English

Geodesic packing in graphs

Combinatorics 2023-07-06 v3 Computational Complexity

Abstract

Given a graph GG, a geodesic packing in GG is a set of vertex-disjoint maximal geodesics, and the geodesic packing number of GG, \gpack(G){\gpack}(G), is the maximum cardinality of a geodesic packing in GG. It is proved that the decision version of the geodesic packing number is NP-complete. We also consider the geodesic transversal number, >(G){\gt}(G), which is the minimum cardinality of a set of vertices that hit all maximal geodesics in GG. While >(G)\gpack(G)\gt(G)\ge \gpack(G) in every graph GG, the quotient gt(G)/gpack(G){\rm gt}(G)/{\rm gpack}(G) is investigated. By using the rook's graph, it is proved that there does not exist a constant C<3C < 3 such that gt(G)gpack(G)C\frac{{\rm gt}(G)}{{\rm gpack}(G)}\le C would hold for all graphs GG. If TT is a tree, then it is proved that gpack(T)=gt(T){\rm gpack}(T) = {\rm gt}(T), and a linear algorithm for determining gpack(T){\rm gpack}(T) is derived. The geodesic packing number is also determined for the strong product of paths.

Keywords

Cite

@article{arxiv.2210.15325,
  title  = {Geodesic packing in graphs},
  author = {Paul Manuel and Bostjan Bresar and Sandi Klavzar},
  journal= {arXiv preprint arXiv:2210.15325},
  year   = {2023}
}
R2 v1 2026-06-28T04:38:00.459Z