Monopole Taxonomy in Three-Dimensional Conformal Field Theories

Abstract

We study monopole operators at the infrared fixed points of Abelian and non-Abelian gauge theories with Nf fermion flavors in three dimensions. At large Nf, independent monopole operators can be defined via the state-operator correspondence only for stable monopole backgrounds. In Abelian theories, every monopole background is stable. In the non-Abelian case, we find that many (but not all) backgrounds are stable in each topological class. We calculate the infrared scaling dimensions of the corresponding operators through next-to-leading order in 1/Nf. In the case of U(Nc) QCD with Nf fundamental fermions (and in particular in the QED case, Nc =1), we find that the monopole operators transform as non-trivial irreducible representations of the SU(Nf) flavor symmetry group.