Tag Archives: Wintenberger

Abelian Surfaces are Potentially Modular

Posted on November 11, 2017 by Persiflage

Today I wanted (in the spirit of this post) to report on some new work in progress with George Boxer, Toby Gee, and Vincent Pilloni. Edit: The paper is now available here. Recal that, for a smooth projective variety X … Continue reading →

Posted in Mathematics | Tagged Abelian Surfaces, Ana Caraiani, Andrew Wiles, Ariel Pacetti, Armand Brumer, Benoit Stroh, Betti cohomology, coherent cohomology, Cris Poor, David Geraghty, David Yuen, etale cohomology, George Boxer, Gonzalo Tornaría, Hasse-Weil Conjecture, Higher Hida Theory, IAS, Jacques Tilouine, John Voight, Kevin Buzzard, Kris Klosin, Langlands, Maass Forms, Payman Kassaei, Peter Scholze, RLT, Shekar Khare, Shepherd-Barron, Shu Susaki, Tetrachotomy, Tobias Berger, Toby Gee, Vincent Pilloni, Wintenberger, Yichao Tian | 12 Comments

New Results in Modularity, Part II

Posted on June 23, 2017 by Persiflage

This is part two of series on work in progress with Patrick Allen, Ana Caraiani, Toby Gee, David Helm, Bao Le Hung, James Newton, Peter Scholze, Richard Taylor, and Jack Thorne. Click here for Part I It has been almost … Continue reading →

Posted in Mathematics | Tagged Ana Caraiani, Andrew Wiles, Bao Le Hung, Barnett-Lamb, Barry Mazur, BLGGT, Breuil, Colmez, David Geraghty, David Helm, David Savitt, Diamond, Jack Thorne, James Newton, Ken Ribet, Laurent Clozel, Mark Kisin, Matthew Emerton, Michael Harris, Modularity, p-adic Langlands, Patrick Allen, Peter Scholze, RLT, Shekar Khare, Skinner, Taylor-Wiles, The Hawk, Toby Gee, Vytas Paskunas, Wintenberger | 7 Comments

I don’t know how to prove Serre’s conjecture.

Posted on May 30, 2014 by Persiflage

I find it slightly annoying that I don’t know how to prove Serre’s conjecture for imaginary quadratic fields. In particular, I don’t even see any particularly good strategy for showing that a surjective Galois representation — say finite flat with … Continue reading →

Posted in Mathematics | Tagged Khare, Mazur Principle, Serre's conjecture, torsion, Wintenberger | Leave a comment

Tag Archives: Wintenberger

Abelian Surfaces are Potentially Modular

New Results in Modularity, Part II

I don’t know how to prove Serre’s conjecture.

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Tag Archives: Wintenberger

Abelian Surfaces are Potentially Modular

New Results in Modularity, Part II

I don’t know how to prove Serre’s conjecture.

Recent Posts

Recent Comments

Blogroll

Categories

Tags

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Meta