Asymptotics for products of characteristic polynomials in classical β-Ensembles

Abstract

We study the local properties of eigenvalues for the Hermite (Gaussian), Laguerre (Chiral) and Jacobi β-ensembles of N× N random matrices. More specifically, we calculate scaling limits of the expectation value of products of characteristic polynomials as N∞. In the bulk of the spectrum of each β-ensemble, the same scaling limit is found to be ep11F1 whose exact expansion in terms of Jack polynomials is well known. The scaling limit at the soft edge of the spectrum for the Hermite and Laguerre β-ensembles is shown to be a multivariate Airy function, which is defined as a generalized Kontsevich integral. As corollaries, when β is even, scaling limits of the k-point correlation functions for the three ensembles are obtained. The asymptotics of the multivariate Airy function for large and small arguments is also given. All the asymptotic results rely on a generalization of Watson's lemma and the steepest descent method for integrals of Selberg type.