On the σ-Pair Correlation Density of Quadratic Sequences Modulo One

Abstract

In this note we study the σ-pair correlation density equation*R2σ([a,b], \ θn \n, N)= 1N2-σ \# \ 1 ≤ j ≠ k ≤ N \, | \, θj - θk ∈ [ aNσ,bNσ ]+ Z \ equation* of a sequence \ θn\n that is equidistributed modulo one for 0 ≤ σ <2. The case σ=1 is commonly referred to as the pair correlation density and the sequence \ n2 α \n has been of special interest due to its connection to a conjecture of Berry and Tabor on the energy levels of generic completely integrable systems. We prove that if α is Diophantine of type 3-ε for every ε>0, then for any 0 ≤ σ <1 align* R2σ([a,b], \ α n2 \n, N) b-a, as N ∞. align* In this case, we say that the sequence exhibits σ-pair correlation. In addition to this, we show that for any 0 ≤ σ < 14(9 -17)=1.21922... there is a set of full Lebesgue measure such that the sequence \ α n2 \n exhibits σ-pair correlation.