Title: Module categories of the generic Virasoro VOA and quantum groups
Abstract:In this paper, we prove the equivalence between two braided tensor categories. On the one hand, we consider the category of modules of the Virasoro vertex operator algebra with a generic central charg...In this paper, we prove the equivalence between two braided tensor categories. On the one hand, we consider the category of modules of the Virasoro vertex operator algebra with a generic central charge (generic Virasoro VOA) generated by those simple modules lying in the first row of the Kac table. On the other hand, we take the category of finite-dimensional type I modules of the quantum group $\mathcal{U}_{q} (\mathfrak{sl}_{2})$ with $q$ determined by the central charge. This is a continuation of our previous work in which we examined intertwining operators for the generic Virasoro VOA in detail. Our strategy to show the categorical equivalence is to take those results as input and directly compare the structures of the tensor categories. Therefore, we are to execute the most elementary proof of categorical equivalence. We also study the category of $C_{1}$-cofinite modules of the generic Virasoro VOA. We show that it is equivalent to the category of finite-dimensional type I modules of $\mathcal{U}_{q} (\mathfrak{sl}_{2})\otimes \mathcal{U}_{\tilde{q}} (\mathfrak{sl}_{2})$ as a tensor category, where $q$ and $\tilde{q}$ are again related to the central charge.Read More