250100 VO Axiomatic set theory 1 (2022S)
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Details
Language: English
Examination dates
Lecturers
Classes (iCal) - next class is marked with N
Tuesday
01.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
03.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
08.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
10.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
15.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
17.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
22.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
24.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
29.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
31.03.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
05.04.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
07.04.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
26.04.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
28.04.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
03.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
05.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
10.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
12.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
17.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
19.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
24.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
31.05.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
02.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
09.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
14.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
21.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
23.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Tuesday
28.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Thursday
30.06.
09:45 - 11:15
Seminarraum 10, Kolingasse 14-16, OG01
Information
Aims, contents and method of the course
Assessment and permitted materials
Regular class participation in the form of assignments or final exam.
Minimum requirements and assessment criteria
Examination topics
The material covered in the lectures.
Reading list
1) Lecture notes of the course.
2) T. Jech, "Set theory", The third millennium edition, revised and expanded. Springer Monographs in Mathematics. Springer-Verlag, Berlin, 2003. xiv+769 pp.
3) L. Halbeisen, "Combinatorial se theory. With a gentle introduction to forcing". Springer Monographs in Mathematics. Springer, London, 2012. xvi+453 pp.
4) K. Kunen "Set theory", Studies in Logic (London), 34. College Publications, London, 2011, viii+401 pp.
2) T. Jech, "Set theory", The third millennium edition, revised and expanded. Springer Monographs in Mathematics. Springer-Verlag, Berlin, 2003. xiv+769 pp.
3) L. Halbeisen, "Combinatorial se theory. With a gentle introduction to forcing". Springer Monographs in Mathematics. Springer, London, 2012. xvi+453 pp.
4) 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 18.08.2022 17:28
Gödel's constructible universe, Martin's axioms, some infinitary combinatorics and the method of forcing. In particular, we will establish the independence of the Continuum Hypothesis from the usual axioms of set theory.