A new application of Random Matrices: Ext(C*red(F2)) is not a group
Abstract
In the process of developing the theory of free probability and free entropy, Voiculescu introduced in 1991 a random matrix model for a free semicircular system. Since then, random matrices have played a key role in von Neumann algebra theory (cf. [V8], [V9]). The main result of this paper is the following extension of Voiculescu's random matrix result: Let X1(n),...,Xr(n) be a system of r stochastically independent n by n Gaussian self-adjoint random matrices as in Voiculescu's random matrix paper [V4], and let (x1,...,xr) be a semi-circular system in a C*-probability space. Then for every polynomial p in r noncommuting variables limn->oo||p(X1(n),...,Xr(n))|| = ||p(x1,...,xr)||, for almost all omega in the underlying probability space. We use the result to show that the Ext-invariant for the reduced C*-algebra of the free group on 2 generators is not a group but only a semi-group. This problem has been open since Anderson in 1978 found the first example of a C*-algebra A for which Ext(A) is not a group.
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