Strongly Fully Stable Acts Relative to an Ideal

IF 0.4 Q4 MATHEMATICS

Missouri Journal of Mathematical Sciences Pub Date : 2020-05-01 DOI:10.35834/2020/3201110

A. K. Mutashar, H. Baanoon

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引用次数: 0

Abstract

The purpose of this paper is to introduce and investigate strongly fully stable acts relative to an ideal as a concept generalizing strongly fully stable modules relative to an ideal, but is stronger than that of fully stable acts. In this study, we consider some properties and characterizations of the class of strongly fully stable acts relative to an ideal, as well as the relations between this class and other classes. Among these classes are quasi-injective acts, strongly quasi-injective acts, acts which satisfy Baer's criterion, acts satisfying the strongly Baer's criterion, and duo acts. The product of strongly fully stable acts relative to an ideal need not be a strongly fully stable act relative to that ideal. The coproduct of any family of strongly fully stable acts relative to an ideal need not be a strongly fully stable act relative to that ideal. Also, we have that strongly fully stable acts relative to an ideal are equivalent to an $S$-act that satisfies the strongly Baer's criterion relative to an ideal $I$ for cyclic subacts. The strongly fully stable act relative to $I$ is equivalent to the strongly quasi-injective act relative to the ideal $I$ and duo act with a commutative monoid.

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相对于理想的强完全稳定的行为

本文的目的是引入和研究相对于理想的强完全稳定行为作为一个概念，推广相对于理想的强完全稳定模，但比完全稳定行为强。在本研究中，我们考虑了一类相对于理想的强完全稳定行为的一些性质和特征，以及这类行为与其他类行为的关系。这类行为包括拟单射行为、强拟单射行为、满足贝尔准则的行为、强贝尔准则的行为和双行为。相对于理想的完全稳定的行为的产物不一定是完全稳定的行为。任何一组相对于理想的强完全稳定行为的副积不一定是相对于理想的强完全稳定行为。同时，我们还得到了相对于理想的强完全稳定行为等价于一个满足循环子的相对于理想I强Baer准则的S -行为。相对于$I$的强完全稳定行为等价于相对于理想$I$的强拟内射行为和具有交换单群的二元行为。

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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来源期刊

Missouri Journal of Mathematical Sciences MATHEMATICS-

CiteScore

0.90

自引率

0.00%

发文量

期刊介绍： Missouri Journal of Mathematical Sciences (MJMS) publishes well-motivated original research articles as well as expository and survey articles of exceptional quality in mathematical sciences. A section of the MJMS is also devoted to interesting mathematical problems and solutions.