Asymptotic expansion of smooth functions in polynomials in deterministic matrices and iid GUE matrices

Abstract

Let XN be a family of N× N independent GUE random matrices, ZN a family of deterministic matrices, P a self-adjoint non-commutative polynomial, that is for any N, P(XN) is self-adjoint, f a smooth function. We prove that for any k, if f is smooth enough, there exist deterministic constants αiP(f,ZN) such that E[1NTr( f(P(XN,ZN)) )]\ =\ Σi=0k αiP(f,ZN)N2i\ +\ O(N-2k-2) . Besides the constants αiP(f,ZN) are built explicitly with the help of free probability. In particular, if x is a free semicircular system, then when the support of f and the spectrum of P(x,ZN) are disjoint, for all i, αiP(f,ZN)=0. As a corollary, we prove that given α<1/2, for N large enough, every eigenvalue of P(XN,ZN) is N-α-close from the spectrum of P(x,ZN).