The rational cuspidal subgroup of J0(p2M) with M squarefree

Abstract

For a positive integer N, let CN(Q) be the rational cuspidal subgroup of J0(N) and C(N) be the rational cuspidal divisor class group of X0(N), which are both subgroups of the rational torsion subgroup of J0(N). We prove that two groups CN(Q) and C(N) are equal when N=p2M for any prime p and any squarefree integer M. To achieve this we show that all modular units on X0(N) can be written as products of certain functions Fm, h, which are constructed from generalized Dedekind eta functions. Also, we determine the necessary and sufficient conditions for such products to be modular units on X0(N) under a mild assumption.