GEOMETRIC MECHANICS - 2022/3
Module code: MATM032
In light of the Covid-19 pandemic the University has revised its courses to incorporate the ‘Hybrid Learning Experience’ in a departure from previous academic years and previously published information. The University has changed the delivery (and in some cases the content) of its programmes. Further information on the general principles of hybrid learning can be found at: Hybrid learning experience | University of Surrey.
We have updated key module information regarding the pattern of assessment and overall student workload to inform student module choices. We are currently working on bringing remaining published information up to date to reflect current practice in time for the start of the academic year 2021/22.
This means that some information within the programme and module catalogue will be subject to change. Current students are invited to contact their Programme Leader or Academic Hive with any questions relating to the information available.
This module applies Lagrangian and Hamiltonian dynamics to physical systems with symmetry.
BRIDGES Tom (Maths)
Number of Credits: 15
ECTS Credits: 7.5
Framework: FHEQ Level 7
JACs code: G130
Module cap (Maximum number of students): N/A
Overall student workload
Independent Learning Hours: 117
Lecture Hours: 33
Prerequisites / Co-requisites
MAT3008/MAT3031 Lagrangian and Hamiltonian Dynamics
Topics covered will include some or all of:
Elements of multi-linear algebra, differential geometry and Lie group actions.
Euler-Poincaré variational principles (with and without symmetry breaking)
Legendre transform and symplectic spaces
Conservation laws: momentum maps and Noether's theorem
Lie-Poisson structures (with and without symmetry breaking)
Applications: rigid bodies, heavy tops, quantum dynamics, magnetic fields, etc.
Infinite dimensions: diffeomorphism groups and applications to fluids/plasmas
|Assessment type||Unit of assessment||Weighting|
|School-timetabled exam/test||CLASS TEST||20|
|Examination||EXAMINATION (2 HOURS)||80|
The assessment strategy is designed to provide students with the opportunity to demonstrate:
Understanding of fundamental concepts and ability to develop and apply them to a new context.
Subject knowledge through recall of key definitions, formulae and derivations.
Analytical ability through the solution of unseen problems in the test and examination.
Thus, the summative assessment for this module consists of:
One two hour examination at the end of the semester, worth 80% of the overall module mark
two fifty minute class tests, the first worth 10% and the second worth 10%
Formative assessment and feedback
Students receive written feedback via the marked class tests. The solutions to the class tests are also reviewed in the lecture. Un-assessed courseworks are also assigned to the students, and a sketch of solutions to these are provided. Verbal feedback is provided during lectures and office hours.
- The module aims to extend students' knowledge of mechanics by considering systems with symmetry and their conservation laws.
|1||Demonstrate understanding of mechanical systems on Lie groups, along with their symmetry properties.||K|
|2||Interpret and apply variational principles in mechanics, and quote and apply the Euler-Poincare reduction theorem.||KCT|
|3||Calculate momentum maps, and prove/disprove their conservation using symmetry arguments.||KC|
C - Cognitive/analytical
K - Subject knowledge
T - Transferable skills
P - Professional/Practical skills
Methods of Teaching / Learning
Teaching is by lectures, 3 hours per week for 11 weeks. Extensive notes are provided.
Learning takes place through lectures, exercises and class tests.
Indicated Lecture Hours (which may also include seminars, tutorials, workshops and other contact time) are approximate and may include in-class tests where one or more of these are an assessment on the module. In-class tests are scheduled/organised separately to taught content and will be published on to student personal timetables, where they apply to taken modules, as soon as they are finalised by central administration. This will usually be after the initial publication of the teaching timetable for the relevant semester.
Upon accessing the reading list, please search for the module using the module code: MATM032
Please note that the information detailed within this record is accurate at the time of publishing and may be subject to change. This record contains information for the most up to date version of the programme / module for the 2022/3 academic year.