Largest nearest-neighbour link and connectivity threshold in a polytopal random sample

Abstract

Let X1,X2, … be independent identically distributed random points in a convex polytopal domain A ⊂ Rd. Define the largest nearest neighbour link Ln to be the smallest r such that every point of Xn:=\X1,…,Xn\ has another such point within distance r. We obtain a strong law of large numbers for Ln in the large-n limit. A related threshold, the connectivity threshold Mn, is the smallest r such that the random geometric graph G( Xn, r) is connected. We show that as n ∞, almost surely nLnd/ n tends to a limit that depends on the geometry of A, and nMnd/ n tends to the same limit.