Topologi på roterommet

BID, February 2013

noen problemer synes små

Is size always important?

  1. Small problems/solutions can be as important as big ones.
  2. What is "shape"?
  3. Can you calculate with shapes and spaces?

1. Is size always important?
2. To comb the hair of a sphere
3. The Euler characteristic
4. Fusion reactors
5. A flat world?
6. The screen is my universe
7. What is the shape of space?
8. A flat but finite universe
A. State spaces
B. The study of spaces
C. What is a deformation?
D. How to calculate with spaces

Bjørn Ian Dundas