Multiplication of Weak Equivalence Classes May Be Discontinuous

Abstract

For a countably infinite group , let W denote the space of all weak equivalence classes of measure-preserving actions of on atomless standard probability spaces, equipped with the compact metrizable topology introduced by Ab\'ert and Elek. There is a natural multiplication operation on W (induced by taking products of actions) that makes W an Abelian semigroup. Burton, Kechris, and Tamuz showed that if is amenable, then W is a topological semigroup, i.e., the product map W × W W (a, b) a × b is continuous. In contrast to that, we prove that if is a Zariski dense subgroup of SLd(Z) for some d ≥slant 2 (for instance, if is a non-Abelian free group), then multiplication on W is discontinuous, even when restricted to the subspace FW of all free weak equivalence classes.