Noninvertible anomalies in SU(N)× U(1) gauge theories

Abstract

We study 4-dimensional SU(N)× U(1) gauge theories with a single massless Dirac fermion in the 2-index symmetric/antisymmetric representations and show that they are endowed with a noninvertible 0-form Z2(N 2) chiral symmetry along with a 1-form ZN(1) center symmetry. By using the Hamiltonian formalism and putting the theory on a spatial three-torus T3, we construct the non-unitary gauge invariant operator corresponding to Z2(N 2) and find that it acts nontrivially in sectors of the Hilbert space characterized by selected magnetic fluxes. When we subject T3 to ZN(1) twists, for N even, in selected magnetic flux sectors, the algebra of Z2(N 2) and ZN(1) fails to commute by a Z2 phase. We interpret this noncommutativity as a mixed anomaly between the noninvertible and the 1-form symmetries. The anomaly implies that all states in the torus Hilbert space with the selected magnetic fluxes exhibit a two-fold degeneracy for arbitrary T3 size. The degenerate states are labeled by discrete electric fluxes and are characterized by nonzero expectation values of condensates. In an Appendix, we also discuss how to construct the corresponding noninvertible defect via the ``half-space gauging'' of a discrete one-form magnetic symmetry.