Higgs Condensates are Symmetry-Protected Topological Phases: II. U(1) Gauge Theory and Superconductors

Abstract

Classifying Higgs phases within the landscape of gapped and symmetry preserving states of matter presents a conceptual challenge. We argue that U(1) Higgs phases are symmetry-protected topological (SPT) phases and we derive their topological response theory and boundary anomaly -- applicable to superconductors treated with dynamical electromagnetic field. This generalizes the discussion of discrete gauge theories by Verresen et al., arXiv:2211.01376. We show that a Higgs phase in d spatial dimensions is in a non-trivial SPT class protected by a global U(1) symmetry associated with the Higgs field, and a d-2 form U(1) magnetic symmetry, associated with the absence of magnetic monopoles. In d=2, this gives an SPT with a mixed Hall response between conventional symmetries, whereas in d=3 we obtain a novel SPT protected by a 0-form and 1-form symmetry whose 2+1d boundary anomaly is satisfied by a superfluid. The signature properties of superconductors -- Higgs phases for electromagnetism -- can be reproduced from this SPT response. For instance, the Josephson effect directly arises from the aforementioned boundary superfluid. In addition to this minimalist approach being complementary to Landau-Ginzburg theory, its non-perturbative nature is useful in situations where fluctuations are significant. We substantiate this by predicting the stability of the Josephson effect upon introducing monopoles in U(1) lattice gauge theory, where tuning from the charge-1 Higgs phase to the confined phase leads to a quantum critical point in the junction. Furthermore, this perspective reveals unexpected connections, such as how persistent currents at the surface of a superconductor arise from generalized Thouless pumps. We also treat generalizations to partial-Higgs phases, including "2e" condensates in electronic superconductors, corresponding to symmetry-enriched topological orders.