E-Book, Englisch, 442 Seiten
Mollin Algebraic Number Theory, Second Edition
2. Auflage 2011
ISBN: 978-1-4398-4599-8
Verlag: Taylor & Francis
Format: PDF
Kopierschutz: Adobe DRM (»Systemvoraussetzungen)
E-Book, Englisch, 442 Seiten
Reihe: Discrete Mathematics and Its Applications
ISBN: 978-1-4398-4599-8
Verlag: Taylor & Francis
Format: PDF
Kopierschutz: Adobe DRM (»Systemvoraussetzungen)
Bringing the material up to date to reflect modern applications, Algebraic Number Theory, Second Edition has been completely rewritten and reorganized to incorporate a new style, methodology, and presentation. This edition focuses on integral domains, ideals, and unique factorization in the first chapter; field extensions in the second chapter; and class groups in the third chapter. Applications are now collected in chapter four and at the end of chapter five, where primality testing is highlighted as an application of the Kronecker–Weber theorem. In chapter five, the sections on ideal decomposition in number fields have been more evenly distributed. The final chapter continues to cover reciprocity laws.
New to the Second Edition
- Reorganization of all chapters
- More complete and involved treatment of Galois theory
- A study of binary quadratic forms and a comparison of the ideal and form class groups
- More comprehensive section on Pollard’s cubic factoring algorithm
- More detailed explanations of proofs, with less reliance on exercises, to provide a sound understanding of challenging material
The book includes mini-biographies of notable mathematicians, convenient cross-referencing, a comprehensive index, and numerous exercises. The appendices present an overview of all the concepts used in the main text, an overview of sequences and series, the Greek alphabet with English transliteration, and a table of Latin phrases and their English equivalents.
Suitable for a one-semester course, this accessible, self-contained text offers broad, in-depth coverage of numerous applications. Readers are lead at a measured pace through the topics to enable a clear understanding of the pinnacles of algebraic number theory.
Zielgruppe
Senior undergraduate and beginning graduate students and professionals in mathematics, cryptography, computer science, engineering, and information technology.
Autoren/Hrsg.
Weitere Infos & Material
Integral Domains, Ideals, and Unique Factorization
Integral Domains
Factorization Domains
Ideals
Noetherian and Principal Ideal Domains
Dedekind Domains
Algebraic Numbers and Number Fields
Quadratic Fields
Field Extensions
Automorphisms, Fixed Points, and Galois Groups
Norms and Traces
Integral Bases and Discriminants
Norms of Ideals
Class Groups
Binary Quadratic Forms
Forms and Ideals
Geometry of Numbers and the Ideal Class Group
Units in Number Rings
Dirichlet’s Unit Theorem
Applications: Equations and Sieves
Prime Power Representation
Bachet’s Equation
The Fermat Equation
Factoring
The Number Field Sieve
Ideal Decomposition in Number Fields
Inertia, Ramification, and Splitting of Prime Ideals
The Different and Discriminant
Ramification
Galois Theory and Decomposition
Kummer Extensions and Class-Field Theory
The Kronecker–Weber Theorem
An Application—Primality Testing
Reciprocity Laws
Cubic Reciprocity
The Biquadratic Reciprocity Law
The Stickelberger Relation
The Eisenstein Reciprocity Law
Appendix A: Abstract Algebra
Appendix B: Sequences and Series
Appendix C: The Greek Alphabet
Appendix D: Latin Phrases
Bibliography
Solutions to Odd-Numbered Exercises
Index
