A categorical Connes' (M)

Abstract

Popa introduced the tensor category (M) of approximately inner, centrally trivial bimodules of a II1 factor M, generalizing Connes' (M). We extend Popa's notions to define the W*-tensor category End loc(C) of local endofunctors on a W*-category C. We construct a unitary braiding on End loc(C), giving a new construction of a braided tensor category associated to an arbitrary W*-category. For the W*-category of finite modules over a II1 factor, this yields a unitary braiding on Popa's (M), which extends Jones' invariant for (M). Given a finite depth inclusion M0⊂eq M1 of non-Gamma II1 factors, we show that the braided unitary tensor category (M∞) is equivalent to the Drinfeld center of the standard invariant, where M∞ is the inductive limit of the associated Jones tower. This implies that for any pair of finite depth non-Gamma subfactors N0⊂eq N1 and M0⊂eq M1, if the standard invariants are not Morita equivalent, then the inductive limit factors N∞ and M∞ are not stably isomorphic.