EXCEPTIONAL SETS RELATED TO THE RUN-LENGTH FUNCTION OF BETA-EXPANSIONS
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Publication:4959963
DOI10.1142/S0218348X18500494zbMath1433.28013OpenAlexW2789533609MaRDI QIDQ4959963
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Publication date: 7 April 2020
Published in: Fractals (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218348x18500494
Related Items (3)
A note on exceptional sets in Erdős-Rényi limit theorem ⋮ LOWER TYPE DIMENSIONS OF SOME MORAN SETS ⋮ A NOTE ON THE INTERSECTIONS OF THE BESICOVITCH SETS AND ERDŐS–RÉNYI SETS
Cites Work
- Unnamed Item
- Distribution of full cylinders and the Diophantine properties of the orbits in \(\beta\)-expansions
- On exceptional sets in Erdős-Rényi limit theorem revisited
- The run-length function of the \(\beta\)-expansion of the unit
- Quantitative recurrence properties for beta-dynamical system
- The Erdős-Rényi law in distribution, for coin tossing and sequence matching
- On the mixing coefficients of piecewise monotonic maps
- On exceptional sets in Erdős-Rényi limit theorem
- Egoroff's theorem and maximal run length
- Hausdorff dimension of some sets arising by the run-length function of \(\beta\)-expansions
- Digit frequencies of beta-expansions
- On the longest block in Lüroth expansion
- A remark on exceptional sets in Erdös-Rényi limit theorem
- Beta-expansion and continued fraction expansion
- Some metrical theorems in number theory
- On a new law of large numbers
- On the maximal length of consecutive zero digits of β-expansions
- Irregular sets, the $𝛽$-transformation and the almost specification property
- Hausdorff dimension of the maximal run-length in dyadic expansion
- On the lengths of basic intervals in beta expansions
- Representations for real numbers and their ergodic properties
- On theβ-expansions of real numbers
- Symbolic dynamics for $\beta$-shifts and self-normal numbers
- Beta-expansion and continued fraction expansion of real numbers
- A result on the maximal length of consecutive 0 digits in β-expansions
- On a problem of Tamas Varga
- THE EXCEPTIONAL SETS ON THE RUN-LENGTH FUNCTION OF β-EXPANSIONS
- Dynamics forβ-shifts and Diophantine approximation
- \(\beta\)-shifts have unique maximal measure
- Limit theorems related to beta-expansion and continued fraction expansion
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