Relaxed Locally Identifying coloring of Graphs

Abstract

A locally identifying coloring (lid-coloring) of a graph is a proper coloring such that the sets of colors appearing in the closed neighborhoods of any pair of adjacent vertices having distinct neighborhoods are distinct. Our goal is to study a relaxed locally identifying coloring (rlid-coloring) of a graph that is similar to locally identifying coloring for which the coloring is not necessary proper.We denote by rlid(G) the minimum number of colors used in a relaxed locally identifying coloring of a graph G In this paper, we prove that the problem of deciding that rlid(G)=3 for a 2-degenerate planar graph G is NP-complete. We give several bounds of rlid(G) and construct graphs for which some of these bounds are tightened. Studying some families of graphs allows us to compare this parameter with the minimum number of colors used in a locally identifying coloring of a graph G (lid(G)), the size of a minimum identifying code of G (γid(G)) and the chromatic number of G ((G)).