English

A Steiner general position problem in graph theory

Combinatorics 2021-05-19 v1

Abstract

Let GG be a graph. The Steiner distance of WV(G)W\subseteq V(G) is the minimum size of a connected subgraph of GG containing WW. Such a subgraph is necessarily a tree called a Steiner WW-tree. The set AV(G)A\subseteq V(G) is a kk-Steiner general position set if V(TB)A=BV(T_B)\cap A = B holds for every set BAB\subseteq A of cardinality kk, and for every Steiner BB-tree TBT_B. The kk-Steiner general position number sgpk(G){\rm sgp}_k(G) of GG is the cardinality of a largest kk-Steiner general position set in GG. Steiner cliques are introduced and used to bound sgpk(G){\rm sgp}_k(G) from below. The kk-Steiner general position number is determined for trees, cycles and joins of graphs. Lower bounds are presented for split graphs, infinite grids and lexicographic products. The lower bound for the latter products leads to an exact formula for the general position number of an arbitrary lexicographic product.

Keywords

Cite

@article{arxiv.2105.08391,
  title  = {A Steiner general position problem in graph theory},
  author = {Sandi Klavžar and Dorota Kuziak and Iztok Peterin and Ismael G. Yero},
  journal= {arXiv preprint arXiv:2105.08391},
  year   = {2021}
}
R2 v1 2026-06-24T02:12:57.124Z