English

Normal numbers and normality measure

Combinatorics 2013-02-11 v1 Discrete Mathematics Number Theory

Abstract

The normality measure N\mathcal{N} has been introduced by Mauduit and S{\'a}rk{\"o}zy in order to describe the pseudorandomness properties of finite binary sequences. Alon, Kohayakawa, Mauduit, Moreira and R{\"o}dl proved that the minimal possible value of the normality measure of an NN-element binary sequence satisfies (1/2+o(1))log2NminEN{0,1}NN(EN)3N1/3(logN)2/3 (1/2 + o(1)) \log_2 N \leq \min_{E_N \in \{0,1\}^N} \mathcal{N}(E_N) \leq 3 N^{1/3} (\log N)^{2/3} for sufficiently large NN. In the present paper we improve the upper bound to c(logN)2c (\log N)^2 for some constant cc, by this means solving the problem of the asymptotic order of the minimal value of the normality measure up to a logarithmic factor, and disproving a conjecture of Alon \emph{et al.}. The proof is based on relating the normality measure of binary sequences to the discrepancy of normal numbers in base 2.

Keywords

Cite

@article{arxiv.1302.1919,
  title  = {Normal numbers and normality measure},
  author = {Christoph Aistleitner},
  journal= {arXiv preprint arXiv:1302.1919},
  year   = {2013}
}
R2 v1 2026-06-21T23:22:56.869Z