Fiber Functors of Equivariantizations of Finite Tensor Categories

Abstract

Let G be a finite group acting on a finite tensor category C. We classify fiber functors on the equivariantization CG in terms of equivariant exact module categories over C, indexed by subgroups of G. The data are a subgroup H⊂eq G and an H-equivariant C-module category M whose underlying C-module category is indecomposable, exact, and semisimple; they give a fiber functor precisely when H acts transitively on the simple objects of M and the stabilizer cocycle of one, hence every, simple object is non-degenerate. Through Tannaka-Krein reconstruction this describes realizations of CG as the representation category of a finite-dimensional Hopf algebra, with no semisimplicity hypothesis on C. As applications, for odd primes p we determine the fiber functors on Rep(Hp), where Hp denotes Nikshych's semisimple Hopf algebra of dimension 4p2: there is one equivalence class if p 3 4 and two if p 1 4. We also use the classification for gaugings to determine which non-pointed entries in the small-dimensional list of Green and Nikshych are representation categories of semisimple factorizable Hopf algebras.

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