关于不包含在给定度数超曲面中的投影曲线之属,II

Vincenzo Di Gennaro, Giambattista Marini
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引用次数: 0

摘要

固定整数 $r\geq 4$ 和 $i\geq 2$。让 $C$ 是在 $\mathbb P^r$ 中的一条非退化的、还原的和不可还原的复投影曲线,阶数为 $d$,不包含在一个阶数为 $\leq i$ 的超曲面中。设 $p_a(C)$ 为 $C$ 的算术源。延续之前的研究,在假设 $d\gg\max\{r,i\}$ 的条件下,本文展示了 $p_a(C)$ 的卡斯特努沃约束 $G_0(r;d,i)$。一般来说,我们不知道这个约束是否尖锐。然而,当 $i=2$,$r=6$ 和 $d\equiv 0,3,6$ (mod$9$)时,我们能够证明它是尖锐的。此外,当$i=2$,$rgeq 9$,$r$可被3$整除,且$dequiv 0$(mod $r(r+3)/6$)时,我们证明如果$G_0(r;d,i)$不尖锐,那么对于$p_a(C)$的最大值来说,只有三种可能。文献中已经研究过 i=2$ 和 $r$ 不能被 3$ 整除的情况。我们给出一些关于极值曲线的信息。
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On the genus of projective curves not contained in hypersurfaces of given degree, II
Fix integers $r\geq 4$ and $i\geq 2$. Let $C$ be a non-degenerate, reduced and irreducible complex projective curve in $\mathbb P^r$, of degree $d$, not contained in a hypersurface of degree $\leq i$. Let $p_a(C)$ be the arithmetic genus of $C$. Continuing previous research, under the assumption $d\gg \max\{r,i\}$, in the present paper we exhibit a Castelnuovo bound $G_0(r;d,i)$ for $p_a(C)$. In general, we do not know whether this bound is sharp. However, we are able to prove it is sharp when $i=2$, $r=6$ and $d\equiv 0,3,6$ (mod $9$). Moreover, when $i=2$, $r\geq 9$, $r$ is divisible by $3$, and $d\equiv 0$ (mod $r(r+3)/6$), we prove that if $G_0(r;d,i)$ is not sharp, then for the maximal value of $p_a(C)$ there are only three possibilities. The case in which $i=2$ and $r$ is not divisible by $3$ has already been examined in the literature. We give some information on the extremal curves.
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