The Roman (k,k)-domatic number of a graph

Abstract

Let k be a positive integer. A Roman k-dominating function on a graph G is a labeling f:V (G) \0, 1, 2\ such that every vertex with label 0 has at least k neighbors with label 2. A set \f1,f2,…,fd\ of distinct Roman k-dominating functions on G with the property that Σi=1dfi(v) 2k for each v∈ V(G), is called a Roman (k,k)-dominating family (of functions) on G. The maximum number of functions in a Roman (k,k)-dominating family on G is the Roman (k,k)-domatic number of G, denoted by dRk(G). Note that the Roman (1,1)-domatic number dR1(G) is the usual Roman domatic number dR(G). In this paper we initiate the study of the Roman (k,k)-domatic number in graphs and we present sharp bounds for dRk(G). In addition, we determine the Roman (k,k)-domatic number of some graphs. Some of our results extend those given by Sheikholeslami and Volkmann in 2010 for the Roman domatic number.