Homology, cohomology, and sheaf cohomology for algebraic topology, algebraic geometry, and differential geometry /
"For more than thirty years the senior author has been trying to learn algebraic geometry. In the process he discovered that many of the classic textbooks in algebraic geometry require substantial knowledge of cohomology, homological algebra, and sheaf theory. In an attempt to demystify these a...
Saved in:
Main Authors: | |
---|---|
Group Author: | |
Published: |
World Scientific,
|
Publisher Address: | New Jersey : |
Publication Dates: | [2022] |
Literature type: | Book |
Language: | English |
Subjects: | |
Summary: |
"For more than thirty years the senior author has been trying to learn algebraic geometry. In the process he discovered that many of the classic textbooks in algebraic geometry require substantial knowledge of cohomology, homological algebra, and sheaf theory. In an attempt to demystify these abstract concepts and facilitate understanding for a new generation of mathematicians, he along with co-author wrote this book for an audience who is familiar with basic concepts of linear and abstract algebra, but who never has had any exposure to the algebraic geometry or homological algebra. As such this book consists of two parts. The first part gives a crash-course on the homological and cohomological aspects of algebraic topology, with a bias in favor of cohomology. The second part is devoted to presheaves, sheaves, Cech cohomology, derived functors, sheaf cohomology, and spectral sequences. All important concepts are intuitively motivated and the associated proofs of the quintessential theorems are presented in detail rarely found in the standard texts"-- |
Carrier Form: | xvii, 780 pages : illustrations (some color) ; 24 cm |
Bibliography: | Includes bibliographical references (pages 765-767) and index. |
ISBN: |
9789811245022 9811245029 |
Index Number: | QA612 |
CLC: | O189.22 |
Call Number: | O189.22/G168 |
Contents: | Homology and cohomology -- De Rham cohomology -- Singular homology and cohomology -- Simplicial homology and cohomology -- Homology and cohomology of CW complexes -- Poincaré duality -- Presheaves and sheaves; Basics -- Cech cohomology with values in a presheaf -- Presheaves and sheaves; A deeper look -- Derived functors, [delta]-functors, and [del]-functors -- Universal coefficient theorems -- Cohomology of sheaves -- Alexander and Alexander-Lefschetz duality -- Spectral sequences. |