MA418 Half Unit
Preferences, Optimal Portfolio Choice, and Equilibrium
This information is for the 2018/19 session.
Dr Albina Danilova
This course is available on the MSc in Applicable Mathematics and MSc in Financial Mathematics. This course is available with permission as an outside option to students on other programmes where regulations permit.
Students must have completed either Stochastic Processes (ST409) or Probability and Measure (MA411) or The Mathematics of the Black and Scholes Theory (MA415).
This course is concerned with the theory of optimal investment and consumption. The course starts with the derivation of utility functions from the axioms of an agent's preferences. Utility functions are then used as a measure of portfolio performance in a financial market. Optimal investment and consumption strategies are obtained for various utility functions in both complete and some types of incomplete markets. Equilibrium and asset price formation are considered in the context of complete and informationally incomplete markets
20 hours of lectures and 10 hours of seminars in the LT.
R.A.Dana and M.Jeanblanc, Financial Markets in Continuous Time; Springer; I D.Duffie, Dynamic Asset Pricing, Princeton University Press; I.Karatzas and S.E.Shreve, Methods of Mathematical Finance, Springer.
Exam (100%, duration: 3 hours) in the summer exam period.
Total students 2017/18: 2
Average class size 2017/18: 2
Controlled access 2017/18: No
Value: Half Unit
Personal development skills
- Problem solving
- Application of information skills
- Application of numeracy skills
- Specialist skills