Group Irregular Labelings of Disconnected Graphs

Abstract

We investigate the group irregularity strength (sg(G)) of graphs, i.e. the smallest value of s such that taking any Abelian group of order s, there exists a function f:E(G)→ such that the sums of edge labels at every vertex are distinct. We give the exact values and bounds on sg(G) for chosen families of disconnected graphs. In addition we present some results for the modular edge gracefulness k(G), i.e. the smallest value of s such that there exists a function f:E(G)→ s such that the sums of edge labels at every vertex are distinct.