Andrei Teleman
Published 2007-04-20, updated 2009-09-15Version 4
We develop a general strategy, based on gauge theoretical methods, to prove existence of curves on class VII surfaces. We prove that, for $b_2=2$, every minimal class VII surface has a cycle of rational curves hence, by a result of Nakamura, is a global deformation of a one parameter family of blown up primary Hopf surfaces. The case $b_2=1$ has been solved in a previous article. The fundamental object intervening in our strategy is the moduli space ${\mathcal M}^{\pst}(0,{\mathcal K})$ of polystable bundles ${\mathcal E}$ with $c_2({\mathcal E})=0$, $\det({\mathcal E})={\mathcal K}$. For large $b_2$ the geometry of this moduli space becomes very complicated. The case $b_2=2$ treated here in detail requires new ideas and difficult techniques of both complex geometric and gauge theoretical nature.
Comments: LaTeX 48 pages; RV: minor corrections, new paragraph dedicated to the structure of the moduli space around the circles of reductions; RV: minor corrections, to appear in Annals of Mathematics
Curvatures of moduli space of curves and applications
Compactification of the moduli space of rho-vortices
New examples of $G_2$-instantons on $\mathbb{R}^4 \times S^3$
![QR code for arXiv:0704.2634 [math.DG]](http://oss.arxitics.com/images/favicon.svg)