The classification of 3n subfactors and related fusion categories

Abstract

We investigate a (potentially infinite) series of subfactors, called 3n subfactors, including A4, A7, and the Haagerup subfactor as the first three members corresponding to n=1,2,3. Generalizing our previous work for odd n, we further develop a Cuntz algebra method to construct 3n subfactors and show that the classification of the 3n subfactors and related fusion categories is reduced to explicit polynomial equations under a mild assumption, which automatically holds for odd n.In particular, our method with n=4 gives a uniform construction of 4 finite depth subfactors, up to dual,without intermediate subfactors of index 3+5. It also provides a key step for a new construction of the Asaeda-Haagerup subfactor due to Grossman, Snyder, and the author.