G-crossed braided zesting
Abstract
For a finite group G, a G-crossed braided fusion category is G-graded fusion category with additional structures, namely a G-action and a G-braiding. We develop the notion of G-crossed braided zesting: an explicit method for constructing new G-crossed braided fusion categories from a given one by means of cohomological data associated with the invertible objects in the category and grading group G. This is achieved by adapting a similar construction for (braided) fusion categories recently described by the authors. All G-crossed braided zestings of a given category C are G-extensions of their trivial component and can be interpreted in terms of the homotopy-based description of Etingof, Nikshych and Ostrik. In particular, we explicitly describe which G-extensions correspond to G-crossed braided zestings.
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