Visibility in hypercubes

Abstract

A subset M of vertices in a graph G is a mutual-visibility set if any two vertices u and v in M ``see'' each other in G, that is, there exists a shortest u,v-path in G that contains no elements of M as internal vertices. The mutual-visibility number μ(G) of a graph G is the largest size of a mutual-visibility set in G. Let n∈N and Qn be an n-dimensional hypercube. Cicerone, Di Fonso, Di Stefano, Navarra, and Piselli showed that 2n/n≤μ(Qn)≤2n-1. In this paper, we prove that μ(Qn)>0.186·2n and thus establish that μ(Qn)=(2n). We also consider the chromatic mutual-visibility number, μ(G), defined as the smallest number of colors used on vertices of G, such that every color class is a mutual-visibility set in G. Klavzar, Kuziak, Valenzuela-Tripodoro, and Yero asked whether μ(Qn)=O(1). We answer their question in the negative, namely, we show that μ(Qn) is a growing function of n. Moreover, we show that μ(Qn)=O(n). Finally, we study the so-called total mutual-visibility number of graphs and give asymptotically tight bounds on this parameter for hypercubes.