Instanton moduli spaces on non-K\"ahlerian surfaces. Holomorphic models around the reduction loci

Abstract

Let M be a moduli space of polystable rank 2-bundles bundles with fixed determinant (a moduli space of PU(2)-instantons) on a Gauduchon surface with pg=0 and b1=1. We study the holomorphic structure of M around a circle T of regular reductions. Our model space is a "blowup flip passage", which is a manifold with boundary whose boundary is a projective fibration, and whose interior comes with a natural complex structure. We prove that a neighborhood of the boundary of the blowup MT of M at T can be smoothly identified with a neighborhood of the boundary of a "flip passage" Q, the identification being holomorphic on int( Q).