EuDML | Browse

Page 1

Displaying 1 – 6 of 6

De nouveaux ensembles fermés de nombres algébriques

Marie-José Bertin (1975/1976)

Séminaire Delange-Pisot-Poitou. Théorie des nombres

Density modulo 1 in local fields

Daniel Berend (1989)

Acta Arithmetica

Density of some sequences modulo 1

Artūras Dubickas (2012)

Colloquium Mathematicae

Recently, Cilleruelo, Kumchev, Luca, Rué and Shparlinski proved that for each integer a ≥ 2 the sequence of fractional parts ${a ⁿ / n}_{n = 1}^{\infty}$ is everywhere dense in the interval [0,1]. We prove a similar result for all Pisot numbers and Salem numbers α and show that for each c > 0 and each sufficiently large N, every subinterval of [0,1] of length $c N^{- 0.475}$ contains at least one fractional part Q(αⁿ)/n, where Q is a nonconstant polynomial in ℤ[z] and n is an integer satisfying 1 ≤ n ≤ N.

Développement en base $θ$ , répartition modulo un de la suite $(x θ^{n})$ , n $\geq 0$ , langages codés et $θ$ -shift

Anne Bertrand-Mathis (1986)

Bulletin de la Société Mathématique de France

Diamètres transfinis et problème de Favard

Michel Langevin, E. Reyssat, Georges Rhin (1988)

Annales de l'institut Fourier

Tout entier algébrique irrationnel a deux conjugués éloignés d’au moins $\sqrt{3}$ .

Dynamical directions in numeration

Guy Barat, Valérie Berthé, Pierre Liardet, Jörg Thuswaldner (2006)

Annales de l’institut Fourier

This survey aims at giving a consistent presentation of numeration from a dynamical viewpoint: we focus on numeration systems, their associated compactification, and dynamical systems that can be naturally defined on them. The exposition is unified by the fibred numeration system concept. Many examples are discussed. Various numerations on rational integers, real or complex numbers are presented with special attention paid to $β$ -numeration and its generalisations, abstract numeration systems and...