Superconformal index on RP2 × S1 and mirror symmetry

Abstract

We study N = 2 supersymmetric gauge theories on RP2 × S1 and compute the superconformal index by using the localization technique. We consider not only the round real projective plane RP2 but also the squashed real projective plane RP2b which turns back to RP2 by taking a squashing parameter b as 1. In addition, we found that the result is independent of the squashing parameter b. We apply our new superconformal index to the check of the simplest 3d mirror symmetry, i.e. the equivalence between the N=2 SQED and the XYZ model on RP2 × S1. We prove it by using a mathematical formula called the q-binomial theorem. We comment on the N=4 version of mirror symmetry, mirror symmetry via generalized indices, and possibilities of generalizations from mathematical viewpoints.