| Online formal talks |
Speaker
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Title
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PDF/PPT
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WMV
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WMV
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| Abrashkin |
A semi-stable case of the Shafarevich Conjecture |
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| Berger |
L1: (phi,Gamma)-modules |
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| Breuil |
Extensions between Galois characters and mod p local-global compatibility for GL2 |
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| Brown |
Mixed Tate motives over Z and fundamental group of P^1 minus 3 points |
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| Burns |
On main conjectures in geometric Iwasawa theory and related conjectures |
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| Bushnell |
To an effective local Langlands correspondence |
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| Buzzard |
Reductions of 2-dimensional crystalline representations. |
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| Chaudouard |
L3: Geometry of the fundamental lemma |
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| Chenevier |
Kneser neighbours and orthogonal Galois representations in dimensions 16 and 24 |
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| Colmez |
L1: (phi,Gamma)-modules and representations of GL(2,Qp), I |
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| Colmez |
L1: (phi,Gamma)-modules and representations of GL(2,Qp), II |
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| Darmon |
A p-adic Gross-Zagier formula for Garrett triple product L-functions |
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| Dieulefait |
Non-solvable base change for GL(2) |
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| Dimitrov |
On the eigencurve at classical weight one points |
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| Emerton |
Moduli of potentially semi-stable Galois representations |
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| Fargues |
L2: Curves and vector bundles in p-adic Hodge theory, I |
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| Fargues |
L2: Curves and vector bundles in p-adic Hodge theory, II |
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| Fontaine |
L2: Curves and vector bundles in p-adic Hodge theory, III |
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| Fontaine |
L2: Curves and vector bundles in p-adic Hodge theory, IV |
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| Furusho |
Around associators |
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| Gee |
L5: Potential automorphy: First theorems |
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| Gee |
L5: Potential automorphy: The main theorem |
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| Haines |
L3: Introduction to endoscopic transfer. |
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| Hoshi |
L4: Classical anabelian geometry |
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| Hoshi |
L4: Grothendieck conjecture over local fields --- from "relative" to "absolute" --- |
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| Niziol |
Comparison theorems: the open case |
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| Paskunas |
L1: On the Breuil-Mezard conjecture |
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| Pop |
L4: General theory of outer representations of the Galois group |
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| Pop |
L4: Grothendiecks Section Conjecture |
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| Schneider |
From etale (phi,Gamma)-modules to equivariant sheaves |
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| Shin |
L3: The trace formula and its applications, I |
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| Shin |
L3: The trace formula and its applications, II |
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| Stroh |
Classicity and overconvergence |
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| Taylor |
L5: Potential automorphy: Introduction |
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| Taylor |
L5: Potential automorphy: Applications of the main theorem |
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| Tian |
Classicality of overconvergent Hilbert modular forms in the quadratic inert case |
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| Tilouine |
Overconvergent Igusa tower and overconvergent Siegel forms |
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| Wintenberger |
Ramification and Iwasawa modules |
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