Tu | An Introduction to Manifolds | Buch | 978-1-0716-5336-4 | www.sack.de

Buch, Englisch, 436 Seiten, Format (B × H): 155 mm x 235 mm

Reihe: Universitext

Tu

An Introduction to Manifolds


Third Auflage 2026
ISBN: 978-1-0716-5336-4
Verlag: Springer-Verlag New York Inc.

Buch, Englisch, 436 Seiten, Format (B × H): 155 mm x 235 mm

Reihe: Universitext

ISBN: 978-1-0716-5336-4
Verlag: Springer-Verlag New York Inc.


Smooth manifolds—the higher-dimensional analogues of smooth curves and surfaces—are fundamental objects in modern mathematics. Drawing on algebra, topology, and analysis, they also play key roles in classical mechanics, general relativity, quantum field theory, and data analysis.

This streamlined introduction develops the theory of manifolds with the goal of helping readers achieve a rapid mastery of the essential topics. By the end of the book, readers will be able to compute, for simple spaces, one of the most basic topological invariants of a manifold: its de Rham cohomology. Along the way, they will gain the knowledge and skills needed for further study in geometry and topology. The third edition emphasizes clarity and simplification.  While preserving the overall structure of the second edition, every section has been rewritten, with new or simplified proofs, clearer exposition, and additional exercises, hints, and solutions.

This book is suitable for a one-semester graduate or advanced undergraduate course, as well as for independent study.  The necessary point-set topology appears in a twenty-page appendix; other appendices review material from real analysis and linear algebra. Hints and solutions accompany many exercises and problems. Requiring only minimal undergraduate prerequisites, also provides an excellent foundation for the author's companion volumes: y (with Raoul Bott);

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Zielgruppe


Graduate


Autoren/Hrsg.


Weitere Infos & Material


Preface to the Second Edition.- Preface to the First Edition.- Chapter 1. Euclidean Spaces.- Chapter 2. Manifolds.- Chapter 3. The Tangent Space.- Chapter 4. Lie Groups and Lie Algebras.- Chapter 5. Differential Forms.- Chapter 6. Integration.- Chapter 7. De Rham Theory.- Appendices.- A. Point-Set Topology.- B. The Inverse Function Theorem on R(N) and Related Results.- C. Existence of a Partition of Unity in General.- D. Linear Algebra.- E. Quaternions and the Symplectic Group.- Solutions to Selected Exercises.- Hints and Solutions to Selected End-of-Section Problems.- List of Symbols.- References.- Index.


Loring W. Tu was born in Taipei, Taiwan, and grew up in Taiwan, Canada, and the United States. He attended McGill University and Princeton University as an undergraduate, and obtained his Ph.D. from Harvard University under the supervision of Phillip A. Griffiths. He has taught at the University of Michigan, Johns Hopkins University, and Tufts University.

An algebraic geometer by training, he has done research at the interface of algebraic geometry, topology, and differential geometry, including Hodge theory, degeneracy loci, moduli spaces of vector bundles, and equivariant cohomology. He is the coauthor with Raoul Bott of ; the author of , ;  . He is also the editor of .



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