Almost commuting matrices and stability for product groups

Abstract

We prove that any product of two non-abelian free groups, = Fm× Fk, for m,k≥ 2, is not Hilbert-Schmidt stable. This means that there exist asymptotic representations πn:→ U(dn) with respect to the normalized Hilbert-Schmidt norm which are not close to actual representations. As a consequence, we prove the existence of contraction matrices A,B such that A almost commutes with B and B*, with respect to the normalized Hilbert-Schmidt norm, but A,B are not close to any matrices A',B' such that A' commutes with B' and B'*. This settles in the negative a natural version of a question concerning almost commuting matrices posed by Rosenthal in 1969.