Overview
In this course, you will investigate manifolds using the tools of analysis. In this setting, curvature and topology become crucial. The topics covered may include Riemann surfaces, Lie derivatives, Hodge theory, spectral theory on manifolds, comparison theorems, topics in mathematical physics, and geometric differential equations such as the minimal surface … For more content click the Read More button below.
Offerings
S2-01-CLAYTON-ON-CAMPUS
Rules
Enrolment Rule
Contacts
Chief Examiner(s)
Dr Julie Clutterbuck
Unit Coordinator(s)
Dr Julie Clutterbuck
Notes
IMPORTANT NOTICE:
Scheduled teaching activities and/or workload information are subject to change in response to COVID-19, please check your Unit timetable and Unit Moodle site for more details.
This unit is offered in alternate years commencing Semester 2, 2020
Learning outcomes
On successful completion of this unit, you should be able to:
1.
Apply sophisticated tools of mathematical analysis to understand manifolds in a variety of settings
2.
Demonstrate a profound understanding of connections between the geometry of a manifold, and the analytic properties of the manifold.
3.
Communicate complex information and results with clarity.
Teaching approach
Active learning
Assessment
1 - In-semester assessment
2 - Examination (3 hours and 10 minutes)
Scheduled and non-scheduled teaching activities
Applied sessions
Lectures
Workload requirements
Workload
Availability in areas of study
Master of Mathematics