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G是3-连通图,e是G中的一条边.若G-e是3-连通图的一个剖分,则称e是3-连通图的可去边.否则,e是G中不可去边.本给出3-连通3-正则图中生成树外可去边的分布情况及数目. 相似文献
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设e是3连通图G的一边。如果G-e是某个3连通图的剖分,则称e是G的可去边。用v表示G的顶点数,本文证明了当v≥6时,3连通平面图G的可去边数的下界是v+4/2,此下界是可以达到的。 相似文献
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6连通图中的可收缩边 总被引:4,自引:0,他引:4
Kriesell(2001年)猜想:如果κ连通图中任意两个相邻顶点的度的和至少是2[5κ/4]-1则图中有κ-可收缩边.本文证明每一个收缩临界6连通图中有两个相邻的度为6的顶点,由此推出该猜想对κ=6成立。 相似文献
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最近Ando等证明了在一个$k$($k\geq 5$ 是一个整数) 连通图 $G$ 中,如果 $\delta(G)\geq k+1$, 并且 $G$ 中既不含 $K^{-}_{5}$,也不含 $5K_{1}+P_{3}$, 则$G$ 中含有一条 $k$ 可收缩边.对此进行了推广,证明了在一个$k$连通图$G$中,如果 $\delta(G)\geq k+1$,并且 $G$ 中既不含$K_{2}+(\lfloor\frac{k-1}{2}\rfloor K_{1}\cup P_{3})$,也不含 $tK_{1}+P_{3}$ ($k,t$都是整数,且$t\geq 3$),则当 $k\geq 4t-7$ 时, $G$ 中含有一条 $k$ 可收缩边. 相似文献
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本文所讨论的图均为无向、有限简单图。文中没有指明的记号、术语见[3]。图G的欧拉生成子图是一条经过G的所有顶点的闭迹,以下简称S-闭迹。 相似文献
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m限制边割是连通图的一个边割,它将此图分离成阶不小于m的连通分支刻画了周长为4,不含3圈的m限制边割的图类. 相似文献
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图的最小特征值定义为图的邻接矩阵的最小特征值,是刻画图结构性质的一个重要代数参数. 在所有给定阶数的补图为2-点或2-边连通的图中, 刻画了最小特征值达到极小的唯一图, 并给出了这类图最小特征值的下界. 相似文献
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The edge-face chromatic number Xef (G) of a plane graph G is the least number of colors assigned to the edges and faces such that every adjacent or incident pair of them receives different colors. In this article, the authors prove that every 2-connected plane graph G with△(G)≥|G| -2△9 has Xef(G)=△(G). 相似文献
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Let Sn be the symmetric group,g+I=(123i),g-I=(1i32) and M+n={g+I:4≤I≤n},then M+n is a minimal generating set of Sn,where n≥5.It is proved that Cayley graph Cay(Sn,M+n∪M-n) is Hamiltonian and edge symmetric. 相似文献
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Kiyoshi Ando 《Journal of Graph Theory》2009,60(2):99-129
An edge of a 5‐connected graph is said to be contractible if the contraction of the edge results in a 5‐connected graph. Let x be a vertex of a 5‐connected graph. We prove that if there are no contractible edges whose distance from x is two or less, then either there are two triangles with x in common each of which has a distinct degree five vertex other than x, or there is a specified structure called a K4?‐configuration with center x. As a corollary, we show that if a 5‐connected graph on n vertices has no contractible edges, then it has 2n/5 vertices of degree 5. © 2008 Wiley Periodicals, Inc. J Graph Theory 60: 99–129, 2009 相似文献
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1.IntroductionAgraphG=(V,E)meansafinitegraphwithoutloopsandmultipleedgeswithvertexsetVandedgesetE,theclassicaledgeconnectivityA(G)ofGistheminimumsizeofasetUofedgessuchthatG--Uisdisconnected,andsuchasetUiscalledaoutsetofG.Notethatintheabovedefinition,absolutelynoconditionsorrestrictionsareimposedeitheronthecomponelltsofG--UoronthesetU.ThusitwouldseemnaturaltogeneralizetheconceptofedgeconnectivitybyintroducingsomeconditionsorrestrictionsonthecomponentsofG--Uand/orthesetU.Asageneralizatio… 相似文献
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Zhang Shenggui Sun Hao Li Xueliang .Dept.of Appl. Math. Northwestern Polytechnical Univ. Xi''''an China. .Center of Combinatorics Nankai Univ. Tianjin China. 《高校应用数学学报(英文版)》2002,(3)
§ 1 IntroductionAll graphsconsidered in this paperare finite undirected ones withoutloops ormultipleedges.Our terminology and notation are standard exceptas indicated.A good reference forany undefined terms is[1 ] .Let G be a graph with vertex set V( G) and edge set E( G) .The density of G is definedbyd( G) =ε( G)ν( G) ,whereν( G) andε( G) denote| V( G) | and| E( G) | ,respectively.G is said to be balanced iffor each subgraph H of G we have d( H )≤ d( G) ,where V( H ) is assum… 相似文献