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250179 PS Introductory seminar on Axiomatic set theory 1 (2021S)
Continuous assessment of course work
Labels
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 08.02.2021 00:00 to Th 25.02.2021 17:30
- Registration is open from Fr 26.02.2021 00:00 to Fr 30.04.2021 23:59
- Deregistration possible until We 30.06.2021 23:59
Details
max. 25 participants
Language: English
Lecturers
Classes (iCal) - next class is marked with N
The seminar will be held over Zoom. To obtain the link, visit the Moodle website of the course or write to <vera.fischer@univie.ac.at>.
Friday
05.03.
08:45 - 10:15
Digital
Friday
19.03.
08:45 - 10:15
Digital
Friday
26.03.
08:45 - 10:15
Digital
Friday
16.04.
08:45 - 10:15
Digital
Friday
23.04.
08:45 - 10:15
Digital
Friday
30.04.
08:45 - 10:15
Digital
Friday
07.05.
08:45 - 10:15
Digital
Friday
14.05.
08:45 - 10:15
Digital
Friday
21.05.
08:45 - 10:15
Digital
Friday
28.05.
08:45 - 10:15
Digital
Friday
04.06.
08:45 - 10:15
Digital
Friday
11.06.
08:45 - 10:15
Digital
Friday
18.06.
08:45 - 10:15
Digital
Friday
25.06.
08:45 - 10:15
Digital
Information
Aims, contents and method of the course
This seminar complements the lecture course "Axiomatic Set Theory I". Concepts and techniques introduced in this lecture course will be further studied and developed during the seminar. It is highly recommend to attend both courses.
Assessment and permitted materials
Class participation
Minimum requirements and assessment criteria
Examination topics
See contents of the lecture "Axiomatic Set Theory".
Reading list
1) T. Jech, "Set theory", The third millennium edition, revised and expanded. Springer Monographs in Mathematics. Springer-Verlag, Berlin, 2003. xiv+769 pp.
2) L. Halbeisen, "Combinatorial se theory. With a gentle introduction to forcing". Springer Monogrpahs in Mathematics. Springer, London, 2012. xvi+453 pp.
3) K. Kunen "Set theory", Studies in Logic (London), 34. College Publications, London, 2011, viii+401 pp.
2) L. Halbeisen, "Combinatorial se theory. With a gentle introduction to forcing". Springer Monogrpahs in Mathematics. Springer, London, 2012. xvi+453 pp.
3) K. Kunen "Set theory", Studies in Logic (London), 34. College Publications, London, 2011, viii+401 pp.
Association in the course directory
MLOM
Last modified: Th 25.02.2021 18:48