English

Total mutual-visibility in Hamming graphs

Combinatorics 2025-12-10 v2

Abstract

If GG is a graph and XV(G)X\subseteq V(G), then XX is a total mutual-visibility set if every pair of vertices xx and yy of GG admits a shortest x,yx,y-path PP with V(P)X{x,y}V(P) \cap X \subseteq \{x,y\}. The cardinality of a largest total mutual-visibility set of GG is the total mutual-visibility number μt(G)\mu_{\rm t}(G) of GG. 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 μt(Kn1Kn2Kn3)\mu_{\rm t}(K_{n_1}\,\square\, K_{n_2}\,\square\, K_{n_3}) are determined. It is proved that μt(Kn1Knr)=O(Nr2)\mu_{\rm t}(K_{n_1} \,\square\, \cdots \,\square\, K_{n_r}) = O(N^{r-2}), where N=n1++nrN = n_1+\cdots + n_r, and that μt(Ks,r)=Θ(sr2)\mu_{\rm t}(K_s^{\,\square\,, r}) = \Theta(s^{r-2}) for every r3r\ge 3, where Ks,rK_s^{\,\square\,, r} denotes the Cartesian product of rr copies of KsK_s. The main theorems are also reformulated as Tur\'an-type results on hypergraphs.

Cite

@article{arxiv.2307.05168,
  title  = {Total mutual-visibility in Hamming graphs},
  author = {Csilla Bujtás and Sandi Klavžar and Jing Tian},
  journal= {arXiv preprint arXiv:2307.05168},
  year   = {2025}
}
R2 v1 2026-06-28T11:26:58.248Z