Non-commutative rational function in strongly convergent random variables

Abstract

Random matrices like GUE, GOE and GSE have been studied for decades and have been shown that they possess a lot of nice properties. In 2005, a new property of independent GUE random matrices is discovered by Haagerup and Thorbjrnsen in their paper [18], it is called strong convergence property and then more random matrices with this property are followed (see [27], [5], [1], [24], [10] and [3]). In general, the definition can be stated for a sequence of tuples over some C-algebras. And in this general setting, some stability property under reduced free product can be achieved (see Skoufranis [30] and Pisier [26]), as an analogy of the result by Camille Male [24] for random matrices. In this paper, we want to show that, for a sequence of strongly convergent random variables, non-commutative polynomials can be extended to non-commutative rational functions under certain assumptions. Roughly speaking, the strong convergence property is stable under taking the inverse. As a direct corollary, we can conclude that for a tuple (X1(n),·s,Xm(n)) of independent GUE random matrices, r(X1(n),·s,Xm(n)) converges in trace and in norm to r(s1,·s,sm) almost surely, where r is a rational function and (s1,·s,sm) is a tuple of freely independent semi-circular elements which lies in the domain of r.