| Date | Topics |
| Sept 3 | Introduction to Fourier analysis |
| Sept 5-10 | Roth's theorem: background and proof |
| Sept 12 | Varnavides's theorem |
| Sept 15 | Behrend's example |
| Sept 17-19 | Weyl equidistribution and Weyl differencing |
| Sept 21-Oct 3 | Freiman's theorem |
| Oct 6-8 | Balog-Szemerédi-Gowers theorem |
| Oct 10-17 | Gowers norms and Gowers uniformity |
| Oct 20-27 | Szemeredi's theorem for 4-term
progressions |
| Oct 29 | The Green-Tao theorem: an introduction |
| Oct 31- Nov 10 | Roth's theorem in sparse sets |
| Nov 12-17 | The Green-Tao theorem: selected parts
of the proof |
| Coming up next | The inverse Gowers norm conjecture |