Monopoles, three-algebras and ABJM theories with =5,6,8 supersymmetry

Abstract

We extend the hermitian three-algebra formulation of ABJM theory to include U(1) factors. With attention payed to extra U(1) factors, we refine the classification of =6 ABJM theories. We argue that essentially the only allowed gauge groups are SU(N)× SU(N), U(N)× U(M) and Sp(N)× U(1) and that we have only one independent Chern-Simons level in all these cases. Our argument is based on integrality of the U(1) Chern-Simons levels and supersymmetry. A relation between monopole operators and Wilson lines in Chern-Simons theory suggests certain gauge representations of the monopole operators. From this we classify cases where we can not expect enhanced =8 supersymmetry. We also show that there are two equivalent formulations of =5 ABJM theories, based on hermitian three-algebra and quaternionic three-algebra respectively. We suggest properties of monopoles in =5 theories and show how these monopoles may enhance supersymmetry from =5 to =6.