On Domatic and Total Domatic Numbers of Product Graphs

Abstract

A domatic (total domatic) k-coloring of a graph G is an assignment of k colors to the vertices of G such that each vertex contains vertices of all k colors in its closed neighborhood (neighborhood). The domatic (total domatic) number of G, denoted d(G) (dt (G)), is the maximum k for which G has a domatic (total domatic) k-coloring. In this paper, we show that for two non-trivial graphs G and H, the domatic and total domatic numbers of their Cartesian product G H is bounded above by \|V(G)|, |V(H)|\ and below by \d(G), d(H)\. Both these bounds are tight for an infinite family of graphs. Further, we show that if H is bipartite, then dt(G H) is bounded below by 2\dt(G),dt(H)\ and d(G H) is bounded below by 2\d(G),dt(H)\. These bounds give easy proofs for many of the known bounds on the domatic and total domatic numbers of hypercubes chen,zel4 and the domination and total domination numbers of hypercubes har,joh and also give new bounds for Hamming graphs. We also obtain the domatic (total domatic) number and domination (total domination) number of n-dimensional torus i=1n Cki with some suitable conditions to each ki, which turns out to be a generalization of a result due to Gravier grav2 %[Total domination number of grid graphs, Discrete Appl. Math. 121 (2002) 119-128] and give easy proof of a result due to Klavzar and Seifter sand.