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Derived Categories de Amnon Yekutieli

Derived Categories: Cambridge Studies in Advanced Mathematics, cartea 183

Autor Amnon Yekutieli
en Limba Engleză Hardback – 18 dec 2019
There have been remarkably few systematic expositions of the theory of derived categories since its inception in the work of Grothendieck and Verdier in the 1960s. This book is the first in-depth treatment of this important component of homological algebra. It carefully explains the foundations in detail before moving on to key applications in commutative and noncommutative algebra, many otherwise unavailable outside of research articles. These include commutative and noncommutative dualizing complexes, perfect DG modules, and tilting DG bimodules. Written with graduate students in mind, the emphasis here is on explicit constructions (with many examples and exercises) as opposed to axiomatics, with the goal of demystifying this difficult subject. Beyond serving as a thorough introduction for students, it will serve as an important reference for researchers in algebra, geometry and mathematical physics.
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Specificații

ISBN-13: 9781108419338
ISBN-10: 110841933X
Pagini: 370
Ilustrații: 2 b/w illus. 155 exercises
Dimensiuni: 158 x 234 x 38 mm
Greutate: 1 kg
Editura: Cambridge University Press
Colecția Cambridge University Press
Seria Cambridge Studies in Advanced Mathematics

Locul publicării:Cambridge, United Kingdom

Cuprins

Introduction; 1. Basic facts on categories; 2. Abelian categories and additive functors; 3. Differential graded algebra; 4. Translations and standard triangles; 5. Triangulated categories and functors; 6. Localization of categories; 7. The derived category D(A,M); 8. Derived functors; 9. DG and triangulated bifunctors; 10. Resolving subcategories of K(A,M); 11. Existence of resolutions; 12. Adjunctions, equivalences and cohomological dimension; 13. Dualizing complexes over commutative rings; 14. Perfect and tilting DG modules over NC DG rings; 15. Algebraically graded noncommutative rings; 16. Derived torsion over NC graded rings; 17. Balanced dualizing complexes over NC graded rings; 18. Rigid noncommutative dualizing complexes; References; Index.

Recenzii

'The book is perfectly suited for the interested graduate student with plenty of explicit constructions, examples and exercises. In addition to being a thorough introduction to the subject, the book is a monograph filled with applications otherwise available only in research articles.' Felipe Zaldiva, MAA Reviews
'This is a clear, well-motivated book which gives a leisurely exposition of the theory of derived categories, describing many concepts and results which were previously scattered in the literature.' Hollis Williams, Mathematics Today
'Individuals hoping to learn about derived categories from the ground up (and willing to commit a significant amount of time to the process) will find that this book provides a solid foundation for the topic. Researchers already familiar with some of the theory may benefit from reading this linear development of derived categories, as it also offers a number of enlightening historical and contextual remarks along the way.' Peder Thompson, Mathematical Reviews

Notă biografică

Descriere

The first systematic exposition of the theory of derived categories, with key applications in commutative and noncommutative algebra.