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title: Weil Conjectures Talks

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Tags: #open/conjectures #todo #arithmetic-geometry/Weil-conjectures


[To Review/2021-04-28_Weil_Conjectures_1](To%20Review/2021-04-28_Weil_Conjectures_1.md)
[To Review/2021-04-28_Weil_Conjectures_2](To%20Review/2021-04-28_Weil_Conjectures_2.md)
[To Review/2021-04-28_Weil_Conjectures_3](To%20Review/2021-04-28_Weil_Conjectures_3.md)
[To Review/2021-04-28_Weil_Conjectures_4](To%20Review/2021-04-28_Weil_Conjectures_4.md)
[To Review/2021-04-28_Weil_Conjectures_Talk](To%20Review/2021-04-28_Weil_Conjectures_Talk.md)


Remarks from Daniel:

- Work out for $\PP^n$ or $\Gr_{k, n} = \GL_n/P$ where $P$ is the stabilizer of a $k\dash$point in $\CC^n$ or $\FF_q$.
- Harder examples: $E\slice k$ an [elliptic curve](MOCs/elliptic%20curve.md)
- Show how to reduce to a [hypersurface](Unsorted/hypersurface.md), not necessarily diagonal.