2-Group Symmetries of 3-dimensional Defect TQFTs and Their Gauging

Abstract

A large class of symmetries of topological quantum field theories is naturally described by functors into higher categories of topological defects. Here we study 2-group symmetries of 3-dimensional TQFTs. We explain that these symmetries can be gauged to produce new TQFTs iff certain defects satisfy the axioms of orbifold data. In the special case of Reshetikhin-Turaev theories coming from G-crossed braided fusion categories C×G, we show that there are 0- and 1-form symmetries which have no obstructions to gauging. We prove that gauging the 0-form G-symmetry on the neutral component Ce of C×G produces its equivariantisation ( C×G)G, which in turn features a generalised symmetry whose gauging recovers Ce. If G is commutative, the latter symmetry reduces to a 1-form symmetry involving the Pontryagin dual group.