Moduli Spaces of PU(2)-Instantons on Minimal Class VII Surfaces with b2=1

Abstract

We describe explicitly the moduli spaces Mpstg(S,E) of polystable holomorphic structures E with E K on a rank 2 vector bundle E with c1(E)=c1(K) and c2(E)=0 for all minimal class VII surfaces S with b2(S)=1 and with respect to all possible Gauduchon metrics g. These surfaces S are non-elliptic and non-Kaehler complex surfaces and have recently been completely classified. When S is a half or parabolic Inoue surface, Mpstg(S,E) is always a compact one-dimensional complex disc. When S is an Enoki surface, one obtains a complex disc with finitely many transverse self-intersections whose number becomes arbitrarily large when g varies in the space of Gauduchon metrics. Mpstg(S,E) can be identified with a moduli space of PU(2)-instantons. The moduli spaces of simple bundles of the above type leads to interesting examples of non-Hausdorff singular one-dimensional complex spaces.