Abstract
Let C ⊂ ℙr be a linearly normal projective integral curve of arithmetic genus g ≥ 1 and degree d = 2g + 1 + p for some p ≥ 1. It is well known that C is cut out by quadric and satisfies Green-Lazarsfeld's property Np. Recently it is known that for any q ∈ ℙr\C such that the linear projection πq: C → ℙr-1 of C from q is an embedding, the projected image Cq:= πq(C) ⊂ ℙr-1 is 3-regular, and hence its homogeneous ideal is generated by quadratic and cubic equations. In this article we study the problem when Cq is still cut out by quadrics. Our main result in this article shows that if the relative location of q with respect to C is general then the homogeneous ideal of C q is still generated by quadrics and the syzygies among them are generated by linear syzygies for the first a few steps.
| Original language | English |
|---|---|
| Pages (from-to) | 2092-2099 |
| Number of pages | 8 |
| Journal | Communications in Algebra |
| Volume | 41 |
| Issue number | 6 |
| DOIs | |
| Publication status | Published - 2013 May |
Bibliographical note
Funding Information:Wanseok Lee was supported by the second stage of BK21 Project. Euisung Park was supported by the Korea Reach Foundation Grant funded by the Korea government (KRF-2008-331-C00013).
Keywords
- Linear projection
- Minimal free resolution
- Projective curve
ASJC Scopus subject areas
- Algebra and Number Theory