Cohomology of number fields
Author(s)
Bibliographic Information
Cohomology of number fields
(Die Grundlehren der mathematischen Wissenschaften, 323)
Springer, c2000
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Note
Includes bibliographical references (p. [681]-693) and index
Description and Table of Contents
Description
Galois modules over local and global fields form the main subject of this monograph, which can serve both as a textbook for students, and as a reference book for the working mathematician, on cohomological topics in number theory. The first part provides the necessary algebraic background. The arithmetic part deals with Galois groups of local and global fields: local Tate duality, the structure of the absolute Galois group of a local field, extensions of global fields with restricted ramification, cohomology of the idele and the idele class groups, Poitou-Tate duality for finitely generated Galois modules, the Hasse principle, the theorem of Grundwald-Wang, Leopoldt's conjecture, Riemann's existence theorem for number fields, embedding problems, the theorems of Iwasawa and of Safarevic on solvable groups as Galois groups over global fields, Iwasawa theory of local and global number fields, and the characterization of number fields by their absolute Galois groups.
Table of Contents
- I Algebraic Theory: Cohomology of Profinite Groups * Some Homological Algebra * Duality Properties of Profinite Groups * Free Products of Profinite Groups * Iwasawa Modules II Arithmetic Theory: Galois Cohomology * Cohomology of Local Fields * Cohomology of Global Fields * The Absolute Galois Group of a Global Field * Restricted Ramification * Iwasawa Theory of Number Fields
- Anabelian Geometry * Literature * Index.
by "Nielsen BookData"