Algebraic Number Theory, Volume 62Springer Science & Business Media, 12 set 1997 - 269 pagine From the reviews of the first printing, published as Volume 62 of the Encyclopaedia of Mathematical Sciences: "... The author succeeded in an excellent way to describe the various points of view under which Class Field Theory can be seen. ... In any case the author succeeded to write a very readable book on these difficult themes." Monatshefte fuer Mathematik, 1994 "... Koch's book is written mostly for non-specialists. It is an up-to-date account of the subject dealing with mostly general questions. Special results appear only as illustrating examples for the general features of the theory. It is supposed that the reader has good general background in the fields of modern (abstract) algebra and elementary number theory. We recommend this volume mainly to graduate studens and research mathematicians." Acta Scientiarum Mathematicarum, 1993 |
Dall'interno del libro
Risultati 1-5 di 94
Pagina 1
H. Koch, Helmut Koch A.N. Parshin, I.R. Shafarevich. Algebraic Number Fields H. Koch Contents 1.1 . 1.2 . Preface Chapter 1. Basic Number Theory § 1. Orders in Algebraic Number Fields Modules and Orders Module Classes 7 8 9 10 12 1.3 ...
H. Koch, Helmut Koch A.N. Parshin, I.R. Shafarevich. Algebraic Number Fields H. Koch Contents 1.1 . 1.2 . Preface Chapter 1. Basic Number Theory § 1. Orders in Algebraic Number Fields Modules and Orders Module Classes 7 8 9 10 12 1.3 ...
Pagina 3
... Field 2.5 . Algebraic Theory of Complex Multiplication 2.6 . Generalization §3 . Cohomology of Groups 3.1 . Definition of Cohomology Groups 3.2 . Functoriality and the Long Exact Sequence 3.3 . Dimension Shifting 109 111 .. 112 112 112 ...
... Field 2.5 . Algebraic Theory of Complex Multiplication 2.6 . Generalization §3 . Cohomology of Groups 3.1 . Definition of Cohomology Groups 3.2 . Functoriality and the Long Exact Sequence 3.3 . Dimension Shifting 109 111 .. 112 112 112 ...
Pagina 4
... Fields 2.1 . Examples of Galois Cohomology of Arbitrary Fields 2.2 . The Algebraic Closure of a Local Field 168 168 169 2.3 . The Maximal p - Extension of a Local Field 171 2.4 . The Galois Group of a Local Field 173 2.5 . The Maximal ...
... Fields 2.1 . Examples of Galois Cohomology of Arbitrary Fields 2.2 . The Algebraic Closure of a Local Field 168 168 169 2.3 . The Maximal p - Extension of a Local Field 171 2.4 . The Galois Group of a Local Field 173 2.5 . The Maximal ...
Pagina 5
... Field ... 194 §2 . The Arithmetical Class Number Formula 195 2.1 . The Arithmetical Class Number Formula for Complex Abelian Fields 195 ... Quadratic Fields Fields 2.6 . Application to Fermat's Last Theorem III 3.1 . Class Field Theory ...
... Field ... 194 §2 . The Arithmetical Class Number Formula 195 2.1 . The Arithmetical Class Number Formula for Complex Abelian Fields 195 ... Quadratic Fields Fields 2.6 . Application to Fermat's Last Theorem III 3.1 . Class Field Theory ...
Pagina 7
... algebraic number theory such as class field theory have their analogies for other types of fields like functions fields of one variable over finite fields . More general class field theory is part of a theory of fields of finite ...
... algebraic number theory such as class field theory have their analogies for other types of fields like functions fields of one variable over finite fields . More general class field theory is part of a theory of fields of finite ...
Sommario
Basic Number Theory | 8 |
1 Orders in Algebraic Number Fields | 9 |
2 Rings with Divisor Theory | 22 |
3 Dedekind Rings | 27 |
4 Valuations | 45 |
5 Harmonic Analysis on Local and Global Fields | 63 |
6 Hecke LSeries and the Distribution of Prime Ideals | 70 |
Class Field Theory | 90 |
3 Extensions with Given Galois Groups | 182 |
Abelian Fields | 192 |
1 The Integers of an Abelian Field | 193 |
2 The Arithmetical Class Number Formula | 195 |
3 Iwasawas Theory of ΓExtensions | 206 |
4 padic LFunctions | 211 |
Artin LFunctions and Galois Module Structure | 219 |
1 Artin LFunctions | 222 |
1 The Main Theorems of Class Field Theory | 92 |
2 Complex Multiplication | 107 |
3 Cohomology of Groups | 112 |
4 Proof of the Main Theorems of Class Field Theory | 121 |
5 Simple Algebras | 131 |
6 Explicit Reciprocity Laws and Symbols | 137 |
7 Further Results of Class Field Theory | 145 |
Galois Groups | 150 |
1 Cohomology of Profinite Groups | 151 |
2 Galois Cohomology of Local and Global Fields | 168 |
2 Galois Module Structure and Artin Root Numbers | 234 |
Fields Domains and Complexes | 237 |
Quadratic Residues | 240 |
Locally Compact Groups | 241 |
Bernoulli Numbers | 243 |
Tables | 245 |
251 | |
263 | |
266 | |
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Parole e frasi comuni
a₁ abelian extension abelian field abelian group algebraic number field arbitrary Artin Artin L-Functions automorphism called Chap class field theory closed subgroup cohomology complex conductor conjecture corresponding cyclic Dedekind ring defined denotes Dirichlet discriminant divisor theory exact sequence Example extension L/K extension of Q finite extension finite group finite normal extension following theorem G-module G₁ Galois group global fields group G H¹(G H²(G Hecke character Hence Hilbert homomorphism ideal class group idele imaginary-quadratic implies induces infinite places integers irreducible isomorphism L-functions Lemma Let G Let L/K Main reference maximal module morphism natural number norm symbol normal extension normal subgroup number theory polynomial prime divisors prime ideal prime number pro-p-group profinite group Proposition quadratic r₂ ramified reciprocity law representation resp roots of unity Shafarevich simple algebra ẞe subgroup of G T-extension trivial U₁ unramified V₁ valuation Z/pZ