Главная
Study mode:
on
1
Laplace equation
2
Laplace Derivation
3
Laplace Applications
4
Convolution
5
Dominated Convergence Theorem
6
Polar Coordinates Formula
7
Normal Derivative
8
Integrate by parts like a pro
9
Poisson equation
10
Laplace Mean Value Formula
11
Mollifiers
12
Green's Function
13
Poisson formula on half plane
14
Poisson Formula on a ball
15
Calculus of Variations
16
A Taste of Calculus of Variations
17
Heat equation
18
Heat Equation Initial Condition
19
What is Convexity?
20
Transport equation
21
Wave equation
22
the Euler Poisson Darboux equation
23
Kirchhoff Formula
24
Separation of Variables
25
Porous Medium Equation 🧽
26
Heat-Wave Equation
Description:
Dive into the world of partial differential equations with this comprehensive 10-hour course. Explore key concepts such as the Laplace equation, its derivation, and applications. Master techniques like convolution and the Dominated Convergence Theorem. Delve into polar coordinates, normal derivatives, and integration by parts. Examine the Poisson equation, Laplace Mean Value Formula, and mollifiers. Investigate Green's Function and Poisson formulas on half-planes and balls. Get a taste of Calculus of Variations and study various equations including heat, transport, and wave equations. Analyze the Euler Poisson Darboux equation, Kirchhoff Formula, and Separation of Variables. Conclude with an exploration of the Porous Medium Equation and the Heat-Wave Equation, providing a solid foundation in partial differential equations.

Partial Differential Equations

Add to list
#Mathematics #Differential Equations #Computer Science #Deep Learning #Convolution #Partial Differential Equations #Science #Physics #Wave Equation #Heat Equation #Laplace's Equation
1 of 26

Laplace equation