English

Bounds on the localization number

Combinatorics 2020-01-27 v4 Discrete Mathematics

Abstract

We consider the localization game played on graphs, wherein a set of cops attempt to determine the exact location of an invisible robber by exploiting distance probes. The corresponding optimization parameter for a graph GG is called the localization number and is written ζ(G)\zeta (G). We settle a conjecture of \cite{nisse1} by providing an upper bound on the localization number as a function of the chromatic number. In particular, we show that every graph with ζ(G)k\zeta (G) \le k has degeneracy less than 3k3^k and, consequently, satisfies χ(G)3ζ(G)\chi(G) \le 3^{\zeta (G)}. We show further that this degeneracy bound is tight. We also prove that the localization number is at most 2 in outerplanar graphs, and we determine, up to an additive constant, the localization number of hypercubes.

Keywords

Cite

@article{arxiv.1806.05286,
  title  = {Bounds on the localization number},
  author = {Anthony Bonato and William B. Kinnersley},
  journal= {arXiv preprint arXiv:1806.05286},
  year   = {2020}
}
R2 v1 2026-06-23T02:29:22.142Z