On the rank index of projective curves of almost minimal degree

Abstract

In this article, we investigate the rank index of projective curves C ⊂ Pr of degree r+1 when C = πp (C) for the standard rational normal curve C ⊂ Pr+1 and a point p ∈ Pr+1 C3. Here, the rank index of a closed subscheme X ⊂ Pr is defined to be the least integer k such that its homogeneous ideal can be generated by quadratic polynomials of rank ≤ k. Our results show that the rank index of C is at most 4, and it is exactly equal to 3 when the projection center p is a coordinate point of Pr+1. We also investigate the case where p ∈ C3 C2.

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