6 points, SCA Band 2, 0.125 EFTSL
Undergraduate, Postgraduate - Unit
Refer to the specific census and withdrawal dates for the semester(s) in which this unit is offered.
Faculty
Organisational Unit
School of Mathematical Sciences
Chief examiner(s)
Coordinator(s)
Unit guides
Notes
This unit is offered in alternate years commencing S2, 2019
Synopsis
This unit develops the main tools from algebra that are used to study and distinguish spaces. These tools are used in a variety of fields, from mathematics to theoretical physics to computer science. Algebraic topology relates to concrete problems, and sophisticated tools will be presented to tackle such problems. The core topics covered in the unit include the fundamental group and covering spaces, and homology. Cohomology and/or homotopy theory will also be studied.
Outcomes
On completion of this unit students will be able to:
- Demonstrate a profound understanding of the core concepts in algebraic topology.
- Formulate complex mathematical arguments in algebraic topology.
- Apply sophisticated tools of algebraic topology to tackle new problems.
- Communicate difficult mathematical concepts and arguments with clarity.
- Apply critical thinking to judge the validity of mathematical reasoning.
Assessment
NOTE: From 1 July 2019, the duration of all exams is changing to combine reading and writing time. The new exam duration for this unit is 3 hours and 10 minutes.
Examination (3 hours): 60% (Hurdle)
Continuous assessment: 40%
Hurdle requirement: To pass this unit a student must achieve at least 50% overall and at least 40% for the end-of-semester exam.
Workload requirements
- 3 hours of lectures and 1 hour tutorial per week
- 8 hours of independent study per week
See also Unit timetable information
This unit applies to the following area(s) of study
Master of Mathematics