A 4/7-limit law for the largest interpoint distance in a rotational ellipsoid

Abstract

Let Mn denote the largest interpoint distance among independent random points X1,…,Xn uniformly distributed in a compact set in Rd. Weak limit laws for Mn are known in several geometric settings, in particular for ellipsoids with a unique major axis. In this paper we treat the simplest nontrivial case in which the largest semi-axis is not unique, namely the rotational ellipsoid \(x1,x2,x3)∈R3: (x12+x22)/h2 + x32/a2 1\, where 0<a<h. The diameter of this ellipsoid is attained by all antipodal pairs on the equatorial circle, so the extremal points are not isolated. We prove that n4/7(2h-Mn) converges in distribution to a Weibull-type limit law with explicit parameter. The proof combines geometric localization arguments with a Chen--Stein Poisson approximation for rare nearly diametral pairs.