Supersymmetric indices on I × T2, elliptic genera and dualities with boundaries

Abstract

We study three dimensional N=2 supersymmetric theories on I × M2 with 2d N=(0,2) boundary conditions at the boundaries ∂ (I × M2)=M2 M2, where M2=C or T2. We introduce supersymmetric indices of three dimensional N=2 theories on I × T2 that couple to elliptic genera of 2d N=(0,2) theories at the two boundaries. We evaluate the I × T2 indices in terms of supersymmetric localization and study dualities on the I × M2. We consider the dimensional reduction of I × T2 to I × S1 and obtain the localization formula of 2d N=(2,2) supersymmetric indices on I × S1. We illustrate computations of open string Witten indices based on gauged linear sigma models. Correlation functions of Wilson loops on I × S1 agree with Euler pairings in the geometric phase and also agree with cylinder amplitudes for B-type boundary states of Gepner models in the Landau-Ginzburg phase.