Modular unit and cuspidal divisor class groups of X1(N)

Abstract

In this article, we consider the group F1∞(N) of modular units on X1(N) that have divisors supported on the cusps lying over ∞ of X0(N), called the ∞-cusps. For each positive integer N, we will give an explicit basis for the group F1∞(N). This enables us to compute the group structure of the rational torsion subgroup C1∞(N) of the Jacobian J1(N) of X1(N) generated by the differences of the ∞-cusps. In addition, based on our numerical computation, we make a conjecture on the structure of the p-primary part of C1∞(pn) for a regular prime p.