Locating-Dominating Sets of Functigraphs

Abstract

A locating-dominating set of a graph G is a dominating set of G such that every vertex of G outside the dominating set is uniquely identified by its neighborhood within the dominating set. The location-domination number of G is the minimum cardinality of a locating-dominating set in G. Let G1 and G2 be the disjoint copies of a graph G and f:V(G1)→ V(G2) be a function. A functigraph FfG consists of the vertex set V(G1) V(G2) and the edge set E(G1) E(G2) \uv:v=f(u)\. In this paper, we study the variation of the location-domination number in passing from G to FfG and find its sharp lower and upper bounds. We also study the location-domination number of functigraphs of the complete graphs for all possible definitions of the function f. We also obtain the location-domination number of functigraphs of a family of spanning subgraph of the complete graphs.