For more details on the courses, please refer to the Course Catalog
| Code | Course Title | Credit | Learning Time | Division | Degree | Grade | Note | Language | Availability |
|---|---|---|---|---|---|---|---|---|---|
| MTH4016 | Math Co-op I | 1 | 2 | Major | Bachelor/Master |
3-4
1-4 |
- | No | |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 2 weeks ) | |||||||||
| MTH4016 | Math Co-op I | 1 | 2 | Major | Bachelor/Master |
3-4
1-4 |
Mathematics | - | No |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 2 weeks ) | |||||||||
| MTH4017 | Math Co-op II | 2 | 4 | Major | Bachelor/Master |
3-4
1-4 |
- | No | |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 4 weeks ) | |||||||||
| MTH4017 | Math Co-op II | 2 | 4 | Major | Bachelor/Master |
3-4
1-4 |
Mathematics | - | No |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 4 weeks ) | |||||||||
| MTH4018 | Math Co-op III | 3 | 6 | Major | Bachelor/Master |
3-4
1-4 |
Korean | Yes | |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 6 weeks ) | |||||||||
| MTH4018 | Math Co-op III | 3 | 6 | Major | Bachelor/Master |
3-4
1-4 |
Mathematics | Korean | Yes |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 6 weeks ) | |||||||||
| MTH4019 | Math Co-op IV | 4 | 8 | Major | Bachelor/Master |
3-4
1-4 |
- | No | |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 8 weeks ) | |||||||||
| MTH4019 | Math Co-op IV | 4 | 8 | Major | Bachelor/Master |
3-4
1-4 |
Mathematics | - | No |
| Field practice to utilize mathematical knowledge for the real world problems. ( for 8 weeks ) | |||||||||
| MTH4020 | Financial Mathematics | 3 | 6 | Major | Bachelor/Master | 1-4 | Korean | Yes | |
| 1: This course is a graduate-level introduction to Portfolio Theory, Option Pricing, Risk Management, Fixed Income Markets, and Credit Risk Theory. 2: This course is also an introduction to Stochastic Differential Equations, Numerical Stochastic Differential Equations, and Stochastic Numerical Optimization. | |||||||||
| MTH4020 | Financial Mathematics | 3 | 6 | Major | Bachelor/Master | 1-4 | Mathematics | Korean | Yes |
| 1: This course is a graduate-level introduction to Portfolio Theory, Option Pricing, Risk Management, Fixed Income Markets, and Credit Risk Theory. 2: This course is also an introduction to Stochastic Differential Equations, Numerical Stochastic Differential Equations, and Stochastic Numerical Optimization. | |||||||||
| MTH4023 | Applications of Partial Differential Equations | 3 | 6 | Major | Bachelor/Master | 1-4 | Korean | Yes | |
| foundations of the modern theories of partial differential equations: introduction, Hadamard's counter example, Laplace's equation, mean value theorem and its application, energy method, heat equation, wave equation, nonlinear first order equations, the Hamilton-Jacobi equation, representation of solutions, Fourier transform, hodograph transform, the Laplace method, analytic functions and the Cauchy-Lovalevsky theorem, theory of the Sobolev spaces, the Gagliardo-Nirenberg-Sobolev inequality, imbedding theorems, the Poincare inequality. We study deeper theories as well as more recent topics: harmonic analysis and its applications to PDE, theory of pseudodifferential operators, microlocal analysis,propagation of singularities, Bony's theory of pradifferential operators. wavelet theory and applications. | |||||||||
| MTH4023 | Applications of Partial Differential Equations | 3 | 6 | Major | Bachelor/Master | 1-4 | Mathematics | Korean | Yes |
| foundations of the modern theories of partial differential equations: introduction, Hadamard's counter example, Laplace's equation, mean value theorem and its application, energy method, heat equation, wave equation, nonlinear first order equations, the Hamilton-Jacobi equation, representation of solutions, Fourier transform, hodograph transform, the Laplace method, analytic functions and the Cauchy-Lovalevsky theorem, theory of the Sobolev spaces, the Gagliardo-Nirenberg-Sobolev inequality, imbedding theorems, the Poincare inequality. We study deeper theories as well as more recent topics: harmonic analysis and its applications to PDE, theory of pseudodifferential operators, microlocal analysis,propagation of singularities, Bony's theory of pradifferential operators. wavelet theory and applications. | |||||||||
| MTH4024 | Probability and Statistics | 3 | 6 | Major | Bachelor/Master | 1-4 | Korean | Yes | |
| Probability and Statistical methods are dealt with based on a sound understanding of mathematical statistics and mathematical tools. Probability Space, Random variables, Independence, Expectation, Convergence of random variables, Characteristic functions. | |||||||||
| MTH4024 | Probability and Statistics | 3 | 6 | Major | Bachelor/Master | 1-4 | Mathematics | Korean | Yes |
| Probability and Statistical methods are dealt with based on a sound understanding of mathematical statistics and mathematical tools. Probability Space, Random variables, Independence, Expectation, Convergence of random variables, Characteristic functions. | |||||||||
| MTH4025 | Real Analysis 1 | 3 | 6 | Major | Bachelor/Master | 1-4 | Korean | Yes | |
| Main subjects are the basic concepts of real analysis: uniform convergence, Riemann integration, Lebesgue measure, Lebesgue integral, differentiation of an integration, classical Banach spaces and convergence of the seguence of functions. | |||||||||