Module overview
Linked modules
Pre-requisites: MATH2011 OR ECON2041
Aims and Objectives
Learning Outcomes
Learning Outcomes
Having successfully completed this module you will be able to:
- Classify a stochastic process according to whether it operates in continuous or discrete time and whether it has a continuous or a discrete state space, and give examples of each type of process
- Describe a time-inhomogeneous Markov chain and its simple applications
- Recall the definition and derive some basic properties of a Poisson process
- Derive the Kolmogorov equations for a Markov process with time independent and time/age dependent transition intensities
- Define and explain the basic properties of Brownian motion, demonstrate an understanding of stochastic differential equations and then to integrate, and apply the Ito formula
- Solve the Kolmogorov equations in simple cases
- Describe a Markov chain and its transition matrix
- Understand, in general terms, the principles of stochastic modelling
- Demonstrate how a Markov jump process can be simulated
- Determine the stationary and equilibrium distributions of a Markov chain
- State the Kolmogorov equations for a Markov process where the transition intensities depend not only on age/time, but also on the duration of stay in one or more states
- Understand survival, sickness and marriage models in terms of Markov processes
- Calculate the distribution of a Markov chain at a given time
- Demonstrate how a Markov chain can be simulated
- Understand the definition of a stochastic process and in particular a Markov process, a counting process and a random walk
- Classify the states of a Markov chain as transient, null, recurrent, positive recurrent, periodic, aperiodic and Ergodic
Syllabus
Learning and Teaching
Teaching and learning methods
| Type | Hours |
|---|---|
| Teaching | 48 |
| Independent Study | 102 |
| Total study time | 150 |
Resources & Reading list
Journal Articles
HICKMAN J C (1997). Introduction to actuarial modelling. North American Actuarial Journal, 1(3), pp. pg.1-5.
Textbooks
KARLIN S and TAYLOR A (1975). A first course in stochastic process. Academic Press.
BRZEZNIAK Z and ZASTAWNIAK T (1998). Basic Stochastic Processes: a course through exercises. Springer.
GRIMMETT G (1992). Probability and random processes: problems and solutions. Oxford University Press.
KULKARNI V G (1999). Modelling, analysis, design and control of stochastic systems. Springer.
GRIMMETT G and STIRZAKER D (2001). Probability and random processes. Oxford University Press.
Assessment
Summative
This is how we’ll formally assess what you have learned in this module.
| Method | Percentage contribution |
|---|---|
| Class Test | 10% |
| Written exam | 70% |
| Assignment | 20% |
Referral
This is how we’ll assess you if you don’t meet the criteria to pass this module.
| Method | Percentage contribution |
|---|---|
| Exam | 100% |
Repeat
An internal repeat is where you take all of your modules again, including any you passed. An external repeat is where you only re-take the modules you failed.
| Method | Percentage contribution |
|---|---|
| Exam | 100% |
Repeat Information
Repeat type: Internal & External