English

Normal generation and Clifford index

Algebraic Geometry 2007-05-23 v1

Abstract

Let CC be a smooth curve of genus g4g\ge 4 and Clifford index cc. In this paper, we prove that if CC is neither hyperelliptic nor bielliptic with g2c+5g\ge 2c+5 and M\mathcal M computes the Clifford index of CC, then either degM3c2+3\deg \mathcal M\le \frac{3c}{2}+3 or M=gc+21+hc+21|\mathcal M|=|g^1_{c+2}+h^1_{c+2}| and g=2c+5g=2c+5. This strengthens the Coppens and Martens' theorem (\cite{CM}, Corollary 3.2.5). Furthermore, for the latter case (1) M\mathcal M is half-canonical unless CC is a c+22\frac{c+2}{2}-fold covering of an elliptic curve, (2) M(F)\mathcal M(F) fails to be normally generated with \cli(M(F))=c\cli(\mathcal M(F))=c, h1(M(F))=2h^1(\mathcal M(F))=2 for Fgc+21F\in g^1_{c+2}. Such pairs (C,M)(C,\mathcal M) can be found on a K3K3-surface whose Picard group is generated by a hyperplane section in Pr\mathbb P^r. For such a (C,M)(C, \mathcal M) on a K3-surface, M\mathcal M is normally generated while M(F)\mathcal M(F) fails to be normally generated with \cli(M)=\cli(M(F))=c\cli(\mathcal M)=\cli(\mathcal M(F))=c.

Cite

@article{arxiv.math/0601402,
  title  = {Normal generation and Clifford index},
  author = {Youngook Choi and Seonja Kim and Young Rock Kim},
  journal= {arXiv preprint arXiv:math/0601402},
  year   = {2007}
}

Comments

15pages, 2figures