Candidate Gaugings of Categorical Continuous Symmetry

Abstract

Different gaugings of the global symmetry of a quantum field theory are closely related to its various phases. In this work, we study candidate gaugeable symmetries by analyzing candidate Lagrangian algebra data in the Drinfeld center of a symmetry category Ck(G) associated to a QFT with continuous global G-symmetry and possible 't Hooft anomaly labeled by an integer k. We use the combination of the BF theory and the level-k Chern-Simons theory with gauge group G as a semiclassical kernel-theoretic model for the corresponding SymTFT. Under two explicit assumptions, namely that this BF+kCS theory provides the relevant SymTFT model and that the common +1 eigenspaces of the resulting modular kernels detect candidate Lagrangian algebra data in the continuous setting, we derive candidate modular S- and T-kernels from Hopf-link and framing correlators in S3 semi-classically. We then use these kernels to obtain candidate modular invariants and candidate gaugings. The resulting formulas recover the established cases and suggest a possible extension of this kernel-theoretic picture to compact Lie groups.