GAUS-AG
The direct summand theorem
Heidelberg, Mathematikon, SR 8 INF 205, Heidelberg, GermanyTalk 8: Marvin Schneider (Universität Heidelberg): Perfectoid spaces II: Tate acyclicity
Vector bundles on curves
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, GermanyChristopher Lang: Vector bundles in families
The direct summand theorem
Heidelberg, Mathematikon, SR 8 INF 205, Heidelberg, GermanyTalk 9: Christian Dahlhausen (Universität Heidelberg): The almost purity theorem
Moduli of Quiver Representations and GIT Quotients
Frankfurt, Robert-Mayer-Str. 6-8, Raum 309Talk 3.1: Miguel Prado (Goethe Universität): Introduction to Quivers and Properties I
Talk 3.2: Jeonghoon So (Goethe Universität): Introduction to Quivers and Properties II
The direct summand theorem
Heidelberg, Mathematikon, SR 8 INF 205, Heidelberg, GermanyTalk 10: Max Witzelsperger (Universität Heidelberg): The direct summand theorem
Moduli of Quiver Representations and GIT Quotients
Frankfurt, Rober-Mayer-Str. 10, Raum 711 kleinTalk 4.1: Arne Kuhrs (Goethe Universität): Affine Moduli Spaces of Quiver Representations
Talk 4.2: Johannes Horn (Goethe Universität): Moduli Spaces of Quiver Representations
Anabelian geometry – Mochizuki’s proof of the Hom-Conjecture [d’après Faltings]
Frankfurt, Robert-Mayer-Str. 6-8, Raum 309Talk 4: Marius Leonhardt (Goethe Universität): Construction of 𝔥 and Hodge-Tateness of rational sections
Talk 5: Morten Lüders (Universität Heidelberg): Bloch-Kato Selmer groups
Vector bundles on curves
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, Germanytba: Stacks and examples
Anabelian geometry – Mochizuki’s proof of the Hom-Conjecture [d’après Faltings]
HeidelbergTalk 6: Ruth Wild (Goethe Universität): Hodge-Tate sections are geometric up to torsion
Talk 7: Benjamin Steklov (Goethe Universität): Preparations for Proposition 11: 𝑝-divisible groups
Vector bundles on curves
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, Germanytba: Algebraicity of BunX,n
Vector bundles on curves
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, GermanyPaul Siemon: Geometry of BunX,n
Anabelian geometry – Mochizuki’s proof of the Hom-Conjecture [d’après Faltings]
Frankfurt, Robert-Mayer-Str. 6-8, Raum 309Talk 8: Amine Koubaa (Goethe Universität): Preparations for Proposition 11: the Tate conjecture
Talk 9: Magnus Carlson (Goethe Universität): Sections geometric up to torsion