Exam information
The exam is on Monday 08.12. in two different locations. Make sure to check which location you are assigned to. It will take place 9:00-13:00 and there are no tools or notes allowed.
The course was based on the lecture notes here. For a precise syllabus of which sections were covered in the course, refer to the schedule.
Among others, we have learned about the following notions:
- Topologies and bases
- Product, subspace and quotient topologies
- Metric spaces
- Continuity
- Homeomorphisms and embeddings
- Open, closed and quotient maps
- Limits of sequences
- Closure, interior and boundary
- Separation axioms (Hausdorff, regular, normal)
- Compactness and local compactness
- Connectedness and pathconnectedness
The exam problems will cover a wide selection of those (excluding manifolds and the fundamental group). Make sure you know how these things are defined and relate to each other, and can work with them rigorously.
The exercises we did from Munkres' book, as well as the mandatory assignment, should be good preparation. In addition, some exams from previous semesters can be found here, here and here.