Independent transversal domination number of a graph

Abstract

Let G=(V, E) be a graph. A set S⊂eq V(G) is a dominating set of G if every vertex in V S is adjacent to a vertex of S. The domination number of G, denoted by γ(G), is the cardinality of a minimum dominating set of G. Furthermore, a dominating set S is an independent transversal dominating set of G if it intersects every maximum independent set of G. The independent transversal domination number of G, denoted by γit(G), is the cardinality of a minimum independent transversal dominating set of G. In 2012, Hamid initiated the study of the independent transversal domination of graphs, and posed the following two conjectures: Conjecture 1. If G is a non-complete connected graph on n vertices, then γit(G)≤n2. Conjecture 2. If G is a connected bipartite graph, then γit(G) is either γ(G) or γ(G)+1. We show that Conjecture 1 is not true in general. Very recently, Conjecture 2 is partially verified to be true by Ahangar, Samodivkin, Yero. Here, we prove the full statement of Conjecture 2. In addition, we give a correct version of a theorem of Hamid. Finally, we answer a problem posed by Mart\'inez, Almira, and Yero on the independent transversal total domination of a graph.