Edgar E. Enochs; Overtoun M. G. Jenda: Relative Homological Algebra / Relative Homological Algebra
Volume 1
Seiten
2011
|
2nd revised and extended edition
De Gruyter (Verlag)
978-3-11-021520-5 (ISBN)
De Gruyter (Verlag)
978-3-11-021520-5 (ISBN)
This revised second edition provides a self-contained systematic treatment of the subject. It supplies important material that is essential to understanding topics in algebra, algebraic geometry, and algebraic topology. At the end of each section there are exercises that provide practice problems for students as well as additional important results for specialists.
This is the second revised edition of an introduction to contemporary relative homological algebra. It supplies important material essential to understand topics in algebra, algebraic geometry and algebraic topology. Each section comes with exercises providing practice problems for students as well as additional important results for specialists. In this new edition the authors have added well-known additional material in the first three chapters, and added new material that was not available at the time the original edition was published. In particular, the major changes are the following: Chapter 1: Section 1.2 has been rewritten to clarify basic notions for the beginner, and this has necessitated a new Section 1.3. Chapter 3: The classic work of D. G. Northcott on injective envelopes and inverse polynomials is finally included. This provides additional examples for the reader. Chapter 11: Section 11.9 on Kaplansky classes makes volume one more up to date. The material in this section was not available at the time the first edition was published. The authors also have clarified some text throughout the book and updated the bibliography by adding new references. The book is also suitable for an introductory course in commutative and ordinary homological algebra.
This is the second revised edition of an introduction to contemporary relative homological algebra. It supplies important material essential to understand topics in algebra, algebraic geometry and algebraic topology. Each section comes with exercises providing practice problems for students as well as additional important results for specialists. In this new edition the authors have added well-known additional material in the first three chapters, and added new material that was not available at the time the original edition was published. In particular, the major changes are the following: Chapter 1: Section 1.2 has been rewritten to clarify basic notions for the beginner, and this has necessitated a new Section 1.3. Chapter 3: The classic work of D. G. Northcott on injective envelopes and inverse polynomials is finally included. This provides additional examples for the reader. Chapter 11: Section 11.9 on Kaplansky classes makes volume one more up to date. The material in this section was not available at the time the first edition was published. The authors also have clarified some text throughout the book and updated the bibliography by adding new references. The book is also suitable for an introductory course in commutative and ordinary homological algebra.
Edgar E. Enochs, University of Kentucky, Lexington, USA; Overtoun M. G. Jenda, Auburn University, Alabama, USA.
"As their book is primarily aimed at graduate students in homological algebra, the authors have made any effort to keep the text reasonably self-contained and detailed. The outcome is a comprehensive textbook on relative homological algebra at its present state of art." Zentralblatt für Mathematik (review of the first edition)
"[...] in the reviewer's opinion it is an elegant introduction to homological methods towards applications in ring theory." Zentralblatt für Mathematik
Erscheint lt. Verlag | 17.10.2011 |
---|---|
Reihe/Serie | De Gruyter Expositions in Mathematics ; 30 | Edgar E. Enochs; Overtoun M. G. Jenda: Relative Homological Algebra ; Volume 1 |
Verlagsort | Berlin/Boston |
Sprache | englisch |
Maße | 170 x 240 mm |
Gewicht | 768 g |
Themenwelt | Mathematik / Informatik ► Mathematik ► Algebra |
Schlagworte | Algebra • Algebra; Ring; Ideal; Module Theory • Homologische Algebra • Ideal • Modul • module theory • Ring |
ISBN-10 | 3-11-021520-9 / 3110215209 |
ISBN-13 | 978-3-11-021520-5 / 9783110215205 |
Zustand | Neuware |
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