On the partition dimension of unicyclic graphs

Abstract

Given an ordered partition =\P1,P2, ...,Pt\ of the vertex set V of a connected graph G=(V,E), the partition representation of a vertex v∈ V with respect to the partition is the vector r(v|)=(d(v,P1),d(v,P2),...,d(v,Pt)), where d(v,Pi) represents the distance between the vertex v and the set Pi. A partition of V is a resolving partition if different vertices of G have different partition representations, i.e., for every pair of vertices u,v∈ V, r(u|) r(v|). The partition dimension of G is the minimum number of sets in any resolving partition for G. In this paper we obtain several tight bounds on the partition dimension of unicyclic graphs.