Geometric modular forms and elliptic curves pdf

[ibnexfcParticipant]

.
.

Geometric modular forms and elliptic curves pdf >> DOWNLOAD

Geometric modular forms and elliptic curves pdf >> READ ONLINE

.
.
.
.
.
.
.
.
.
.

An algebro-geometric tool box elliptic curves geometric modular forms Jacobians and Galois representations modularity problems. @inproceedings{Hida2001GeometricMF, title={Geometric modular forms and elliptic curves}, author={H. Hida}, year={2001} }.
H. Hida, Geometric Modular Forms and Elliptic Curves, World Scientific Publishing Co., Singapore, 2000, A list of misprints (as of September 16, 2011) H. Hida, Hilbert Modular Forms and Iwasawa Theory, Oxford Mathematical Monographs, Oxford University Press, 2006 [ Oxford web site on this
The PDF-version contains the table of contents as bookmarks, which allows easy navigation in the Here, combining Mazur’s techniques with a geometric rela- tion between classical modular curves and Shimura curves (Theorem 4.1) Corollary 1. 2. Assume that all elliptic curves over Q are modular.
8 Modular Curves as Moduli Varieties. 9 Modular Forms, Dirichlet Series, and Functional Equations. 10 Correspondences on Curves; the Theorem From this, one sees that arithmetic facts about elliptic curves correspond to arithmetic facts about special values of modular functions and modular forms.
Elliptic Curves, Modular Forms, Curves, algebraic, Forms (mathematics). Edit. Geometric modular forms and elliptic curves.
Modular forms and elliptic curves are rmly rooted in the fertil grounds of number theory. As a proof of the mentioned fact and as an introduction to the Roughly speaking this means that every elliptic curve over Q appears in the Jacobian of of a modular curve of level N . Another formulation of
Singapore: World Scientific, 2012. – 468p. This book provides a comprehensive account of the theory of moduli spaces of elliptic curves (over integer rings) and its application to modular forms. The construction of Galois representations
HARUZO HIDA (EN). This book provides a comprehensive account of the theory of moduli spaces of elliptic curves (over integer rings) and its application to modular forms. The construction of Galois representations, which play a fundamental role in Wiles’ proof of the Shimura-Taniyama conjecture
background:#ccc;text-align Password: Filename: Geometric_Modular_Forms_and_Elliptic_Curves.pdf. Size: 36.9 MB (38647397 bytes) Report abuse. This book provides a comprehensive account of the theory of moduli spaces of elliptic curves (over integer rings) and its application to modular forms. The construction of Galois representations, which play a fundamental role in Wiles’ proof of the Shimura-Taniyama conjecture, is given.
Modular forms and Galois representations. Ana Caraiani Problem sets for Arizona Winter School, March 2013. 1 Modular curves as moduli of elliptic Prove that it is a modular form of weight p 1 and level 1 using Version 1 of the denition in [C]. Exercise 1.4. An orbifold is a Hausdor space X which
Forms category Science Math Number Theory Elliptic Curves and Modular Forms. Graphing the weight 2 modular form attached to x0(11) – William Stein – williamstein.
Forms category Science Math Number Theory Elliptic Curves and Modular Forms. Graphing the weight 2 modular form attached to x0(11) – William Stein – williamstein.
Lattices and elliptic curves g la Weierstrass ; the Tate curve Modular forms and De Rham cohomology The Gauss-Manin connection, and the function P: computations The Gauss-Manin connection and Serre’s 8 operator Numerical Formulae.

[Author]

Posts