On the number variance of sequences with small additive energy

Abstract

For a real-valued sequence (xn)n=1∞, denote by SN() the number of its first N fractional parts lying in a random interval of size :=L/N, where L=o(N) as N∞. We study the variance of SN() (the number variance) for sequences of the form xn=α an, where (an)n=1∞ is a sequence of distinct integers. We show that if the additive energy of the sequence (an)n=1∞ is bounded from above by N5/2-/L for some >0, then for almost all α, the number variance is asymptotic to L (Poissonian number variance). This holds in particular for the sequence xn=α nd, d 2 whenever L=Nβ with 0β<1/2.