An Introduction to Rings and Modules
With K-Theory in View
£110.00
Part of Cambridge Studies in Advanced Mathematics
- Authors:
- A. J. Berrick, National University of Singapore
- M. E. Keating, Imperial College of Science, Technology and Medicine, London
- Date Published: May 2000
- availability: Available
- format: Hardback
- isbn: 9780521632744
£
110.00
Hardback
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This book, first published in 2000, is a concise introduction to ring theory, module theory and number theory, ideal for a first year graduate student, as well as an excellent reference for working mathematicians in other areas. Starting from definitions, the book introduces fundamental constructions of rings and modules, as direct sums or products, and by exact sequences. It then explores the structure of modules over various types of ring: noncommutative polynomial rings, Artinian rings (both semisimple and not), and Dedekind domains. It also shows how Dedekind domains arise in number theory, and explicitly calculates some rings of integers and their class groups. About 200 exercises complement the text and introduce further topics. This book provides the background material for the authors' companion volume Categories and Modules, soon to appear. Armed with these two texts, the reader will be ready for more advanced topics in K-theory, homological algebra and algebraic number theory.
Read more- No prior knowledge is required of the reader, other than that which can be acquired in a standard undergraduate course
- A full set of exercises indicates some of the deeper applications and developments of the results
- Almost entirely self-contained, yet concise
Reviews & endorsements
'… an excellent concise introduction to the theory of rings and modules …'. Tong Wenting, Zentralblatt MATH
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×Product details
- Date Published: May 2000
- format: Hardback
- isbn: 9780521632744
- length: 284 pages
- dimensions: 229 x 152 x 19 mm
- weight: 0.59kg
- contains: 175 exercises
- availability: Available
Table of Contents
1. Basics
2. Direct sums and their short exact sequences
3. Noetherian rings and polynomial rings
4. Artinian rings and modules
5. Dedekind domains
6. Modules over Dedekind domains.
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