English

Small Eigenvalues of Large Hankel Matrices

Classical Analysis and ODEs 2016-09-07 v1

Abstract

In this paper we investigate the smallest eigenvalue, denoted as \laN,\la_N, of a (N+1)×(N+1)(N+1)\times (N+1) Hankel or moments matrix, associated with the weight, w(x)=exp(x\bt),x>0,\bt>0w(x)=\exp(-x^{\bt}),x>0,\bt>0, in the large NN limit. Using a previous result, the asymptotics for the polynomials, Pn(z),z[0,)P_n(z),z\notin[0,\infty), orthonormal with respect to w,w, which are required in the determination of \laN\la_N are found. Adopting an argument of Szeg\"{o} the asymptotic behaviour of \laN\la_N, for \bt>1/2\bt>1/2 where the related moment problem is determinate, is derived. This generalises the result given by Szeg\"{o} for \bt=1\bt=1. It is shown that for \bt>1/2\bt>1/2 the smallest eigenvalue of the infinite Hankel matrix is zero, while for 0<\bt<1/20<\bt<1/2 it is greater then a positive constant. This shows a phase transition in the corresponding Hermitian random matrix model as the parameter \bt\bt varies with \bt=1/2\bt=1/2 identified as the critical point. The smallest eigenvalue at this point is conjectured.

Keywords

Cite

@article{arxiv.math/0009238,
  title  = {Small Eigenvalues of Large Hankel Matrices},
  author = {Yang Chen and Nigel Lawrence},
  journal= {arXiv preprint arXiv:math/0009238},
  year   = {2016}
}

Comments

15 pages,1 figure