共查询到20条相似文献,搜索用时 62 毫秒
1.
消去图、覆盖图和均匀图的若干结果 总被引:2,自引:0,他引:2
设 G是一个图 ,g,f是定义在图 G的顶点集上的两个整数值函数 ,且g≤f.图 G的一个 ( g,f) -因子是 G的一个支撑子图 F,使对任意的 x∈V( F)有g( x)≤ d F( x)≤ f ( x) .文中推广了 ( g,f) -消去图、( g,f ) -覆盖图和 ( g,f) -均匀图的概念 ,给出了在 g相似文献
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孙荣国 《高校应用数学学报(A辑)》1994,(3):335-337
本文给出了书本图B2m的m种不同的相继标号和B4m+1的m种不同的相继标号。因而,书本图Bm是相继图的充分条件为:m>1且m≠(3mod4)。这一条件也是书本图Bm是协调图的充要条件。 相似文献
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(a,b,k)—临界图 总被引:1,自引:0,他引:1
设G是一个图且设a,b是非负整数,a〈b。如果消去G的任意k个顶点剩下的图有〔a,b〕因子,则称图G是(a,b,k)-临界图。本文给出了一个图是(a,b,k)-临界图的一个充分必要条件。讨论了该条件的一些应用,研究了(a,b,k)-临界图的性质。 相似文献
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设 G是一个图 ,用 V(G)和 E(G)表示它的顶点集和边集 ,并设 g和 f是定义在 V(G)上的两个整数值函数且 g 相似文献
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双随机矩阵有许多重要的应用, 紧图族可以看作是组合矩阵论中关于双随机矩阵的著名的Birkhoff定理的拓广,具有重要的研究价值. 确定一个图是否紧图是个困难的问题,目前已知的紧图族尚且不多.给出了两个重要结果:任意紧图与任意多个孤立点的不交并是紧图;任意紧图的每一个顶点上各增加一条悬挂边的图是紧图. 利用这两个结果,从已知紧图可构造出无穷多个紧图族. 相似文献
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Bubble-Sort图和Modified Bubble-Sort图是两类特殊的Cayley图,由于其在网络构建中的应用而受到广泛关注.本文完全确定了这两类图的自同构群. 相似文献
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Jin-xin ZHOU & Yan-quan FENG Department of Mathematics Beijing Jiaotong University Beijing China 《中国科学A辑(英文版)》2007,50(2):201-216
A Cayley graph Cay(G, S) on a group G is said to be normal if the right regular representation R(G) of G is normal in the full automorphism group of Cay(G, S). In this paper, two sufficient conditions for non-normal Cayley graphs are given and by using the conditions, five infinite families of connected non-normal Cayley graphs are constructed. As an application, all connected non-normal Cayley graphs of valency 5 on A5 are determined, which generalizes a result about the normality of Cayley graphs of valency 3 or 4 on A5 determined by Xu and Xu. Further, we classify all non-CI Cayley graphs of valency 5 on A5, while Xu et al. have proved that As is a 4-CI group. 相似文献
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Richard Goldstone 《Discrete Mathematics》2010,310(21):2806-2810
We define a group G to be graphically abelian if the function g?g−1 induces an automorphism of every Cayley graph of G. We give equivalent characterizations of graphically abelian groups, note features of the adjacency matrices for Cayley graphs of graphically abelian groups, and show that a non-abelian group G is graphically abelian if and only if G=E×Q, where E is an elementary abelian 2-group and Q is a quaternion group. 相似文献
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Yan Quan FENG Ming Yao XU 《数学学报(英文版)》2005,21(4):903-912
Let p be an odd prime. In this paper we prove that all tetravalent connected Cayley graphs of order p^3 are normal. As an application, a classification of tetravalent symmetric graphs of odd prime-cube order is given. 相似文献
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二面体群D_(2n)的4度正规Cayley图 总被引:4,自引:0,他引:4
设G是有限群,S是G的不包含单位元1的非空子集.定义群G关于S的 Cayley(有向)图X=Cay(G,S)如下:V(x)=G,E(X)={(g,sg)|g∈G,s∈S}. Cayley图X=Cay(G,S)称为正规的如果R(G)在它的全自同构群中正规.图X称为1-正则的如果它的全自同构群在它的弧集上正则作用.本文对二面体群D2n以Z22 为点稳定子的4度正规Cayley图进行了分类. 相似文献
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李学文 《数学的实践与认识》2005,35(8):233-238
群G关于S的有向Cayley图X=Cay(G,S)称为pk阶有向循环图,若G是pk阶循环群.利用有限群论和图论的较深刻的结果,对p2阶弧传递(有向)循环图的正规性条件进行了讨论,证明了任一p2阶弧传递(有向)循环图是正规的当且仅当(|Aut(G,S)|,p)=1. 相似文献
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On the Classification of Arc-transitive Circulant Digraphs of Order Odd-Prime-Squared 总被引:1,自引:0,他引:1
Xue Wen LI 《数学学报(英文版)》2005,21(5):1131-1136
A Cayley graph F = Cay(G, S) of a group G with respect to S is called a circulant digraph of order pk if G is a cyclic group of the same order. Investigated in this paper are the normality conditions for arc-transitive circulant (di)graphs of order p^2 and the classification of all such graphs. It is proved that any connected arc-transitive circulant digraph of order p^2 is, up to a graph isomorphism, either Kp2, G(p^2,r), or G(p,r)[pK1], where r|p- 1. 相似文献
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LetG be a finite group and let S be a nonempty subset of G not containing the identity element 1. The Cayley (di) graph X = Cay(G,
S) of G with respect to S is defined byV (X)=G, E (X)={(g,sg)|g∈G, s∈S} A Cayley (di) graph X = Cay (G,S) is said to be normal ifR(G) ◃A = Aut (X). A group G is said to have a normal Cayley (di) graph if G has a subset S such that the Cayley (di) graph X = Cay (G, S)
is normal. It is proved that every finite group G has a normal Cayley graph unlessG≅ℤ4×ℤ2 orG≅Q
8×ℤ
2
r
(r⩾0) and that every finite group has a normal Cayley digraph, where Zm is the cyclic group of orderm and Q8 is the quaternion group of order 8.
Project supported by the National Natural Science Foundation of China (Grant No. 10231060) and the Doctorial Program Foundation of Institutions of Higher Education of China. 相似文献
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GUO Dachang 《系统科学与数学》2000,13(1)
Let G be a finite group and S a subset of G not containing the identity element 1. We define the Cayley (di)graph X = Cay(G, S) of G with respect to S by V(X) = G,E(X) = {(g, sg) [ g ∈ G, s ∈ S}. A Cayley (di)graph X = Cay(G, S) is called normal if GR A = Aut(X). In this paper we prove that if S = {a, b, c} is a 3-generating subset of G = A5 not containing the identity 1, then X = Cay(G, S) is a normal Cayley digraph. 相似文献
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群G的一个Cayley图X=Cay(G,S)称为正规的,如果右乘变换群R(G)在AutX中正规.研究了4m阶拟二面体群G=a,b|a~(2m)=b~2=1,a~b=a~(m+1)的4度Cayley图的正规性,其中m=2~r,且r2,并得到拟二面体群的Cayley图的同构类型. 相似文献
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Edward Dobson 《Discrete Mathematics》2008,308(24):6047-6055
C.H. Li recently made the following conjecture: Let Γ be a circulant digraph of order n=n1n2 and degree m, where gcd(n1,n2)=1, n1 divides 4k, where k is odd and square-free, and every prime divisor of n2 is greater than m, or, if Γ is a circulant graph, every prime divisor of n2 is greater than 2m. Then Γ is a CI-digraph of Zn. In this paper we verify that this conjecture is true. 相似文献