Beta-expansions of -adic numbers
From MaRDI portal
Publication:2805068
DOI10.1017/etds.2014.84zbMath1343.11066arXiv1401.7530OpenAlexW3100143318WikidataQ114119559 ScholiaQ114119559MaRDI QIDQ2805068
Klaus Scheicher, Victor F. Sirvent, Paul Surer
Publication date: 9 May 2016
Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1401.7530
Normal numbers, radix expansions, Pisot numbers, Salem numbers, good lattice points, etc. (11K16) Continuous, (p)-adic and abstract analogues (11K41) Dynamical systems over non-Archimedean local ground fields (37P20)
Related Items (2)
Bernoulli maps on \(\mathbf{Z}_p\) in the expansions of van der Put and Mahler ⋮ Natural extensions for \(p\)-adic \(\beta\)-shifts and other scaling maps
Cites Work
- Unnamed Item
- \(\beta\)-expansions in algebraic function fields over finite fields
- Digit systems in polynomial rings over finite fields
- A certain finiteness property of Pisot number systems
- Generalized radix representations and dynamical systems. IV
- Generalized radix representations and dynamical systems. I
- Contractivity of three-dimensional shift radix systems with finiteness property
- Finite beta-expansions
- Digit systems over commutative rings
- Representations for real numbers and their ergodic properties
- On theβ-expansions of real numbers
- SUR LE BÊTA-DÉVELOPPEMENT DE 1 DANS LE CORPS DES SÉRIES FORMELLES
- On Periodic Expansions of Pisot Numbers and Salem Numbers
- On the beta expansion for Salem numbers of degree 6
- Three-dimensional symmetric shift radix systems
- Generalized radix representations and dynamical systems II
This page was built for publication: Beta-expansions of -adic numbers
