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Tate module
Generalization of Anderson's T-Motives and Tate Conjecture
Arxiv:2012.03076V1 [Math.NT]
Modular Galois Represemtations
ON the TATE MODULE of a NUMBER FIELD II 1. Introduction
The Geometry of Lubin-Tate Spaces (Weinstein) Lecture 1: Formal Groups and Formal Modules
On the Structure of Galois Groups As Galois Modules
Galois Module Structure of Lubin-Tate Modules
The Mumford-Tate Conjecture for Drinfeld-Modules
Sato-Tate Distributions
Galois Representations
THE THEOREM of HONDA and TATE 11 We Have 1/2 [Lw : Fv] = [L0,W0 : F0,V0 ] = [L0 : F0] = [E : F ]
P-Adic Hodge Theory (Math 679)
Arxiv:1907.05144V3 [Math.NT] 5 Feb 2021 Edaaouso Litccre N Bla Aite.In Varieties
Arxiv:1602.08354V1 [Math.NT] 26 Feb 2016 M´Exico
Local Indecomposability of Tate Modules of Non-Cm Abelian Varieties with Real Multiplication
Arxiv:1808.04783V3 [Math.AG]
On a Generalization of Tate Dualities with Application to Iwasawa Theory Compositio Mathematica, Tome 85, No 2 (1993), P
Recent Progress and Open Problems in Function Field Arithmetic — the Influence of John Tate’S Work
Top View
ABELIAN VARIETIES and P-DIVISIBLE GROUPS
The Hodge-Tate Decomposition Via Perfectoid Spaces Arizona Winter School 2017
Galois Representations and Modular Forms
Modularity of Abelian Surfaces Over Imaginary Quadratic Fields Ciaran
ON the TATE MODULE of a NUMBER FIELD 1. Introduction
Tate Module Tensor Decompositions and the Sato-Tate Conjecture For
Rubin's Integral Refinement of the Abelian Stark Conjecture
Arxiv:Math/0304480V3 [Math.NT] 2 Feb 2004 Arithmetic Duality Theorems for 1-Motives
Arxiv:1708.02656V1 [Math.NT] 8 Aug 2017 Litccurves Elliptic Curve Ler Hti Pi Tifiiy H Ouisaeo Aeelpi Curves Elliptic Fake of Space Moduli the Infinity
Explicit Class Field Theory Via Elliptic Curves
The Sato–Tate Conjecture and Generalizations∗
The Work of John Tate
The Tate Module and Finiteness Theorems for Abelian Varieties
Tate Conjecture for Abelian Varieties Over Number Fields
L-Adic Galois Representations
A Monodromy Criterion for Existence of Néron Models of Abelian Schemes in Characteristic Zero
INTEGRAL P-ADIC HODGE THEORY Contents 0. Introduction 1 1
NOTES on TATE CONJECTURES and ARAKELOV THEORY 1. Abelian Varieties and a Conjecture of Tate Before We Begin, We Write Down for T
A Finiteness Theorem for the Brauer Group of K3 Surfaces in Odd
Faltings's Proof of the Mordell Conjecture
The Tate Conjecture from Finiteness
The Work of John Tate
Systems of L-Adic Representations and Elliptic Curves
INTRODUCTION to P-ADIC HODGE THEORY
A $ P $-Adic Stark Conjecture in the Rank One Setting
Recent Progress on the Tate Conjecture
The Tate Module of a Simple Abelian Variety of Type IV
P-DIVISIBLE GROUPS: PART II
Geometric Aspects of P-Adic Hodge Theory
1. Galois Groups and Galois Representations 2. Geometric Galois Representations 2.1. Tate Modules. 2.2. the Cyclotomic Character
Abelian Varieties
L-Adic Representations and Their Associated Invariants
Local Fields Definitions
Tate Modules, P-Divisible Groups, and the Fundamental Group
MEMORIAL MINUTE for JOHN T. TATE John Torrence Tate Jr. Born
Tate's Isogeny Theorem for Abelian Varieties Over Finite Fields
Galois Representations
Abelian Varieties Over Local and Global Fields
Introduction
University of Alberta Heegner Points, Hilbert's Twelfth Problem, And
Euler Systems and Kolyvagin Systems Karl Rubin 1
Memorial Article for John Tate Edited by Barry Mazur and Kenneth A
The Hodge-Tate Decomposition Theorem for Abelian Varieties Over P-Adic fields
John Torrence Tate University of Texas at Austin
ALGEBRAIC NUMBER THEORY Romyar Sharifi
Notes on P-Adic Hodge Theory Serin Hong
Galois Representations
LECTURES on P-ADIC HODGE THEORY by BHARGAV BHATT
ISOGENY VOLCANOES Contents 1. Introduction 2 2. Orders in Q
The Life and Work of John Tate∗