群作用度的界

IF 0.3 Q4 MATHEMATICS
S. Alrehaili, Charef Beddani
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引用次数: 0

摘要

交换度是从群中随机选择的一对元素进行交换的概率。交换度的概念已经被一些作者从多个方向广泛讨论。交换度的一个重要推广是来自有限群G的随机元素固定来自非空集S的随机元素的概率,我们称之为群的作用度。在本研究中,进一步研究了作用度的概念,其中确定了有限群作用度的一些不等式和界。此外,给出了有限群G和子群H的作用度之间的一般关系。其次,确定两个有限群的直积的作用度。以前,只定义了有限组的作用度,本研究将定义有限生成组的作用程度,并将确定它们的一些界限。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Bounds on the Action Degree of Groups
The commutativity degree is the probability that a pair of elements chosen randomly from a group commute. The concept of  commutativity degree has been widely discussed by several authors in many directions.  One of the important generalizations of commutativity degree is the probability that a random element from a finite group G fixes a random element from a non-empty set S that we call the action degree of groups. In this research, the concept of action degree is further studied where some inequalities and bounds on the action degree of finite groups are determined.  Moreover, a general relation between the action degree of a finite group G and a subgroup H is provided. Next, the action degree for the direct product of two finite groups is determined. Previously, the action degree was only defined for finite groups, the action degree for finitely generated groups will be defined in this research and some bounds on them are going to be determined.
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来源期刊
Matematika
Matematika MATHEMATICS-
自引率
25.00%
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0
审稿时长
24 weeks
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