BPS/CFT correspondence II: Instantons at crossroads, Moduli and Compactness Theorem

Abstract

Gieseker-Nakajima moduli spaces Mk(n) parametrize the charge k noncommutative U(n) instantons on R4 and framed rank n torsion free sheaves E on C P2 with ch2(E) = k. They also serve as local models of the moduli spaces of instantons on general four-manifolds. We study the generalization of gauge theory in which the four dimensional spacetime is a stratified space X immersed into a Calabi-Yau fourfold Z. The local model Mk( n) of the corresponding instanton moduli space is the moduli space of charge k (noncommutative) instantons on origami spacetimes. There, X is modelled on a union of (up to six) coordinate complex planes C2 intersecting in Z modelled on C4. The instantons are shared by the collection of four dimensional gauge theories sewn along two dimensional defect surfaces and defect points. We also define several quiver versions M kγ( n) of Mk( n), motivated by the considerations of sewn gauge theories on orbifolds C4/. The geometry of the spaces M kγ( n), more specifically the compactness of the set of torus-fixed points, for various tori, underlies the non-perturbative Dyson-Schwinger identities recently found to be satisfied by the correlation functions of qq-characters viewed as local gauge invariant operators in the N=2 quiver gauge theories. The cohomological and K-theoretic operations defined using Mk( n) and their quiver versions as correspondences provide the geometric counterpart of the qq-characters, line and surface defects.