The average of the first invariant factor for reductions of CM elliptic curves mod p

Abstract

Let E/Q be a fixed elliptic curve. For each prime p of good reduction, write E(Fp) Z/dp Z Z/ep Z, where dp ep. Kowalski proposed investigating the average value of dp as p runs over the rational primes. For CM curves, he showed that xx/x Σp x dp xx. It was shown recently by Felix and Murty that in fact Σp x dp exceeds any constant multiple of xx/x, once x is sufficiently large. In the opposite direction, Kim has shown that the expression xx in the upper bound can be replaced by xx. In this paper, we obtain the correct order of magnitude for the sum: Σp x dp x for all large x.