Dominating the direct product of two graphs through total Roman strategies

Abstract

Given a graph G without isolated vertices, a total Roman dominating function for G is a function f : V(G)→ \0,1,2\ such that every vertex with label 0 is adjacent to a vertex with label 2, and the set of vertices with positive labels induces a graph of minimum degree at least one. The total Roman domination number γtR(G) of G is the smallest possible value of Σv∈ V(G)f(v) among all total Roman dominating functions f. The total Roman domination number of the direct product G× H of the graphs G and H is studied in this work. Specifically, several relationships, in the shape of upper and lower bounds, between γtR(G× H) and some classical domination parameters for the factors are given. Characterizations of the direct product graphs G× H achieving small values ( 7) for γtR(G× H) are presented, and exact values for γtR(G× H) are deduced, while considering various specific direct product classes.