On the intersections of exceptional sets in Borel’s normal number theorem and Erdös–Rényi limit theorem
From MaRDI portal
Publication:4992590
DOI10.1142/S1793042121500172zbMath1472.11216OpenAlexW3048554900MaRDI QIDQ4992590
Publication date: 9 June 2021
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793042121500172
Metric theory of other algorithms and expansions; measure and Hausdorff dimension (11K55) Fractals (28A80)
Cites Work
- Unnamed Item
- Unnamed Item
- On exceptional sets in Erdős-Rényi limit theorem revisited
- Ergodic limits on the conformal repellers
- On exceptional sets in Erdős-Rényi limit theorem
- Egoroff's theorem and maximal run length
- Some dimensional results for homogeneous Moran sets
- On the sum of digits of real numbers represented in the dyadic system. (On sets of fractional dimensions II.)
- Distribution of frequencies of digits via multifractal analysis
- The fractional dimensions of intersections of the Besicovitch sets and the Erdős-Rényi sets
- On the intersections of the Besicovitch sets and exceptional sets in the Erdős-Rényi limit theorem
- A remark on exceptional sets in Erdös-Rényi limit theorem
- On the intersections of the Besicovitch sets and the Erdös-Rényi sets
- On a new law of large numbers
- Hausdorff dimension of the maximal run-length in dyadic expansion
- RECURRENCE, DIMENSION AND ENTROPY
- Dimension of Besicovitch–Eggleston sets in countable symbolic space
- HAUSDORFF DIMENSION OF THE EXCEPTIONAL SETS CONCERNING THE RUN-LENGTH FUNCTION OF BETA-EXPANSION
- A NOTE ON THE INTERSECTIONS OF THE BESICOVITCH SETS AND ERDŐS–RÉNYI SETS
- THE FRACTIONAL DIMENSION OF A SET DEFINED BY DECIMAL PROPERTIES
This page was built for publication: On the intersections of exceptional sets in Borel’s normal number theorem and Erdös–Rényi limit theorem
