The SymTFT for N-ality defects: Part I

Abstract

In order to obtain the SymTFT for a theory with an N-ality extension of a discrete, Abelian group G, one begins by considering a bulk G-gauge theory, and then gauges an appropriate ZN symmetry. This procedure involves three choices: the choice of a suitable bulk ZN symmetry, of a fractionalization class, and of a discrete torsion. The first choice is, somewhat surprisingly, the most involved, and in this paper we discuss it in detail. In particular, we show that the choice of bulk ZN symmetry determines all boundary F-symbols with a single incoming N-ality defect, and that any theory with an N-ality symmetry is invariant under a certain twisted gauging given in terms of these F-symbols. These F-symbols can furthermore be input into the pentagon identities to obtain the other F-symbols, up to freedoms related to the choices appearing in the second and third steps of bulk gauging. Although many of our results hold for general N, we restrict ourselves in some places to the case of N=p prime. In particular, for generic triality defects, we acquire explicit F-symbols which are reminiscent of those in Tambara-Yamagami fusion categories.