MSc in Applicable Mathematics
Programme Code: TMAPMA
Full-year programme. Students must take courses to the value of four full units.
Paper |
Course number and title | |
---|---|---|
1 |
One from: |
|
|
Algorithms and Computation (H) | |
|
Advanced Algorithms (H) | |
2, 3 & 4 |
Three from: | |
| ||
Game Theory I (H)* | ||
Discrete Mathematics and Graph Theory (H) | ||
Continuous-Time Optimisation (H) | ||
Information, Communication and Cryptography (H) | ||
Probability and Measure (H) | ||
Functional Analysis and its Applications (H) | ||
Games of Incomplete Information (H) | ||
Stochastic Analysis (H) | ||
Preferences, Optimal Portfolio Choice, and Equilibrium (H) (n/a 15/16) | ||
Search Games (H) | ||
Quantifying Risk Modelling and Alternative Markets (H) | ||
Advanced Algorithms (H) (if not taken under Paper 1) | ||
5 & 6 |
Courses to the value of two half-units from: | |
|
Financial Risk Analysis (H) | |
Derivatives (H) | ||
Quantitative Methods for Finance and Risk Analysis (H)** | ||
Principles of Finance*** | ||
Econometric Analysis | ||
Advanced Microeconomics | ||
Social Choice Theory and Democracy (H) | ||
Combinatorial Optimisation (H) (formerly OR408) | ||
Auctions and Game Theory (H) (formerly OR409) | ||
Solving Unsolvable Problems: NP-completeness and how to cope with it (H) (formerly OR437) | ||
Techniques of Operational Research (H) (formerly OR401) | ||
Mathematical Programming: Theory and Algorithms (H) (formerly OR406) | ||
Modelling in Applied Statistics and Simulation (H) (formerly OR426) | ||
Model Building in Mathematical Programming (H) (formerly OR428) | ||
Stochastic Processes (H) | ||
Non-Linear Dynamics and the Analysis of Real Time Series (H) | ||
Time Series (H) | ||
|
Another half unit from the list under 2, 3 and 4 above, or any other paper with the approval of the Programme Director and the teacher responsible for the course. **** | |
7 |
Dissertation in Mathematics | |
Notes | ||
* This option will not be available to those who have already studied MA300 and MA301, or who have studied this subject as part of an undergraduate degree. |