New divisors in the boundary of the instanton moduli space

Abstract

Let I(n) denote the moduli space of rank 2 instanton bundles of charge n on P3. We know from several authors that I(n) is an irreducible, nonsingular and affine variety of dimension 8n-3. Since every rank 2 instanton bundle on P3 is stable, we may regard I(n) as an open subset of the projective Gieseker--Maruyama moduli scheme M(n) of rank 2 semistable torsion free sheaves F on P3 with Chern classes c1=c3=0 and c2=n, and consider the closure I(n) of I(n) in M(n). We construct some of the irreducible components of dimension 8n-4 of the boundary ∂ I(n):= I(n) I(n). These components generically lie in the smooth locus of M(n) and consist of rank 2 torsion free instanton sheaves with singularities along rational curves.