2d Partition Function in Omega-background and Vortex/Instanton Correspondence
Abstract
We derive the exact vortex partition function in 2d = (2,2) gauge theory on the Omega-background, applying the localization scheme in the Higgs phase. We show that the partition function at a finite Omega-deformation parameter satisfies a system of differential equations, which can be interpreted as a quantized version of the twisted F-term equations characterizing the SUSY vacua. Using the differential equations derived in this paper, we show the correspondence between the partition function of the two-dimensional vortex string worldsheet theory and the Nekrasov partition function at the root of Higgs branch of the four-dimensional = 2 theory with two Omega-deformation parameters .
Cite
@article{arxiv.1509.08630,
title = {2d Partition Function in Omega-background and Vortex/Instanton Correspondence},
author = {Toshiaki Fujimori and Taro Kimura and Muneto Nitta and Keisuke Ohashi},
journal= {arXiv preprint arXiv:1509.08630},
year = {2015}
}
Comments
1+45 pages, 7 figures; typos corrected, references added