 $R$ 模块，他们称之为 $ FP_n $-projective $R$ 模块。本文给出了 $ FP_n $-投影$R$模块和强$n$相干环的一些新特征。本文扩展了一些已知结果，并得到了以（ FP_n \ ）投影 $R$ 模块为单位的（ FP_n \ ）投影全维的一些新特征。利用欧阳、段和李在 \cite{Ouy} 中定义的 $R$ 模块的（\( FP_n \）-投影维度，我们引入了一个稍有不同的环 $R$ 上的（\( FP_n \）-投影全局维度，它可以度量环离诺特环有多远。当相关的环是强 $n$ 相干的时候，这个维度与 \cite{Ouy} 的 $(n,0)$ 投射全局维度一致。

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Some remarks about $FP_{n}$-projectives modules

Let $R$ be a ring. In \cite{MD4} Mao and Ding defined an special class of $R$-modules that they called $ FP_n $-projective $R$-modules. In this paper, we give some new characterizations of $ FP_n $-projective $R$-modules and strong $n$-coherent rings. Some known results are extended and some new characterizations of the $ FP_n $-injective global dimension in terms of $ FP_n $-projective $R$-modules are obtained. Using the $ FP_n $-projective dimension of an $R$-module defined by Ouyang, Duan and Li in \cite{Ouy} we introduce a slightly different $ FP_n $-projective global dimension over the ring $R$ which measures how far away the ring is from being Noetherian. This dimension agrees with the $(n,0)$-projective global dimension of \cite{Ouy} when the ring in question is strong $n$-coherent.

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arXiv - MATH - Rings and Algebras

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