For any positive integer N, we completely determine the structure of the
rational cuspidal divisor class group of X0β(N), which is conjecturally equal
to the rational torsion subgroup of J0β(N). More specifically, for a given
prime β, we construct a rational cuspidal divisor Zββ(d) for any
non-trivial divisor d of N. Also, we compute the order of the linear
equivalence class of the divisor Zββ(d) and show that the β-primary
subgroup of the rational cuspidal divisor class group of X0β(N) is isomorphic
to the direct sum of the cyclic subgroups generated by the linear equivalence
classes of the divisors Zββ(d).Comment: Comments are welcom