AGT relations for abelian quiver gauge theories on ALE spaces

Abstract

We construct level one dominant representations of the affine Kac-Moody algebra glk on the equivariant cohomology groups of moduli spaces of rank one framed sheaves on the orbifold compactification of the minimal resolution Xk of the Ak-1 toric singularity C2/Zk. We show that the direct sum of the fundamental classes of these moduli spaces is a Whittaker vector for glk, which proves the AGT correspondence for pure N=2 U(1) gauge theory on Xk. We consider Carlsson-Okounkov type Ext-bundles over products of the moduli spaces and use their Euler classes to define vertex operators. Under the decomposition glk h slk, these vertex operators decompose as products of bosonic exponentials associated to the Heisenberg algebra h and primary fields of slk. We use these operators to prove the AGT correspondence for N=2 superconformal abelian quiver gauge theories on Xk.