08:41

AnyTex tutorial

01:00

AnyTex Premiere Pro (After effects) plugin (animated Latex equations)

08:11

Asymptotics in the Complex Plane. Watson's lemma, Part 2

04:46

Asymptotics in the Complex Plane. Watson's lemma, Part 1

13:03

Asymptotics in the complex plane. Saddle Point Approximation. Non-homogeneous exponent. P4.

11:20

Asymptotics in the complex plane. Saddle Point Approximation. Non-homogeneous exponent. P3.

05:09

Asymptotitc in the complex plane. Saddle Point Approximation. Non-homogeneous exponent. P2.

08:52

Asymptotics in the complex plane. Saddle Point Approximation. Non-homogeneous exponent. P1.

10:07

Asymptotics in the complex plane. Saddle Point Approximation. Coalescent saddle and pole.

19:49

Asymptotitc in the complex plane. Saddle Point Approximation. Higher order saddles

07:38

Asymptotitc in the complex plane. Saddle Point Approximation. Endpoints contribution. Part 2.

11:35

Asymptotitc in the complex plane. Saddle Point Approximation. Endpoints contribution. Part 1.

10:03

Asymptotics in the complex plane. Relativistic particle in a corner Part 1.

21:48

Asymptotics in the complex plane. Asymptotics of Legendre polynomials.

23:17

Asymptotics in the complex plane. Relativistic particle in a corner. Part 2

11:05

Asymptotics in a complex plane. Saddle Point Approximation. Part 3.

19:50

Asymptotics i the complex plane. Saddle Point Approximation, Part 2

18:36

Asymptotics in the complex plane. Saddle point approximation. First assault

04:54

Asymptotics in the complex plane. Solving differential equation with contour integral. Example 2.P2.

15:41

Asymptotics in the complex plane. Solving differential equation with contour integral. Example 2.P1.

10:18

Asymptotics in the complex plane. Solving differential equation with contour integral. Example 1.

12:10

Asymptotics in the complex plane. Application of Eulers digamma function. Part 2.

05:28

Asymptotics in the complex plane. Solving differential equation with contour integral. P2.

05:04

Asymptotics in the complex plane. Solving differential equation with contour integral. P1.

07:17

Asymptotics in the complex plane. Solving differential equation with contour integral. P3.

11:25

Asymptotics in the complex plane. Application of Eulers digamma function, Part 1.

03:54

Asymptotics in a complex plane. Digamma function properties and asymptotics Part 2.

08:54

Asymptotics i the complex plane. Digamma function properties and asymptotics, Part 1

08:17

Asymptotics in a complex plane. Hankel representation of the Gamma-function.

15:55

Asymptotics in the complex plane. Computation of infinite products/example I.

09:01

[CA/Week 1] 1. Introduction

01:05

New course on Complex Analysis

13:29

[CA/Week 5] 9. Building Riemann surfaces with Wolfram mathematica.

06:51

[CA/Week 5] 8. Riemann surfaces of the less trivial algebraic functions.

04:07

[CA/Week 5] 7. Riemann surfaces of the simplest algebraic functions.

04:12

[CA/Week 5] 6. Riemann surfaces, More rigorous approach

04:26

[CA/Week 5] 5. Riemann surfaces, Introduction.

04:04

[CA/Week 5] 4. Analytical continuation via contour deformation II.

08:04

[CA/Week 2] 6. Types of singularities

09:01

[CA/Week 2] 5. Laurent expansion. Examples.

09:22

[CA/Week 2] 4. Laurent expansion. Introduction.

10:53

[CA/Week 2] 3. Taylor expansion in the complex plane

08:39

[CA/Week 2] 2. Cauchy's Integral formula.

06:16

[CA/Week 2] 1. Cauchy's Integral theorem.

06:00

[CA/Week 3] 12. Principal value integration

07:55

[CA/Week 3] 11. More advanced Fourier-type integrals

05:06

[CA/Week 3] 10. Applications of Jordan's lemma.

09:57

[CA/Week 3] 9. Jordan's lemma and Fourier-type integrals

04:22

[CA/Week 3] 8. Quick example of residue theorem.

08:15

[CA/Week 3] 7. First practice with the computation of integrals with the help of residues.

12:43

[CA/Week 3] 6. Integration with residues. Practice with residues

11:39

[CA/Week 3] 5. Practice with residues

04:17

[CA/Week 3] 4. Riemann sphere.

07:11

[CA/Week 3] 3. Residue at infinity

10:42

[CA/Week 3] 2. Residue theorem

05:21

[CA/Week 3] 1. Integration with residues. Introduction.

10:28

[CA/Week 1] 8. Introduction to conformal mappings. Integration.

07:47

[CA/Week 1] 7. Practice with Cauchy-Riemann conditions.

12:10

[CA/Week 1] 6. Differentiation of functions of complex variables. Cauchy-Riemann conditions.

12:34

[CA/Week 1] 5. Practice with exponential representation of a complex number.