Complex Analysis

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Course contains Wiki2Reveal Slides

File:Mapping f z equal 1 over z.gif

Moving the argument of function

f

in the complex number plane. The point

z

has a blue color and

f (z) = \frac{1}{z}

is marked in red color.

z

is moved on a curve with

γ (t) = t \cdot e^{i t}

.

File:Image of path 1 over z.webm

Image of path in the complex numbers for the function

f (z) = \frac{1}{z}

Complex analysis is a study of functions of a complex variable. This is a one quarter course in complex analysis at the undergraduate level.

Articles

Slides for Lectures

Chapter 1 - Intoduction

Complex Numbers - (Wiki2Reveal slides)
- Heine-Borel Theorem
Riemann sphere - (Wiki2Reveal slides)
Exponentiation and roots - (Wiki2Reveal slides)

Chapter 2 - Topological Foundations

Sequences and series - (Wiki2Reveal slides)
/Power series/
Topological algebra - (Wiki2Reveal slides)
Topological space - Definition: Topology
Norms, metrics, topology - (Wiki2Reveal slides)

Chapter 3 - Complex Derivative

Holomorphic function - (Wiki2Reveal slides)
Partial Derivative - (Wiki2Reveal slides)
Cauchy-Riemann-Differential equation - (Wiki2Reveal slides)

Application of Cauchy-Riemann Equations - (Wiki2Reveal slides)

Chapter 4 - Curves and Line Integrals

Line integral in $ℝ^{n}$ - (Wiki2Reveal slides)
Curves - (Wiki2Reveal slides)
- Wikipedia: holomorphic function
- Wikipedia:Integral
Paths - (Wiki2Reveal slides)

Path Integral - (Wiki2Reveal slides)

Trace of Curve - (Wiki2Reveal slides)

Chapter 5 - Holomorphic Functions

Holomorphic function - (Wiki2Reveal slides)
- Criteria - (slideset)
- Wikipedia: Holomorphic function criteria
- /Differences from real differentiability/
- conformal mappings $(*)$ ,
- Inequalities - (Wiki2Reveal slides)
- rectifiable curve - (Wiki2Reveal slides)
Curve Integral - (Wiki2Reveal slides)
Path of Integration - (Wiki2Reveal slides)

Goursat's Lemma (Details) - (Wiki2Reveal slides)
Cauchy's Integral Theorem for Disks - (Wiki2Reveal slides)

Identity Theorem - (Wiki2Reveal slides)
Liouville's Theorem - (Wiki2Reveal slides)

Complex Analysis Part 2

Chain - Wiki2Reveal slides)

Cycle - (Wiki2Reveal slides)

Laurent Series - (Wiki2Reveal slides)
Goursat's Lemma
Cauchy Integral Theorem - (Wiki2Reveal slides)

Cauchy's integral formula - (Wiki2Reveal slides)
Example Computation with Laurent Series
Maximum Principle - (Wiki2Reveal slides)

Open Mapping (and Connectedness) Theorem - (Wiki2Reveal slides)

Singularity and Residues - Part 3

Winding number - (Wiki2Reveal slides)
Singularities - (Wiki2Reveal slides)
Example - exp(1/z)-essential singularity - (Wiki2Reveal slides)
Residuals - (Wiki2Reveal slides)
null-homologous
development in Laurent series,
Isolated singularity,
decomposition theorem,
Casorati-Weierstrass theorem,
Riemann Removability Theorem
Residue Theorem - (Wiki2Reveal slides)
Real integrals with residue theorem
Zeros and poles counting integral - (Wiki2Reveal slides)
Rouché's theorem - (Wiki2Reveal slides)
meromorphic function

Riemann mapping theorem-automorphisms

Exercises

Exercises for Introduction to Complex Analysis
Sheet 1
Sheet 2
- Solution to Exercise 3
- Solution to Exercise 4
Sheet 3
Sheet 4
Sheet 5
Paper 1
Complex Analysis/Quiz

Lectures

Sample exams

/Sample Midterm Exam 1/ /Sample Midterm Exam 2/

See also

de:Kurs:Funktionentheorie

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