Characterizing all trees with locating-chromatic number 3

被引：21

作者：

Baskoro, Edy Tri ^{[1
]}

Asmiati ^{[1
]}

机构：

[1] Inst Teknol Bandung, Fac Math & Nat Sci, Combinatorial Math Res Grp, Jalan Ganesa 10, Bandung, Indonesia

来源：

ELECTRONIC JOURNAL OF GRAPH THEORY AND APPLICATIONS | 2013年 / 1卷 / 02期

关键词：

Locating-chromatic number; graph; tree;

D O I：

10.5614/ejgta.2013.1.2.4

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Let c be a proper k-coloring of a connected graph G. Let Pi = {S-1, S-2...,S-k} be the induced partition of V (G) by c, where S-i is the partition class having all vertices with color i. The color code c (Pi) (v) of vertex v is the ordered k-tuple (d (v,S-1), d (v, S-2),...,d (v ,S-k)), where d (v, S-i) = min {d (v,x) |x is an element of S-i}, for 1 <= i <= k. If all vertices of G have distinct color codes, then c is called a locating-coloring of G. The locating-chromatic number of G, denoted by chi(L) (G), is the smallest k such that G posses a locating k-coloring. Clearly, any graph of order n >= 2 has locating-chromatic number k, where 2 <= k <= n. Characterizing all graphs with a certain locating-chromatic number is a difficult problem. Up to now, all graphs of order n with locating chromatic number 2; n 1; or n have been characterized. In this paper, we characterize all trees whose locating- chromatic number is 3. We also give a family of trees with locating-chromatic number 4.

引用

页码：109 / 117

页数：9

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