Meyniel Extremal Families of Abelian Cayley Graphs

Abstract

We study the game of Cops and Robbers, where cops try to capture a robber on the vertices of a graph. Meyniel's conjecture states that for every connected graph G on n vertices, the cop number of G is upper bounded by O(n), i.e., that O(n) suffice to catch the robber. We present several families of abelian Cayley graphs that are Meyniel extremal, i.e., graphs whose cop number is O(n). This proves that the O(n) upper bound for Cayley graphs proved by Bradshaw is tight up to a multiplicative constant. In particular, this shows that Meyniel's conjecture, if true, is tight to a multiplicative constant even for abelian Cayley graphs. In order to prove the result, we construct Cayley graphs on n vertices with (n) generators that are K2,3-free. This shows that the K\"ov\'ari, S\'os, and Tur\'an theorem, stating that any K2,3-free graph of n vertices has at most O(n3/2) edges, is tight up to a multiplicative constant even for abelian Cayley graphs.