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Online course materials for MATH38181

Extreme Values and Financial Risk


Unit code: MATH38181
Credit Rating: 10
Unit level: Level 3
Teaching period(s): Semester 1
Offered by School of Mathematics
Available as a free choice unit?: N

Requisites

Prerequisite

Additional Requirements

Please note.

Students are not permitted to take more than one of MATH38181 or MATH48181 for credit in the same or different undergraduate year.

 

Students are not permitted to take MATH48181 and MATH68181 for credit in an undergraduate programme and then a postgraduate programme.

 

Note that MATH68181 is an example of an enhanced level 3 module as it includes all the material from MATH38181

 

When a student has taken level 3 modules which are enhanced to produce level 6 modules on an MSc programme taken within the School of Mathematics, then they are limited to a maximum of two such modules (with no alternative arrangements available otherwise)

Aims

To introduce probabilistic fundamentals and some statistical models in extreme value theory with applications to finance.

Overview

The course will give some probabilistic and statistical details of univariate and bivariate extreme value theory. The topics covered will include: fundamental of univariate extreme value theory, the three extreme value distributions, various models for univariate extremes, fundamentals of bivariate extreme value theory, and various models for bivariate extremes. The course will contain a great deal material on applications of the models to finance. Software in R will be used.

Learning outcomes

On successful completion of this unit students will:

  • have some understanding of the probabilistic fundamentals of univariate and bivariate extreme value theory; and,
  • be able to choose and fit appropriate extreme value models for a given data (univariate and bivariate).

Assessment methods

  • Other - 20%
  • Written exam - 80%

Assessment Further Information

  • Coursework Weighting within unit 20%;
  • Two hours end of semester examination; weighting within unit 80%.

Syllabus

I plan to cover all of the following topics:

  • Fluctuations of univariate maxima: the theory [4]
  • Fluctuations of univariate upper order statistics: the theory [3]
  • A point process characterization for extreme values [3]
  • Some statistical models for univariate extremes [4]
  • Some models for bivariate extremes [4]

Recommended reading

  • Embrechts, P., Klüppelberg, C. and Mikosch, T. (1997) Modelling Extremal Events: for Insurance and Finance, Springer-Verlag, Berlin.
  • Leadbetter, M.R., Lindgren, G. and Rootz_en, H. (1983) Extremes and Related Properties of Random Sequences and Processes, Springer-Verlag, Berlin.
  • Resnick, S.I. (1987) Extreme values, Regular Variation and Point Processes, Springer-Verlag, Berlin.
  • Coles S. (2001) An Introduction to Statistical Modelling of Extreme Values, Springer-Verlag, London.
  • Kotz, S. and Nadarajah, S. (2000) Extreme Value Distributions: Theory and Applications, Imperial College Press, London.

Feedback methods

Feedback tutorials will provide an opportunity for students' work to be discussed and provide feedback on their understanding.  Coursework or in-class tests (where applicable) also provide an opportunity for students to receive feedback.  Students can also get feedback on their understanding directly from the lecturer, for example during the lecturer's office hour.
 

Study hours

  • Lectures - 22 hours
  • Tutorials - 11 hours
  • Independent study hours - 67 hours

Teaching staff

Saralees Nadarajah - Unit coordinator

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