The frequency of elliptic curve groups over prime finite fields

Abstract

Letting p vary over all primes and E vary over all elliptic curves over the finite field Fp, we study the frequency to which a given group G arises as a group of points E(Fp). It is well-known that the only permissible groups are of the form Gm,k:=Z/mZ× Z/mkZ. Given such a candidate group, we let M(Gm,k) be the frequency to which the group Gm,k arises in this way. Previously, the second and fourth named authors determined an asymptotic formula for M(Gm,k) assuming a conjecture about primes in short arithmetic progressions. In this paper, we prove several unconditional bounds for M(Gm,k), pointwise and on average. In particular, we show that M(Gm,k) is bounded above by a constant multiple of the expected quantity when m kA and that the conjectured asymptotic for M(Gm,k) holds for almost all groups Gm,k when m k1/4-ε. We also apply our methods to study the frequency to which a given integer N arises as the group order \#E(Fp).