The exoticness and realisability of twisted Haagerup-Izumi modular data

Abstract

The quantum double of the Haagerup subfactor, the first irreducible finite depth subfactor with index above 4, is the most obvious candidate for exotic modular data. We show that its modular data DHg fits into a family Dω Hg2n+1, where n 0 and ω∈ 2n+1. We show D0 Hg2n+1 is related to the subfactors Izumi hypothetically associates to the cyclic groups Z2n+1. Their modular data comes equipped with canonical and dual canonical modular invariants; we compute the corresponding alpha-inductions etc. In addition, we show there are (respectively) 1, 2, 0 subfactors of Izumi type Z7, Z9 and Z32, and find numerical evidence for 2, 1, 1, 1, 2 subfactors of Izumi type Z11,Z13,Z15,Z17,Z19 (previously, Izumi had shown uniqueness for Z3 and Z5), and we identify their modular data. We explain how DHg (more generally Dω Hg2n+1) is a graft of the quantum double DSym(3) (resp. the twisted double Dω D2n+1) by affine so(13) (resp. so(4n2+4n+5)) at level 2. We discuss the vertex operator algebra (or conformal field theory) realisation of the modular data Dω Hg2n+1. For example we show there are exactly 2 possible character vectors (giving graded dimensions of all modules) for the Haagerup VOA at central charge c=8. It seems unlikely that any of this twisted Haagerup-Izumi modular data can be regarded as exotic, in any reasonable sense.