The geometry of Ulrich bundles on del Pezzo surfaces

Abstract

Given a smooth del Pezzo surface Xd ⊂eq Pd of degree d, we show that a smooth irreducible curve C on Xd represents the first Chern class of an Ulrich bundle on Xd if and only if its kernel bundle MC admits a generalized theta-divisor. This result is applied to produce new examples of complete intersection curves with semistable kernel bundle, and also combined with work of Farkas-Mustata-Popa to relate the existence of Ulrich bundles on Xd to the Minimal Resolution Conjecture for curves lying on Xd. In particular, we show that a smooth irreducible curve C of degree 3r lying on a smooth cubic surface X3 represents the first Chern class of an Ulrich bundle on X3 if and only if the Minimal Resolution Conjecture holds for C.