Topological generation results for free unitary and orthogonal groups

Abstract

We show that for every N 3 the free unitary group U+N is topologically generated by its classical counterpart UN and the lower-rank U+N-1. This allows for a uniform inductive proof that a number of finiteness properties, known to hold for all N 3, also hold at N=3. Specifically, all discrete quantum duals U+N and O+N are residually finite, and hence also have the Kirchberg factorization property and are hyperlinear. As another consequence, U+N are topologically generated by UN and their maximal tori Z*N (dual to the free groups on N generators) and similarly, O+N are topologically generated by ON and their tori Z2*N.