Pseudo-unitary non-self-dual fusion categories of rank 4

Abstract

A fusion category of rank 4 has either four self-dual objects or exactly two self-dual objects. We study fusion categories of rank 4 with exactly two self-dual objects, giving nearly a complete classification of those based ring that admit pseudo-unitary categorification. More precisely, we show that if C is such a fusion category, then its Grothendieck ring K(C) must be one of seven based rings, six of which have know categorifications. In doing so, we classify all based rings associated with near-group categories of the group Z/3Z.