On average sizes of Selmer groups and ranks in families of elliptic curves having marked points
Abstract
We determine average sizes/bounds for the 2- and 3-Selmer groups in various families of elliptic curves with marked points, thus confirming several cases of the Poonen--Rains heuristics. As a consequence, we deduce that the average ranks of the elliptic curves in all of these families are bounded. Our proofs are uniform and make use of parametrizations involving various forms of 2 × 2 × 2 × 2 and 3 × 3 × 3 matrices that we studied in a previous paper. We also deduce that 100\% of genus one curves of the form y2 = Ax4 + Bx2 z2 + Cz4 with A, B, C ∈ Z, when ordered by \|B|2,|AC|\, fail the Hasse principle. Other forthcoming applications include proofs that a positive proportion of integers are (respectively, are not) the sum of two rational cubes, and a positive proportion of genus one curves in P1 × P1 over Q fail the Hasse principle.
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