The average size of the 5-Selmer group of elliptic curves is 6, and the average rank is less than 1

Abstract

In this article, we prove that the average rank of elliptic curves over Q, when ordered by height, is less than 1 (in fact, less than .885). As a consequence of our methods, we also prove that at least four fifths of all elliptic curves over Q have rank either 0 or 1; furthermore, at least one fifth of all elliptic curves in fact have rank 0. The primary ingredient in the proofs of these theorems is a determination of the average size of the 5-Selmer group of elliptic curves over Q; we prove that this average size is 6. Another key ingredient is a new lower bound on the equidistribution of root numbers of elliptic curves; we prove that there is a family of elliptic curves over Q having density at least 55\% for which the root number is equidistributed.