On the Lucky labeling of Graphs

Abstract

Suppose the vertices of a graph G were labeled arbitrarily by positive integers, and let Sum(v) denote the sum of labels over all neighbors of vertex v. A labeling is lucky if the function Sum is a proper coloring of G, that is, if we have Sum(u) ≠ Sum(v) whenever u and v are adjacent. The least integer k for which a graph G has a lucky labeling from the set 1, 2, ...,k is the lucky number of G, denoted by η(G). We will prove, for every graph G other than K2 , wn-w+1≤η (G) ≤ 2 and we present an algorithm for lucky labeling of G .