250098 PS Introductory seminar on mathematical logic (2021W)
Continuous assessment of course work
Labels
MIXED
Registration/Deregistration
Note: The time of your registration within the registration period has no effect on the allocation of places (no first come, first served).
- Registration is open from Mo 13.09.2021 00:00 to Mo 27.09.2021 23:59
- Deregistration possible until Su 31.10.2021 23:59
Details
max. 25 participants
Language: English
Lecturers
Classes (iCal) - next class is marked with N
- Wednesday 06.10. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 13.10. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 20.10. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 27.10. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 03.11. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 10.11. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 17.11. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 24.11. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 01.12. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 15.12. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 12.01. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 19.01. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
- Wednesday 26.01. 09:45 - 11:15 Seminarraum 10, Kolingasse 14-16, OG01
Information
Aims, contents and method of the course
This is the discussion section which complements the lecture portion of the introduction to mathematical logic course. We will be discussing weekly problem sets which relate to, expand upon, and reinforce the content of the lecture. Students are strongly encouraged to sign up for the accompanying lecture course.
Assessment and permitted materials
You will have to indicate each week which problems you completed. Also you will have to present your solution to the class at least twice in the semester.
Minimum requirements and assessment criteria
The grade is based primarily on active participation in the discussion section. Also taken into account: quality of presentation and number of problems completed.
Examination topics
The types of problems discussed in this course will be relevant for the exam in the lecture portion of the course.
Reading list
We will roughly be following A. Tserunyann's lecture notes: https://www.math.mcgill.ca/atserunyan/Teaching_notes/logic_lectures.pdf
More references will be provided during the course of the semester.
More references will be provided during the course of the semester.
Association in the course directory
MLOL
Last modified: We 29.09.2021 14:09