Meyniel's conjecture holds for random graphs
Abstract
In the game of cops and robber, the cops try to capture a robber moving on the vertices of the graph. The minimum number of cops required to win on a given graph is called the cop number of . The biggest open conjecture in this area is the one of Meyniel, which asserts that for some absolute constant , the cop number of every connected graph is at most . In this paper, we show that Meyniel's conjecture holds asymptotically almost surely for the binomial random graph. We do this by first showing that the conjecture holds for a general class of graphs with some specific expansion-type properties. This will also be used in a separate paper on random -regular graphs, where we show that the conjecture holds asymptotically almost surely when .
Cite
@article{arxiv.1301.2841,
title = {Meyniel's conjecture holds for random graphs},
author = {Pawel Pralat and Nick Wormald},
journal= {arXiv preprint arXiv:1301.2841},
year = {2014}
}
Comments
revised version