Rates of convergence for laws of the spectral maximum of free random variables

Abstract

Let \Xn\n be a sequence of freely independent, identically distributed non-commutative random variables. Consider a sequence \Wn\n of the renormalized spectral maximum of random variables X1,·s, Xn. It is known that the renormalized spectral maximum Wn converges to the free extreme value distribution under certain conditions on the distribution function. In this paper, we provide a rate of convergence in the Kolmogorov distance between a distribution function of Wn and the free extreme value distribution.