From a Kac algebra subfactor to Drinfeld double

Abstract

Given a finite-index and finite-depth subfactor, we define the notion of quantum double inclusion - a certain unital inclusion of von Neumann algebras constructed from the given subfactor - which is closely related to that of Ocneanu's asymptotic inclusion. We show that the quantum double inclusion when applied to the Kac algebra subfactor RH ⊂ R produces Drinfeld double of H where H is a finite-dimensional Kac algebra acting outerly on the hyperfinite II1 factor R and RH denotes the fixed-point subalgebra. More precisely, quantum double inclusion of RH ⊂ R is isomorphic to R ⊂ R D(H)cop for some outer action of D(H)cop on R where D(H) denotes the Drinfeld double of H.