Symmetric functions of two noncommuting variables

Abstract

We prove a noncommutative analogue of the fact that every symmetric analytic function of (z,w) in the bidisc 2 can be expressed as an analytic function of the variables z+w and zw. We construct an analytic nc-map S from the biball to an infinite-dimensional nc-domain with the property that, for every bounded symmetric function of two noncommuting variables that is analytic on the biball, there exists a bounded analytic nc-function on such that = S. We also establish a realization formula for , and hence for , in terms of operators on Hilbert space.