On evil Kronecker sequences and lacunary trigonometric products

Aistleitner, Christoph; Hofer, Roswitha; Larcher, Gerhard

doi:10.5802/aif.3094

On evil Kronecker sequences and lacunary trigonometric products
[Suites méchantes de Kronecker et produits trigonométriques]

Aistleitner, Christoph ¹ ; Hofer, Roswitha ¹ ; Larcher, Gerhard ¹

¹ Institute of Financial Mathematics and Applied Number Theory Johannes Kepler University Linz Altenbergerstr. 69, 4040 Linz (Austria)

Annales de l'Institut Fourier, Tome 67 (2017) no. 2, pp. 637-687.

Résumé
Abstract

Un résultat important de Weyl nous dit que pour chaque suite ${(n_{k})}_{k \geq 1}$ de nombres entiers positifs différents la suite ${n_{k} α}_{k \geq 1}$ est équidistribuée modulo $1$ pour presque tous les réels $α$ . Dans ce cas, il est d’habitude extrêmement difficile de mesurer la vitesse de convergence de la distribution empirique vers l’équidistribution.

Dans cet article, nous étudions le cas ou ${(n_{k})}_{k \geq 1}$ est la suite des nombres entiers « méchants », donc la suite des nombres positifs la une somme de chiffres paire dans la base 2. Nous relions ce probléme aux produits trigonométriques $\prod_{l = 0}^{L} ∥ sin π 2^{l} α ∥$ en donnant des estimations exactes pour de tels produits et nous obtenons des estimations exactes pour la discrépance de la suite ${n_{k} α}_{k \geq 1}$ .

En plus, nous donnons des exemples concrets de réels $α$ pour lesquels nous pouvons obtenir des estimations pour la discrépance de la suite ${n_{k} α}_{k \geq 1}$ .

An important result of Weyl states that for every sequence ${(n_{k})}_{k \geq 1}$ of distinct positive integers the sequence of fractional parts of ${(n_{k} α)}_{k \geq 1}$ is u.d. mod 1 for almost all $α$ . However, in this general case it is usually extremely difficult to measure the speed of convergence of the empirical distribution of $({n_{1} α}, \dots, {n_{N} α})$ towards the uniform distribution. In this paper we investigate the case when ${(n_{k})}_{k \geq 1}$ is the sequence of evil numbers, that is the sequence of non-negative integers having an even sum of digits in base 2. We utilize a connection with lacunary trigonometric products $\prod_{ℓ = 0}^{L} |sin π 2^{ℓ} α|$ , and by giving sharp metric estimates for such products we derive sharp metric estimates for exponential sums of ${(n_{k} α)}_{k \geq 1}$ and for the discrepancy of ${(\{n_{k} α\})}_{k \geq 1} .$ Furthermore, we provide some explicit examples of numbers $α$ for which we can give estimates for the discrepancy of ${(\{n_{k} α\})}_{k \geq 1}$ .

Reçu le : 2016-01-11
Révisé le : 2016-04-07
Accepté le : 2016-05-12
Publié le : 2017-05-31

DOI : 10.5802/aif.3094

Classification : 11B85, 11K38, 11B83, 11A63, 68R15
Keywords: evil numbers, Thue–Morse sequence, $(n\alpha )$-sequence, discrepancy, lacunary trigonometric products
Mot clés : nombres entiers méchants, suites de Thue–Morse, suites $(n\alpha )$, discrépancie, produits trigonométriques

Affiliations des auteurs :

Aistleitner, Christoph ¹ ; Hofer, Roswitha ¹ ; Larcher, Gerhard ¹

¹ Institute of Financial Mathematics and Applied Number Theory Johannes Kepler University Linz Altenbergerstr. 69, 4040 Linz (Austria)

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Aistleitner, Christoph; Hofer, Roswitha; Larcher, Gerhard. On evil Kronecker sequences and lacunary trigonometric products. Annales de l'Institut Fourier, Tome 67 (2017) no. 2, pp. 637-687. doi : 10.5802/aif.3094. http://www.numdam.org/articles/10.5802/aif.3094/

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