The quasi-Zariski topology on the graded quasi-primary spectrum of a graded module over a graded commutative ring

IF 0.8 4区数学 Q2 MATHEMATICS Georgian Mathematical Journal Pub Date : 2023-10-04 DOI:10.1515/gmj-2023-2075

Malik Jaradat, Khaldoun Al-Zoubi

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引用次数: 1

Abstract

Abstract Let G be a group. Let R be a G -graded commutative ring and let M be a graded R -module. A proper graded submodule Q of M is called a graded quasi-primary submodule if whenever r ∈ h ⁢ ( R ) {r\in h(R)} and m ∈ h ⁢ ( M ) {m\in h(M)} with r ⁢ m ∈ Q {rm\in Q} , then either r ∈ Gr ( ( Q : R M ) ) {r\in\operatorname{Gr}((Q:_{R}M))} or m ∈ Gr M ⁡ ( Q ) {m\in\operatorname{Gr}_{M}(Q)} . The graded quasi-primary spectrum qp . Spec g ( M ) {\mathop{\rm qp.Spec}\nolimits_{g}(M)} is defined to be the set of all graded quasi-primary submodules of M . In this paper, we introduce and study a topology on qp . Spec g ( M ) {\mathop{\rm qp.Spec}\nolimits_{g}(M)} , called the quasi-Zariski topology, and investigate the properties of this topology and some conditions under which ( qp . Spec g ( M ) , q . τ g ) {(\mathop{\rm qp.Spec}\nolimits_{g}(M),q.\tau^{g})} is a Noetherian, spectral space.

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渐变交换环上渐变模的渐变拟初级谱上的拟zariski拓扑

设G是一个群。设R是一个G梯度交换环，M是一个梯度R模。当r∈h≠(r) {r\in h(r)}且M∈h≠(M) {M \in h(M)}且r∈M∈Q {rm\in Q}时，则r∈Gr ((Q: rm\in Q)) {r\in\operatorname{Gr}((Q:_{r} M))}或M∈Gr M∈(Q) {M \in\operatorname{Gr}_{M}(Q)}，则M∈Gr M∈(Q) {M \in\operatorname{Gr} {M}(Q)}。渐变准初级谱qp。定义Spec g (M) {\mathop{\rm qp.Spec}\nolimits_{g}(M)}是M的所有分级拟主子模的集合。本文介绍并研究了qp上的一种拓扑结构。Spec g (M) {\mathop{\rm qp.Spec}\nolimits_{g}(M)}，称为准zariski拓扑，并研究了该拓扑的性质以及(qp.Spec)Spec g (M)， q。τ g) {(\mathop{\rm qp.Spec}\nolimits_{g}(M)，q.\tau^{g})}是一个诺瑟谱空间。

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来源期刊

Georgian Mathematical Journal 数学-数学

CiteScore

1.70

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Georgian Mathematical Journal was founded by the Georgian National Academy of Sciences and A. Razmadze Mathematical Institute, and is jointly produced with De Gruyter. The concern of this international journal is the publication of research articles of best scientific standard in pure and applied mathematics. Special emphasis is put on the presentation of results obtained by Georgian mathematicians.

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