Representations of fusion categories and their commutants

Abstract

A bicommutant category is a higher categorical analog of a von Neumann algebra. We study the bicommutant categories which arise as the commutant C' of a fully faithful representation CBim(R) of a unitary fusion category C. Using results of Izumi, Popa, and Tomatsu about existence and uniqueness of representations of unitary (multi)fusion categories, we prove that if C and D are Morita equivalent unitary fusion categories, then their commutant categories C' and D' are equivalent as bicommutant categories. In particular, they are equivalent as tensor categories: \[ (\,\,C\,\,Morita\,\,D\,\,) (\,\,C'\,\,tensor\,\,D'\,\,). \] This categorifies the well-known result according to which the commutants (in some representations) of Morita equivalent finite dimensional C*-algebras are isomorphic von Neumann algebras, provided the representations are `big enough'. We also introduce a notion of positivity for bi-involutive tensor categories. For dagger categories, positivity is a property (the property of being a C*-category). But for bi-involutive tensor categories, positivity is extra structure. We show that unitary fusion categories and Bim(R) admit distinguished positive structures, and that fully faithful representations CBim(R) automatically respect these positive structures.