连通的欧拉生成子图

本文证明了：若G是一个p顶点的、2－边－连通简单图，其边数，q≥(p-4↑ 2) 7，则除K2，5外，G有连通的欧拉生成子图。当q=(p-r↑ 2）＋6和κ′（G）＝2时，本文给出了全部6个极图。     

平衡子欧拉符号图及符号线图

符号图$S=(S^u,\sigma)$是以$S^u$作为底图并且满足$\sigma: E(S^u)\rightarrow\{+,-\}$. 设$E^-(S)$表示$S$的负边集. 如果$S^u$是欧拉的(或者分别是子欧拉的, 欧拉的且$|E^-(S)|$是偶数, 则$S$是欧拉符号图(或者分别是子欧拉符号图, 平衡欧拉符号图). 如果存在平衡欧拉符号图$S''$使得$S''$由$S$生成, 则$S$是平衡子欧拉符号图. 符号图$S$的线图$L(S)$也是一个符号图, 使得$L(S)$的点是$S$中的边, 其中$e_ie_j$是$L(S)$中的边当且仅当$e_i$和$e_j$在$S$中相邻,并且$e_ie_j$是$L(S)$中的负边当且仅当$e_i$和$e_j$在$S$中都是负边. 本文给出了两个符号图族$S$和$S''$,它们应用于刻画平衡子欧拉符号图和平衡子欧拉符号线图. 特别地, 本文证明了符号图$S$是平衡子欧拉的当且仅当$\not\in S$, $S$的符号线图是平衡子欧拉的当且仅当$S\not\in S''$.     

第一类图的一个充分条件

图G的一个k-边染色是一个映射ψ:E(G)→{1,2…k},使得每一对相邻边x和y,有ψ(x)≠ψ(y,).G的边色数χ'(G)是使得G有一个k-边染色的最小的整数k.本文证明了:如果G是一个最大度为6能嵌入到欧拉示性数非负的曲面的图,且满足下列条件之一,那么χ'(G)=6:(1)不含带弦4-圈;(2)同时不含带弦5-圈和带弦6-圈.     

一类用于寻找欧拉生成子图边数的收缩子图

结合可折叠子图给出了可折叠α-子图的概念,得到可折叠α-子图一定为α-子图,并得到可折叠α-子图的顶点有交且边不交的并仍为可折叠α-子图.同时得到至多差1边具有3棵边不交的生成树的图和K_(l,m)(l≥3,m≥3)均是可折叠2/3-子图,并给出其在寻找欧拉生成子图极大边数的应用,同时也得到了一种寻找α-子图的方法.     

超欧拉图、可折叠图及匹配

如果图G有一个生成的欧拉子图,则称G是超欧拉图.用α′(G)表示G中最大独立的边的数目.本文证明了:若G是一个2-边连通简单图且α′(G)≤2,则G要么是可折叠图,要么存在G的某个连通子图H,使得对某个正整数t≥2,约化图G/H是K_(2.t.)推广了[Lai H J,Yan H.Supereulerian graphs and matchings.Appl.Math.Lett.,2011,24:1867-1869]中的一个主要结果.并且证明了上述文献中提出的一个猜想:3一边连通且α′(G)≤5的简单图是超欧拉图当且仅当它不可收缩成Petersen图.     

含有欧拉生成子图的3边连通图

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。     

最小次数至少为4的超欧拉图

设Ｇ是２－边－连通的ｎ阶图。假设对任何的的最小边割集Ｅ等于包含于Ｅ（Ｇ）且│Ｅ│≤３,Ｇ－Ｅ的每个分支的阶至少为ｎ／５,则或者Ｇ是一个超欧拉图或者Ｇ有５个互不相交的阶数为ｎ／５连通分支,当这５个分支都收缩时,Ｇ收缩为Ｋ２,３,这个结果推广了蔡小涛,Ｐ．Ａ．Ｃａｔｌｉｎ,Ｆ．Ｊａｅｇｅｒ和Ｈ．Ｊ．Ｌａｉ等人关于超欧拉图的结果。     

1-可嵌入曲面的图的边染色北大核心CSCD

一个图称为是1-可嵌入曲面的,当且仅当它可以画在一个曲面上,使得它的任何一条边最多交叉另外一条边.x′(G)和△(G)分别表示图G的边色数和最大度.给定图G是1-可嵌入到欧拉示性数x(∑)≥0的曲面∑上的图.如果△(G)≥8且不含4-圈或者△(G)≥7且围长g(G)≥4,则图G满足等式△(G)=x′(G),其中,g(G)表示图G中最短圈的长度.     

嵌入曲面的特殊图的边染色

设图G是嵌入到欧拉示性数χ(∑)≥0的曲面上的图,χ′(G)和△(G)分别表示图G的边色数和最大度.将证明如果G满足以下条件:1)△(G)≥5;2)图中3-圈和4-圈不相邻;3)图G中没有5-圈的一次剖分,则有χ′(G)=△(G).     

连通的欧拉生成子图

本文证明了:若 G 是一个 p 个顶点的、2-边-连通简单图,其边数,q≥((p-4)/2)+7.则除 K_(2,5)外,G 有连通的欧拉生成子图.当 q=((p-4)/4)+6和 k(G)=2时,本文给出了全部6个极图.     

A note on minimum degree conditions for supereulerian graphs

A graph is called supereulerian if it has a spanning closed trail. Let G be a 2-edge-connected graph of order n such that each minimal edge cut SE(G) with |S|3 satisfies the property that each component of G−S has order at least (n−2)/5. We prove that either G is supereulerian or G belongs to one of two classes of exceptional graphs. Our results slightly improve earlier results of Catlin and Li. Furthermore, our main result implies the following strengthening of a theorem of Lai within the class of graphs with minimum degree δ4: If G is a 2-edge-connected graph of order n with δ(G)4 such that for every edge xyE(G) , we have max{d(x),d(y)}(n−2)/5−1, then either G is supereulerian or G belongs to one of two classes of exceptional graphs. We show that the condition δ(G)4 cannot be relaxed.     

Graphs without spanning closed trails

Jaeger (1979) proved that if a graph has two edge-disjoint spanning trees, then it is supereulerian, i.e., that it has a spanning closed trail. Catlin (1988) showed that if G is one edge short of having two edge-disjoint spanning trees, then G has a cut edge or G is supereulerian. Catlin conjectured that if a connected graph G is at most two edges short of having two edge-disjoint spanning trees, then either G is supereulerian or G can be contracted to a K₂ or a K_2,t for some odd integer t 1. We prove Catlin's conjecture in a more general context. Applications to spanning trails are discussed.     

Supereulerian graphs and the Petersen graph

A graphG is supereulerian if G has a spanning eulerian subgraph.Boesch et al.[J.Graph Theory,1,79–84(1977)]proposed the problem of characterizing supereulerian graphs.In this paper,we prove that any 3-edge-connected graph with at most 11 edge-cuts of size 3 is supereulerian if and only if it cannot be contractible to the Petersen graph.This extends a former result of Catlin and Lai[J.Combin.Theory,Ser.B,66,123–139(1996)].     

关于k—消去图的若干新结果

设G是一个图．k是自然数．图G的一个k-正则支撑子图称为G的一个k-因子．若对于G的每条边e．G—e都存在一个k-因子，则称G是一个k-消去图．该文得到了一个图是k-消去图的若干充分条件，推广了文［2—4］中有关结论．     

Supereulerian graphs: A survey

A graph is supereulerian if it has a spanning eulerian subgraph. There is a rduction method to determine whether a graph is supereulerian, and it can also be applied to study other concepts, e.g., hamiltonian line graphs, a certain type of double cycle cover, and the total interval number of a graph. We outline the research on supereulerian graphs, the reduction method, and its applications.     

Sufficient Conditions for a Digraph to be Supereulerian

A (di)graph is supereulerian if it contains a spanning eulerian sub(di)graph. This property is a relaxation of hamiltonicity. Inspired by this analogy with hamiltonian cycles and by similar results in supereulerian graph theory, we analyze a number of sufficient Ore type conditions for a digraph to be supereulerian. Furthermore, we study the following conjecture due to Thomassé and the first author: if the arc‐connectivity of a digraph is not smaller than its independence number, then the digraph is supereulerian. As a support for this conjecture we prove it for digraphs that are semicomplete multipartite or quasitransitive and verify the analogous statement for undirected graphs.     

5连通图中的可去边

An edge e of a k-connected graph G is said to be a removable edge if G O e is still k-connected, where G e denotes the graph obtained from G by deleting e to get G - e, and for any end vertex of e with degree k - 1 in G- e, say x, delete x, and then add edges between any pair of non-adjacent vertices in NG-e （x）. The existence of removable edges of k-connected graphs and some properties of 3-connected and 4-connected graphs have been investigated [1, 11, 14, 15]. In the present paper, we investigate some properties of 5-connected graphs and study the distribution of removable edges on a cycle and a spanning tree in a 5- connected graph. Based on the properties, we proved that for a 5-connected graph G of order at least 10, if the edge-vertex-atom of G contains at least three vertices, then G has at least （3│G│ ＋ 2）/2 removable edges.     

关于k-消去二分图的一些结果

图 G的一个 k-正则支撑子图称为 G的 k-因子 ,若对 G的任一边 e,图 G- e总存在一个 k-因子 ,则称 G是 k-消去图 .证明了二分图 G=( X,Y) ,且 | X | =| Y|是 k-消去图的充分必要条件是 k| S|≤ r1 + 2 r2 +…+ k( rk+… + rΔ) - ε( S)对所有 S X成立 .并由此给出二分图是 k-消去图的充分度条件 .     

1-平面图及其子类的染色

如果图G可以嵌入在平面上,使得每条边最多被交叉1次,则称其为1-可平面图,该平面嵌入称为1-平面图.由于1-平面图G中的交叉点是图G的某两条边交叉产生的,故图G中的每个交叉点c都可以与图G中的四个顶点(即产生c的两条交叉边所关联的四个顶点)所构成的点集建立对应关系,称这个对应关系为θ.对于1-平面图G中任何两个不同的交叉点c_1与c_2(如果存在的话),如果|θ(c_1)∩θ(c_2)|≤1,则称图G是NIC-平面图;如果|θ(c_1)∩θ(c_2)|=0,即θ(c_1)∩θ(c_2)=?,则称图G是IC-平面图.如果图G可以嵌入在平面上,使得其所有顶点都分布在图G的外部面上,并且每条边最多被交叉一次,则称图G为外1-可平面图.满足上述条件的外1-可平面图的平面嵌入称为外1-平面图.现主要介绍关于以上四类图在染色方面的结果.