Fusion Categories Associated to Subfactors with Index 3+5

Abstract

We classify fusion categories which are Morita equivalent to even parts of subfactors with index 3+5 , and module categories over these fusion categories. For the fusion category C which is the even part of the self-dual 3Z/2Z × Z/2Z subfactor, we show that there are 30 simple module categories over C; there are no other fusion categories in the Morita equivalence class; and the order of the Brauer-Picard group is 360. The proof proceeds indirectly by first describing the Brauer-Picard groupoid of a Z/3Z -equivariantization CZ/3Z (which is the even part of the 4442 subfactor). We show that that there are exactly three other fusion categories in the Morita equivalence class of CZ/3Z , which are all Z/3Z -graded extensions of C . Each of these fusion categories admits 20 simple module categories, and their Brauer-Picard group is S3 . We also show that there are exactly five fusion categories in the Morita equivalence class of the even parts of the 3Z/4Z subfactor; each admits 7 simple module categories; and the Brauer-Picard group is Z/2Z .