The group structure of elliptic curves over Z/NZ

Abstract

We characterize the possible groups E(Z/NZ) arising from elliptic curves over Z/NZ in terms of the groups E(Fp), with p varying among the prime divisors of N. This classification is achieved by showing that the infinity part of any elliptic curve over Z/peZ is a Z/peZ-torsor, of which a generator is exhibited. As a first consequence, when E(Z/NZ) is a p-group, we provide an explicit and sharp bound on its rank. As a second consequence, when N = pe is a prime power and the projected curve E(Fp) has trace one, we provide an isomorphism attack to the ECDLP, which works only by means of finite rings arithmetic.