Brill-Noether theory for moduli spaces of sheaves on algebraic varieties

Abstract

Let X be a smooth projective variety of dimension n and let H be an ample line bundle on X. Let MX,H(r;c1, ..., cs) be the moduli space of H-stable vector bundles E on X of rank r and Chern classes ci(E)=ci for i=1, ..., s:=min\r,n\. We define the Brill-Noether filtration on MX,H(r;c1, ..., cs) as WHk(r;c1,..., cs)= \E ∈ MX,H(r;c1, ..., cs) | h0(X,E) ≥ k \ and we realize WHk(r;c1,..., cs) as the kth determinantal variety of a morphism of vector bundles on MX,H(r;c1, ..., cs), provided Hi(E)=0 for i ≥ 2 and E ∈ MX,H(r;c1, ..., cs). We also compute the expected dimension of WHk(r;c1,..., cs). Very surprisingly we will see that the Brill-Noether stratification allow us to compare moduli spaces of vector bundles on Hirzebruch surfaces stables with respect to different polarizations. We will also study the Brill-Noether loci of the moduli space of instanton bundles and we will see that they have the expected dimension.