English

Cops and Attacking Robbers with Cycle Constraints

Combinatorics 2024-08-06 v1 Discrete Mathematics

Abstract

This paper considers the Cops and Attacking Robbers game, a variant of Cops and Robbers, where the robber is empowered to attack a cop in the same way a cop can capture the robber. In a graph GG, the number of cops required to capture a robber in the Cops and Attacking Robbers game is denoted by \attCop(G)\attCop(G). We characterise the triangle-free graphs GG with \attCop(G)2\attCop(G) \leq 2 via a natural generalisation of the cop-win characterisation by Nowakowski and Winkler \cite{nowakowski1983vertex}. We also prove that all bipartite planar graphs GG have \attCop(G)4\attCop(G) \leq 4 and show this is tight by constructing a bipartite planar graph GG with \attCop(G)=4\attCop(G) = 4. Finally we construct 1717 non-isomorphic graphs HH of order 5858 with \attCop(H)=6\attCop(H) = 6 and \cop(H)=3\cop(H)=3. This provides the first example of a graph HH with \attCop(H)\cop(H)3\attCop(H) - \cop(H) \geq 3 extending work by Bonato, Finbow, Gordinowicz, Haidar, Kinnersley, Mitsche, Pra\l{}at, and Stacho \cite{bonato2014robber}. We conclude with a list of conjectures and open problems.

Keywords

Cite

@article{arxiv.2408.02225,
  title  = {Cops and Attacking Robbers with Cycle Constraints},
  author = {Alexander Clow and Melissa A. Huggan and M. E. Messinger},
  journal= {arXiv preprint arXiv:2408.02225},
  year   = {2024}
}

Comments

25 pages, 5 figures

R2 v1 2026-06-28T18:03:50.314Z