Taxonomy of singularities of complex functions 
Taxonomy of singularities of complex functions
by U of U / William H. Nesse
Video Lecture 46 of 50
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Views: 1,148
Date Added: March 15, 2015

Lecture Description

We define the three types of isolated singularities

Course Index

  1. Math 3160 introduction
  2. Basic Complex Algebra
  3. Moduli, conjugates, triangle inequality, and polar coordinates
  4. Products and quotients in exponential form
  5. Roots of complex numbers
  6. Functions of complex variables and mappings
  7. Regions in the complex plane
  8. Mappings by the exponential function
  9. Limits of complex functions
  10. Limits at infinity
  11. The derivative of a complex function
  12. Differentiation formulas for complex functions
  13. Cauchy-Riemann equations
  14. Analytic functions
  15. Harmonic functions and analytic functions
  16. The complex exponential and logarithm functions
  17. Complex log identites
  18. The information in analytic functions
  19. Applications to signal processing
  20. Applications of analytic functions to fluid flow
  21. Complex exponents
  22. Complex trigonometric functions
  23. Inverse trigonometric functions of a complex variable
  24. Derivatives and integrals of complex functions w(t)
  25. Contours and arc length in the complex plane
  26. Contour integrals of complex functions
  27. Closed circle integral of 1/z and branch cuts
  28. Moduli of complex integrals and integral bounds
  29. Complex antiderivatives and the fundamental theorem
  30. Proof of the antiderivative theorem for contour integrals
  31. Cauchy-Goursat theorem
  32. Simply and multiply connected domains
  33. Cauchy integral formula
  34. Cauchy Integral Results
  35. The fundamental theorem of algebra revisited
  36. Harmonic oscilators in the complex plane (optional)
  37. How Schrodinger's equation works (optional)
  38. Sequences and series involving complex variables
  39. Taylor series for functions of a complex variable
  40. Laurent series
  41. Examples of Laurent series computations
  42. Aspects of complex power series convergence
  43. Singularities and residues of complex functions
  44. The residue theorem
  45. Residues at infinity
  46. Taxonomy of singularities of complex functions
  47. Aspects of zeros and poles of analytic functions
  48. Zeros and poles of rational functions
  49. Applications of residues to improper real integration
  50. Fourier type integrals using residues

Course Description


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