Stein, William - Department of Mathematics, University of Washington at Seattle

• Annals of Mathematics, 141 (1995), 443-551 Pierre de Fermat Andrew John Wiles
• William A. Stein Research Statement (617) 308-0144 was@math.harvard.edu http://modular.fas.harvard.edu
• EXPOSE XXIII GROUPES REDUCTIFS : UNICITE DES GROUPES
• Dirichlet's Theorem on Primes in an Arithmetic Progression
• Algebraic Geometry Homework II.3 #'s 6,7,8,12,14
• Dear Mr. Faltings, Many thanks for your quick answer and for sending me your reprints!
• On Factoring Integers and Evaluating Discrete Logarithms
• Calculus Review Survey Graduate Students
• William A. Stein Biographical Sketch (206) 419-0925 wstein@uw.edu http://wstein.org
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000-000
• Component Groups of Quotients of J0(N ) Copyright Springer-Verlag
• Vis(i)J(H1(K,A)):=ker{H1(K,A)H1(K,J)}, H1(K,A)H1(K,J)
• Explicit approaches to modular abelian varieties by
• 1 The Modular Degree, Congruence Primes and Multiplicity One
• Version 1.0 Generating the Hecke algebra
• Hecke Algebras and Modular Forms: Notes derived from Ribet's 1996 Berkeley grad. course.
• Plan for Math 124, Fall 20011 Date|||||||||NoteR|eading______S|ubject________________________________________*
• MSRI Modular Forms Summer Workshop Problem Book
• Notes for Algebraic Geometry II William A. Stein
• THE JACOBIAN, THE ABEL-JACOBI MAP, AND ABEL'S THEOREM
• Studying the Birch and Swinnerton-Dyer Conjecture for Modular Abelian Varieties
• Visibility of Shafarevich-Tate Groups of Abelian Varieties
• VISIBLE ELEMENTS OF THE SHAFAREVICH-TATE GROUP
• A Brief Introduction to Classical and Adelic
• William A. Stein Curriculum Vitae (617)308-0144 . was@math.harvard.edu . http://modular.f*
• Algebraic Geometry Homework William A. Stein
• Preliminary_version_____________________________________Barcelona-Amsterdam,_Oc* *tober,_2001
• ON THE TORSION POINTS OF ELLIPTIC CURVES & MODULAR ABELIAN VARIETIES
• Results from MathSciNet: Mathematical Reviews on the Web cO Copyright American Mathematical Society 2005
• CLASSICAL AND p-ADIC MODULAR FORMS ARISING FROM THE BORCHERDS EXPONENTS OF OTHER MODULAR FORMS
• Component Groups of Purely Toric Quotients of Semistable Jacobians
• Explicit Heegner Points: Kolyvagin's Conjecture and Non-trivial Elements in the Shafarevich-Tate Group
• The Birch and Swinnerton-Dyer Conjecture, a Computational Approach
• On the bits of Elliptic Curve Diffie Hellman keys David Jao1, Dimitar Jetchev2, and Ramarathnam Venkatesan3,4
• AN EXPOSITION OF THE AGRAWAL-KAYAL-SAXENA PRIMALITY-PROVING THEOREM
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000-000
• William A. Stein Detailed Research Plan Detailed Research Plan
• CONSTRUCTING ELEMENTS IN SHAFAREVICH-TATE GROUPS OF MODULAR MOTIVES
• William A. Stein Research Summary Research Summary
• Documenta Math. 585 Computation of p-Adic Heights and Log Convergence
• Correspondence and Composition Grant Schoenebeck
• Algebraic Geometry Homework II.3 #'s 6,7,8,12,14
• Pure and Applied Mathematics Quarterly Volume 2, Number 2
• Component Groups of Purely Toric Quotients William A. Stein Brian Conrad
• Homework 2, MAT256B Chapter III, 4.8, 4.9, 5.6
• A SUMMARY OF THE CM THEORY OF ELLIPTIC CURVES JAYCE GETZ
• Algebraic Number Theory, a Computational Approach
• A mod five approach to modularity of icosahedral Galois representations
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000-000
• Explicitly Computing the Endomorphism Rings of Modular Abelian Varieties
• A Database of Elliptic Curves_First Report William A. Stein1 and Mark Watkins2
• Explicitly Computing Modular Forms William A. Stein
• 1 Visibility of the Shafarevich-Tate Group at Higher Level
• Introduction to Algebraic Number Theory
• Scribe notes for Ken Ribet's Math 274 January 17, 1996
• There are genus one curves over Q of every odd index
• MODULAR PARAMETRIZATIONS OF NEUMANN-SETZER ELLIPTIC CURVES
• Algebraic Geometry Homework II.5, 1,2,3,4,5,7,8
• Elliptic Curves David Wright Escott
• Promenade a travers une oeuvre P 1 L'enfant et la Mere
• Component Groups of Quotients of J 0 (N) Copyright SpringerVerlag
• Version 1.0 Generating the Hecke algebra
• EXPOSE XVIII THEOR`EME DE WEIL SUR LA CONSTRUCTION D'UN
• MECCAH: The Mathematics Extreme Computation Cluster At Harvard
• Notes for Algebraic Geometry II William A. Stein
• 56 SYMMETRIC HARMONIC SPACES. the matrix C^A* is n--l for arbitrary A*. In addition to equations (1)
• Report to the Mathematics Department Ad Hoc Committee on Calculus
• Il seguente articolo con il titolo ``Alexander Grothendieck. Entusiasmo e creativit`a. Un nuovo linguaggio al servizio dell'immaginazione.'' `e
• Documenta Math. 325 J 1 (p) Has Connected Fibers
• AVERTISSEMENT Nous presentons ici une reedition leg`erement revisee du Seminaire originel, dont le
• Dimitar P. Jetchev Personal Statement Personal Statement
• Sage for Power Users: Open Source Mathematical Software
• Elliptic Curves David Wright Escott
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000--000
• Biographical Sketch William Stein
• EXPOSE XIX GROUPES REDUCTIFS -GENERALITES
• Sage: Unifying Mathematical Software for Scientists, Engineers, and Mathematicians
• Sun Fire X4800 Server View DetailsHide Details
• An Explicit Construction of Abelian Extensions via Formal Groups Danielle Li
• Homework 2, MAT256B Chapter III, 4.8, 4.9, 5.6
• Correspondence and Composition Grant Schoenebeck
• Approximation of Eigenforms of Infinite Slope by Eigenforms of Finite Slope
• Visibility of the Shafarevich-Tate Group at Higher Level Dimitar P. Jetchev William A. Stein
• Sage: Open Source Mathematical Software: Symbolic Computation, Combinatorial Species,
• An Explicit Construction of Abelian Extensions via Formal Groups Danielle Li
• [AK] L. Auslander and B. Kostant, Polarization and Unitary representations of solvable Lie groups, Inv. Math. 14 (1971), 255-354.
• CONSTRUCTING ELEMENTS IN SHAFAREVICHTATE GROUPS OF MODULAR MOTIVES
• EXPOSE VIII GROUPES DIAGONALISABLES
• Contents of the scanned pre-notes of EGA V Grothendieck's plan for EGA V was originally meant to be the continuation of EGA
• Ueber die Anzahl der Primzahlen unter einer gegebenen Grosse.
• On the Computation of the Cassels Pairing for Certain Kolyvagin Classes in the
• On the generation of the coefficient field of a newform by a single Hecke eigenvalue
• GROUPES REDUCTIFS DE RANG SEMI-SIMPLE 1 par M. Demazure
• EGA V: 1 and 2.15, 2.16 (formerly numbered as EGA IV: 16 and 17.15, 17.16)
• (former EGA IV: 21) Translation and Editing of his `prenotes'
• The field generated by the points of small prime order on an elliptic curve
• Component Groups of Purely Toric Quotients William A. Stein Brian Conrad
• Research Summary 1 Introduction
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000000
• William A. Stein Project Description (206) 419-0925 wstein@uw.edu http://wstein.org
• EXPOSE XIV ELEMENTS REGULIERS : SUITE, APPLICATION AUX
• Lectures on Modular Forms and Hecke Operators Kenneth A. Ribet William A. Stein
• Visibility of ShafarevichTate Groups of Abelian Varieties
• Explicit Heegner Points: Kolyvagin's Conjecture and Non-trivial Elements in the Shafarevich-Tate Group
• Dimitar Jetchev Research Statement (617) 869-2521 jetchev@gmail.com http://sage.math.washington.edu/home/jetchev
• A mod ve approach to modularity of icosahedral Galois representations
• EQUIDISTRIBUTION OF HEEGNER POINTS AND TERNARY QUADRATIC FORMS
• Impossibility theorems for elementary integration Brian Conrad
• APPEARED IN BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY
• There are genus one curves over Q of every odd index
• VISIBLE ELEMENTS OF THE SHAFAREVICHTATE GROUP
• Biographical Sketch William Stein
• Michael Rubinstein, Biographical Sketch A. Professional Preparation
• EXPOSE XXII GROUPES REDUCTIFS : DEPLOIEMENTS,
• Summary of Fontaine's Notes 1 Preliminaries
• Academic Employment in Mathematics AMS Standard Cover Sheet
• Biographical Sketch K. Jarrod Millman
• Journal of Number Theory 97, 171185 (2002) doi:10.1006/jnth.2002.2810
• Biographical Sketch: Fernando Prez 1 Fernando Prez
• EXPOSE XII TORES MAXIMAUX, GROUPE DE WEYL,
• Bures, 8.16.1964 My dear Serre,
• Notes for Algebraic Geometry II William A. Stein
• A letter from Grothendieck to Illusie Buffalo le 3.5.1973
• Description Quantity Description Price Each Amount
• Curves in P2 and Bezout's Theorem
• A Brief Introduction to Classical and Adelic
• The Congruent Number Problem: A Thousand Year Old Unsolved Problem
• EXPOSE XXV LE THEOR`EME D'EXISTENCE
• Math 414: Number Theory http://wstein.org/edu/2010/414/
• A SUMMARY OF THE CM THEORY OF ELLIPTIC CURVES 1. Introduction: a few modular forms
• BULLETIN (New Series) OF THE AMERICAN MATHEMATICAL SOCIETY
• The Teaching Assistant Manual Judith M. Arms and James Mihalisin
• Fourteen Problems for the UW Putnam Session. Issued 5 Oct. 2009 Play with a few of the problems below. If some are too easy (and you know how to solve
• 1 Algebraic Groups 7 1.1 Group Varieties . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 7
• Visibility of Mordell-Weil Groups William A. Stein1
• Conjectures about Discriminants of Hecke Algebras of Prime Level
• manuscripta math. 95, 463 469 (1998) manuscripta mathematica
• On the Bits of Elliptic Curve Diffie Hellman Keys
• Sage: Unifying Mathematical Software for Scientists, Engineers, and Mathematicians
• Biographical sketch: John H. Palmieri PROFESSIONAL PREPARATION
• American Mathematical Society Centennial Fellowship for 2007-2008
• Alexandre Grothendieck's EGA V Translation and Editing of his `prenotes'
• MARCH 1999 NOTICES OF THE AMS 329 TheIHSatForty
• GROUPES DE TYPE MULTIPLICATIF : HOMOMORPHISMES DANS UN SCHEMA EN
• EXPOSE XVI GROUPES DE RANG UNIPOTENT NUL
• What is Riemann's Hypothesis? Barry Mazur William Stein
• J. reine angew. Math. 547 (2002), 139--147 Journal fur die reine und angewandte Mathematik
• Version 1.0 Generating the Hecke algebra
• Approximation of Eigenforms of Infinite Slope by Eigenforms of Finite Slope
• Dirichlet's Theorem on Primes in an Arithmetic Progression
• Algebraic Geometry Homework II.5, 1,2,3,4,5,7,8
• Algebraic Number Theory, a Computational Approach
• SolvingthePellEquation H. W. Lenstra Jr.
• 1. Introduction 1.1. Background. L-functions and modular forms underlie much of twentieth century number theory
• Kolyvagin's Conjecture for Specific Higher Rank Elliptic Curves
• What Do Modular Forms Attached to Elliptic Curves Kevin T. Grosvenor and William Stein
• Collected Works William Stein
• The Sage Project: Unifying Free Mathematical Software to Create a Viable
• Possibilities for Shafarevich-Tate Groups of Modular Abelian Varieties
• Computing the Prime Counting Function Kevin Stueve under the direction of William Stein
• Connections Between the Riemann Hypothesis and the Sato-Tate Conjecture
• Pretty Patterns of Perfect Powers mod p Emily A. Kirkman
• Proving Mordell-Weil: A Descent in Three Parts A Senior Thesis Of
• CLASSICAL AND p-ADIC MODULAR FORMS ARISING FROM THE BORCHERDS EXPONENTS OF OTHER MODULAR FORMS
• THE JACOBIAN, THE ABEL-JACOBI MAP, AND ABEL'S SETH KLEINERMAN
• Detailed Research Plan 1 Introduction
• Algorithms for the Arithmetic of Elliptic Curves using Iwasawa Theory
• Heegner Points and the Arithmetic of Elliptic Curves Over Ring Class Extensions
• The Modular Degree, Congruence Primes and Multiplicity One Amod Agashe Kenneth A. Ribet William A. Stein
• Explicitly Computing the Endomorphism Rings of Modular Abelian Varieties
• This is page i Printer: Opaque this
• Three Lectures about Explicit Methods in Number Theory Using Sage
• The Birch and Swinnerton-Dyer Conjecture, a Computational Approach
• Explicit Heegner points: Kolyvagin's conjecture and non-trivial elements in the Shafarevich-Tate group
• Modular Forms: A Computational Approach
• AVERAGE RANKS OF ELLIPTIC CURVES: TENSION BETWEEN DATA AND CONJECTURE
• Verification of the Birch and Swinnerton-Dyer Conjecture for Specific
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000000
• Documenta Math. 585 Computation of p-Adic Heights and Log Convergence
• Studying the Birch and Swinnerton-Dyer Conjecture for Modular Abelian Varieties
• A Database of Elliptic Curves--First Report William A. Stein1 and Mark Watkins2
• Navigate MathSciNet Jump to Search or Browse Screens
• Component Groups of Purely Toric Quotients William A. Stein Brian Conrad
• An introduction to computing modular forms using modular symbols
• Lectures on Serre's conjectures Kenneth A. Ribet
• PACIFIC JOURNAL OF MATHEMATICS Vol. 203, No. 2, 2002
• MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000000
• Math 582e: Galois Cohomology http://wstein.org/edu/2010/582e/
• This is page 103 Printer: Opaque this
• Explicitly Computing Modular Forms William A. Stein
• Introduction to Algebraic Number Theory
• Designs, Codes and Cryptography, 19, 173193 (2000) c 2000 Kluwer Academic Publishers, Boston. Manufactured in The Netherlands.
• Dimitar P. Jetchev Curriculum Vitae jetchev@gmail.com http://sage.math.washington.edu/home/jetchev
• Dimitar P. Jetchev Publication List Publication List
• Visibility of the Shafarevich-Tate Group at Higher Level Dimitar P. Jetchev William A. Stein
• VISIBLE ELEMENTS OF THE SHAFAREVICH-TATE GROUP
• The Local-Global Principle Jonathan Bloom
• Elliptic Curves David Wright Escott
• Correspondence and Composition Grant Schoenebeck
• William A. Stein Project Summary (206) 419-0925 wstein@uw.edu http://wstein.org
• William A. Stein References Cited (206) 419-0925 wstein@uw.edu http://wstein.org
• S2I2 Exploratory Workshop: Open Source Software as a Foundation for Scientific Research
• S2I2 Exploratory Workshop: Open Source Software as a Foundation for Scientific Research
• [1] Digital library of mathematical functions. DLMF; electronic version, NIST, Gaithersburg, MD, 2001, http://dlmf.nist.gov/.
• Biographical Sketch William Stein
• SCREMS: The Frontiers of Representation Theory, Number Theory, and Mathematical Physics
• SCREMS: The Frontiers of Representation Theory, Number Theory, and Mathematical Physics
• Charles F. Doran: Professional Preparation Harvard College Mathematics, A.B. 1992
• Biographical Sketch William Stein
• The Dell Online Store: Build Your System -Higher Education http://premierconfigure.us.dell.com/dellstore/print_summary_details... 1 of 2 1/10/08 1:22 AM
• CSUMS: Undergraduate Computational Research in Arithmetic Geometry
• CSUMS: Undergraduate Computational Research in Arithmetic Geometry
• [BCP97] W. Bosma, J. Cannon, and C. Playoust, The Magma algebra system. I. The user language, J. Symbolic Comput. 24 (1997), no. 34, 235265, Computational alge-
• William A. Stein Project Summary (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein Project Description (858) 220-6876 wstein@math.washington.edu http://modular.math.washington.edu
• William A. Stein Project Summary (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein Project Description (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein References Cited (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein Biographical Sketch (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein Project Description (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• William A. Stein References Cited (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• Mathematical Software and Me: A Very Personal Recollection
• William Stein Department of Mathematics
• SKETCH OF A PROGRAMME by Alexandre Grothendieck
• La Longue Marche `a travers la theorie de Galois, Part Ib, 26-37 26. Groupes de Teichmuller profinis
• arXiv:math.AG/0511279v110Nov2005 SEMINAIRE DE GEOMETRIE ALGEBRIQUE
• 39Matemtica Universitria Grothendieck no Brasil
• Quelques idees ma^itresses de l'oeuvre de A. Grothendieck
• Le journal de maths, Volume 1 (1994), No. 1 63 Une entrevue avec
• Science & Vie n 935, Aot 95 Grothendieck -1 / 4 Mais o est le gnie des maths ?
• The Rising Sea: Grothendieck on simplicity and generality I
• Theses directed by A. Grothendieck [1] Schemas en groupes reductifs; version of the thesis of M. Demazure, published in Bull.
• STRUCTURES ALGEBRIQUES. COHOMOLOGIE DES par M. Demazure.
• FIBRES TANGENTS ALG`EBRES DE LIE par M. Demazure
• EXPOSE VIA GENERALITES SUR LES GROUPES ALGEBRIQUES
• EXPOSE VIB GENERALITES SUR LES PRESCHEMAS EN GROUPES
• EXPOSE VIIA ETUDE INFINITESIMALE DES SCHEMAS EN
• CARACTERISATION ET CLASSIFICATION DES GROUPES DE TYPE MULTIPLICATIF
• CRIT`ERES DE REPRESENTABILITE. APPLICATIONS AUX SOUS-GROUPES DE TYPE MULTIPLICATIF DES
• COMPLEMENTS SUR LES SOUS-TORES D'UN PRESCHEMA EN GROUPES. APPLICATION AUX
• EXPOSE XXI DONNEES RADICIELLES
• EXPOSE XXIV AUTOMORPHISMES DES GROUPES REDUCTIFS
• (x-2)(x-3)(x-2+1) = (x-2)(x-3)(x-1) = (x2 -5x+6)(x-1) = (x3
• Explicit approaches to modular abelian varieties William Arthur Stein
• OXFORD UNIVERSITY PRESS LTD JOURNAL 00 (0000), 117 doi:10.1093/OUP Journal/XXX000
• ON THE TORSION POINTS OF ELLIPTIC CURVES & MODULAR ABELIAN VARIETIES
• Explicit approaches to modular abelian varieties William Arthur Stein
• CONSTRUCTING ELEMENTS IN SHAFAREVICH-TATE GROUPS OF MODULAR MOTIVES
• Arithmetic Duality Theorems Second Edition
• A Brief Introduction to Classical and Adelic
• William A. Stein Teaching Statement (617) 308-0144 was@math.harvard.edu http://modular.fas.harvard.edu
• ESQUISSE D'UN PROGRAMME par Alexandre Grothendieck
• EXPOSE XVII GROUPES ALGEBRIQUES UNIPOTENTS. EXTENSIONS
• On the Number of Prime Numbers less than a Given Quantity.
• Sage 2008: Sage on Microsoft Windows William Stein
• -adic Representations and the Cebotarev Density Jennifer Balakrishnan
• EXPOSE III EXTENSIONS INFINITESIMALES
• William A. Stein Biographical Sketch (858) 220-6876 wstein@math.washington.edu http://modular.math.washington.edu
• Results from MathSciNet: Mathematical Reviews on the Web c Copyright American Mathematical Society 2005
• William A. Stein Biographical Sketch (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• Designs, Codes and Cryptography, 19, 101128 (2000) c 2000 Kluwer Academic Publishers, Boston. Manufactured in The Netherlands.
• Charles F. Doran: Professional Preparation Harvard College Mathematics, A.B. 1992
• Dell PowerEdge R815 -Price $25,526.00
• EXPOSE VIIB ETUDE INFINITESIMALE DES SCHEMAS EN
• (former EGA IV: 20) Translation and Editing of his `prenotes'
• A SUMMARY OF THE CM THEORY OF ELLIPTIC CURVES 1. Introduction: a few modular forms
• AN EXPOSITION OF THE AGRAWAL-KAYAL-SAXENA PRIMALITY-PROVING THEOREM
• NOTES SUR L'HISTOIRE ET LA PHILOSOPHIE EMATIQUES IV
• 49. Homomorphismes de M0,3, les groupes M, A. Grothendieck
• William A. Stein Project Summary (858) 220-6876 wstein@math.washington.edu http://sage.math.washington.edu
• L'influence d'Alexandre GROTHENDIECK en K-thorie algbrique et en K-thorie topologique
• William A. Stein Project Summary (858) 220-6876 wstein@math.washington.edu http://modular.math.washington.edu
• BIOGRAPHICAL SKETCH Birne Binegar
• Visibility of Shafarevich-Tate Groups of Abelian Varieties
• A Database of Elliptic Curves---First Report William A. Stein 1 and Mark Watkins 2
• Homework 2, MAT256B II.8.4, III.6.8, III.7.1, III.7.3
• CONSTRUCTION DE PRESCHEMAS QUOTIENTS par P. Gabriel
• TOPOLOGIES ET FAISCEAUX par M. Demazure ()
• DCOUVRIR ET TRANSMETTRE : LA DIMENSION COLLECTIVE DES MATHMATIQUES DANS RCOLTES ET
• William A. Stein References Cited (858) 220-6876 wstein@math.washington.edu http://modular.math.washington.edu
• Math 583: Computing With Modular Forms (Spring 2006) MWF 2:30-3:20 in Smith 307
• APPEARED IN BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY
• There are genus one curves over Q of every odd index
• Possibilities for Shafarevich-Tate Groups of Modular Abelian Varieties
• MODULAR PARAMETRIZATIONS OF NEUMANNSETZER ELLIPTIC CURVES
• Galois Cohomology Galois Cohomology 1
• arXiv:math.AG/0206203v24Jan2004 SEMINAIRE DE GEOMETRIE ALGEBRIQUE
• ARTICLE IN PRESS YJNTH:4018 Please cite this article in press as: C. Pernet, W. Stein, Fast computation of Hermite normal forms of random integer
• Algebraic Geometry Homework William A. Stein
• EXPOSE XIII ELEMENTS REGULIERS DES GROUPES
• The Grothendieck-Serre Correspondence* Leila Schneps
• Component Groups of Quotients of J0(N) Copyright Springer-Verlag
• Construction of Cp and Extension of p-adic Valuations to C
• EXPOSE XXVI SOUS-GROUPES PARABOLIQUES DES GROUPES
• Sage: Creating a Viable Free Open Source Alternative to Magma, Maple, Mathematica,
• William A. Stein Project Summary (206) 419-0925 wstein@uw.edu http://wstein.org
• William A. Stein References Cited (206) 419-0925 wstein@uw.edu http://wstein.org
• William A. Stein Project Description (206) 419-0925 wstein@uw.edu http://wstein.org
• William A. Stein Biographical Sketch (206) 419-0925 wstein@uw.edu http://wstein.org
• Numerical Computation of Certain Chow-Heegner Points on Elliptic Curves
• William A. Stein Data Management Plan (206) 419-0925 wstein@uw.edu http://wstein.org
• Heegner Points and the Arithmetic of Elliptic Curves Over Ring Class Extensions
• NON-COMMUTATIVE IWASAWA THEORY FOR MODULAR FORMS J. COATES, T. DOKCHITSER, Z. LIANG, W. STEIN, R. SUJATHA
• A DATABASE OF ELLIPTIC CURVES OVER Q( JONATHAN BOBER, ALYSON DEINES, ARIAH KLAGES-MUNDT, BENJAMIN