- UCAS course code
- G104
- UCAS institution code
- M20
Course unit details:
Set Theory
Unit code | MATH43022 |
---|---|
Credit rating | 15 |
Unit level | Level 4 |
Teaching period(s) | Semester 2 |
Offered by | Department of Mathematics |
Available as a free choice unit? | Yes |
Overview
The study of abstract set theory was started by Georg Cantor who, whilst studying trigonometric series, came up against problems involving iterative processes which could be applied more than a finite number of times. Out of this work came the revolutionary idea of transfinite numbers, which could be used to compare the sizes of infinite sets. A naive approach to set theory leads to paradox and it was left to Zermelo to propose an axiomatic approach that puts set theory on a sound rigorous basis.
We will study Zermelo-Fraenkel axioms for set theory, and redo some of the material from the Mathematical Logic course in this formal setting. We will also look at the role of the Axiom of Choice, in both set theory and other parts of the mathematics.
We will then study cardinal arithmetic in some detail before moving on to some infinite combinatorics. The combinatorics will be applied to prove Silver's theorem, that the generalised continuum hypothesis cannot first fail at singular cardinals of uncountable cofinality.
Pre/co-requisites
Unit title | Unit code | Requirement type | Description |
---|---|---|---|
Algebraic Structures 1 | MATH20201 | Pre-Requisite | Compulsory |
Mathematical Logic | MATH33011 | Pre-Requisite | Compulsory |
Students are not permitted to take MATH43021 and MATH63021 for credit in an undergraduate programme and then a postgraduate programme.
Aims
To introduce students to set theory and its role and use in mathematics.
Learning outcomes
On completion of this course students will be familiar with:
- Formulate and prove basic properties of cardinality in ZF.
- Apply the axioms of ZF to construct ordinals and cardinals.
- Formulate and proof basic properties of cardinality in ZF.
- Distinguish those arguments which require the axiom of choice.
- Prove equivalences between various forms of the axiom of choice.
- Prove various inequalities in cardinal arithmetic.
- Apply various hypotheses to determine cardinal exponentials in certain cases.
- Prove basic results on clubs and stationary sets.
Syllabus
- Paradoxes and axioms [4]
- Well-orderings, ordinals and transfinite induction [6]
- The size of sets [4]
- The axiom of choice [3]
- Cardinal arithmetic [5]
- Clubs, stationary sets, and Silver's theorem. [5]
Assessment methods
Method | Weight |
---|---|
Other | 20% |
Written exam | 80% |
One coursework assessment; weighting 20% each
End of semester examination: weighting 80%
Feedback methods
Feedback tutorials will provide an opportunity for students' work to be discussed and provide feedback on their understanding. Coursework also provides an opportunity for students to receive feedback. Students can also get feedback on their understanding directly from the lecturer, for example during the lecturer's office hour.
Recommended reading
There is no recommended textbook for this course but the following text books cover much of the material.
- H.B. Enderton, elements of Set Theory, Academic Press.
- K. Ciesielski, Set Theory for the Working Mathematician, London Mathematical Society Student Texts.
- K. Hrbacek, T. Jech, Introduction to Set Theory, Chapman & Hall/CRC Pure and Applied Mathematics.
- Y.N. Moschovakis, Notes on Set Theory, Springer-Verlag Undergraduate Texts in Mathematics.
- K. Kunen, Foundation of Mathematics, College Publications.
Study hours
Scheduled activity hours | |
---|---|
Lectures | 26 |
Tutorials | 13 |
Independent study hours | |
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Independent study | 111 |
Teaching staff
Staff member | Role |
---|---|
Gareth Jones | Unit coordinator |
Additional notes
This course unit detail provides the framework for delivery in 20/21 and may be subject to change due to any additional Covid-19 impact.
Please see Blackboard / course unit related emails for any further updates