p∞$p^{infty }$-Selmer ranks of CM abelian varieties

IF 0.8 3区数学 Q2 MATHEMATICS Bulletin of the London Mathematical Society Pub Date : 2024-06-06 DOI:10.1112/blms.13094

Jamie Bell

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摘要

对于在一个数域上具有复乘法的椭圆曲线来说，对于所有......的椭圆曲线，-塞尔默秩都是偶数。Česnavičius利用在复乘法域中无论何时分裂都允许-同源的事实，并援引-奇偶性猜想的已知情况，证明了这一点。我们给出了直接证明，并将结果推广到无性方程。

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p ∞ $p^{\infty }$ -Selmer ranks of CM abelian varieties

For an elliptic curve with complex multiplication over a number field, the $p^{\infty}$ -Selmer rank is even for all $p$ . Česnavičius proved this using the fact that $E$ admits a $p$ -isogeny whenever $p$ splits in the complex multiplication field, and invoking known cases of the $p$ -parity conjecture. We give a direct proof, and generalise the result to abelian varieties.