Erdos Conjecture and AR-Labeling

Abstract

Given an edge labeling f of a graph G, a vertex v is called an AR-vertex, if v has distinct edge weight sums for each distinct subset of edges incident on v. An injective edge labeling f of a graph G is called an AR-labeling of G, if f:E(G) → N is such that every vertex in G is an AR-vertex under f. The minimum k such that there exists an AR-labeling f:E→ \1,2,3,…,k\ is called the AR-index of G, denoted by ARI(G). In this paper, using a sequence originating from Erdos subset sum conjecture, a lower bound has been obtained for the AR-index of a graph and this bound is used to prove that only finitely many bistars, complete graphs and complete bipartite graphs are AR-graphs. The exact values of AR-index is obtained for stars and wheels.

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