Classification of 1-super-transitive quantum subgroups in type A

Abstract

We define a notion of super-transitivity for \`etale algebra objects A ∈ C(slN, k). This definition is a direct analogue of the notion of super-transitivity for subfactors, and measures at what depth the first ``new stuff'' appears in the category of A-modules internal to C(slN, k). Our main theorem gives a classification of all 1-super-transitive \`etale algebra objects in C(slN, k) running over all N,k ∈ N. Our classification captures all known infinite families of non-pointed \`etale algebras in C(slN, k), and includes all but 16 of the known non-pointed \`etale algebra objects in these categories. These remaining 16 known examples have super-transitivities between 2 and 4.