The metric theory of the pair correlation function of real-valued lacunary sequences

Abstract

Let \ a(x) \x=1∞ be a positive, real-valued, lacunary sequence. This note shows that the pair correlation function of the fractional parts of the dilations α a(x) is Poissonian for Lebesgue almost every α∈ R. By using harmonic analysis, our result - irrespective of the choice of the real-valued sequence \ a(x) \x=1∞ - can essentially be reduced to showing that the number of solutions to the Diophantine inequality n1 (a(x1)-a(y1))- n2(a(x2)-a(y2)) < 1 in integer six-tuples (n1,n2,x1,x2,y1,y2) located in the box [-N,N]6 with the ``excluded diagonals'', that is x1≠ y1, x2 ≠ y2, (n1,n2)≠ (0,0), is at most N4-δ for some fixed δ>0, for all sufficiently large N.