The Average Size of 2-Selmer Groups of Elliptic Curves in Characteristic 2

Abstract: Let $K$ be the function field of a smooth curve $B$ over a finite field $k$ of arbitrary characteristic. We prove that the average size of the $2$-Selmer groups of elliptic curves $E/K$ is at most $1+2\zeta_B(2)\zeta_B(10)$, where $\zeta_B$ is the zeta function of the curve $B$. In particular, in the limit as $q=#k\to\infty$ (with the genus $g(B)$ fixed), we see that the average size of 2-Selmer is bounded above by $3$, even in "bad" characteristics. This completes the proof that the average rank of elliptic curves, over $\textit{any}$ fixed global field, is finite. Handling the case of characteristic $2$ requires us to develop a new theory of integral models of 2-Selmer elements, dubbed "hyper-Weierstrass curves."