| SES # | TOPICS |
|---|---|
| 1 | The Basic Setting: Universal Domains |
| 2 | Extraction of Indiscernible Sequences (Taught by David K. Milovich) |
| 3 | Dividing and its Basic Properties |
| 4 | Simplicity Statement of the Properties of Independence Morley Sequences Proof of Symmetry and Transitivity from Extension |
| 5 | Thickness Total D-rank and Extension |
| 6 | Lascar Strong Types and the Independence Theorem (Partially taught by Christina Goddard) |
| 7 | Examples: Hilbert Spaces, Hyperimaginary Sorts (Taught by Josh Nichols-Barrer) |
| 8 | Generically Transitive Relations Amalgamation Bases, Parallelism and Canonical Bases |
| 9 | Characterisation of Simplicity and Non-dividing in Terms of Abstract Notion of Independence (Taught by Cameron Freer) |
| 10 | Supersimplicity Lascar Inequalities Stability |
| 11-12 | Stable Theories with a Generic Automorphism |
| 13-14 | Groups: Stratified Ranks, Generic Elements and Types Connected Components, Stabilisers |
| 15-16 | Lovely Pairs |
