English

Cops and Robbers on Graphs with Path Constraints

Combinatorics 2025-09-16 v1

Abstract

In 2019, Sivaraman conjectured that every PkP_k-free graph has cop number at most k3k-3. In the same year, Liu proved this conjecture for (Pk,claw)(P_k,\text{claw})-free graphs. Recently Chudnovsky, Norin, Seymour, and Turcotte proved this conjecture for P5P_5-free graphs. For k6k\geq 6 the conjecture remains widely opened. Let the EE graph be the claw\text{claw} with two subdivided edges. We show that all (Pk,E)(P_k,E)-free graphs have cop number at most k12+3\lceil \frac{k-1}{2} \rceil +3, which improves and generalizes Liu's result for (Pk,claw)(P_k,\text{claw})-free graphs. We also prove that if GG is a graph whose longest path is length pp, then GG has cop number at most 2p3+3\lceil \frac{2p}{3} \rceil+3. This improves a bound of Joret, Kami\'nski, and Theis. Our proof relies on demonstrating that all (Pk,claw,butterfly,C4,C5)(P_k,\text{claw},\text{butterfly},C_4,C_5)-free graphs have cop number at most k13+3\lceil\frac{k-1}{3}\rceil +3.

Keywords

Cite

@article{arxiv.2509.10941,
  title  = {Cops and Robbers on Graphs with Path Constraints},
  author = {Alexander Clow and Erin Meger},
  journal= {arXiv preprint arXiv:2509.10941},
  year   = {2025}
}

Comments

18 pages, 6 figures

R2 v1 2026-07-01T05:34:52.307Z