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Purity, Spectra and Localisation - Mike Prest

Purity, Spectra and Localisation

(Autor)

Buch | Hardcover
798 Seiten
2009
Cambridge University Press (Verlag)
978-0-521-87308-6 (ISBN)
CHF 319,95 inkl. MwSt
A unified, coherent account of the algebraic aspects and uses of the Ziegler spectrum. It may be used as an introductory graduate-level text, providing relevant background material and a wealth of illustrated examples. An extensive index and thorough referencing also make this book an ideal reference.
It is possible to associate a topological space to the category of modules over any ring. This space, the Ziegler spectrum, is based on the indecomposable pure-injective modules. Although the Ziegler spectrum arose within the model theory of modules and plays a central role in that subject, this book concentrates specifically on its algebraic aspects and uses. The central aim is to understand modules and the categories they form through associated structures and dimensions, which reflect the complexity of these, and similar, categories. The structures and dimensions considered arise particularly through the application of model-theoretic and functor-category ideas and methods. Purity and associated notions are central, localisation is an ever-present theme and various types of spectrum play organising roles. This book presents a unified, coherent account of material which is often presented from very different viewpoints and clarifies the relationships between these various approaches.

Mike Prest is Professor of Pure Mathematics at the University of Manchester.

Preface; Introduction; Part I. Modules: 1. Pp conditions; 2. Purity; 3. Pp pairs and definable subcategories; 4. Pp-types and pure-injectivity; 5. The Ziegler spectrum; 6. Rings of definable scalars; 7. m-dimension and width; 8. Examples; 9. Ideals in mod-R; A. Model theory; Part II. Functors: 10. Finitely presented functors; 11. Serre subcategories and localisation; 12. The Ziegler spectrum and injective functors; 13. Dimensions; 14. The Zariski spectrum and the sheaf of definable scalars; 15. Artin algebras; 16. Finitely accessible and presentable additive categories; 17. Spectra of triangulated categories; B. Languages for definable categories; C. A model theory/functor category dictionary; Part III. Definable categories: 18. Definable categories and interpretation functors; D. Model theory of modules: an update; E. Glossary; Main examples; Bibliography; Index.

Erscheint lt. Verlag 4.6.2009
Reihe/Serie Encyclopedia of Mathematics and its Applications
Zusatzinfo Worked examples or Exercises
Verlagsort Cambridge
Sprache englisch
Maße 164 x 240 mm
Gewicht 1350 g
Themenwelt Mathematik / Informatik Mathematik Algebra
ISBN-10 0-521-87308-8 / 0521873088
ISBN-13 978-0-521-87308-6 / 9780521873086
Zustand Neuware
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