MAT4640 - Axiomatic Set Theory
Schedule, syllabus and examination date
Introduction to Zermelo-Fraenkel Set Theory and Gödel’s universe L of constructible sets.
The student will be aquainted with the Zermelo-Fraenkel axiom system ZFC for set theory with the axiom of choice and with how ZFC may serve as a formalization of mathematics.
In the first part, emphasis will be put on the well ordering concept, on ordinal numbers and transfinite recursion and induction and on the equivalence of the well ordering principle, the axiom of choice and Zorn’s lemma.
In the second part, an inner model for set theory, Gödel’s L, is studied, and L is used to verify certain consistency results for set theory, including the consistency of Cantor’s continuum hypothesis.
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Recommended previous knowledge
Some knowledge of first order logic will be an advantage, but it will be possible to follow the course for all master and Ph.D. students in mathematics.
- 10 credits overlap with MAT4610 - Axiomatic set theory (discontinued)
- 10 credits overlap with MAT9610 - Axiomatic set theory (discontinued)
- 10 credits overlap with MAT9640 - Axiomatic Set Theory
- 10 credits overlap with MA360
For information about the potential partial overlap with other courses, contact the Department.
3 hours per week throughout the semester.
One compulsory assignment needs to be passed. Final oral exam (counts 100% of the grade).
Examination support material
No examination support material is allowed.
Language of examination
Subjects taught in English will only offer the exam paper in English.
You may write your examination paper in Norwegian, Swedish, Danish or English.
Grades are awarded on a scale from A to F, where A is the best grade and F is a fail. Read more about the grading system.
Explanations and appeals
Resit an examination
Students who can document a valid reason for absence from the regular examination are offered a postponed examination at the beginning of the next semester.
Re-scheduled examinations are not offered to students who withdraw during, or did not pass the original examination.
Withdrawal from an examination
It is possible to take the exam up to 3 times. If you withdraw from the exam after the deadline or during the exam, this will be counted as an examination attempt.
Special examination arrangements
Application form, deadline and requirements for special examination arrangements.
The course is subject to continuous evaluation. At regular intervals we also ask students to participate in a more comprehensive evaluation.