Computing the Cuspidal Subgroup of the Modular Jacobian JH( p )

Abstract

For a fixed prime p congruent to 1 modulo 4 we may define the modular curve XH( p ) associated to the subgroup of non-zero squares modulo p. This curve has four cusps and we consider the subgroup of the Jacobian JH( p ) of XH( p ) generated by these points, which we will call the cuspidal subgroup of JH( p ). This is a finite subgroup by the results of Manin and Drinfeld, and lies inside the Q ( p )-rational torsion subgroup. In this paper we compute the cuspidal subgroup for all such curves of genus g, 2 ≤ g ≤ 10, namely those with p ∈ \ 29, 37, 41, 53, 61, 73 \, and compare this with JH( Q ( p ) )tors.