A conditional determination of the average rank of elliptic curves

Abstract

Under a hypothesis which is slightly stronger than the Riemann Hypothesis for elliptic curve L-functions, we show that both the average analytic rank and the average algebraic rank of elliptic curves in families of quadratic twists are exactly 12. As a corollary we obtain that under this last hypothesis, the Birch and Swinnerton-Dyer Conjecture holds for almost all curves in our family, and that asymptotically one half of these curves have algebraic rank 0, and the remaining half 1. We also prove an analogous result in the family of all elliptic curves. A way to interpret our results is to say that nonreal zeros of elliptic curve L-functions in a family have a direct influence on the average rank in this family. Results of Katz-Sarnak and of Young constitute a major ingredient in the proofs.