Homological Algebra

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When this book was written, methods of algebraic topology had caused revolutions in the world of pure algebra. To clarify the advances that had been made, Cartan and Eilenberg tried to unify the fields and to construct the framework of a fully fledged theory. The invasion of algebra had occurred on three fronts through the construction of cohomology theories for groups, Lie algebras, and associative algebras. This book presents a single homology (and also cohomology) theory that embodies all three; a large number of results is thus established in a general framework. Subsequently, each of the three theories is singled out by a suitable specialization, and its specific properties are studied.The starting point is the notion of a module over a ring. The primary operations are the tensor product of two modules and the groups of all homomorphisms of one module into another. From these, "higher order" derived of operations are obtained, which enjoy all the properties usually attributed to homology theories. This leads in a natural way to the study of "functors" and of their "derived functors.This mathematical masterpiece will appeal to all mathematicians working in algebraic topology.

Author(s): Henri Cartan, Samuel Eilenberg
Series: Princeton Landmarks in Mathematics and Physics
Publisher: Princeton University Press
Year: 1973

Language: English
Commentary: Same book/printing as https://libgen.is/book/index.php?md5=501CA04A1FBD3BBB15F8D123BE61E0AC but different scan (except for the cover pages).
Pages: 390+xv
City: Princeton, NJ

Title
Preface
Contents
I. Rings and Modules
II. Additive Functors
III. Satellites
IV. Homology
V. Derived Functors
VI. Derived Functors of Tensor and Hom
VII. Integral Domains
VIII. Augmented Rings
IX. Associative Algebras
X. Supplemented Algebras
XI. Products
XII. Finite Groups
XIII. Lie Algebras
XIV. Extensions
XV. Spectral Sequences
XVI. Applications of Spectral Sequences
XVII. Hyperhomology
Appendix: Exact Categories (David A. Buchsbaum)
List of Symbols
Index of Terminology