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京东 11.11 红包
Hodge Theory Day(From Deligne to nowday)
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https://www.youtube.com/playlist?list=PLo4jXE-LdDTRbkCNSMryrCubvX19uFjPX William Vallance Douglas Hodge’s (1903-1975) description of the de Rham cohomology of projective varieties, Phillip Augustus Griffiths’ (1938-) breakthrough applications of it in al
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IHES summer school analytic number theory (解析数论)
perfectoid space and p-adic geometry attach to p-adic Hodge theory
p-adic Hodge theory
deformation theory
motivic theory
Hodge theory & Unitary representations
Intersection Theory
Topos theory
Hodge and Noether-Lefschetz Loci Seminar
群表示论
Field to Galois theory(伽罗华理论)
范畴论(category theory)
class field theory(类域论)
Geometric Representation Theory
IHES -TOPOS theory
Systèmes locaux l-adiques sur une variété sur un corps fini Pierre Deligne
IHES Summer School 2019: Aspects of Geometric Group Theory
Integral p adic Hodge theory
Intersection theory
Introduction to Deformation Theory(形变理论)
stable homotopy theory
Parameter Spaces in Algebraic Geometry
Automorphic forms, Shimura varieties, Galois representations and L-functions
K theory
New Geometric Methods in Number Theory and Automorphic Forms
moduli space(模空间)
朗兰兹纲领ByFrenkel
Model theory
complex algebraic geometry
J-Holomorphic curves and Gromov-Witten theory
Motivic Verona: minicourse on abstract and motivic homotopy theory by Peter Arnd
Around topological Hochschild homology
Mazur’s universal Deformation theory
ICM-2018 number theory
Geometric Invariant Theory(几何不变量理论)
Geometry and Arithmetic: 61st Birthday of Pierre Deligne
on the Arakelov theory of arithmetic
Introduction to Shimura Varieties
Vector Bundles and theirChar Classes
p-adic cycle theory