The middle-scale asymptotics of Wishart matrices

Abstract

We study the behavior of a real p-dimensional Wishart random matrix with n degrees of freedom when n,p→∞ but p/n→ 0. We establish the existence of phase transitions when p grows at the order n(K+1)/(K+3) for every k∈N, and derive expressions for approximating densities between every two phase transitions. To do this, we make use of a novel tool we call the G-transform of a distribution, which is closely related to the characteristic function. We also derive an extension of the t-distribution to the real symmetric matrices, which naturally appears as the conjugate distribution to the Wishart under a G-transformation, and show its empirical spectral distribution obeys a semicircle law when p/n→ 0. Finally, we discuss how the phase transitions of the Wishart distribution might originate from changes in rates of convergence of symmetric t statistics.