Normal distribution of correlation measures of binary sum-of-digits functions

Abstract

In this paper we study correlation measures introduced in emmeasymptotic2017. Denote by μa(d) the asymptotic density of the set Ea,d=\n ∈ N, \ s2(n+a)-s2(n)=d\ (where s2 is the sum-of-digits function in base 2). Then, for any point X in \0,1\N, define the integer sequence (aX (n))n∈ N such that the binary decomposition of aX (n) is the prefix of length n of X. We prove that for any shift-invariant ergodic probability measure on \0,1\N, the sequence (μaX(n))n ∈ N satisfies a central limit theorem. This result was proven in the case where is the symmetric Bernoulli measure in emmecentral2018.