Tinkertoys for the Twisted E6 Theory

Abstract

We study 4D N=2 superconformal field theories that arise as the compactification of the six-dimensional (2,0) theory of type E6 on a punctured Riemann surface in the presence of Z2 outer-automorphism twists. We explicitly carry out the classification of these theories in terms of three-punctured spheres and cylinders, and provide tables of properties of the Z2-twisted punctures. An expression is given for the superconformal index of a fixture with twisted punctures of type E6, which we use to check our identifications. Several of our fixtures have Higgs branches which are isomorphic to instanton moduli spaces, and we find that S-dualities involving these fixtures imply interesting isomorphisms between hyperK\"ahler quotients of these spaces. Additionally, we find families of fixtures for which the Sommers-Achar group, which was previously a Coulomb branch concept, acts non-trivially on the Higgs branch operators.