About the Closed Quasi Injective S-Acts Over Monoids

IF 0.2 Q4 MATHEMATICS
S. Abdul-Kareem, A. A. Abdulkareem
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引用次数: 3

Abstract

The aim of introducing and studying the notion of closed quasi injective S-act is to create a basis facilitate for the exchange ideas between module theory and act theory. As well as it represents a generalization of the quasi-injective act. The quasi-injective act was first introduced and studied by A. M. Lopez, Jr. and J. K. Luedeman, 1979. Then the author was one of the researchers which introduced several generalizations for this notion from several aspects because of its importance. More accurately, the contribution of this paper to the field of competence can be summarized into three points as follows: First: The possibilities for applying the topic of this article helps researchers about how can connect class of injectivity with its generalizations. Second: Study the topic of this article contributes to the improvement of the vision for finding the corresponding between acts theory and module theory. Third: This article has dealt with the important subject in the field of science and knowledge especially in algebra and can take it as a basis for future work for the researchers who work on algebra. Now, in this paper, the concept of closed quasi injective acts over monoids is introduced which represents a generalization of quasi injective. Several characterizations of this concept are given to show the behavior of the property of closed quasi injective. Relationship of the concept of closed quasi injective acts over monoids with Hopfian, co-Hopfian and directly finite property are considered. This work gives the answer to the question of what are the conditions to be met in the subacts in order to inherit the property of closed quasi injectivity. We obtained the main result in this direction in proposition (2.5) and proposition (2.6). A part of this paper was devoted to studying the relationship among the class of closed quasi injective acts with some generalizations of injectivity.
关于模群上闭拟内射s -行为
本文引入和研究闭拟内射s -行为的概念,目的是为模块理论与行为理论的思想交流创造一个基础。同时它也代表了拟单射行为的一种推广。拟内射行为最早是由A. M. Lopez, Jr.和J. K. Luedeman(1979)提出并研究的。由于这一概念的重要性,笔者从几个方面对其进行了一些概括。更准确地说,本文对能力领域的贡献可以概括为以下三点:第一:应用本文主题的可能性有助于研究人员如何将注入性类别与其概括联系起来。第二:研究本文的课题有助于提高视野,找到行为理论与模块理论之间的对应关系。第三,本文论述了科学和知识领域特别是代数领域的重要课题,可以作为今后代数研究者工作的基础。本文引入了模群上闭拟内射的概念,它是拟内射的推广。给出了这一概念的几个刻画,以证明闭拟内射性质的行为。考虑了具有Hopfian、协Hopfian和直接有限性质的模群上闭拟内射行为的概念之间的关系。这一工作给出了为了继承闭拟注入的性质,在主体中需要满足什么条件的问题的答案。我们在命题(2.5)和命题(2.6)中得到了这个方向的主要结果。本文用一些关于内射的推广研究了一类闭拟内射行为之间的关系。
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
CiteScore
0.60
自引率
0.00%
发文量
2
期刊介绍: The “Italian Journal of Pure and Applied Mathematics” publishes original research works containing significant results in the field of pure and applied mathematics.
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