A modular description of X0(n)

Abstract

As we explain, when a positive integer n is not squarefree, even over C the moduli stack that parametrizes generalized elliptic curves equipped with an ample cyclic subgroup of order n does not agree at the cusps with the 0(n)-level modular stack X0(n) defined by Deligne and Rapoport via normalization. Following a suggestion of Deligne, we present a refined moduli stack of ample cyclic subgroups of order n that does recover X0(n) over Z for all n. The resulting modular description enables us to extend the regularity theorem of Katz and Mazur: X0(n) is also regular at the cusps. We also prove such regularity for X1(n) and several other modular stacks, some of which have been treated by Conrad by a different method. For the proofs we introduce a tower of compactifications Ellm of the stack Ell that parametrizes elliptic curves---the ability to vary m in the tower permits robust reductions of the analysis of Drinfeld level structures on generalized elliptic curves to elliptic curve cases via congruences.