Almost sure asymptotics for the number variance of dilations of integer sequences
Abstract
Let (xn)n=1∞ be a sequence of integers. We study the number variance of dilations (α xn)n=1∞ modulo 1 in intervals of length S, and establish pseudorandom (Poissonian) behavior for Lebesgue-almost all α throughout a large range of S, subject to certain regularity assumptions imposed upon (xn)n=1∞. For the important special case xn = p(n), where p is a polynomial with integer coefficients of degree at least 2, we prove that the number variance is Poissonian for almost all α throughout the range 0 ≤ S ≤ ( N)-c, for a suitable absolute constant c>0. For more general sequences (xn)n=1∞, we give a criterion for Poissonian behavior for generic α which is formulated in terms of the additive energy of the finite truncations (xn)n=1N.
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