Quantum double inclusions associated to a family of Kac algebra subfactors

Abstract

In Sde2018 we defined the notion of quantum double inclusion associated to a finite-index and finite-depth subfactor and studied the quantum double inclusion associated to the Kac algebra subfactor RH ⊂ R where H is a finite-dimensional Kac algebra acting outerly on the hyperfinite II1 factor R and RH denotes the fixed-point subalgebra. In this article we analyse quantum double inclusions associated to the family of Kac algebra subfactors given by \ RH ⊂ R H H* ·sm times : m ≥ 1 \. For each m > 2, we construct a model Nm ⊂ M for the quantum double inclusion of \ RH ⊂ R H H* ·sm-2 times \ with Nm = ((·s H-2 H-1) (Hm Hm+1 ·s)) , M = (·s H-1 H0 H1 ·s) and where for any integer i, Hi denotes H or H* according as i is odd or even. In this article, we give an explicit description of PNm ⊂ M (m > 2), the subfactor planar algebra associated to Nm ⊂ M, which turns out to be a planar subalgebra of *(m)\!P(Hm) (the adjoint of the m-cabling of the planar algebra of Hm). We then show that for m > 2, depth of Nm ⊂ M is always two. Observing that Nm ⊂ M is reducible for all m > 2, we explicitly describe the weak Hopf C*-algebra structure on (Nm) M2, thus obtaining a family of weak Hopf C*-algebras starting with a single Kac algebra H.