Complex Analysis

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 ${\displaystyle \mathbb {R} ^{n}}$ - (Wiki2Reveal slides)
• Curves - (Wiki2Reveal slides)
  • Wikipedia: holomorphic function
  • Wikipedia:Integral
• Paths - (Wiki2Reveal slides)

• Path Integral - (Wiki2Reveal slides)

• Wikipedia: Curve integral
• Continuity and Limit of a sequence

• 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${\displaystyle (\ast )}$,
  • 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

• Riemann mapping theorem - (Wiki2Reveal slides)
  • Schwarz's Lemma
  • ${\displaystyle \mathrm {Aut} (\mathbb {D} )}$
• analytical and harmonic function