Composing and Decomposing Surfaces in R^n

Composing and Decomposing Surfaces in R^n

International Mathematical Union via YouTube Direct link

Warm-up Lipschitz functions

3 of 12

3 of 12

Warm-up Lipschitz functions

Class Central Classrooms beta

YouTube videos curated by Class Central.

Classroom Contents

Composing and Decomposing Surfaces in R^n

Automatically move to the next video in the Classroom when playback concludes

  1. 1 Intro
  2. 2 Motivation
  3. 3 Warm-up Lipschitz functions
  4. 4 How do you decompose a Lipschitz function?
  5. 5 How can we measure nonorientability?
  6. 6 Quantitative nonorientability for cellular cycles
  7. 7 What's the most nonorientable surface?
  8. 8 Nonorientability is bounded by area
  9. 9 Proof: Decomposing surfaces in Rº
  10. 10 Proof: Conclusion
  11. 11 Nonembeddability of the Heisenberg group
  12. 12 Applications with Naor

Never Stop Learning.

Get personalized course recommendations, track subjects and courses with reminders, and more.

Someone learning on their laptop while sitting on the floor.