论由理想定义的理想变换

Pub Date : 2022-11-15 DOI:10.54503/0002-3043-2022.57.6-62-69

Y. Sadegh, J. A’zami, S. Yazdani

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引用次数: 0

摘要

设$$R$$是一个交换诺瑟环，$$I$$是一个理想的$$R$$, $$M$$是一个$$R$$ -模块。$$I$$ -变换函子$$D_{I}(-)$$的二义性结构使得对其性质的研究具有吸引力。本文收集了$$D_{I}(R)$$和$$D_{I}(M)$$发挥一定作用的条件。在这些条件下证明$$D_{I}(R)$$是Cohen-Macaulay环，正则环，$$\cdots$$和$$D_{I}(M)$$可以看作是Noetherian, flat, $$\cdots R$$ -模。给出了$$D_{I}(M)$$零子模的一次分解和$$D_{I}(M)$$的二次表示。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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On the Ideal Transforms Defined by an Ideal

Abstract Let $$R$$ be a commutative Noetherian ring, $$I$$ an ideal of $$R$$ , and $$M$$ an $$R$$ -module. The ambiguous structure of $$I$$ -transform functor $$D_{I}(-)$$ makes the study of its properties attractive. In this paper we gather conditions under which $$D_{I}(R)$$ and $$D_{I}(M)$$ appear in certain roles. It is shown under these conditions that $$D_{I}(R)$$ is a Cohen–Macaulay ring, regular ring, $$\cdots$$ and $$D_{I}(M)$$ can be regarded as a Noetherian, flat, $$\cdots R$$ -module. We also present a primary decomposition of zero submodule of $$D_{I}(M)$$ and secondary representation of $$D_{I}(M)$$ .

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