| 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, characterized by the Dyson parameter β, and the Laguerre weight  ,  in the hard edge limit. The latter relates to the eigenvalues in the vicinity of the origin in the scaled variable  . Previous work has established the corresponding functional form of various statistical quantities—for example, the distribution of the smallest eigenvalue, provided that  . We show, using the theory of multidimensional hypergeometric functions based on Jack polynomials, that with the modified hard edge scaling  , the rate of convergence to the limiting distribution is  , which is optimal. In the case  , general  the explicit functional form of the distribution of the smallest eigenvalue at this order can be computed, as it can for  and general  . An iterative scheme is presented to numerically approximate the functional form for general  . |
