On the minimal extension and structure of weakly group-theoretical braided fusion categories

Abstract

We show that any slightly degenerate weakly group-theoretical fusion category admits a minimal non-degenerate extension. Let d be a positive square-free integer, given a weakly group-theoretical non-degenerate fusion category C, assume that FPdim(C)=nd and (n,d)=1. If (FPdim(X)2,d)=1 for all simple objects X of C, then we show that C contains a non-degenerate fusion subcategory C(Zd,q). In particular, we obtain that integral fusion categories of FP-dimensions pmd such that C'⊂eq sVec are nilpotent and group-theoretical, where p is a prime and (p,d)=1.