Total Roman Domination Edge-Critical Graphs

Abstract

A total Roman dominating function on a graph G is a function % f:V(G)→ \0,1,2\ such that every vertex v with f(v)=0 is adjacent to some vertex u with f(u)=2, and the subgraph of G induced by the set of all vertices w such that f(w)>0 has no isolated vertices. The weight of f is v∈ V(G)f(v). The total Roman domination number γ tR(G) is the minimum weight of a total Roman dominating function on G. A graph G is k-γ tR-edge-critical if γ tR(G+e)<γ tR(G)=k for every edge e∈ E(G)≠ , and k-γ tR-edge-supercritical if it is k-γ tR-edge-critical and γ tR(G+e)=γ tR(G)-2 for every edge e∈ E(G)≠ . We present some basic results on γtR-edge-critical graphs and characterize certain classes of γ tR-edge-critical graphs. In addition, we show that, when k is small, there is a connection between k-γ tR-edge-critical graphs and graphs which are critical with respect to the domination and total domination numbers.