The Smallest Invariant Factor of Elliptic Curves, and Coincidences

Abstract

For an elliptic curve E over Q and a natural number j, Cojocaru has shown that there is an explicit constant CE,j giving (under GRH) the density of primes p of good reduction such that the smallest invariant factor of E(Fp) is j. For E without complex multiplication, we study the question of when CE,j is positive (a necessary and, on GRH, sufficient condition for there to be infinitely many such p), strengthening a result by Kim. Our arguments are group-theoretic using the image of the adelic Galois representation of E. Experimentally, CE,j appears to vanish only when there is a coincidence of division fields; we document a number of families of such coincidences arising from abelian division fields.