Smooth Multi-Trace Statistics of Classical Ensembles: Large N Expansions, Cumulants, and Matrix Integrals

Abstract

We consider expectations of the form E [tr h1(X1N)... tr hr(XrN)], where XiN are self-adjoint polynomials in various independent classical random matrices and hi are smooth test function and obtain a large N expansion of these quantities, building on the framework of polynomial approximation and Bernstein-type inequalities recently developed by Chen, Garza-Vargas, Tropp, and van Handel. As applications of the above, we prove the higher-order asymptotic vanishing of cumulants for smooth linear statistics, establish a Central Limit Theorem, and demonstrate the existence of formal asymptotic expansions for the free energy and observables of matrix integrals with smooth potentials.