English

Lower (total) mutual visibility in graphs

Combinatorics 2023-10-16 v2

Abstract

Given a graph GG, a set XX of vertices in GG satisfying that between every two vertices in XX (respectively, in GG) there is a shortest path whose internal vertices are not in XX is a mutual-visibility (respectively, total mutual-visibility) set in GG. The cardinality of a largest (total) mutual-visibility set in GG is known under the name (total) mutual-visibility number, and has been studied in several recent works. In this paper, we propose two lower variants of the mentioned concepts, defined as the smallest possible cardinality among all maximal (total) mutual-visibility sets in GG, and denote them by μ(G)\mu^{-}(G) and μt(G)\mu_t^{-}(G), respectively. While the total mutual-visibility number is never larger than the mutual-visibility number in a graph GG, we prove that both differences μ(G)μt(G)\mu^{-}(G)-\mu_t^{-}(G) and μt(G)μ(G)\mu_t^{-}(G)-\mu^{-}(G) can be arbitrarily large. We characterize graphs GG with some small values of μ(G)\mu^{-}(G) and μt(G)\mu_t^{-}(G), and prove a useful tool called Neighborhood Lemma, which enables us to find upper bounds on the lower mutual-visibility number in several classes of graphs. We compare the lower mutual-visibility number with the lower general position number, and find a close relationship with Bollob\'{a}s-Wessel theorem when this number is considered in Cartesian products of complete graphs. Finally, we also prove the NP-completeness of the decision problem related to μt(G)\mu_t^{-}(G).

Keywords

Cite

@article{arxiv.2307.02951,
  title  = {Lower (total) mutual visibility in graphs},
  author = {Boštjan Brešar and Ismael G. Yero},
  journal= {arXiv preprint arXiv:2307.02951},
  year   = {2023}
}

Comments

21 pages, 3 figures

R2 v1 2026-06-28T11:23:36.599Z