On fundamental groups of tensor product II1 factors

Abstract

Let M be a II1 factor and let F(M) denote the fundamental group of M. In this article, we study the following property of M: for arbitrary II1 factor B, we have F(M B)=F(M)F(B). We prove that for any subgroup G≤ R*+ which is realized as a fundamental group of a II1 factor, there exists a II1 factor M which satisfies this property and whose fundamental group is G. Using this, we deduce that if G,H ≤ R*+ are realized as fundamental groups of II1 factors (with separable predual), then so are groups G · H and G H.