Invariant Frobenius lifts and deformation of the Hasse invariant

Abstract

We show that the p-adic completion of any affine elliptic curve with ordinary reduction possesses Frobenius lifts whose "normalized" action on 1-forms preserves mod p the space of invariant 1-forms. We next show that, after removing the 2-torsion sections, the above situation can be "infinitesimally deformed" in the sense that the above mod p result has a mod p2 analogue. While the "eigenvalues" mod p are given by the reciprocal of the Hasse polynomial, the "eigenvalues" mod p2 are given by an appropriate -modular function whose reciprocal is a p-adic deformation of the Hasse polynomial.