Classification of maximally non-self-dual modular categories of small dimension

Abstract

We prove that a non-pointed maximally non-self-dual (MNSD) modular category of Frobenius-Perron (FP) dimension less than 2025 has at most two possible types, and all these types can be realized except those of FP dimension 675, 729 and 1125. We also prove that all these modular categories are group-theoretical except the modular categories of dimension 675. Our result shows that a non-group-theoretical MNSD modular category of smallest FP dimension may be the category of FP dimension 675, and non-pointed MNSD modular category of smallest FP dimension is the category of FP dimension 243.