S-duality of u(1) gauge theory with θ =π on non-orientable manifolds: Applications to topological insulators and superconductors

Abstract

Electric-magnetic duality (S-duality) is a well-known property of pure u(1) gauge theory in 3+1 dimensions. In this paper, we investigate the compatibility of this duality with time-reversal symmetry. We consider two theories obtained by coupling a Dirac fermion with an "inverted" sign of the mass m to a u(1) gauge field. Time-reversal in the two theories is implemented respectively via the T and CT symmetries of the Dirac fermion. It was recently conjectured (C. Wang and T. Senthil (arXiv:1505.03520), and M. Metlitski and A.Vishwanath (arXiv:1505.05142)) that in the |m| ∞ limit these two theories are S-dual to each other. We provide support for this conjecture by studying partition functions of the two theories on non-orientable manifolds as a way to probe the realization of time-reversal. Upon integrating out the Dirac fermion, topological terms in the actions of the two theories are generated. While on an orientable manifold topological terms in both theories reduce to a θ-term with θ = π, on a non-orientable manifold they are distinct. We explicitly compute partition functions of the two theories on the manifold RP4 and show that they are equal; this result combined with certain physical arguments is sufficient to establish the duality. The two theories can be viewed as a gauged topological insulator in class AII and a gauged topological superconductor in class AIII, and the bulk duality allows us to derive previously conjectured non-trivial symmetric gapped surface states of these phases.