Total Roman bondage number of a graph

Abstract

A total Roman dominating function (TRDF) on a graph G with no isolated vertices is a function f:V(G)\0,1,2\ such that every vertex v with f(v)=0 has a neighbor assigned 2, and the subgraph induced by \v:f(v)>0\ has no isolated vertices. The total Roman domination number γtR(G) is the minimum weight of a TRDF on G. The total Roman bondage number btR(G) is the minimum cardinality of an edge set E'⊂eq E(G) such that G-E' has no isolated vertices and γtR(G-E')>γtR(G); if no such E' exists, btR(G)=∞. We prove that deciding whether btR(G)≤ k is NP-complete for arbitrary graphs. We establish sharp bounds, including γtR(G)+1≤ γtR(G-B)≤ γtR(G)+2 for any btR(G)-set B (both sharp), and btR(G)≥ \δ(G),b(G)\ when γtR(G)=3β(G). We characterize graphs with btR(G)=∞ and provide a necessary and sufficient condition for btR(G)=1. Exact values are determined for complete graphs, complete bipartite graphs, brooms, double brooms, wheels and wounded spiders. Further upper bounds are given in terms of order, diameter, girth, and structural features.