Szemerédi's theorem

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

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

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 ${\displaystyle \delta \in (0,1]}$, there exists a positive integer

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

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 r_k(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

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

That is, r_k(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 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 r_k(N). The best known general bounds are

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

where ${\displaystyle n=\lceil \log k\rceil }$. 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] and Sanders^[20] provided increasingly smaller upper bounds. The current best bounds are

${\displaystyle N2^{-{\sqrt {8\log N}}}\leq r_{3}(N)\leq C{\frac {(\log \log N)^{4}}{\log N}}N}$

due to O'Bryant^[11] and Bloom^[21] respectively.

For k = 4, Green and Tao^[22][23] that

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

for some c > 0.

Extensions and generalizations

A multidimensional generalization of Szemerédi's theorem was first proven by Furstenberg and Katznelson using ergodic theory.^[24] Gowers,^[25] Rödl–Skokan^[26][27] with Nagle–Rödl–Schacht,^[28] and Tao^[29] provided combinatorial proofs.

Leibman and Bergelson^[30] generalized Szemerédi's to polynomial progressions: If ${\displaystyle A\subset \mathbb {N} }$ is a set with positive upper density and ${\displaystyle p_{1}(n),p_{2}(n),\dotsc ,p_{k}(n)}$ are integer-valued polynomials such that ${\displaystyle p_{i}(k)=0}$, then there are infinitely many ${\displaystyle u,n\in \mathbb {Z} }$ such that ${\displaystyle u+p_{i}(n)\in A}$ for all ${\displaystyle 1\leq i\leq k}$. 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.^[31] The finite field analog can be used as a model for understanding the theorem in the natural numbers.^[32]

The Green–Tao theorem asserts the prime numbers contain arbitrary 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, 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 Conlon, Fox, and Zhao.^[33][34]

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

See also

• Problems involving arithmetic progressions
• Ergodic Ramsey theory
• Arithmetic combinatorics
• Szemerédi regularity lemma

Notes

1. Erdős, Paul; Turán, Paul (1936). "On some sequences of integers" (PDF). Journal of the London Mathematical Society. 11 (4): 261–264. doi:10.1112/jlms/s1-11.4.261. MR 1574918.
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 Math. Acad. Sci. Hung. 20: 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: 301–326. doi:10.1007/BF02018670. MR 0369311.
5. Szemerédi, Endre (1975). "On sets of integers containing no k elements in arithmetic progression" (PDF). Acta Arithmetica. 27: 199–245. MR 0369312. Zbl t0303.10056. {{cite journal}}: Check |zbl= value (help)
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". J. D'Analyse Math. 31: 204–256. doi:10.1007/BF02813304. MR 0498471..
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. 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.
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.). International Congress of Mathematicians. Vol. 1. Zürich: European Mathematical Society. pp. 581–608. arXiv:math/0512114. doi:10.4171/022-1/22. MR 2334204.
11. O'Bryant, Kevin (2011). "Sets of integers that do not contain long arithmetic progressions". Electronic Journal of Combinatorics. 18 (1). 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. 23 (12): 331–332. doi:10.1073/pnas.32.12.331. MR 0018694. Zbl 0060.10302.
13. Rankin, Robert A. (1962). "Sets of integers containing not more than a given number of terms in arithmetical progression". Proc. Roy. 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. 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. Festschrift in honor of the sixtieth birthday of Melvyn B. Nathanson. New York: Springer. pp. 141–144. doi:10.1007/978-0-387-68361-4_9. ISBN 978-0-387-37029-3. MR 2744752.
16. Bourgain, Jean (1999). "On triples in arithmetic progression". Geom. Funct. Anal. 9 (5): 968–984. doi:10.1007/s000390050105. MR 1726234.
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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 Math. Hungar. 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. doi:10.4007/annals.2011.174.1.20. MR 2811612.
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.
22. 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.). 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. ISBN 978-0-521-51538-2. MR 2508645. Zbl 1158.11007.
23. Green, Ben; Tao, Terence (2017). "New bounds for Szemerédi's theorem, III: A polylogarithmic bound for r₄(N)". arXiv:1705.01703.
24. 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.
25. Gowers, Timothy (2007). "Hypergraph regularity and the multidimensional Szemerédi theorem". Ann. of Math. 166 (3): 897–946. doi:10.4007/annals.2007.166.897. MR 2373376.
26. 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.
27. Rödl, Vojtěch; Skokan, Jozef (2006). "Applications of the regularity lemma for uniform hypergraphs". Random Structures Algorithms. 28 (2): 180–194. doi:10.1002/rsa.20108. MR 2198496.
28. 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.
29. Tao, Terence (2006). "A variant of the hypergraph removal lemma". Journal of Combinatorial Theory. Series A. 113 (7): 1257–1280. doi:10.1016/j.jcta.2005.11.006. MR 2259060.
30. 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.
31. 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.
32. 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. MR 3293412.
33. 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.
34. Zhao, Yufei (2014). "An arithmetic transference proof of a relative Szemerédi theorem". Mathematical Proceedings of the Cambridge Philosophical Society. 156 (2): 255–261. doi:10.1017/S0305004113000662. MR 3177868.

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. 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.