On the asymptotic behaviour of the correlation measure of sum-of-digits function in base 2

Abstract

Let s\2(x) denote the number of digits "1" in a binary expansion of any x ∈ N. We study the mean distribution μ\a of the quantity s\2(x+a)-s\2(x) for a fixed positive integer a.It is shown that solutions of the equation s\2(x+a)-s\2(x)= d are uniquely identified by a finite set of prefixes in \0,1\*, and that the probability distribution of differences d is given by an infinite product of matrices whose coefficients are operators of l1(Z).Then, denoting by l(a) the number of patterns "01" in the binary expansion of a, we give the asymptotic behaviour of this probability distribution as l(a) goes to infinity as well as estimates of the variance of the probability measure μ\a