Lecture
1: Overview

Lecture
2: Cobordism

Lecture
3: Thom's theorem

Lecture
4: Transversality

Lecture 5: Computation of the unoriented bordism ring.

Lecture
6: Handles

Lecture
7: Ordering handles.

Lecture
8: Handle cancellation.

Lecture
9: The normal form lemma, first part: handle elimination.

Lecture
10: The normal form lemma, second part: homology lemma. Not edited.

Lecture
11: The Whitney trick, first part.

Lecture
12: The Whitney trick, second part.

Lecture
13: The normal forma lemma, final part.

Lecture 14: The h-cobordism theorem and the generalized Poincaré conjecture.

Lecture
15: The s-cobordism theorem, Whitehead torsion, and simple homotopy.

Lecture
16: Morse functions and handles.

Lecture
17: Milnor's construction of exotic 7-spheres, first part.

Lecture
18: Milnor's construction of exotic 7-spheres, second part. Not
edited.

Lecture
19: Kervaire-Milnor's groups of exotic spheres and the
J-homomorphism. Not edited.

Lecture
20: Overview of Morse theory on loop spaces. Not edited.

Lecture
21: Bott periodicity. Not edited.

Lecture
22: Exotic spheres that bound parallelizable manifolds. Not edited.

Lecture
23: Plumbing. Not edited.