Torsion free instanton sheaves on the blow-up of P3 at a point

Abstract

We consider an extension of the instanton bundles definition, given by Casnati-Coskun-Genk-Malaspina, for Fano threefolds, in order to include non locally-free ones on the blow-up P3, of the projective 3-space at a point. With the proposed definition, we prove that any reflexive instanton sheaf must be locally free, and that the strictly torsion free instanton sheaves have singularities of pure dimension 1. We construct examples and study their μ-stability. Furthermore, these sheaves will play a role in (partially) compactifying the t'Hooft component of the moduli space of instantons, on P3. Finally, examples of these are shown to be smooth and smoothable.