Expected hyperbolic volumes of random beta polytopes

Abstract

Let X1,…,Xn be independent random points in the closed unit ball of Rd. Assume that each Xi has a beta distribution with parameter βi -1: if βi>-1, then Xi has Lebesgue density proportional to (1-\|x\|2)βi on \\|x\|<1\, whereas the case βi=-1 corresponds to the uniform distribution on the unit sphere \\|x\|=1\. Let [X1,…,Xn] denote the convex hull of these points. Interpreting the unit ball as the Klein model of hyperbolic geometry, we derive closed-form formulas for the expected hyperbolic volume of the random hyperbolic polytope [X1,…,Xn]. As a special case, if X1,…,Xn are independent and uniformly distributed on the unit sphere in R3, then for every n 4, \[ E\,Vol3hyp\!([X1,…,Xn]) = π(n2-Σj=1n-11j). \]