English

The general position problem and strong resolving graph

Combinatorics 2019-06-04 v1

Abstract

The general position number gp(G){\rm gp}(G) of a connected graph GG is the cardinality of a largest set SS of vertices such that no three pairwise distinct vertices from SS lie on a common geodesic. It is proved that gp(G)ω(GSR{\rm gp}(G)\ge \omega(G_{\rm SR}, where GSRG_{\rm SR} is the strong resolving graph of GG, and ω(GSR)\omega(G_{\rm SR}) is its clique number. That the bound is sharp is demonstrated with numerous constructions including for instance direct products of complete graphs and different families of strong products, of generalized lexicographic products, and of rooted product graphs. For the strong product it is proved that gp(GH)gp(G)gp(H)gp(G\boxtimes H) \ge gp(G)gp(H), and asked whether the equality holds for arbitrary connected graphs GG and HH. It is proved that the answer is in particular positive for strong products with a complete factor, for strong products of complete bipartite graphs, and for certain strong cylinders.

Keywords

Cite

@article{arxiv.1906.00935,
  title  = {The general position problem and strong resolving graph},
  author = {Sandi Klavzar and Ismael G. Yero},
  journal= {arXiv preprint arXiv:1906.00935},
  year   = {2019}
}
R2 v1 2026-06-23T09:39:31.598Z