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

Abstract

We study the Jacobian J of the smooth projective curve C of genus r-1 with affine model yr = xr-1(x + 1)(x + t) over the function field Fp(t), when p is prime and r 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 Fq(t1/d) and show that the Birch and Swinnerton-Dyer conjecture holds for J over Fq(t1/d). When d is divisible by r and of the form p +1, and Kd := Fp(μd,t1/d), we write down explicit points in J(Kd), show that they generate a subgroup V of rank (r-1)(d-2) whose index in J(Kd) is finite and a power of p, and show that the order of the Tate-Shafarevich group of J over Kd is [J(Kd):V]2. When r>2, we prove that the "new" part of J is isogenous over Fp(t) to the square of a simple abelian variety of dimension φ(r)/2 with endomorphism algebra Z[μr]+. For a prime with pr, we prove that J[](L)=\0\ for any abelian extension L of Fp(t).