Perturbation theory and calculus of variations (840G1)
15 credits, Level 6
The aim of this module is to introduce you to a variety of techniques primarily involving ordinary differential equations, that have applications in various branches of applied mathematics. No particular application is emphasised.
Topics covered include –
Dimensional analysis and scaling:
- physical quantities and their measurement
- change of units
- physical laws
- Buckingham Pi Theorem
Regular perturbation methods:
- direct method applied to algebraic equations and initial value problems (IVP)
- Poincar method for periodic solutions
- validity of approximations.
Singular perturbation methods:
- finding approximate solutions to algebraic solutions
- finding approximate solutions to boundary value problems (BVP) including boundary layers and matching.
Calculus of Variations:
- necessary conditions for a function to be an extremal of a fixed or free end point problem involving a functional of integral form
- isoperimetric problems.
Teaching and assessment
We’re currently reviewing teaching and assessment of our modules in light of the COVID-19 situation. We’ll publish the latest information as soon as possible.
Contact hours and workload
This module is approximately 150 hours of work. This breaks down into about 33 hours of contact time and about 117 hours of independent study. The University may make minor variations to the contact hours for operational reasons, including timetabling requirements.
This module is running in the academic year 2020/21. We also plan to offer it in future academic years. However, there may be changes to this module in response to COVID-19, or due to staff availability, student demand or updates to our curriculum. We’ll make sure to let our applicants know of material changes to modules at the earliest opportunity.
It may not be possible to take some module combinations due to timetabling constraints. The structure of some courses means that the modules you choose first may determine whether later modules are core or optional.
This module is offered on the following courses: