On the Pair Correlation Statistic of Sequences with Finite Gap Property

Abstract

The limiting function f(s) of the pair correlation \[ 1N \# \ 1 ≤ i≠ j≤ N xi - xj ≤ sN \ \] for a sequence (xN)N ∈ N on the torus T1 is said to be Poissonian if it exists and equals 2s for all s ≥ 0. For instance, independent, uniformly distributed random variables generically have this property. Obviously f(s) is always a monotonic function if existent. There are only few examples of sequences where f(s) ≠ 2s, but where the limit can still be explicitly calculated. Therefore, it is an open question which types of functions f(s) can or cannot appear here. In this note, we give a partial answer on this question by addressing the case that the number of different gap lengths in the sequence is finite and showing that f cannot be continuous then.