Explicit arithmetic of Jacobians of generalized Legendre curves over global function fields

TL;DR

This paper explicitly analyzes the Jacobian of a generalized Legendre curve over function fields, computing its L-function, verifying the BSD conjecture, and describing its structure and rational points in detail.

Contribution

It provides explicit calculations of the L-function, rational points, and the Tate-Shafarevich group for Jacobians of generalized Legendre curves over function fields, and proves BSD in this context.

Findings

BSD conjecture holds for the Jacobian over certain function fields.

Explicit generators of rational points subgroup with finite index.

The Jacobian's 'new' part is isogenous to a power of a simple abelian variety.

Abstract

We study the Jacobian $J$ of the smooth projective curve $C$ of genus $r-1$ with affine model $y^r = x^{r-1}(x + 1)(x + t)$ over the function field $\mathbb{F}_p(t)$, when $p$ is prime and $r\ge 2$ is an integer prime to $p$. When $q$ is a power of $p$ and $d$ is a positive integer, we compute the $L$-function of $J$ over $\mathbb{F}_q(t^{1/d})$ and show that the Birch and Swinnerton-Dyer conjecture holds for $J$ over $\mathbb{F}_q(t^{1/d})$. When $d$ is divisible by $r$ and of the form $p^\nu +1$, and $K_d := \mathbb{F}_p(\mu_d,t^{1/d})$, we write down explicit points in $J(K_d)$, show that they generate a subgroup $V$ of rank $(r-1)(d-2)$ whose index in $J(K_d)$ is finite and a power of $p$, and show that the order of the Tate-Shafarevich group of $J$ over $K_d$ is $[J(K_d):V]^2$. When $r>2$, we prove that the "new" part of $J$ is isogenous over $\overline{\mathbb{F}_p(t)}$ to the square of a simple abelian variety of dimension $\phi(r)/2$ with endomorphism algebra $\mathbb{Z}[\mu_r]^+$. For a prime $\ell$ with $\ell \nmid pr$, we prove that $J[\ell](L)=\{0\}$ for any abelian extension $L$ of $\overline{\mathbb{F}}_p(t)$.