回复级数环上的级数弱强准主理想

IF 2.3 3区数学 Q1 MATHEMATICS Mathematics Pub Date : 2024-09-14 DOI:10.3390/math12182857

Azzh Saad Alshehry, Rashid Abu-Dawwas, Basel Hawary

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引用次数: 0

摘要

本文将介绍并研究有级弱强准原初理想的概念。如果对于一些同质元素 x,y∈R 而言，当 0≠xy∈P 时，那么对于一些正整数 n 而言，x2∈P 或 yn∈P 时，我们称 R 的一个适当的有级理想 P 为有级弱强准原初（简称为 Gwsq-原初）理想。在几个结果中，我们比较了 Gwsq-原初理想和其他经典有级理想，如有级强准原初理想、有级弱原初理想和有级弱 2-prime 理想等。

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Graded Weakly Strongly Quasi-Primary Ideals over Commutative Graded Rings

In this article, we introduce and examine the concept of graded weakly strongly quasi primary ideals. A proper graded ideal P of R is said to be a graded weakly strongly quasi primary (shortly, Gwsq-primary) ideal if whenever 0≠xy∈P, for some homogeneous elements x,y∈R, then x2∈P or yn∈P, for some positive integer n. Many examples and properties of Gwsq-primary ideals are given. Among several results, we compare Gwsq-primary ideals and other classical graded ideals such as graded strongly quasi primary ideals, graded weakly primary ideals and graded weakly 2-prime ideals etc.

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来源期刊

Mathematics Mathematics-General Mathematics

CiteScore

4.00

自引率

16.70%

发文量

4032

审稿时长

21.9 days

期刊介绍： Mathematics (ISSN 2227-7390) is an international, open access journal which provides an advanced forum for studies related to mathematical sciences. It devotes exclusively to the publication of high-quality reviews, regular research papers and short communications in all areas of pure and applied mathematics. Mathematics also publishes timely and thorough survey articles on current trends, new theoretical techniques, novel ideas and new mathematical tools in different branches of mathematics.