Financial Mathematics

6 EC

Semester 2, period 4, 5

5122FIWI6Y

Owner Bachelor Wiskunde
Coordinator dr. Robin de Vilder
Part of Exchange Programme Faculty of Science, specialisation BSc Mathematics, year 1Bachelor Wiskunde, year 3

Course manual 2018/2019

Course content

We will obtain insight into the mathematical structure of financial products such as futures, options and other derivatives. We will both deal with the discrete (Cox, Ross and Rubenstein) and continuous models (Black and Scholes).  We will also treat time series models such as GARCH. Special attention will be given to the role of volatility in financial processes. The course is both theoretical and practical and aims to give a broad view of the field of financial mathematics.

Study materials

Literature

  • J.Hull, 'Options, Futures, and Other Derivatives'

  • Etheridge, 'A Course in Financial Calculus'

Software

  • Matlab

Objectives

  • The student understands at the end of the course the working of financial markets from a technical view point
  • The student understands the working of basic models to value options and other derivatives in detail (i.e. Cox, Ross and Rubenstein and Black and Scholes)
  • The student understands the role of arbitrage in financial processes
  • The student understands Ito's lemma
  • The student understands Call and put options as well as the Greeks
  • The student understands the role of stochastics in financial processes
  • The student understands basic risk models and popular time-series models
  • The student knows what volatility means in a detailed fashion

Teaching methods

  • Hoorcollege
  • Werkcollege
  • Computer lab session/practical training
  • Lecture
  • Seminar

The theory is explained at the plenary sessions. Here the structure of the theory is revealed and it is shown what the underlying ideas are.  During the practical classes the assignments will be discussed and students will be helped with completing their homework.

Learning activities

Activiteit

Aantal uur

Hoorcollege

30

Tentamen

3

Werkcollege

22

Zelfstudie

113

Attendance

Programme's requirements concerning attendance (OER-B):

  • Each student is expected to actively participate in the course for which he/she is registered.
  • If a student can not be present due to personal circumstances with a compulsory part of the programme, he / she must report this as quickly as possible in writing to the relevant lecturer and study advisor.
  • It is not allowed to miss obligatory parts of the programme's component if there is no case of circumstances beyond one's control.
  • In case of participating qualitatively or quantitatively insufficiently, the examiner can expel a student from further participation in the programme's component or a part of that component. Conditions for sufficient participation are stated in advance in the course manual and on Canvas.
  • In the first and second year, a student should be present in at least 80% of the seminars and tutor groups. Moreover, participation to midterm tests and obligatory homework is required. If the student does not comply with these obligations, the student is expelled from the resit of this course. In case of personal circumstances, as described in OER-A Article 6.4, an other arrangement will be proposed in consultation with the study advisor.

Additional requirements for this course:

If the result of the homework is much better than the exam it could be decided to have an extra oral exam.

Assessment

Item and weight Details

Final grade

0.7 (70%)

Tentamen

0.3 (30%)

Huiswerk

At the exam students can use a basic calculator.

Inspection of assessed work

The manner of inspection will be communicated via the digitial learning environment.

Fraud and plagiarism

The 'Regulations governing fraud and plagiarism for UvA students' applies to this course. This will be monitored carefully. Upon suspicion of fraud or plagiarism the Examinations Board of the programme will be informed. For the 'Regulations governing fraud and plagiarism for UvA students' see: www.student.uva.nl

Course structure

Weeknummer Onderwerpen Studiestof
1 introduction JH, chapter 1
2 hedging JH, chapter 3
3 financial techniques JH, chapters 4,5
4 options JH, chapters 9,10,11
5 binary options JH, ch 12
6 continuous options JH, ch 13,14
7 single period model AE, ch3
8 binomial trees and discrete parameter martingales AE, ch2
9 Brownian motion AE, ch3
10 stochastic calculus AE, ch4
11 the Black-Scholes model AE, ch5
12 the greeks JH, ch18
13 volatility smiles JH, ch19
14 value at risk JH, ch 21
15 wrap up JH
16 wrap up AE

 

Timetable

The schedule for this course is published on DataNose.

Additional information

Recommended prerequisites: Measure Theory.

Processed course evaluations

Below you will find the adjustments in the course design in response to the course evaluations.

Contact information

Coordinator

  • dr. Robin de Vilder

lecture: dr. Robin de Vilder (r.g.devilder@uva.nl)

seminar and for handing in homework: Victor Harmsen (victor.harmsen@deepbluecap.com)