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Fred Diamond
Seminar on Potential Modularity and Its Applications
Henri Darmon
A First Course in Modular Forms
Modularity of Some Potentially Barsotti-Tate Galois Representations
Sir Andrew Wiles Awarded Abel Prize
Explicit Serre Weights for Two-Dimensional Galois Representations
The Tamagawa Number Conjecture of Adjoint Motives of Modular Forms
The Bloch-Kato Conjecture for Adjoint Motives of Modular Forms
Mathematics People, Volume 44, Number 6
Zeta Functions, One–Way Functions, and Pseudorandom Number Generators
The Sub-Leading Coefficient of the L-Function of an Elliptic Curve
P-Adic Modular Forms Over Shimura Curves Over Q LIBRARIES
London Mathematical Society Lecture Note Series: 414: Automorphic Forms and Galois Representations: Volume 1 Edited by Fred Diamond, Payman L
The Shimura-Taniyama Conjecture (D'apr`Es Wiles)
Fermat's Last Theorem If X, Y, Z and N Are Integers Satisfying Xn + Yn = Zn, Then Either N ≤ 2 Or Xyz = 0
Sir Andrew J. Wiles
F. Diamond, J. Shurman a First Course in Modular Forms Series: Graduate Texts in Mathematics, Vol
Graduate Texts in Mathematics 228
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A First Course in Modular Forms
Complex Multiplication - Course Overview
Modularity of Certain Potentially Barsotti-Tate Galois Representations
Fermat's Last Theorem
UNIVERSITY of CALIFORNIA Los Angeles Hecke Freeness of Certain
Deformation Theory of Galois Representations
Elliptic Curves Over $\Mathbb {Q} \Infty $ Are Modular
Proof of De Smit's Conjecture: a Freeness Criterion
Institute for Advanced Study Faculty and Emeriti 2010–2011
Bloch–Kato Conjectures for Automorphic Motives
Sums of Higher Powers and Fermat's Last Theorem
Arxiv:2001.00530V1 [Math.NT] 2 Jan 2020
On the Modularity of Elliptic Curves Over Q: Wild 3-Adic Exercises
Modularity Lifting Theorems - Outline
[Math.NT] 5 Apr 2005 ..Qatttv Enmns 29 26 19 Remarks References Some Refinements? 8
1 Stephen Smale Mathematics, B.S. 1952 Born in Flint, MI Dr. Stephen
P-Adic Langlands Functoriality