Pseudorandomness of the Ostrowski sum-of-digits function
Abstract
For an irrational α∈(0,1), we investigate the Ostrowski sum-of-digits function σα. For α having bounded partial quotients and ∈ R Z, we prove that the function g:n e( σα(n)), where e(x)= e2π i x, is pseudorandom in the following sense: for all r∈ N the limit \[γr= N→∞ 1NΣ0≤ n<Ng(n+r)g(n) \] exists and we have \[R→∞ 1RΣ0≤ r<R γr2=0.\]
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