Mathcal{N} = 1 supersymmetric indices and the four-dimensional A-model

Abstract

We compute the supersymmetric partition function of mathcal{N} = 1 supersymmetric gauge theories with an R-symmetry on {mathrm{mathcal{M}}}_4cong {mathrm{mathcal{M}}}_{g,p}times {S}^1 , a principal elliptic fiber bundle of degree p over a genus-g Riemann surface, Σg . Equivalently, we compute the generalized supersymmetric index {I_{mathrm{mathcal{M}}}}_{{}_{g,p}} , with the supersymmetric three-manifold {mathrm{mathcal{M}}}_{g,p} as the spatial slice. The ordinary mathcal{N} = 1 supersymmetric index on the round three-sphere is recovered as a special case. We approach this computation from the point of view of a topological A-model for the abelianized gauge fields on the base Σg. This A-model — or A-twisted two-dimensional mathcal{N} = (2, 2) gauge theory — encodes all the information about the generalized indices, which are viewed as expectations values of some canonically-defined surface defects wrapped on T2 inside Σg × T2. Being defined by compactification on the torus, the A-model also enjoys natural modular properties, governed by the four-dimensional ’t Hooft anomalies. As an application of our results, we provide new tests of Seiberg duality. We also present a new evaluation formula for the three-sphere index as a sum over two-dimensional vacua.