수치편미분방정식
- 연세대학교
- 이은정
페이스북
트위터
카카오톡
네이버밴드
링크복사
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- 주제분류
- 자연과학 >수학ㆍ물리ㆍ천문ㆍ지리 >수학
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- 강의학기
- 2011년 1학기
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- 조회수
- 17,732
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This course focuses on the fundamentals of modern numerical techniques for a wide range of linear and nonlinear elliptic, parabolic, and hyperbolic partial differential equations and integral equations central to a wide variety of applications in science, engineering, and other fields. Topics includes : Mathematical formulations; Finite difference method, Finite volume method, Collocation method, Finite element method
- 수강안내 및 수강신청
- ※ 수강확인증 발급을 위해서는 수강신청이 필요합니다
Introduction of this course 1-1
차시별 강의
| 1. | |
Introduction of this course 1-1 | 1. Introduction of this course 2. Preliminaries |
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| 2. | |
Introduction of this course 1-2 | |
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| 3. | |
Introduction of this course 2 | 1. Introduction of this course 2. Preliminaries |
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| 4. | |
Steady state and Boundary value problems 1 | 1. Heat Equation 2. Locla Trucation error, Global error 3. Dirichlet-Neumann Boundary condition |
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| 5. | |
Steady state and Boundary value problems 2 | 1. Dirichlet-Neumann boundary condition 2. Neumann boundary conditon 3. 2D steady state heat equation |
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| 6. | |
Steady state and Boundary value problem | 1. 2D steady state heat equation 2. Singular perturbation and boundary layer |
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| 7. | |
The Initial Value Problem for Ordinary Differential Equations 1 | 1. Linear Ordinary Differential Equation 2. Lipschitz continuity |
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| 8. | |
The Initial Value Problem for Ordinary Differential Equations | One-step method for ODE | |
| 9. | |
The Initial Value Problem for Ordinary Differential Equations | Multistep method for ODE | |
| 10. | |
Zero-Stability and Convergence for Initial value Problem | Stability of one-step method | |
| 11. | |
Absolute Stability for Ordinary Differential Equations | Absolute Stability of one-step and multistep methods, Stability Regions | |
| 12. | |
Diffusion Equations and Parabolic Problems | Discretization of Diffusion Equations | |
| 13. | |
Diffusion Equations and Parabolic Problems | Matrix form of Crank-Nicolson, LTE, Stability | |
| 14. | |
Diffusion Equations and Parabolic Problems | Stability of Crank-Nicolson and Forward Euler | |
| 15. | |
Diffusion Equations and Parabolic Problems | Stiffness of heat equations, Convergence | |
| 16. | |
Diffusion Equations and Parabolic Problems | Lax Equivalence Theorem, Von-Neumann Analysis | |
| 17. | |
Diffusion Equations and Parabolic Problems | Von-Neumann Analysis, Multidimensional Problems | |
| 18. | |
Advection Equations and Hyperbolic equations | Method of Lines Discretiztion(MOL) | |
| 19. | |
Advection Equations and Hyperbolic equations | Method of Lines Discretiztion, Von-Neumann Analysis for MOL | |
| 20. | |
Advection Equations and Hyperbolic equations | Von-Neumann Analysis, CFL condition | |
| 21. | |
Finite Volume Method | Conservation Law, General Formulation | |
| 22. | |
Finite Volume Method | Conservation Law, CFLcondition, Numerical Fluxes | |
| 23. | |
Finite Volume Method | Numerical Fluxes | |
| 24. | |
Finite Volume Method | Limiters | |
| 25. | |
Finite Volume Method | Limiters, TVD | |
| 26. | |
Finite Volume Method | FVM in n-dimensional space | |
| 27. | |
Finite Volume Method | FVM in n-dimensional space | |
| 28. | |
Finite Element Method | Sobolev Spaces | |
| 29. | |
Finite Element Method | Sobolev Spaces | |
| 30. | |
Finite Element Method | Sobolev Spaces | |
| 31. | |
Finite Element Method | FEM - Implementation | |
| 32. | |
Finite Element Method | FEM - Implementation | |
| 33. | |
Finite Element Method | FEM for 2D Poissong Equation, ProgrammingWeak solutions | |
| 34. | |
Finite Element Method | Existence and Uniqueness of weak solutions | |
| 35. | |
Finite Element Method | Dirichlet Problem, Neumann Problem | |
| 36. | |
Finite Element Method | Minimization Problem, Discrete Problem | |
연관 자료
