![新华正版 数论 第1卷 Henri Cohen[著] 9787519255299 世界图书出版公司](https://www0.kfzimg.com/sw/kfz-cos/kfzimg/edfaafda/4d41f6ffc5acdd86_b.jpg)
新华正版 数论 第1卷 Henri Cohen[著] 9787519255299 世界图书出版公司
新华书店直发 全新正版 急速发货 开票联系客服
¥ 148 8.3折 ¥ 179 全新
仅1件
北京西城
认证卖家担保交易快速发货售后保障
作者Henri Cohen[著]
出版社世界图书出版公司
ISBN9787519255299
出版时间2018-10
装帧平装
开本其他
定价179元
货号9466915
上书时间2024-08-18
- 在售商品 暂无
- 平均发货时间 16小时
- 好评率 暂无
- 最新上架
商品详情
- 品相描述:全新
- 商品描述
-
目录
Volume I
Preface
1. Introduction to Diophantine Equations
1.1 Introduction
1.1.1 Examples of Diophantine Problems
1.1.2 Local Methods
1.1.3 Dimensions
1.2 Exercises for Chapter 1
Part I. Tools
2. Abelian Groups, Lattices, and Finite Fields
2.1 Finitely Generated Abelian Groups
2.1.1 Basic Results
2.1.2 Description of Subgroups
2.1.3 Characters of Finite Abelian Groups
2.1.4 The Groups (Z/mZ)*
2.1.5 Dirichlet Characters
2.1.6 Gauss Sums
2.2 The Quadratic Reciprocity Law
2.2.1 The Basic Quadratic Reciprocity Law
2.2.2 Consequences of the Basic Quadratic Reciprocity Law
2.2.3 Gausss Lemma and Quadratic Reciprocity
2.2.4 Real Primitive Characters
2.2.5 The Sign of the Quadratic Gauss Sum
2.3 Lattices and the Geometry of Numbers
2.3.1 Definitions
2.3.2 Hermites Inequality
2.3.3 LLL-Reduced Bases
2.3.4 The LLL Algorithms
2.3.5 Approximation of Linear Forms
2.3.6 Minkowskis Convex Body Theorem
2.4 Basic Properties of Finite Fields
2.4.1 General Properties of Finite Fields
2.4.2 Galois Theory of Finite Fields
2.4.3 Polynomials over Finite Fields
2.5 Bounds for the Number of Solutions in Finite Fields
2.5.1 The Chevalley-Warning Theorem
2.5.2 Gauss Sums for Finite Fields
2.5.3 Jacobi Sums for Finite Fields
2.5.4 The Jacobi Sums J(x1,x2)
2.5.5 The Number of Solutions of Diagonal Equations
2.5.6 The Well Bounds
2.5.7 The Weil Conjectures (Delignes Theorem)
2.6 Exercises for Chapter 2
3. Basic Algebraic Number Theory
3.1 Field-Theoretic Algebraic Number Theory
3.1.1 Galois Theory
3.1.2 Number Fields
3.1.3 Examples
3.1.4 Characteristic Polynomial, Norm, Trace
3.1.5 Noethers Lemma
3.1.6 The Basic Theorem of Kummer Theory
3.1.7 Examples of the Use of Kummer Theory
3.1.8 Artin-Schreier Theory
3.2 The Normal Basis Theorem
3.2.1 Linear Independence and Hilberts Theorem 90
3.2.2 The Normal Basis Theorem in the Cyclic Case
3.2.3 Additive Polynomials
3.2.4 Algebraic Independence of Homomorphisms
3.2.5 The Normal Basis Theorem
3.3 Ring-Theoretic Algebraic Number Theory
3.3.1 Gausss Lemma on Polynomials
3.3.2 Algebraic Integers
3.3.3 Ring of Integers and Discriminant
3.3.4 Ideals and Units
3.3.5 Decomposition of Primes and Ramification
3.3.6 Galois Properties of Prime Decomposition
3.4 Quadratic Fields
3.4.1 Field-Theoretic and Basic Ring-Theoretic Properties
3.4.2 Results and Conjectures on Class and Unit Groups
3.5 Cyclotomic Fields
3.5.1 Cyclotomic Polynomials
3.5.2 Field-Theoretic Properties of Q(Sn)
3.5.3 Ring-Theoretic Properties
3.5.4 The Totally Real Subfield of Q(Spk )
……
4. p-adic Fields
5. Quadratic Forms and Local-Global Principles
Part II. Diophantine Equations
6. Some Diophantine Equations
7. Elliptic Curves
8. Diophantine Aspects of Elliptic Curves
Bibliography
Index of Notation
Index of Names
General Index
精彩内容
《数论》分为2卷,是Springer“数学研究生教材”丛书之239和240卷,是一套面向研究生的数论教程,主旨是全面介绍丢番图方程的解,包括多项式方程、有理数和代数数论等,其中特别强调了算术代数几何的现代理论。全书各章共有530例习题,部分习题有提示。
![新华正版 数论 第1卷 Henri Cohen[著] 9787519255299 世界图书出版公司](/dist/img/error.jpg)
— 没有更多了 —
以下为对购买帮助不大的评价