English

Universality in Random Moment Problems

Probability 2018-05-31 v1

Abstract

Let Mn(E)\mathcal{M}_n(E) denote the set of vectors of the first nn moments of probability measures on ERE\subset\mathbb{R} with existing moments. The investigation of such moment spaces in high dimension has found considerable interest in the recent literature. For instance, it has been shown that a uniformly distributed moment sequence in Mn([0,1])\mathcal M_n([0,1]) converges in the large nn limit to the moment sequence of the arcsine distribution. In this article we provide a unifying viewpoint by identifying classes of more general distributions on Mn(E)\mathcal{M}_n(E) for E=[a,b],E=R+E=[a,b],\,E=\mathbb{R}_+ and E=RE=\mathbb{R}, respectively, and discuss universality problems within these classes. In particular, we demonstrate that the moment sequence of the arcsine distribution is not universal for EE being a compact interval. On the other hand, on the moment spaces Mn(R+)\mathcal{M}_n(\mathbb{R}_+) and Mn(R)\mathcal{M}_n(\mathbb{R}) the random moment sequences governed by our distributions exhibit for nn\to\infty a universal behaviour: The first kk moments of such a random vector converge almost surely to the first kk moments of the Marchenko-Pastur distribution (half line) and Wigner's semi-circle distribution (real line). Moreover, the fluctuations around the limit sequences are Gaussian. We also obtain moderate and large deviations principles and discuss relations of our findings with free probability.

Keywords

Cite

@article{arxiv.1709.02266,
  title  = {Universality in Random Moment Problems},
  author = {Holger Dette and Dominik Tomecki and Martin Venker},
  journal= {arXiv preprint arXiv:1709.02266},
  year   = {2018}
}

Comments

24 pages

R2 v1 2026-06-22T21:36:02.531Z