Abstract
We consider the general problem of enumerating branched covers of the projective line from a fixed general curve subject to ramification conditions at possibly moving points. Our main computations are in genus 1; the theory of limit linear series allows one to reduce to this case. We first obtain a simple formula for a weighted count of pencils on a fixed elliptic curve E, where base-points are allowed. We then deduce, using an inclusion-exclusion procedure, formulas for the numbers of maps E → P1 with moving ramification conditions. A striking consequence is the invariance of these counts under a certain involution. Our results generalize work of Harris, Logan, Osserman, and Farkas-Moschetti-Naranjo-Pirola.
| Original language | English |
|---|---|
| Pages (from-to) | 143-182 |
| Number of pages | 40 |
| Journal | Journal of Algebraic Geometry |
| Volume | 32 |
| Issue number | 1 |
| DOIs | |
| State | Published - 2023 |