MA322 Half Unit
Mathematics of Finance and Valuation
This information is for the 2024/25 session.
Teacher responsible
Dr Arne Lokka COL.4.08
Availability
This course is available on the BSc in Financial Mathematics and Statistics, BSc in Mathematics and Economics, BSc in Mathematics with Data Science and BSc in Mathematics with Economics. This course is available as an outside option to students on other programmes where regulations permit. This course is available with permission to General Course students.
Pre-requisites
Students must have completed Measure Theoretic Probability (MA321).
Course content
This course provides mathematical tools of stochastic calculus and develops the Black-Scholes theory of financial markets. It covers the following topics. Continuous-time stochastic processes, filtrations, stopping times, martingales, examples. Brownian motion and its properties. Construction of the Ito integral: simple integrands, Ito's isometry. Ito processes, Ito's formula, stochastic differential equations, Girsanov's theorem. Black-Scholes model: self-financing portfolios, risk neutral measure, risk neutral valuation of European contingent claims, Black-Scholes formula, Black-Scholes PDE, the Greeks. PDE techniques for derivative pricing. Implied volatility, basic ideas of calibration.
Teaching
This course is delivered through a combination of classes and lectures totalling a minimum of 30 hours across Winter Term.
Formative coursework
Written answers to set problems will be expected on a weekly basis.
Indicative reading
Lecture notes will be provided.
The following books may be useful.
T. Bjork, Arbitrage Theory in Continuous Time, Oxford Finance, 2004;
A. Etheridge, A Course in Financial Calculus, CUP, 2002;
M Baxter & A Rennie, Financial Calculus, CUP, 1996;
P. Wilmott, S. Howison & J. Dewynne, The Mathematics of Financial Derivatives, CUP, 1995;
J Hull, Options, Futures and Other Derivatives, 6th edition, Prentice-Hall, 2005.
D. Lamberton & B. Lapeyre, Introduction to stochastic calculus applied to finance, 2nd edition, Chapman & Hall, 2008.
S. E. Shreve, Stochastic Calculus for Finance. Volume I: The Binomial Asset Pricing Model. Springer, New York, 2004.
S. E. Shreve, Stochastic Calculus for Finance. Volume II: Continuous-Time Models. Springer, New York, 2004.
Assessment
Exam (100%, duration: 2 hours) in the spring exam period.
Key facts
Department: Mathematics
Total students 2023/24: 17
Average class size 2023/24: 9
Capped 2023/24: No
Value: Half Unit
Course selection videos
Some departments have produced short videos to introduce their courses. Please refer to the course selection videos index page for further information.
Personal development skills
- Self-management
- Problem solving
- Communication
- Application of numeracy skills
- Specialist skills