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Complex Analysis in One Variable
Overview of attention for book
Table of Contents
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Book Overview
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Chapter 1
Elementary Theory of Holomorphic Functions
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Chapter 2
Covering Spaces and the Monodromy Theorem
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Chapter 3
The Winding Number and the Residue Theorem
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Chapter 4
Picard’s Theorem
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Chapter 5
The Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem
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Chapter 6
Applications of Runge’s Theorem
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Chapter 7
The Riemann Mapping Theorem and Simple Connectedness in the Plane
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Chapter 8
Functions of Several Complex Variables
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Chapter 9
Compact Riemann Surfaces
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Chapter 10
The Corona Theorem
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Chapter 11
Subharmonic Functions and the Dirichlet Problem
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Chapter 12
Introduction
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Chapter 13
Review of Complex Numbers
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Chapter 14
Elementary Theory of Holomorphic Functions
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Chapter 15
Covering Spaces and the Monodromy Theorem
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Chapter 16
The Winding Number and the Residue Theorem
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Chapter 17
Picard’s Theorem
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Chapter 18
The Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem
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Chapter 19
Applications of Runge’s Theorem
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Chapter 20
The Riemann Mapping Theorem and Simple Connectedness in the Plane
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Chapter 21
Functions of Several Complex Variables
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Chapter 22
Compact Riemann Surfaces
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Chapter 23
The Corona Theorem
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Chapter 24
Subharmonic Functions and the Dirichlet Problem
Overall attention for this book and its chapters
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Mentioned by
twitter
1
X user
syllabi
5
institutions with syllabi
wikipedia
1
Wikipedia page
Citations
dimensions_citation
26
Dimensions
Readers on
mendeley
8
Mendeley
Book overview
1. Elementary Theory of Holomorphic Functions
2. Covering Spaces and the Monodromy Theorem
3. The Winding Number and the Residue Theorem
4. Picard’s Theorem
5. The Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem
6. Applications of Runge’s Theorem
7. The Riemann Mapping Theorem and Simple Connectedness in the Plane
8. Functions of Several Complex Variables
9. Compact Riemann Surfaces
10. The Corona Theorem
11. Subharmonic Functions and the Dirichlet Problem
12. Introduction
13. Review of Complex Numbers
14. Elementary Theory of Holomorphic Functions
15. Covering Spaces and the Monodromy Theorem
16. The Winding Number and the Residue Theorem
17. Picard’s Theorem
18. The Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem
19. Applications of Runge’s Theorem
20. The Riemann Mapping Theorem and Simple Connectedness in the Plane
21. Functions of Several Complex Variables
22. Compact Riemann Surfaces
23. The Corona Theorem
24. Subharmonic Functions and the Dirichlet Problem
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
5
institutions on Open Syllabus Project.
Institution
Syllabi count
Course subject areas covered
Washington University in St Louis
2
Unknown
Louisiana State University and Agricultural & Mechanical College
2
Unknown
University of California-Berkeley
1
Unknown
University of Miami
1
Unknown
Unknown
4
Engineering, Biology, Medicine, Economics, Chemistry