The Disjunctive Bondage Number and the Disjunctive Total Bondage Number of Graphs

Abstract

Let G be a graph with vertex set V(G) and edge set E(G). A set \(S \subseteq V(G)\) is a disjunctive dominating set of G if every vertex in \(V(G)-S\) is adjacent to a vertex of S or has at least two vertices in S at distance two from it. For G with no isolated vertex, a set \(S \subseteq V(G)\) is a disjunctive total dominating set of G if every vertex in G is adjacent to a vertex of S or has at least two vertices of S at distance two from it. The disjunctive domination number \(\gamma ^d(G)\) of G is the minimum cardinality over all disjunctive dominating sets of G, and the disjunctive total domination number \(\gamma _t^d(G)\) of G is the minimum cardinality over all disjunctive total dominating sets of G. We define disjunctive bondage number of G to be the minimum cardinality among all subsets of edges \(B \subseteq E(G)\) for which \(\gamma ^d(G-B)>\gamma ^d(G)\). For G with no isolated vertex, we define disjunctive total bondage number, \(b_t^d(G)\), of G to be the minimum cardinality among all subsets of edges \(B' \subseteq E(G)\) satisfying \(\gamma _t^d(G-B')>\gamma _t^d(G)\) and that \(G-B'\) contains no isolated vertex; if no such subset \(B'\) exists, we define \(b_t^d(G)=\infty \). In this paper, we initiate the study of the disjunctive (total) bondage number of graphs. We determine the disjunctive (total) bondage number of the Petersen graph, cycles, paths, and some complete multipartite graphs. We also obtain upper bounds of the disjunctive bondage number for trees and some Cartesian product graphs, and we show the existence of a tree T satisfying \(b_t^d(T)=k\) for each positive integer k.