Geometry of elliptic normal curves of degree 6

Abstract

In our work we focus on the geometry of elliptic normal curves of degree 6 embedded in P5. We determine the space of quadric hypersurfaces through an elliptic normal curve of degree 6 and find the explicit equations of generators of I(Sec(C6)). We study the images Cp and Cpq of a sextic C6 under the projection from a general point P ∈ P5 and a general line PQ ⊂ P5. In particular, we show that Cp is k-normal for all k ≥ 2 and I(Cp) is generated by three homogeneous polynomials of degree 2 and two homogeneous polynomials of degree 3. We then show that Cpq is k-normal for all k ≥ 3 and I(Cpq) is generated by two homogeneous polynomials of degree 3 and three homogeneous polynomials of degree 4.