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A first course in modular forms:

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Bibliographische Detailangaben
Beteiligte Personen:	Diamond, Fred 1964- (VerfasserIn), Shurman, Jerry Michael 1959- (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	New York Springer 2010
Ausgabe:	[Nachdr.]
Schriftenreihe:	Graduate texts in mathematics 228
Schlagwörter:	Algebraische Geometrie Zahlentheorie Modulform Lehrbuch
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020724317&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	XV, 436 S. graph. Darst.
ISBN:	9781441920058

Internformat

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Datensatz im Suchindex

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adam_text	Contents Preface ........................................................ vii 1 Modular Forms, Elliptic Curves, and Modular Curves ..... 1 L. 1 First definitions and examples ............................. 1 1.2 Congruence subgroups ................................... 11 1.3 Complex tori ........................................... 24 1.4 Complex tori as elliptic curves ............................ 31 1.5 Modular curves and moduli spaces ......................... 37 2 Modular Curves as Riemann Surfaces ..................... 45 2.1 Topology ............................................... 45 2.2 Charts ................................................. 48 2.3 Elliptic points ........................................... 52 2.4 Cusps .................................................. 57 2.5 Modular curves and Modularity ........................... 63 3 Dimension Formulas ....................................... 65 3.1 The genus .............................................. 65 3.2 Automorphic forms ...................................... 71 3.3 Meromorphic differentials ................................. 77 3.4 Divisors and the Riemann-Roch Theorem .................. 83 3.-5 Dimension formulas for even к ............................ 85 3.Ö Dimension formulas for odd A ............................. 89 3.7 More on elliptic points ................................... 92 3.5 More on cusps .......................................... 98 3.9 More dimension formulas .................................106 4 Eisenstein Series ...........................................109 4.1 Eisenstein series for SL2(Z) ...............................109 4.2 Eisenstein series for Г(Х) when k> ¿ ...................... Ul 4.3 Dirichlet characters. Gauss sums, and eigenspaces ...........116 xiv Contents 4.4 Gamma, zeta, and L-functions ............................120 4.5 Eisenstein series for the eigenspaces when к > 3.............126 4.6 Eisenstein series of weight 2...............................130 4.7 Bernoulli numbers and the Hurwitz zeta function ............133 4.8 Eisenstein series of weight 1...............................138 4.9 The Fourier transform and the Mellin transform .............143 4.10 Nonholomorphic Eisenstein series ..........................147 4.11 Modular forms via theta functions .........................155 5 Hecke Operators ...........................................163 5.1 The double coset operator ................................163 5.2 The (d) and Tp operators .................................168 5.3 The (n) and Tn operators ................................178 5.4 The Petersson inner product ..............................181 5.5 Adjoints of the Hecke Operators ...........................183 5.6 Oldforms and Newforms ..................................187 5.7 The Main Lemma .......................................189 5.8 Eigenforms .............................................195 5.9 The connection with L-functions ..........................200 5.10 Functional equations .....................................204 5.11 Eisenstein series again ...................................205 6 Jacobians and Abelian Varieties ...........................211 6.1 Integration, homology, the Jacobian, and Modularity .........212 6.2 Maps between Jacobians .................................217 6.3 Modular Jacobians and Hecke operators ....................226 6.4 Algebraic numbers and algebraic integers ...................230 6.5 Algebraic eigenvalues ....................................233 6.6 Eigenforms, Abelian varieties, and Modularity ..............240 7 Modular Curves as Algebraic Curves ......................249 7.1 Elliptic curves as algebraic curves .........................250 7.2 Algebraic curves and their function fields ...................257 7.3 Divisors on curves .......................................268 7.4 The Weil pairing algebraically .............................275 7.5 Function fields over С ....................................279 7.6 Function fields over Q ....................................287 7.7 Modular curves as algebraic curves and Modularity ..........290 7.8 Isogenies algebraically ....................................295 7.9 Hecke operators algebraically .............................300 8 The Eichler-Shimura Relation and L-functions ............309 8.1 Elliptic curves in arbitrary characteristic ...................310 8.2 Algebraic curves in arbitrary characteristic .................317 8.3 Elliptic curves over Q and their reductions .................322 Contents xv 8.4 Elliptic curves over Q and their reductions .................329 8.5 Reduction of algebraic curves and maps ....................336 8.6 Modular curves in characteristic p: Igusa s Theorem .........347 8.7 The Eichler-Shimura Relation ............................349 8.8 Fourier coefficients, L-functions, and Modularity .............356 9 Galois Representations ....................................365 9.1 Galois number fields .....................................366 9.2 The ¿-adic integers and the ¿-adic numbers .................372 9.3 Galois representations ....................................376 9.4 Galois representations and elliptic curves ...................382 9.5 Galois representations and modular forms ..................386 9.6 Galois representations and Modularity .....................391 Hints and Answers to the Exercises ............................401 List of Symbols ................................................421 Index ..........................................................427 References .....................................................433
any_adam_object	1
author	Diamond, Fred 1964- Shurman, Jerry Michael 1959-
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discipline	Mathematik
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isbn	9781441920058
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physical	XV, 436 S. graph. Darst.
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publisher	Springer
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series	Graduate texts in mathematics
series2	Graduate texts in mathematics
spellingShingle	Diamond, Fred 1964- Shurman, Jerry Michael 1959- A first course in modular forms Graduate texts in mathematics Algebraische Geometrie (DE-588)4001161-6 gnd Zahlentheorie (DE-588)4067277-3 gnd Modulform (DE-588)4128299-1 gnd
subject_GND	(DE-588)4001161-6 (DE-588)4067277-3 (DE-588)4128299-1 (DE-588)4123623-3
title	A first course in modular forms
title_auth	A first course in modular forms
title_exact_search	A first course in modular forms
title_full	A first course in modular forms Fred Diamond ; Jerry Shurman
title_fullStr	A first course in modular forms Fred Diamond ; Jerry Shurman
title_full_unstemmed	A first course in modular forms Fred Diamond ; Jerry Shurman
title_short	A first course in modular forms
title_sort	a first course in modular forms
topic	Algebraische Geometrie (DE-588)4001161-6 gnd Zahlentheorie (DE-588)4067277-3 gnd Modulform (DE-588)4128299-1 gnd
topic_facet	Algebraische Geometrie Zahlentheorie Modulform Lehrbuch
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=020724317&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV000000067
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