广义四元数群的耗尽数

IF 0.5 Q3 MATHEMATICS
H. V. Chen, C. S. Sin
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引用次数: 0

摘要

设G是一个有限群,设T是G的非空子集。对于任何正整数k,设Tk={t1…TkÜt1,…,Tk∈T}。如果对于某个正整数n,其中最小的正整数n存在,则集合T被称为穷举,使得Tn=G被称为T的穷举数,并且由e(T)表示。如果对于任何正整数k,Tk≠G,则T是一个非穷举子集,我们写e(T)=∞。在本文中,我们研究了广义四元数群Q2n=⟨x,yŞx2n−1=1,x2n−2=y2,yx=x2n−1−1y⟩的子集的穷举数,其中n≥3。我们证明Q2n不具有大小为2的穷举子集,并且使得大小大于或等于k的任何子集T⊆Q2n穷举的最小正整数k是2n−1+1。我们还证明了对于任何整数k∈{3,…,2n},存在Q2n的穷举子集T,使得|T|=k。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The Exhaustion Numbers of the Generalized Quaternion Groups
Let G be a finite group and let T be a non-empty subset of G. For any positive integer k, let Tk={t1…tk∣t1,…,tk∈T}. The set T is called exhaustive if Tn=G for some positive integer n where the smallest positive integer n, if it exists, such that Tn=G is called the exhaustion number of T and is denoted by e(T). If Tk≠G for any positive integer k, then T is a non-exhaustive subset and we write e(T)=∞. In this paper, we investigate the exhaustion numbers of subsets of the generalized quaternion group Q2n=⟨x, y∣x2n−1=1, x2n−2=y2, yx=x2n−1−1y⟩ where n≥3. We show that Q2n has no exhaustive subsets of size 2 and that the smallest positive integer k such that any subset T⊆Q2n of size greater than or equal to k is exhaustive is 2n−1+1. We also show that for any integer k∈{3,…,2n}, there exists an exhaustive subset T of Q2n such that |T|=k .
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来源期刊
CiteScore
1.10
自引率
20.00%
发文量
0
期刊介绍: The Research Bulletin of Institute for Mathematical Research (MathDigest) publishes light expository articles on mathematical sciences and research abstracts. It is published twice yearly by the Institute for Mathematical Research, Universiti Putra Malaysia. MathDigest is targeted at mathematically informed general readers on research of interest to the Institute. Articles are sought by invitation to the members, visitors and friends of the Institute. MathDigest also includes abstracts of thesis by postgraduate students of the Institute.
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