Given $n$ general points $p_1, p_2, \ldots , p_n \in \mathbb P^r$, it is natural to ask when there exists a curve $C \subset \mathbb P^r$, of degree $d$ and genus $g$, passing through $p_1, p_2, \ldots , p_n$. In this paper, the authors give a complete answer to this question for curves $C$ with nonspecial hyperplane section. This result is a consequence of our main theorem, which states that the normal bundle $N_C$ of a general nonspecial curve of degree $d$ and genus $g$ in $\mathbb P^r$ (with $d \geq g + r$) has the property of interpolation (i.e. that for a general effective divisor $D$ of any degree on $C$, either $H^0(N_C(-D)) = 0$ or $H^1(N_C(-D)) = 0$), with exactly three exceptions.
| ISBN: | 9781470434892 |
| Publication date: | 30th March 2019 |
| Author: | Atanas Atanasov, Eric Larson, David Yang |
| Publisher: | American Mathematical Society |
| Format: | Paperback |
| Pagination: | 105 pages |
| Series: | Memoirs of the American Mathematical Society |
| Genres: |
Algebra Algebraic geometry |