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Weston, Tom - Department of Mathematics and Statistics, University of Massachusetts at Amherst
Complete discrete valuation rings and local elds. (cf. Chap I of [1]) Let A be a commutative ring. These are equivalent.
EXPLICIT UNOBSTRUCTED PRIMES FOR MODULAR DEFORMATION PROBLEMS OF SQUAREFREE LEVEL
AN INTRODUCTION TO COBORDISM THEORY 1. Introduction 1
Euler Systems and Arithmetic Geometry Barry Mazur and Tom Weston
AN OVERVIEW OF A THEOREM OF FLACH In recent years, the study of the deformation theory of Galois representations has
ON ANTICYCLOTOMIC INVARIANTS OF MODULAR FORMS ROBERT POLLACK AND TOM WESTON
MAZUR--TATE ELEMENTS OF NONORDINARY MODULAR ROBERT POLLACK AND TOM WESTON
THE EULER SYSTEM OF HEEGNER POINTS 1. Introduction 1
ALGEBRAIC CYCLES, MODULAR FORMS AND EULER SYSTEMS
SELMER GROUPS AND CHOW GROUPS OF SELF-PRODUCTS OF ALGEBRAIC VARIETIES
AN INTRODUCTION TO COBORDISM THEORY 1. Introduction 1
IWASAWA INVARIANTS OF GALOIS DEFORMATIONS Abstract. Fix a residual ordinary representation
THE EULER SYSTEM OF HEEGNER POINTS 1. Introduction 1
Lectures on the Dirichlet Class Number Formula for Imaginary Quadratic Fields
POWER RESIDUES OF FOURIER COEFFICIENTS OF MODULAR FORMS
VARIATION OF IWASAWA INVARIANTS IN HIDA FAMILIES MATTHEW EMERTON, ROBERT POLLACK AND TOM WESTON
KUMMER THEORY OF ABELIAN VARIETIES AND REDUCTIONS OF MORDELL-WEIL GROUPS
LOCAL TORSION ON ELLIPTIC CURVES AND THE DEFORMATION THEORY OF GALOIS REPRESENTATIONS
UNOBSTRUCTED MODULAR DEFORMATION PROBLEMS Abstract. Let f be a newform of weight k 3 with Fourier coefficients in a
A BRIEF INTRODUCTION TO LOCAL FIELDS The purpose of these notes is to give a survey of the basic Galois theory of local
THE INFLATION-RESTRICTION SEQUENCE : AN INTRODUCTION TO SPECTRAL SEQUENCES
THE IDELIC APPROACH TO NUMBER THEORY 1. Introduction
THE BANACH-TARSKI PARADOX 1. Introduction
Rough syllabus for Math 254. MATH 254 will be run in the form of a seminar accessible to beginning and second year
THE IDELIC APPROACH TO NUMBER THEORY 1. Introduction
AN OVERVIEW OF A THEOREM OF FLACH In recent years, the study of the deformation theory of Galois representations has
LOCAL TORSION ON ELLIPTIC CURVES AND THE DEFORMATION THEORY OF GALOIS REPRESENTATIONS
POWER RESIDUES OF FOURIER COEFFICIENTS OF MODULAR FORMS
SELMER GROUPS AND CHOW GROUPS OF SELF-PRODUCTS OF ALGEBRAIC VARIETIES
ALGEBRAIC CYCLES, MODULAR FORMS AND EULER SYSTEMS
On Selmer Groups of Geometric Galois Representations
MATH 411: HOMEWORK 1 DUE THURSDAY, FEBRUARY 3
L-FUNCTIONS AND CYCLOTOMIC UNITS TOM WESTON, UNIVERSITY OF MICHIGAN
Lectures on the Dirichlet Class Number Formula for Imaginary Quadratic Fields
Algebraic Number Theory Chapter 1. Number Fields 5
A BRIEF INTRODUCTION TO LOCAL FIELDS The purpose of these notes is to give a survey of the basic Galois theory of local
THE BANACH-TARSKI PARADOX 1. Introduction
KUMMER THEORY OF ABELIAN VARIETIES AND REDUCTIONS OF MORDELL-WEIL GROUPS
KIDA'S FORMULA AND CONGRUENCES ROBERT POLLACK AND TOM WESTON
Euler Systems and Arithmetic Geometry Barry Mazur and Tom Weston
VARIATION OF IWASAWA INVARIANTS IN HIDA FAMILIES MATTHEW EMERTON, ROBERT POLLACK AND TOM WESTON
UNOBSTRUCTED MODULAR DEFORMATION PROBLEMS Abstract. Let f be a newform of weight k 3 with Fourier coecients in a
POWER RESIDUES OF FOURIER COEFFICIENTS OF ELLIPTIC CURVES WITH COMPLEX MULTIPLICATION
THE MODULAR CURVES X 0 (11) AND X 1 (11) This paper is intended as a brief introduction to the theory of moduli spaces
Algebraic Number Theory Chapter 1. Number Fields 5
KIDA'S FORMULA AND CONGRUENCES ROBERT POLLACK AND TOM WESTON
IWASAWA INVARIANTS OF GALOIS DEFORMATIONS Abstract. Fix a residual ordinary representation : GF GLn(k) of the
L-FUNCTIONS AND CYCLOTOMIC UNITS TOM WESTON, UNIVERSITY OF MICHIGAN
POWER RESIDUES OF FOURIER COEFFICIENTS OF ELLIPTIC CURVES WITH COMPLEX MULTIPLICATION
GEOMETRIC EULER SYSTEMS FOR LOCALLY ISOTROPIC MOTIVES
EXPLICIT UNOBSTRUCTED PRIMES FOR MODULAR DEFORMATION PROBLEMS OF SQUAREFREE LEVEL
On Selmer Groups of Geometric Galois Representations
ON ANTICYCLOTOMIC -INVARIANTS OF MODULAR FORMS ROBERT POLLACK AND TOM WESTON
MAZURTATE ELEMENTS OF NON-ORDINARY MODULAR ROBERT POLLACK AND TOM WESTON
