Average rank of elliptic curves over function fields
Abstract
Let q be a prime with q ≥ 5. We show that the average rank of elliptic curves over a function field Fq(t), when ordered by naive height, is bounded above by 25/14 ≈ 1.8. Our result improves the previous upper bound of 2.3 proven by Brumer. The upper bound obtained is less than 2, which shows that a positive proportion of elliptic curves has either rank 0 or 1. The proof adapts the work of Young, which shows that under the assumption of the General Riemann Hypothesis for L-functions of elliptic curves, the average rank for the family of elliptic curves over the rational numbers is bounded above by 25/14 ≈ 1.8.
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