SymSETs and self-dualities under gauging non-invertible symmetries

Abstract

The self-duality defects under discrete gauging in a categorical symmetry C can be classified by inequivalent ways of enriching the bulk SymTFT of C with Z2 0-form symmetry. The resulting Symmetry Enriched Topological (SET) orders will be referred to as SymSETs and are parameterized by choices of Z2 symmetries, as well as symmetry fractionalization classes and discrete torsions. In this work, we consider self-dualities under gauging non-invertible 0-form symmetries in 2-dim QFTs and explore their SymSETs. Unlike the simpler case of self-dualities under gauging finite Abelian groups, the SymSETs here generally admit multiple choices of fractionalization classes. We provide a direct construction of the SymSET from a given duality defect using its relative center. Using the SymSET, we show explicitly that changing fractionalization classes can change fusion rules of the duality defect besides its F-symbols. We consider three concrete examples: the maximal gauging of Rep H8, the non-maximal gauging of the duality defect N in Rep H8 and Rep D8 respectively. The latter two cases each result in 6 fusion categories with two types of fusion rules related by changing fractionalization class. In particular, two self-dualities of Rep D8 related by changing the fractionalization class lead to Rep D16 and Rep SD16 respectively. Finally, we study the physical implications such as the spin selection rules and the SPT phases for the aforementioned categories.