On the number of gaps of sequences with Poissonian Pair Correlations

Abstract

A sequence (xn) on the torus is said to have Poissonian pair correlations if \# \1 i≠ j N: |xi-xj| s/N\=2sN(1+o(1)) for all reals s>0, as N ∞. It is known that, if (xn) has Poissonian pair correlations, then the number g(n) of different gap lengths between neighboring elements of \x1,…,xn\ cannot be bounded along every index subsequence (nt). First, we improve this by showing that the maximum among the multiplicities of the neighboring gap lengths of \x1,…,xn\ is o(n), as n ∞. Furthermore, we show that, for every function f: N+ N+ with n f(n)=∞, there exists a sequence (xn) with Poissonian pair correlations and such that g(n) f(n) for all sufficiently large n. This answers negatively a question posed by G. Larcher.