↓ Skip to main content
Altmetric
What is this page?
Embed badge
Share
Share on Twitter
Share on Facebook
Share by email
Algebraic Topology
Overview of attention for book
Table of Contents
Altmetric Badge
Book Overview
Altmetric Badge
Chapter 1
Path Integrals
Altmetric Badge
Chapter 2
Angles and Deformations
Altmetric Badge
Chapter 3
The Winding Number
Altmetric Badge
Chapter 4
Applications of Winding Numbers
Altmetric Badge
Chapter 5
De Rham Cohomology and the Jordan Curve Theorem
Altmetric Badge
Chapter 6
Homology
Altmetric Badge
Chapter 7
Indices of Vector Fields
Altmetric Badge
Chapter 8
Vector Fields on Surfaces
Altmetric Badge
Chapter 9
Holes and Integrals
Altmetric Badge
Chapter 10
Mayer—Vietoris
Altmetric Badge
Chapter 11
Covering Spaces
Altmetric Badge
Chapter 12
The Fundamental Group
Altmetric Badge
Chapter 13
The Fundamental Group and Covering Spaces
Altmetric Badge
Chapter 14
The Van Kampen Theorem
Altmetric Badge
Chapter 15
Cohomology
Altmetric Badge
Chapter 16
Variations
Altmetric Badge
Chapter 17
The Topology of Surfaces
Altmetric Badge
Chapter 18
Cohomology on Surfaces
Altmetric Badge
Chapter 19
Riemann Surfaces
Altmetric Badge
Chapter 20
Riemann Surfaces and Algebraic Curves
Altmetric Badge
Chapter 21
The Riemann—Roch Theorem
Altmetric Badge
Chapter 22
Toward Higher Dimensions
Altmetric Badge
Chapter 23
Higher Homology
Altmetric Badge
Chapter 24
Duality
Overall attention for this book and its chapters
Altmetric Badge
Mentioned by
twitter
3
X users
syllabi
4
institutions with syllabi
wikipedia
17
Wikipedia pages
Citations
dimensions_citation
125
Dimensions
Readers on
mendeley
3
Mendeley
Book overview
1. Path Integrals
2. Angles and Deformations
3. The Winding Number
4. Applications of Winding Numbers
5. De Rham Cohomology and the Jordan Curve Theorem
6. Homology
7. Indices of Vector Fields
8. Vector Fields on Surfaces
9. Holes and Integrals
10. Mayer—Vietoris
11. Covering Spaces
12. The Fundamental Group
13. The Fundamental Group and Covering Spaces
14. The Van Kampen Theorem
15. Cohomology
16. Variations
17. The Topology of Surfaces
18. Cohomology on Surfaces
19. Riemann Surfaces
20. Riemann Surfaces and Algebraic Curves
21. The Riemann—Roch Theorem
22. Toward Higher Dimensions
23. Higher Homology
24. Duality
Summary
X
Syllabi
Wikipedia
Dimensions citations
This data is correct as of December 2015 - for more up to date information, please visit
https://opensyllabus.org/
So far, Altmetric has seen this research output assigned in
10
syllabi from
4
institutions on Open Syllabus Project.
Institution
Syllabi count
Course subject areas covered
Indian Institute of Technology, Bombay
2
Medicine, Computer Science
University of California-Berkeley
1
Unknown
University of Western Australia
1
Unknown
Unknown
6
Unknown