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1.
《数学季刊》2016,(2):147-154
Let G be a simple graph. An IE-total coloring f of G is a coloring of the vertices and edges of G so that no two adjacent vertices receive the same color. For each vertex x of G, let C(x) be the set of colors of vertex x and edges incident to x under f. For an IE-total coloring f of G using k colors, if C(u) 6= C(v) for any two different vertices u and v of G, then f is called a k-vertex-distinguishing IE-total-coloring of G or a k-VDIET coloring of G for short. The minimum number of colors required for a VDIET coloring of G is denoted by χievt(G) and is called vertex-distinguishing IE-total chromatic number or the VDIET chromatic number of G for short. The VDIET colorings of complete bipartite graphs K8,n are discussed in this paper. Particularly, the VDIET chromatic number of K8,n are obtained. 相似文献
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Let G be a simple graph of order at least 2.A VE-total-coloring using k colors of a graph G is a mapping f from V (G) E(G) into {1,2,···,k} such that no edge receives the same color as one of its endpoints.Let C(u)={f(u)} {f(uv) | uv ∈ E(G)} be the color-set of u.If C(u)=C(v) for any two vertices u and v of V (G),then f is called a k-vertex-distinguishing VE-total coloring of G or a k-VDVET coloring of G for short.The minimum number of colors required for a VDVET coloring of G is denoted by χ ve vt (G) and it is called the VDVET chromatic number of G.In this paper we get cycle C n,path P n and complete graph K n of their VDVET chromatic numbers and propose a related conjecture. 相似文献
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Let G be a simple graph.An IE-total coloring f of G refers to a coloring of the vertices and edges of G so that no two adjacent vertices receive the same color.Let C(u) be the set of colors of vertex u and edges incident to u under f.For an IE-total coloring f of G using k colors,if C(u)=C(v) for any two different vertices u and v of V(G),then f is called a k-vertex-distinguishing IE-total-coloring of G,or a k-VDIET coloring of G for short.The minimum number of colors required for a VDIET coloring of G is denoted by χ ie vt (G),and it is called the VDIET chromatic number of G.We will give VDIET chromatic numbers for complete bipartite graph K4,n (n≥4),K n,n (5≤ n ≤ 21) in this article. 相似文献
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Let G be a simple graph.An IE-total coloring f of G refers to a coloring of the vertices and edges of G so that no two adjacent vertices receive the same color.Let C(u) be the set of colors of vertex u and edges incident to u under f.For an IE-total coloring f of G using k colors,if C(u)=C(v) for any two different vertices u and v of V(G),then f is called a k-vertex-distinguishing IE-total-coloring of G,or a k-VDIET coloring of G for short.The minimum number of colors required for a VDIET coloring of G is denoted by χ ie vt (G),and it is called the VDIET chromatic number of G.We will give VDIET chromatic numbers for complete bipartite graph K4,n (n≥4),K n,n (5≤ n ≤ 21) in this article. 相似文献
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G(V,E)是一个简单图,k是一个正整数,f是一个V(G)UE(G)到{1,2,…,k}的映射.如果■u,v∈V(G),则f(u)≠f(v),f(u)≠f(uv),f(v)≠f(uv),C(u)≠C(v),称f是图G的邻点可区别E-全染色,称最小的数k为图G的邻点可区别E-全色数.给出了轮与星的多重联图的邻点可区别E-全色数. 相似文献
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图G的一个k-正常边染色f被称为点可区别边染色是指任何两点的点及其关联边的色集合不同,所用最小的正整数k被称为G的点可区别边色数,记为x′_(vd)(G).用K_(2n)-E(C_4)表示2n阶完全图删去其中一条4阶路的边后得到的图,文中得到了K_(2n)-E(_4)的点可区别边色数. 相似文献
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若图的邻点可区别全染色的各色所染元素数之差不超过1,则称该染色法为图的均匀邻点可区别全染色,而所用的最少颜色数称为该图的均匀邻点可区别全色数.本文给出了一类二部图的均匀邻点可区别全染色数. 相似文献
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杨随义 《数学的实践与认识》2016,(10):152-161
图G的I-全染色是指若干种颜色对图G的顶点和边的一个分配,使得任意两个相邻顶点的颜色不同,任意两条相邻边的颜色不同.在图G的一个I-全染色下,G的任意一个点的色集合是指该点的颜色以及与该点相关联的全体边的颜色构成的集合.图G的一个I-全染色称为是邻点可区别的,如果任意两个相邻点的色集合不相等.对一个图G进行邻点可区别I-全染色所用的最少颜色的数目称为图G的邻点可区别I-全色数.应用构造具体染色的方法给出了路与星、扇、轮图的积图的邻点可区别I-全色数 相似文献
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Xiang-En Chen 《数学研究通讯:英文版》2016,32(4):359-374
Let G be a simple graph. A total coloring f of G is called an E-total coloring if no two adjacent vertices of G receive the same color, and no edge of G receives the same color as one of its endpoints. For an E-total coloring f of a graph G and any vertex x of G, let C(x) denote the set of colors of vertex x and of the edges incident with x, we call C(x) the color set of x. If C(u)≠ C(v) for any two different vertices u and v of V(G), then we say that f is a vertex-distinguishing E-total coloring of G or a VDET coloring of G for short. The minimum number of colors required for a VDET coloring of G is denoted by χ_(vt)~e(G) and is called the VDET chromatic number of G. The VDET coloring of complete bipartite graph K_(7,n)(7 ≤ n ≤ 95) is discussed in this paper and the VDET chromatic number of K_(7,n)(7 ≤ n ≤ 95) has been obtained. 相似文献
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联图Fn∨Pm的邻点可区别全染色 总被引:6,自引:0,他引:6
设G(V,E)是阶数至少为2的简单连通图,k是正整数,V∪E到{1,2,3,…k}的映射f满足:对任意uv,uw∈E(G),u≠w,有f(uv)≠f(vw);对任意uv∈E(G),有f(u)≠f(v), f(u)≠f(uv),f(v)≠f(uv);那么称f为G的k-正常全染色,若f还满足对任意uv∈E(G),有G(u)≠C(v),其中C(u)={f(u)}∪{f(uv)|uv∈E(G),v∈V(G)}那么称f为G的k-邻点可区别的全染色(简记为k-AVDTC),称min{k|G有k-邻点可区别的全染色}为G的邻点可区别的全色数,记作Xat(G).本文得到了联图Fn∨Pm的全色数. 相似文献
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图G的一个k-正常边染色f被称为点可区别边染色是指任何两点的点及其关联边的色集合不同,所用最小的正整数k被称为G的点可区别边色数,记为X'_(vd)(G).用k_(2n)-E(C_m)表示2n阶完全图删去其中一条m阶路的边后得到的图,得到了K_(14)-E(C_4),K_(16)-E(C_4),K_(18)-E(C_5),K_(20)-E(C_5)的点可区别边色数分别为14,16,18,20. 相似文献
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王国兴 《数学的实践与认识》2014,(21)
图G的正常边染色称为是点可区别的,如果对G的任意两顶点的关联边的颜色构成的集合不同.对图G进行点可区别正常边染色所需要的最少颜色数称为图G的点可区别正常边色数,记为x_s'(G).给出了3阶空图与t阶完全图的联图的点可区别正常边色数. 相似文献
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G(V,E)是一个简单图,k是一个正整数,f是一个V(G)∪E(G)到{1,2,…,k}的映射.如果(V)u,v∈V(G),则f(u)≠f(v),f(u)≠f(uv),f(v)≠f(uv),C(u)≠C(v),称f是图G的邻点可区别E-全染色,称最小的数k为图G的邻点可区别E-全色数.给出了轮与路间的多重联图的邻点可区别E-全色数,其中C(u)={f(u)}∪ {f(uv)|uv∈E(G)}. 相似文献
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设G(V,E)是简单连通图,T(G)为图G的所有顶点和边构成的集合,并设C是k-色集(k是正整数),若T(G)到C的映射f满足:对任意uv∈E(G),有f(u)≠f(v),f(u)≠f(uv),f(v)≠f(uv),并且C(u)≠C(v),其中C(u)={f(u)}∪{f(uv)|uv∈E(G)}.那么称f为图G的邻点可区别E-全染色(简记为k-AVDETC),并称χ_(at)~e(G)=min{k|图G有k-邻点可区别E-全染色}为G的邻点可区别E-全色数.图G的中间图M(G)就是在G的每一个边上插入一个新的顶点,再把G上相邻边上的新的顶点相联得到的.探讨了路、圈、扇、星及轮的中间图的邻点可区别E-全染色,并给出了这些中间图的邻点可区别E-全色数. 相似文献
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Let G be a planar graph with maximum degree Δ. It is proved that if Δ ≥ 8 and G is free of k-cycles for some k ∈ {5,6}, then the total chromatic number χ′′(G) of G is Δ + 1.
This work is supported by a research grant NSFC(60673047) and SRFDP(20040422004) of China.
Received: February 27, 2007. Final version received: December 12, 2007. 相似文献