Cyclic extensions of fusion categories via the Brauer-Picard groupoid

Abstract

We construct a long exact sequence computing the obstruction space, pi1(BrPic(C0)), to G-graded extensions of a fusion category C0. The other terms in the sequence can be computed directly from the fusion ring of C0. We apply our result to several examples coming from small index subfactors, thereby constructing several new fusion categories as G-extensions. The most striking of these is a Z/2Z-extension of one of the Asaeda-Haagerup fusion categories, which is one of only two known 3-supertransitive fusion categories outside the ADE series. In another direction, we show that our long exact sequence appears in exactly the way one expects: it is part of a long exact sequence of homotopy groups associated to a naturally occuring fibration. This motivates our constructions, and gives another example of the increasing interplay between fusion categories and algebraic topology.