Normal distribution of correlation measures of binary sum-of-digits functions (1810.11234v1)

Abstract: In this paper we study correlation measures introduced in \cite{emme_asymptotic_2017}. Denote by $\mu_a(d)$ the asymptotic density of the set $\mathcal{E}{a,d}={n \in \mathbb{N}, \ s_2(n+a)-s_2(n)=d}$ (where $s_2$ is the sum-of-digits function in base 2). Then, for any point $X$ in ${0,1}^\mathbb{N}$, define the integer sequence $\left(a_X (n)\right){n\in \mathbb{N}}$ such that the binary decomposition of $a_X (n) $ is the prefix of length $n$ of $X$. We prove that for \textit{any} shift-invariant ergodic probability measure $\nu$ on ${0,1}^\mathbb{N}$, the sequence $\left(\mu_{a_X(n)}\right)_{n \in \mathbb{N}}$ satisfies a central limit theorem. This result was proven in the case where $\nu$ is the symmetric Bernoulli measure in \cite{emme_central_2018}.