Total mutual-visibility in Hamming graphs

Abstract

If G is a graph and X⊂eq V(G), then X is a total mutual-visibility set if every pair of vertices x and y of G admits a shortest x,y-path P with V(P) X ⊂eq \x,y\. The cardinality of a largest total mutual-visibility set of G is the total mutual-visibility number μ t(G) of G. In this paper the total mutual-visibility number is studied on Hamming graphs, that is, Cartesian products of complete graphs. Different equivalent formulations for the problem are derived. The values μ t(Kn1\,\, Kn2\,\, Kn3) are determined. It is proved that μ t(Kn1 \,\, ·s \,\, Knr) = O(Nr-2), where N = n1+·s + nr, and that μ t(Ks\,\,, r) = (sr-2) for every r 3, where Ks\,\,, r denotes the Cartesian product of r copies of Ks. The main theorems are also reformulated as Tur\'an-type results on hypergraphs.