On Meyniel's Conjecture in Random Hypergraphs

Abstract

The game of Cops and Robbers is a two player pursuit game on graphs where a team of cops attempts to catch a robber. The cop number c(G) of a graph G is the minimum number of cops needed to guarantee a winning strategy in G. A famous conjecture of Meyniel says that if G is connected, then c(G)=O(n). Erde, Kang, Lehner, Mohar and Schmid considered its generalization to k-uniform hypergraphs and conjectured that the cop number of such hypergraphs is O(n/k). This may be understood as a hypergraph version of Meyniel's conjecture. In this paper we prove this conjecture for a class of expanding hypergraphs and show that with high probability the conjecture holds for random hypergraphs Hk(n,p)) provided k≥ 3n and the typical degree, pn-1k-1, is ω(3n).