2019: Permutation Models
Here are the recorded lectures from the Mastermath course in Set Theory (autumn 2019) about permutation
models and the consistency of the negation of the Axiom of Choice.
(Also available for binge-watching in
a virtual box-set on YouTube.)
- 2019-11-18: Introduction
- Set theory with atoms; permutations and symmetric sets.
The first Fraenkel model.
- 2019-11-25: Three models
- The Basic Fraenkel model: an infinite Dedekind-finite set.
The Second Fraenkel model: a sequence of pairs without a choice function.
The ordered Mostowski model: a model where AC fails yet every set admits
a linear order.
Here is Russell's
paper, which contains his "Paradox" (p. 32) and the example of the
pairs of boots (p. 47).
- 2019-12-02: Global linear order; how to make the models
- Proof that the ordered Mostowski model has a global linear order.
How to make models with atoms using ZF(C).
- 2019-12-09: How to make models for ZF without AC.
- The Jech-Sochor embedding theorem with a very superficial
description of forcing.
Start of the proof that in the ordered Mostowski model there is no
`cardinality function'.
- 2019-12-16: Last lecture
- Finishing the proof started in the previous lecture and indeed the course
K_dot_P_dot_Hart_at_TUDelft_dot_nl
Last modified: Wednesday 10-04-2024 at 22:41:38 (CEST)