Two random constructions inside lacunary sets

Neuwirth, Stefan

Annales de l'Institut Fourier, Tome 49 (1999), p. 1853-1867 / Harvested from Numdam

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Abstract

Nous étudions le rapport entre la croissance d’une suite d’entiers et les propriétés harmoniques et fonctionnelles de la suite de caractères associée. Nous montrons en particulier que toute suite polynomiale, ainsi que la suite des nombres premiers, contient un ensemble $Λ (p)$ pour tout $p$ qui n’est pas de Rosenthal.

We study the relationship between the growth rate of an integer sequence and harmonic and functional properties of the corresponding sequence of characters. In particular we show that every polynomial sequence contains a set that is $Λ (p)$ for all $p$ but is not a Rosenthal set. This holds also for the sequence of primes.

Publié le : 1999-01-01

MR 2001c:42007 | Zbl 0955.42009

DOI : https://doi.org/10.5802/aif.1740

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     author = {Neuwirth, Stefan},
     title = {Two random constructions inside lacunary sets},
     journal = {Annales de l'Institut Fourier},
     volume = {49},
     year = {1999},
     pages = {1853-1867},
     doi = {10.5802/aif.1740},
     mrnumber = {2001c:42007},
     zbl = {0955.42009},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_1999__49_6_1853_0}
}

Neuwirth, Stefan. Two random constructions inside lacunary sets. Annales de l'Institut Fourier, Tome 49 (1999) pp. 1853-1867. doi : 10.5802/aif.1740. http://gdmltest.u-ga.fr/item/AIF_1999__49_6_1853_0/

Bibliographie

[1] G. Bennett, Probability inequalities for the sum of independent random variables, J. Amer. Statist. Assoc., 57 (1962), 33-45. | Zbl 0104.11905

[2] S.N. Bernšteĭn, On a modification of Chebyshev's inequality and on the deviation in Laplace's formula, in: Collected Works IV. Theory of probability and mathematical statistics (1911-1946), Nauka, 1964, 71-79, Russian.

[3] J. Bourgain, On the maximal ergodic theorem for certain subsets of the integers, Israel J. Math., 61 (1988), 39-72. | MR 89f:28037a | Zbl 0642.28010

[4] J. Bourgain, On Λ(p)-subsets of squares, Israel J. Math., 67 (1989), 291-311. | MR 91d:43018 | Zbl 0692.43005

[5] W.J. Ellison, Les nombres premiers, Actualités Scientifiques et Industrielles 1366, Hermann, 1975. | MR 54 #5138 | Zbl 0313.10001

[6] P. Erdős, Problems and results in additive number theory, in: Colloque sur la théorie des nombres (Bruxelles, 1955), Georges Thone, 1956, 127-137. | Zbl 0073.03102

[7] P. Erdős and A. Rényi, Additive properties of random sequences of positive integers, Acta Arith., 6 (1960), 83-110. | MR 22 #10970 | Zbl 0091.04401

[8] P. Erdős and S.J. Taylor, On the set of points of convergence of a lacunary trigonometric series and the equidistribution properties of related sequences, Proc. London Math. Soc., (3) 7 (1957), 598-615. | MR 19,1050b | Zbl 0111.26801

[9] G. Godefroy, On coanalytic families of sets in harmonic analysis, Illinois J. Math., 35 (1991), 241-249. | MR 92b:43011 | Zbl 0715.43007

[10] H. Halberstam and K.F. Roth, Sequences, Springer, second ed., 1983. | MR 83m:10094 | Zbl 0498.10001

[11] K.E. Hare and I. Klemes, Properties of Littlewood-Paley sets, Math. Proc. Cambridge Philos. Soc., 105 (1989), 485-494. | MR 90f:42018 | Zbl 0691.43006

[12] S. Karlin, Bases in Banach spaces, Duke Math. J., 15 (1948), 971-985. | MR 10,548c | Zbl 0032.03102

[13] Y. Katznelson, Suites aléatoires d'entiers, in: L'analyse harmonique dans le domaine complexe (Montpellier, 1972), E.J. Akutowicz (ed.), Lect. Notes Math., 336, Springer, 1973, 148-152. | MR 53 #1176 | Zbl 0274.42009

[14] Y. Katznelson and P. Malliavin, Un critère d'analyticité pour les algèbres de restriction, C.R. Acad. Sci. Paris, 261 (1965), 4964-4967. | MR 34 #3226a | Zbl 0143.36001

[15] Y. Katznelson and P. Malliavin, Vérification statistique de la conjecture de la dichotomie sur une classe de d'algèbres de restriction, C.R. Acad. Sci. Paris, Sér. A-B, 262 (1966), A490-A492. | MR 34 #3226b | Zbl 0143.36002

[16] D. Li, A remark about Λ(p)-sets and Rosenthal sets, Proc. Amer. Math. Soc., 126 (1998), 3329-3333. | MR 99a:43005 | Zbl 0907.43007

[17] J.E. Littlewood and R.E.A.C. Paley, Theorems on Fourier series and power series, J. London Math. Soc., 6 (1931), 230-233. | JFM 57.0318.01 | Zbl 0002.18803

[18] F. Lust-Piquard, Éléments ergodiques et totalement ergodiques dans L∞(Γ), Studia Math., 69 (1981), 191-225. | MR 84h:43003 | Zbl 0476.43001

[19] F. Lust-Piquard, Bohr local properties of CΛ(T), Colloq. Math., 58 (1989), 29-38. | MR 91c:43009 | Zbl 0694.43005

[20] Y. Meyer, Endomorphismes des idéaux fermés de L1 (G), classes de Hardy et séries de Fourier lacunaires, Ann. sci. École Norm. Sup., (4) 1 (1968), 499-580. | Numdam | MR 39 #1910 | Zbl 0169.18001

[21] Y. Meyer, Algebraic numbers and harmonic analysis, North-Holland, 1972. | MR 58 #5579 | Zbl 0267.43001

[22] S. Neuwirth, Metric unconditionality and Fourier analysis, Studia Math., 131 (1998), 19-62. | MR 99f:42017 | Zbl 0930.42005

[23] H.P. Rosenthal, On trigonometric series associated with weak* closed subspaces of continuous functions, J. Math. Mech., 17 (1967), 485-490. | MR 35 #7064 | Zbl 0194.16703

[24] W. Rudin, Trigonometric series with gaps, J. Math. Mech., 9 (1960), 203-228. | MR 22 #6972 | Zbl 0091.05802

[25] R.C. Vaughan, The Hardy-Littlewood method, Cambridge University Press, 1981. | MR 84b:10002 | Zbl 0455.10034

[26] H. Weyl, Über die Gleichverteilung von Zahlen mod. Eins, Math. Ann., 77 (1916), 313-352. | JFM 46.0278.06

[27] K. Zeller, Theorie der Limitierungsverfahren, Springer, 1958, Ergebnisse der Mathematik und ihrer Grenzgebiete (Neue Folge) 15. | MR 22 #9759 | Zbl 0085.04603