Sharpness in the k-nearest neighbours random geometric graph model

Abstract

Let Sn,k denote the random geometric graph obtained by placing points in a square box of area n according to a Poisson process of intensity 1 and joining each point to its k nearest neighbours. Balister, Bollob\'as, Sarkar and Walters conjectured that for every 0< ε <1 and all n sufficiently large there exists C=C(ε) such that whenever the probability Sn,k is connected is at least ε then the probability Sn,k+C is connected is at least 1-ε . In this paper we prove this conjecture. As a corollary we prove that there is a constant C' such that whenever k=k(n) is a sequence of integers such that the probability Sn,k(n) is connected tends to one as n tends to infinity, then for any s(n) with s(n)=o( n), the probability that Sn,k(n)+C's n is s-connected tends to one This proves another conjecture of Balister, Bollob\'as, Sarkar and Walters.