Ergodic and Statistical Properties of $\B$-Free Numbers
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Publication:4602297
DOI10.1137/S0040585X97T988423zbMath1378.11084OpenAlexW2775843332WikidataQ114073926 ScholiaQ114073926MaRDI QIDQ4602297
Francesco Cellarosi, Maria Avdeeva, Yakov G. Sinai
Publication date: 9 January 2018
Published in: Theory of Probability & Its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/s0040585x97t988423
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Related Items (5)
On -approachability, entropy density and -free shifts ⋮ Squarefrees are Gaussian in short intervals ⋮ Divisibility properties of polynomial expressions of random integers ⋮ On the distribution of index of Farey sequences ⋮ On the variance of squarefree integers in short intervals and arithmetic progressions
Cites Work
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- On the distribution of \(k\)-th power free integers. II
- The Möbius function is strongly orthogonal to nilsequences
- The Chowla and the Sarnak conjectures from ergodic theory point of view
- Uniqueness of the measure of maximal entropy for the squarefree flow
- Prime numbers along Rudin-Shapiro sequences
- An averaged form of Chowla's conjecture
- The square sieve and consecutive square-free numbers
- Zur Operatorenmethode in der klassischen Mechanik
- Diffraction from visible lattice points and \(k\)th power free integers
- On Sarnak's conjecture and Veech's question for interval exchanges
- Central limit theorems for the ergodic adding machine
- On the density of certain sequences of integers
- Randomness of the square root of 2 and the giant leap. I
- Randomness of the square root of 2 and the giant leap. II
- The Möbius function and distal flows
- Ergodic properties of square-free numbers
- Entropy and diffraction of the \(k\)-free points in \(n\)-dimensional lattices
- Ergodic properties of \(k\)-free integers in number fields
- A Dynamical Point of View on the Set ofℬ-Free Integers
- Substitutions and Möbius disjointness
- Statistics of Sieves and Square-Free Numbers
- The distribution of r ‐tuples of square‐free numbers
- On the Central Limit Theorem for Dynamical Systems
- The distribution of squarefree numbers.
- Squarefree numbers on short intervals
- On Gaps Between Squarefree Numbers II
- Bounds for the Density of Abundant Integers
- Invariance principles and Gaussian approximation for strictly stationary processes
- Automorphisms with Quasi-discrete Spectrum, Multiplicative Functions and Average Orthogonality Along Short Intervals
- Disjointness of Moebius from Horocycle Flows
- On invariant measures forℬ-free systems
- ON THE DISTRIBUTION OF r-TUPLES OF SQUAREFREE NUMBERS IN SHORT INTERVALS
- On the difference of consecutive terms of sequences defined by divisibility properties
- SIGN PATTERNS OF THE LIOUVILLE AND MÖBIUS FUNCTIONS
- A NEW SERIES FOR THE DENSITY OF ABUNDANT NUMBERS
- On sequences of positive integers
- Arithmetical Pattern Problems Relating to Divisibility by r th Powers*
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