A solutions manual for Set Theory by Thomas Jech
GitHub repository here, HTML versions here, and PDF version here.
Contents
Part I: Basic Set Theory
- Axioms of Set Theory
- Ordinal Numbers
- Cardinal Numbers
- Real Numbers wip
- The Axiom of Choice and Cardinal Arithmetic
- The Axiom of Regularity
- Filters, Ultrafilters and Boolean Algebras
- Stationary Sets
- Combinatorial Set Theory
- Measurable Cardinals
- Borel and Analytic Sets
- Models of Set Theory
Part II: Advanced Set Theory
- Constructible Sets
- Forcing
- Applications of Forcing
- Iterated Forcing and Martin’s Axiom
- Large Cardinals
- Large Cardinals and \(L\)
- Iterated Ultrapowers and \(L[U]\)
- Very Large Cardinals
- Large Cardinals and Forcing
- Saturated Ideals
- The Nonstationary Ideal
- The Singular Cardinal Problem
- Descriptive Set Theory
- The Real Line
Part III: Selected Topics
- Combinatorial Principles in \(L\)
- More Applications of Forcing
- More Combinatorial Set Theory
- Complete Boolean Algebras
- Proper Forcing
- More Descriptive Set Theory
- Determinacy
- Supercompact Cardinals and the Real Line
- Inner Models for Large Cardinals
- Forcing and Large Cardinals
- Martin’s Maximum
- More on Stationary Sets