The covering radius of randomly distributed points on a manifold

Abstract

We derive fundamental asymptotic results for the expected covering radius (XN) for N points that are randomly and independently distributed with respect to surface measure on a sphere as well as on a class of smooth manifolds. For the unit sphere Sd ⊂ Rd+1, we obtain the precise asymptotic that E(XN)[N/ N]1/d has limit [(d+1)d+1/d]1/d as N ∞ , where d is the volume of the d-dimensional unit ball. This proves a recent conjecture of Brauchart et al. as well as extends a result previously known only for the circle. Likewise we obtain precise asymptotics for the expected covering radius of N points randomly distributed on a d-dimensional ball, a d-dimensional cube, as well as on a 3-dimensional polyhedron (where the points are independently distributed with respect to volume measure). More generally, we deduce upper and lower bounds for the expected covering radius of N points that are randomly and independently distributed on a metric measure space, provided the measure satisfies certain regularity assumptions.