Homological S-Duality in 4d N=2 QFTs

Abstract

The S-duality group S(F) of a 4d N=2 supersymmetric theory F is identified with the group of triangle auto-equivalences of its cluster category C(F) modulo the subgroup acting trivially on the physical quantities. S(F) is a discrete group commensurable to a subgroup of the Siegel modular group Sp(2g,Z) (g being the dimension of the Coulomb branch). This identification reduces the determination of the S-duality group of a given N=2 theory to a problem in homological algebra. In this paper we describe the techniques which make the computation straightforward for a large class of N=2 QFTs. The group S(F) is naturally presented as a generalized braid group. The S-duality groups are often larger than expected. In some models the enhancement of S-duality is quite spectacular. For instance, a QFT with a huge S-duality group is the Lagrangian SCFT with gauge group SO(8)× SO(5)3× SO(3)6 and half-hypermultiplets in the bi- and tri-spinor representations. We focus on four families of examples: the N=2 SCFTs of the form (G,G), Dp(G), and Er(1,1)(G), as well as the asymptotically-free theories (G,H) (which contain N=2 SQCD as a special case). For the Er(1,1)(G) models we confirm the presence of the PSL(2,Z) S-duality group predicted by Del Zotto, Vafa and Xie, but for most models in this class S-duality gets enhanced to a much larger group.