-away ACM line bundles on a nonsingular cubic surface

Abstract

Let X ⊂ P3 be a nonsingular cubic hypersurface. Faenzi (F) and later Pons-Llopis and Tonini (PLT) have completely characterized ACM line bundles over X. As a natural continuation of their study in the non-ACM direction, in this paper, we completely classify -away ACM line bundles (introduced recently by Gawron and Genc (GG)) over X, when ≤ 2. For ≥ 3, we give examples of -away ACM line bundles on X and for each ≥ 1, we establish the existence of smooth hypersurfaces X(d) of degree d > in P3 admitting -away ACM line bundles.