Classification of monads and moduli components of stable rank 2 bundles with odd determinant and c2=10

Abstract

In this paper, we provide a complete classification of the positive minimal monads whose cohomology is a stable rank 2 bundle on P3 with Chern classes c1=-1, c2=10 and we prove the existence of a new irreducible component of the moduli space B(-1,10) of a rank 2 stable bundles with the given Chern classes. We also show that Hartshorne's conditions on a sequence X of 10 integers are sufficient and necessary for the existence of a stable rank 2 bundle with odd determinant and spectrum X. Furthermore, we prove that the sequence of integers \-2n-1,-1,0,1n-1\ for n≥4 is realized as the spectrum of a stable rank 2 bundle of odd determinant by computing the minimal generators of its Rao module.