Intermediate-scale statistics for real-valued lacunary sequences

Abstract

We study intermediate-scale statistics for the fractional parts of the sequence (α an)n=1∞, where (an)n=1∞ is a positive, real-valued lacunary sequence, and α∈R. In particular, we consider the number of elements SN(L,α) in a random interval of length L/N, where L=O(N1-ε), and show that its variance (the number variance) is asymptotic to L with high probability w.r.t. α, which is in agreement with the statistics of uniform i.i.d. random points in the unit interval. In addition, we show that the same asymptotics holds almost surely in α∈R when L=O(N1/2-ε). For slowly growing L, we further prove a central limit theorem for SN(L,α) which holds for almost all α∈R.