Flat Gauging of Continuous (Non-invertible) Symmetries and Non-compact BF SymTFT for Compact Boson

Abstract

We study flat gauging of continuous symmetries by summing over flat gauge-field configurations. We focus on the two-dimensional compact boson and construct the torus partition function with general flat U(1)M× U(1)W backgrounds. We show that flat gauging either U(1)M or U(1)W decompactifies the theory to the non-compact free boson, and that the dual Z background combines with the remaining U(1) background into a non-compact R symmetry background due to the mixed anomaly. We also revisit the self-dual radius, where flat gauging the diagonal SO(3)⊂ (SU(2)L× SU(2)R)/Z2, first pointed out by Gaberdiel and Suchanek, gives the continuous orbifold which lies outside the usual c=1 moduli space. On the orbifold branch, we study finite and continuous non-invertible flat gaugings and explain why the continuous case requires a prescription for zero-measure fixed loci on the moduli space. Finally, we formulate the SymTFT of torus sigma models as a non-compact BF theory, whose topological boundary states encode the Narain moduli space and the O(D,D;Z) T-duality action.