Elements of prime order in Tate-Shafarevich groups of abelian varieties over Q
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 1 p, let Af be an optimal quotient of J0(N) with a rational point P of order p, and let B = Af/ P . Then the number of positive integers d ≤ X, such that the Tate-Shafarevich group of Bd has non-trivial p-torsion, is X/ X, where Bd is the dual of the d-th quadratic twist of B. We prove this more generally for abelian varieties of GL2-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(Ed)[p] ≠ 0 for an explicit positive proportion of integers d.
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