On modular categories with Frobenius-Perron dimension congruent to 2 modulo 4

Abstract

We contribute to the classification of modular categories C with FPdim(C) 2 4. We prove that such categories have group of invertibles of even order, and that they factorize as C C sem, where C is an odd-dimensional modular category and sem is the rank 2 pointed modular category. This reduces the classification of these categories to the classification of odd-dimensional modular categories. It follows that modular categories C with FPdim(C) 2 4 of rank up to 46 are pointed. More generally, we prove that if C is a weakly integral MTC and p is an odd prime dividing the order of the group of invertibles that has multiplicity one in FPdim( C), then we have a factorization C C Vec Zp, for C an MTC with dimension not divisible by p.