Torsorial actions on G-crossed braided tensor categories

Abstract

We develop a method for generating the complete set of basic data under the torsorial actions of H2[](G,A) and H3(G,U(1)) on a G-crossed braided tensor category CG×, where A is the set of invertible simple objects in the braided tensor category C. When C is a modular tensor category, the H2[](G,A) and H3(G,U(1)) torsorial action gives a complete generation of possible G-crossed extensions, and hence provides a classification. This torsorial classification can be (partially) collapsed by relabeling equivalences that appear when computing the set of G-crossed braided extensions of C. The torsor method presented here reduces these redundancies by systematizing relabelings by A-valued 1-cochains. We also use our methods to compute the composition rule of these torsor functors.