Total Roman 2-Dominating functions in Graphs

Abstract

A Roman \2\-dominating function (R2F) is a function f:V→ \0,1,2\ with the property that for every vertex v∈ V with f(v)=0 there is a neighbor u of v with f(u)=2, or there are two neighbors x,y of v with f(x)=f(y)=1. A total Roman \2\-dominating function (TR2DF) is an R2F f such that the set of vertices with f(v)>0 induce a subgraph with no isolated vertices. The weight of a TR2DF is the sum of its function values over all vertices, and the minimum weight of a TR2DF of G is the total Roman \2\-domination number γtR2(G). In this paper, we initiate the study of total Roman \2\-dominating functions, where properties are established. Moreover, we present various bounds on the total Roman \2\-domination number. We also show that the decision problem associated with γtR2(G) is NP-complete for bipartite and chordal graphs. Moreover, we show that it is possible to compute this parameter in linear time for bounded clique-width graphs (including tres).