English

The Petersen graph is the smallest 3-cop-win graph

Combinatorics 2012-04-03 v2

Abstract

In the game of \emph{cops and robbers} on a graph G=(V,E)G = (V,E), kk cops try to catch a robber. On the cop turn, each cop may move to a neighboring vertex or remain in place. On the robber's turn, he moves similarly. The cops win if there is some time at which a cop is at the same vertex as the robber. Otherwise, the robber wins. The minimum number of cops required to catch the robber is called the \emph{cop number} of GG, and is denoted c(G)c(G). Let mkm_k be the minimum order of a connected graph satisfying c(G)kc(G) \geq k. Recently, Baird and Bonato determined via computer search that m3=10m_3=10 and that this value is attained uniquely by the Petersen graph. Herein, we give a self-contained mathematical proof of this result. Along the way, we give some characterizations of graphs with c(G)>2c(G) >2 and very high maximum degree.

Keywords

Cite

@article{arxiv.1110.0768,
  title  = {The Petersen graph is the smallest 3-cop-win graph},
  author = {Andrew Beveridge and Paolo Codenotti and Aaron Maurer and John McCauley and Silviya Valeva},
  journal= {arXiv preprint arXiv:1110.0768},
  year   = {2012}
}

Comments

14 pages, 3 figures

R2 v1 2026-06-21T19:15:02.742Z