Factorization Centers in Dimension Two and the Grothendieck Ring of Varieties

Factorization Centers in Dimension Two and the Grothendieck Ring of Varieties

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Minimal rational surfaces are models of large degree

10 of 16

10 of 16

Minimal rational surfaces are models of large degree

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Factorization Centers in Dimension Two and the Grothendieck Ring of Varieties

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  1. 1 Intro
  2. 2 Motivation: main question
  3. 3 Main result for this talk: dim(X) = 2
  4. 4 Axiomatic definition for có
  5. 5 Examples
  6. 6 Grothendieck ring and Open questions
  7. 7 2-truncated Grothendieck group
  8. 8 A diagram
  9. 9 Surface? What surface?
  10. 10 Minimal rational surfaces are models of large degree
  11. 11 Rationality centers
  12. 12 Reformulation of the main result for rational surfaces
  13. 13 Sarkisov links
  14. 14 Proof of the main theorem for rational surfaces
  15. 15 Link of the day: del Pezzo surfaces of degree 6
  16. 16 Summary

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