Locating-total dominating sets in twin-free graphs: a conjecture

Abstract

A total dominating set of a graph G is a set D of vertices of G such that every vertex of G has a neighbor in D. A locating-total dominating set of G is a total dominating set D of G with the additional property that every two distinct vertices outside D have distinct neighbors in D; that is, for distinct vertices u and v outside D, N(u) D N(v) D where N(u) denotes the open neighborhood of u. A graph is twin-free if every two distinct vertices have distinct open and closed neighborhoods. The location-total domination number of G, denoted LT(G), is the minimum cardinality of a locating-total dominating set in G. It is well-known that every connected graph of order n ≥ 3 has a total dominating set of size at most 23n. We conjecture that if G is a twin-free graph of order n with no isolated vertex, then LT(G) ≤ 23n. We prove the conjecture for graphs without 4-cycles as a subgraph. We also prove that if G is a twin-free graph of order n, then LT(G) 34n.