N=2 S-duality Revisited

Abstract

Using the chiral algebra bootstrap, we revisit the simplest Argyres-Douglas (AD) generalization of Argyres-Seiberg S-duality. We argue that the exotic AD superconformal field theory (SCFT), T3,32, emerging in this duality splits into a free piece and an interacting piece, TX, even though this factorization seems invisible in the Seiberg-Witten (SW) curve derived from the corresponding M5-brane construction. Without a Lagrangian, an associated topological field theory, a BPS spectrum, or even an SW curve, we nonetheless obtain exact information about TX by bootstrapping its chiral algebra, chi(TX), and finding the corresponding vacuum character in terms of Affine Kac-Moody characters. By a standard 4D/2D correspondence, this result gives us the Schur index for TX and, by studying this quantity in the limit of small S1, we make contact with a proposed S1 reduction. Along the way, we discuss various properties of TX: as an N=1 theory, it has flavor symmetry SU(3)XSU(2)XU(1), the central charge of chi(TX) matches the central charge of the bc ghosts in bosonic string theory, and its global SU(2) symmetry has a Witten anomaly. This anomaly does not prevent us from building conformal manifolds out of arbitrary numbers of TX theories (giving us a surprisingly close AD relative of Gaiotto's TN theories), but it does lead to some open questions in the context of the chiral algebra / 4D N=2 SCFT correspondence.