↓ Skip to main content
Altmetric
What is this page?
Embed badge
Share
Share on Twitter
Share on Facebook
Share by email
Constant Mean Curvature Surfaces, Harmonic Maps and Integrable Systems
Overview of attention for book
Table of Contents
Altmetric Badge
Book Overview
Altmetric Badge
Chapter 1
Introduction: Surfaces with prescribed mean curvature
Altmetric Badge
Chapter 2
From minimal surfaces and CMC surfaces to harmonic maps
Altmetric Badge
Chapter 3
Variational point of view and Noether’s theorem
Altmetric Badge
Chapter 4
Working with the Hopf differential
Altmetric Badge
Chapter 5
The Gauss-Codazzi condition
Altmetric Badge
Chapter 6
Elementary twistor theory for harmonic maps
Altmetric Badge
Chapter 7
Harmonic maps as an integrable system
Altmetric Badge
Chapter 8
Construction of finite type solutions
Altmetric Badge
Chapter 9
Constant mean curvature tori are of finite type
Altmetric Badge
Chapter 10
Wente tori
Altmetric Badge
Chapter 11
Weierstrass type representations
Overall attention for this book and its chapters
Altmetric Badge
Mentioned by
twitter
5
X users
syllabi
1
institution with syllabi
wikipedia
1
Wikipedia page
Citations
dimensions_citation
70
Dimensions
Readers on
mendeley
7
Mendeley
Book overview
1. Introduction: Surfaces with prescribed mean curvature
2. From minimal surfaces and CMC surfaces to harmonic maps
3. Variational point of view and Noether’s theorem
4. Working with the Hopf differential
5. The Gauss-Codazzi condition
6. Elementary twistor theory for harmonic maps
7. Harmonic maps as an integrable system
8. Construction of finite type solutions
9. Constant mean curvature tori are of finite type
10. Wente tori
11. Weierstrass type representations
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
1
syllabus from an institution on Open Syllabus Project.
Institution
Syllabi count
Course subject areas covered
Unknown
1
Engineering, Biology