filmov
tv
Все публикации
0:43:10
Complex variables. Lecture #2. Cauchy-Goursat Theorem.
0:49:45
Complex variables. Lecture #1. Parametrized curves, contour integrals.
0:28:13
PDE. Lecture #7. Quasilinear equations. Method of characteristics.
0:23:27
PDE. Lecture #5. Linear homogeneous equation in two independent variables.
0:28:35
PDE. Lecture #8. Quasi-linear equations. Cauchy problem.
0:27:12
PDE. Lecture #6. Linear Homogeneous equations: Characteristics & Integral surfaces.
0:32:46
PDE. Lecture 4A. Derivation of the heat equation
0:28:49
PDE. Lecture A1. Auxiliary Material for Derivation of PDE Models
0:30:52
PDE. Lecture #31. Weak Solution to the Dirichlet Problem for Poisson’s Equation
0:28:49
PDE. Lecture #30. Introduction to Sobolev Spaces. Part IV
0:26:37
PDE. Lecture #29. Introduction to Sobolev Spaces. Part III
0:28:58
PDE. Lecture #28. Introduction to Sobolev spaces. Part II
0:33:09
PDE. Lecture #27. Introduction to Sobolev spaces. Part 1
0:23:16
PDE. Lecture #26. The Harnack convergence theorem
0:20:37
PDE. Lecture #25. Analyticity of harmonic functions. Part II.
0:28:39
PDE. Lecture #24. Analyticity of harmonic functions. Part I.
0:54:07
PDE. Lecture #23. Green’s Function for a ball. Poisson’s integral formula. Harnack's inequality.
0:39:26
Complex variables. Lecture #12. Applications of residue theory: evaluation of improper integrals.
0:34:27
PDE. Lecture #22. Subharmonic functions.
0:51:30
Complex variables. Lecture #11. Residue theory.
0:35:13
PDE. Lecture #21. Green’s Function for Laplacian.
0:33:19
Complex variables. Lecture #6. Sequences and series.
0:21:43
PDE. Lecture #20. The maximum principle.
0:26:09
PDE. Lecture #4. The Transport Equation.
Вперёд