Non-trivially graded self-dual fusion categories of rank 4
Abstract
Let C be a self-dual spherical fusion categories of rank 4 with non-trivial grading. We complete the classification of Grothendieck ring K(C) of C; that is, we prove that K(C) Fib[Z2], where Fib is the Fibonacci fusion ring and Z[Z2] is the group ring on Z2. In particular, if C is braided then it is equivalent to FibVecZ2ω as fusion categories, where Fib is a Fibonacci category and VecZ2ω is a rank 2 pointed fusion category.
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