On rational Eisenstein primes and the rational cuspidal groups of modular Jacobian varieties

Abstract

Let N be a non-squarefree positive integer and let be an odd prime such that 2 does not divide N. Consider the Hecke ring T(N) of weight 2 for 0(N), and its rational Eisenstein primes of T(N) containing , defined in Section 3. If m is such a rational Eisenstein prime, then we prove that m is of the form (, ~IDM, N), where the ideal IDM, N of T(N) is also defined in Section 3. Furthermore, we prove that C(N)[m] ≠ 0, where C(N) is the rational cuspidal group of J0(N). To do this, we compute the precise order of the cuspidal divisor CDM, N, defined in Section 4, and the index of IDM, N in T(N) Z.