Linear Bounds for Differentiable Limits of Weak Pair Correlation Functions

Abstract

For s ≥ 0 and a parameter 0 < β < 1, the weak pair correlation function fN,β(s) for the first N ∈ N elements of a sequence (xn)n ∈ N ⊂[0,1] is evidently non-decreasing in s. Moreover, it satisfies N ∞ fN,β(0) = 0 if the elements of (xn)n ∈ N are distinct. Beyond these basic observations, little is known in general about the behavior of the limiting function. In this note, we investigate the situation in which the limit fβ(s)=N∞ fN,β(s) exists for all s 0 and is differentiable in a neighborhood of the origin. Under these assumptions, we establish the bounds 2s fβ(s) f'β(0)\, s, thereby providing general constraints on the limiting function.