On random convex chains, orthogonal polynomials, PF sequences and probabilistic limit theorems

Abstract

Let T be the triangle in the plane with vertices (0,0), (0,1) and (0,1). The convex hull of (0,1), (1,0) and n independent random points uniformly distributed in T is the random convex chain Tn. A three-term recursion for the probability generating function Gn of the number f0(Tn) of vertices of Tn is proved. Via the link to orthogonal polynomials it is shown that Gn has precisely n distinct real roots in (-∞,0] and that the sequence pk(n):=P(f0(Tn)=k), k=1,…,n, is a Polya frequency (PF) sequence. A selection of probabilistic consequences of this surprising and remarkable fact are discussed in detail.