M2-branes, Higher Form Symmetries and 1-Gerbes

Abstract

Higher-Form Symmetries (HFS) of a closed bosonic M2-brane formulated on a compactified target space M9 × T2 are investigated. We show that there is an obstruction to the gauging of these global symmetries in the presence of background fields, a mixed 't~Hooft anomaly. Its cancellation is obtained by the inflow term constructed in terms of gauge fields which are flat connections on a U(1)-principal bundle and a torsion G1∇c-gerbe on the M2-brane worldvolume. The effect of these gauge structures together with non trivial winding embedding maps ensures the breaking of the continuous HFS U(1) symmetry to a discrete subgroup and a worldvolume flux condition on the M2-brane. A Wilson surface, identified with the holonomy Hol∇ one of the Gerbe structures, the flat G1∇c-gerbe, is naturally introduced as the topological operator characterizing the M2-brane. The resulting topological operators realize discrete symmetries associated with the winding and the flux/monopole sectors, and their operator algebra is well-defined: the monopole operator acts non trivially on a vortex-dressed operator, while the winding operator acts on the pullback of the Wilson surface.