Quantum double inclusions associated to a family of Kac algebra subfactors (1901.11024v1)
Abstract: In \cite{Sde2018} we defined the notion of \textit{quantum double inclusion} associated to a finite-index and finite-depth subfactor and studied the quantum double inclusion associated to the Kac algebra subfactor $RH \subset R$ where $H$ is a finite-dimensional Kac algebra acting outerly on the hyperfinite $II_1$ 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 ${ RH \subset R \rtimes \underbrace{H \rtimes H* \rtimes \cdots}{{\text{$m$ times}}} : m \geq 1 }$. For each $m > 2$, we construct a model $\mathcal{N}m \subset \mathcal{M}$ for the quantum double inclusion of ${ RH \subset R \rtimes \underbrace{H \rtimes H* \rtimes \cdots}{{\text{$m-2$ times}}} }$ with $\mathcal{N}m = ((\cdots \rtimes H{-2} \rtimes H{-1}) \otimes (Hm \rtimes H{m+1} \cdots)){\prime \prime}, \mathcal{M} = (\cdots \rtimes H{-1} \rtimes H0 \rtimes H1 \rtimes \cdots){\prime \prime}$ 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 $P{\mathcal{N}m \subset \mathcal{M}}$ ($m > 2$), the subfactor planar algebra associated to $\mathcal{N}m \subset \mathcal{M}$, 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 $\mathcal{N}m \subset \mathcal{M}$ is always two. Observing that $\mathcal{N}m \subset \mathcal{M}$ is reducible for all $m > 2$, we explicitly describe the weak Hopf $C*$-algebra structure on $(\mathcal{N}m){\prime} \cap \mathcal{M}_2$, thus obtaining a family of weak Hopf $C*$-algebras starting with a single Kac algebra $H$.