Graph Theory and Additive Combinatorics

Graph Theory and Additive Combinatorics

Prof. Yufei Zhao via MIT OpenCourseWare Direct link

21. Structure of set addition I: introduction to Freiman's theorem

21 of 26

21 of 26

21. Structure of set addition I: introduction to Freiman's theorem

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Classroom Contents

Graph Theory and Additive Combinatorics

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  1. 1 1. A bridge between graph theory and additive combinatorics
  2. 2 2. Forbidding a subgraph I: Mantel's theorem and Turán's theorem
  3. 3 3. Forbidding a subgraph II: complete bipartite subgraph
  4. 4 4. Forbidding a subgraph III: algebraic constructions
  5. 5 5. Forbidding a subgraph IV: dependent random choice
  6. 6 6. Szemerédi's graph regularity lemma I: statement and proof
  7. 7 7. Szemerédi's graph regularity lemma II: triangle removal lemma
  8. 8 8. Szemerédi's graph regularity lemma III: further applications
  9. 9 9. Szemerédi's graph regularity lemma IV: induced removal lemma
  10. 10 10. Szemerédi's graph regularity lemma V: hypergraph removal and spectral proof
  11. 11 11. Pseudorandom graphs I: quasirandomness
  12. 12 12. Pseudorandom graphs II: second eigenvalue
  13. 13 13. Sparse regularity and the Gree-Tao theorem
  14. 14 14. Graph limits I: introduction
  15. 15 15. Graph limits II: regularity and counting
  16. 16 16. Graph limits III: compactness and applications
  17. 17 17. Graph limits IV: inequalities between subgraph densities
  18. 18 18. Roth's theorem I: Fourier analytic proof over finite field
  19. 19 19. Roth's theorem II: Fourier analytic proof in the integers
  20. 20 20. Roth's theorem III: polynomial method and arithmetic regularity
  21. 21 21. Structure of set addition I: introduction to Freiman's theorem
  22. 22 22. Structure of set addition II: groups of bounded exponent and modeling lemma
  23. 23 23. Structure of set addition III: Bogolyubov's lemma and the geometry of numbers
  24. 24 24. Structure of set addition IV: proof of Freiman's theorem
  25. 25 25. Structure of set addition V: additive energy and Balog-Szemerédi-Gowers theorem
  26. 26 26. Sum-product problem and incidence geometry

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