English

On graphs coverable by chubby shortest paths

Combinatorics 2025-03-05 v1 Discrete Mathematics

Abstract

Dumas, Foucaud, Perez, and Todinca [SIAM J. Disc. Math., 2024] proved that if the vertex set of a graph GG can be covered by kk shortest paths, then the pathwidth of GG is bounded by O(k3k)\mathcal{O}(k \cdot 3^k). We prove a coarse variant of this theorem: if in a graph GG one can find~kk shortest paths such that every vertex is at distance at most ρ\rho from one of them, then GG is (3,12ρ)(3,12\rho)-quasi-isometric to a graph of pathwidth kO(k)k^{\mathcal{O}(k)} and maximum degree O(k)\mathcal{O}(k), and GG admits a path-partition-decomposition whose bags are coverable by kO(k)k^{\mathcal{O}(k)} balls of radius at most 2ρ2\rho and vertices from non-adjacent bags are at distance larger than 2ρ2\rho. We also discuss applications of such decompositions in the context of algorithms for finding maximum distance independent sets and minimum distance dominating sets in graphs.

Keywords

Cite

@article{arxiv.2503.02160,
  title  = {On graphs coverable by chubby shortest paths},
  author = {Meike Hatzel and Michał Pilipczuk},
  journal= {arXiv preprint arXiv:2503.02160},
  year   = {2025}
}
R2 v1 2026-06-28T22:05:39.237Z