The smallest eigenvalue of Hankel matrices

Abstract

Let HN=(sn+m),n,m N denote the Hankel matrix of moments of a positive measure with moments of any order. We study the large N behaviour of the smallest eigenvalue lambdaN of HN. It is proved that lambdaN has exponential decay to zero for any measure with compact support. For general determinate moment problems the decay to 0 of lambdaN can be arbitrarily slow or arbitrarily fast. In the indeterminate case, where lambdaN is known to be bounded below by a positive constant, we prove that the limit of the n'th smallest eigenvalue of HN for N tending to infinity tends rapidly to infinity with n. The special case of the Stieltjes-Wigert polynomials is discussed.