English

Helly-gap of a graph and vertex eccentricities

Discrete Mathematics 2020-05-06 v1 Data Structures and Algorithms Combinatorics

Abstract

A new metric parameter for a graph, Helly-gap, is introduced. A graph GG is called α\alpha-weakly-Helly if any system of pairwise intersecting disks in GG has a nonempty common intersection when the radius of each disk is increased by an additive value α\alpha. The minimum α\alpha for which a graph GG is α\alpha-weakly-Helly is called the Helly-gap of GG and denoted by α(G)\alpha(G). The Helly-gap of a graph GG is characterized by distances in the injective hull H(G)\mathcal{H}(G), which is a (unique) minimal Helly graph which contains GG as an isometric subgraph. This characterization is used as a tool to generalize many eccentricity related results known for Helly graphs (α(G)=0\alpha(G)=0), as well as for chordal graphs (α(G)1\alpha(G)\le 1), distance-hereditary graphs (α(G)1\alpha(G)\le 1) and δ\delta-hyperbolic graphs (α(G)2δ\alpha(G)\le 2\delta), to all graphs, parameterized by their Helly-gap α(G)\alpha(G). Several additional graph classes are shown to have a bounded Helly-gap, including AT-free graphs and graphs with bounded tree-length, bounded chordality or bounded αi\alpha_i-metric.

Keywords

Cite

@article{arxiv.2005.01921,
  title  = {Helly-gap of a graph and vertex eccentricities},
  author = {Feodor F. Dragan and Heather M. Guarnera},
  journal= {arXiv preprint arXiv:2005.01921},
  year   = {2020}
}

Comments

21 pages, 7 figures

R2 v1 2026-06-23T15:18:40.518Z