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Kummer's work on cyclotomic fields paved the way for the development of algebraic number theory in general by Dedekind, Weber, Hensel, Hilbert, Takagi, Artin and others. However, the success of this general theory has tended to obscure special facts proved by Kummer about cyclotomic fields which lie deeper than the general theory. For a long period in the 20th century this aspect of Kummer's work seems to have been largely forgotten, except for a few papers, among which are those by Pollaczek [Po], Artin-Hasse [A-H] and Vandiver [Va]. In the mid 1950's, the theory of cyclotomic fields was taken up again by Iwasawa and Leopoldt. Iwasawa viewed cyclotomic fields as being analogues for number fields of the constant field extensions of algebraic geometry, and wrote a great sequence of papers investigating towers of cyclotomic fields, and more generally, Galois extensions of number fields whose Galois group is isomorphic to the additive group of p-adic integers. Leopoldt concentrated on a fixed cyclotomic field, and established various p-adic analogues of the classical complex analytic class number formulas. In particular, this led him to introduce, with Kubota, p-adic analogues of the complex L-functions attached to cyclotomic extensions of the rationals. Finally, in the late 1960's, Iwasawa [Iw 11] made the fundamental discovery that there was a close connection between his work on towers of cyclotomic fields and these p-adic L-functions of Leopoldt - Kubota.




This book is a combined edition of the books previously published as Cyclotomic Fields, Vol. I and II. It continues to provide a basic introduction to the theory of these number fields, which are of great interest in classical number theory, as well as in other areas, such as K-theory. Cyclotomic Fields begins with basic material on character sums, and proceeds to treat class number formulas, p-adic L-functions, Iwasawa theory, Lubin-Tate theory, and explicit reciprocity laws, and the Ferrero-Washington theorems, which prove Iwasawa's conjecture on the growth of the p-primary part of the ideal class group.


This book is a combined edition of the books previously published as Cyclotomic Fields, Vol. I and II. It continues to provide a basic introduction to the theory of these number fields, which are of great interest in classical number theory, as well as in other areas, such as K-theory. Cyclotomic Fields begins with basic material on character sums, and proceeds to treat class number formulas, p-adic L-functions, Iwasawa theory, Lubin-Tate theory, and explicit reciprocity laws, and the Ferrero-Washington theorems, which prove Iwasawa's conjecture on the growth of the p-primary part of the ideal class group.
Content:
Front Matter....Pages i-xvii
Character Sums....Pages 1-25
Stickelberger Ideals and Bernoulli Distributions....Pages 26-68
Complex Analytic Class Number Formulas....Pages 69-93
The p-adic L-function....Pages 94-122
Iwasawa Theory and Ideal Class Groups....Pages 123-147
Kummer Theory over Cyclotomic Zp-extensions....Pages 148-165
Iwasawa Theory of Local Units....Pages 166-189
Lubin-Tate Theory....Pages 190-219
Explicit Reciprocity Laws....Pages 220-243
Measures and Iwasawa Power Series....Pages 244-268
The Ferrero—Washington Theorems....Pages 269-279
Measures in the Composite Case....Pages 280-294
Divisibility of Ideal Class Numbers....Pages 295-313
p-adic Preliminaries....Pages 314-328
The Gamma Function and Gauss Sums....Pages 329-359
Gauss Sums and the Artin-Schreier Curve....Pages 360-380
Gauss Sums as Distributions....Pages 381-396
Back Matter....Pages 397-436


This book is a combined edition of the books previously published as Cyclotomic Fields, Vol. I and II. It continues to provide a basic introduction to the theory of these number fields, which are of great interest in classical number theory, as well as in other areas, such as K-theory. Cyclotomic Fields begins with basic material on character sums, and proceeds to treat class number formulas, p-adic L-functions, Iwasawa theory, Lubin-Tate theory, and explicit reciprocity laws, and the Ferrero-Washington theorems, which prove Iwasawa's conjecture on the growth of the p-primary part of the ideal class group.
Content:
Front Matter....Pages i-xvii
Character Sums....Pages 1-25
Stickelberger Ideals and Bernoulli Distributions....Pages 26-68
Complex Analytic Class Number Formulas....Pages 69-93
The p-adic L-function....Pages 94-122
Iwasawa Theory and Ideal Class Groups....Pages 123-147
Kummer Theory over Cyclotomic Zp-extensions....Pages 148-165
Iwasawa Theory of Local Units....Pages 166-189
Lubin-Tate Theory....Pages 190-219
Explicit Reciprocity Laws....Pages 220-243
Measures and Iwasawa Power Series....Pages 244-268
The Ferrero—Washington Theorems....Pages 269-279
Measures in the Composite Case....Pages 280-294
Divisibility of Ideal Class Numbers....Pages 295-313
p-adic Preliminaries....Pages 314-328
The Gamma Function and Gauss Sums....Pages 329-359
Gauss Sums and the Artin-Schreier Curve....Pages 360-380
Gauss Sums as Distributions....Pages 381-396
Back Matter....Pages 397-436
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