Finite size corrections at the hard edge for the Laguerre β ensemble

Abstract

A fundamental question in random matrix theory is to quantify the optimal rate of convergence to universal laws. We take up this problem for the Laguerre β ensemble, characterised by the Dyson parameter β, and the Laguerre weight xa e-β x/2, x > 0 in the hard edge limit. The latter relates to the eigenvalues in the vicinity of the origin in the scaled variable x x/4N. Previous work has established the corresponding functional form of various statistical quantities --- for example the distribution of the smallest eigenvalue, provided that a ∈ Z 0. We show, using the theory of multidimensional hypergeometric functions based on Jack polynomials, that with the modified hard edge scaling x x/4(N+a/β), the rate of convergence to the limiting distribution is O(1/N2), which is optimal. In the case β = 2, general a> -1 the explicit functional form of the distribution of the smallest eigenvalue at this order can be computed, as it can for a=1 and general β > 0. An iterative scheme is presented to numerically approximate the functional form for general a ∈ Z 2.