RIEMANNIAN GEOMETRY - 2018/9
Module code: MAT3044
The module introduces the subject of manifolds of dimension greater than two, with particular emphasis on manifolds which admit a metric which enables the measurement of distance. The course begins with the introduction of manifolds and metrics, with illustrative examples such as spheres, hyperbolic spaces, and Lie groups. The course continues with geodesics, isometries, covariant derivatives, the Levi Civita connection, and concludes with curvature and its properties.
PRINSLOO AH Dr (Maths)
Number of Credits: 15
ECTS Credits: 7.5
Framework: FHEQ Level 6
JACs code: G100
Module cap (Maximum number of students): N/A
Prerequisites / Co-requisites
Indicative content includes:
Manifolds and Vector Fields: (2.5 weeks) Abstract manifolds, with examples such as spheres and Lie groups. Tangent vectors and vector fields, integral curves. The vector field commutator and its geometric interpretation. Jacobi identity. Lie derivatives.
Metrics, geodesics and isometries: (2.5 weeks) Metrics and pull-back Metrics, with examples. Isothermal co-ordinates. Derivation of geodesic equations. Examples of isometries and application to solving the geodesic equations.
Covariant Derivative: (3 weeks) Aﬃne connections, torsion, Christoﬀel symbols, the Levi-Civita connection. Parallel transport with application to geodesics.
Curvature: (3 weeks) Curvature tensor, algebraic and geometric properties of Riemann curvature. Ricci tensor and scalar. Low dimensional examples, relation to Gauss curvature of surfaces in 3 dimensions. Curvature of hypersurfaces and Einstein manifolds.
|Assessment type||Unit of assessment||Weighting|
|School-timetabled exam/test||IN-SEMESTER TEST (50 MINS)||20|
The assessment strategy is designed to provide students with the opportunity to demonstrate
The ability to understand and formulate statements about the geometry of various surfaces in higher dimensional space.
A knowledge of the subject, important definitions, and concepts.
The ability to apply this knowledge to the analysis of unseen problems in the tests and the examination.
Thus, the summative assessment for this module consists of:
One two hour examination (the best three answers out of four questions contribute to the exam mark) at the end of Semester 2; worth 80% of the module mark.
One in-semester test, worth 20% of the module mark.
Formative assessment and feedback
There is feedback from marked coursework assignments over an 11 week period. Verbal feedback is provided by the lecturer during seminars, and also in office hours.
- Introduce students to the geometry of manifolds of dimension greater than two, with the added feature of a metric on the manifold.
- Introduce the students to the concepts of a covariant derivative and connection and their implications.
- Analysis of the above new concepts in the setting of examples like hypersurfaces, homogeneous spaces, and projective spaces.
|1||On successful completion of this module, students should understand the fundamental properties of Riemannian geometry, including the concept of a manifold, the use of a metric, the definition of a covariant derivative and its relation to a connection, the fundamental theory of Riemannian geometry, isometries, geodesics, parallel transport, and the various curvatures of a Riemannian manifold.||KC|
|2||On successful completion of the module the students should have a clear idea of how to implement the above theory in examples.||KCP|
C - Cognitive/analytical
K - Subject knowledge
T - Transferable skills
P - Professional/Practical skills
Overall student workload
Methods of Teaching / Learning
The learning and teaching strategy is designed to:
Be an introduction to the core ideas in Riemannian geometry, concentrating in particular on metric, covariant derivative, and curvature and how they can be used to identify properties and types of manifolds.
The learning and teaching methods include:
2x1 and 1x1 hour lectures per week, for 11 weeks, with typeset notes to complement the course, and Q+A opportunities for students.
4 dedicated lectures for example classes to discuss aspects of the examples and their solution.
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.
Reading list for RIEMANNIAN GEOMETRY : http://aspire.surrey.ac.uk/modules/mat3044
Programmes this module appears in
|Mathematics BSc (Hons)||2||Optional||A weighted aggregate mark of 40% is required to pass the module|
|Mathematics with Music BSc (Hons)||2||Optional||A weighted aggregate mark of 40% is required to pass the module|
|Mathematics with Statistics BSc (Hons)||2||Optional||A weighted aggregate mark of 40% is required to pass the module|
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 2018/9 academic year.