Graded extensions of generalized Haagerup categories

Abstract

We classify certain Z2 -graded extensions of generalized Haagerup categories in terms of numerical invariants satisfying polynomial equations. In particular, we construct a number of new examples of fusion categories, including: Z2 -graded extensions of Z2n generalized Haagerup categories for all n ≤ 5 ; Z2 × Z2 -graded extensions of the Asaeda-Haagerup categories; and extensions of the Z2 × Z2 generalized Haagerup category by its outer automorphism group A4 . The construction uses endomorphism categories of operator algebras, and in particular, free products of Cuntz algebras with free group C*-algebras.