Introductory Lectures on Equivariant Cohomology : : (AMS-204) / / Loring W. Tu.
This book gives a clear introductory account of equivariant cohomology, a central topic in algebraic topology. Equivariant cohomology is concerned with the algebraic topology of spaces with a group action, or in other words, with symmetries of spaces. First defined in the 1950s, it has been introduc...
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| Superior document: | Title is part of eBook package: De Gruyter EBOOK PACKAGE COMPLETE 2020 English |
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| Place / Publishing House: | Princeton, NJ : : Princeton University Press, , [2020] ©2020 |
| Year of Publication: | 2020 |
| Language: | English |
| Series: | Annals of Mathematics Studies ;
204 |
| Online Access: | |
| Physical Description: | 1 online resource (200 p.) :; 37 b/w illus. |
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| Other title: | Frontmatter -- Contents -- List of Figures -- Preface -- Acknowledgments -- Part I. Equivariant Cohomology in the Continuous Category -- Part II. Differential Geometry of a Principal Bundle -- Part III. The Cartan Model -- Part IV. Borel Localization -- Part V. The Equivariant Localization Formula -- Appendices -- Hints and Solutions to Selected End-of-Section Problems -- List of Notations -- Bibliography -- Index |
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| Summary: | This book gives a clear introductory account of equivariant cohomology, a central topic in algebraic topology. Equivariant cohomology is concerned with the algebraic topology of spaces with a group action, or in other words, with symmetries of spaces. First defined in the 1950s, it has been introduced into K-theory and algebraic geometry, but it is in algebraic topology that the concepts are the most transparent and the proofs are the simplest. One of the most useful applications of equivariant cohomology is the equivariant localization theorem of Atiyah-Bott and Berline-Vergne, which converts the integral of an equivariant differential form into a finite sum over the fixed point set of the group action, providing a powerful tool for computing integrals over a manifold. Because integrals and symmetries are ubiquitous, equivariant cohomology has found applications in diverse areas of mathematics and physics.Assuming readers have taken one semester of manifold theory and a year of algebraic topology, Loring Tu begins with the topological construction of equivariant cohomology, then develops the theory for smooth manifolds with the aid of differential forms. To keep the exposition simple, the equivariant localization theorem is proven only for a circle action. An appendix gives a proof of the equivariant de Rham theorem, demonstrating that equivariant cohomology can be computed using equivariant differential forms. Examples and calculations illustrate new concepts. Exercises include hints or solutions, making this book suitable for self-study. |
| Format: | Mode of access: Internet via World Wide Web. |
| ISBN: | 9780691197487 9783110704716 9783110704518 9783110704846 9783110704662 9783110494914 9783110690088 |
| DOI: | 10.1515/9780691197487?locatt=mode:legacy |
| Access: | restricted access |
| Hierarchical level: | Monograph |
| Statement of Responsibility: | Loring W. Tu. |