Liar's vertex-edge domination in subclasses of chordal graphs

Abstract

Let G=(V, E) be an undirected graph. The set NG[x]=\y∈ V|xy∈ E\ \x\ is called the closed neighbourhood of a vertex x∈ V and for an edge e=xy∈ E, the closed neighbourhood of e is the set NG[x] NG[y], which is denoted by NG[e] or NG[xy]. A set L⊂eq V is called liar's vertex-edge dominating set of a graph G=(V,E) if for every ei∈ E, |NG[ei] L|≥ 2 and for every pair of distinct edges ei,ej∈ E, |(NG[ei] NG[ej]) L|≥ 3. The notion of liar's vertex-edge domination arises naturally from some applications in communication networks. Given a graph G, the Minimum Liar's Vertex-Edge Domination Problem (MinLVEDP) asks to find a liar's vertex-edge dominating set of G of minimum cardinality. In this paper, we study this problem from an algorithmic point of view. We design two linear time algorithms for MinLVEDP in block graphs and proper interval graphs, respectively. On the negative side, we show that the decision version of liar's vertex-edge domination problem is NP-complete for undirected path graphs.