On Some Open Cases of a Conjecture of Conrad, Edixhoven and Stein

Abstract

Let \( p ≥ 5 \) be a prime. In 2003 Conrad, Edixhoven, and Stein conjectured that the rational torsion subgroup of the modular Jacobian \( J1(p) \) coincides with the rational cuspidal divisor class group. Using explicit computations in Magma, the open case \( p = 29 \) has been proven by Derickx, Kamienny, Stein, and Stoll in 2023. We extend these results to primes \( p = 97, 101, 109, \) and \( 113 \). In addition, we provide a list of the groups \( J1(p)(Q)tors \) for every prime up to \( p ≤ 113 \). However, our method is general and can be applied to larger primes.