Categorical Symmetries via Operator Algebras

Abstract

We propose that the symmetry category associated to a 2D quantum field theory with 0-form G-symmetry with 't Hooft anomaly k∈ H4(BG,Z) for a large class of Lie groups G is the category of twisted measurable fields of Hilbert spaces over G denoted by Hilbk(G), which is equivalent to the category of unitary representations of C0(G) with convolution product twisted by a multiplicative bundle gerbe labeled by k denoted by Repk(C0(G)). We find that the Drinfeld center of the symmetry category Z(Hilbk(G)) equivalent to the category of unitary representations of the groupoid C*-algebra of the Fell line bundle k over the conjugation action groupoid G// Ad G, denoted by Rep(C*(G// AdG,k)), where the twist is characterized by the transgression τ(k)∈ H2(G// AdG,U(1)). To the full generality, our framework applies to a Lie group G that is a direct product of a compact connected Lie group and a number of R or GL(1,C) factors. We compute the braiding of anyon lines in the bulk 3D SymTFT from this formalism. Finally we provide physical examples for abelian and non-abelian G, and discuss the physical consequences of flat gauging continuous global symmetries.