Semistable rank 2 sheaves with singularities of mixed dimension on P3

Abstract

We describe new irreducible components of the Gieseker-Maruyama moduli scheme M(3) of semistable rank 2 coherent sheaves with Chern classes c1=0,\ c2=3,\ c3=0 on P3, general points of which correspond to sheaves whose singular loci contain components of dimensions both 0 and 1. These sheaves are produced by elementary transformations of stable reflexive rank 2 sheaves with c1=0,\ c2=2,\ c3=2 or 4 along a disjoint union of a projective line and a collection of points in P3. The constructed families of sheaves provide first examples of irreducible components of the Gieseker-Maruyama moduli scheme such that their general sheaves have singularities of mixed dimension.