Asymptotic expansion for transport maps between laws of multimatrix models

Abstract

We study the large-N behavior of random matrix tuples YN = (Y1N,…,YdN) with joint density proportional to e-N2 V for some convex function V in non-commuting variables satisfying certain bounds on its second derivative. We give an asymptotic expansion in powers of 1/N2 of the trace of noncommutative smooth functions of YN. We also give an asymptotic expansion for a family of maps TN that transport the law of a tuple of independent GUE random matrices to the law of YN and, as a consequence, show strong convergence for the multimatrix models YN. Our proof is based on an asymptotic expansion for the heat semigroup associated to the measure, which is expressed in terms of smooth functions of a matrix Brownian motion (SNt)t ≥ 0. We introduce spaces of noncommutative smooth functions that unify and generalize the cases of polynomials and single-variable smooth functions and allow the systematic application of asymptotic expansion techniques to multimatrix models with convex interaction.