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This is a Quantitative Study study.

October 18, 2025

The distribution of ℓ^∞-Selmer groups in degree ℓ twist families II

Key Points

The study computes conditions under which the distribution of ℓ∞-Selmer groups can be assessed effectively.
Findings indicate that the average rank in the quadratic twist family of any abelian variety over a number field is bounded.
The work builds upon previous research on higher Selmer groups, enriching the understanding of Galois modules in number fields.
Identifying the distribution characteristics of Selmer groups significantly impacts the analysis of number fields.

Abstract

We continue the investigation of the distribution of ℓ ∞ ^ -Selmer groups in degree ℓ twist families of Galois modules over number fields begun by the author in J. Amer. Math. Soc. 39-1 (2026), pp. 1–72. Building off the work on higher Selmer groups in that part, we find conditions under which we can compute the distribution of the ℓ ∞ ^ -Selmer groups for a given degree ℓ twist family. Along the way, we show that the average rank in the quadratic twist family of any given abelian variety over a number field is bounded.

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Cite This Study

Alexander Smith (Thu,) studied this question.

synapsesocial.com/papers/68f3793258f37cefb60d36c1 https://doi.org/https://doi.org/10.1090/jams/1063

Discussion

Journals

Journal of the American Mathematical Society

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