Minimal Sum Labeling of Graphs

Abstract

A graph G is called a sum graph if there is a so-called sum labeling of G, i.e. an injective function : V(G) → N such that for every u,v∈ V(G) it holds that uv∈ E(G) if and only if there exists a vertex w∈ V(G) such that (u)+(v) = (w). We say that sum labeling is minimal if there is a vertex u∈ V(G) such that (u)=1. In this paper, we show that if we relax the conditions (either allow non-injective labelings or consider graphs with loops) then there are sum graphs without a minimal labeling, which partially answers the question posed by Miller, Ryan and Smyth in 1998.