The \(p\)-part of Tate-Shafarevich groups of elliptic curves can be arbitrarily large
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Publication:819880
DOI10.5802/jtnb.521zbMath1153.11313arXivmath/0303143OpenAlexW2066566298MaRDI QIDQ819880
Publication date: 30 March 2006
Published in: Journal de Théorie des Nombres de Bordeaux (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0303143
Elliptic curves over global fields (11G05) Arithmetic ground fields for curves (14H25) Cubic and quartic Diophantine equations (11D25) Global ground fields in algebraic geometry (14G25)
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Cites Work
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- Class fields of abelian extensions of \(\mathbb Q\)
- Chebotarëv and his density theorem
- Selmer groups of elliptic curves that can be arbitrarily large.
- Class groups and Selmer groups
- A Family of Semistable Elliptic Curves with Large Tate-Shafarevitch Groups
- Die Ordnung der Schafarewitsch‐Tate‐Gruppe kann beliebig groß werden
- How to do a 𝑝-descent on an elliptic curve
- Arithmetic on Curves of genus 1. VI. The Tate-Safarevic group can be arbitrarily large.
- Arithmetic on curves of genus 1. VIII. On conjectures of Birch and Swinnerton-Dyer.
- On the arithmetic of abelian varieties
- Some examples of 5 and 7 descent for elliptic curves over \(\mathbb{Q}\)
