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Softcover ISBN:  9780821841723 
Product Code:  HMATH/30 
List Price:  $125.00 
MAA Member Price:  $112.50 
AMS Member Price:  $100.00 
eBook ISBN:  9781470438975 
Product Code:  HMATH/30.E 
List Price:  $89.00 
MAA Member Price:  $80.10 
AMS Member Price:  $71.20 
Softcover ISBN:  9780821841723 
eBook ISBN:  9781470438975 
Product Code:  HMATH/30.B 
List Price:  $214.00 $169.50 
MAA Member Price:  $192.60 $152.55 
AMS Member Price:  $171.20 $135.60 

Book DetailsHistory of MathematicsHistory of Mathematics Source SeriesVolume: 30; 2006; 346 ppMSC: Primary 01; 11
Emil Artin was one of the great mathematicians of the twentieth century. He had the rare distinction of having solved two of the famous problems posed by David Hilbert in 1900. He showed that every positive definite rational function of several variables was a sum of squares. He also discovered and proved the Artin reciprocity law, the culmination of over a century and a half of progress in algebraic number theory.
Artin had a great influence on the development of mathematics in his time, both by means of his many contributions to research and by the high level and excellence of his teaching and expository writing. In this volume we gather together in one place a selection of his writings wherein the reader can learn some beautiful mathematics as seen through the eyes of a true master.
The volume's Introduction provides a short biographical sketch of Emil Artin, followed by an introduction to the books and papers included in the volume. The reader will first find three of Artin's short books, titled The Gamma Function, Galois Theory, and Theory of Algebraic Numbers, respectively. These are followed by papers on algebra, algebraic number theory, real fields, braid groups, and complex and functional analysis. The three papers on real fields have been translated into English for the first time.
The flavor of these works is best captured by the following quote of Richard Brauer. “There are a number of books and sets of lecture notes by Emil Artin. Each of them presents a novel approach. There are always new ideas and new results. It was a compulsion for him to present each argument in its purest form, to replace computation by conceptual arguments, to strip the theory of unnecessary ballast. What was the decisive point for him was to show the beauty of the subject to the reader.”
This volume is one of an informal sequence of works within the History of Mathematics series. Volumes in this subset, “Sources”, are classical mathematical works that served as cornerstones for modern mathematical thought.
ReadershipAdvanced undergraduates, graduate students, and research mathematicians interested in number theory and related topics, and in their history.

Table of Contents

Chapters

Introduction

Books by Emil Artin

The Gamma Function

Galois Theory

Theory of Algebraic Numbers

Papers by Emil Artin

Axiomatic characterization of fields by the product formula for valuations

A note on axiomatic characterization of fields

A characterization of the field of real algebraic numbers

The algebraic construction of real fields

A characterization of real closed fields

The theory of braids

Theory of braids

On the theory of complex functions

A proof of the KreinMilman theorem

The influence of J. H. M. Wedderburn on the development of modern algebra


Additional Material

Reviews

The editor's excellent introduction to the present selection from Emil Artin's works provides both a biographical sketch of this great mathematician and an explanation of the books and papers included in the volume. All together, the entire collection reflects Emil Artin's mathematical thinking in very instructive a manner.
Werner Kleinert for Zentralblatt MATH


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Emil Artin was one of the great mathematicians of the twentieth century. He had the rare distinction of having solved two of the famous problems posed by David Hilbert in 1900. He showed that every positive definite rational function of several variables was a sum of squares. He also discovered and proved the Artin reciprocity law, the culmination of over a century and a half of progress in algebraic number theory.
Artin had a great influence on the development of mathematics in his time, both by means of his many contributions to research and by the high level and excellence of his teaching and expository writing. In this volume we gather together in one place a selection of his writings wherein the reader can learn some beautiful mathematics as seen through the eyes of a true master.
The volume's Introduction provides a short biographical sketch of Emil Artin, followed by an introduction to the books and papers included in the volume. The reader will first find three of Artin's short books, titled The Gamma Function, Galois Theory, and Theory of Algebraic Numbers, respectively. These are followed by papers on algebra, algebraic number theory, real fields, braid groups, and complex and functional analysis. The three papers on real fields have been translated into English for the first time.
The flavor of these works is best captured by the following quote of Richard Brauer. “There are a number of books and sets of lecture notes by Emil Artin. Each of them presents a novel approach. There are always new ideas and new results. It was a compulsion for him to present each argument in its purest form, to replace computation by conceptual arguments, to strip the theory of unnecessary ballast. What was the decisive point for him was to show the beauty of the subject to the reader.”
This volume is one of an informal sequence of works within the History of Mathematics series. Volumes in this subset, “Sources”, are classical mathematical works that served as cornerstones for modern mathematical thought.
Advanced undergraduates, graduate students, and research mathematicians interested in number theory and related topics, and in their history.

Chapters

Introduction

Books by Emil Artin

The Gamma Function

Galois Theory

Theory of Algebraic Numbers

Papers by Emil Artin

Axiomatic characterization of fields by the product formula for valuations

A note on axiomatic characterization of fields

A characterization of the field of real algebraic numbers

The algebraic construction of real fields

A characterization of real closed fields

The theory of braids

Theory of braids

On the theory of complex functions

A proof of the KreinMilman theorem

The influence of J. H. M. Wedderburn on the development of modern algebra

The editor's excellent introduction to the present selection from Emil Artin's works provides both a biographical sketch of this great mathematician and an explanation of the books and papers included in the volume. All together, the entire collection reflects Emil Artin's mathematical thinking in very instructive a manner.
Werner Kleinert for Zentralblatt MATH