与二面体群相关的两类图的统治多项式的一般形式

IF 0.3 Q4 MATHEMATICS Matematika Pub Date : 2019-07-31 DOI:10.11113/MATEMATIKA.V35.N2.1106
Nabilah Najmuddin, N. Sarmin, A. Erfanian
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引用次数: 0

摘要

支配多项式是一种图多项式,其中它的系数表示图中支配集的数量。关于一些常见类型图的控制多项式,目前已有很多研究,但对于有限群的图,还没有研究。与有限群相关的两类图是共轭图和共轭类图。群G的图称为共轭图,如果顶点是G的非中心元素,并且两个不同的顶点是相邻的,如果它们彼此共轭。同时,群G的共轭类图是一个图,其中它的顶点是G的非中心共轭类,并且两个不同的顶点是连通的,当且仅当它们的类基数不是互质的。二面体群的共轭和共轭类图一般可以表示为一些顶点上的完全图的并集。本文计算了二面体群的共轭和共轭类图的控制多项式。
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General Form of Domination Polynomial for Two Types of Graphs Associated to Dihedral Groups
A domination polynomial is a type of graph polynomial in which its coefficients represent the number of dominating sets in the graph. There are many researches being done on the domination polynomial of some common types of graphs but not yet for graphs associated to finite groups. Two types of graphs associated to finite groups are the conjugate graph and the conjugacy class graph. A graph of a group G is called a conjugate graph if the vertices are non-central elements of G and two distinct vertices are adjacent if they are conjugate to each other. Meanwhile, a conjugacy class graph of a group G is a graph in which its vertices are the non-central conjugacy classes of G and two distinct vertices are connected if and only if their class cardinalities are not coprime. The conjugate and conjugacy class graph of dihedral groups can be expressed generally as a union of complete graphs on some vertices. In this paper, the domination polynomials are computed for the conjugate and conjugacy class graphs of the dihedral groups.
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Matematika
Matematika MATHEMATICS-
自引率
25.00%
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0
审稿时长
24 weeks
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