Koszul property of Ulrich bundles and rationality of moduli spaces of stable bundles on Del Pezzo surfaces

Abstract

Let E be a vector bundle on a smooth projective variety X⊂eqPN that is Ulrich with respect to the hyperplane section H. In this article, we study the Koszul property of E, the slope-semistability of the k-th iterated syzygy bundle Sk(E) for all k≥ 0 and rationality of moduli spaces of slope-stable bundles on Del Pezzo surfaces. As a consequence of our study, we show that if X is a Del Pezzo surface of degree d≥ 4, then any Ulrich bundle E satisfies the Koszul property and is slope-semistable. We also show that, for infinitely many Chern characters v=(r,c1, c2), the corresponding moduli spaces of slope-stable bundles MH( v) when non-empty, are rational, and thereby produce new evidences for a conjecture of Costa and Mir\'o-Roig. As a consequence, we show that the iterated syzygy bundles of Ulrich bundles are dense in these moduli spaces.