Roman Bondage Number of a Graph

Abstract

The Roman dominating function on a graph G=(V,E) is a function f: V→\0,1,2\ such that each vertex x with f(x)=0 is adjacent to at least one vertex y with f(y)=2. The value f(G)=Σu∈ V(G) f(u) is called the weight of f. The Roman domination number γ R(G) is defined as the minimum weight of all Roman dominating functions. This paper defines the Roman bondage number b R(G) of a nonempty graph G=(V,E) to be the cardinality among all sets of edges B⊂eq E for which γ R(G-B)>γ R(G). Some bounds are obtained for b R(G), and the exact values are determined for several classes of graphs. Moreover, the decision problem for b R(G) is proved to be NP-hard even for bipartite graphs.