Exact relations between M2-brane theories with and without Orientifolds

Abstract

We study partition functions of low-energy effective theories of M2-branes, whose type IIB brane constructions include orientifolds. We mainly focus on circular quiver superconformal Chern-Simons theory on S3, whose gauge group is O(2N+1)× USp(2N)× ·s × O(2N+1)× USp(2N). This theory is the natural generalization of the N=5 ABJM theory with the gauge group O(2N+1)2k × USp(2N)-k. We find that the partition function of this type of theory has a simple relation to the one of the M2-brane theory without the orientifolds, whose gauge group is U(N)× ·s × U(N). By using this relation, we determine an exact form of the grand partition function of the O(2N+1)2 × USp(2N)-1 ABJM theory, where its supersymmetry is expected to be enhanced to N=6. As another interesting application, we discuss that our result gives a natural physical interpretation of a relation between the grand partition functions of the U(N+1)4 × U(N)-4 ABJ theory and U(N)2 × U(N)-2 ABJM theory, recently conjectured by Grassi-Hatsuda-Mari\~no. We also argue that partition functions of A3 quiver theories have representations in terms of an ideal Fermi gas systems associated with D-type quiver theories and this leads an interesting relation between certain U(N) and USp(2N) supersymmetric gauge theories.