Main Takeaway: Here we talk about how the abelianization of the geometric algebraic fundmental group is really the Tate module. Recent work of Kass–Wickelgren gives an enriched count of the 27 lines on a smooth cubic surface over arbitrary fields, ...
Isabel Vogt Abelian Varieties Isogenous To A Power Of An Elliptic Curve -
Here we talk about how the abelianization of the geometric algebraic fundmental group is really the Tate module. Recent work of Kass–Wickelgren gives an enriched count of the 27 lines on a smooth cubic surface over arbitrary fields, ... Talk presented at the special session "Moduli spaces in Algebraic Geometry and Applications" of the 2021 Mathematical ...
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- Here we talk about how the abelianization of the geometric algebraic fundmental group is really the Tate module.
- Recent work of Kass–Wickelgren gives an enriched count of the 27 lines on a smooth cubic surface over arbitrary fields, ...
- Talk presented at the special session "Moduli spaces in Algebraic Geometry and Applications" of the 2021 Mathematical ...
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- We will give an overview of a probabilistic model for the arithmetic of
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