Class Field Theory

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Class field theory, the study of abelian extensions of algebraic number fields, is one of the largest branches of algebraic number theory. It brings together the quadratic and higher reciprocity laws of Gauss, Legendre, and others, and vastly generalizes them. Some of its consequences (e.g., the Chebotarev density theorem) apply even to nonabelian extensions.

This book is an accessible introduction to class field theory. It takes a traditional approach in that it presents the global material first, using some of the original techniques of proof, but in a fashion that is cleaner and more streamlined than most other books on this topic.

It could be used for a graduate course on algebraic number theory, as well as for students who are interested in self-study. The book has been class-tested, and the author has included exercises throughout the text.

Professor Nancy Childress is a member of the Mathematics Faculty at Arizona State University.

Author(s): Nancy Childress (auth.)
Series: Universitext
Edition: 1
Publisher: Springer-Verlag New York
Year: 2009

Language: English
Pages: 226
City: New York, NY
Tags: Field Theory and Polynomials; Number Theory

Front Matter....Pages 1-8
A Brief Review....Pages 1-15
Dirichlet’s Theorem on Primes in Arithmetic Progressions....Pages 1-28
Ray Class Groups....Pages 1-17
The Idèlic Theory....Pages 1-41
Artin Reciprocity....Pages 1-29
The Existence Theorem, Consequences and Applications....Pages 1-45
Local Class Field Theory....Pages 1-38
Back Matter....Pages 1-8