Reflection groups and 3d N 6 SCFTs

Abstract

We point out that the moduli spaces of all known 3d N= 8 and N= 6 SCFTs, after suitable gaugings of finite symmetry groups, have the form C4r/ where is a real or complex reflection group depending on whether the theory is N= 8 or N= 6, respectively. Real reflection groups are either dihedral groups, Weyl groups, or two sporadic cases H3,4. Since the BLG theories and the maximally supersymmetric Yang-Mills theories correspond to dihedral and Weyl groups, it is strongly suggested that there are two yet-to-be-discovered 3d N= 8 theories for H3,4. We also show that all known N= 6 theories correspond to complex reflection groups collectively known as G(k,x,N). Along the way, we demonstrate that two ABJM theories (SU(N)k× SU(N)-k)/ZN and (U(N)k× U(N)-k)/Zk are actually equivalent.