A Bound for the Locating Chromatic Numbers of Trees

Abstract

Let f be a proper k-coloring of a connected graph G and =(V1,V2,…,Vk) be an ordered partition of V(G) into the resulting color classes. For a vertex v of G, the color code of v with respect to is defined to be the ordered k-tuple c_(v)=(d(v,V1),d(v,V2),…,d(v,Vk)), where d(v,Vi)=\d(v,x): x∈ Vi\, 1≤ i≤ k. If distinct vertices have distinct color codes, then f is called a locating coloring. The minimum number of colors needed in a locating coloring of G is the locating chromatic number of G, denoted by _L(G). In this paper, we study the locating chromatic numbers of trees. We provide a counter example to a theorem of Gary Chartrand et al. [G. Chartrand, D. Erwin, M.A. Henning, P.J. Slater, P. Zhang, The locating-chromatic number of a graph, Bull. Inst. Combin. Appl. 36 (2002) 89-101] about the locating chromatic numbers of trees. Also, we offer a new bound for the locating chromatic number of trees. Then, by constructing a special family of trees, we show that this bound is best possible.