Brill-Noether Theory of stable vector bundles on ruled surfaces

Abstract

Let X be a ruled surface over a nonsingular curve C of genus g≥0. Let MH:=MX,H(2;c1,c2) be the moduli space of H-stable rank 2 vector bundles E on X with fixed Chern classes ci:=ci(E) for i=1,2. The main goal of this paper is to contribute to a better understanding of the geometry of the moduli space MH in terms of its Brill-Noether locus WHk(2;c1,c2), whose points correspond to stable vector bundles in MH having at least k independent sections. We deal with the non-emptiness of this Brill-Noether locus, getting in most of the cases sharp bounds for the values of k such that WHk(2;c1,c2) is non-empty.