Mastering Complex Calculus: From Derivatives to Residues

Complex Calculus: derivatives of complex variables, contour integration, Laurent series, Fourier series, and residues

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Mastering Complex Calculus: From Derivatives to Residues

What You Will Learn!

  • How to derive the most important theorems and concepts related to Complex Calculus
  • Cauchy's integral theorem
  • Cauchy's integral formula
  • Laurent Series
  • How to derive the Fourier Series from the Laurent Series
  • How to derive the Taylor Series from the Laurent Series
  • Residues
  • Contour integration

Description

Complex Calculus is an essential course that provides students with a foundation in complex functions, derivatives of complex variables, contour integration, Laurent series, Fourier series, and residues. In this course, you will learn the key concepts of Complex Calculus, and the process of reasoning by using mathematics, rather than rote memorization of formulas and exercises. Here's what you need to know about this course:


  1. Introduction to Complex Functions: The course begins by focusing on the concept of complex functions.

  2. Derivatives of Complex Variables: Next, the concept of derivative is extended to functions of a complex variable.

  3. Contour Integration: You will learn about contour integration, and the following theorems will be derived: Cauchy's integral theorem and Cauchy's integral formula.

  4. Laurent Series: The Laurent series will be mathematically derived. From Laurent, the Fourier and Taylor series are also derived.

  5. Residues: You will be introduced to residues and how to use them to do contour integration.

  6. Prerequisites: To take this course, you should have completed single variable Calculus, especially derivatives and integrals, and multivariable Calculus, especially line integrals and Stokes' theorem.

  7. Original Material: This course is based on the instructor's notes on Complex Calculus, and the presentation of the results is therefore original.

  8. Focusing on Understanding: The explanations are given by focusing on understanding and mathematically deriving the key concepts, rather than learning formulas and exercises by rote.

  9. Benefits: Some of the results presented in this course constitute the foundations of many branches of science, including Quantum Mechanics, Quantum Field Theory, and Engineering (in the Control theory of dynamical systems, for instance). By mastering the contents of this course, you will be able to tackle the most interesting mathematical and engineering problems.

  10. Who this course is for: This course is suitable for anyone interested in expanding their knowledge of mathematics, including students of mathematics, physics, engineering, and related fields, as well as professionals who wish to develop their understanding of Complex Calculus.


Who Should Attend!

  • mathematicians
  • physicists
  • engineers
  • computer scientists
  • Students interested in the concepts of Complex Calculus
  • Students who want to rigorously derive the concept of Fourier Series
  • Students who want to understand how to do contour integration

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Tags

  • Calculus

Subscribers

6578

Lectures

45

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