<--- Back to Details
First PageDocument Content
Number theorists / Fellows of the Royal Society / Conjectures / Automorphic forms / Henryk Iwaniec / Ostrowski Prize / Artin L-function / Modularity theorem / Peter Sarnak / Mathematics / Abstract algebra / Number theory
Date: 2002-07-02 11:38:35
Number theorists
Fellows of the Royal Society
Conjectures
Automorphic forms
Henryk Iwaniec
Ostrowski Prize
Artin L-function
Modularity theorem
Peter Sarnak
Mathematics
Abstract algebra
Number theory

Add to Reading List

Source URL: www.ams.org

Download Document from Source Website

File Size: 61,31 KB

Share Document on Facebook

Similar Documents

Analytic number theory / Modular forms / Algebraic curves / Abelian varieties / Conjectures / Elliptic curve / Modularity theorem / Modular elliptic curve / Arithmetic of abelian varieties / Abstract algebra / Mathematics / Mathematical analysis

Review of Elliptic curves, by Anthony W. Knapp This book is about elliptic curves and modular functions, two topics that are intimately related in both accidental and essential ways. As emphasized by Andr´e Weil in his

DocID: 196TG - View Document

Elliptic curves / Algebraic curves / Analytic number theory / Abelian varieties / Modular forms / Heegner point / Birch and Swinnerton-Dyer conjecture / Modular elliptic curve / Modularity theorem / Abstract algebra / Algebraic geometry / Mathematics

Elliptic curves, L-functions, and CM-points Shou-Wu Zhang Department of Mathematics Columbia University New York, NY[removed]July 11, 2002

DocID: RPOy - View Document

Analytic number theory / Modular forms / Elliptic curve / Group theory / Cusp form / Modularity theorem / Heegner point / Abstract algebra / Mathematics / Algebraic geometry

Computing modular forms1 over imaginary quadratic fields John Cremona University of Warwick, UK Bristol, 21 August 2008

DocID: RqOj - View Document

Galois theory / Field theory / Group theory / Analytic number theory / Galois module / Algebraic number field / Elliptic curve / Cyclotomic character / Splitting of prime ideals in Galois extensions / Abstract algebra / Algebra / Algebraic number theory

APPENDIX: POTENTIAL MODULARITY OF ELLIPTIC CURVES OVER TOTALLY REAL FIELDS JEAN-PIERRE WINTENBERGER The following theorem is well known to experts. Theorem 0.1. Let E an elliptic curve over a totally real number field F

DocID: bSMt - View Document

Heegner point / Elliptic curve / Mordell–Weil theorem / Néron–Tate height / Complex multiplication / Modularity theorem / Modular form / Algebraic number field / Ideal class group / Abstract algebra / Mathematics / Algebraic number theory

Proceedings of the International Congress of Mathematicians August 16-24, 1983, Warszawa

DocID: 4vdL - View Document