Differential and Low-Dimensional Topology
Differential and Low-Dimensional Topology
The new student in differential and low-dimensional topology is faced with a bewildering array of tools and loosely connected theories. This short book presents the essential parts of each, enabling the reader to become 'literate' in the field and begin research as quickly as possible. The only prerequisite assumed is an undergraduate algebraic topology course. The first half of the text reviews basic notions of differential topology and culminates with the classification of exotic seven-spheres. It then dives into dimension three and knot theory. There then follows an introduction to Heegaard Floer homology, a powerful collection of modern invariants of three- and four-manifolds, and of knots, that has not before appeared in an introductory textbook. The book concludes with a glimpse of four-manifold theory. Students will find it an exhilarating and authoritative guide to a broad swathe of the most important topics in modern topology.
- Rapidly introduces a vast body of tools and results that would otherwise require many thousands of pages of read
- Highlights connections between topics often treated in isolation
- Presents Heegaard Floer homology for the first time in an introductory text
Reviews & endorsements
'The writing style, again befitting a guide of this type, generally suggests an informal discussion, perhaps during afternoon tea, with a working topologist. The book should prove useful to topology students as they move into more advanced work.' Andrew D. Hwang, MAA Reviews
Product details
April 2023Paperback
9781009220576
229 pages
228 × 151 × 15 mm
0.37kg
Available
Table of Contents
- Preface
- 1. Background on topological and smooth manifolds
- 2. Higher-dimensional manifolds
- 3. Three-manifolds
- 4. Knots and links
- 5. Heegaard floer homology
- 6. Four-manifolds
- Appendix: Fibre bundles and characteristic classes
- Bibliography
- Index.
