The Brauer-Picard groups of the fusion categories coming from the ADE subfactors

Abstract

We compute the group of Morita auto-equivalences of the even parts of the ADE subfactors, and Galois conjugates. To achieve this we study the braided auto-equivalences of the Drinfeld centres of these categories. We give planar algebra presentations for each of these Drinfeld centres, which we leverage to obtain information about the braided auto-equivalences of the corresponding categories. We also perform the same calculations for the fusion categories constructed from the full ADE subfactors. Of particular interest, the even part of the D10 subfactor is shown to have Brauer-Picard group S3 × S3. We develop combinatorial arguments to compute the underlying algebra objects of these invertible bimodules.