Type II quantum subgroups for quantum slN. II: Classification

Abstract

In this paper we study the indecomposable module categories over C(slN, k), the category of integrable level-k respresentations of affine Kac-Moody slN. Our first main result classifies these module categories in the case of generic k, i.e. k is sufficiently large relative to N. As C(slN, k) is a braided tensor category, there is a relative tensor product structure on its category of module categories. In the generic setting we obtain a formula for the relative tensor product rules between the indecomposable module categories. Our second main result classifies the indecomposable module categories over C(slN, k) for N≤ 7, with no restrictions on k. In this non-generic setting, exceptional module categories are obtained. This work relies heavily on previous results by the two authors. In previous literature, module category classification results were known only for sl2 and sl3.