EuDML | Browse

Let M ∈ Mₙ(ℤ) be expanding such that |det(M)| = p is a prime and pℤⁿ ⊈ M²(ℤⁿ). Let D ⊂ ℤⁿ be a finite set with |D| = |det(M)|. Suppose the attractor T(M,D) of the iterated function system ${ϕ_{d} (x) = M^{- 1} (x + d)}_{d \in D}$ has positive Lebesgue measure. We prove that (i) if D ⊈ M(ℤⁿ), then D is a complete set of coset representatives of ℤⁿ/M(ℤⁿ); (ii) if D ⊆ M(ℤⁿ), then there exists a positive integer γ such that $D = M^{γ} D ₀$ , where D₀ is a complete set of coset representatives of ℤⁿ/M(ℤⁿ). This improves the corresponding results of Kenyon,...

Digital expansion of exponential sequences

Michael Fuchs (2002)

Journal de théorie des nombres de Bordeaux

We consider the $q$ -ary digital expansion of the first $N$ terms of an exponential sequence $a^{n}$ . Using a result due to Kiss and Tichy [8], we prove that the average number of occurrences of an arbitrary digital block in the last $c log N$ digits is asymptotically equal to the expected value. Under stronger assumptions we get a similar result for the first ${(log N)}^{\frac{3}{2} - ϵ}$ digits, where $ϵ$ is a positive constant. In both methods, we use estimations of exponential sums and the concept of discrepancy of real sequences modulo $1$ ...

Digital expansions in real algebraic quadratic fields.

Farkas, Gábor (1999)

Mathematica Pannonica

Digital sum moments and substitutions

Jean Marie Dumont, Alain Thomas (1993)

Acta Arithmetica

Diophantine equations and identities.

Baica, Malvina (1985)

International Journal of Mathematics and Mathematical Sciences

Diophantine representation of the decimal expansions of $e$ and $π$

Christoph Baxa (2000)

Mathematica Slovaca

Divisibilité par 19

Badoureau (1879)

Nouvelles annales de mathématiques : journal des candidats aux écoles polytechnique et normale

Dyadic diaphony of digital sequences

Friedrich Pillichshammer (2007)

Journal de Théorie des Nombres de Bordeaux

The dyadic diaphony is a quantitative measure for the irregularity of distribution of a sequence in the unit cube. In this paper we give formulae for the dyadic diaphony of digital $(0, s)$ -sequences over $ℤ_{2}$ , $s = 1, 2$ . These formulae show that for fixed $s \in {1, 2}$ , the dyadic diaphony has the same values for any digital $(0, s)$ -sequence. For $s = 1$ , it follows that the dyadic diaphony and the diaphony of special digital $(0, 1)$ -sequences are up to a constant the same. We give the exact asymptotic order of the dyadic diaphony of digital...

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...

Dynamiques associees a une echelle de numeration

Guy Barat, Tomasz Downarowicz, Pierre Liardet (2002)

Acta Arithmetica

Currently displaying 1 – 15 of 15

Page 1