A Four-dimensional Gauge Theory Perspective on Quantum K-theory

Abstract

The two-dimensional gauged linear sigma model has provided a physical model for the quantum cohomology of a K\"ahler manifold, X. A three-dimensional version of such construction has recently been shown to shed light on models of quantum K-theory of X. We consider an N=1 four-dimensional version consisting of a U(1) vector multiplet and chiral multiplets, generalizing the two-dimensional N=(2,2) setup. We compute the four-dimensional partition function on D2× T2 and demonstrates that it satisfies a difference equation which reduces to the deformed quantum K-theoretic one in the appropriate limit. We also demonstrate, though indirectly, that 4d invariants reduce to 3d quantum K-theory invariants in the same limit.