Tensor C*-categories arising as bimodule categories of II1 factors

Abstract

We prove that if C is a tensor C*-category in a certain class, then there exists an uncountable family of pairwise non stably isomorphic II1 factors (Mi) such that the bimodule category of Mi is equivalent to C for all i. In particular, we prove that every finite tensor C*-category is the bimodule category of a II1 factor. As an application we prove the existence of a II1 factor for which the set of indices of finite index irreducible subfactors is 1, 5 + 132, 12 + 313, 4 + 13, 11 + 3132, 13 + 3132, 19 + 5132, 7 + 132. We also give the first example of a II1 factor M such that Bimod(M) is explicitly calculated and has an uncountable number of isomorphism classes of irreducible objects.