Secant rank and syzygies of projections of elliptic normal curves

Abstract

We study the syzygies of projections of elliptic normal curves. Let C ⊂ Pd-1 be an elliptic normal curve of degree d 5, and let Cq denote the projection of C from a point q. We obtain sharp bounds for the Green--Lazarsfeld index of Cq in terms of the secant rank of q. More precisely, if q ∈ Cs C2, where Cs is the s-th secant variety of C, then index(Cq) s-3, and equality holds for a general point q of Cs. In particular, index(Cq) = d2 - 3 for a general point q in Pd-1. The proof realizes projected elliptic curves as hyperplane sections of elliptic ruled surface scrolls and exploits the known syzygetic properties of these scrolls.