Neighbor-Locating Colorings in Graphs

Abstract

A k-coloring of a graph G is a k-partition =\S1,…,Sk\ of V(G) into independent sets, called colors. A k-coloring is called neighbor-locating if for every pair of vertices u,v belonging to the same color Si, the set of colors of the neighborhood of u is different from the set of colors of the neighborhood of v. The neighbor-locating chromatic number _NL(G) is the minimum cardinality of a neighbor-locating coloring of G. We establish some tight bounds for the neighbor-locating chromatic number of a graph, in terms of its order, maximum degree and independence number. We determine all connected graphs of order n≥ 5 with neighbor-locating chromatic number n or n-1. We examine the neighbor-locating chromatic number for two graph operations: join and disjoint union, and also for two graph families: split graphs and Mycielski graphs.