From exponential counting to pair correlations

Abstract

We prove an abstract result on the correlations of pairs of elements in an exponentially growing discrete subset E of [0,+∞[\, endowed with a weight function. Assume that there exist α∈ R, c,δ>0 such that, as t+∞, the weighted number ω(t) of elements of E that are not greater than t is equivalent to c\,tα eδ t. We prove that the distribution function of the unscaled differences of elements of E is tδ 2\,e-|t|, and that, under an error term assumption on ω(t), the pair correlation with a scaling with polynomial growth exhibits a Poissonian behaviour. We apply this result to answer a question of Pollicott and Sharp on the pair correlations of closed geodesics and common perpendiculars in negatively curved manifolds and metric graphs.