Blowups, Gale duality, and moduli spaces

Abstract

The goal of this paper is to describe the birational geometry of the blowup of Pn at n+4 points in very general position. To achieve this, we follow an idea of Mukai and explore a special instance of Gale duality, namely, a correspondence between configurations of n+4 points in the projective spaces Pn and P2. We first prove that the blowup X of Pn at n+4 general points is isomorphic to a certain Gieseker moduli space of rank 2 vector bundles on the surface S obtained by blowing up P2 at the n+4 Gale dual points. We then study the variation of these moduli spaces as we vary the polarization L on S, and translate this variation into a partial Mori chamber decomposition of Eff(X), describing to some extent the birational geometry of X.