EDGE-FACE CHROMATIC NUMBER OF 2-CONNECTED PLANE GRAPHS WITH HIGH MAXIMUM DEGREE

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）.

Smarandachely Adjacent-vertex-distinguishing Proper Edge Coloring ofK4 V Kn

Let f be a proper edge coloring of G using k colors. For each x ∈ V（G）, the set of the colors appearing on the edges incident with x is denoted by Sf（x） or simply S（x） if no confusion arise. If S（u） = S（v） and S（v） S（u） for any two adjacent vertices u and v, then f is called a Smarandachely adjacent vertex distinguishing proper edge col- oring using k colors, or k-SA-edge coloring. The minimum number k for which G has a Smarandachely adjacent-vertex-distinguishing proper edge coloring using k colors is called the Smarandachely adjacent-vertex-distinguishing proper edge chromatic number, or SA- edge chromatic number for short, and denoted by Xsa（G）. In this paper, we have discussed the SA-edge chromatic number of K4 V Kn.

Adjacent Strong Edge Chromatic Number of Series-Parallel Graphs

In this paper, we will study the adjacent strong edge coloring of series-parallel graphs, and prove that series-parallel graphs of △(G) = 3 and 4 satisfy the conjecture of adjacent strong edge coloring using the double inductions and the method of exchanging colors from the aspect of configuration property. For series-parallel graphs of △(G) ≥ 5, △(G) ≤ x'as(G) ≤ △(G) + 1. Moreover, x'as(G) = △(G) + 1 if and only if it has two adjacent vertices of maximum degree, where △(G) and X'as(G) denote the maximum degree and the adjacent strong edge chromatic number of graph G respectively.

An Upper Bound for the Adjacent Vertex Distinguishing Acyclic Edge Chromatic Number of a Graph

A proper k-edge coloring of a graph G is called adjacent vertex distinguishing acyclic edge coloring if there is no 2-colored cycle in G and the color set of edges incident to u is not equal to the color set of edges incident to v, where uv ∈E（G）. The adjacent vertex distinguishing acyclic edge chromatic number of G, denoted by χ＇αα（G）, is the minimal number of colors in an adjacent vertex distinguishing acyclic edge coloring of G. In this paper we prove that if G（V, E） is a graph with no isolated edges, then χ＇αα（G）≤32△.

A note on n-edge chromatic number

ALL graphs appearing in this note are simple. A graph with p vertices and q edges will becalled a (p, q )-graph. The maximum degree of G is denoted by Δ(G).Let n≥2 be an integer. The n-edge chromatic number X_n (G) of a simple graph G is theminimum cardinality of a set of colors with which one can assign the colors to the edges of Gsuch that the edges on a path of length less than or equal to n receive different colors.The aim of this note is to explore the bounds for X’_n (G) and X’_n (G) + X’_n (G). It is

若干联图的邻点和可约边染色

该文在已有的图染色概念基础之上,结合实际问题提出了邻点和可约边染色的新概念,设计了一种新型的邻点和可约边染色(adjacent vertex sum reducible edge coloring, AVSREC)算法,该算法采用迭代寻优方式针对有限点内的所有非同构图集进行求解,通过实验结果分析,总结得到了若干联图的定理并给出证明.

双圈图的D(2)-点可区别边染色

图G的一个正常k-边染色f满足对■u,v∈V(G),当d(u,v)≤2时都有S_(f)(u)≠S_(f)(v),其中S_(f)(v)={f(vw)|vw∈E(G)}表示顶点v的所有关联边上所染颜色构成的集合,则称f为图G的k-D(2)-点可区别边染色(简记为k-D(2)-VDEC),将其所需要颜色的最小数k称为D(2)-点可区别边色数,简记为χ’_(2-vd)(G).结合Hall定理证明了最大度为△(G)的双圈图G都有χ’_(2-vd)(G)≤△(G)+2.

若干联图的L(2,1)-边染色算法

图的距离染色问题是频率分配问题的一种图模型,所谓的频率分配问题是指某一区域的不同电台要使用无线电波发送信号,为了避免干扰,位置较近的电台需要使用不同的频道,当电台距离特别近时,它们之间需要间隔至少2个信道。L(2,1)-边染色是指距离为1的两条边的色数差值大于等于2,距离大于1的两条边的色数不同。本文针对随机图设计了一种L(2,1)-边染色算法,实验结果表明,该算法能够解决有限点内随机图的L(2,1)-边染色问题。通过分析实验结果,发现了3类单圈图的染色特性,定义C_(3)↑P_(n)↑S_(m),C_(n)↓S_(m)和C_(n)↑S_(m)分别来刻画这三类单圈图,并给出相关定理及其证明。

联图P_(m)∨C_(n)的邻和可区别边染色

图G的邻和可区别边染色是指图G的一个正常边染色φ,满足图G中的任意一条边uv,点u关联边的颜色数之和异于点V。图G的一个邻和可区别k-边染色中用到的最小颜色数k,称为图G的邻和可区别边色数。本研究运用数学归纳法、分析法研究了联图P_(m)∨C_(n)的邻和可区别边染色问题,得到了联图P_(m)∨C_(n)的邻和可区别边色数。

边替换图的邻和可区别全染色

考虑图的邻和可区别全染色问题及其相关的1-2猜想.首先,利用独立消圈集法得到剖分图S(G)和三角扩展图R(G)的邻和可区别全色数;其次,当G为任意简单连通图且T为给定的特殊图时,证明边替换图G[T]满足1-2猜想.

图的倍图与补倍图(英文)

计算机科学数据库的关系中遇到了可归为倍图或补倍图的参数和哈密顿圈的问题.对简单图G,如果V(D(G))=V(G)∪V(G′),E(D(G))=E(G)∪E(G′)∪{v_iv_j′|v_i∈V(G),v_j′∈V(G′)且v_iv_j∈E(G)}那么,称D(G)是G的倍图,如果V((?)(G))=V(G)∪V(G′),E((?)(C))= E(G)∪E(G′)∪{v_iv_j′|v_i∈V(G),v_j′∈V(G′)and v_iv_j(?)E(G)},称(?)(C)是G的补倍图,这里G′是G的拷贝.本文研究了D(G)和(?)的色数,边色数,欧拉性,哈密顿性和提出了D(G)的边色数是D(G)的最大度等公开问题.

关于C_m×C_(5n)的全色数和邻强边色数

设G是一个简单图,k为正整数,V(G)∪E(G)到{1,2,…,k}的一个映射f满足:对于任意的uv∈E(G)有f(u)≠f(v),f(u)≠f(uv),f(v)≠f(uv);任意的uv,vw∈E(G),u≠w,有f(uv)≠f(uw),则称f为G的k-全染色,简记为k-TC,并称ΧT(G)=min{k|G存在k-TC}为G的全色数.证明了圈Cm与圈C5n的笛卡尔积图的全色数和邻强边色数都为5.

Pm∨Fn的邻强边染色

对一个正常边染色满足相邻点的色集不同,称为邻强边染色,其所用最少染色数称为邻强边色数.就路P_m与扇F_n的联图P_m∨F_n,得到了在m,n不同取值情况下的邻强边色数.

最大度不小于7的图的星边色数的一个上界

定义了星边染色和星边色数x′_s(G),证明了若图G的最大度△≥7,则x′_s(G)≤[16(△-1)3/2].此结果包含了若图G是最大度△≥12的线图,则x_s(G)≤[16(△-1)3/2].

Δ(G)≤4的外平面图的邻强边色数

研究了Δ(G)≤4的外平面图的邻强边染色,证明了Δ(G)≤χ′as(G)≤Δ(G)+1,且χ′as(G)=Δ(G)+1当且仅当存在两个最大度点相邻,其中Δ(G)和χ′as(G)分别表示图G的最大度和邻强边色数,并且提出了如下猜想:如果G是一个|V(G)|≥3(G≠C5)的2-连通图,则Δ(G)≤χ′as(G)≤Δ(G)

乘积图的全色数

本文得到了有关乘积图的全色数的一些结果，并利用这些结果证明了Mesh图和Tours-图均满足全色数猜想．特别，几乎所有的Mesh-图都是第一类图．

C_m·F_n的邻点可区别边色数

Fn表示阶为n+1的扇,当m个Fn的扇心连成圈时,用Cm·Fn表示.设Cm=u1u2…unv1,V(Cm·Fn)={ui|i=1,2,…,m}∪{vij|i=1,2,…,m;j=1,2,…,n},E(Cm·Fn)=E(Cm)∪{uivij|i=1,2,…,m;j=1,2,…,n}∪{vijvi(j+1)|i=1,2,…,m;j=1,2,…,n-1}.研究Cm·Fn的邻点可区别的边色数.

P_m∨C_n的点可区别边色数

研究了路和圈的联图的点可区别的边染色,得到了其点可区别的边色数。

P_m∨P_n的点可区别边色数

研究了Pm ∨ Pn的点可区别边染色,并得到了Pm ∨ Pn的点可区别边色数．

若干图的Mycielskian图的边色数

对图G(V,E),μ(G)称为G的Mycielskian图,若V(μ(G))=V(G)∪{v′|v∈V(G)}∪{w}且w V(G),而E(μ(G))=E(G)∪{uv′|uv∈E(G)}∪{wv′}.研究了路、圈、扇、轮图的Mycielskian图的边色数.