Stochastic Calculus
Postgraduate
Postgraduate
MATH 5019
Postgraduate
No
013105
4.5
No
The 2025 timetable is
not yet available.
School of Information Technology and Mathematical Sciences
Course Alert: This course is no longer available for enrolment
To introduce students to the fundamentals of stochastic calculus and its application to financial modelling.
Probability measure theory; stochastic processes; the Brownian motion and Diffusion Process Models; the Ito calculus; Ito's lemma; solution techniques; Jump-Diffusion Models; application to financial modelling; option pricing models under pure-diffusion and jump-diffusion, American style option pricing and interest rate modelling. Techniques and concepts such as change of numeraire, martingale representation and reflection principle will be covered.
Nil
Common to all relevant programs | |
---|---|
Subject Area & Catalogue Number | Course Name |
MATH 5040 | Statistical Foundations M |
Nil
Component | Duration | ||
---|---|---|---|
INTERNAL, CITY WEST | |||
Lecture | 3 hours x 13 weeks | ||
Tutorial | 1 hour x 12 weeks | ||
Directed Study (Meetings and activities as agreed with Course Coordinator) | N/A x 13 weeks |
Note: These components may or may not be scheduled in every study period. Please refer to the timetable for further details.
Assignment 1, Assignment 2, Final examination
EFTSL*: 0.125
Commonwealth Supported program (Band 1)
To determine the fee for this course as part of a Commonwealth Supported program, go to:
How to determine your Commonwealth Supported course fee. (Opens new window)
Fee-paying program for domestic and international students
International students and students undertaking this course as part of a postgraduate fee paying program must refer to the relevant program home page to determine the cost for undertaking this course.
Non-award enrolment
Non-award tuition fees are set by the university. To determine the cost of this course, go to:
How to determine the relevant non award tuition fee. (Opens new window)
Not all courses are available on all of the above bases, and students must check to ensure that they are permitted to enrol in a particular course.
* Equivalent Full Time Study Load. Please note: all EFTSL values are published and calculated at ten decimal places. Values are displayed to three decimal places for ease of interpretation.