EuDML | Browse

Skip to main content (access key 's'), Skip to navigation (access key 'n'), Accessibility information (access key '0')

Subjects
11-XX Number theory
11Kxx Probabilistic theory: distribution modulo $1$ ; metric theory of algorithms
11K16 Normal numbers, radix expansions, Pisot numbers, Salem numbers, good lattice points, etc.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

The search session has expired. Please query the service again.

Items

All a b c d e f g h i j k l m n o p q r s t u v w x y z Other

Page 1

Displaying 1 – 8 of 8

Random generators and normal numbers.

Bailey, David H., Crandall, Richard E. (2002)

Experimental Mathematics

Remarks on Invariant Measures for Number Theoretic Transformations.

Michael S. Waterman (1975)

Monatshefte für Mathematik

Remarks on the $(R)$ -density of sets of numbers. II

József Bukor, Pál Erdös, Tibor Šalát, János T. Tóth (1997)

Mathematica Slovaca

Repartition de Suites Polynominales.

Jean Coquet (1983)

Monatshefte für Mathematik

Répartition des valeurs de la fonction « somme des chiffres »

Michel Olivier (1970/1971)

Séminaire de théorie des nombres de Bordeaux

Répartition et ergodicité

Pierre Liardet (1977/1978)

Séminaire Delange-Pisot-Poitou. Théorie des nombres

Représentation des entiers naturels et suites uniformément équiréparties

Jean Coquet (1982)

Annales de l'institut Fourier

$s (n)$ désigne la somme des chiffres de l’entier $n$ en base $q$ et $σ_{α} (n)$ la somme des chiffres de $n$ associée au développement de $α$ en fraction continue. Dans un article paru aux Annales de l’Institut Fourier (31 (1981), 1–15), Coquet, Rhin et Toffin montrent que, lorsque $x$ ou $y$ est irrationnel, la suite $x s + y σ_{α}$ est équirépartie modulo 1. On précise ici que l’équirépartition est uniforme.

Représentations des entiers naturels et indépendance statistique. II

Jean Coquet, Georges Rhin, Philippe Toffin (1981)

Annales de l'institut Fourier

$s (n)$ désigne la somme des chiffres de l’entier $n$ en base $q$ et $σ_{α} (n)$ la somme des chiffres de $n$ associée au développement en fraction continue de $α$ . La suite $(x s (n) + y α_{α} (n))_{n \in N}$ est équirépartie modulo 1 si et seulement si $x$ ou $y$ est irrationnel.

Currently displaying 1 – 8 of 8

Page 1