This is a workshop on the solution of the Weil conjectures, organized by Shaul Barkan and Shay Ben Moshe. We will take a modern approach, and try to give an overview of the conjectures, the tools used to prove it and the method of the proof itself.

The workshop will take place between the *7th to 9th of September* (Monday to Wednesday), and will be streamed on Zoom.

Notes from the talks

Videos of the talks

Abstracts and references

All times are in Israel time zone (i.e. GMT +3).

Monday | Tuesday | Wednesday |
---|---|---|

10:00-10:45 - Introduction to the Weil Conjectures - Tomer Schlank | 10:00-10:45 - Geometry of Frobenius - Segev Cohen | 10:00-11:45 - Mixed and Real Sheaves - Magnus Carlson |

11:00-11:45 - Idea of the Proof - Tomer Schlank | 11:00-12:15 - Grothendieck-Lefschetz and the Weil Conjectures (except RH) - Shay Ben Moshe | 12:15-13:00 - Reduction to A^1 - Shaul Barkan |

12:15-13:30 - Topological 6-Functor Formalism - Asaf Horev | 13:15-14:00 - Sheaves and Frobenius - Lior Yanovski | 14:00-15:30 - Fourier Transform and Proof for A^1 - Stephan Snegirov |

14:30-15:30 - Pro-etale site, l-adic Sheaves and Cohomology - Guy Kapon | 14:15-15:30 - Semi-Continuity - Ariel Davis | 16:00-17:00 - Summary and Further Directions - Tomer Schlank |

16:00-17:00 - Algebraic 6-Functor Formalism - Shauly Ragimov | 16:15-17:30 - Monodromy - Zev Rosengarten | |

Q&A | Q&A |