MAS8384 : Bayesian Methodology
MAS8384 : Bayesian Methodology
- Offered for Year: 2024/25
- Module Leader(s): Dr Clement Lee
- Owning School: Mathematics, Statistics and Physics
- Teaching Location: Newcastle City Campus
Semesters
Your programme is made up of credits, the total differs on programme to programme.
Semester 2 Credit Value: | 10 |
ECTS Credits: | 5.0 |
European Credit Transfer System | |
Pre-requisite
Modules you must have done previously to study this module
Pre Requisite Comment
N/A
Co-Requisite
Modules you need to take at the same time
Code | Title |
---|---|
MAS8404 | Statistical Learning for Data Science |
Co Requisite Comment
N/A
Aims
Bayesian inference provides an ideal approach for synthesizing information from different sources in a coherent way. In recent years great advances have been made in the application of Bayesian statistical inference to problems across a wide variety of areas within industry, such as drug development, voice recognition and credit card fraud detection. This has been made possible by the development of computational algorithms which allow posterior distributions to be found in complicated models. This module starts with an introduction to the principles of Bayesian inference before moving on to address the fundamental practical problem of calculating the posterior distribution for complex models. The theory behind some modern Bayesian computational methods, which provide a simulation-based solution, is developed and put into practice using R.
Specifically, the module aims to equip students with the following knowledge and skills:
- To gain an understanding of the principles of the Bayesian approach to inference and experience in the application of Bayes rule to update a prior distribution to a posterior distribution using a likelihood function.
- To gain an understanding of the theory behind some modern Bayesian computational methods for approximating a posterior distribution and practical experience of their application in R to solve a variety of applied problems.
Outline Of Syllabus
- Conjugate Bayesian inference
- Non-conjugate models
- Markov chain Monte Carlo (MCMC): methods such as Gibbs sampling, Metropolis-Hastings sampling, slice sampling; assessment of mixing and convergence
- Posterior summaries
- Applications, such as linear models, generalized linear models, mixture models, hidden Markov models, dynamic linear models, Gaussian process regression
- Computation using R and R packages such as rjags
Learning Outcomes
Intended Knowledge Outcomes
At the end of the module, students will be able to explain the fundamental ideas behind Bayesian inference and how it differs from frequentist inference; apply Bayes theorem to update a prior distribution to a posterior distribution using a likelihood function, including exact calculation in conjugate problems; explain the theoretical underpinning of MCMC methods; calculate full conditional distributions in non-conjugate problems.
Intended Skill Outcomes
At the end of the module, students will be able to:
- write functions to implement basic MCMC algorithms in R;
- apply software for MCMC sampling to perform analysis for a variety of models;
- diagnose mixing and convergence of MCMC samplers.
Teaching Methods
Teaching Activities
Category | Activity | Number | Length | Student Hours | Comment |
---|---|---|---|---|---|
Scheduled Learning And Teaching Activities | Lecture | 6 | 3:00 | 18:00 | Present in person lectures |
Guided Independent Study | Assessment preparation and completion | 1 | 12:00 | 12:00 | Formative exercise |
Scheduled Learning And Teaching Activities | Practical | 6 | 2:00 | 12:00 | Present in person structured synchronous practical |
Guided Independent Study | Project work | 1 | 42:00 | 42:00 | Main project |
Scheduled Learning And Teaching Activities | Drop-in/surgery | 4 | 1:00 | 4:00 | Present in person drop-in |
Guided Independent Study | Independent study | 6 | 2:00 | 12:00 | Lecture follow up/background reading |
Total | 100:00 |
Teaching Rationale And Relationship
Lectures and set reading are used for the delivery of theory and explanation of methods, illustrated with examples. Practicals are used both for solution of problems and work requiring extensive computation and to give insight into the ideas/methods studied. There are two present-in-person practical sessions per week to ensure rapid feedback on understanding. Scheduled present-in-person drop-ins provides opportunity for students to ask questions and receive immediate feedback.
Reading Lists
Assessment Methods
The format of resits will be determined by the Board of Examiners
Other Assessment
Description | Semester | When Set | Percentage | Comment |
---|---|---|---|---|
Report | 2 | M | 100 | Main module project |
Zero Weighted Pass/Fail Assessments
Description | When Set | Comment |
---|---|---|
Oral Presentation | M | A 3 min video articulating the main findings of one aspect of the coursework report |
Formative Assessments
Formative Assessment is an assessment which develops your skills in being assessed, allows for you to receive feedback, and prepares you for being assessed. However, it does not count to your final mark.
Description | Semester | When Set | Comment |
---|---|---|---|
Practical/lab report | 2 | M | A compulsory report allowing students to develop problem solving techniques, to practise the methods learnt and to assess progress |
Assessment Rationale And Relationship
A compulsory formative practical report allows the students to develop their problem solving techniques, to practise the methods learnt in the module, to assess their progress and to receive feedback, before the summative assessments.
The oral presentation encourages students to focus on interpretation of statistical results, builds their skills in the presentation of statistical concepts, and provides opportunity for feedback.
In a foundational subject like the Mathematical Sciences, there is research evidence to suggest that continual consolidation of learning is essential and the fewer pieces of assessment there are, the more difficult it is to facilitate this. On this module, it is particularly important that the material on the earlier summative assessment is fully consolidated, before the later assessment is attempted.
Timetable
- Timetable Website: www.ncl.ac.uk/timetable/
- MAS8384's Timetable
Past Exam Papers
- Exam Papers Online : www.ncl.ac.uk/exam.papers/
- MAS8384's past Exam Papers
General Notes
N/A
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