Ebook: Quadratic number theory: an invitation to algebraic methods in the higher arithmetic
Author: Lehman James Larry
- Tags: Algebraic fields, Algebraic number theory, Corps algébriques, Corps quadratiques, Number theory, Quadratic fields, Théorie algébrique des nombres, Théorie des nombres, Livres numériques
- Series: Dolciani mathematical expositions volume 52
- Year: 2019
- Publisher: Mathematical Association of America Press
- City: Providence, Rhode Island
- Language: English
- pdf
Cover; Title page; Copyright; Contents; Preface; Acknowledgments; Introduction: A Brief Review of Elementary Number Theory; 0.1. Linear Equations and Congruences; 0.2. Quadratic Congruences Modulo Primes; 0.3. Quadratic Congruences Modulo Composite Integers; Part One: Quadratic Domains and Ideals; Chapter 1. Gaussian Integers and Sums of Two Squares; 1.1. Sums of Two Squares; 1.2. Gaussian Integers; 1.3. Ideal Form for Gaussian Integers; 1.4. Factorization and Multiplication with Ideal Forms; 1.5. Reduction of Ideal Forms for Gaussian Integers; 1.6. Sums of Two Squares Revisited;"Quadratic Number Theory is an introduction to algebraic number theory for readers with a moderate knowledge of elementary number theory and some familiarity with the terminology of abstract algebra. By restricting attention to questions about squares the author achieves the dual goals of making the presentation accessible to undergraduates and reflecting the historical roots of the subject. The representation of integers by quadratic forms is emphasized throughout the text. Lehman introduces an innovative notation for ideals of a quadratic domain that greatly facilitates computation and he uses this to particular effect. The text has an unusual focus on actual computation. This focus, and this notation, serve the author's historical purpose as well; ideals can be seen as number-like objects, as Kummer and Dedekind conceived of them. The notation can be adapted to quadratic forms and provides insight into the connection between quadratic forms and ideals. The computation of class groups and continued fraction representations are featured-the author's notation makes these computations particularly illuminating. Quadratic Number Theory, with its exceptionally clear prose, hundreds of exercises, and historical motivation, would make an excellent textbook for a second undergraduate course in number theory. The clarity of the exposition would also make it a terrific choice for independent reading. It will be exceptionally useful as a fruitful launching pad for undergraduate research projects in algebraic number theory."--Site web de l'éditeur.
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