Prime Coloring of Crossing Number Zero Graphs

Mathematical Journal of Interdisciplinary Sciences Pub Date : 2019-09-11 DOI:10.15415/mjis.2019.81003

P. Murugarajan, R. Aruldoss

引用次数: 0

Abstract

In this paper, prime coloring and its chromatic number of some crossing number zero graphs are depicted and its results are vali-dated with few theorems. Prime Coloring is defined as G be a loop less and Without multiple edges with n distinct Vertices on Color class C={c1,c2,c3,…..cn} a bijection ψ:V {c1,c2,c3,…..cn} if for each edge e = cicj ,i≠j , gcd{ ψ (ci), ψ (cj)}=1, ψ (ci) and ψ (cj) receive distinct Colors. The Chromatic number of Prime coloring is minimum cardinality taken by all the Prime colors. It is denoted by η (G).

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交叉数零图的素数着色

本文给出了若干交数零图的素数着色及其色数，并用几个定理证明了其结果。素数着色定义为:在颜色类C={c1,c2,c3，.....cn}上，G是一个无环且没有多条有n个不同顶点的边的双射ψ:V {c1,c2,c3，.....cn}，如果对于每条边e = cicj,i≠j, gcd{ψ (ci)， ψ (cj)}=1， ψ (ci)和ψ (cj)得到不同的颜色。素色的色数是所有素色所占的最小基数。用η (G)表示。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Mathematical Journal of Interdisciplinary Sciences

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