Szemerédi's theorem

Long dense subsets of the integers contain arbitrarily large arithmetic progressions

In arithmetic combinatorics, Szemerédi's theorem is a result concerning arithmetic progressions in subsets of the integers. In 1936, Erdős and Turán conjectured[1] that every set of integers A with positive natural density contains a k-term arithmetic progression for every k. Endre Szemerédi proved the conjecture in 1975.

Statement

A subset A of the natural numbers is said to have positive upper density if

lim sup n | A { 1 , 2 , 3 , , n } | n > 0. {\displaystyle \limsup _{n\to \infty }{\frac {|A\cap \{1,2,3,\dotsc ,n\}|}{n}}>0.}

Szemerédi's theorem asserts that a subset of the natural numbers with positive upper density contains infinitely many arithmetic progressions of length k for all positive integers k.

An often-used equivalent finitary version of the theorem states that for every positive integer k and real number δ ( 0 , 1 ] {\displaystyle \delta \in (0,1]} , there exists a positive integer

N = N ( k , δ ) {\displaystyle N=N(k,\delta )}

such that every subset of {1, 2, ..., N} of size at least δN contains an arithmetic progression of length k.

Another formulation uses the function rk(N), the size of the largest subset of {1, 2, ..., N} without an arithmetic progression of length k. Szemerédi's theorem is equivalent to the asymptotic bound

r k ( N ) = o ( N ) . {\displaystyle r_{k}(N)=o(N).}

That is, rk(N) grows less than linearly with N.

History

Van der Waerden's theorem, a precursor of Szemerédi's theorem, was proven in 1927.

The cases k = 1 and k = 2 of Szemerédi's theorem are trivial. The case k = 3, known as Roth's theorem, was established in 1953 by Klaus Roth[2] via an adaptation of the Hardy–Littlewood circle method. Endre Szemerédi[3] proved the case k = 4 through combinatorics. Using an approach similar to the one he used for the case k = 3, Roth[4] gave a second proof for this in 1972.

The general case was settled in 1975, also by Szemerédi,[5] who developed an ingenious and complicated extension of his previous combinatorial argument for k = 4 (called "a masterpiece of combinatorial reasoning" by Erdős[6]). Several other proofs are now known, the most important being those by Hillel Furstenberg[7][8] in 1977, using ergodic theory, and by Timothy Gowers[9] in 2001, using both Fourier analysis and combinatorics. Terence Tao has called the various proofs of Szemerédi's theorem a "Rosetta stone" for connecting disparate fields of mathematics.[10]

Quantitative bounds

It is an open problem to determine the exact growth rate of rk(N). The best known general bounds are

C N exp ( n 2 ( n 1 ) / 2 log N n + 1 2 n log log N ) r k ( N ) N ( log log N ) 2 2 k + 9 , {\displaystyle CN\exp \left(-n2^{(n-1)/2}{\sqrt[{n}]{\log N}}+{\frac {1}{2n}}\log \log N\right)\leq r_{k}(N)\leq {\frac {N}{(\log \log N)^{2^{-2^{k+9}}}}},}

where n = log k {\displaystyle n=\lceil \log k\rceil } . The lower bound is due to O'Bryant[11] building on the work of Behrend,[12] Rankin,[13] and Elkin.[14][15] The upper bound is due to Gowers.[9]

For small k, there are tighter bounds than the general case. When k = 3, Bourgain,[16][17] Heath-Brown,[18] Szemerédi,[19] Sanders,[20] and Bloom[21] established progressively smaller upper bounds, and Bloom and Sisask then proved the first bound that broke the so-called "logarithmic barrier".[22] The current best bounds are

N 2 8 log N r 3 ( N ) N e c ( log N ) 1 / 9 {\displaystyle N2^{-{\sqrt {8\log N}}}\leq r_{3}(N)\leq Ne^{-c(\log N)^{1/9}}} , for some constant c > 0 {\displaystyle c>0} ,

respectively due to O'Bryant,[11] and Bloom and Sisask[23] (the latter built upon the breakthrough result of Kelley and Meka,[24] who obtained the same upper bound, with "1/9" replaced by "1/12").

For k = 4, Green and Tao[25][26] proved that

r 4 ( N ) C N ( log N ) c {\displaystyle r_{4}(N)\leq C{\frac {N}{(\log N)^{c}}}}

for some c > 0.

Extensions and generalizations

A multidimensional generalization of Szemerédi's theorem was first proven by Hillel Furstenberg and Yitzhak Katznelson using ergodic theory.[27] Timothy Gowers,[28] Vojtěch Rödl and Jozef Skokan[29][30] with Brendan Nagle, Rödl, and Mathias Schacht,[31] and Terence Tao[32] provided combinatorial proofs.

Alexander Leibman and Vitaly Bergelson[33] generalized Szemerédi's to polynomial progressions: If A N {\displaystyle A\subset \mathbb {N} } is a set with positive upper density and p 1 ( n ) , p 2 ( n ) , , p k ( n ) {\displaystyle p_{1}(n),p_{2}(n),\dotsc ,p_{k}(n)} are integer-valued polynomials such that p i ( 0 ) = 0 {\displaystyle p_{i}(0)=0} , then there are infinitely many u , n Z {\displaystyle u,n\in \mathbb {Z} } such that u + p i ( n ) A {\displaystyle u+p_{i}(n)\in A} for all 1 i k {\displaystyle 1\leq i\leq k} . Leibman and Bergelson's result also holds in a multidimensional setting.

The finitary version of Szemerédi's theorem can be generalized to finite additive groups including vector spaces over finite fields.[34] The finite field analog can be used as a model for understanding the theorem in the natural numbers.[35] The problem of obtaining bounds in the k=3 case of Szemerédi's theorem in the vector space F 3 n {\displaystyle \mathbb {F} _{3}^{n}} is known as the cap set problem.

The Green–Tao theorem asserts the prime numbers contain arbitrarily long arithmetic progressions. It is not implied by Szemerédi's theorem because the primes have density 0 in the natural numbers. As part of their proof, Ben Green and Tao introduced a "relative" Szemerédi theorem which applies to subsets of the integers (even those with 0 density) satisfying certain pseudorandomness conditions. A more general relative Szemerédi theorem has since been given by David Conlon, Jacob Fox, and Yufei Zhao.[36][37]

The Erdős conjecture on arithmetic progressions would imply both Szemerédi's theorem and the Green–Tao theorem.

See also

Notes

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  2. ^ Roth, Klaus Friedrich (1953). "On certain sets of integers". Journal of the London Mathematical Society. 28 (1): 104–109. doi:10.1112/jlms/s1-28.1.104. MR 0051853. Zbl 0050.04002.
  3. ^ Szemerédi, Endre (1969). "On sets of integers containing no four elements in arithmetic progression". Acta Mathematica Academiae Scientiarum Hungaricae. 20 (1–2): 89–104. doi:10.1007/BF01894569. MR 0245555. Zbl 0175.04301.
  4. ^ Roth, Klaus Friedrich (1972). "Irregularities of sequences relative to arithmetic progressions, IV". Periodica Math. Hungar. 2 (1–4): 301–326. doi:10.1007/BF02018670. MR 0369311. S2CID 126176571.
  5. ^ Szemerédi, Endre (1975). "On sets of integers containing no k elements in arithmetic progression" (PDF). Acta Arithmetica. 27: 199–245. doi:10.4064/aa-27-1-199-245. MR 0369312. Zbl 0303.10056.
  6. ^ Erdős, Paul (2013). "Some of My Favorite Problems and Results". In Graham, Ronald L.; Nešetřil, Jaroslav; Butler, Steve (eds.). The Mathematics of Paul Erdős I (Second ed.). New York: Springer. pp. 51–70. doi:10.1007/978-1-4614-7258-2_3. ISBN 978-1-4614-7257-5. MR 1425174.
  7. ^ Furstenberg, Hillel (1977). "Ergodic behavior of diagonal measures and a theorem of Szemerédi on arithmetic progressions". Journal d'Analyse Mathématique. 31: 204–256. doi:10.1007/BF02813304. MR 0498471. S2CID 120917478..
  8. ^ Furstenberg, Hillel; Katznelson, Yitzhak; Ornstein, Donald Samuel (1982). "The ergodic theoretical proof of Szemerédi's theorem". Bull. Amer. Math. Soc. 7 (3): 527–552. doi:10.1090/S0273-0979-1982-15052-2. MR 0670131.
  9. ^ a b Gowers, Timothy (2001). "A new proof of Szemerédi's theorem". Geom. Funct. Anal. 11 (3): 465–588. doi:10.1007/s00039-001-0332-9. MR 1844079. S2CID 124324198.
  10. ^ Tao, Terence (2007). "The dichotomy between structure and randomness, arithmetic progressions, and the primes". In Sanz-Solé, Marta; Soria, Javier; Varona, Juan Luis; Verdera, Joan (eds.). Proceedings of the International Congress of Mathematicians Madrid, August 22–30, 2006. International Congress of Mathematicians. Vol. 1. Zürich: European Mathematical Society. pp. 581–608. arXiv:math/0512114. doi:10.4171/022-1/22. ISBN 978-3-03719-022-7. MR 2334204.
  11. ^ a b O'Bryant, Kevin (2011). "Sets of integers that do not contain long arithmetic progressions". Electronic Journal of Combinatorics. 18 (1). arXiv:0811.3057. doi:10.37236/546. MR 2788676.
  12. ^ Behrend, Felix A. (1946). "On the sets of integers which contain no three terms in arithmetic progression". Proceedings of the National Academy of Sciences. 32 (12): 331–332. Bibcode:1946PNAS...32..331B. doi:10.1073/pnas.32.12.331. MR 0018694. PMC 1078964. PMID 16578230. Zbl 0060.10302.
  13. ^ Rankin, Robert A. (1962). "Sets of integers containing not more than a given number of terms in arithmetical progression". Proc. R. Soc. Edinburgh Sect. A. 65: 332–344. MR 0142526. Zbl 0104.03705.
  14. ^ Elkin, Michael (2011). "An improved construction of progression-free sets". Israel Journal of Mathematics. 184 (1): 93–128. arXiv:0801.4310. doi:10.1007/s11856-011-0061-1. MR 2823971.
  15. ^ Green, Ben; Wolf, Julia (2010). "A note on Elkin's improvement of Behrend's construction". In Chudnovsky, David; Chudnovsky, Gregory (eds.). Additive Number Theory. Additive number theory. Festschrift in honor of the sixtieth birthday of Melvyn B. Nathanson. New York: Springer. pp. 141–144. arXiv:0810.0732. doi:10.1007/978-0-387-68361-4_9. ISBN 978-0-387-37029-3. MR 2744752. S2CID 10475217.
  16. ^ Bourgain, Jean (1999). "On triples in arithmetic progression". Geom. Funct. Anal. 9 (5): 968–984. doi:10.1007/s000390050105. MR 1726234. S2CID 392820.
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  18. ^ Heath-Brown, Roger (1987). "Integer sets containing no arithmetic progressions". Journal of the London Mathematical Society. 35 (3): 385–394. doi:10.1112/jlms/s2-35.3.385. MR 0889362.
  19. ^ Szemerédi, Endre (1990). "Integer sets containing no arithmetic progressions". Acta Mathematica Hungarica. 56 (1–2): 155–158. doi:10.1007/BF01903717. MR 1100788.
  20. ^ Sanders, Tom (2011). "On Roth's theorem on progressions". Annals of Mathematics. 174 (1): 619–636. arXiv:1011.0104. doi:10.4007/annals.2011.174.1.20. MR 2811612. S2CID 53331882.
  21. ^ Bloom, Thomas F. (2016). "A quantitative improvement for Roth's theorem on arithmetic progressions". Journal of the London Mathematical Society. Second Series. 93 (3): 643–663. arXiv:1405.5800. doi:10.1112/jlms/jdw010. MR 3509957. S2CID 27536138.
  22. ^ Bloom, Thomas F.; Sisask, Olof (2020). "Breaking the logarithmic barrier in Roth's theorem on arithmetic progressions". arXiv:2007.03528v2 [math.NT].
  23. ^ Bloom, Thomas F.; Sisask, Olof (2023). "An improvement to the Kelley-Meka bounds on three-term arithmetic progressions". arXiv:2309.02353v1 [math.NT].
  24. ^ Kelley, Zander; Meka, Raghu (2023). "Strong Bounds for 3-Progressions". arXiv:2302.05537v5 [math.NT].
  25. ^ Green, Ben; Tao, Terence (2009). "New bounds for Szemeredi's theorem. II. A new bound for r4(N)". In Chen, William W. L.; Gowers, Timothy; Halberstam, Heini; Schmidt, Wolfgang; Vaughan, Robert Charles (eds.). New bounds for Szemeredi's theorem, II: A new bound for r_4(N). Analytic number theory. Essays in honour of Klaus Roth on the occasion of his 80th birthday. Cambridge: Cambridge University Press. pp. 180–204. arXiv:math/0610604. Bibcode:2006math.....10604G. ISBN 978-0-521-51538-2. MR 2508645. Zbl 1158.11007.
  26. ^ Green, Ben; Tao, Terence (2017). "New bounds for Szemerédi's theorem, III: A polylogarithmic bound for r4(N)". Mathematika. 63 (3): 944–1040. arXiv:1705.01703. doi:10.1112/S0025579317000316. MR 3731312. S2CID 119145424.
  27. ^ Furstenberg, Hillel; Katznelson, Yitzhak (1978). "An ergodic Szemerédi theorem for commuting transformations". Journal d'Analyse Mathématique. 38 (1): 275–291. doi:10.1007/BF02790016. MR 0531279. S2CID 123386017.
  28. ^ Gowers, Timothy (2007). "Hypergraph regularity and the multidimensional Szemerédi theorem". Annals of Mathematics. 166 (3): 897–946. arXiv:0710.3032. doi:10.4007/annals.2007.166.897. MR 2373376. S2CID 56118006.
  29. ^ Rödl, Vojtěch; Skokan, Jozef (2004). "Regularity lemma for k-uniform hypergraphs". Random Structures Algorithms. 25 (1): 1–42. doi:10.1002/rsa.20017. MR 2069663. S2CID 7458739.
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  31. ^ Nagle, Brendan; Rödl, Vojtěch; Schacht, Mathias (2006). "The counting lemma for regular k-uniform hypergraphs". Random Structures Algorithms. 28 (2): 113–179. doi:10.1002/rsa.20117. MR 2198495. S2CID 14126774.
  32. ^ Tao, Terence (2006). "A variant of the hypergraph removal lemma". Journal of Combinatorial Theory. Series A. 113 (7): 1257–1280. arXiv:math/0503572. doi:10.1016/j.jcta.2005.11.006. MR 2259060.
  33. ^ Bergelson, Vitaly; Leibman, Alexander (1996). "Polynomial extensions of van der Waerden's and Szemerédi's theorems". Journal of the American Mathematical Society. 9 (3): 725–753. doi:10.1090/S0894-0347-96-00194-4. MR 1325795.
  34. ^ Furstenberg, Hillel; Katznelson, Yitzhak (1991). "A density version of the Hales–Jewett theorem". Journal d'Analyse Mathématique. 57 (1): 64–119. doi:10.1007/BF03041066. MR 1191743. S2CID 123036744.
  35. ^ Wolf, Julia (2015). "Finite field models in arithmetic combinatorics—ten years on". Finite Fields and Their Applications. 32: 233–274. doi:10.1016/j.ffa.2014.11.003. hdl:1983/d340f853-0584-49c8-a463-ea16ee51ce0f. MR 3293412.
  36. ^ Conlon, David; Fox, Jacob; Zhao, Yufei (2015). "A relative Szemerédi theorem". Geometric and Functional Analysis. 25 (3): 733–762. arXiv:1305.5440. doi:10.1007/s00039-015-0324-9. MR 3361771. S2CID 14398869.
  37. ^ Zhao, Yufei (2014). "An arithmetic transference proof of a relative Szemerédi theorem". Mathematical Proceedings of the Cambridge Philosophical Society. 156 (2): 255–261. arXiv:1307.4959. Bibcode:2014MPCPS.156..255Z. doi:10.1017/S0305004113000662. MR 3177868. S2CID 119673319.

Further reading

  • Tao, Terence (2007). "The ergodic and combinatorial approaches to Szemerédi's theorem". In Granville, Andrew; Nathanson, Melvyn B.; Solymosi, József (eds.). Additive Combinatorics. CRM Proceedings & Lecture Notes. Vol. 43. Providence, RI: American Mathematical Society. pp. 145–193. arXiv:math/0604456. Bibcode:2006math......4456T. ISBN 978-0-8218-4351-2. MR 2359471. Zbl 1159.11005.

External links

  • PlanetMath source for initial version of this page
  • Announcement by Ben Green and Terence Tao – the preprint is available at math.NT/0404188
  • Discussion of Szemerédi's theorem (part 1 of 5)
  • Ben Green and Terence Tao: Szemerédi's theorem on Scholarpedia
  • Weisstein, Eric W. "SzemeredisTheorem". MathWorld.
  • Grime, James; Hodge, David (2012). "6,000,000: Endre Szemerédi wins the Abel Prize". Numberphile. Brady Haran.