Local fields
Material type:
TextLanguage: English Series: London Mathematical Society student texts ; 3Publication details: New York Cambridge University Press 1986Description: xiv, 360p. illISBN: - 0521304849 (HB)
BOOKS
| Home library | Call number | Materials specified | Status | Date due | Barcode | |
|---|---|---|---|---|---|---|
| IMSc Library | 511.22 CAS (Browse shelf(Opens below)) | Available | 23604 |
Includes index.
Includes bibliography (p. 352-357) and references.
1. Introduction
2. General properties
3. Archimedean valuations
4. Non archimedean valuations
5. Embedding theorem
6. Transcendental extensions
7. Algebraic extensions
8. p-adic fields
9. Algebraic extensions
10. Algebraic number fields
11. Diophantine equations
12. Advanced analysis
13. A theorem of Borel and work
The p-adic numbers, the earliest of local fields, were introduced by Hensel some 70 years ago as a natural tool in algebra number theory. Today the use of this and other local fields pervades much of mathematics, yet these simple and natural concepts, which often provide remarkably easy solutions to complex problems, are not as familiar as they should be. This book, based on postgraduate lectures at Cambridge, is meant to rectify this situation by providing a fairly elementary and self-contained introduction to local fields. After a general introduction, attention centres on the p-adic numbers and their use in number theory. There follow chapters on algebraic number theory, diophantine equations and on the analysis of a p-adic variable. This book will appeal to undergraduates, and even amateurs, interested in number theory, as well as to graduate students.
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