Dominating direct products of graphs

An upper bound for the domination number of the direct product of graphs is proved. It in particular implies that for any graphs G and H, γ(G×H)?3γ(G)γ(H). Graphs with arbitrarily large domination numbers are constructed for which this bound is attained. Concerning the upper domination number we prove that Γ(G×H)?Γ(G)Γ(H), thus confirming a conjecture from [R. Nowakowski, D.F. Rall, Associative graph products and their independence, domination and coloring numbers, Discuss. Math. Graph Theory 16 (1996) 53-79]. Finally, for paired-domination of direct products we prove that γ_pr(G×H)?γ_pr(G)γ_pr(H) for arbitrary graphs G and H, and also present some infinite families of graphs that attain this bound.