On the Ramanujan Vector Field modulo p

Abstract

For every prime p ≥ 5, we compute the p-th power of the Ramanujan vector field that arises from the differential relations discovered by Ramanujan for the Eisenstein series E2,E4 and E6. Our method results in explicit equations for the p-th power and uses classical results of Serre and Swinnerton-Dyer about modular forms modulo p. From this, we verify that a general conjecture by Sheperd-Barron and Ekedahl is valid for the Ramanujan vector field. Furthermore, we consider the affine realization of a certain moduli space of elliptic curves where the Ramanujan vector field is defined, and describe - in characteristic p - the locus given by supersingular elliptic curves in two ways: a classical one - using equations for the supersingular polynomial - and a new one as the singular set of some vector fields. Additionally, we prove that the Ramanujan vector field is transversal to this locus.