Elements of prime order in Tate-Shafarevich groups of abelian varieties   over $\mathbb{Q}$

Ari Shnidman; Ariel Weiss

arXiv:2106.14096·math.NT·December 7, 2022

Elements of prime order in Tate-Shafarevich groups of abelian varieties over $\mathbb{Q}$

Ari Shnidman, Ariel Weiss

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Abstract

For each prime $p$ , we show that there exist geometrically simple abelian varieties $A / Q$ with non-trivial $p$ -torsion in their Tate-Shafarevich groups. Specifically, for any prime $N \equiv 1 (mod p)$ , let $A_{f}$ be an optimal quotient of $J_{0} (N)$ with a rational point $P$ of order $p$ , and let $B = A_{f} / ⟨ P ⟩$ . Then the number of positive integers $d \leq X$ , such that the Tate-Shafarevich group of $\hat{B}_{d}$ has non-trivial $p$ -torsion, is $≫ X / lo g X$ , where $\hat{B}_{d}$ is the dual of the $d$ -th quadratic twist of $B$ . We prove this more generally for abelian varieties of $GL_{2}$ -type with a $p$ -isogeny satisfying a mild technical condition. In the special case of elliptic curves, we give stronger results, including many examples where $Sha (E_{d}) [p] \neq = 0$ for an explicit positive proportion of integers $d$ .

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TopicsAlgebraic Geometry and Number Theory · Finite Group Theory Research · Coding theory and cryptography