Vector bundles on Fano threefolds of genus 7 and Brill-Noether loci

Abstract

Given a smooth prime Fano threefold X of genus 7 we consider its homologically projectively dual curve and the natural integral functor !:Db(X) Db(). We prove that, for d≥ 6, ! gives a birational map from a component of the moduli scheme MX(2,1,d) of rank 2 stable sheaves on X with c1=1, c2=d to a generically smooth 2d-9-dimensional component of the Brill-Noether variety W2d-11d-5,5d-24 of stable vector bundles on of rank d-5 and degree 5d-24 with at least 2d-10 sections. This map turns out to be an isomorphism for d=6, and the moduli space MX(2,1,6) is fine. For general X, this moduli space is a smooth irreducible threefold.