A note on random orthogonal polynomials on a compact interval

Abstract

We consider a uniform distribution on the set Mk of moments of order k ∈ N corresponding to probability measures on the interval [0,1]. To each (random) vector of moments in M2n-1 we consider the corresponding uniquely determined monic (random) orthogonal polynomial of degree n and study the asymptotic properties of its roots if n ∞.