| Lecture no. | Date | Topic | Chapter in Spivak |
| 1 | 18/1 | topological manifolds | I.1 |
| 2 | 21/1 | differentiable manifolds | I.2 |
| 3 | 25/1 | differentiable manifolds, cont., differentiable mappings, | I.2 |
| 4 | 28/1 | tangent bundle | I.3 |
| 5 | 1/2 | tensors | I.4 |
| 6 | 4/2 | tensors cont.
differential forms |
I.4
I.7 |
| 7 | 8/2 | differential forms, cont. | I.7 |
| 8 | 11/2 | Poincare lemma | I.7 |
| 9 | 15/2 | Stokes theorem | I.8 |
| 10 | 18/2 | Mapping degree theorem | I.8 |
| 11 | 22/2 | Riemannian manifolds | I.9 |
| 11 | 25/2 | II.1
II.2 |
|
| 12 | 25/1 | Gauss Theorema Egregium
Covariant derivative, Riemann curvature |
II.3
Notes |
| 13 | 1/3 | Curves in the plane and space ,
classical surface theory |
II.3 |
| 14 | 4/1 | Conclusion and outlook, reserve | Notes |