Type II quantum subgroups of slN. I: Symmetries of local modules

Abstract

This paper is the first of a pair that aims to classify a large number of the type II quantum subgroups of the categories C(slr+1,k). In this work we classify the braided auto-equivalences of the categories of local modules for all known type I quantum subgroups of C(slr+1,k). We find that the symmetries are all non-exceptional except for four cases (up to level-rank duality). These exceptional cases are the orbifolds C( sl2,16)Rep(Z2), C( sl3,9)Rep(Z3), C( sl4,8)Rep(Z4), and C( sl5,5)Rep(Z5). We develop several technical tools in this work. We give a skein theoretic description of the orbifold quantum subgroups of C(slr+1,k). Our methods here are general, and the techniques developed will generalise to give skein theory for any orbifold of a braided tensor category. We also give a formulation of orthogonal level-rank duality in the type D-D case, which is used to construct one of the exceptionals. Finally we uncover an unexpected connection between quadratic categories and exceptional braided auto-equivalences of the orbifolds. We use this connection to construct two of the four exceptionals. In the sequel to this paper we will use the classified braided auto-equivalences to construct the corresponding type II quantum subgroups of the categories C(slr+1,k). When paired with Gannon's type I classification for r≤ 6, this will complete the type II classification for these same ranks. This paper includes an appendix by Terry Gannon, which provides useful results on the dimensions of objects in the categories C(slr+1,k).